hash
stringlengths 64
64
| content
stringlengths 0
1.51M
|
|---|---|
9b5a426d09b2c2a42f879e227c636a0263fcccef9b314bedc37d367ff90723f7
|
from __future__ import print_function, division
from collections import defaultdict
from sympy.core import (sympify, Basic, S, Expr, expand_mul, factor_terms,
Mul, Dummy, igcd, FunctionClass, Add, symbols, Wild, expand)
from sympy.core.cache import cacheit
from sympy.core.compatibility import reduce, iterable, SYMPY_INTS
from sympy.core.function import count_ops, _mexpand
from sympy.core.numbers import I, Integer
from sympy.functions import sin, cos, exp, cosh, tanh, sinh, tan, cot, coth
from sympy.functions.elementary.hyperbolic import HyperbolicFunction
from sympy.functions.elementary.trigonometric import TrigonometricFunction
from sympy.polys import Poly, factor, cancel, parallel_poly_from_expr
from sympy.polys.domains import ZZ
from sympy.polys.polyerrors import PolificationFailed
from sympy.polys.polytools import groebner
from sympy.simplify.cse_main import cse
from sympy.strategies.core import identity
from sympy.strategies.tree import greedy
from sympy.utilities.misc import debug
def trigsimp_groebner(expr, hints=[], quick=False, order="grlex",
polynomial=False):
"""
Simplify trigonometric expressions using a groebner basis algorithm.
This routine takes a fraction involving trigonometric or hyperbolic
expressions, and tries to simplify it. The primary metric is the
total degree. Some attempts are made to choose the simplest possible
expression of the minimal degree, but this is non-rigorous, and also
very slow (see the ``quick=True`` option).
If ``polynomial`` is set to True, instead of simplifying numerator and
denominator together, this function just brings numerator and denominator
into a canonical form. This is much faster, but has potentially worse
results. However, if the input is a polynomial, then the result is
guaranteed to be an equivalent polynomial of minimal degree.
The most important option is hints. Its entries can be any of the
following:
- a natural number
- a function
- an iterable of the form (func, var1, var2, ...)
- anything else, interpreted as a generator
A number is used to indicate that the search space should be increased.
A function is used to indicate that said function is likely to occur in a
simplified expression.
An iterable is used indicate that func(var1 + var2 + ...) is likely to
occur in a simplified .
An additional generator also indicates that it is likely to occur.
(See examples below).
This routine carries out various computationally intensive algorithms.
The option ``quick=True`` can be used to suppress one particularly slow
step (at the expense of potentially more complicated results, but never at
the expense of increased total degree).
Examples
========
>>> from sympy.abc import x, y
>>> from sympy import sin, tan, cos, sinh, cosh, tanh
>>> from sympy.simplify.trigsimp import trigsimp_groebner
Suppose you want to simplify ``sin(x)*cos(x)``. Naively, nothing happens:
>>> ex = sin(x)*cos(x)
>>> trigsimp_groebner(ex)
sin(x)*cos(x)
This is because ``trigsimp_groebner`` only looks for a simplification
involving just ``sin(x)`` and ``cos(x)``. You can tell it to also try
``2*x`` by passing ``hints=[2]``:
>>> trigsimp_groebner(ex, hints=[2])
sin(2*x)/2
>>> trigsimp_groebner(sin(x)**2 - cos(x)**2, hints=[2])
-cos(2*x)
Increasing the search space this way can quickly become expensive. A much
faster way is to give a specific expression that is likely to occur:
>>> trigsimp_groebner(ex, hints=[sin(2*x)])
sin(2*x)/2
Hyperbolic expressions are similarly supported:
>>> trigsimp_groebner(sinh(2*x)/sinh(x))
2*cosh(x)
Note how no hints had to be passed, since the expression already involved
``2*x``.
The tangent function is also supported. You can either pass ``tan`` in the
hints, to indicate that tan should be tried whenever cosine or sine are,
or you can pass a specific generator:
>>> trigsimp_groebner(sin(x)/cos(x), hints=[tan])
tan(x)
>>> trigsimp_groebner(sinh(x)/cosh(x), hints=[tanh(x)])
tanh(x)
Finally, you can use the iterable form to suggest that angle sum formulae
should be tried:
>>> ex = (tan(x) + tan(y))/(1 - tan(x)*tan(y))
>>> trigsimp_groebner(ex, hints=[(tan, x, y)])
tan(x + y)
"""
# TODO
# - preprocess by replacing everything by funcs we can handle
# - optionally use cot instead of tan
# - more intelligent hinting.
# For example, if the ideal is small, and we have sin(x), sin(y),
# add sin(x + y) automatically... ?
# - algebraic numbers ...
# - expressions of lowest degree are not distinguished properly
# e.g. 1 - sin(x)**2
# - we could try to order the generators intelligently, so as to influence
# which monomials appear in the quotient basis
# THEORY
# ------
# Ratsimpmodprime above can be used to "simplify" a rational function
# modulo a prime ideal. "Simplify" mainly means finding an equivalent
# expression of lower total degree.
#
# We intend to use this to simplify trigonometric functions. To do that,
# we need to decide (a) which ring to use, and (b) modulo which ideal to
# simplify. In practice, (a) means settling on a list of "generators"
# a, b, c, ..., such that the fraction we want to simplify is a rational
# function in a, b, c, ..., with coefficients in ZZ (integers).
# (2) means that we have to decide what relations to impose on the
# generators. There are two practical problems:
# (1) The ideal has to be *prime* (a technical term).
# (2) The relations have to be polynomials in the generators.
#
# We typically have two kinds of generators:
# - trigonometric expressions, like sin(x), cos(5*x), etc
# - "everything else", like gamma(x), pi, etc.
#
# Since this function is trigsimp, we will concentrate on what to do with
# trigonometric expressions. We can also simplify hyperbolic expressions,
# but the extensions should be clear.
#
# One crucial point is that all *other* generators really should behave
# like indeterminates. In particular if (say) "I" is one of them, then
# in fact I**2 + 1 = 0 and we may and will compute non-sensical
# expressions. However, we can work with a dummy and add the relation
# I**2 + 1 = 0 to our ideal, then substitute back in the end.
#
# Now regarding trigonometric generators. We split them into groups,
# according to the argument of the trigonometric functions. We want to
# organise this in such a way that most trigonometric identities apply in
# the same group. For example, given sin(x), cos(2*x) and cos(y), we would
# group as [sin(x), cos(2*x)] and [cos(y)].
#
# Our prime ideal will be built in three steps:
# (1) For each group, compute a "geometrically prime" ideal of relations.
# Geometrically prime means that it generates a prime ideal in
# CC[gens], not just ZZ[gens].
# (2) Take the union of all the generators of the ideals for all groups.
# By the geometric primality condition, this is still prime.
# (3) Add further inter-group relations which preserve primality.
#
# Step (1) works as follows. We will isolate common factors in the
# argument, so that all our generators are of the form sin(n*x), cos(n*x)
# or tan(n*x), with n an integer. Suppose first there are no tan terms.
# The ideal [sin(x)**2 + cos(x)**2 - 1] is geometrically prime, since
# X**2 + Y**2 - 1 is irreducible over CC.
# Now, if we have a generator sin(n*x), than we can, using trig identities,
# express sin(n*x) as a polynomial in sin(x) and cos(x). We can add this
# relation to the ideal, preserving geometric primality, since the quotient
# ring is unchanged.
# Thus we have treated all sin and cos terms.
# For tan(n*x), we add a relation tan(n*x)*cos(n*x) - sin(n*x) = 0.
# (This requires of course that we already have relations for cos(n*x) and
# sin(n*x).) It is not obvious, but it seems that this preserves geometric
# primality.
# XXX A real proof would be nice. HELP!
# Sketch that <S**2 + C**2 - 1, C*T - S> is a prime ideal of
# CC[S, C, T]:
# - it suffices to show that the projective closure in CP**3 is
# irreducible
# - using the half-angle substitutions, we can express sin(x), tan(x),
# cos(x) as rational functions in tan(x/2)
# - from this, we get a rational map from CP**1 to our curve
# - this is a morphism, hence the curve is prime
#
# Step (2) is trivial.
#
# Step (3) works by adding selected relations of the form
# sin(x + y) - sin(x)*cos(y) - sin(y)*cos(x), etc. Geometric primality is
# preserved by the same argument as before.
def parse_hints(hints):
"""Split hints into (n, funcs, iterables, gens)."""
n = 1
funcs, iterables, gens = [], [], []
for e in hints:
if isinstance(e, (SYMPY_INTS, Integer)):
n = e
elif isinstance(e, FunctionClass):
funcs.append(e)
elif iterable(e):
iterables.append((e[0], e[1:]))
# XXX sin(x+2y)?
# Note: we go through polys so e.g.
# sin(-x) -> -sin(x) -> sin(x)
gens.extend(parallel_poly_from_expr(
[e[0](x) for x in e[1:]] + [e[0](Add(*e[1:]))])[1].gens)
else:
gens.append(e)
return n, funcs, iterables, gens
def build_ideal(x, terms):
"""
Build generators for our ideal. Terms is an iterable with elements of
the form (fn, coeff), indicating that we have a generator fn(coeff*x).
If any of the terms is trigonometric, sin(x) and cos(x) are guaranteed
to appear in terms. Similarly for hyperbolic functions. For tan(n*x),
sin(n*x) and cos(n*x) are guaranteed.
"""
I = []
y = Dummy('y')
for fn, coeff in terms:
for c, s, t, rel in (
[cos, sin, tan, cos(x)**2 + sin(x)**2 - 1],
[cosh, sinh, tanh, cosh(x)**2 - sinh(x)**2 - 1]):
if coeff == 1 and fn in [c, s]:
I.append(rel)
elif fn == t:
I.append(t(coeff*x)*c(coeff*x) - s(coeff*x))
elif fn in [c, s]:
cn = fn(coeff*y).expand(trig=True).subs(y, x)
I.append(fn(coeff*x) - cn)
return list(set(I))
def analyse_gens(gens, hints):
"""
Analyse the generators ``gens``, using the hints ``hints``.
The meaning of ``hints`` is described in the main docstring.
Return a new list of generators, and also the ideal we should
work with.
"""
# First parse the hints
n, funcs, iterables, extragens = parse_hints(hints)
debug('n=%s' % n, 'funcs:', funcs, 'iterables:',
iterables, 'extragens:', extragens)
# We just add the extragens to gens and analyse them as before
gens = list(gens)
gens.extend(extragens)
# remove duplicates
funcs = list(set(funcs))
iterables = list(set(iterables))
gens = list(set(gens))
# all the functions we can do anything with
allfuncs = {sin, cos, tan, sinh, cosh, tanh}
# sin(3*x) -> ((3, x), sin)
trigterms = [(g.args[0].as_coeff_mul(), g.func) for g in gens
if g.func in allfuncs]
# Our list of new generators - start with anything that we cannot
# work with (i.e. is not a trigonometric term)
freegens = [g for g in gens if g.func not in allfuncs]
newgens = []
trigdict = {}
for (coeff, var), fn in trigterms:
trigdict.setdefault(var, []).append((coeff, fn))
res = [] # the ideal
for key, val in trigdict.items():
# We have now assembeled a dictionary. Its keys are common
# arguments in trigonometric expressions, and values are lists of
# pairs (fn, coeff). x0, (fn, coeff) in trigdict means that we
# need to deal with fn(coeff*x0). We take the rational gcd of the
# coeffs, call it ``gcd``. We then use x = x0/gcd as "base symbol",
# all other arguments are integral multiples thereof.
# We will build an ideal which works with sin(x), cos(x).
# If hint tan is provided, also work with tan(x). Moreover, if
# n > 1, also work with sin(k*x) for k <= n, and similarly for cos
# (and tan if the hint is provided). Finally, any generators which
# the ideal does not work with but we need to accommodate (either
# because it was in expr or because it was provided as a hint)
# we also build into the ideal.
# This selection process is expressed in the list ``terms``.
# build_ideal then generates the actual relations in our ideal,
# from this list.
fns = [x[1] for x in val]
val = [x[0] for x in val]
gcd = reduce(igcd, val)
terms = [(fn, v/gcd) for (fn, v) in zip(fns, val)]
fs = set(funcs + fns)
for c, s, t in ([cos, sin, tan], [cosh, sinh, tanh]):
if any(x in fs for x in (c, s, t)):
fs.add(c)
fs.add(s)
for fn in fs:
for k in range(1, n + 1):
terms.append((fn, k))
extra = []
for fn, v in terms:
if fn == tan:
extra.append((sin, v))
extra.append((cos, v))
if fn in [sin, cos] and tan in fs:
extra.append((tan, v))
if fn == tanh:
extra.append((sinh, v))
extra.append((cosh, v))
if fn in [sinh, cosh] and tanh in fs:
extra.append((tanh, v))
terms.extend(extra)
x = gcd*Mul(*key)
r = build_ideal(x, terms)
res.extend(r)
newgens.extend(set(fn(v*x) for fn, v in terms))
# Add generators for compound expressions from iterables
for fn, args in iterables:
if fn == tan:
# Tan expressions are recovered from sin and cos.
iterables.extend([(sin, args), (cos, args)])
elif fn == tanh:
# Tanh expressions are recovered from sihn and cosh.
iterables.extend([(sinh, args), (cosh, args)])
else:
dummys = symbols('d:%i' % len(args), cls=Dummy)
expr = fn( Add(*dummys)).expand(trig=True).subs(list(zip(dummys, args)))
res.append(fn(Add(*args)) - expr)
if myI in gens:
res.append(myI**2 + 1)
freegens.remove(myI)
newgens.append(myI)
return res, freegens, newgens
myI = Dummy('I')
expr = expr.subs(S.ImaginaryUnit, myI)
subs = [(myI, S.ImaginaryUnit)]
num, denom = cancel(expr).as_numer_denom()
try:
(pnum, pdenom), opt = parallel_poly_from_expr([num, denom])
except PolificationFailed:
return expr
debug('initial gens:', opt.gens)
ideal, freegens, gens = analyse_gens(opt.gens, hints)
debug('ideal:', ideal)
debug('new gens:', gens, " -- len", len(gens))
debug('free gens:', freegens, " -- len", len(gens))
# NOTE we force the domain to be ZZ to stop polys from injecting generators
# (which is usually a sign of a bug in the way we build the ideal)
if not gens:
return expr
G = groebner(ideal, order=order, gens=gens, domain=ZZ)
debug('groebner basis:', list(G), " -- len", len(G))
# If our fraction is a polynomial in the free generators, simplify all
# coefficients separately:
from sympy.simplify.ratsimp import ratsimpmodprime
if freegens and pdenom.has_only_gens(*set(gens).intersection(pdenom.gens)):
num = Poly(num, gens=gens+freegens).eject(*gens)
res = []
for monom, coeff in num.terms():
ourgens = set(parallel_poly_from_expr([coeff, denom])[1].gens)
# We compute the transitive closure of all generators that can
# be reached from our generators through relations in the ideal.
changed = True
while changed:
changed = False
for p in ideal:
p = Poly(p)
if not ourgens.issuperset(p.gens) and \
not p.has_only_gens(*set(p.gens).difference(ourgens)):
changed = True
ourgens.update(p.exclude().gens)
# NOTE preserve order!
realgens = [x for x in gens if x in ourgens]
# The generators of the ideal have now been (implicitly) split
# into two groups: those involving ourgens and those that don't.
# Since we took the transitive closure above, these two groups
# live in subgrings generated by a *disjoint* set of variables.
# Any sensible groebner basis algorithm will preserve this disjoint
# structure (i.e. the elements of the groebner basis can be split
# similarly), and and the two subsets of the groebner basis then
# form groebner bases by themselves. (For the smaller generating
# sets, of course.)
ourG = [g.as_expr() for g in G.polys if
g.has_only_gens(*ourgens.intersection(g.gens))]
res.append(Mul(*[a**b for a, b in zip(freegens, monom)]) * \
ratsimpmodprime(coeff/denom, ourG, order=order,
gens=realgens, quick=quick, domain=ZZ,
polynomial=polynomial).subs(subs))
return Add(*res)
# NOTE The following is simpler and has less assumptions on the
# groebner basis algorithm. If the above turns out to be broken,
# use this.
return Add(*[Mul(*[a**b for a, b in zip(freegens, monom)]) * \
ratsimpmodprime(coeff/denom, list(G), order=order,
gens=gens, quick=quick, domain=ZZ)
for monom, coeff in num.terms()])
else:
return ratsimpmodprime(
expr, list(G), order=order, gens=freegens+gens,
quick=quick, domain=ZZ, polynomial=polynomial).subs(subs)
_trigs = (TrigonometricFunction, HyperbolicFunction)
def trigsimp(expr, **opts):
"""
reduces expression by using known trig identities
Notes
=====
method:
- Determine the method to use. Valid choices are 'matching' (default),
'groebner', 'combined', and 'fu'. If 'matching', simplify the
expression recursively by targeting common patterns. If 'groebner', apply
an experimental groebner basis algorithm. In this case further options
are forwarded to ``trigsimp_groebner``, please refer to its docstring.
If 'combined', first run the groebner basis algorithm with small
default parameters, then run the 'matching' algorithm. 'fu' runs the
collection of trigonometric transformations described by Fu, et al.
(see the `fu` docstring).
Examples
========
>>> from sympy import trigsimp, sin, cos, log
>>> from sympy.abc import x
>>> e = 2*sin(x)**2 + 2*cos(x)**2
>>> trigsimp(e)
2
Simplification occurs wherever trigonometric functions are located.
>>> trigsimp(log(e))
log(2)
Using `method="groebner"` (or `"combined"`) might lead to greater
simplification.
The old trigsimp routine can be accessed as with method 'old'.
>>> from sympy import coth, tanh
>>> t = 3*tanh(x)**7 - 2/coth(x)**7
>>> trigsimp(t, method='old') == t
True
>>> trigsimp(t)
tanh(x)**7
"""
from sympy.simplify.fu import fu
expr = sympify(expr)
_eval_trigsimp = getattr(expr, '_eval_trigsimp', None)
if _eval_trigsimp is not None:
return _eval_trigsimp(**opts)
old = opts.pop('old', False)
if not old:
opts.pop('deep', None)
opts.pop('recursive', None)
method = opts.pop('method', 'matching')
else:
method = 'old'
def groebnersimp(ex, **opts):
def traverse(e):
if e.is_Atom:
return e
args = [traverse(x) for x in e.args]
if e.is_Function or e.is_Pow:
args = [trigsimp_groebner(x, **opts) for x in args]
return e.func(*args)
new = traverse(ex)
if not isinstance(new, Expr):
return new
return trigsimp_groebner(new, **opts)
trigsimpfunc = {
'fu': (lambda x: fu(x, **opts)),
'matching': (lambda x: futrig(x)),
'groebner': (lambda x: groebnersimp(x, **opts)),
'combined': (lambda x: futrig(groebnersimp(x,
polynomial=True, hints=[2, tan]))),
'old': lambda x: trigsimp_old(x, **opts),
}[method]
return trigsimpfunc(expr)
def exptrigsimp(expr):
"""
Simplifies exponential / trigonometric / hyperbolic functions.
Examples
========
>>> from sympy import exptrigsimp, exp, cosh, sinh
>>> from sympy.abc import z
>>> exptrigsimp(exp(z) + exp(-z))
2*cosh(z)
>>> exptrigsimp(cosh(z) - sinh(z))
exp(-z)
"""
from sympy.simplify.fu import hyper_as_trig, TR2i
from sympy.simplify.simplify import bottom_up
def exp_trig(e):
# select the better of e, and e rewritten in terms of exp or trig
# functions
choices = [e]
if e.has(*_trigs):
choices.append(e.rewrite(exp))
choices.append(e.rewrite(cos))
return min(*choices, key=count_ops)
newexpr = bottom_up(expr, exp_trig)
def f(rv):
if not rv.is_Mul:
return rv
commutative_part, noncommutative_part = rv.args_cnc()
# Since as_powers_dict loses order information,
# if there is more than one noncommutative factor,
# it should only be used to simplify the commutative part.
if (len(noncommutative_part) > 1):
return f(Mul(*commutative_part))*Mul(*noncommutative_part)
rvd = rv.as_powers_dict()
newd = rvd.copy()
def signlog(expr, sign=1):
if expr is S.Exp1:
return sign, 1
elif isinstance(expr, exp):
return sign, expr.args[0]
elif sign == 1:
return signlog(-expr, sign=-1)
else:
return None, None
ee = rvd[S.Exp1]
for k in rvd:
if k.is_Add and len(k.args) == 2:
# k == c*(1 + sign*E**x)
c = k.args[0]
sign, x = signlog(k.args[1]/c)
if not x:
continue
m = rvd[k]
newd[k] -= m
if ee == -x*m/2:
# sinh and cosh
newd[S.Exp1] -= ee
ee = 0
if sign == 1:
newd[2*c*cosh(x/2)] += m
else:
newd[-2*c*sinh(x/2)] += m
elif newd[1 - sign*S.Exp1**x] == -m:
# tanh
del newd[1 - sign*S.Exp1**x]
if sign == 1:
newd[-c/tanh(x/2)] += m
else:
newd[-c*tanh(x/2)] += m
else:
newd[1 + sign*S.Exp1**x] += m
newd[c] += m
return Mul(*[k**newd[k] for k in newd])
newexpr = bottom_up(newexpr, f)
# sin/cos and sinh/cosh ratios to tan and tanh, respectively
if newexpr.has(HyperbolicFunction):
e, f = hyper_as_trig(newexpr)
newexpr = f(TR2i(e))
if newexpr.has(TrigonometricFunction):
newexpr = TR2i(newexpr)
# can we ever generate an I where there was none previously?
if not (newexpr.has(I) and not expr.has(I)):
expr = newexpr
return expr
#-------------------- the old trigsimp routines ---------------------
def trigsimp_old(expr, **opts):
"""
reduces expression by using known trig identities
Notes
=====
deep:
- Apply trigsimp inside all objects with arguments
recursive:
- Use common subexpression elimination (cse()) and apply
trigsimp recursively (this is quite expensive if the
expression is large)
method:
- Determine the method to use. Valid choices are 'matching' (default),
'groebner', 'combined', 'fu' and 'futrig'. If 'matching', simplify the
expression recursively by pattern matching. If 'groebner', apply an
experimental groebner basis algorithm. In this case further options
are forwarded to ``trigsimp_groebner``, please refer to its docstring.
If 'combined', first run the groebner basis algorithm with small
default parameters, then run the 'matching' algorithm. 'fu' runs the
collection of trigonometric transformations described by Fu, et al.
(see the `fu` docstring) while `futrig` runs a subset of Fu-transforms
that mimic the behavior of `trigsimp`.
compare:
- show input and output from `trigsimp` and `futrig` when different,
but returns the `trigsimp` value.
Examples
========
>>> from sympy import trigsimp, sin, cos, log, cot
>>> from sympy.abc import x
>>> e = 2*sin(x)**2 + 2*cos(x)**2
>>> trigsimp(e, old=True)
2
>>> trigsimp(log(e), old=True)
log(2*sin(x)**2 + 2*cos(x)**2)
>>> trigsimp(log(e), deep=True, old=True)
log(2)
Using `method="groebner"` (or `"combined"`) can sometimes lead to a lot
more simplification:
>>> e = (-sin(x) + 1)/cos(x) + cos(x)/(-sin(x) + 1)
>>> trigsimp(e, old=True)
(1 - sin(x))/cos(x) + cos(x)/(1 - sin(x))
>>> trigsimp(e, method="groebner", old=True)
2/cos(x)
>>> trigsimp(1/cot(x)**2, compare=True, old=True)
futrig: tan(x)**2
cot(x)**(-2)
"""
old = expr
first = opts.pop('first', True)
if first:
if not expr.has(*_trigs):
return expr
trigsyms = set().union(*[t.free_symbols for t in expr.atoms(*_trigs)])
if len(trigsyms) > 1:
from sympy.simplify.simplify import separatevars
d = separatevars(expr)
if d.is_Mul:
d = separatevars(d, dict=True) or d
if isinstance(d, dict):
expr = 1
for k, v in d.items():
# remove hollow factoring
was = v
v = expand_mul(v)
opts['first'] = False
vnew = trigsimp(v, **opts)
if vnew == v:
vnew = was
expr *= vnew
old = expr
else:
if d.is_Add:
for s in trigsyms:
r, e = expr.as_independent(s)
if r:
opts['first'] = False
expr = r + trigsimp(e, **opts)
if not expr.is_Add:
break
old = expr
recursive = opts.pop('recursive', False)
deep = opts.pop('deep', False)
method = opts.pop('method', 'matching')
def groebnersimp(ex, deep, **opts):
def traverse(e):
if e.is_Atom:
return e
args = [traverse(x) for x in e.args]
if e.is_Function or e.is_Pow:
args = [trigsimp_groebner(x, **opts) for x in args]
return e.func(*args)
if deep:
ex = traverse(ex)
return trigsimp_groebner(ex, **opts)
trigsimpfunc = {
'matching': (lambda x, d: _trigsimp(x, d)),
'groebner': (lambda x, d: groebnersimp(x, d, **opts)),
'combined': (lambda x, d: _trigsimp(groebnersimp(x,
d, polynomial=True, hints=[2, tan]),
d))
}[method]
if recursive:
w, g = cse(expr)
g = trigsimpfunc(g[0], deep)
for sub in reversed(w):
g = g.subs(sub[0], sub[1])
g = trigsimpfunc(g, deep)
result = g
else:
result = trigsimpfunc(expr, deep)
if opts.get('compare', False):
f = futrig(old)
if f != result:
print('\tfutrig:', f)
return result
def _dotrig(a, b):
"""Helper to tell whether ``a`` and ``b`` have the same sorts
of symbols in them -- no need to test hyperbolic patterns against
expressions that have no hyperbolics in them."""
return a.func == b.func and (
a.has(TrigonometricFunction) and b.has(TrigonometricFunction) or
a.has(HyperbolicFunction) and b.has(HyperbolicFunction))
_trigpat = None
def _trigpats():
global _trigpat
a, b, c = symbols('a b c', cls=Wild)
d = Wild('d', commutative=False)
# for the simplifications like sinh/cosh -> tanh:
# DO NOT REORDER THE FIRST 14 since these are assumed to be in this
# order in _match_div_rewrite.
matchers_division = (
(a*sin(b)**c/cos(b)**c, a*tan(b)**c, sin(b), cos(b)),
(a*tan(b)**c*cos(b)**c, a*sin(b)**c, sin(b), cos(b)),
(a*cot(b)**c*sin(b)**c, a*cos(b)**c, sin(b), cos(b)),
(a*tan(b)**c/sin(b)**c, a/cos(b)**c, sin(b), cos(b)),
(a*cot(b)**c/cos(b)**c, a/sin(b)**c, sin(b), cos(b)),
(a*cot(b)**c*tan(b)**c, a, sin(b), cos(b)),
(a*(cos(b) + 1)**c*(cos(b) - 1)**c,
a*(-sin(b)**2)**c, cos(b) + 1, cos(b) - 1),
(a*(sin(b) + 1)**c*(sin(b) - 1)**c,
a*(-cos(b)**2)**c, sin(b) + 1, sin(b) - 1),
(a*sinh(b)**c/cosh(b)**c, a*tanh(b)**c, S.One, S.One),
(a*tanh(b)**c*cosh(b)**c, a*sinh(b)**c, S.One, S.One),
(a*coth(b)**c*sinh(b)**c, a*cosh(b)**c, S.One, S.One),
(a*tanh(b)**c/sinh(b)**c, a/cosh(b)**c, S.One, S.One),
(a*coth(b)**c/cosh(b)**c, a/sinh(b)**c, S.One, S.One),
(a*coth(b)**c*tanh(b)**c, a, S.One, S.One),
(c*(tanh(a) + tanh(b))/(1 + tanh(a)*tanh(b)),
tanh(a + b)*c, S.One, S.One),
)
matchers_add = (
(c*sin(a)*cos(b) + c*cos(a)*sin(b) + d, sin(a + b)*c + d),
(c*cos(a)*cos(b) - c*sin(a)*sin(b) + d, cos(a + b)*c + d),
(c*sin(a)*cos(b) - c*cos(a)*sin(b) + d, sin(a - b)*c + d),
(c*cos(a)*cos(b) + c*sin(a)*sin(b) + d, cos(a - b)*c + d),
(c*sinh(a)*cosh(b) + c*sinh(b)*cosh(a) + d, sinh(a + b)*c + d),
(c*cosh(a)*cosh(b) + c*sinh(a)*sinh(b) + d, cosh(a + b)*c + d),
)
# for cos(x)**2 + sin(x)**2 -> 1
matchers_identity = (
(a*sin(b)**2, a - a*cos(b)**2),
(a*tan(b)**2, a*(1/cos(b))**2 - a),
(a*cot(b)**2, a*(1/sin(b))**2 - a),
(a*sin(b + c), a*(sin(b)*cos(c) + sin(c)*cos(b))),
(a*cos(b + c), a*(cos(b)*cos(c) - sin(b)*sin(c))),
(a*tan(b + c), a*((tan(b) + tan(c))/(1 - tan(b)*tan(c)))),
(a*sinh(b)**2, a*cosh(b)**2 - a),
(a*tanh(b)**2, a - a*(1/cosh(b))**2),
(a*coth(b)**2, a + a*(1/sinh(b))**2),
(a*sinh(b + c), a*(sinh(b)*cosh(c) + sinh(c)*cosh(b))),
(a*cosh(b + c), a*(cosh(b)*cosh(c) + sinh(b)*sinh(c))),
(a*tanh(b + c), a*((tanh(b) + tanh(c))/(1 + tanh(b)*tanh(c)))),
)
# Reduce any lingering artifacts, such as sin(x)**2 changing
# to 1-cos(x)**2 when sin(x)**2 was "simpler"
artifacts = (
(a - a*cos(b)**2 + c, a*sin(b)**2 + c, cos),
(a - a*(1/cos(b))**2 + c, -a*tan(b)**2 + c, cos),
(a - a*(1/sin(b))**2 + c, -a*cot(b)**2 + c, sin),
(a - a*cosh(b)**2 + c, -a*sinh(b)**2 + c, cosh),
(a - a*(1/cosh(b))**2 + c, a*tanh(b)**2 + c, cosh),
(a + a*(1/sinh(b))**2 + c, a*coth(b)**2 + c, sinh),
# same as above but with noncommutative prefactor
(a*d - a*d*cos(b)**2 + c, a*d*sin(b)**2 + c, cos),
(a*d - a*d*(1/cos(b))**2 + c, -a*d*tan(b)**2 + c, cos),
(a*d - a*d*(1/sin(b))**2 + c, -a*d*cot(b)**2 + c, sin),
(a*d - a*d*cosh(b)**2 + c, -a*d*sinh(b)**2 + c, cosh),
(a*d - a*d*(1/cosh(b))**2 + c, a*d*tanh(b)**2 + c, cosh),
(a*d + a*d*(1/sinh(b))**2 + c, a*d*coth(b)**2 + c, sinh),
)
_trigpat = (a, b, c, d, matchers_division, matchers_add,
matchers_identity, artifacts)
return _trigpat
def _replace_mul_fpowxgpow(expr, f, g, rexp, h, rexph):
"""Helper for _match_div_rewrite.
Replace f(b_)**c_*g(b_)**(rexp(c_)) with h(b)**rexph(c) if f(b_)
and g(b_) are both positive or if c_ is an integer.
"""
# assert expr.is_Mul and expr.is_commutative and f != g
fargs = defaultdict(int)
gargs = defaultdict(int)
args = []
for x in expr.args:
if x.is_Pow or x.func in (f, g):
b, e = x.as_base_exp()
if b.is_positive or e.is_integer:
if b.func == f:
fargs[b.args[0]] += e
continue
elif b.func == g:
gargs[b.args[0]] += e
continue
args.append(x)
common = set(fargs) & set(gargs)
hit = False
while common:
key = common.pop()
fe = fargs.pop(key)
ge = gargs.pop(key)
if fe == rexp(ge):
args.append(h(key)**rexph(fe))
hit = True
else:
fargs[key] = fe
gargs[key] = ge
if not hit:
return expr
while fargs:
key, e = fargs.popitem()
args.append(f(key)**e)
while gargs:
key, e = gargs.popitem()
args.append(g(key)**e)
return Mul(*args)
_idn = lambda x: x
_midn = lambda x: -x
_one = lambda x: S.One
def _match_div_rewrite(expr, i):
"""helper for __trigsimp"""
if i == 0:
expr = _replace_mul_fpowxgpow(expr, sin, cos,
_midn, tan, _idn)
elif i == 1:
expr = _replace_mul_fpowxgpow(expr, tan, cos,
_idn, sin, _idn)
elif i == 2:
expr = _replace_mul_fpowxgpow(expr, cot, sin,
_idn, cos, _idn)
elif i == 3:
expr = _replace_mul_fpowxgpow(expr, tan, sin,
_midn, cos, _midn)
elif i == 4:
expr = _replace_mul_fpowxgpow(expr, cot, cos,
_midn, sin, _midn)
elif i == 5:
expr = _replace_mul_fpowxgpow(expr, cot, tan,
_idn, _one, _idn)
# i in (6, 7) is skipped
elif i == 8:
expr = _replace_mul_fpowxgpow(expr, sinh, cosh,
_midn, tanh, _idn)
elif i == 9:
expr = _replace_mul_fpowxgpow(expr, tanh, cosh,
_idn, sinh, _idn)
elif i == 10:
expr = _replace_mul_fpowxgpow(expr, coth, sinh,
_idn, cosh, _idn)
elif i == 11:
expr = _replace_mul_fpowxgpow(expr, tanh, sinh,
_midn, cosh, _midn)
elif i == 12:
expr = _replace_mul_fpowxgpow(expr, coth, cosh,
_midn, sinh, _midn)
elif i == 13:
expr = _replace_mul_fpowxgpow(expr, coth, tanh,
_idn, _one, _idn)
else:
return None
return expr
def _trigsimp(expr, deep=False):
# protect the cache from non-trig patterns; we only allow
# trig patterns to enter the cache
if expr.has(*_trigs):
return __trigsimp(expr, deep)
return expr
@cacheit
def __trigsimp(expr, deep=False):
"""recursive helper for trigsimp"""
from sympy.simplify.fu import TR10i
if _trigpat is None:
_trigpats()
a, b, c, d, matchers_division, matchers_add, \
matchers_identity, artifacts = _trigpat
if expr.is_Mul:
# do some simplifications like sin/cos -> tan:
if not expr.is_commutative:
com, nc = expr.args_cnc()
expr = _trigsimp(Mul._from_args(com), deep)*Mul._from_args(nc)
else:
for i, (pattern, simp, ok1, ok2) in enumerate(matchers_division):
if not _dotrig(expr, pattern):
continue
newexpr = _match_div_rewrite(expr, i)
if newexpr is not None:
if newexpr != expr:
expr = newexpr
break
else:
continue
# use SymPy matching instead
res = expr.match(pattern)
if res and res.get(c, 0):
if not res[c].is_integer:
ok = ok1.subs(res)
if not ok.is_positive:
continue
ok = ok2.subs(res)
if not ok.is_positive:
continue
# if "a" contains any of trig or hyperbolic funcs with
# argument "b" then skip the simplification
if any(w.args[0] == res[b] for w in res[a].atoms(
TrigonometricFunction, HyperbolicFunction)):
continue
# simplify and finish:
expr = simp.subs(res)
break # process below
if expr.is_Add:
args = []
for term in expr.args:
if not term.is_commutative:
com, nc = term.args_cnc()
nc = Mul._from_args(nc)
term = Mul._from_args(com)
else:
nc = S.One
term = _trigsimp(term, deep)
for pattern, result in matchers_identity:
res = term.match(pattern)
if res is not None:
term = result.subs(res)
break
args.append(term*nc)
if args != expr.args:
expr = Add(*args)
expr = min(expr, expand(expr), key=count_ops)
if expr.is_Add:
for pattern, result in matchers_add:
if not _dotrig(expr, pattern):
continue
expr = TR10i(expr)
if expr.has(HyperbolicFunction):
res = expr.match(pattern)
# if "d" contains any trig or hyperbolic funcs with
# argument "a" or "b" then skip the simplification;
# this isn't perfect -- see tests
if res is None or not (a in res and b in res) or any(
w.args[0] in (res[a], res[b]) for w in res[d].atoms(
TrigonometricFunction, HyperbolicFunction)):
continue
expr = result.subs(res)
break
# Reduce any lingering artifacts, such as sin(x)**2 changing
# to 1 - cos(x)**2 when sin(x)**2 was "simpler"
for pattern, result, ex in artifacts:
if not _dotrig(expr, pattern):
continue
# Substitute a new wild that excludes some function(s)
# to help influence a better match. This is because
# sometimes, for example, 'a' would match sec(x)**2
a_t = Wild('a', exclude=[ex])
pattern = pattern.subs(a, a_t)
result = result.subs(a, a_t)
m = expr.match(pattern)
was = None
while m and was != expr:
was = expr
if m[a_t] == 0 or \
-m[a_t] in m[c].args or m[a_t] + m[c] == 0:
break
if d in m and m[a_t]*m[d] + m[c] == 0:
break
expr = result.subs(m)
m = expr.match(pattern)
m.setdefault(c, S.Zero)
elif expr.is_Mul or expr.is_Pow or deep and expr.args:
expr = expr.func(*[_trigsimp(a, deep) for a in expr.args])
try:
if not expr.has(*_trigs):
raise TypeError
e = expr.atoms(exp)
new = expr.rewrite(exp, deep=deep)
if new == e:
raise TypeError
fnew = factor(new)
if fnew != new:
new = sorted([new, factor(new)], key=count_ops)[0]
# if all exp that were introduced disappeared then accept it
if not (new.atoms(exp) - e):
expr = new
except TypeError:
pass
return expr
#------------------- end of old trigsimp routines --------------------
def futrig(e, **kwargs):
"""Return simplified ``e`` using Fu-like transformations.
This is not the "Fu" algorithm. This is called by default
from ``trigsimp``. By default, hyperbolics subexpressions
will be simplified, but this can be disabled by setting
``hyper=False``.
Examples
========
>>> from sympy import trigsimp, tan, sinh, tanh
>>> from sympy.simplify.trigsimp import futrig
>>> from sympy.abc import x
>>> trigsimp(1/tan(x)**2)
tan(x)**(-2)
>>> futrig(sinh(x)/tanh(x))
cosh(x)
"""
from sympy.simplify.fu import hyper_as_trig
from sympy.simplify.simplify import bottom_up
e = sympify(e)
if not isinstance(e, Basic):
return e
if not e.args:
return e
old = e
e = bottom_up(e, _futrig)
if kwargs.pop('hyper', True) and e.has(HyperbolicFunction):
e, f = hyper_as_trig(e)
e = f(bottom_up(e, _futrig))
if e != old and e.is_Mul and e.args[0].is_Rational:
# redistribute leading coeff on 2-arg Add
e = Mul(*e.as_coeff_Mul())
return e
def _futrig(e):
"""Helper for futrig."""
from sympy.simplify.fu import (
TR1, TR2, TR3, TR2i, TR10, L, TR10i,
TR8, TR6, TR15, TR16, TR111, TR5, TRmorrie, TR11, _TR11, TR14, TR22,
TR12)
from sympy.core.compatibility import _nodes
if not e.has(TrigonometricFunction):
return e
if e.is_Mul:
coeff, e = e.as_independent(TrigonometricFunction)
else:
coeff = None
Lops = lambda x: (L(x), x.count_ops(), _nodes(x), len(x.args), x.is_Add)
trigs = lambda x: x.has(TrigonometricFunction)
tree = [identity,
(
TR3, # canonical angles
TR1, # sec-csc -> cos-sin
TR12, # expand tan of sum
lambda x: _eapply(factor, x, trigs),
TR2, # tan-cot -> sin-cos
[identity, lambda x: _eapply(_mexpand, x, trigs)],
TR2i, # sin-cos ratio -> tan
lambda x: _eapply(lambda i: factor(i.normal()), x, trigs),
TR14, # factored identities
TR5, # sin-pow -> cos_pow
TR10, # sin-cos of sums -> sin-cos prod
TR11, _TR11, TR6, # reduce double angles and rewrite cos pows
lambda x: _eapply(factor, x, trigs),
TR14, # factored powers of identities
[identity, lambda x: _eapply(_mexpand, x, trigs)],
TR10i, # sin-cos products > sin-cos of sums
TRmorrie,
[identity, TR8], # sin-cos products -> sin-cos of sums
[identity, lambda x: TR2i(TR2(x))], # tan -> sin-cos -> tan
[
lambda x: _eapply(expand_mul, TR5(x), trigs),
lambda x: _eapply(
expand_mul, TR15(x), trigs)], # pos/neg powers of sin
[
lambda x: _eapply(expand_mul, TR6(x), trigs),
lambda x: _eapply(
expand_mul, TR16(x), trigs)], # pos/neg powers of cos
TR111, # tan, sin, cos to neg power -> cot, csc, sec
[identity, TR2i], # sin-cos ratio to tan
[identity, lambda x: _eapply(
expand_mul, TR22(x), trigs)], # tan-cot to sec-csc
TR1, TR2, TR2i,
[identity, lambda x: _eapply(
factor_terms, TR12(x), trigs)], # expand tan of sum
)]
e = greedy(tree, objective=Lops)(e)
if coeff is not None:
e = coeff * e
return e
def _is_Expr(e):
"""_eapply helper to tell whether ``e`` and all its args
are Exprs."""
from sympy import Derivative
if isinstance(e, Derivative):
return _is_Expr(e.expr)
if not isinstance(e, Expr):
return False
return all(_is_Expr(i) for i in e.args)
def _eapply(func, e, cond=None):
"""Apply ``func`` to ``e`` if all args are Exprs else only
apply it to those args that *are* Exprs."""
if not isinstance(e, Expr):
return e
if _is_Expr(e) or not e.args:
return func(e)
return e.func(*[
_eapply(func, ei) if (cond is None or cond(ei)) else ei
for ei in e.args])
|
26179c945c556748628cdbdb30f451a54a532a2f7c37b1796a4c747700ceead8
|
"""
This module contains functions to:
- solve a single equation for a single variable, in any domain either real or complex.
- solve a single transcendental equation for a single variable in any domain either real or complex.
(currently supports solving in real domain only)
- solve a system of linear equations with N variables and M equations.
- solve a system of Non Linear Equations with N variables and M equations
"""
from __future__ import print_function, division
from sympy.core.sympify import sympify
from sympy.core import (S, Pow, Dummy, pi, Expr, Wild, Mul, Equality,
Add)
from sympy.core.containers import Tuple
from sympy.core.numbers import I, Number, Rational, oo
from sympy.core.function import (Lambda, expand_complex, AppliedUndef,
expand_log, _mexpand)
from sympy.core.mod import Mod
from sympy.core.numbers import igcd
from sympy.core.relational import Eq, Ne, Relational
from sympy.core.symbol import Symbol
from sympy.core.sympify import _sympify
from sympy.simplify.simplify import simplify, fraction, trigsimp
from sympy.simplify import powdenest, logcombine
from sympy.functions import (log, Abs, tan, cot, sin, cos, sec, csc, exp,
acos, asin, acsc, asec, arg,
piecewise_fold, Piecewise)
from sympy.functions.elementary.trigonometric import (TrigonometricFunction,
HyperbolicFunction)
from sympy.functions.elementary.miscellaneous import real_root
from sympy.logic.boolalg import And
from sympy.sets import (FiniteSet, EmptySet, imageset, Interval, Intersection,
Union, ConditionSet, ImageSet, Complement, Contains)
from sympy.sets.sets import Set, ProductSet
from sympy.matrices import Matrix, MatrixBase
from sympy.ntheory import totient
from sympy.ntheory.factor_ import divisors
from sympy.ntheory.residue_ntheory import discrete_log, nthroot_mod
from sympy.polys import (roots, Poly, degree, together, PolynomialError,
RootOf, factor, lcm, gcd)
from sympy.polys.polyerrors import CoercionFailed
from sympy.polys.polytools import invert
from sympy.solvers.solvers import (checksol, denoms, unrad,
_simple_dens, recast_to_symbols)
from sympy.solvers.polysys import solve_poly_system
from sympy.solvers.inequalities import solve_univariate_inequality
from sympy.utilities import filldedent
from sympy.utilities.iterables import numbered_symbols, has_dups
from sympy.calculus.util import periodicity, continuous_domain
from sympy.core.compatibility import ordered, default_sort_key, is_sequence
from types import GeneratorType
from collections import defaultdict
class NonlinearError(ValueError):
"""Raised by linear_eq_to_matrix if the equations are nonlinear"""
pass
_rc = Dummy("R", real=True), Dummy("C", complex=True)
def _masked(f, *atoms):
"""Return ``f``, with all objects given by ``atoms`` replaced with
Dummy symbols, ``d``, and the list of replacements, ``(d, e)``,
where ``e`` is an object of type given by ``atoms`` in which
any other instances of atoms have been recursively replaced with
Dummy symbols, too. The tuples are ordered so that if they are
applied in sequence, the origin ``f`` will be restored.
Examples
========
>>> from sympy import cos
>>> from sympy.abc import x
>>> from sympy.solvers.solveset import _masked
>>> f = cos(cos(x) + 1)
>>> f, reps = _masked(cos(1 + cos(x)), cos)
>>> f
_a1
>>> reps
[(_a1, cos(_a0 + 1)), (_a0, cos(x))]
>>> for d, e in reps:
... f = f.xreplace({d: e})
>>> f
cos(cos(x) + 1)
"""
sym = numbered_symbols('a', cls=Dummy, real=True)
mask = []
for a in ordered(f.atoms(*atoms)):
for i in mask:
a = a.replace(*i)
mask.append((a, next(sym)))
for i, (o, n) in enumerate(mask):
f = f.replace(o, n)
mask[i] = (n, o)
mask = list(reversed(mask))
return f, mask
def _invert(f_x, y, x, domain=S.Complexes):
r"""
Reduce the complex valued equation ``f(x) = y`` to a set of equations
``{g(x) = h_1(y), g(x) = h_2(y), ..., g(x) = h_n(y) }`` where ``g(x)`` is
a simpler function than ``f(x)``. The return value is a tuple ``(g(x),
set_h)``, where ``g(x)`` is a function of ``x`` and ``set_h`` is
the set of function ``{h_1(y), h_2(y), ..., h_n(y)}``.
Here, ``y`` is not necessarily a symbol.
The ``set_h`` contains the functions, along with the information
about the domain in which they are valid, through set
operations. For instance, if ``y = Abs(x) - n`` is inverted
in the real domain, then ``set_h`` is not simply
`{-n, n}` as the nature of `n` is unknown; rather, it is:
`Intersection([0, oo) {n}) U Intersection((-oo, 0], {-n})`
By default, the complex domain is used which means that inverting even
seemingly simple functions like ``exp(x)`` will give very different
results from those obtained in the real domain.
(In the case of ``exp(x)``, the inversion via ``log`` is multi-valued
in the complex domain, having infinitely many branches.)
If you are working with real values only (or you are not sure which
function to use) you should probably set the domain to
``S.Reals`` (or use `invert\_real` which does that automatically).
Examples
========
>>> from sympy.solvers.solveset import invert_complex, invert_real
>>> from sympy.abc import x, y
>>> from sympy import exp
When does exp(x) == y?
>>> invert_complex(exp(x), y, x)
(x, ImageSet(Lambda(_n, I*(2*_n*pi + arg(y)) + log(Abs(y))), Integers))
>>> invert_real(exp(x), y, x)
(x, Intersection(FiniteSet(log(y)), Reals))
When does exp(x) == 1?
>>> invert_complex(exp(x), 1, x)
(x, ImageSet(Lambda(_n, 2*_n*I*pi), Integers))
>>> invert_real(exp(x), 1, x)
(x, FiniteSet(0))
See Also
========
invert_real, invert_complex
"""
x = sympify(x)
if not x.is_Symbol:
raise ValueError("x must be a symbol")
f_x = sympify(f_x)
if x not in f_x.free_symbols:
raise ValueError("Inverse of constant function doesn't exist")
y = sympify(y)
if x in y.free_symbols:
raise ValueError("y should be independent of x ")
if domain.is_subset(S.Reals):
x1, s = _invert_real(f_x, FiniteSet(y), x)
else:
x1, s = _invert_complex(f_x, FiniteSet(y), x)
if not isinstance(s, FiniteSet) or x1 != x:
return x1, s
# Avoid adding gratuitous intersections with S.Complexes. Actual
# conditions should be handled by the respective inverters.
if domain is S.Complexes:
return x1, s
else:
return x1, s.intersection(domain)
invert_complex = _invert
def invert_real(f_x, y, x, domain=S.Reals):
"""
Inverts a real-valued function. Same as _invert, but sets
the domain to ``S.Reals`` before inverting.
"""
return _invert(f_x, y, x, domain)
def _invert_real(f, g_ys, symbol):
"""Helper function for _invert."""
if f == symbol:
return (f, g_ys)
n = Dummy('n', real=True)
if hasattr(f, 'inverse') and not isinstance(f, (
TrigonometricFunction,
HyperbolicFunction,
)):
if len(f.args) > 1:
raise ValueError("Only functions with one argument are supported.")
return _invert_real(f.args[0],
imageset(Lambda(n, f.inverse()(n)), g_ys),
symbol)
if isinstance(f, Abs):
return _invert_abs(f.args[0], g_ys, symbol)
if f.is_Add:
# f = g + h
g, h = f.as_independent(symbol)
if g is not S.Zero:
return _invert_real(h, imageset(Lambda(n, n - g), g_ys), symbol)
if f.is_Mul:
# f = g*h
g, h = f.as_independent(symbol)
if g is not S.One:
return _invert_real(h, imageset(Lambda(n, n/g), g_ys), symbol)
if f.is_Pow:
base, expo = f.args
base_has_sym = base.has(symbol)
expo_has_sym = expo.has(symbol)
if not expo_has_sym:
res = imageset(Lambda(n, real_root(n, expo)), g_ys)
if expo.is_rational:
numer, denom = expo.as_numer_denom()
if denom % 2 == 0:
base_positive = solveset(base >= 0, symbol, S.Reals)
res = imageset(Lambda(n, real_root(n, expo)
), g_ys.intersect(
Interval.Ropen(S.Zero, S.Infinity)))
_inv, _set = _invert_real(base, res, symbol)
return (_inv, _set.intersect(base_positive))
elif numer % 2 == 0:
n = Dummy('n')
neg_res = imageset(Lambda(n, -n), res)
return _invert_real(base, res + neg_res, symbol)
else:
return _invert_real(base, res, symbol)
else:
if not base.is_positive:
raise ValueError("x**w where w is irrational is not "
"defined for negative x")
return _invert_real(base, res, symbol)
if not base_has_sym:
rhs = g_ys.args[0]
if base.is_positive:
return _invert_real(expo,
imageset(Lambda(n, log(n, base, evaluate=False)), g_ys), symbol)
elif base.is_negative:
from sympy.core.power import integer_log
s, b = integer_log(rhs, base)
if b:
return _invert_real(expo, FiniteSet(s), symbol)
else:
return _invert_real(expo, S.EmptySet, symbol)
elif base.is_zero:
one = Eq(rhs, 1)
if one == S.true:
# special case: 0**x - 1
return _invert_real(expo, FiniteSet(0), symbol)
elif one == S.false:
return _invert_real(expo, S.EmptySet, symbol)
if isinstance(f, TrigonometricFunction):
if isinstance(g_ys, FiniteSet):
def inv(trig):
if isinstance(f, (sin, csc)):
F = asin if isinstance(f, sin) else acsc
return (lambda a: n*pi + (-1)**n*F(a),)
if isinstance(f, (cos, sec)):
F = acos if isinstance(f, cos) else asec
return (
lambda a: 2*n*pi + F(a),
lambda a: 2*n*pi - F(a),)
if isinstance(f, (tan, cot)):
return (lambda a: n*pi + f.inverse()(a),)
n = Dummy('n', integer=True)
invs = S.EmptySet
for L in inv(f):
invs += Union(*[imageset(Lambda(n, L(g)), S.Integers) for g in g_ys])
return _invert_real(f.args[0], invs, symbol)
return (f, g_ys)
def _invert_complex(f, g_ys, symbol):
"""Helper function for _invert."""
if f == symbol:
return (f, g_ys)
n = Dummy('n')
if f.is_Add:
# f = g + h
g, h = f.as_independent(symbol)
if g is not S.Zero:
return _invert_complex(h, imageset(Lambda(n, n - g), g_ys), symbol)
if f.is_Mul:
# f = g*h
g, h = f.as_independent(symbol)
if g is not S.One:
if g in set([S.NegativeInfinity, S.ComplexInfinity, S.Infinity]):
return (h, S.EmptySet)
return _invert_complex(h, imageset(Lambda(n, n/g), g_ys), symbol)
if hasattr(f, 'inverse') and \
not isinstance(f, TrigonometricFunction) and \
not isinstance(f, HyperbolicFunction) and \
not isinstance(f, exp):
if len(f.args) > 1:
raise ValueError("Only functions with one argument are supported.")
return _invert_complex(f.args[0],
imageset(Lambda(n, f.inverse()(n)), g_ys), symbol)
if isinstance(f, exp):
if isinstance(g_ys, FiniteSet):
exp_invs = Union(*[imageset(Lambda(n, I*(2*n*pi + arg(g_y)) +
log(Abs(g_y))), S.Integers)
for g_y in g_ys if g_y != 0])
return _invert_complex(f.args[0], exp_invs, symbol)
return (f, g_ys)
def _invert_abs(f, g_ys, symbol):
"""Helper function for inverting absolute value functions.
Returns the complete result of inverting an absolute value
function along with the conditions which must also be satisfied.
If it is certain that all these conditions are met, a `FiniteSet`
of all possible solutions is returned. If any condition cannot be
satisfied, an `EmptySet` is returned. Otherwise, a `ConditionSet`
of the solutions, with all the required conditions specified, is
returned.
"""
if not g_ys.is_FiniteSet:
# this could be used for FiniteSet, but the
# results are more compact if they aren't, e.g.
# ConditionSet(x, Contains(n, Interval(0, oo)), {-n, n}) vs
# Union(Intersection(Interval(0, oo), {n}), Intersection(Interval(-oo, 0), {-n}))
# for the solution of abs(x) - n
pos = Intersection(g_ys, Interval(0, S.Infinity))
parg = _invert_real(f, pos, symbol)
narg = _invert_real(-f, pos, symbol)
if parg[0] != narg[0]:
raise NotImplementedError
return parg[0], Union(narg[1], parg[1])
# check conditions: all these must be true. If any are unknown
# then return them as conditions which must be satisfied
unknown = []
for a in g_ys.args:
ok = a.is_nonnegative if a.is_Number else a.is_positive
if ok is None:
unknown.append(a)
elif not ok:
return symbol, S.EmptySet
if unknown:
conditions = And(*[Contains(i, Interval(0, oo))
for i in unknown])
else:
conditions = True
n = Dummy('n', real=True)
# this is slightly different than above: instead of solving
# +/-f on positive values, here we solve for f on +/- g_ys
g_x, values = _invert_real(f, Union(
imageset(Lambda(n, n), g_ys),
imageset(Lambda(n, -n), g_ys)), symbol)
return g_x, ConditionSet(g_x, conditions, values)
def domain_check(f, symbol, p):
"""Returns False if point p is infinite or any subexpression of f
is infinite or becomes so after replacing symbol with p. If none of
these conditions is met then True will be returned.
Examples
========
>>> from sympy import Mul, oo
>>> from sympy.abc import x
>>> from sympy.solvers.solveset import domain_check
>>> g = 1/(1 + (1/(x + 1))**2)
>>> domain_check(g, x, -1)
False
>>> domain_check(x**2, x, 0)
True
>>> domain_check(1/x, x, oo)
False
* The function relies on the assumption that the original form
of the equation has not been changed by automatic simplification.
>>> domain_check(x/x, x, 0) # x/x is automatically simplified to 1
True
* To deal with automatic evaluations use evaluate=False:
>>> domain_check(Mul(x, 1/x, evaluate=False), x, 0)
False
"""
f, p = sympify(f), sympify(p)
if p.is_infinite:
return False
return _domain_check(f, symbol, p)
def _domain_check(f, symbol, p):
# helper for domain check
if f.is_Atom and f.is_finite:
return True
elif f.subs(symbol, p).is_infinite:
return False
else:
return all([_domain_check(g, symbol, p)
for g in f.args])
def _is_finite_with_finite_vars(f, domain=S.Complexes):
"""
Return True if the given expression is finite. For symbols that
don't assign a value for `complex` and/or `real`, the domain will
be used to assign a value; symbols that don't assign a value
for `finite` will be made finite. All other assumptions are
left unmodified.
"""
def assumptions(s):
A = s.assumptions0
A.setdefault('finite', A.get('finite', True))
if domain.is_subset(S.Reals):
# if this gets set it will make complex=True, too
A.setdefault('real', True)
else:
# don't change 'real' because being complex implies
# nothing about being real
A.setdefault('complex', True)
return A
reps = {s: Dummy(**assumptions(s)) for s in f.free_symbols}
return f.xreplace(reps).is_finite
def _is_function_class_equation(func_class, f, symbol):
""" Tests whether the equation is an equation of the given function class.
The given equation belongs to the given function class if it is
comprised of functions of the function class which are multiplied by
or added to expressions independent of the symbol. In addition, the
arguments of all such functions must be linear in the symbol as well.
Examples
========
>>> from sympy.solvers.solveset import _is_function_class_equation
>>> from sympy import tan, sin, tanh, sinh, exp
>>> from sympy.abc import x
>>> from sympy.functions.elementary.trigonometric import (TrigonometricFunction,
... HyperbolicFunction)
>>> _is_function_class_equation(TrigonometricFunction, exp(x) + tan(x), x)
False
>>> _is_function_class_equation(TrigonometricFunction, tan(x) + sin(x), x)
True
>>> _is_function_class_equation(TrigonometricFunction, tan(x**2), x)
False
>>> _is_function_class_equation(TrigonometricFunction, tan(x + 2), x)
True
>>> _is_function_class_equation(HyperbolicFunction, tanh(x) + sinh(x), x)
True
"""
if f.is_Mul or f.is_Add:
return all(_is_function_class_equation(func_class, arg, symbol)
for arg in f.args)
if f.is_Pow:
if not f.exp.has(symbol):
return _is_function_class_equation(func_class, f.base, symbol)
else:
return False
if not f.has(symbol):
return True
if isinstance(f, func_class):
try:
g = Poly(f.args[0], symbol)
return g.degree() <= 1
except PolynomialError:
return False
else:
return False
def _solve_as_rational(f, symbol, domain):
""" solve rational functions"""
f = together(f, deep=True)
g, h = fraction(f)
if not h.has(symbol):
try:
return _solve_as_poly(g, symbol, domain)
except NotImplementedError:
# The polynomial formed from g could end up having
# coefficients in a ring over which finding roots
# isn't implemented yet, e.g. ZZ[a] for some symbol a
return ConditionSet(symbol, Eq(f, 0), domain)
except CoercionFailed:
# contained oo, zoo or nan
return S.EmptySet
else:
valid_solns = _solveset(g, symbol, domain)
invalid_solns = _solveset(h, symbol, domain)
return valid_solns - invalid_solns
class _SolveTrig1Error(Exception):
"""Raised when _solve_trig1 heuristics do not apply"""
def _solve_trig(f, symbol, domain):
"""Function to call other helpers to solve trigonometric equations """
sol = None
try:
sol = _solve_trig1(f, symbol, domain)
except _SolveTrig1Error:
try:
sol = _solve_trig2(f, symbol, domain)
except ValueError:
raise NotImplementedError(filldedent('''
Solution to this kind of trigonometric equations
is yet to be implemented'''))
return sol
def _solve_trig1(f, symbol, domain):
"""Primary solver for trigonometric and hyperbolic equations
Returns either the solution set as a ConditionSet (auto-evaluated to a
union of ImageSets if no variables besides 'symbol' are involved) or
raises _SolveTrig1Error if f == 0 can't be solved.
Notes
=====
Algorithm:
1. Do a change of variable x -> mu*x in arguments to trigonometric and
hyperbolic functions, in order to reduce them to small integers. (This
step is crucial to keep the degrees of the polynomials of step 4 low.)
2. Rewrite trigonometric/hyperbolic functions as exponentials.
3. Proceed to a 2nd change of variable, replacing exp(I*x) or exp(x) by y.
4. Solve the resulting rational equation.
5. Use invert_complex or invert_real to return to the original variable.
6. If the coefficients of 'symbol' were symbolic in nature, add the
necessary consistency conditions in a ConditionSet.
"""
# Prepare change of variable
x = Dummy('x')
if _is_function_class_equation(HyperbolicFunction, f, symbol):
cov = exp(x)
inverter = invert_real if domain.is_subset(S.Reals) else invert_complex
else:
cov = exp(I*x)
inverter = invert_complex
f = trigsimp(f)
f_original = f
trig_functions = f.atoms(TrigonometricFunction, HyperbolicFunction)
trig_arguments = [e.args[0] for e in trig_functions]
# trigsimp may have reduced the equation to an expression
# that is independent of 'symbol' (e.g. cos**2+sin**2)
if not any(a.has(symbol) for a in trig_arguments):
return solveset(f_original, symbol, domain)
denominators = []
numerators = []
for ar in trig_arguments:
try:
poly_ar = Poly(ar, symbol)
except PolynomialError:
raise _SolveTrig1Error("trig argument is not a polynomial")
if poly_ar.degree() > 1: # degree >1 still bad
raise _SolveTrig1Error("degree of variable must not exceed one")
if poly_ar.degree() == 0: # degree 0, don't care
continue
c = poly_ar.all_coeffs()[0] # got the coefficient of 'symbol'
numerators.append(fraction(c)[0])
denominators.append(fraction(c)[1])
mu = lcm(denominators)/gcd(numerators)
f = f.subs(symbol, mu*x)
f = f.rewrite(exp)
f = together(f)
g, h = fraction(f)
y = Dummy('y')
g, h = g.expand(), h.expand()
g, h = g.subs(cov, y), h.subs(cov, y)
if g.has(x) or h.has(x):
raise _SolveTrig1Error("change of variable not possible")
solns = solveset_complex(g, y) - solveset_complex(h, y)
if isinstance(solns, ConditionSet):
raise _SolveTrig1Error("polynomial has ConditionSet solution")
if isinstance(solns, FiniteSet):
if any(isinstance(s, RootOf) for s in solns):
raise _SolveTrig1Error("polynomial results in RootOf object")
# revert the change of variable
cov = cov.subs(x, symbol/mu)
result = Union(*[inverter(cov, s, symbol)[1] for s in solns])
# In case of symbolic coefficients, the solution set is only valid
# if numerator and denominator of mu are non-zero.
if mu.has(Symbol):
syms = (mu).atoms(Symbol)
munum, muden = fraction(mu)
condnum = munum.as_independent(*syms, as_Add=False)[1]
condden = muden.as_independent(*syms, as_Add=False)[1]
cond = And(Ne(condnum, 0), Ne(condden, 0))
else:
cond = True
# Actual conditions are returned as part of the ConditionSet. Adding an
# intersection with C would only complicate some solution sets due to
# current limitations of intersection code. (e.g. #19154)
if domain is S.Complexes:
# This is a slight abuse of ConditionSet. Ideally this should
# be some kind of "PiecewiseSet". (See #19507 discussion)
return ConditionSet(symbol, cond, result)
else:
return ConditionSet(symbol, cond, Intersection(result, domain))
elif solns is S.EmptySet:
return S.EmptySet
else:
raise _SolveTrig1Error("polynomial solutions must form FiniteSet")
def _solve_trig2(f, symbol, domain):
"""Secondary helper to solve trigonometric equations,
called when first helper fails """
from sympy import ilcm, expand_trig, degree
f = trigsimp(f)
f_original = f
trig_functions = f.atoms(sin, cos, tan, sec, cot, csc)
trig_arguments = [e.args[0] for e in trig_functions]
denominators = []
numerators = []
# todo: This solver can be extended to hyperbolics if the
# analogous change of variable to tanh (instead of tan)
# is used.
if not trig_functions:
return ConditionSet(symbol, Eq(f_original, 0), domain)
# todo: The pre-processing below (extraction of numerators, denominators,
# gcd, lcm, mu, etc.) should be updated to the enhanced version in
# _solve_trig1. (See #19507)
for ar in trig_arguments:
try:
poly_ar = Poly(ar, symbol)
except PolynomialError:
raise ValueError("give up, we can't solve if this is not a polynomial in x")
if poly_ar.degree() > 1: # degree >1 still bad
raise ValueError("degree of variable inside polynomial should not exceed one")
if poly_ar.degree() == 0: # degree 0, don't care
continue
c = poly_ar.all_coeffs()[0] # got the coefficient of 'symbol'
try:
numerators.append(Rational(c).p)
denominators.append(Rational(c).q)
except TypeError:
return ConditionSet(symbol, Eq(f_original, 0), domain)
x = Dummy('x')
# ilcm() and igcd() require more than one argument
if len(numerators) > 1:
mu = Rational(2)*ilcm(*denominators)/igcd(*numerators)
else:
assert len(numerators) == 1
mu = Rational(2)*denominators[0]/numerators[0]
f = f.subs(symbol, mu*x)
f = f.rewrite(tan)
f = expand_trig(f)
f = together(f)
g, h = fraction(f)
y = Dummy('y')
g, h = g.expand(), h.expand()
g, h = g.subs(tan(x), y), h.subs(tan(x), y)
if g.has(x) or h.has(x):
return ConditionSet(symbol, Eq(f_original, 0), domain)
solns = solveset(g, y, S.Reals) - solveset(h, y, S.Reals)
if isinstance(solns, FiniteSet):
result = Union(*[invert_real(tan(symbol/mu), s, symbol)[1]
for s in solns])
dsol = invert_real(tan(symbol/mu), oo, symbol)[1]
if degree(h) > degree(g): # If degree(denom)>degree(num) then there
result = Union(result, dsol) # would be another sol at Lim(denom-->oo)
return Intersection(result, domain)
elif solns is S.EmptySet:
return S.EmptySet
else:
return ConditionSet(symbol, Eq(f_original, 0), S.Reals)
def _solve_as_poly(f, symbol, domain=S.Complexes):
"""
Solve the equation using polynomial techniques if it already is a
polynomial equation or, with a change of variables, can be made so.
"""
result = None
if f.is_polynomial(symbol):
solns = roots(f, symbol, cubics=True, quartics=True,
quintics=True, domain='EX')
num_roots = sum(solns.values())
if degree(f, symbol) <= num_roots:
result = FiniteSet(*solns.keys())
else:
poly = Poly(f, symbol)
solns = poly.all_roots()
if poly.degree() <= len(solns):
result = FiniteSet(*solns)
else:
result = ConditionSet(symbol, Eq(f, 0), domain)
else:
poly = Poly(f)
if poly is None:
result = ConditionSet(symbol, Eq(f, 0), domain)
gens = [g for g in poly.gens if g.has(symbol)]
if len(gens) == 1:
poly = Poly(poly, gens[0])
gen = poly.gen
deg = poly.degree()
poly = Poly(poly.as_expr(), poly.gen, composite=True)
poly_solns = FiniteSet(*roots(poly, cubics=True, quartics=True,
quintics=True).keys())
if len(poly_solns) < deg:
result = ConditionSet(symbol, Eq(f, 0), domain)
if gen != symbol:
y = Dummy('y')
inverter = invert_real if domain.is_subset(S.Reals) else invert_complex
lhs, rhs_s = inverter(gen, y, symbol)
if lhs == symbol:
result = Union(*[rhs_s.subs(y, s) for s in poly_solns])
else:
result = ConditionSet(symbol, Eq(f, 0), domain)
else:
result = ConditionSet(symbol, Eq(f, 0), domain)
if result is not None:
if isinstance(result, FiniteSet):
# this is to simplify solutions like -sqrt(-I) to sqrt(2)/2
# - sqrt(2)*I/2. We are not expanding for solution with symbols
# or undefined functions because that makes the solution more complicated.
# For example, expand_complex(a) returns re(a) + I*im(a)
if all([s.atoms(Symbol, AppliedUndef) == set() and not isinstance(s, RootOf)
for s in result]):
s = Dummy('s')
result = imageset(Lambda(s, expand_complex(s)), result)
if isinstance(result, FiniteSet) and domain != S.Complexes:
# Avoid adding gratuitous intersections with S.Complexes. Actual
# conditions should be handled elsewhere.
result = result.intersection(domain)
return result
else:
return ConditionSet(symbol, Eq(f, 0), domain)
def _has_rational_power(expr, symbol):
"""
Returns (bool, den) where bool is True if the term has a
non-integer rational power and den is the denominator of the
expression's exponent.
Examples
========
>>> from sympy.solvers.solveset import _has_rational_power
>>> from sympy import sqrt
>>> from sympy.abc import x
>>> _has_rational_power(sqrt(x), x)
(True, 2)
>>> _has_rational_power(x**2, x)
(False, 1)
"""
a, p, q = Wild('a'), Wild('p'), Wild('q')
pattern_match = expr.match(a*p**q) or {}
if pattern_match.get(a, S.Zero).is_zero:
return (False, S.One)
elif p not in pattern_match.keys():
return (False, S.One)
elif isinstance(pattern_match[q], Rational) \
and pattern_match[p].has(symbol):
if not pattern_match[q].q == S.One:
return (True, pattern_match[q].q)
if not isinstance(pattern_match[a], Pow) \
or isinstance(pattern_match[a], Mul):
return (False, S.One)
else:
return _has_rational_power(pattern_match[a], symbol)
def _solve_radical(f, symbol, solveset_solver):
""" Helper function to solve equations with radicals """
res = unrad(f)
eq, cov = res if res else (f, [])
if not cov:
result = solveset_solver(eq, symbol) - \
Union(*[solveset_solver(g, symbol) for g in denoms(f, symbol)])
else:
y, yeq = cov
if not solveset_solver(y - I, y):
yreal = Dummy('yreal', real=True)
yeq = yeq.xreplace({y: yreal})
eq = eq.xreplace({y: yreal})
y = yreal
g_y_s = solveset_solver(yeq, symbol)
f_y_sols = solveset_solver(eq, y)
result = Union(*[imageset(Lambda(y, g_y), f_y_sols)
for g_y in g_y_s])
if isinstance(result, Complement) or isinstance(result,ConditionSet):
solution_set = result
else:
f_set = [] # solutions for FiniteSet
c_set = [] # solutions for ConditionSet
for s in result:
if checksol(f, symbol, s):
f_set.append(s)
else:
c_set.append(s)
solution_set = FiniteSet(*f_set) + ConditionSet(symbol, Eq(f, 0), FiniteSet(*c_set))
return solution_set
def _solve_abs(f, symbol, domain):
""" Helper function to solve equation involving absolute value function """
if not domain.is_subset(S.Reals):
raise ValueError(filldedent('''
Absolute values cannot be inverted in the
complex domain.'''))
p, q, r = Wild('p'), Wild('q'), Wild('r')
pattern_match = f.match(p*Abs(q) + r) or {}
f_p, f_q, f_r = [pattern_match.get(i, S.Zero) for i in (p, q, r)]
if not (f_p.is_zero or f_q.is_zero):
domain = continuous_domain(f_q, symbol, domain)
q_pos_cond = solve_univariate_inequality(f_q >= 0, symbol,
relational=False, domain=domain, continuous=True)
q_neg_cond = q_pos_cond.complement(domain)
sols_q_pos = solveset_real(f_p*f_q + f_r,
symbol).intersect(q_pos_cond)
sols_q_neg = solveset_real(f_p*(-f_q) + f_r,
symbol).intersect(q_neg_cond)
return Union(sols_q_pos, sols_q_neg)
else:
return ConditionSet(symbol, Eq(f, 0), domain)
def solve_decomposition(f, symbol, domain):
"""
Function to solve equations via the principle of "Decomposition
and Rewriting".
Examples
========
>>> from sympy import exp, sin, Symbol, pprint, S
>>> from sympy.solvers.solveset import solve_decomposition as sd
>>> x = Symbol('x')
>>> f1 = exp(2*x) - 3*exp(x) + 2
>>> sd(f1, x, S.Reals)
FiniteSet(0, log(2))
>>> f2 = sin(x)**2 + 2*sin(x) + 1
>>> pprint(sd(f2, x, S.Reals), use_unicode=False)
3*pi
{2*n*pi + ---- | n in Integers}
2
>>> f3 = sin(x + 2)
>>> pprint(sd(f3, x, S.Reals), use_unicode=False)
{2*n*pi - 2 | n in Integers} U {2*n*pi - 2 + pi | n in Integers}
"""
from sympy.solvers.decompogen import decompogen
from sympy.calculus.util import function_range
# decompose the given function
g_s = decompogen(f, symbol)
# `y_s` represents the set of values for which the function `g` is to be
# solved.
# `solutions` represent the solutions of the equations `g = y_s` or
# `g = 0` depending on the type of `y_s`.
# As we are interested in solving the equation: f = 0
y_s = FiniteSet(0)
for g in g_s:
frange = function_range(g, symbol, domain)
y_s = Intersection(frange, y_s)
result = S.EmptySet
if isinstance(y_s, FiniteSet):
for y in y_s:
solutions = solveset(Eq(g, y), symbol, domain)
if not isinstance(solutions, ConditionSet):
result += solutions
else:
if isinstance(y_s, ImageSet):
iter_iset = (y_s,)
elif isinstance(y_s, Union):
iter_iset = y_s.args
elif y_s is EmptySet:
# y_s is not in the range of g in g_s, so no solution exists
#in the given domain
return EmptySet
for iset in iter_iset:
new_solutions = solveset(Eq(iset.lamda.expr, g), symbol, domain)
dummy_var = tuple(iset.lamda.expr.free_symbols)[0]
(base_set,) = iset.base_sets
if isinstance(new_solutions, FiniteSet):
new_exprs = new_solutions
elif isinstance(new_solutions, Intersection):
if isinstance(new_solutions.args[1], FiniteSet):
new_exprs = new_solutions.args[1]
for new_expr in new_exprs:
result += ImageSet(Lambda(dummy_var, new_expr), base_set)
if result is S.EmptySet:
return ConditionSet(symbol, Eq(f, 0), domain)
y_s = result
return y_s
def _solveset(f, symbol, domain, _check=False):
"""Helper for solveset to return a result from an expression
that has already been sympify'ed and is known to contain the
given symbol."""
# _check controls whether the answer is checked or not
from sympy.simplify.simplify import signsimp
orig_f = f
if f.is_Mul:
coeff, f = f.as_independent(symbol, as_Add=False)
if coeff in set([S.ComplexInfinity, S.NegativeInfinity, S.Infinity]):
f = together(orig_f)
elif f.is_Add:
a, h = f.as_independent(symbol)
m, h = h.as_independent(symbol, as_Add=False)
if m not in set([S.ComplexInfinity, S.Zero, S.Infinity,
S.NegativeInfinity]):
f = a/m + h # XXX condition `m != 0` should be added to soln
# assign the solvers to use
solver = lambda f, x, domain=domain: _solveset(f, x, domain)
inverter = lambda f, rhs, symbol: _invert(f, rhs, symbol, domain)
result = EmptySet
if f.expand().is_zero:
return domain
elif not f.has(symbol):
return EmptySet
elif f.is_Mul and all(_is_finite_with_finite_vars(m, domain)
for m in f.args):
# if f(x) and g(x) are both finite we can say that the solution of
# f(x)*g(x) == 0 is same as Union(f(x) == 0, g(x) == 0) is not true in
# general. g(x) can grow to infinitely large for the values where
# f(x) == 0. To be sure that we are not silently allowing any
# wrong solutions we are using this technique only if both f and g are
# finite for a finite input.
result = Union(*[solver(m, symbol) for m in f.args])
elif _is_function_class_equation(TrigonometricFunction, f, symbol) or \
_is_function_class_equation(HyperbolicFunction, f, symbol):
result = _solve_trig(f, symbol, domain)
elif isinstance(f, arg):
a = f.args[0]
result = solveset_real(a > 0, symbol)
elif f.is_Piecewise:
result = EmptySet
expr_set_pairs = f.as_expr_set_pairs(domain)
for (expr, in_set) in expr_set_pairs:
if in_set.is_Relational:
in_set = in_set.as_set()
solns = solver(expr, symbol, in_set)
result += solns
elif isinstance(f, Eq):
result = solver(Add(f.lhs, - f.rhs, evaluate=False), symbol, domain)
elif f.is_Relational:
if not domain.is_subset(S.Reals):
raise NotImplementedError(filldedent('''
Inequalities in the complex domain are
not supported. Try the real domain by
setting domain=S.Reals'''))
try:
result = solve_univariate_inequality(
f, symbol, domain=domain, relational=False)
except NotImplementedError:
result = ConditionSet(symbol, f, domain)
return result
elif _is_modular(f, symbol):
result = _solve_modular(f, symbol, domain)
else:
lhs, rhs_s = inverter(f, 0, symbol)
if lhs == symbol:
# do some very minimal simplification since
# repeated inversion may have left the result
# in a state that other solvers (e.g. poly)
# would have simplified; this is done here
# rather than in the inverter since here it
# is only done once whereas there it would
# be repeated for each step of the inversion
if isinstance(rhs_s, FiniteSet):
rhs_s = FiniteSet(*[Mul(*
signsimp(i).as_content_primitive())
for i in rhs_s])
result = rhs_s
elif isinstance(rhs_s, FiniteSet):
for equation in [lhs - rhs for rhs in rhs_s]:
if equation == f:
if any(_has_rational_power(g, symbol)[0]
for g in equation.args) or _has_rational_power(
equation, symbol)[0]:
result += _solve_radical(equation,
symbol,
solver)
elif equation.has(Abs):
result += _solve_abs(f, symbol, domain)
else:
result_rational = _solve_as_rational(equation, symbol, domain)
if isinstance(result_rational, ConditionSet):
# may be a transcendental type equation
result += _transolve(equation, symbol, domain)
else:
result += result_rational
else:
result += solver(equation, symbol)
elif rhs_s is not S.EmptySet:
result = ConditionSet(symbol, Eq(f, 0), domain)
if isinstance(result, ConditionSet):
if isinstance(f, Expr):
num, den = f.as_numer_denom()
else:
num, den = f, S.One
if den.has(symbol):
_result = _solveset(num, symbol, domain)
if not isinstance(_result, ConditionSet):
singularities = _solveset(den, symbol, domain)
result = _result - singularities
if _check:
if isinstance(result, ConditionSet):
# it wasn't solved or has enumerated all conditions
# -- leave it alone
return result
# whittle away all but the symbol-containing core
# to use this for testing
if isinstance(orig_f, Expr):
fx = orig_f.as_independent(symbol, as_Add=True)[1]
fx = fx.as_independent(symbol, as_Add=False)[1]
else:
fx = orig_f
if isinstance(result, FiniteSet):
# check the result for invalid solutions
result = FiniteSet(*[s for s in result
if isinstance(s, RootOf)
or domain_check(fx, symbol, s)])
return result
def _is_modular(f, symbol):
"""
Helper function to check below mentioned types of modular equations.
``A - Mod(B, C) = 0``
A -> This can or cannot be a function of symbol.
B -> This is surely a function of symbol.
C -> It is an integer.
Parameters
==========
f : Expr
The equation to be checked.
symbol : Symbol
The concerned variable for which the equation is to be checked.
Examples
========
>>> from sympy import symbols, exp, Mod
>>> from sympy.solvers.solveset import _is_modular as check
>>> x, y = symbols('x y')
>>> check(Mod(x, 3) - 1, x)
True
>>> check(Mod(x, 3) - 1, y)
False
>>> check(Mod(x, 3)**2 - 5, x)
False
>>> check(Mod(x, 3)**2 - y, x)
False
>>> check(exp(Mod(x, 3)) - 1, x)
False
>>> check(Mod(3, y) - 1, y)
False
"""
if not f.has(Mod):
return False
# extract modterms from f.
modterms = list(f.atoms(Mod))
return (len(modterms) == 1 and # only one Mod should be present
modterms[0].args[0].has(symbol) and # B-> function of symbol
modterms[0].args[1].is_integer and # C-> to be an integer.
any(isinstance(term, Mod)
for term in list(_term_factors(f))) # free from other funcs
)
def _invert_modular(modterm, rhs, n, symbol):
"""
Helper function to invert modular equation.
``Mod(a, m) - rhs = 0``
Generally it is inverted as (a, ImageSet(Lambda(n, m*n + rhs), S.Integers)).
More simplified form will be returned if possible.
If it is not invertible then (modterm, rhs) is returned.
The following cases arise while inverting equation ``Mod(a, m) - rhs = 0``:
1. If a is symbol then m*n + rhs is the required solution.
2. If a is an instance of ``Add`` then we try to find two symbol independent
parts of a and the symbol independent part gets tranferred to the other
side and again the ``_invert_modular`` is called on the symbol
dependent part.
3. If a is an instance of ``Mul`` then same as we done in ``Add`` we separate
out the symbol dependent and symbol independent parts and transfer the
symbol independent part to the rhs with the help of invert and again the
``_invert_modular`` is called on the symbol dependent part.
4. If a is an instance of ``Pow`` then two cases arise as following:
- If a is of type (symbol_indep)**(symbol_dep) then the remainder is
evaluated with the help of discrete_log function and then the least
period is being found out with the help of totient function.
period*n + remainder is the required solution in this case.
For reference: (https://en.wikipedia.org/wiki/Euler's_theorem)
- If a is of type (symbol_dep)**(symbol_indep) then we try to find all
primitive solutions list with the help of nthroot_mod function.
m*n + rem is the general solution where rem belongs to solutions list
from nthroot_mod function.
Parameters
==========
modterm, rhs : Expr
The modular equation to be inverted, ``modterm - rhs = 0``
symbol : Symbol
The variable in the equation to be inverted.
n : Dummy
Dummy variable for output g_n.
Returns
=======
A tuple (f_x, g_n) is being returned where f_x is modular independent function
of symbol and g_n being set of values f_x can have.
Examples
========
>>> from sympy import symbols, exp, Mod, Dummy, S
>>> from sympy.solvers.solveset import _invert_modular as invert_modular
>>> x, y = symbols('x y')
>>> n = Dummy('n')
>>> invert_modular(Mod(exp(x), 7), S(5), n, x)
(Mod(exp(x), 7), 5)
>>> invert_modular(Mod(x, 7), S(5), n, x)
(x, ImageSet(Lambda(_n, 7*_n + 5), Integers))
>>> invert_modular(Mod(3*x + 8, 7), S(5), n, x)
(x, ImageSet(Lambda(_n, 7*_n + 6), Integers))
>>> invert_modular(Mod(x**4, 7), S(5), n, x)
(x, EmptySet)
>>> invert_modular(Mod(2**(x**2 + x + 1), 7), S(2), n, x)
(x**2 + x + 1, ImageSet(Lambda(_n, 3*_n + 1), Naturals0))
"""
a, m = modterm.args
if rhs.is_real is False or any(term.is_real is False
for term in list(_term_factors(a))):
# Check for complex arguments
return modterm, rhs
if abs(rhs) >= abs(m):
# if rhs has value greater than value of m.
return symbol, EmptySet
if a == symbol:
return symbol, ImageSet(Lambda(n, m*n + rhs), S.Integers)
if a.is_Add:
# g + h = a
g, h = a.as_independent(symbol)
if g is not S.Zero:
x_indep_term = rhs - Mod(g, m)
return _invert_modular(Mod(h, m), Mod(x_indep_term, m), n, symbol)
if a.is_Mul:
# g*h = a
g, h = a.as_independent(symbol)
if g is not S.One:
x_indep_term = rhs*invert(g, m)
return _invert_modular(Mod(h, m), Mod(x_indep_term, m), n, symbol)
if a.is_Pow:
# base**expo = a
base, expo = a.args
if expo.has(symbol) and not base.has(symbol):
# remainder -> solution independent of n of equation.
# m, rhs are made coprime by dividing igcd(m, rhs)
try:
remainder = discrete_log(m / igcd(m, rhs), rhs, a.base)
except ValueError: # log does not exist
return modterm, rhs
# period -> coefficient of n in the solution and also referred as
# the least period of expo in which it is repeats itself.
# (a**(totient(m)) - 1) divides m. Here is link of theorem:
# (https://en.wikipedia.org/wiki/Euler's_theorem)
period = totient(m)
for p in divisors(period):
# there might a lesser period exist than totient(m).
if pow(a.base, p, m / igcd(m, a.base)) == 1:
period = p
break
# recursion is not applied here since _invert_modular is currently
# not smart enough to handle infinite rhs as here expo has infinite
# rhs = ImageSet(Lambda(n, period*n + remainder), S.Naturals0).
return expo, ImageSet(Lambda(n, period*n + remainder), S.Naturals0)
elif base.has(symbol) and not expo.has(symbol):
try:
remainder_list = nthroot_mod(rhs, expo, m, all_roots=True)
if remainder_list == []:
return symbol, EmptySet
except (ValueError, NotImplementedError):
return modterm, rhs
g_n = EmptySet
for rem in remainder_list:
g_n += ImageSet(Lambda(n, m*n + rem), S.Integers)
return base, g_n
return modterm, rhs
def _solve_modular(f, symbol, domain):
r"""
Helper function for solving modular equations of type ``A - Mod(B, C) = 0``,
where A can or cannot be a function of symbol, B is surely a function of
symbol and C is an integer.
Currently ``_solve_modular`` is only able to solve cases
where A is not a function of symbol.
Parameters
==========
f : Expr
The modular equation to be solved, ``f = 0``
symbol : Symbol
The variable in the equation to be solved.
domain : Set
A set over which the equation is solved. It has to be a subset of
Integers.
Returns
=======
A set of integer solutions satisfying the given modular equation.
A ``ConditionSet`` if the equation is unsolvable.
Examples
========
>>> from sympy.solvers.solveset import _solve_modular as solve_modulo
>>> from sympy import S, Symbol, sin, Intersection, Interval
>>> from sympy.core.mod import Mod
>>> x = Symbol('x')
>>> solve_modulo(Mod(5*x - 8, 7) - 3, x, S.Integers)
ImageSet(Lambda(_n, 7*_n + 5), Integers)
>>> solve_modulo(Mod(5*x - 8, 7) - 3, x, S.Reals) # domain should be subset of integers.
ConditionSet(x, Eq(Mod(5*x + 6, 7) - 3, 0), Reals)
>>> solve_modulo(-7 + Mod(x, 5), x, S.Integers)
EmptySet
>>> solve_modulo(Mod(12**x, 21) - 18, x, S.Integers)
ImageSet(Lambda(_n, 6*_n + 2), Naturals0)
>>> solve_modulo(Mod(sin(x), 7) - 3, x, S.Integers) # not solvable
ConditionSet(x, Eq(Mod(sin(x), 7) - 3, 0), Integers)
>>> solve_modulo(3 - Mod(x, 5), x, Intersection(S.Integers, Interval(0, 100)))
Intersection(ImageSet(Lambda(_n, 5*_n + 3), Integers), Range(0, 101, 1))
"""
# extract modterm and g_y from f
unsolved_result = ConditionSet(symbol, Eq(f, 0), domain)
modterm = list(f.atoms(Mod))[0]
rhs = -S.One*(f.subs(modterm, S.Zero))
if f.as_coefficients_dict()[modterm].is_negative:
# checks if coefficient of modterm is negative in main equation.
rhs *= -S.One
if not domain.is_subset(S.Integers):
return unsolved_result
if rhs.has(symbol):
# TODO Case: A-> function of symbol, can be extended here
# in future.
return unsolved_result
n = Dummy('n', integer=True)
f_x, g_n = _invert_modular(modterm, rhs, n, symbol)
if f_x == modterm and g_n == rhs:
return unsolved_result
if f_x == symbol:
if domain is not S.Integers:
return domain.intersect(g_n)
return g_n
if isinstance(g_n, ImageSet):
lamda_expr = g_n.lamda.expr
lamda_vars = g_n.lamda.variables
base_sets = g_n.base_sets
sol_set = _solveset(f_x - lamda_expr, symbol, S.Integers)
if isinstance(sol_set, FiniteSet):
tmp_sol = EmptySet
for sol in sol_set:
tmp_sol += ImageSet(Lambda(lamda_vars, sol), *base_sets)
sol_set = tmp_sol
else:
sol_set = ImageSet(Lambda(lamda_vars, sol_set), *base_sets)
return domain.intersect(sol_set)
return unsolved_result
def _term_factors(f):
"""
Iterator to get the factors of all terms present
in the given equation.
Parameters
==========
f : Expr
Equation that needs to be addressed
Returns
=======
Factors of all terms present in the equation.
Examples
========
>>> from sympy import symbols
>>> from sympy.solvers.solveset import _term_factors
>>> x = symbols('x')
>>> list(_term_factors(-2 - x**2 + x*(x + 1)))
[-2, -1, x**2, x, x + 1]
"""
for add_arg in Add.make_args(f):
for mul_arg in Mul.make_args(add_arg):
yield mul_arg
def _solve_exponential(lhs, rhs, symbol, domain):
r"""
Helper function for solving (supported) exponential equations.
Exponential equations are the sum of (currently) at most
two terms with one or both of them having a power with a
symbol-dependent exponent.
For example
.. math:: 5^{2x + 3} - 5^{3x - 1}
.. math:: 4^{5 - 9x} - e^{2 - x}
Parameters
==========
lhs, rhs : Expr
The exponential equation to be solved, `lhs = rhs`
symbol : Symbol
The variable in which the equation is solved
domain : Set
A set over which the equation is solved.
Returns
=======
A set of solutions satisfying the given equation.
A ``ConditionSet`` if the equation is unsolvable or
if the assumptions are not properly defined, in that case
a different style of ``ConditionSet`` is returned having the
solution(s) of the equation with the desired assumptions.
Examples
========
>>> from sympy.solvers.solveset import _solve_exponential as solve_expo
>>> from sympy import symbols, S
>>> x = symbols('x', real=True)
>>> a, b = symbols('a b')
>>> solve_expo(2**x + 3**x - 5**x, 0, x, S.Reals) # not solvable
ConditionSet(x, Eq(2**x + 3**x - 5**x, 0), Reals)
>>> solve_expo(a**x - b**x, 0, x, S.Reals) # solvable but incorrect assumptions
ConditionSet(x, (a > 0) & (b > 0), FiniteSet(0))
>>> solve_expo(3**(2*x) - 2**(x + 3), 0, x, S.Reals)
FiniteSet(-3*log(2)/(-2*log(3) + log(2)))
>>> solve_expo(2**x - 4**x, 0, x, S.Reals)
FiniteSet(0)
* Proof of correctness of the method
The logarithm function is the inverse of the exponential function.
The defining relation between exponentiation and logarithm is:
.. math:: {\log_b x} = y \enspace if \enspace b^y = x
Therefore if we are given an equation with exponent terms, we can
convert every term to its corresponding logarithmic form. This is
achieved by taking logarithms and expanding the equation using
logarithmic identities so that it can easily be handled by ``solveset``.
For example:
.. math:: 3^{2x} = 2^{x + 3}
Taking log both sides will reduce the equation to
.. math:: (2x)\log(3) = (x + 3)\log(2)
This form can be easily handed by ``solveset``.
"""
unsolved_result = ConditionSet(symbol, Eq(lhs - rhs, 0), domain)
newlhs = powdenest(lhs)
if lhs != newlhs:
# it may also be advantageous to factor the new expr
return _solveset(factor(newlhs - rhs), symbol, domain) # try again with _solveset
if not (isinstance(lhs, Add) and len(lhs.args) == 2):
# solving for the sum of more than two powers is possible
# but not yet implemented
return unsolved_result
if rhs != 0:
return unsolved_result
a, b = list(ordered(lhs.args))
a_term = a.as_independent(symbol)[1]
b_term = b.as_independent(symbol)[1]
a_base, a_exp = a_term.base, a_term.exp
b_base, b_exp = b_term.base, b_term.exp
from sympy.functions.elementary.complexes import im
if domain.is_subset(S.Reals):
conditions = And(
a_base > 0,
b_base > 0,
Eq(im(a_exp), 0),
Eq(im(b_exp), 0))
else:
conditions = And(
Ne(a_base, 0),
Ne(b_base, 0))
L, R = map(lambda i: expand_log(log(i), force=True), (a, -b))
solutions = _solveset(L - R, symbol, domain)
return ConditionSet(symbol, conditions, solutions)
def _is_exponential(f, symbol):
r"""
Return ``True`` if one or more terms contain ``symbol`` only in
exponents, else ``False``.
Parameters
==========
f : Expr
The equation to be checked
symbol : Symbol
The variable in which the equation is checked
Examples
========
>>> from sympy import symbols, cos, exp
>>> from sympy.solvers.solveset import _is_exponential as check
>>> x, y = symbols('x y')
>>> check(y, y)
False
>>> check(x**y - 1, y)
True
>>> check(x**y*2**y - 1, y)
True
>>> check(exp(x + 3) + 3**x, x)
True
>>> check(cos(2**x), x)
False
* Philosophy behind the helper
The function extracts each term of the equation and checks if it is
of exponential form w.r.t ``symbol``.
"""
rv = False
for expr_arg in _term_factors(f):
if symbol not in expr_arg.free_symbols:
continue
if (isinstance(expr_arg, Pow) and
symbol not in expr_arg.base.free_symbols or
isinstance(expr_arg, exp)):
rv = True # symbol in exponent
else:
return False # dependent on symbol in non-exponential way
return rv
def _solve_logarithm(lhs, rhs, symbol, domain):
r"""
Helper to solve logarithmic equations which are reducible
to a single instance of `\log`.
Logarithmic equations are (currently) the equations that contains
`\log` terms which can be reduced to a single `\log` term or
a constant using various logarithmic identities.
For example:
.. math:: \log(x) + \log(x - 4)
can be reduced to:
.. math:: \log(x(x - 4))
Parameters
==========
lhs, rhs : Expr
The logarithmic equation to be solved, `lhs = rhs`
symbol : Symbol
The variable in which the equation is solved
domain : Set
A set over which the equation is solved.
Returns
=======
A set of solutions satisfying the given equation.
A ``ConditionSet`` if the equation is unsolvable.
Examples
========
>>> from sympy import symbols, log, S
>>> from sympy.solvers.solveset import _solve_logarithm as solve_log
>>> x = symbols('x')
>>> f = log(x - 3) + log(x + 3)
>>> solve_log(f, 0, x, S.Reals)
FiniteSet(sqrt(10), -sqrt(10))
* Proof of correctness
A logarithm is another way to write exponent and is defined by
.. math:: {\log_b x} = y \enspace if \enspace b^y = x
When one side of the equation contains a single logarithm, the
equation can be solved by rewriting the equation as an equivalent
exponential equation as defined above. But if one side contains
more than one logarithm, we need to use the properties of logarithm
to condense it into a single logarithm.
Take for example
.. math:: \log(2x) - 15 = 0
contains single logarithm, therefore we can directly rewrite it to
exponential form as
.. math:: x = \frac{e^{15}}{2}
But if the equation has more than one logarithm as
.. math:: \log(x - 3) + \log(x + 3) = 0
we use logarithmic identities to convert it into a reduced form
Using,
.. math:: \log(a) + \log(b) = \log(ab)
the equation becomes,
.. math:: \log((x - 3)(x + 3))
This equation contains one logarithm and can be solved by rewriting
to exponents.
"""
new_lhs = logcombine(lhs, force=True)
new_f = new_lhs - rhs
return _solveset(new_f, symbol, domain)
def _is_logarithmic(f, symbol):
r"""
Return ``True`` if the equation is in the form
`a\log(f(x)) + b\log(g(x)) + ... + c` else ``False``.
Parameters
==========
f : Expr
The equation to be checked
symbol : Symbol
The variable in which the equation is checked
Returns
=======
``True`` if the equation is logarithmic otherwise ``False``.
Examples
========
>>> from sympy import symbols, tan, log
>>> from sympy.solvers.solveset import _is_logarithmic as check
>>> x, y = symbols('x y')
>>> check(log(x + 2) - log(x + 3), x)
True
>>> check(tan(log(2*x)), x)
False
>>> check(x*log(x), x)
False
>>> check(x + log(x), x)
False
>>> check(y + log(x), x)
True
* Philosophy behind the helper
The function extracts each term and checks whether it is
logarithmic w.r.t ``symbol``.
"""
rv = False
for term in Add.make_args(f):
saw_log = False
for term_arg in Mul.make_args(term):
if symbol not in term_arg.free_symbols:
continue
if isinstance(term_arg, log):
if saw_log:
return False # more than one log in term
saw_log = True
else:
return False # dependent on symbol in non-log way
if saw_log:
rv = True
return rv
def _transolve(f, symbol, domain):
r"""
Function to solve transcendental equations. It is a helper to
``solveset`` and should be used internally. ``_transolve``
currently supports the following class of equations:
- Exponential equations
- Logarithmic equations
Parameters
==========
f : Any transcendental equation that needs to be solved.
This needs to be an expression, which is assumed
to be equal to ``0``.
symbol : The variable for which the equation is solved.
This needs to be of class ``Symbol``.
domain : A set over which the equation is solved.
This needs to be of class ``Set``.
Returns
=======
Set
A set of values for ``symbol`` for which ``f`` is equal to
zero. An ``EmptySet`` is returned if ``f`` does not have solutions
in respective domain. A ``ConditionSet`` is returned as unsolved
object if algorithms to evaluate complete solution are not
yet implemented.
How to use ``_transolve``
=========================
``_transolve`` should not be used as an independent function, because
it assumes that the equation (``f``) and the ``symbol`` comes from
``solveset`` and might have undergone a few modification(s).
To use ``_transolve`` as an independent function the equation (``f``)
and the ``symbol`` should be passed as they would have been by
``solveset``.
Examples
========
>>> from sympy.solvers.solveset import _transolve as transolve
>>> from sympy.solvers.solvers import _tsolve as tsolve
>>> from sympy import symbols, S, pprint
>>> x = symbols('x', real=True) # assumption added
>>> transolve(5**(x - 3) - 3**(2*x + 1), x, S.Reals)
FiniteSet(-(log(3) + 3*log(5))/(-log(5) + 2*log(3)))
How ``_transolve`` works
========================
``_transolve`` uses two types of helper functions to solve equations
of a particular class:
Identifying helpers: To determine whether a given equation
belongs to a certain class of equation or not. Returns either
``True`` or ``False``.
Solving helpers: Once an equation is identified, a corresponding
helper either solves the equation or returns a form of the equation
that ``solveset`` might better be able to handle.
* Philosophy behind the module
The purpose of ``_transolve`` is to take equations which are not
already polynomial in their generator(s) and to either recast them
as such through a valid transformation or to solve them outright.
A pair of helper functions for each class of supported
transcendental functions are employed for this purpose. One
identifies the transcendental form of an equation and the other
either solves it or recasts it into a tractable form that can be
solved by ``solveset``.
For example, an equation in the form `ab^{f(x)} - cd^{g(x)} = 0`
can be transformed to
`\log(a) + f(x)\log(b) - \log(c) - g(x)\log(d) = 0`
(under certain assumptions) and this can be solved with ``solveset``
if `f(x)` and `g(x)` are in polynomial form.
How ``_transolve`` is better than ``_tsolve``
=============================================
1) Better output
``_transolve`` provides expressions in a more simplified form.
Consider a simple exponential equation
>>> f = 3**(2*x) - 2**(x + 3)
>>> pprint(transolve(f, x, S.Reals), use_unicode=False)
-3*log(2)
{------------------}
-2*log(3) + log(2)
>>> pprint(tsolve(f, x), use_unicode=False)
/ 3 \
| --------|
| log(2/9)|
[-log\2 /]
2) Extensible
The API of ``_transolve`` is designed such that it is easily
extensible, i.e. the code that solves a given class of
equations is encapsulated in a helper and not mixed in with
the code of ``_transolve`` itself.
3) Modular
``_transolve`` is designed to be modular i.e, for every class of
equation a separate helper for identification and solving is
implemented. This makes it easy to change or modify any of the
method implemented directly in the helpers without interfering
with the actual structure of the API.
4) Faster Computation
Solving equation via ``_transolve`` is much faster as compared to
``_tsolve``. In ``solve``, attempts are made computing every possibility
to get the solutions. This series of attempts makes solving a bit
slow. In ``_transolve``, computation begins only after a particular
type of equation is identified.
How to add new class of equations
=================================
Adding a new class of equation solver is a three-step procedure:
- Identify the type of the equations
Determine the type of the class of equations to which they belong:
it could be of ``Add``, ``Pow``, etc. types. Separate internal functions
are used for each type. Write identification and solving helpers
and use them from within the routine for the given type of equation
(after adding it, if necessary). Something like:
.. code-block:: python
def add_type(lhs, rhs, x):
....
if _is_exponential(lhs, x):
new_eq = _solve_exponential(lhs, rhs, x)
....
rhs, lhs = eq.as_independent(x)
if lhs.is_Add:
result = add_type(lhs, rhs, x)
- Define the identification helper.
- Define the solving helper.
Apart from this, a few other things needs to be taken care while
adding an equation solver:
- Naming conventions:
Name of the identification helper should be as
``_is_class`` where class will be the name or abbreviation
of the class of equation. The solving helper will be named as
``_solve_class``.
For example: for exponential equations it becomes
``_is_exponential`` and ``_solve_expo``.
- The identifying helpers should take two input parameters,
the equation to be checked and the variable for which a solution
is being sought, while solving helpers would require an additional
domain parameter.
- Be sure to consider corner cases.
- Add tests for each helper.
- Add a docstring to your helper that describes the method
implemented.
The documentation of the helpers should identify:
- the purpose of the helper,
- the method used to identify and solve the equation,
- a proof of correctness
- the return values of the helpers
"""
def add_type(lhs, rhs, symbol, domain):
"""
Helper for ``_transolve`` to handle equations of
``Add`` type, i.e. equations taking the form as
``a*f(x) + b*g(x) + .... = c``.
For example: 4**x + 8**x = 0
"""
result = ConditionSet(symbol, Eq(lhs - rhs, 0), domain)
# check if it is exponential type equation
if _is_exponential(lhs, symbol):
result = _solve_exponential(lhs, rhs, symbol, domain)
# check if it is logarithmic type equation
elif _is_logarithmic(lhs, symbol):
result = _solve_logarithm(lhs, rhs, symbol, domain)
return result
result = ConditionSet(symbol, Eq(f, 0), domain)
# invert_complex handles the call to the desired inverter based
# on the domain specified.
lhs, rhs_s = invert_complex(f, 0, symbol, domain)
if isinstance(rhs_s, FiniteSet):
assert (len(rhs_s.args)) == 1
rhs = rhs_s.args[0]
if lhs.is_Add:
result = add_type(lhs, rhs, symbol, domain)
else:
result = rhs_s
return result
def solveset(f, symbol=None, domain=S.Complexes):
r"""Solves a given inequality or equation with set as output
Parameters
==========
f : Expr or a relational.
The target equation or inequality
symbol : Symbol
The variable for which the equation is solved
domain : Set
The domain over which the equation is solved
Returns
=======
Set
A set of values for `symbol` for which `f` is True or is equal to
zero. An `EmptySet` is returned if `f` is False or nonzero.
A `ConditionSet` is returned as unsolved object if algorithms
to evaluate complete solution are not yet implemented.
`solveset` claims to be complete in the solution set that it returns.
Raises
======
NotImplementedError
The algorithms to solve inequalities in complex domain are
not yet implemented.
ValueError
The input is not valid.
RuntimeError
It is a bug, please report to the github issue tracker.
Notes
=====
Python interprets 0 and 1 as False and True, respectively, but
in this function they refer to solutions of an expression. So 0 and 1
return the Domain and EmptySet, respectively, while True and False
return the opposite (as they are assumed to be solutions of relational
expressions).
See Also
========
solveset_real: solver for real domain
solveset_complex: solver for complex domain
Examples
========
>>> from sympy import exp, sin, Symbol, pprint, S, Eq
>>> from sympy.solvers.solveset import solveset, solveset_real
* The default domain is complex. Not specifying a domain will lead
to the solving of the equation in the complex domain (and this
is not affected by the assumptions on the symbol):
>>> x = Symbol('x')
>>> pprint(solveset(exp(x) - 1, x), use_unicode=False)
{2*n*I*pi | n in Integers}
>>> x = Symbol('x', real=True)
>>> pprint(solveset(exp(x) - 1, x), use_unicode=False)
{2*n*I*pi | n in Integers}
* If you want to use `solveset` to solve the equation in the
real domain, provide a real domain. (Using ``solveset_real``
does this automatically.)
>>> R = S.Reals
>>> x = Symbol('x')
>>> solveset(exp(x) - 1, x, R)
FiniteSet(0)
>>> solveset_real(exp(x) - 1, x)
FiniteSet(0)
The solution is unaffected by assumptions on the symbol:
>>> p = Symbol('p', positive=True)
>>> pprint(solveset(p**2 - 4))
{-2, 2}
When a conditionSet is returned, symbols with assumptions that
would alter the set are replaced with more generic symbols:
>>> i = Symbol('i', imaginary=True)
>>> solveset(Eq(i**2 + i*sin(i), 1), i, domain=S.Reals)
ConditionSet(_R, Eq(_R**2 + _R*sin(_R) - 1, 0), Reals)
* Inequalities can be solved over the real domain only. Use of a complex
domain leads to a NotImplementedError.
>>> solveset(exp(x) > 1, x, R)
Interval.open(0, oo)
"""
f = sympify(f)
symbol = sympify(symbol)
if f is S.true:
return domain
if f is S.false:
return S.EmptySet
if not isinstance(f, (Expr, Relational, Number)):
raise ValueError("%s is not a valid SymPy expression" % f)
if not isinstance(symbol, (Expr, Relational)) and symbol is not None:
raise ValueError("%s is not a valid SymPy symbol" % symbol)
if not isinstance(domain, Set):
raise ValueError("%s is not a valid domain" %(domain))
free_symbols = f.free_symbols
if symbol is None and not free_symbols:
b = Eq(f, 0)
if b is S.true:
return domain
elif b is S.false:
return S.EmptySet
else:
raise NotImplementedError(filldedent('''
relationship between value and 0 is unknown: %s''' % b))
if symbol is None:
if len(free_symbols) == 1:
symbol = free_symbols.pop()
elif free_symbols:
raise ValueError(filldedent('''
The independent variable must be specified for a
multivariate equation.'''))
elif not isinstance(symbol, Symbol):
f, s, swap = recast_to_symbols([f], [symbol])
# the xreplace will be needed if a ConditionSet is returned
return solveset(f[0], s[0], domain).xreplace(swap)
# solveset should ignore assumptions on symbols
if symbol not in _rc:
x = _rc[0] if domain.is_subset(S.Reals) else _rc[1]
rv = solveset(f.xreplace({symbol: x}), x, domain)
# try to use the original symbol if possible
try:
_rv = rv.xreplace({x: symbol})
except TypeError:
_rv = rv
if rv.dummy_eq(_rv):
rv = _rv
return rv
# Abs has its own handling method which avoids the
# rewriting property that the first piece of abs(x)
# is for x >= 0 and the 2nd piece for x < 0 -- solutions
# can look better if the 2nd condition is x <= 0. Since
# the solution is a set, duplication of results is not
# an issue, e.g. {y, -y} when y is 0 will be {0}
f, mask = _masked(f, Abs)
f = f.rewrite(Piecewise) # everything that's not an Abs
for d, e in mask:
# everything *in* an Abs
e = e.func(e.args[0].rewrite(Piecewise))
f = f.xreplace({d: e})
f = piecewise_fold(f)
return _solveset(f, symbol, domain, _check=True)
def solveset_real(f, symbol):
return solveset(f, symbol, S.Reals)
def solveset_complex(f, symbol):
return solveset(f, symbol, S.Complexes)
def _solveset_multi(eqs, syms, domains):
'''Basic implementation of a multivariate solveset.
For internal use (not ready for public consumption)'''
rep = {}
for sym, dom in zip(syms, domains):
if dom is S.Reals:
rep[sym] = Symbol(sym.name, real=True)
eqs = [eq.subs(rep) for eq in eqs]
syms = [sym.subs(rep) for sym in syms]
syms = tuple(syms)
if len(eqs) == 0:
return ProductSet(*domains)
if len(syms) == 1:
sym = syms[0]
domain = domains[0]
solsets = [solveset(eq, sym, domain) for eq in eqs]
solset = Intersection(*solsets)
return ImageSet(Lambda((sym,), (sym,)), solset).doit()
eqs = sorted(eqs, key=lambda eq: len(eq.free_symbols & set(syms)))
for n in range(len(eqs)):
sols = []
all_handled = True
for sym in syms:
if sym not in eqs[n].free_symbols:
continue
sol = solveset(eqs[n], sym, domains[syms.index(sym)])
if isinstance(sol, FiniteSet):
i = syms.index(sym)
symsp = syms[:i] + syms[i+1:]
domainsp = domains[:i] + domains[i+1:]
eqsp = eqs[:n] + eqs[n+1:]
for s in sol:
eqsp_sub = [eq.subs(sym, s) for eq in eqsp]
sol_others = _solveset_multi(eqsp_sub, symsp, domainsp)
fun = Lambda((symsp,), symsp[:i] + (s,) + symsp[i:])
sols.append(ImageSet(fun, sol_others).doit())
else:
all_handled = False
if all_handled:
return Union(*sols)
def solvify(f, symbol, domain):
"""Solves an equation using solveset and returns the solution in accordance
with the `solve` output API.
Returns
=======
We classify the output based on the type of solution returned by `solveset`.
Solution | Output
----------------------------------------
FiniteSet | list
ImageSet, | list (if `f` is periodic)
Union |
EmptySet | empty list
Others | None
Raises
======
NotImplementedError
A ConditionSet is the input.
Examples
========
>>> from sympy.solvers.solveset import solvify
>>> from sympy.abc import x
>>> from sympy import S, tan, sin, exp
>>> solvify(x**2 - 9, x, S.Reals)
[-3, 3]
>>> solvify(sin(x) - 1, x, S.Reals)
[pi/2]
>>> solvify(tan(x), x, S.Reals)
[0]
>>> solvify(exp(x) - 1, x, S.Complexes)
>>> solvify(exp(x) - 1, x, S.Reals)
[0]
"""
solution_set = solveset(f, symbol, domain)
result = None
if solution_set is S.EmptySet:
result = []
elif isinstance(solution_set, ConditionSet):
raise NotImplementedError('solveset is unable to solve this equation.')
elif isinstance(solution_set, FiniteSet):
result = list(solution_set)
else:
period = periodicity(f, symbol)
if period is not None:
solutions = S.EmptySet
iter_solutions = ()
if isinstance(solution_set, ImageSet):
iter_solutions = (solution_set,)
elif isinstance(solution_set, Union):
if all(isinstance(i, ImageSet) for i in solution_set.args):
iter_solutions = solution_set.args
for solution in iter_solutions:
solutions += solution.intersect(Interval(0, period, False, True))
if isinstance(solutions, FiniteSet):
result = list(solutions)
else:
solution = solution_set.intersect(domain)
if isinstance(solution, FiniteSet):
result += solution
return result
###############################################################################
################################ LINSOLVE #####################################
###############################################################################
def linear_coeffs(eq, *syms, **_kw):
"""Return a list whose elements are the coefficients of the
corresponding symbols in the sum of terms in ``eq``.
The additive constant is returned as the last element of the
list.
Raises
======
NonlinearError
The equation contains a nonlinear term
Examples
========
>>> from sympy.solvers.solveset import linear_coeffs
>>> from sympy.abc import x, y, z
>>> linear_coeffs(3*x + 2*y - 1, x, y)
[3, 2, -1]
It is not necessary to expand the expression:
>>> linear_coeffs(x + y*(z*(x*3 + 2) + 3), x)
[3*y*z + 1, y*(2*z + 3)]
But if there are nonlinear or cross terms -- even if they would
cancel after simplification -- an error is raised so the situation
does not pass silently past the caller's attention:
>>> eq = 1/x*(x - 1) + 1/x
>>> linear_coeffs(eq.expand(), x)
[0, 1]
>>> linear_coeffs(eq, x)
Traceback (most recent call last):
...
NonlinearError: nonlinear term encountered: 1/x
>>> linear_coeffs(x*(y + 1) - x*y, x, y)
Traceback (most recent call last):
...
NonlinearError: nonlinear term encountered: x*(y + 1)
"""
d = defaultdict(list)
eq = _sympify(eq)
if not eq.has(*syms):
return [S.Zero]*len(syms) + [eq]
c, terms = eq.as_coeff_add(*syms)
d[0].extend(Add.make_args(c))
for t in terms:
m, f = t.as_coeff_mul(*syms)
if len(f) != 1:
break
f = f[0]
if f in syms:
d[f].append(m)
elif f.is_Add:
d1 = linear_coeffs(f, *syms, **{'dict': True})
d[0].append(m*d1.pop(0))
for xf, vf in d1.items():
d[xf].append(m*vf)
else:
break
else:
for k, v in d.items():
d[k] = Add(*v)
if not _kw:
return [d.get(s, S.Zero) for s in syms] + [d[0]]
return d # default is still list but this won't matter
raise NonlinearError('nonlinear term encountered: %s' % t)
def linear_eq_to_matrix(equations, *symbols):
r"""
Converts a given System of Equations into Matrix form.
Here `equations` must be a linear system of equations in
`symbols`. Element M[i, j] corresponds to the coefficient
of the jth symbol in the ith equation.
The Matrix form corresponds to the augmented matrix form.
For example:
.. math:: 4x + 2y + 3z = 1
.. math:: 3x + y + z = -6
.. math:: 2x + 4y + 9z = 2
This system would return `A` & `b` as given below:
::
[ 4 2 3 ] [ 1 ]
A = [ 3 1 1 ] b = [-6 ]
[ 2 4 9 ] [ 2 ]
The only simplification performed is to convert
`Eq(a, b) -> a - b`.
Raises
======
NonlinearError
The equations contain a nonlinear term.
ValueError
The symbols are not given or are not unique.
Examples
========
>>> from sympy import linear_eq_to_matrix, symbols
>>> c, x, y, z = symbols('c, x, y, z')
The coefficients (numerical or symbolic) of the symbols will
be returned as matrices:
>>> eqns = [c*x + z - 1 - c, y + z, x - y]
>>> A, b = linear_eq_to_matrix(eqns, [x, y, z])
>>> A
Matrix([
[c, 0, 1],
[0, 1, 1],
[1, -1, 0]])
>>> b
Matrix([
[c + 1],
[ 0],
[ 0]])
This routine does not simplify expressions and will raise an error
if nonlinearity is encountered:
>>> eqns = [
... (x**2 - 3*x)/(x - 3) - 3,
... y**2 - 3*y - y*(y - 4) + x - 4]
>>> linear_eq_to_matrix(eqns, [x, y])
Traceback (most recent call last):
...
NonlinearError:
The term (x**2 - 3*x)/(x - 3) is nonlinear in {x, y}
Simplifying these equations will discard the removable singularity
in the first, reveal the linear structure of the second:
>>> [e.simplify() for e in eqns]
[x - 3, x + y - 4]
Any such simplification needed to eliminate nonlinear terms must
be done before calling this routine.
"""
if not symbols:
raise ValueError(filldedent('''
Symbols must be given, for which coefficients
are to be found.
'''))
if hasattr(symbols[0], '__iter__'):
symbols = symbols[0]
for i in symbols:
if not isinstance(i, Symbol):
raise ValueError(filldedent('''
Expecting a Symbol but got %s
''' % i))
if has_dups(symbols):
raise ValueError('Symbols must be unique')
equations = sympify(equations)
if isinstance(equations, MatrixBase):
equations = list(equations)
elif isinstance(equations, (Expr, Eq)):
equations = [equations]
elif not is_sequence(equations):
raise ValueError(filldedent('''
Equation(s) must be given as a sequence, Expr,
Eq or Matrix.
'''))
A, b = [], []
for i, f in enumerate(equations):
if isinstance(f, Equality):
f = f.rewrite(Add, evaluate=False)
coeff_list = linear_coeffs(f, *symbols)
b.append(-coeff_list.pop())
A.append(coeff_list)
A, b = map(Matrix, (A, b))
return A, b
def linsolve(system, *symbols):
r"""
Solve system of N linear equations with M variables; both
underdetermined and overdetermined systems are supported.
The possible number of solutions is zero, one or infinite.
Zero solutions throws a ValueError, whereas infinite
solutions are represented parametrically in terms of the given
symbols. For unique solution a FiniteSet of ordered tuples
is returned.
All Standard input formats are supported:
For the given set of Equations, the respective input types
are given below:
.. math:: 3x + 2y - z = 1
.. math:: 2x - 2y + 4z = -2
.. math:: 2x - y + 2z = 0
* Augmented Matrix Form, `system` given below:
::
[3 2 -1 1]
system = [2 -2 4 -2]
[2 -1 2 0]
* List Of Equations Form
`system = [3x + 2y - z - 1, 2x - 2y + 4z + 2, 2x - y + 2z]`
* Input A & b Matrix Form (from Ax = b) are given as below:
::
[3 2 -1 ] [ 1 ]
A = [2 -2 4 ] b = [ -2 ]
[2 -1 2 ] [ 0 ]
`system = (A, b)`
Symbols can always be passed but are actually only needed
when 1) a system of equations is being passed and 2) the
system is passed as an underdetermined matrix and one wants
to control the name of the free variables in the result.
An error is raised if no symbols are used for case 1, but if
no symbols are provided for case 2, internally generated symbols
will be provided. When providing symbols for case 2, there should
be at least as many symbols are there are columns in matrix A.
The algorithm used here is Gauss-Jordan elimination, which
results, after elimination, in a row echelon form matrix.
Returns
=======
A FiniteSet containing an ordered tuple of values for the
unknowns for which the `system` has a solution. (Wrapping
the tuple in FiniteSet is used to maintain a consistent
output format throughout solveset.)
Returns EmptySet, if the linear system is inconsistent.
Raises
======
ValueError
The input is not valid.
The symbols are not given.
Examples
========
>>> from sympy import Matrix, linsolve, symbols
>>> x, y, z = symbols("x, y, z")
>>> A = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 10]])
>>> b = Matrix([3, 6, 9])
>>> A
Matrix([
[1, 2, 3],
[4, 5, 6],
[7, 8, 10]])
>>> b
Matrix([
[3],
[6],
[9]])
>>> linsolve((A, b), [x, y, z])
FiniteSet((-1, 2, 0))
* Parametric Solution: In case the system is underdetermined, the
function will return a parametric solution in terms of the given
symbols. Those that are free will be returned unchanged. e.g. in
the system below, `z` is returned as the solution for variable z;
it can take on any value.
>>> A = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]])
>>> b = Matrix([3, 6, 9])
>>> linsolve((A, b), x, y, z)
FiniteSet((z - 1, 2 - 2*z, z))
If no symbols are given, internally generated symbols will be used.
The `tau0` in the 3rd position indicates (as before) that the 3rd
variable -- whatever it's named -- can take on any value:
>>> linsolve((A, b))
FiniteSet((tau0 - 1, 2 - 2*tau0, tau0))
* List of Equations as input
>>> Eqns = [3*x + 2*y - z - 1, 2*x - 2*y + 4*z + 2, - x + y/2 - z]
>>> linsolve(Eqns, x, y, z)
FiniteSet((1, -2, -2))
* Augmented Matrix as input
>>> aug = Matrix([[2, 1, 3, 1], [2, 6, 8, 3], [6, 8, 18, 5]])
>>> aug
Matrix([
[2, 1, 3, 1],
[2, 6, 8, 3],
[6, 8, 18, 5]])
>>> linsolve(aug, x, y, z)
FiniteSet((3/10, 2/5, 0))
* Solve for symbolic coefficients
>>> a, b, c, d, e, f = symbols('a, b, c, d, e, f')
>>> eqns = [a*x + b*y - c, d*x + e*y - f]
>>> linsolve(eqns, x, y)
FiniteSet(((-b*f + c*e)/(a*e - b*d), (a*f - c*d)/(a*e - b*d)))
* A degenerate system returns solution as set of given
symbols.
>>> system = Matrix(([0, 0, 0], [0, 0, 0], [0, 0, 0]))
>>> linsolve(system, x, y)
FiniteSet((x, y))
* For an empty system linsolve returns empty set
>>> linsolve([], x)
EmptySet
* An error is raised if, after expansion, any nonlinearity
is detected:
>>> linsolve([x*(1/x - 1), (y - 1)**2 - y**2 + 1], x, y)
FiniteSet((1, 1))
>>> linsolve([x**2 - 1], x)
Traceback (most recent call last):
...
NonlinearError:
nonlinear term encountered: x**2
"""
if not system:
return S.EmptySet
# If second argument is an iterable
if symbols and hasattr(symbols[0], '__iter__'):
symbols = symbols[0]
sym_gen = isinstance(symbols, GeneratorType)
swap = {}
b = None # if we don't get b the input was bad
syms_needed_msg = None
# unpack system
if hasattr(system, '__iter__'):
# 1). (A, b)
if len(system) == 2 and isinstance(system[0], MatrixBase):
A, b = system
# 2). (eq1, eq2, ...)
if not isinstance(system[0], MatrixBase):
if sym_gen or not symbols:
raise ValueError(filldedent('''
When passing a system of equations, the explicit
symbols for which a solution is being sought must
be given as a sequence, too.
'''))
system = [
_mexpand(i.lhs - i.rhs if isinstance(i, Eq) else i,
recursive=True) for i in system]
system, symbols, swap = recast_to_symbols(system, symbols)
A, b = linear_eq_to_matrix(system, symbols)
syms_needed_msg = 'free symbols in the equations provided'
elif isinstance(system, MatrixBase) and not (
symbols and not isinstance(symbols, GeneratorType) and
isinstance(symbols[0], MatrixBase)):
# 3). A augmented with b
A, b = system[:, :-1], system[:, -1:]
if b is None:
raise ValueError("Invalid arguments")
syms_needed_msg = syms_needed_msg or 'columns of A'
if sym_gen:
symbols = [next(symbols) for i in range(A.cols)]
if any(set(symbols) & (A.free_symbols | b.free_symbols)):
raise ValueError(filldedent('''
At least one of the symbols provided
already appears in the system to be solved.
One way to avoid this is to use Dummy symbols in
the generator, e.g. numbered_symbols('%s', cls=Dummy)
''' % symbols[0].name.rstrip('1234567890')))
try:
solution, params, free_syms = A.gauss_jordan_solve(b, freevar=True)
except ValueError:
# No solution
return S.EmptySet
# Replace free parameters with free symbols
if params:
if not symbols:
symbols = [_ for _ in params]
# re-use the parameters but put them in order
# params [x, y, z]
# free_symbols [2, 0, 4]
# idx [1, 0, 2]
idx = list(zip(*sorted(zip(free_syms, range(len(free_syms))))))[1]
# simultaneous replacements {y: x, x: y, z: z}
replace_dict = dict(zip(symbols, [symbols[i] for i in idx]))
elif len(symbols) >= A.cols:
replace_dict = {v: symbols[free_syms[k]] for k, v in enumerate(params)}
else:
raise IndexError(filldedent('''
the number of symbols passed should have a length
equal to the number of %s.
''' % syms_needed_msg))
solution = [sol.xreplace(replace_dict) for sol in solution]
solution = [simplify(sol).xreplace(swap) for sol in solution]
return FiniteSet(tuple(solution))
##############################################################################
# ------------------------------nonlinsolve ---------------------------------#
##############################################################################
def _return_conditionset(eqs, symbols):
# return conditionset
eqs = (Eq(lhs, 0) for lhs in eqs)
condition_set = ConditionSet(
Tuple(*symbols), And(*eqs), S.Complexes**len(symbols))
return condition_set
def substitution(system, symbols, result=[{}], known_symbols=[],
exclude=[], all_symbols=None):
r"""
Solves the `system` using substitution method. It is used in
`nonlinsolve`. This will be called from `nonlinsolve` when any
equation(s) is non polynomial equation.
Parameters
==========
system : list of equations
The target system of equations
symbols : list of symbols to be solved.
The variable(s) for which the system is solved
known_symbols : list of solved symbols
Values are known for these variable(s)
result : An empty list or list of dict
If No symbol values is known then empty list otherwise
symbol as keys and corresponding value in dict.
exclude : Set of expression.
Mostly denominator expression(s) of the equations of the system.
Final solution should not satisfy these expressions.
all_symbols : known_symbols + symbols(unsolved).
Returns
=======
A FiniteSet of ordered tuple of values of `all_symbols` for which the
`system` has solution. Order of values in the tuple is same as symbols
present in the parameter `all_symbols`. If parameter `all_symbols` is None
then same as symbols present in the parameter `symbols`.
Please note that general FiniteSet is unordered, the solution returned
here is not simply a FiniteSet of solutions, rather it is a FiniteSet of
ordered tuple, i.e. the first & only argument to FiniteSet is a tuple of
solutions, which is ordered, & hence the returned solution is ordered.
Also note that solution could also have been returned as an ordered tuple,
FiniteSet is just a wrapper `{}` around the tuple. It has no other
significance except for the fact it is just used to maintain a consistent
output format throughout the solveset.
Raises
======
ValueError
The input is not valid.
The symbols are not given.
AttributeError
The input symbols are not `Symbol` type.
Examples
========
>>> from sympy.core.symbol import symbols
>>> x, y = symbols('x, y', real=True)
>>> from sympy.solvers.solveset import substitution
>>> substitution([x + y], [x], [{y: 1}], [y], set([]), [x, y])
FiniteSet((-1, 1))
* when you want soln should not satisfy eq `x + 1 = 0`
>>> substitution([x + y], [x], [{y: 1}], [y], set([x + 1]), [y, x])
EmptySet
>>> substitution([x + y], [x], [{y: 1}], [y], set([x - 1]), [y, x])
FiniteSet((1, -1))
>>> substitution([x + y - 1, y - x**2 + 5], [x, y])
FiniteSet((-3, 4), (2, -1))
* Returns both real and complex solution
>>> x, y, z = symbols('x, y, z')
>>> from sympy import exp, sin
>>> substitution([exp(x) - sin(y), y**2 - 4], [x, y])
FiniteSet((ImageSet(Lambda(_n, 2*_n*I*pi + log(sin(2))), Integers), 2),
(ImageSet(Lambda(_n, I*(2*_n*pi + pi) + log(sin(2))), Integers), -2))
>>> eqs = [z**2 + exp(2*x) - sin(y), -3 + exp(-y)]
>>> substitution(eqs, [y, z])
FiniteSet((-log(3), sqrt(-exp(2*x) - sin(log(3)))),
(-log(3), -sqrt(-exp(2*x) - sin(log(3)))),
(ImageSet(Lambda(_n, 2*_n*I*pi - log(3)), Integers),
ImageSet(Lambda(_n, sqrt(-exp(2*x) + sin(2*_n*I*pi - log(3)))), Integers)),
(ImageSet(Lambda(_n, 2*_n*I*pi - log(3)), Integers),
ImageSet(Lambda(_n, -sqrt(-exp(2*x) + sin(2*_n*I*pi - log(3)))), Integers)))
"""
from sympy import Complement
from sympy.core.compatibility import is_sequence
if not system:
return S.EmptySet
if not symbols:
msg = ('Symbols must be given, for which solution of the '
'system is to be found.')
raise ValueError(filldedent(msg))
if not is_sequence(symbols):
msg = ('symbols should be given as a sequence, e.g. a list.'
'Not type %s: %s')
raise TypeError(filldedent(msg % (type(symbols), symbols)))
if not getattr(symbols[0], 'is_Symbol', False):
msg = ('Iterable of symbols must be given as '
'second argument, not type %s: %s')
raise ValueError(filldedent(msg % (type(symbols[0]), symbols[0])))
# By default `all_symbols` will be same as `symbols`
if all_symbols is None:
all_symbols = symbols
old_result = result
# storing complements and intersection for particular symbol
complements = {}
intersections = {}
# when total_solveset_call equals total_conditionset
# it means that solveset failed to solve all eqs.
total_conditionset = -1
total_solveset_call = -1
def _unsolved_syms(eq, sort=False):
"""Returns the unsolved symbol present
in the equation `eq`.
"""
free = eq.free_symbols
unsolved = (free - set(known_symbols)) & set(all_symbols)
if sort:
unsolved = list(unsolved)
unsolved.sort(key=default_sort_key)
return unsolved
# end of _unsolved_syms()
# sort such that equation with the fewest potential symbols is first.
# means eq with less number of variable first in the list.
eqs_in_better_order = list(
ordered(system, lambda _: len(_unsolved_syms(_))))
def add_intersection_complement(result, intersection_dict, complement_dict):
# If solveset has returned some intersection/complement
# for any symbol, it will be added in the final solution.
final_result = []
for res in result:
res_copy = res
for key_res, value_res in res.items():
intersect_set, complement_set = None, None
for key_sym, value_sym in intersection_dict.items():
if key_sym == key_res:
intersect_set = value_sym
for key_sym, value_sym in complement_dict.items():
if key_sym == key_res:
complement_set = value_sym
if intersect_set or complement_set:
new_value = FiniteSet(value_res)
if intersect_set and intersect_set != S.Complexes:
new_value = Intersection(new_value, intersect_set)
if complement_set:
new_value = Complement(new_value, complement_set)
if new_value is S.EmptySet:
res_copy = {}
elif new_value.is_FiniteSet and len(new_value) == 1:
res_copy[key_res] = set(new_value).pop()
else:
res_copy[key_res] = new_value
final_result.append(res_copy)
return final_result
# end of def add_intersection_complement()
def _extract_main_soln(sym, sol, soln_imageset):
"""Separate the Complements, Intersections, ImageSet lambda expr
and its base_set.
"""
# if there is union, then need to check
# Complement, Intersection, Imageset.
# Order should not be changed.
if isinstance(sol, Complement):
# extract solution and complement
complements[sym] = sol.args[1]
sol = sol.args[0]
# complement will be added at the end
# using `add_intersection_complement` method
if isinstance(sol, Intersection):
# Interval/Set will be at 0th index always
if sol.args[0] not in (S.Reals, S.Complexes):
# Sometimes solveset returns soln with intersection
# S.Reals or S.Complexes. We don't consider that
# intersection.
intersections[sym] = sol.args[0]
sol = sol.args[1]
# after intersection and complement Imageset should
# be checked.
if isinstance(sol, ImageSet):
soln_imagest = sol
expr2 = sol.lamda.expr
sol = FiniteSet(expr2)
soln_imageset[expr2] = soln_imagest
# if there is union of Imageset or other in soln.
# no testcase is written for this if block
if isinstance(sol, Union):
sol_args = sol.args
sol = S.EmptySet
# We need in sequence so append finteset elements
# and then imageset or other.
for sol_arg2 in sol_args:
if isinstance(sol_arg2, FiniteSet):
sol += sol_arg2
else:
# ImageSet, Intersection, complement then
# append them directly
sol += FiniteSet(sol_arg2)
if not isinstance(sol, FiniteSet):
sol = FiniteSet(sol)
return sol, soln_imageset
# end of def _extract_main_soln()
# helper function for _append_new_soln
def _check_exclude(rnew, imgset_yes):
rnew_ = rnew
if imgset_yes:
# replace all dummy variables (Imageset lambda variables)
# with zero before `checksol`. Considering fundamental soln
# for `checksol`.
rnew_copy = rnew.copy()
dummy_n = imgset_yes[0]
for key_res, value_res in rnew_copy.items():
rnew_copy[key_res] = value_res.subs(dummy_n, 0)
rnew_ = rnew_copy
# satisfy_exclude == true if it satisfies the expr of `exclude` list.
try:
# something like : `Mod(-log(3), 2*I*pi)` can't be
# simplified right now, so `checksol` returns `TypeError`.
# when this issue is fixed this try block should be
# removed. Mod(-log(3), 2*I*pi) == -log(3)
satisfy_exclude = any(
checksol(d, rnew_) for d in exclude)
except TypeError:
satisfy_exclude = None
return satisfy_exclude
# end of def _check_exclude()
# helper function for _append_new_soln
def _restore_imgset(rnew, original_imageset, newresult):
restore_sym = set(rnew.keys()) & \
set(original_imageset.keys())
for key_sym in restore_sym:
img = original_imageset[key_sym]
rnew[key_sym] = img
if rnew not in newresult:
newresult.append(rnew)
# end of def _restore_imgset()
def _append_eq(eq, result, res, delete_soln, n=None):
u = Dummy('u')
if n:
eq = eq.subs(n, 0)
satisfy = checksol(u, u, eq, minimal=True)
if satisfy is False:
delete_soln = True
res = {}
else:
result.append(res)
return result, res, delete_soln
def _append_new_soln(rnew, sym, sol, imgset_yes, soln_imageset,
original_imageset, newresult, eq=None):
"""If `rnew` (A dict <symbol: soln>) contains valid soln
append it to `newresult` list.
`imgset_yes` is (base, dummy_var) if there was imageset in previously
calculated result(otherwise empty tuple). `original_imageset` is dict
of imageset expr and imageset from this result.
`soln_imageset` dict of imageset expr and imageset of new soln.
"""
satisfy_exclude = _check_exclude(rnew, imgset_yes)
delete_soln = False
# soln should not satisfy expr present in `exclude` list.
if not satisfy_exclude:
local_n = None
# if it is imageset
if imgset_yes:
local_n = imgset_yes[0]
base = imgset_yes[1]
if sym and sol:
# when `sym` and `sol` is `None` means no new
# soln. In that case we will append rnew directly after
# substituting original imagesets in rnew values if present
# (second last line of this function using _restore_imgset)
dummy_list = list(sol.atoms(Dummy))
# use one dummy `n` which is in
# previous imageset
local_n_list = [
local_n for i in range(
0, len(dummy_list))]
dummy_zip = zip(dummy_list, local_n_list)
lam = Lambda(local_n, sol.subs(dummy_zip))
rnew[sym] = ImageSet(lam, base)
if eq is not None:
newresult, rnew, delete_soln = _append_eq(
eq, newresult, rnew, delete_soln, local_n)
elif eq is not None:
newresult, rnew, delete_soln = _append_eq(
eq, newresult, rnew, delete_soln)
elif soln_imageset:
rnew[sym] = soln_imageset[sol]
# restore original imageset
_restore_imgset(rnew, original_imageset, newresult)
else:
newresult.append(rnew)
elif satisfy_exclude:
delete_soln = True
rnew = {}
_restore_imgset(rnew, original_imageset, newresult)
return newresult, delete_soln
# end of def _append_new_soln()
def _new_order_result(result, eq):
# separate first, second priority. `res` that makes `eq` value equals
# to zero, should be used first then other result(second priority).
# If it is not done then we may miss some soln.
first_priority = []
second_priority = []
for res in result:
if not any(isinstance(val, ImageSet) for val in res.values()):
if eq.subs(res) == 0:
first_priority.append(res)
else:
second_priority.append(res)
if first_priority or second_priority:
return first_priority + second_priority
return result
def _solve_using_known_values(result, solver):
"""Solves the system using already known solution
(result contains the dict <symbol: value>).
solver is `solveset_complex` or `solveset_real`.
"""
# stores imageset <expr: imageset(Lambda(n, expr), base)>.
soln_imageset = {}
total_solvest_call = 0
total_conditionst = 0
# sort such that equation with the fewest potential symbols is first.
# means eq with less variable first
for index, eq in enumerate(eqs_in_better_order):
newresult = []
original_imageset = {}
# if imageset expr is used to solve other symbol
imgset_yes = False
result = _new_order_result(result, eq)
for res in result:
got_symbol = set() # symbols solved in one iteration
if soln_imageset:
# find the imageset and use its expr.
for key_res, value_res in res.items():
if isinstance(value_res, ImageSet):
res[key_res] = value_res.lamda.expr
original_imageset[key_res] = value_res
dummy_n = value_res.lamda.expr.atoms(Dummy).pop()
(base,) = value_res.base_sets
imgset_yes = (dummy_n, base)
# update eq with everything that is known so far
eq2 = eq.subs(res).expand()
unsolved_syms = _unsolved_syms(eq2, sort=True)
if not unsolved_syms:
if res:
newresult, delete_res = _append_new_soln(
res, None, None, imgset_yes, soln_imageset,
original_imageset, newresult, eq2)
if delete_res:
# `delete_res` is true, means substituting `res` in
# eq2 doesn't return `zero` or deleting the `res`
# (a soln) since it staisfies expr of `exclude`
# list.
result.remove(res)
continue # skip as it's independent of desired symbols
depen1, depen2 = (eq2.rewrite(Add)).as_independent(*unsolved_syms)
if (depen1.has(Abs) or depen2.has(Abs)) and solver == solveset_complex:
# Absolute values cannot be inverted in the
# complex domain
continue
soln_imageset = {}
for sym in unsolved_syms:
not_solvable = False
try:
soln = solver(eq2, sym)
total_solvest_call += 1
soln_new = S.EmptySet
if isinstance(soln, Complement):
# separate solution and complement
complements[sym] = soln.args[1]
soln = soln.args[0]
# complement will be added at the end
if isinstance(soln, Intersection):
# Interval will be at 0th index always
if soln.args[0] != Interval(-oo, oo):
# sometimes solveset returns soln
# with intersection S.Reals, to confirm that
# soln is in domain=S.Reals
intersections[sym] = soln.args[0]
soln_new += soln.args[1]
soln = soln_new if soln_new else soln
if index > 0 and solver == solveset_real:
# one symbol's real soln , another symbol may have
# corresponding complex soln.
if not isinstance(soln, (ImageSet, ConditionSet)):
soln += solveset_complex(eq2, sym)
except NotImplementedError:
# If sovleset is not able to solve equation `eq2`. Next
# time we may get soln using next equation `eq2`
continue
if isinstance(soln, ConditionSet):
soln = S.EmptySet
# don't do `continue` we may get soln
# in terms of other symbol(s)
not_solvable = True
total_conditionst += 1
if soln is not S.EmptySet:
soln, soln_imageset = _extract_main_soln(
sym, soln, soln_imageset)
for sol in soln:
# sol is not a `Union` since we checked it
# before this loop
sol, soln_imageset = _extract_main_soln(
sym, sol, soln_imageset)
sol = set(sol).pop()
free = sol.free_symbols
if got_symbol and any([
ss in free for ss in got_symbol
]):
# sol depends on previously solved symbols
# then continue
continue
rnew = res.copy()
# put each solution in res and append the new result
# in the new result list (solution for symbol `s`)
# along with old results.
for k, v in res.items():
if isinstance(v, Expr):
# if any unsolved symbol is present
# Then subs known value
rnew[k] = v.subs(sym, sol)
# and add this new solution
if soln_imageset:
# replace all lambda variables with 0.
imgst = soln_imageset[sol]
rnew[sym] = imgst.lamda(
*[0 for i in range(0, len(
imgst.lamda.variables))])
else:
rnew[sym] = sol
newresult, delete_res = _append_new_soln(
rnew, sym, sol, imgset_yes, soln_imageset,
original_imageset, newresult)
if delete_res:
# deleting the `res` (a soln) since it staisfies
# eq of `exclude` list
result.remove(res)
# solution got for sym
if not not_solvable:
got_symbol.add(sym)
# next time use this new soln
if newresult:
result = newresult
return result, total_solvest_call, total_conditionst
# end def _solve_using_know_values()
new_result_real, solve_call1, cnd_call1 = _solve_using_known_values(
old_result, solveset_real)
new_result_complex, solve_call2, cnd_call2 = _solve_using_known_values(
old_result, solveset_complex)
# when `total_solveset_call` is equals to `total_conditionset`
# means solvest fails to solve all the eq.
# return conditionset in this case
total_conditionset += (cnd_call1 + cnd_call2)
total_solveset_call += (solve_call1 + solve_call2)
if total_conditionset == total_solveset_call and total_solveset_call != -1:
return _return_conditionset(eqs_in_better_order, all_symbols)
# overall result
result = new_result_real + new_result_complex
result_all_variables = []
result_infinite = []
for res in result:
if not res:
# means {None : None}
continue
# If length < len(all_symbols) means infinite soln.
# Some or all the soln is dependent on 1 symbol.
# eg. {x: y+2} then final soln {x: y+2, y: y}
if len(res) < len(all_symbols):
solved_symbols = res.keys()
unsolved = list(filter(
lambda x: x not in solved_symbols, all_symbols))
for unsolved_sym in unsolved:
res[unsolved_sym] = unsolved_sym
result_infinite.append(res)
if res not in result_all_variables:
result_all_variables.append(res)
if result_infinite:
# we have general soln
# eg : [{x: -1, y : 1}, {x : -y , y: y}] then
# return [{x : -y, y : y}]
result_all_variables = result_infinite
if intersections or complements:
result_all_variables = add_intersection_complement(
result_all_variables, intersections, complements)
# convert to ordered tuple
result = S.EmptySet
for r in result_all_variables:
temp = [r[symb] for symb in all_symbols]
result += FiniteSet(tuple(temp))
return result
# end of def substitution()
def _solveset_work(system, symbols):
soln = solveset(system[0], symbols[0])
if isinstance(soln, FiniteSet):
_soln = FiniteSet(*[tuple((s,)) for s in soln])
return _soln
else:
return FiniteSet(tuple(FiniteSet(soln)))
def _handle_positive_dimensional(polys, symbols, denominators):
from sympy.polys.polytools import groebner
# substitution method where new system is groebner basis of the system
_symbols = list(symbols)
_symbols.sort(key=default_sort_key)
basis = groebner(polys, _symbols, polys=True)
new_system = []
for poly_eq in basis:
new_system.append(poly_eq.as_expr())
result = [{}]
result = substitution(
new_system, symbols, result, [],
denominators)
return result
# end of def _handle_positive_dimensional()
def _handle_zero_dimensional(polys, symbols, system):
# solve 0 dimensional poly system using `solve_poly_system`
result = solve_poly_system(polys, *symbols)
# May be some extra soln is added because
# we used `unrad` in `_separate_poly_nonpoly`, so
# need to check and remove if it is not a soln.
result_update = S.EmptySet
for res in result:
dict_sym_value = dict(list(zip(symbols, res)))
if all(checksol(eq, dict_sym_value) for eq in system):
result_update += FiniteSet(res)
return result_update
# end of def _handle_zero_dimensional()
def _separate_poly_nonpoly(system, symbols):
polys = []
polys_expr = []
nonpolys = []
denominators = set()
poly = None
for eq in system:
# Store denom expression if it contains symbol
denominators.update(_simple_dens(eq, symbols))
# try to remove sqrt and rational power
without_radicals = unrad(simplify(eq))
if without_radicals:
eq_unrad, cov = without_radicals
if not cov:
eq = eq_unrad
if isinstance(eq, Expr):
eq = eq.as_numer_denom()[0]
poly = eq.as_poly(*symbols, extension=True)
elif simplify(eq).is_number:
continue
if poly is not None:
polys.append(poly)
polys_expr.append(poly.as_expr())
else:
nonpolys.append(eq)
return polys, polys_expr, nonpolys, denominators
# end of def _separate_poly_nonpoly()
def nonlinsolve(system, *symbols):
r"""
Solve system of N non linear equations with M variables, which means both
under and overdetermined systems are supported. Positive dimensional
system is also supported (A system with infinitely many solutions is said
to be positive-dimensional). In Positive dimensional system solution will
be dependent on at least one symbol. Returns both real solution
and complex solution(If system have). The possible number of solutions
is zero, one or infinite.
Parameters
==========
system : list of equations
The target system of equations
symbols : list of Symbols
symbols should be given as a sequence eg. list
Returns
=======
A FiniteSet of ordered tuple of values of `symbols` for which the `system`
has solution. Order of values in the tuple is same as symbols present in
the parameter `symbols`.
Please note that general FiniteSet is unordered, the solution returned
here is not simply a FiniteSet of solutions, rather it is a FiniteSet of
ordered tuple, i.e. the first & only argument to FiniteSet is a tuple of
solutions, which is ordered, & hence the returned solution is ordered.
Also note that solution could also have been returned as an ordered tuple,
FiniteSet is just a wrapper `{}` around the tuple. It has no other
significance except for the fact it is just used to maintain a consistent
output format throughout the solveset.
For the given set of Equations, the respective input types
are given below:
.. math:: x*y - 1 = 0
.. math:: 4*x**2 + y**2 - 5 = 0
`system = [x*y - 1, 4*x**2 + y**2 - 5]`
`symbols = [x, y]`
Raises
======
ValueError
The input is not valid.
The symbols are not given.
AttributeError
The input symbols are not `Symbol` type.
Examples
========
>>> from sympy.core.symbol import symbols
>>> from sympy.solvers.solveset import nonlinsolve
>>> x, y, z = symbols('x, y, z', real=True)
>>> nonlinsolve([x*y - 1, 4*x**2 + y**2 - 5], [x, y])
FiniteSet((-1, -1), (-1/2, -2), (1/2, 2), (1, 1))
1. Positive dimensional system and complements:
>>> from sympy import pprint
>>> from sympy.polys.polytools import is_zero_dimensional
>>> a, b, c, d = symbols('a, b, c, d', extended_real=True)
>>> eq1 = a + b + c + d
>>> eq2 = a*b + b*c + c*d + d*a
>>> eq3 = a*b*c + b*c*d + c*d*a + d*a*b
>>> eq4 = a*b*c*d - 1
>>> system = [eq1, eq2, eq3, eq4]
>>> is_zero_dimensional(system)
False
>>> pprint(nonlinsolve(system, [a, b, c, d]), use_unicode=False)
-1 1 1 -1
{(---, -d, -, {d} \ {0}), (-, -d, ---, {d} \ {0})}
d d d d
>>> nonlinsolve([(x+y)**2 - 4, x + y - 2], [x, y])
FiniteSet((2 - y, y))
2. If some of the equations are non-polynomial then `nonlinsolve`
will call the `substitution` function and return real and complex solutions,
if present.
>>> from sympy import exp, sin
>>> nonlinsolve([exp(x) - sin(y), y**2 - 4], [x, y])
FiniteSet((ImageSet(Lambda(_n, 2*_n*I*pi + log(sin(2))), Integers), 2),
(ImageSet(Lambda(_n, I*(2*_n*pi + pi) + log(sin(2))), Integers), -2))
3. If system is non-linear polynomial and zero-dimensional then it
returns both solution (real and complex solutions, if present) using
`solve_poly_system`:
>>> from sympy import sqrt
>>> nonlinsolve([x**2 - 2*y**2 -2, x*y - 2], [x, y])
FiniteSet((-2, -1), (2, 1), (-sqrt(2)*I, sqrt(2)*I), (sqrt(2)*I, -sqrt(2)*I))
4. `nonlinsolve` can solve some linear (zero or positive dimensional)
system (because it uses the `groebner` function to get the
groebner basis and then uses the `substitution` function basis as the
new `system`). But it is not recommended to solve linear system using
`nonlinsolve`, because `linsolve` is better for general linear systems.
>>> nonlinsolve([x + 2*y -z - 3, x - y - 4*z + 9 , y + z - 4], [x, y, z])
FiniteSet((3*z - 5, 4 - z, z))
5. System having polynomial equations and only real solution is
solved using `solve_poly_system`:
>>> e1 = sqrt(x**2 + y**2) - 10
>>> e2 = sqrt(y**2 + (-x + 10)**2) - 3
>>> nonlinsolve((e1, e2), (x, y))
FiniteSet((191/20, -3*sqrt(391)/20), (191/20, 3*sqrt(391)/20))
>>> nonlinsolve([x**2 + 2/y - 2, x + y - 3], [x, y])
FiniteSet((1, 2), (1 - sqrt(5), 2 + sqrt(5)), (1 + sqrt(5), 2 - sqrt(5)))
>>> nonlinsolve([x**2 + 2/y - 2, x + y - 3], [y, x])
FiniteSet((2, 1), (2 - sqrt(5), 1 + sqrt(5)), (2 + sqrt(5), 1 - sqrt(5)))
6. It is better to use symbols instead of Trigonometric Function or
Function (e.g. replace `sin(x)` with symbol, replace `f(x)` with symbol
and so on. Get soln from `nonlinsolve` and then using `solveset` get
the value of `x`)
How nonlinsolve is better than old solver `_solve_system` :
===========================================================
1. A positive dimensional system solver : nonlinsolve can return
solution for positive dimensional system. It finds the
Groebner Basis of the positive dimensional system(calling it as
basis) then we can start solving equation(having least number of
variable first in the basis) using solveset and substituting that
solved solutions into other equation(of basis) to get solution in
terms of minimum variables. Here the important thing is how we
are substituting the known values and in which equations.
2. Real and Complex both solutions : nonlinsolve returns both real
and complex solution. If all the equations in the system are polynomial
then using `solve_poly_system` both real and complex solution is returned.
If all the equations in the system are not polynomial equation then goes to
`substitution` method with this polynomial and non polynomial equation(s),
to solve for unsolved variables. Here to solve for particular variable
solveset_real and solveset_complex is used. For both real and complex
solution function `_solve_using_know_values` is used inside `substitution`
function.(`substitution` function will be called when there is any non
polynomial equation(s) is present). When solution is valid then add its
general solution in the final result.
3. Complement and Intersection will be added if any : nonlinsolve maintains
dict for complements and Intersections. If solveset find complements or/and
Intersection with any Interval or set during the execution of
`substitution` function ,then complement or/and Intersection for that
variable is added before returning final solution.
"""
from sympy.polys.polytools import is_zero_dimensional
if not system:
return S.EmptySet
if not symbols:
msg = ('Symbols must be given, for which solution of the '
'system is to be found.')
raise ValueError(filldedent(msg))
if hasattr(symbols[0], '__iter__'):
symbols = symbols[0]
if not is_sequence(symbols) or not symbols:
msg = ('Symbols must be given, for which solution of the '
'system is to be found.')
raise IndexError(filldedent(msg))
system, symbols, swap = recast_to_symbols(system, symbols)
if swap:
soln = nonlinsolve(system, symbols)
return FiniteSet(*[tuple(i.xreplace(swap) for i in s) for s in soln])
if len(system) == 1 and len(symbols) == 1:
return _solveset_work(system, symbols)
# main code of def nonlinsolve() starts from here
polys, polys_expr, nonpolys, denominators = _separate_poly_nonpoly(
system, symbols)
if len(symbols) == len(polys):
# If all the equations in the system are poly
if is_zero_dimensional(polys, symbols):
# finite number of soln (Zero dimensional system)
try:
return _handle_zero_dimensional(polys, symbols, system)
except NotImplementedError:
# Right now it doesn't fail for any polynomial system of
# equation. If `solve_poly_system` fails then `substitution`
# method will handle it.
result = substitution(
polys_expr, symbols, exclude=denominators)
return result
# positive dimensional system
res = _handle_positive_dimensional(polys, symbols, denominators)
if res is EmptySet and any(not p.domain.is_Exact for p in polys):
raise NotImplementedError("Equation not in exact domain. Try converting to rational")
else:
return res
else:
# If all the equations are not polynomial.
# Use `substitution` method for the system
result = substitution(
polys_expr + nonpolys, symbols, exclude=denominators)
return result
|
89bde00ca49c5513bbc09150777a9dbf7475b36d6e60472239dcd7bec08c9acd
|
"""
This module contain solvers for all kinds of equations:
- algebraic or transcendental, use solve()
- recurrence, use rsolve()
- differential, use dsolve()
- nonlinear (numerically), use nsolve()
(you will need a good starting point)
"""
from __future__ import print_function, division
from sympy import divisors, binomial, expand_func
from sympy.core.assumptions import check_assumptions
from sympy.core.compatibility import (iterable, is_sequence, ordered,
default_sort_key)
from sympy.core.sympify import sympify
from sympy.core import (S, Add, Symbol, Equality, Dummy, Expr, Mul,
Pow, Unequality, Wild)
from sympy.core.exprtools import factor_terms
from sympy.core.function import (expand_mul, expand_log,
Derivative, AppliedUndef, UndefinedFunction, nfloat,
Function, expand_power_exp, _mexpand, expand)
from sympy.integrals.integrals import Integral
from sympy.core.numbers import ilcm, Float, Rational
from sympy.core.relational import Relational
from sympy.core.logic import fuzzy_not
from sympy.core.power import integer_log
from sympy.logic.boolalg import And, Or, BooleanAtom
from sympy.core.basic import preorder_traversal
from sympy.functions import (log, exp, LambertW, cos, sin, tan, acos, asin, atan,
Abs, re, im, arg, sqrt, atan2)
from sympy.functions.elementary.trigonometric import (TrigonometricFunction,
HyperbolicFunction)
from sympy.simplify import (simplify, collect, powsimp, posify, # type: ignore
powdenest, nsimplify, denom, logcombine, sqrtdenest, fraction,
separatevars)
from sympy.simplify.sqrtdenest import sqrt_depth
from sympy.simplify.fu import TR1, TR2i
from sympy.matrices.common import NonInvertibleMatrixError
from sympy.matrices import Matrix, zeros
from sympy.polys import roots, cancel, factor, Poly, degree
from sympy.polys.polyerrors import GeneratorsNeeded, PolynomialError
from sympy.functions.elementary.piecewise import piecewise_fold, Piecewise
from sympy.utilities.lambdify import lambdify
from sympy.utilities.misc import filldedent
from sympy.utilities.iterables import uniq, generate_bell, flatten
from sympy.utilities.decorator import conserve_mpmath_dps
from mpmath import findroot
from sympy.solvers.polysys import solve_poly_system
from sympy.solvers.inequalities import reduce_inequalities
from types import GeneratorType
from collections import defaultdict
import warnings
def recast_to_symbols(eqs, symbols):
"""
Return (e, s, d) where e and s are versions of *eqs* and
*symbols* in which any non-Symbol objects in *symbols* have
been replaced with generic Dummy symbols and d is a dictionary
that can be used to restore the original expressions.
Examples
========
>>> from sympy.solvers.solvers import recast_to_symbols
>>> from sympy import symbols, Function
>>> x, y = symbols('x y')
>>> fx = Function('f')(x)
>>> eqs, syms = [fx + 1, x, y], [fx, y]
>>> e, s, d = recast_to_symbols(eqs, syms); (e, s, d)
([_X0 + 1, x, y], [_X0, y], {_X0: f(x)})
The original equations and symbols can be restored using d:
>>> assert [i.xreplace(d) for i in eqs] == eqs
>>> assert [d.get(i, i) for i in s] == syms
"""
if not iterable(eqs) and iterable(symbols):
raise ValueError('Both eqs and symbols must be iterable')
new_symbols = list(symbols)
swap_sym = {}
for i, s in enumerate(symbols):
if not isinstance(s, Symbol) and s not in swap_sym:
swap_sym[s] = Dummy('X%d' % i)
new_symbols[i] = swap_sym[s]
new_f = []
for i in eqs:
isubs = getattr(i, 'subs', None)
if isubs is not None:
new_f.append(isubs(swap_sym))
else:
new_f.append(i)
swap_sym = {v: k for k, v in swap_sym.items()}
return new_f, new_symbols, swap_sym
def _ispow(e):
"""Return True if e is a Pow or is exp."""
return isinstance(e, Expr) and (e.is_Pow or isinstance(e, exp))
def _simple_dens(f, symbols):
# when checking if a denominator is zero, we can just check the
# base of powers with nonzero exponents since if the base is zero
# the power will be zero, too. To keep it simple and fast, we
# limit simplification to exponents that are Numbers
dens = set()
for d in denoms(f, symbols):
if d.is_Pow and d.exp.is_Number:
if d.exp.is_zero:
continue # foo**0 is never 0
d = d.base
dens.add(d)
return dens
def denoms(eq, *symbols):
"""
Return (recursively) set of all denominators that appear in *eq*
that contain any symbol in *symbols*; if *symbols* are not
provided then all denominators will be returned.
Examples
========
>>> from sympy.solvers.solvers import denoms
>>> from sympy.abc import x, y, z
>>> denoms(x/y)
{y}
>>> denoms(x/(y*z))
{y, z}
>>> denoms(3/x + y/z)
{x, z}
>>> denoms(x/2 + y/z)
{2, z}
If *symbols* are provided then only denominators containing
those symbols will be returned:
>>> denoms(1/x + 1/y + 1/z, y, z)
{y, z}
"""
pot = preorder_traversal(eq)
dens = set()
for p in pot:
# Here p might be Tuple or Relational
# Expr subtrees (e.g. lhs and rhs) will be traversed after by pot
if not isinstance(p, Expr):
continue
den = denom(p)
if den is S.One:
continue
for d in Mul.make_args(den):
dens.add(d)
if not symbols:
return dens
elif len(symbols) == 1:
if iterable(symbols[0]):
symbols = symbols[0]
rv = []
for d in dens:
free = d.free_symbols
if any(s in free for s in symbols):
rv.append(d)
return set(rv)
def checksol(f, symbol, sol=None, **flags):
"""
Checks whether sol is a solution of equation f == 0.
Explanation
===========
Input can be either a single symbol and corresponding value
or a dictionary of symbols and values. When given as a dictionary
and flag ``simplify=True``, the values in the dictionary will be
simplified. *f* can be a single equation or an iterable of equations.
A solution must satisfy all equations in *f* to be considered valid;
if a solution does not satisfy any equation, False is returned; if one or
more checks are inconclusive (and none are False) then None is returned.
Examples
========
>>> from sympy import symbols
>>> from sympy.solvers import checksol
>>> x, y = symbols('x,y')
>>> checksol(x**4 - 1, x, 1)
True
>>> checksol(x**4 - 1, x, 0)
False
>>> checksol(x**2 + y**2 - 5**2, {x: 3, y: 4})
True
To check if an expression is zero using ``checksol()``, pass it
as *f* and send an empty dictionary for *symbol*:
>>> checksol(x**2 + x - x*(x + 1), {})
True
None is returned if ``checksol()`` could not conclude.
flags:
'numerical=True (default)'
do a fast numerical check if ``f`` has only one symbol.
'minimal=True (default is False)'
a very fast, minimal testing.
'warn=True (default is False)'
show a warning if checksol() could not conclude.
'simplify=True (default)'
simplify solution before substituting into function and
simplify the function before trying specific simplifications
'force=True (default is False)'
make positive all symbols without assumptions regarding sign.
"""
from sympy.physics.units import Unit
minimal = flags.get('minimal', False)
if sol is not None:
sol = {symbol: sol}
elif isinstance(symbol, dict):
sol = symbol
else:
msg = 'Expecting (sym, val) or ({sym: val}, None) but got (%s, %s)'
raise ValueError(msg % (symbol, sol))
if iterable(f):
if not f:
raise ValueError('no functions to check')
rv = True
for fi in f:
check = checksol(fi, sol, **flags)
if check:
continue
if check is False:
return False
rv = None # don't return, wait to see if there's a False
return rv
if isinstance(f, Poly):
f = f.as_expr()
elif isinstance(f, (Equality, Unequality)):
if f.rhs in (S.true, S.false):
f = f.reversed
B, E = f.args
if isinstance(B, BooleanAtom):
f = f.subs(sol)
if not f.is_Boolean:
return
else:
f = f.rewrite(Add, evaluate=False)
if isinstance(f, BooleanAtom):
return bool(f)
elif not f.is_Relational and not f:
return True
if sol and not f.free_symbols & set(sol.keys()):
# if f(y) == 0, x=3 does not set f(y) to zero...nor does it not
return None
illegal = set([S.NaN,
S.ComplexInfinity,
S.Infinity,
S.NegativeInfinity])
if any(sympify(v).atoms() & illegal for k, v in sol.items()):
return False
was = f
attempt = -1
numerical = flags.get('numerical', True)
while 1:
attempt += 1
if attempt == 0:
val = f.subs(sol)
if isinstance(val, Mul):
val = val.as_independent(Unit)[0]
if val.atoms() & illegal:
return False
elif attempt == 1:
if not val.is_number:
if not val.is_constant(*list(sol.keys()), simplify=not minimal):
return False
# there are free symbols -- simple expansion might work
_, val = val.as_content_primitive()
val = _mexpand(val.as_numer_denom()[0], recursive=True)
elif attempt == 2:
if minimal:
return
if flags.get('simplify', True):
for k in sol:
sol[k] = simplify(sol[k])
# start over without the failed expanded form, possibly
# with a simplified solution
val = simplify(f.subs(sol))
if flags.get('force', True):
val, reps = posify(val)
# expansion may work now, so try again and check
exval = _mexpand(val, recursive=True)
if exval.is_number:
# we can decide now
val = exval
else:
# if there are no radicals and no functions then this can't be
# zero anymore -- can it?
pot = preorder_traversal(expand_mul(val))
seen = set()
saw_pow_func = False
for p in pot:
if p in seen:
continue
seen.add(p)
if p.is_Pow and not p.exp.is_Integer:
saw_pow_func = True
elif p.is_Function:
saw_pow_func = True
elif isinstance(p, UndefinedFunction):
saw_pow_func = True
if saw_pow_func:
break
if saw_pow_func is False:
return False
if flags.get('force', True):
# don't do a zero check with the positive assumptions in place
val = val.subs(reps)
nz = fuzzy_not(val.is_zero)
if nz is not None:
# issue 5673: nz may be True even when False
# so these are just hacks to keep a false positive
# from being returned
# HACK 1: LambertW (issue 5673)
if val.is_number and val.has(LambertW):
# don't eval this to verify solution since if we got here,
# numerical must be False
return None
# add other HACKs here if necessary, otherwise we assume
# the nz value is correct
return not nz
break
if val == was:
continue
elif val.is_Rational:
return val == 0
if numerical and val.is_number:
return (abs(val.n(18).n(12, chop=True)) < 1e-9) is S.true
was = val
if flags.get('warn', False):
warnings.warn("\n\tWarning: could not verify solution %s." % sol)
# returns None if it can't conclude
# TODO: improve solution testing
def solve(f, *symbols, **flags):
r"""
Algebraically solves equations and systems of equations.
Explanation
===========
Currently supported:
- polynomial
- transcendental
- piecewise combinations of the above
- systems of linear and polynomial equations
- systems containing relational expressions
Examples
========
The output varies according to the input and can be seen by example:
>>> from sympy import solve, Poly, Eq, Function, exp
>>> from sympy.abc import x, y, z, a, b
>>> f = Function('f')
Boolean or univariate Relational:
>>> solve(x < 3)
(-oo < x) & (x < 3)
To always get a list of solution mappings, use flag dict=True:
>>> solve(x - 3, dict=True)
[{x: 3}]
>>> sol = solve([x - 3, y - 1], dict=True)
>>> sol
[{x: 3, y: 1}]
>>> sol[0][x]
3
>>> sol[0][y]
1
To get a list of *symbols* and set of solution(s) use flag set=True:
>>> solve([x**2 - 3, y - 1], set=True)
([x, y], {(-sqrt(3), 1), (sqrt(3), 1)})
Single expression and single symbol that is in the expression:
>>> solve(x - y, x)
[y]
>>> solve(x - 3, x)
[3]
>>> solve(Eq(x, 3), x)
[3]
>>> solve(Poly(x - 3), x)
[3]
>>> solve(x**2 - y**2, x, set=True)
([x], {(-y,), (y,)})
>>> solve(x**4 - 1, x, set=True)
([x], {(-1,), (1,), (-I,), (I,)})
Single expression with no symbol that is in the expression:
>>> solve(3, x)
[]
>>> solve(x - 3, y)
[]
Single expression with no symbol given. In this case, all free *symbols*
will be selected as potential *symbols* to solve for. If the equation is
univariate then a list of solutions is returned; otherwise - as is the case
when *symbols* are given as an iterable of length greater than 1 - a list of
mappings will be returned:
>>> solve(x - 3)
[3]
>>> solve(x**2 - y**2)
[{x: -y}, {x: y}]
>>> solve(z**2*x**2 - z**2*y**2)
[{x: -y}, {x: y}, {z: 0}]
>>> solve(z**2*x - z**2*y**2)
[{x: y**2}, {z: 0}]
When an object other than a Symbol is given as a symbol, it is
isolated algebraically and an implicit solution may be obtained.
This is mostly provided as a convenience to save you from replacing
the object with a Symbol and solving for that Symbol. It will only
work if the specified object can be replaced with a Symbol using the
subs method:
>>> solve(f(x) - x, f(x))
[x]
>>> solve(f(x).diff(x) - f(x) - x, f(x).diff(x))
[x + f(x)]
>>> solve(f(x).diff(x) - f(x) - x, f(x))
[-x + Derivative(f(x), x)]
>>> solve(x + exp(x)**2, exp(x), set=True)
([exp(x)], {(-sqrt(-x),), (sqrt(-x),)})
>>> from sympy import Indexed, IndexedBase, Tuple, sqrt
>>> A = IndexedBase('A')
>>> eqs = Tuple(A[1] + A[2] - 3, A[1] - A[2] + 1)
>>> solve(eqs, eqs.atoms(Indexed))
{A[1]: 1, A[2]: 2}
* To solve for a symbol implicitly, use implicit=True:
>>> solve(x + exp(x), x)
[-LambertW(1)]
>>> solve(x + exp(x), x, implicit=True)
[-exp(x)]
* It is possible to solve for anything that can be targeted with
subs:
>>> solve(x + 2 + sqrt(3), x + 2)
[-sqrt(3)]
>>> solve((x + 2 + sqrt(3), x + 4 + y), y, x + 2)
{y: -2 + sqrt(3), x + 2: -sqrt(3)}
* Nothing heroic is done in this implicit solving so you may end up
with a symbol still in the solution:
>>> eqs = (x*y + 3*y + sqrt(3), x + 4 + y)
>>> solve(eqs, y, x + 2)
{y: -sqrt(3)/(x + 3), x + 2: (-2*x - 6 + sqrt(3))/(x + 3)}
>>> solve(eqs, y*x, x)
{x: -y - 4, x*y: -3*y - sqrt(3)}
* If you attempt to solve for a number remember that the number
you have obtained does not necessarily mean that the value is
equivalent to the expression obtained:
>>> solve(sqrt(2) - 1, 1)
[sqrt(2)]
>>> solve(x - y + 1, 1) # /!\ -1 is targeted, too
[x/(y - 1)]
>>> [_.subs(z, -1) for _ in solve((x - y + 1).subs(-1, z), 1)]
[-x + y]
* To solve for a function within a derivative, use ``dsolve``.
Single expression and more than one symbol:
* When there is a linear solution:
>>> solve(x - y**2, x, y)
[(y**2, y)]
>>> solve(x**2 - y, x, y)
[(x, x**2)]
>>> solve(x**2 - y, x, y, dict=True)
[{y: x**2}]
* When undetermined coefficients are identified:
* That are linear:
>>> solve((a + b)*x - b + 2, a, b)
{a: -2, b: 2}
* That are nonlinear:
>>> solve((a + b)*x - b**2 + 2, a, b, set=True)
([a, b], {(-sqrt(2), sqrt(2)), (sqrt(2), -sqrt(2))})
* If there is no linear solution, then the first successful
attempt for a nonlinear solution will be returned:
>>> solve(x**2 - y**2, x, y, dict=True)
[{x: -y}, {x: y}]
>>> solve(x**2 - y**2/exp(x), x, y, dict=True)
[{x: 2*LambertW(-y/2)}, {x: 2*LambertW(y/2)}]
>>> solve(x**2 - y**2/exp(x), y, x)
[(-x*sqrt(exp(x)), x), (x*sqrt(exp(x)), x)]
Iterable of one or more of the above:
* Involving relationals or bools:
>>> solve([x < 3, x - 2])
Eq(x, 2)
>>> solve([x > 3, x - 2])
False
* When the system is linear:
* With a solution:
>>> solve([x - 3], x)
{x: 3}
>>> solve((x + 5*y - 2, -3*x + 6*y - 15), x, y)
{x: -3, y: 1}
>>> solve((x + 5*y - 2, -3*x + 6*y - 15), x, y, z)
{x: -3, y: 1}
>>> solve((x + 5*y - 2, -3*x + 6*y - z), z, x, y)
{x: 2 - 5*y, z: 21*y - 6}
* Without a solution:
>>> solve([x + 3, x - 3])
[]
* When the system is not linear:
>>> solve([x**2 + y -2, y**2 - 4], x, y, set=True)
([x, y], {(-2, -2), (0, 2), (2, -2)})
* If no *symbols* are given, all free *symbols* will be selected and a
list of mappings returned:
>>> solve([x - 2, x**2 + y])
[{x: 2, y: -4}]
>>> solve([x - 2, x**2 + f(x)], {f(x), x})
[{x: 2, f(x): -4}]
* If any equation does not depend on the symbol(s) given, it will be
eliminated from the equation set and an answer may be given
implicitly in terms of variables that were not of interest:
>>> solve([x - y, y - 3], x)
{x: y}
**Additional Examples**
``solve()`` with check=True (default) will run through the symbol tags to
elimate unwanted solutions. If no assumptions are included, all possible
solutions will be returned:
>>> from sympy import Symbol, solve
>>> x = Symbol("x")
>>> solve(x**2 - 1)
[-1, 1]
By using the positive tag, only one solution will be returned:
>>> pos = Symbol("pos", positive=True)
>>> solve(pos**2 - 1)
[1]
Assumptions are not checked when ``solve()`` input involves
relationals or bools.
When the solutions are checked, those that make any denominator zero
are automatically excluded. If you do not want to exclude such solutions,
then use the check=False option:
>>> from sympy import sin, limit
>>> solve(sin(x)/x) # 0 is excluded
[pi]
If check=False, then a solution to the numerator being zero is found: x = 0.
In this case, this is a spurious solution since $\sin(x)/x$ has the well
known limit (without dicontinuity) of 1 at x = 0:
>>> solve(sin(x)/x, check=False)
[0, pi]
In the following case, however, the limit exists and is equal to the
value of x = 0 that is excluded when check=True:
>>> eq = x**2*(1/x - z**2/x)
>>> solve(eq, x)
[]
>>> solve(eq, x, check=False)
[0]
>>> limit(eq, x, 0, '-')
0
>>> limit(eq, x, 0, '+')
0
**Disabling High-Order Explicit Solutions**
When solving polynomial expressions, you might not want explicit solutions
(which can be quite long). If the expression is univariate, ``CRootOf``
instances will be returned instead:
>>> solve(x**3 - x + 1)
[-1/((-1/2 - sqrt(3)*I/2)*(3*sqrt(69)/2 + 27/2)**(1/3)) - (-1/2 -
sqrt(3)*I/2)*(3*sqrt(69)/2 + 27/2)**(1/3)/3, -(-1/2 +
sqrt(3)*I/2)*(3*sqrt(69)/2 + 27/2)**(1/3)/3 - 1/((-1/2 +
sqrt(3)*I/2)*(3*sqrt(69)/2 + 27/2)**(1/3)), -(3*sqrt(69)/2 +
27/2)**(1/3)/3 - 1/(3*sqrt(69)/2 + 27/2)**(1/3)]
>>> solve(x**3 - x + 1, cubics=False)
[CRootOf(x**3 - x + 1, 0),
CRootOf(x**3 - x + 1, 1),
CRootOf(x**3 - x + 1, 2)]
If the expression is multivariate, no solution might be returned:
>>> solve(x**3 - x + a, x, cubics=False)
[]
Sometimes solutions will be obtained even when a flag is False because the
expression could be factored. In the following example, the equation can
be factored as the product of a linear and a quadratic factor so explicit
solutions (which did not require solving a cubic expression) are obtained:
>>> eq = x**3 + 3*x**2 + x - 1
>>> solve(eq, cubics=False)
[-1, -1 + sqrt(2), -sqrt(2) - 1]
**Solving Equations Involving Radicals**
Because of SymPy's use of the principle root, some solutions
to radical equations will be missed unless check=False:
>>> from sympy import root
>>> eq = root(x**3 - 3*x**2, 3) + 1 - x
>>> solve(eq)
[]
>>> solve(eq, check=False)
[1/3]
In the above example, there is only a single solution to the
equation. Other expressions will yield spurious roots which
must be checked manually; roots which give a negative argument
to odd-powered radicals will also need special checking:
>>> from sympy import real_root, S
>>> eq = root(x, 3) - root(x, 5) + S(1)/7
>>> solve(eq) # this gives 2 solutions but misses a 3rd
[CRootOf(7*x**5 - 7*x**3 + 1, 1)**15,
CRootOf(7*x**5 - 7*x**3 + 1, 2)**15]
>>> sol = solve(eq, check=False)
>>> [abs(eq.subs(x,i).n(2)) for i in sol]
[0.48, 0.e-110, 0.e-110, 0.052, 0.052]
The first solution is negative so ``real_root`` must be used to see that it
satisfies the expression:
>>> abs(real_root(eq.subs(x, sol[0])).n(2))
0.e-110
If the roots of the equation are not real then more care will be
necessary to find the roots, especially for higher order equations.
Consider the following expression:
>>> expr = root(x, 3) - root(x, 5)
We will construct a known value for this expression at x = 3 by selecting
the 1-th root for each radical:
>>> expr1 = root(x, 3, 1) - root(x, 5, 1)
>>> v = expr1.subs(x, -3)
The ``solve`` function is unable to find any exact roots to this equation:
>>> eq = Eq(expr, v); eq1 = Eq(expr1, v)
>>> solve(eq, check=False), solve(eq1, check=False)
([], [])
The function ``unrad``, however, can be used to get a form of the equation
for which numerical roots can be found:
>>> from sympy.solvers.solvers import unrad
>>> from sympy import nroots
>>> e, (p, cov) = unrad(eq)
>>> pvals = nroots(e)
>>> inversion = solve(cov, x)[0]
>>> xvals = [inversion.subs(p, i) for i in pvals]
Although ``eq`` or ``eq1`` could have been used to find ``xvals``, the
solution can only be verified with ``expr1``:
>>> z = expr - v
>>> [xi.n(chop=1e-9) for xi in xvals if abs(z.subs(x, xi).n()) < 1e-9]
[]
>>> z1 = expr1 - v
>>> [xi.n(chop=1e-9) for xi in xvals if abs(z1.subs(x, xi).n()) < 1e-9]
[-3.0]
Parameters
==========
f :
- a single Expr or Poly that must be zero
- an Equality
- a Relational expression
- a Boolean
- iterable of one or more of the above
symbols : (object(s) to solve for) specified as
- none given (other non-numeric objects will be used)
- single symbol
- denested list of symbols
(e.g., ``solve(f, x, y)``)
- ordered iterable of symbols
(e.g., ``solve(f, [x, y])``)
flags :
dict=True (default is False)
Return list (perhaps empty) of solution mappings.
set=True (default is False)
Return list of symbols and set of tuple(s) of solution(s).
exclude=[] (default)
Do not try to solve for any of the free symbols in exclude;
if expressions are given, the free symbols in them will
be extracted automatically.
check=True (default)
If False, do not do any testing of solutions. This can be
useful if you want to include solutions that make any
denominator zero.
numerical=True (default)
Do a fast numerical check if *f* has only one symbol.
minimal=True (default is False)
A very fast, minimal testing.
warn=True (default is False)
Show a warning if ``checksol()`` could not conclude.
simplify=True (default)
Simplify all but polynomials of order 3 or greater before
returning them and (if check is not False) use the
general simplify function on the solutions and the
expression obtained when they are substituted into the
function which should be zero.
force=True (default is False)
Make positive all symbols without assumptions regarding sign.
rational=True (default)
Recast Floats as Rational; if this option is not used, the
system containing Floats may fail to solve because of issues
with polys. If rational=None, Floats will be recast as
rationals but the answer will be recast as Floats. If the
flag is False then nothing will be done to the Floats.
manual=True (default is False)
Do not use the polys/matrix method to solve a system of
equations, solve them one at a time as you might "manually."
implicit=True (default is False)
Allows ``solve`` to return a solution for a pattern in terms of
other functions that contain that pattern; this is only
needed if the pattern is inside of some invertible function
like cos, exp, ect.
particular=True (default is False)
Instructs ``solve`` to try to find a particular solution to a linear
system with as many zeros as possible; this is very expensive.
quick=True (default is False)
When using particular=True, use a fast heuristic to find a
solution with many zeros (instead of using the very slow method
guaranteed to find the largest number of zeros possible).
cubics=True (default)
Return explicit solutions when cubic expressions are encountered.
quartics=True (default)
Return explicit solutions when quartic expressions are encountered.
quintics=True (default)
Return explicit solutions (if possible) when quintic expressions
are encountered.
See Also
========
rsolve: For solving recurrence relationships
dsolve: For solving differential equations
"""
# keeping track of how f was passed since if it is a list
# a dictionary of results will be returned.
###########################################################################
def _sympified_list(w):
return list(map(sympify, w if iterable(w) else [w]))
bare_f = not iterable(f)
ordered_symbols = (symbols and
symbols[0] and
(isinstance(symbols[0], Symbol) or
is_sequence(symbols[0],
include=GeneratorType)
)
)
f, symbols = (_sympified_list(w) for w in [f, symbols])
if isinstance(f, list):
f = [s for s in f if s is not S.true and s is not True]
implicit = flags.get('implicit', False)
# preprocess symbol(s)
###########################################################################
if not symbols:
# get symbols from equations
symbols = set().union(*[fi.free_symbols for fi in f])
if len(symbols) < len(f):
for fi in f:
pot = preorder_traversal(fi)
for p in pot:
if isinstance(p, AppliedUndef):
flags['dict'] = True # better show symbols
symbols.add(p)
pot.skip() # don't go any deeper
symbols = list(symbols)
ordered_symbols = False
elif len(symbols) == 1 and iterable(symbols[0]):
symbols = symbols[0]
# remove symbols the user is not interested in
exclude = flags.pop('exclude', set())
if exclude:
if isinstance(exclude, Expr):
exclude = [exclude]
exclude = set().union(*[e.free_symbols for e in sympify(exclude)])
symbols = [s for s in symbols if s not in exclude]
# preprocess equation(s)
###########################################################################
for i, fi in enumerate(f):
if isinstance(fi, (Equality, Unequality)):
if 'ImmutableDenseMatrix' in [type(a).__name__ for a in fi.args]:
fi = fi.lhs - fi.rhs
else:
L, R = fi.args
if isinstance(R, BooleanAtom):
L, R = R, L
if isinstance(L, BooleanAtom):
if isinstance(fi, Unequality):
L = ~L
if R.is_Relational:
fi = ~R if L is S.false else R
elif R.is_Symbol:
return L
elif R.is_Boolean and (~R).is_Symbol:
return ~L
else:
raise NotImplementedError(filldedent('''
Unanticipated argument of Eq when other arg
is True or False.
'''))
else:
fi = fi.rewrite(Add, evaluate=False)
f[i] = fi
if fi.is_Relational:
return reduce_inequalities(f, symbols=symbols)
if isinstance(fi, Poly):
f[i] = fi.as_expr()
# rewrite hyperbolics in terms of exp
f[i] = f[i].replace(lambda w: isinstance(w, HyperbolicFunction),
lambda w: w.rewrite(exp))
# if we have a Matrix, we need to iterate over its elements again
if f[i].is_Matrix:
bare_f = False
f.extend(list(f[i]))
f[i] = S.Zero
# if we can split it into real and imaginary parts then do so
freei = f[i].free_symbols
if freei and all(s.is_extended_real or s.is_imaginary for s in freei):
fr, fi = f[i].as_real_imag()
# accept as long as new re, im, arg or atan2 are not introduced
had = f[i].atoms(re, im, arg, atan2)
if fr and fi and fr != fi and not any(
i.atoms(re, im, arg, atan2) - had for i in (fr, fi)):
if bare_f:
bare_f = False
f[i: i + 1] = [fr, fi]
# real/imag handling -----------------------------
if any(isinstance(fi, (bool, BooleanAtom)) for fi in f):
if flags.get('set', False):
return [], set()
return []
for i, fi in enumerate(f):
# Abs
while True:
was = fi
fi = fi.replace(Abs, lambda arg:
separatevars(Abs(arg)).rewrite(Piecewise) if arg.has(*symbols)
else Abs(arg))
if was == fi:
break
for e in fi.find(Abs):
if e.has(*symbols):
raise NotImplementedError('solving %s when the argument '
'is not real or imaginary.' % e)
# arg
_arg = [a for a in fi.atoms(arg) if a.has(*symbols)]
fi = fi.xreplace(dict(list(zip(_arg,
[atan(im(a.args[0])/re(a.args[0])) for a in _arg]))))
# save changes
f[i] = fi
# see if re(s) or im(s) appear
irf = []
for s in symbols:
if s.is_extended_real or s.is_imaginary:
continue # neither re(x) nor im(x) will appear
# if re(s) or im(s) appear, the auxiliary equation must be present
if any(fi.has(re(s), im(s)) for fi in f):
irf.append((s, re(s) + S.ImaginaryUnit*im(s)))
if irf:
for s, rhs in irf:
for i, fi in enumerate(f):
f[i] = fi.xreplace({s: rhs})
f.append(s - rhs)
symbols.extend([re(s), im(s)])
if bare_f:
bare_f = False
flags['dict'] = True
# end of real/imag handling -----------------------------
symbols = list(uniq(symbols))
if not ordered_symbols:
# we do this to make the results returned canonical in case f
# contains a system of nonlinear equations; all other cases should
# be unambiguous
symbols = sorted(symbols, key=default_sort_key)
# we can solve for non-symbol entities by replacing them with Dummy symbols
f, symbols, swap_sym = recast_to_symbols(f, symbols)
# this is needed in the next two events
symset = set(symbols)
# get rid of equations that have no symbols of interest; we don't
# try to solve them because the user didn't ask and they might be
# hard to solve; this means that solutions may be given in terms
# of the eliminated equations e.g. solve((x-y, y-3), x) -> {x: y}
newf = []
for fi in f:
# let the solver handle equations that..
# - have no symbols but are expressions
# - have symbols of interest
# - have no symbols of interest but are constant
# but when an expression is not constant and has no symbols of
# interest, it can't change what we obtain for a solution from
# the remaining equations so we don't include it; and if it's
# zero it can be removed and if it's not zero, there is no
# solution for the equation set as a whole
#
# The reason for doing this filtering is to allow an answer
# to be obtained to queries like solve((x - y, y), x); without
# this mod the return value is []
ok = False
if fi.has(*symset):
ok = True
else:
if fi.is_number:
if fi.is_Number:
if fi.is_zero:
continue
return []
ok = True
else:
if fi.is_constant():
ok = True
if ok:
newf.append(fi)
if not newf:
return []
f = newf
del newf
# mask off any Object that we aren't going to invert: Derivative,
# Integral, etc... so that solving for anything that they contain will
# give an implicit solution
seen = set()
non_inverts = set()
for fi in f:
pot = preorder_traversal(fi)
for p in pot:
if not isinstance(p, Expr) or isinstance(p, Piecewise):
pass
elif (isinstance(p, bool) or
not p.args or
p in symset or
p.is_Add or p.is_Mul or
p.is_Pow and not implicit or
p.is_Function and not implicit) and p.func not in (re, im):
continue
elif not p in seen:
seen.add(p)
if p.free_symbols & symset:
non_inverts.add(p)
else:
continue
pot.skip()
del seen
non_inverts = dict(list(zip(non_inverts, [Dummy() for _ in non_inverts])))
f = [fi.subs(non_inverts) for fi in f]
# Both xreplace and subs are needed below: xreplace to force substitution
# inside Derivative, subs to handle non-straightforward substitutions
non_inverts = [(v, k.xreplace(swap_sym).subs(swap_sym)) for k, v in non_inverts.items()]
# rationalize Floats
floats = False
if flags.get('rational', True) is not False:
for i, fi in enumerate(f):
if fi.has(Float):
floats = True
f[i] = nsimplify(fi, rational=True)
# capture any denominators before rewriting since
# they may disappear after the rewrite, e.g. issue 14779
flags['_denominators'] = _simple_dens(f[0], symbols)
# Any embedded piecewise functions need to be brought out to the
# top level so that the appropriate strategy gets selected.
# However, this is necessary only if one of the piecewise
# functions depends on one of the symbols we are solving for.
def _has_piecewise(e):
if e.is_Piecewise:
return e.has(*symbols)
return any([_has_piecewise(a) for a in e.args])
for i, fi in enumerate(f):
if _has_piecewise(fi):
f[i] = piecewise_fold(fi)
#
# try to get a solution
###########################################################################
if bare_f:
solution = _solve(f[0], *symbols, **flags)
else:
solution = _solve_system(f, symbols, **flags)
#
# postprocessing
###########################################################################
# Restore masked-off objects
if non_inverts:
def _do_dict(solution):
return {k: v.subs(non_inverts) for k, v in
solution.items()}
for i in range(1):
if isinstance(solution, dict):
solution = _do_dict(solution)
break
elif solution and isinstance(solution, list):
if isinstance(solution[0], dict):
solution = [_do_dict(s) for s in solution]
break
elif isinstance(solution[0], tuple):
solution = [tuple([v.subs(non_inverts) for v in s]) for s
in solution]
break
else:
solution = [v.subs(non_inverts) for v in solution]
break
elif not solution:
break
else:
raise NotImplementedError(filldedent('''
no handling of %s was implemented''' % solution))
# Restore original "symbols" if a dictionary is returned.
# This is not necessary for
# - the single univariate equation case
# since the symbol will have been removed from the solution;
# - the nonlinear poly_system since that only supports zero-dimensional
# systems and those results come back as a list
#
# ** unless there were Derivatives with the symbols, but those were handled
# above.
if swap_sym:
symbols = [swap_sym.get(k, k) for k in symbols]
if isinstance(solution, dict):
solution = {swap_sym.get(k, k): v.subs(swap_sym)
for k, v in solution.items()}
elif solution and isinstance(solution, list) and isinstance(solution[0], dict):
for i, sol in enumerate(solution):
solution[i] = {swap_sym.get(k, k): v.subs(swap_sym)
for k, v in sol.items()}
# undo the dictionary solutions returned when the system was only partially
# solved with poly-system if all symbols are present
if (
not flags.get('dict', False) and
solution and
ordered_symbols and
not isinstance(solution, dict) and
all(isinstance(sol, dict) for sol in solution)
):
solution = [tuple([r.get(s, s).subs(r) for s in symbols])
for r in solution]
# Get assumptions about symbols, to filter solutions.
# Note that if assumptions about a solution can't be verified, it is still
# returned.
check = flags.get('check', True)
# restore floats
if floats and solution and flags.get('rational', None) is None:
solution = nfloat(solution, exponent=False)
if check and solution: # assumption checking
warn = flags.get('warn', False)
got_None = [] # solutions for which one or more symbols gave None
no_False = [] # solutions for which no symbols gave False
if isinstance(solution, tuple):
# this has already been checked and is in as_set form
return solution
elif isinstance(solution, list):
if isinstance(solution[0], tuple):
for sol in solution:
for symb, val in zip(symbols, sol):
test = check_assumptions(val, **symb.assumptions0)
if test is False:
break
if test is None:
got_None.append(sol)
else:
no_False.append(sol)
elif isinstance(solution[0], dict):
for sol in solution:
a_None = False
for symb, val in sol.items():
test = check_assumptions(val, **symb.assumptions0)
if test:
continue
if test is False:
break
a_None = True
else:
no_False.append(sol)
if a_None:
got_None.append(sol)
else: # list of expressions
for sol in solution:
test = check_assumptions(sol, **symbols[0].assumptions0)
if test is False:
continue
no_False.append(sol)
if test is None:
got_None.append(sol)
elif isinstance(solution, dict):
a_None = False
for symb, val in solution.items():
test = check_assumptions(val, **symb.assumptions0)
if test:
continue
if test is False:
no_False = None
break
a_None = True
else:
no_False = solution
if a_None:
got_None.append(solution)
elif isinstance(solution, (Relational, And, Or)):
if len(symbols) != 1:
raise ValueError("Length should be 1")
if warn and symbols[0].assumptions0:
warnings.warn(filldedent("""
\tWarning: assumptions about variable '%s' are
not handled currently.""" % symbols[0]))
# TODO: check also variable assumptions for inequalities
else:
raise TypeError('Unrecognized solution') # improve the checker
solution = no_False
if warn and got_None:
warnings.warn(filldedent("""
\tWarning: assumptions concerning following solution(s)
can't be checked:""" + '\n\t' +
', '.join(str(s) for s in got_None)))
#
# done
###########################################################################
as_dict = flags.get('dict', False)
as_set = flags.get('set', False)
if not as_set and isinstance(solution, list):
# Make sure that a list of solutions is ordered in a canonical way.
solution.sort(key=default_sort_key)
if not as_dict and not as_set:
return solution or []
# return a list of mappings or []
if not solution:
solution = []
else:
if isinstance(solution, dict):
solution = [solution]
elif iterable(solution[0]):
solution = [dict(list(zip(symbols, s))) for s in solution]
elif isinstance(solution[0], dict):
pass
else:
if len(symbols) != 1:
raise ValueError("Length should be 1")
solution = [{symbols[0]: s} for s in solution]
if as_dict:
return solution
assert as_set
if not solution:
return [], set()
k = list(ordered(solution[0].keys()))
return k, {tuple([s[ki] for ki in k]) for s in solution}
def _solve(f, *symbols, **flags):
"""
Return a checked solution for *f* in terms of one or more of the
symbols. A list should be returned except for the case when a linear
undetermined-coefficients equation is encountered (in which case
a dictionary is returned).
If no method is implemented to solve the equation, a NotImplementedError
will be raised. In the case that conversion of an expression to a Poly
gives None a ValueError will be raised.
"""
not_impl_msg = "No algorithms are implemented to solve equation %s"
if len(symbols) != 1:
soln = None
free = f.free_symbols
ex = free - set(symbols)
if len(ex) != 1:
ind, dep = f.as_independent(*symbols)
ex = ind.free_symbols & dep.free_symbols
if len(ex) == 1:
ex = ex.pop()
try:
# soln may come back as dict, list of dicts or tuples, or
# tuple of symbol list and set of solution tuples
soln = solve_undetermined_coeffs(f, symbols, ex, **flags)
except NotImplementedError:
pass
if soln:
if flags.get('simplify', True):
if isinstance(soln, dict):
for k in soln:
soln[k] = simplify(soln[k])
elif isinstance(soln, list):
if isinstance(soln[0], dict):
for d in soln:
for k in d:
d[k] = simplify(d[k])
elif isinstance(soln[0], tuple):
soln = [tuple(simplify(i) for i in j) for j in soln]
else:
raise TypeError('unrecognized args in list')
elif isinstance(soln, tuple):
sym, sols = soln
soln = sym, {tuple(simplify(i) for i in j) for j in sols}
else:
raise TypeError('unrecognized solution type')
return soln
# find first successful solution
failed = []
got_s = set([])
result = []
for s in symbols:
xi, v = solve_linear(f, symbols=[s])
if xi == s:
# no need to check but we should simplify if desired
if flags.get('simplify', True):
v = simplify(v)
vfree = v.free_symbols
if got_s and any([ss in vfree for ss in got_s]):
# sol depends on previously solved symbols: discard it
continue
got_s.add(xi)
result.append({xi: v})
elif xi: # there might be a non-linear solution if xi is not 0
failed.append(s)
if not failed:
return result
for s in failed:
try:
soln = _solve(f, s, **flags)
for sol in soln:
if got_s and any([ss in sol.free_symbols for ss in got_s]):
# sol depends on previously solved symbols: discard it
continue
got_s.add(s)
result.append({s: sol})
except NotImplementedError:
continue
if got_s:
return result
else:
raise NotImplementedError(not_impl_msg % f)
symbol = symbols[0]
#expand binomials only if it has the unknown symbol
f = f.replace(lambda e: isinstance(e, binomial) and e.has(symbol),
lambda e: expand_func(e))
# /!\ capture this flag then set it to False so that no checking in
# recursive calls will be done; only the final answer is checked
flags['check'] = checkdens = check = flags.pop('check', True)
# build up solutions if f is a Mul
if f.is_Mul:
result = set()
for m in f.args:
if m in set([S.NegativeInfinity, S.ComplexInfinity, S.Infinity]):
result = set()
break
soln = _solve(m, symbol, **flags)
result.update(set(soln))
result = list(result)
if check:
# all solutions have been checked but now we must
# check that the solutions do not set denominators
# in any factor to zero
dens = flags.get('_denominators', _simple_dens(f, symbols))
result = [s for s in result if
all(not checksol(den, {symbol: s}, **flags) for den in
dens)]
# set flags for quick exit at end; solutions for each
# factor were already checked and simplified
check = False
flags['simplify'] = False
elif f.is_Piecewise:
result = set()
for i, (expr, cond) in enumerate(f.args):
if expr.is_zero:
raise NotImplementedError(
'solve cannot represent interval solutions')
candidates = _solve(expr, symbol, **flags)
# the explicit condition for this expr is the current cond
# and none of the previous conditions
args = [~c for _, c in f.args[:i]] + [cond]
cond = And(*args)
for candidate in candidates:
if candidate in result:
# an unconditional value was already there
continue
try:
v = cond.subs(symbol, candidate)
_eval_simplify = getattr(v, '_eval_simplify', None)
if _eval_simplify is not None:
# unconditionally take the simpification of v
v = _eval_simplify(ratio=2, measure=lambda x: 1)
except TypeError:
# incompatible type with condition(s)
continue
if v == False:
continue
if v == True:
result.add(candidate)
else:
result.add(Piecewise(
(candidate, v),
(S.NaN, True)))
# set flags for quick exit at end; solutions for each
# piece were already checked and simplified
check = False
flags['simplify'] = False
else:
# first see if it really depends on symbol and whether there
# is only a linear solution
f_num, sol = solve_linear(f, symbols=symbols)
if f_num.is_zero or sol is S.NaN:
return []
elif f_num.is_Symbol:
# no need to check but simplify if desired
if flags.get('simplify', True):
sol = simplify(sol)
return [sol]
poly = None
# check for a single non-symbol generator
dums = f_num.atoms(Dummy)
D = f_num.replace(
lambda i: isinstance(i, Add) and symbol in i.free_symbols,
lambda i: Dummy())
if not D.is_Dummy:
dgen = D.atoms(Dummy) - dums
if len(dgen) == 1:
d = dgen.pop()
w = Wild('g')
gen = f_num.match(D.xreplace({d: w}))[w]
spart = gen.as_independent(symbol)[1].as_base_exp()[0]
if spart == symbol:
try:
poly = Poly(f_num, spart)
except PolynomialError:
pass
result = False # no solution was obtained
msg = '' # there is no failure message
# Poly is generally robust enough to convert anything to
# a polynomial and tell us the different generators that it
# contains, so we will inspect the generators identified by
# polys to figure out what to do.
# try to identify a single generator that will allow us to solve this
# as a polynomial, followed (perhaps) by a change of variables if the
# generator is not a symbol
try:
if poly is None:
poly = Poly(f_num)
if poly is None:
raise ValueError('could not convert %s to Poly' % f_num)
except GeneratorsNeeded:
simplified_f = simplify(f_num)
if simplified_f != f_num:
return _solve(simplified_f, symbol, **flags)
raise ValueError('expression appears to be a constant')
gens = [g for g in poly.gens if g.has(symbol)]
def _as_base_q(x):
"""Return (b**e, q) for x = b**(p*e/q) where p/q is the leading
Rational of the exponent of x, e.g. exp(-2*x/3) -> (exp(x), 3)
"""
b, e = x.as_base_exp()
if e.is_Rational:
return b, e.q
if not e.is_Mul:
return x, 1
c, ee = e.as_coeff_Mul()
if c.is_Rational and c is not S.One: # c could be a Float
return b**ee, c.q
return x, 1
if len(gens) > 1:
# If there is more than one generator, it could be that the
# generators have the same base but different powers, e.g.
# >>> Poly(exp(x) + 1/exp(x))
# Poly(exp(-x) + exp(x), exp(-x), exp(x), domain='ZZ')
#
# If unrad was not disabled then there should be no rational
# exponents appearing as in
# >>> Poly(sqrt(x) + sqrt(sqrt(x)))
# Poly(sqrt(x) + x**(1/4), sqrt(x), x**(1/4), domain='ZZ')
bases, qs = list(zip(*[_as_base_q(g) for g in gens]))
bases = set(bases)
if len(bases) > 1 or not all(q == 1 for q in qs):
funcs = set(b for b in bases if b.is_Function)
trig = set([_ for _ in funcs if
isinstance(_, TrigonometricFunction)])
other = funcs - trig
if not other and len(funcs.intersection(trig)) > 1:
newf = None
if f_num.is_Add and len(f_num.args) == 2:
# check for sin(x)**p = cos(x)**p
_args = f_num.args
t = a, b = [i.atoms(Function).intersection(
trig) for i in _args]
if all(len(i) == 1 for i in t):
a, b = [i.pop() for i in t]
if isinstance(a, cos):
a, b = b, a
_args = _args[::-1]
if isinstance(a, sin) and isinstance(b, cos
) and a.args[0] == b.args[0]:
# sin(x) + cos(x) = 0 -> tan(x) + 1 = 0
newf, _d = (TR2i(_args[0]/_args[1]) + 1
).as_numer_denom()
if not _d.is_Number:
newf = None
if newf is None:
newf = TR1(f_num).rewrite(tan)
if newf != f_num:
# don't check the rewritten form --check
# solutions in the un-rewritten form below
flags['check'] = False
result = _solve(newf, symbol, **flags)
flags['check'] = check
# just a simple case - see if replacement of single function
# clears all symbol-dependent functions, e.g.
# log(x) - log(log(x) - 1) - 3 can be solved even though it has
# two generators.
if result is False and funcs:
funcs = list(ordered(funcs)) # put shallowest function first
f1 = funcs[0]
t = Dummy('t')
# perform the substitution
ftry = f_num.subs(f1, t)
# if no Functions left, we can proceed with usual solve
if not ftry.has(symbol):
cv_sols = _solve(ftry, t, **flags)
cv_inv = _solve(t - f1, symbol, **flags)[0]
sols = list()
for sol in cv_sols:
sols.append(cv_inv.subs(t, sol))
result = list(ordered(sols))
if result is False:
msg = 'multiple generators %s' % gens
else:
# e.g. case where gens are exp(x), exp(-x)
u = bases.pop()
t = Dummy('t')
inv = _solve(u - t, symbol, **flags)
if isinstance(u, (Pow, exp)):
# this will be resolved by factor in _tsolve but we might
# as well try a simple expansion here to get things in
# order so something like the following will work now without
# having to factor:
#
# >>> eq = (exp(I*(-x-2))+exp(I*(x+2)))
# >>> eq.subs(exp(x),y) # fails
# exp(I*(-x - 2)) + exp(I*(x + 2))
# >>> eq.expand().subs(exp(x),y) # works
# y**I*exp(2*I) + y**(-I)*exp(-2*I)
def _expand(p):
b, e = p.as_base_exp()
e = expand_mul(e)
return expand_power_exp(b**e)
ftry = f_num.replace(
lambda w: w.is_Pow or isinstance(w, exp),
_expand).subs(u, t)
if not ftry.has(symbol):
soln = _solve(ftry, t, **flags)
sols = list()
for sol in soln:
for i in inv:
sols.append(i.subs(t, sol))
result = list(ordered(sols))
elif len(gens) == 1:
# There is only one generator that we are interested in, but
# there may have been more than one generator identified by
# polys (e.g. for symbols other than the one we are interested
# in) so recast the poly in terms of our generator of interest.
# Also use composite=True with f_num since Poly won't update
# poly as documented in issue 8810.
poly = Poly(f_num, gens[0], composite=True)
# if we aren't on the tsolve-pass, use roots
if not flags.pop('tsolve', False):
soln = None
deg = poly.degree()
flags['tsolve'] = True
solvers = {k: flags.get(k, True) for k in
('cubics', 'quartics', 'quintics')}
soln = roots(poly, **solvers)
if sum(soln.values()) < deg:
# e.g. roots(32*x**5 + 400*x**4 + 2032*x**3 +
# 5000*x**2 + 6250*x + 3189) -> {}
# so all_roots is used and RootOf instances are
# returned *unless* the system is multivariate
# or high-order EX domain.
try:
soln = poly.all_roots()
except NotImplementedError:
if not flags.get('incomplete', True):
raise NotImplementedError(
filldedent('''
Neither high-order multivariate polynomials
nor sorting of EX-domain polynomials is supported.
If you want to see any results, pass keyword incomplete=True to
solve; to see numerical values of roots
for univariate expressions, use nroots.
'''))
else:
pass
else:
soln = list(soln.keys())
if soln is not None:
u = poly.gen
if u != symbol:
try:
t = Dummy('t')
iv = _solve(u - t, symbol, **flags)
soln = list(ordered({i.subs(t, s) for i in iv for s in soln}))
except NotImplementedError:
# perhaps _tsolve can handle f_num
soln = None
else:
check = False # only dens need to be checked
if soln is not None:
if len(soln) > 2:
# if the flag wasn't set then unset it since high-order
# results are quite long. Perhaps one could base this
# decision on a certain critical length of the
# roots. In addition, wester test M2 has an expression
# whose roots can be shown to be real with the
# unsimplified form of the solution whereas only one of
# the simplified forms appears to be real.
flags['simplify'] = flags.get('simplify', False)
result = soln
# fallback if above fails
# -----------------------
if result is False:
# try unrad
if flags.pop('_unrad', True):
try:
u = unrad(f_num, symbol)
except (ValueError, NotImplementedError):
u = False
if u:
eq, cov = u
if cov:
isym, ieq = cov
inv = _solve(ieq, symbol, **flags)[0]
rv = {inv.subs(isym, xi) for xi in _solve(eq, isym, **flags)}
else:
try:
rv = set(_solve(eq, symbol, **flags))
except NotImplementedError:
rv = None
if rv is not None:
result = list(ordered(rv))
# if the flag wasn't set then unset it since unrad results
# can be quite long or of very high order
flags['simplify'] = flags.get('simplify', False)
else:
pass # for coverage
# try _tsolve
if result is False:
flags.pop('tsolve', None) # allow tsolve to be used on next pass
try:
soln = _tsolve(f_num, symbol, **flags)
if soln is not None:
result = soln
except PolynomialError:
pass
# ----------- end of fallback ----------------------------
if result is False:
raise NotImplementedError('\n'.join([msg, not_impl_msg % f]))
if flags.get('simplify', True):
result = list(map(simplify, result))
# we just simplified the solution so we now set the flag to
# False so the simplification doesn't happen again in checksol()
flags['simplify'] = False
if checkdens:
# reject any result that makes any denom. affirmatively 0;
# if in doubt, keep it
dens = _simple_dens(f, symbols)
result = [s for s in result if
all(not checksol(d, {symbol: s}, **flags)
for d in dens)]
if check:
# keep only results if the check is not False
result = [r for r in result if
checksol(f_num, {symbol: r}, **flags) is not False]
return result
def _solve_system(exprs, symbols, **flags):
if not exprs:
return []
polys = []
dens = set()
failed = []
result = False
linear = False
manual = flags.get('manual', False)
checkdens = check = flags.get('check', True)
for j, g in enumerate(exprs):
dens.update(_simple_dens(g, symbols))
i, d = _invert(g, *symbols)
g = d - i
g = g.as_numer_denom()[0]
if manual:
failed.append(g)
continue
poly = g.as_poly(*symbols, extension=True)
if poly is not None:
polys.append(poly)
else:
failed.append(g)
if not polys:
solved_syms = []
else:
if all(p.is_linear for p in polys):
n, m = len(polys), len(symbols)
matrix = zeros(n, m + 1)
for i, poly in enumerate(polys):
for monom, coeff in poly.terms():
try:
j = monom.index(1)
matrix[i, j] = coeff
except ValueError:
matrix[i, m] = -coeff
# returns a dictionary ({symbols: values}) or None
if flags.pop('particular', False):
result = minsolve_linear_system(matrix, *symbols, **flags)
else:
result = solve_linear_system(matrix, *symbols, **flags)
if failed:
if result:
solved_syms = list(result.keys())
else:
solved_syms = []
else:
linear = True
else:
if len(symbols) > len(polys):
from sympy.utilities.iterables import subsets
free = set().union(*[p.free_symbols for p in polys])
free = list(ordered(free.intersection(symbols)))
got_s = set()
result = []
for syms in subsets(free, len(polys)):
try:
# returns [] or list of tuples of solutions for syms
res = solve_poly_system(polys, *syms)
if res:
for r in res:
skip = False
for r1 in r:
if got_s and any([ss in r1.free_symbols
for ss in got_s]):
# sol depends on previously
# solved symbols: discard it
skip = True
if not skip:
got_s.update(syms)
result.extend([dict(list(zip(syms, r)))])
except NotImplementedError:
pass
if got_s:
solved_syms = list(got_s)
else:
raise NotImplementedError('no valid subset found')
else:
try:
result = solve_poly_system(polys, *symbols)
if result:
solved_syms = symbols
# we don't know here if the symbols provided
# were given or not, so let solve resolve that.
# A list of dictionaries is going to always be
# returned from here.
result = [dict(list(zip(solved_syms, r))) for r in result]
except NotImplementedError:
failed.extend([g.as_expr() for g in polys])
solved_syms = []
result = None
if result:
if isinstance(result, dict):
result = [result]
else:
result = [{}]
if failed:
# For each failed equation, see if we can solve for one of the
# remaining symbols from that equation. If so, we update the
# solution set and continue with the next failed equation,
# repeating until we are done or we get an equation that can't
# be solved.
def _ok_syms(e, sort=False):
rv = (e.free_symbols - solved_syms) & legal
if sort:
rv = list(rv)
rv.sort(key=default_sort_key)
return rv
solved_syms = set(solved_syms) # set of symbols we have solved for
legal = set(symbols) # what we are interested in
# sort so equation with the fewest potential symbols is first
u = Dummy() # used in solution checking
for eq in ordered(failed, lambda _: len(_ok_syms(_))):
newresult = []
bad_results = []
got_s = set()
hit = False
for r in result:
# update eq with everything that is known so far
eq2 = eq.subs(r)
# if check is True then we see if it satisfies this
# equation, otherwise we just accept it
if check and r:
b = checksol(u, u, eq2, minimal=True)
if b is not None:
# this solution is sufficient to know whether
# it is valid or not so we either accept or
# reject it, then continue
if b:
newresult.append(r)
else:
bad_results.append(r)
continue
# search for a symbol amongst those available that
# can be solved for
ok_syms = _ok_syms(eq2, sort=True)
if not ok_syms:
if r:
newresult.append(r)
break # skip as it's independent of desired symbols
for s in ok_syms:
try:
soln = _solve(eq2, s, **flags)
except NotImplementedError:
continue
# put each solution in r and append the now-expanded
# result in the new result list; use copy since the
# solution for s in being added in-place
for sol in soln:
if got_s and any([ss in sol.free_symbols for ss in got_s]):
# sol depends on previously solved symbols: discard it
continue
rnew = r.copy()
for k, v in r.items():
rnew[k] = v.subs(s, sol)
# and add this new solution
rnew[s] = sol
newresult.append(rnew)
hit = True
got_s.add(s)
if not hit:
raise NotImplementedError('could not solve %s' % eq2)
else:
result = newresult
for b in bad_results:
if b in result:
result.remove(b)
default_simplify = bool(failed) # rely on system-solvers to simplify
if flags.get('simplify', default_simplify):
for r in result:
for k in r:
r[k] = simplify(r[k])
flags['simplify'] = False # don't need to do so in checksol now
if checkdens:
result = [r for r in result
if not any(checksol(d, r, **flags) for d in dens)]
if check and not linear:
result = [r for r in result
if not any(checksol(e, r, **flags) is False for e in exprs)]
result = [r for r in result if r]
if linear and result:
result = result[0]
return result
def solve_linear(lhs, rhs=0, symbols=[], exclude=[]):
r"""
Return a tuple derived from ``f = lhs - rhs`` that is one of
the following: ``(0, 1)``, ``(0, 0)``, ``(symbol, solution)``, ``(n, d)``.
Explanation
===========
``(0, 1)`` meaning that ``f`` is independent of the symbols in *symbols*
that are not in *exclude*.
``(0, 0)`` meaning that there is no solution to the equation amongst the
symbols given. If the first element of the tuple is not zero, then the
function is guaranteed to be dependent on a symbol in *symbols*.
``(symbol, solution)`` where symbol appears linearly in the numerator of
``f``, is in *symbols* (if given), and is not in *exclude* (if given). No
simplification is done to ``f`` other than a ``mul=True`` expansion, so the
solution will correspond strictly to a unique solution.
``(n, d)`` where ``n`` and ``d`` are the numerator and denominator of ``f``
when the numerator was not linear in any symbol of interest; ``n`` will
never be a symbol unless a solution for that symbol was found (in which case
the second element is the solution, not the denominator).
Examples
========
>>> from sympy.core.power import Pow
>>> from sympy.polys.polytools import cancel
``f`` is independent of the symbols in *symbols* that are not in
*exclude*:
>>> from sympy.solvers.solvers import solve_linear
>>> from sympy.abc import x, y, z
>>> from sympy import cos, sin
>>> eq = y*cos(x)**2 + y*sin(x)**2 - y # = y*(1 - 1) = 0
>>> solve_linear(eq)
(0, 1)
>>> eq = cos(x)**2 + sin(x)**2 # = 1
>>> solve_linear(eq)
(0, 1)
>>> solve_linear(x, exclude=[x])
(0, 1)
The variable ``x`` appears as a linear variable in each of the
following:
>>> solve_linear(x + y**2)
(x, -y**2)
>>> solve_linear(1/x - y**2)
(x, y**(-2))
When not linear in ``x`` or ``y`` then the numerator and denominator are
returned:
>>> solve_linear(x**2/y**2 - 3)
(x**2 - 3*y**2, y**2)
If the numerator of the expression is a symbol, then ``(0, 0)`` is
returned if the solution for that symbol would have set any
denominator to 0:
>>> eq = 1/(1/x - 2)
>>> eq.as_numer_denom()
(x, 1 - 2*x)
>>> solve_linear(eq)
(0, 0)
But automatic rewriting may cause a symbol in the denominator to
appear in the numerator so a solution will be returned:
>>> (1/x)**-1
x
>>> solve_linear((1/x)**-1)
(x, 0)
Use an unevaluated expression to avoid this:
>>> solve_linear(Pow(1/x, -1, evaluate=False))
(0, 0)
If ``x`` is allowed to cancel in the following expression, then it
appears to be linear in ``x``, but this sort of cancellation is not
done by ``solve_linear`` so the solution will always satisfy the
original expression without causing a division by zero error.
>>> eq = x**2*(1/x - z**2/x)
>>> solve_linear(cancel(eq))
(x, 0)
>>> solve_linear(eq)
(x**2*(1 - z**2), x)
A list of symbols for which a solution is desired may be given:
>>> solve_linear(x + y + z, symbols=[y])
(y, -x - z)
A list of symbols to ignore may also be given:
>>> solve_linear(x + y + z, exclude=[x])
(y, -x - z)
(A solution for ``y`` is obtained because it is the first variable
from the canonically sorted list of symbols that had a linear
solution.)
"""
if isinstance(lhs, Equality):
if rhs:
raise ValueError(filldedent('''
If lhs is an Equality, rhs must be 0 but was %s''' % rhs))
rhs = lhs.rhs
lhs = lhs.lhs
dens = None
eq = lhs - rhs
n, d = eq.as_numer_denom()
if not n:
return S.Zero, S.One
free = n.free_symbols
if not symbols:
symbols = free
else:
bad = [s for s in symbols if not s.is_Symbol]
if bad:
if len(bad) == 1:
bad = bad[0]
if len(symbols) == 1:
eg = 'solve(%s, %s)' % (eq, symbols[0])
else:
eg = 'solve(%s, *%s)' % (eq, list(symbols))
raise ValueError(filldedent('''
solve_linear only handles symbols, not %s. To isolate
non-symbols use solve, e.g. >>> %s <<<.
''' % (bad, eg)))
symbols = free.intersection(symbols)
symbols = symbols.difference(exclude)
if not symbols:
return S.Zero, S.One
# derivatives are easy to do but tricky to analyze to see if they
# are going to disallow a linear solution, so for simplicity we
# just evaluate the ones that have the symbols of interest
derivs = defaultdict(list)
for der in n.atoms(Derivative):
csym = der.free_symbols & symbols
for c in csym:
derivs[c].append(der)
all_zero = True
for xi in sorted(symbols, key=default_sort_key): # canonical order
# if there are derivatives in this var, calculate them now
if isinstance(derivs[xi], list):
derivs[xi] = {der: der.doit() for der in derivs[xi]}
newn = n.subs(derivs[xi])
dnewn_dxi = newn.diff(xi)
# dnewn_dxi can be nonzero if it survives differentation by any
# of its free symbols
free = dnewn_dxi.free_symbols
if dnewn_dxi and (not free or any(dnewn_dxi.diff(s) for s in free)):
all_zero = False
if dnewn_dxi is S.NaN:
break
if xi not in dnewn_dxi.free_symbols:
vi = -1/dnewn_dxi*(newn.subs(xi, 0))
if dens is None:
dens = _simple_dens(eq, symbols)
if not any(checksol(di, {xi: vi}, minimal=True) is True
for di in dens):
# simplify any trivial integral
irep = [(i, i.doit()) for i in vi.atoms(Integral) if
i.function.is_number]
# do a slight bit of simplification
vi = expand_mul(vi.subs(irep))
return xi, vi
if all_zero:
return S.Zero, S.One
if n.is_Symbol: # no solution for this symbol was found
return S.Zero, S.Zero
return n, d
def minsolve_linear_system(system, *symbols, **flags):
r"""
Find a particular solution to a linear system.
Explanation
===========
In particular, try to find a solution with the minimal possible number
of non-zero variables using a naive algorithm with exponential complexity.
If ``quick=True``, a heuristic is used.
"""
quick = flags.get('quick', False)
# Check if there are any non-zero solutions at all
s0 = solve_linear_system(system, *symbols, **flags)
if not s0 or all(v == 0 for v in s0.values()):
return s0
if quick:
# We just solve the system and try to heuristically find a nice
# solution.
s = solve_linear_system(system, *symbols)
def update(determined, solution):
delete = []
for k, v in solution.items():
solution[k] = v.subs(determined)
if not solution[k].free_symbols:
delete.append(k)
determined[k] = solution[k]
for k in delete:
del solution[k]
determined = {}
update(determined, s)
while s:
# NOTE sort by default_sort_key to get deterministic result
k = max((k for k in s.values()),
key=lambda x: (len(x.free_symbols), default_sort_key(x)))
x = max(k.free_symbols, key=default_sort_key)
if len(k.free_symbols) != 1:
determined[x] = S.Zero
else:
val = solve(k)[0]
if val == 0 and all(v.subs(x, val) == 0 for v in s.values()):
determined[x] = S.One
else:
determined[x] = val
update(determined, s)
return determined
else:
# We try to select n variables which we want to be non-zero.
# All others will be assumed zero. We try to solve the modified system.
# If there is a non-trivial solution, just set the free variables to
# one. If we do this for increasing n, trying all combinations of
# variables, we will find an optimal solution.
# We speed up slightly by starting at one less than the number of
# variables the quick method manages.
from itertools import combinations
from sympy.utilities.misc import debug
N = len(symbols)
bestsol = minsolve_linear_system(system, *symbols, quick=True)
n0 = len([x for x in bestsol.values() if x != 0])
for n in range(n0 - 1, 1, -1):
debug('minsolve: %s' % n)
thissol = None
for nonzeros in combinations(list(range(N)), n):
subm = Matrix([system.col(i).T for i in nonzeros] + [system.col(-1).T]).T
s = solve_linear_system(subm, *[symbols[i] for i in nonzeros])
if s and not all(v == 0 for v in s.values()):
subs = [(symbols[v], S.One) for v in nonzeros]
for k, v in s.items():
s[k] = v.subs(subs)
for sym in symbols:
if sym not in s:
if symbols.index(sym) in nonzeros:
s[sym] = S.One
else:
s[sym] = S.Zero
thissol = s
break
if thissol is None:
break
bestsol = thissol
return bestsol
def solve_linear_system(system, *symbols, **flags):
r"""
Solve system of $N$ linear equations with $M$ variables, which means
both under- and overdetermined systems are supported.
Explanation
===========
The possible number of solutions is zero, one, or infinite. Respectively,
this procedure will return None or a dictionary with solutions. In the
case of underdetermined systems, all arbitrary parameters are skipped.
This may cause a situation in which an empty dictionary is returned.
In that case, all symbols can be assigned arbitrary values.
Input to this function is a $N\times M + 1$ matrix, which means it has
to be in augmented form. If you prefer to enter $N$ equations and $M$
unknowns then use ``solve(Neqs, *Msymbols)`` instead. Note: a local
copy of the matrix is made by this routine so the matrix that is
passed will not be modified.
The algorithm used here is fraction-free Gaussian elimination,
which results, after elimination, in an upper-triangular matrix.
Then solutions are found using back-substitution. This approach
is more efficient and compact than the Gauss-Jordan method.
Examples
========
>>> from sympy import Matrix, solve_linear_system
>>> from sympy.abc import x, y
Solve the following system::
x + 4 y == 2
-2 x + y == 14
>>> system = Matrix(( (1, 4, 2), (-2, 1, 14)))
>>> solve_linear_system(system, x, y)
{x: -6, y: 2}
A degenerate system returns an empty dictionary:
>>> system = Matrix(( (0,0,0), (0,0,0) ))
>>> solve_linear_system(system, x, y)
{}
"""
from sympy.solvers.solveset import linsolve
from sympy.sets import FiniteSet
assert system.shape[1] == len(symbols) + 1
# This is just a wrapper for linsolve:
sol = linsolve(system, *symbols)
if sol is S.EmptySet:
return None
elif isinstance(sol, FiniteSet):
assert len(sol) == 1
sol = sol.args[0]
return {sym:val for sym, val in zip(symbols, sol) if sym != val}
else:
raise RuntimeError("We should never get here!")
def solve_undetermined_coeffs(equ, coeffs, sym, **flags):
r"""
Solve equation of a type $p(x; a_1, \ldots, a_k) = q(x)$ where both
$p$ and $q$ are univariate polynomials that depend on $k$ parameters.
Explanation
===========
The result of this function is a dictionary with symbolic values of those
parameters with respect to coefficients in $q$.
This function accepts both equations class instances and ordinary
SymPy expressions. Specification of parameters and variables is
obligatory for efficiency and simplicity reasons.
Examples
========
>>> from sympy import Eq
>>> from sympy.abc import a, b, c, x
>>> from sympy.solvers import solve_undetermined_coeffs
>>> solve_undetermined_coeffs(Eq(2*a*x + a+b, x), [a, b], x)
{a: 1/2, b: -1/2}
>>> solve_undetermined_coeffs(Eq(a*c*x + a+b, x), [a, b], x)
{a: 1/c, b: -1/c}
"""
if isinstance(equ, Equality):
# got equation, so move all the
# terms to the left hand side
equ = equ.lhs - equ.rhs
equ = cancel(equ).as_numer_denom()[0]
system = list(collect(equ.expand(), sym, evaluate=False).values())
if not any(equ.has(sym) for equ in system):
# consecutive powers in the input expressions have
# been successfully collected, so solve remaining
# system using Gaussian elimination algorithm
return solve(system, *coeffs, **flags)
else:
return None # no solutions
def solve_linear_system_LU(matrix, syms):
"""
Solves the augmented matrix system using ``LUsolve`` and returns a
dictionary in which solutions are keyed to the symbols of *syms* as ordered.
Explanation
===========
The matrix must be invertible.
Examples
========
>>> from sympy import Matrix
>>> from sympy.abc import x, y, z
>>> from sympy.solvers.solvers import solve_linear_system_LU
>>> solve_linear_system_LU(Matrix([
... [1, 2, 0, 1],
... [3, 2, 2, 1],
... [2, 0, 0, 1]]), [x, y, z])
{x: 1/2, y: 1/4, z: -1/2}
See Also
========
LUsolve
"""
if matrix.rows != matrix.cols - 1:
raise ValueError("Rows should be equal to columns - 1")
A = matrix[:matrix.rows, :matrix.rows]
b = matrix[:, matrix.cols - 1:]
soln = A.LUsolve(b)
solutions = {}
for i in range(soln.rows):
solutions[syms[i]] = soln[i, 0]
return solutions
def det_perm(M):
"""
Return the determinant of *M* by using permutations to select factors.
Explanation
===========
For sizes larger than 8 the number of permutations becomes prohibitively
large, or if there are no symbols in the matrix, it is better to use the
standard determinant routines (e.g., ``M.det()``.)
See Also
========
det_minor
det_quick
"""
args = []
s = True
n = M.rows
list_ = getattr(M, '_mat', None)
if list_ is None:
list_ = flatten(M.tolist())
for perm in generate_bell(n):
fac = []
idx = 0
for j in perm:
fac.append(list_[idx + j])
idx += n
term = Mul(*fac) # disaster with unevaluated Mul -- takes forever for n=7
args.append(term if s else -term)
s = not s
return Add(*args)
def det_minor(M):
"""
Return the ``det(M)`` computed from minors without
introducing new nesting in products.
See Also
========
det_perm
det_quick
"""
n = M.rows
if n == 2:
return M[0, 0]*M[1, 1] - M[1, 0]*M[0, 1]
else:
return sum([(1, -1)[i % 2]*Add(*[M[0, i]*d for d in
Add.make_args(det_minor(M.minor_submatrix(0, i)))])
if M[0, i] else S.Zero for i in range(n)])
def det_quick(M, method=None):
"""
Return ``det(M)`` assuming that either
there are lots of zeros or the size of the matrix
is small. If this assumption is not met, then the normal
Matrix.det function will be used with method = ``method``.
See Also
========
det_minor
det_perm
"""
if any(i.has(Symbol) for i in M):
if M.rows < 8 and all(i.has(Symbol) for i in M):
return det_perm(M)
return det_minor(M)
else:
return M.det(method=method) if method else M.det()
def inv_quick(M):
"""Return the inverse of ``M``, assuming that either
there are lots of zeros or the size of the matrix
is small.
"""
from sympy.matrices import zeros
if not all(i.is_Number for i in M):
if not any(i.is_Number for i in M):
det = lambda _: det_perm(_)
else:
det = lambda _: det_minor(_)
else:
return M.inv()
n = M.rows
d = det(M)
if d == S.Zero:
raise NonInvertibleMatrixError("Matrix det == 0; not invertible")
ret = zeros(n)
s1 = -1
for i in range(n):
s = s1 = -s1
for j in range(n):
di = det(M.minor_submatrix(i, j))
ret[j, i] = s*di/d
s = -s
return ret
# these are functions that have multiple inverse values per period
multi_inverses = {
sin: lambda x: (asin(x), S.Pi - asin(x)),
cos: lambda x: (acos(x), 2*S.Pi - acos(x)),
}
def _tsolve(eq, sym, **flags):
"""
Helper for ``_solve`` that solves a transcendental equation with respect
to the given symbol. Various equations containing powers and logarithms,
can be solved.
There is currently no guarantee that all solutions will be returned or
that a real solution will be favored over a complex one.
Either a list of potential solutions will be returned or None will be
returned (in the case that no method was known to get a solution
for the equation). All other errors (like the inability to cast an
expression as a Poly) are unhandled.
Examples
========
>>> from sympy import log
>>> from sympy.solvers.solvers import _tsolve as tsolve
>>> from sympy.abc import x
>>> tsolve(3**(2*x + 5) - 4, x)
[-5/2 + log(2)/log(3), (-5*log(3)/2 + log(2) + I*pi)/log(3)]
>>> tsolve(log(x) + 2*x, x)
[LambertW(2)/2]
"""
if 'tsolve_saw' not in flags:
flags['tsolve_saw'] = []
if eq in flags['tsolve_saw']:
return None
else:
flags['tsolve_saw'].append(eq)
rhs, lhs = _invert(eq, sym)
if lhs == sym:
return [rhs]
try:
if lhs.is_Add:
# it's time to try factoring; powdenest is used
# to try get powers in standard form for better factoring
f = factor(powdenest(lhs - rhs))
if f.is_Mul:
return _solve(f, sym, **flags)
if rhs:
f = logcombine(lhs, force=flags.get('force', True))
if f.count(log) != lhs.count(log):
if isinstance(f, log):
return _solve(f.args[0] - exp(rhs), sym, **flags)
return _tsolve(f - rhs, sym, **flags)
elif lhs.is_Pow:
if lhs.exp.is_Integer:
if lhs - rhs != eq:
return _solve(lhs - rhs, sym, **flags)
if sym not in lhs.exp.free_symbols:
return _solve(lhs.base - rhs**(1/lhs.exp), sym, **flags)
# _tsolve calls this with Dummy before passing the actual number in.
if any(t.is_Dummy for t in rhs.free_symbols):
raise NotImplementedError # _tsolve will call here again...
# a ** g(x) == 0
if not rhs:
# f(x)**g(x) only has solutions where f(x) == 0 and g(x) != 0 at
# the same place
sol_base = _solve(lhs.base, sym, **flags)
return [s for s in sol_base if lhs.exp.subs(sym, s) != 0]
# a ** g(x) == b
if not lhs.base.has(sym):
if lhs.base == 0:
return _solve(lhs.exp, sym, **flags) if rhs != 0 else []
# Gets most solutions...
if lhs.base == rhs.as_base_exp()[0]:
# handles case when bases are equal
sol = _solve(lhs.exp - rhs.as_base_exp()[1], sym, **flags)
else:
# handles cases when bases are not equal and exp
# may or may not be equal
sol = _solve(exp(log(lhs.base)*lhs.exp)-exp(log(rhs)), sym, **flags)
# Check for duplicate solutions
def equal(expr1, expr2):
_ = Dummy()
eq = checksol(expr1 - _, _, expr2)
if eq is None:
if nsimplify(expr1) != nsimplify(expr2):
return False
# they might be coincidentally the same
# so check more rigorously
eq = expr1.equals(expr2)
return eq
# Guess a rational exponent
e_rat = nsimplify(log(abs(rhs))/log(abs(lhs.base)))
e_rat = simplify(posify(e_rat)[0])
n, d = fraction(e_rat)
if expand(lhs.base**n - rhs**d) == 0:
sol = [s for s in sol if not equal(lhs.exp.subs(sym, s), e_rat)]
sol.extend(_solve(lhs.exp - e_rat, sym, **flags))
return list(ordered(set(sol)))
# f(x) ** g(x) == c
else:
sol = []
logform = lhs.exp*log(lhs.base) - log(rhs)
if logform != lhs - rhs:
try:
sol.extend(_solve(logform, sym, **flags))
except NotImplementedError:
pass
# Collect possible solutions and check with substitution later.
check = []
if rhs == 1:
# f(x) ** g(x) = 1 -- g(x)=0 or f(x)=+-1
check.extend(_solve(lhs.exp, sym, **flags))
check.extend(_solve(lhs.base - 1, sym, **flags))
check.extend(_solve(lhs.base + 1, sym, **flags))
elif rhs.is_Rational:
for d in (i for i in divisors(abs(rhs.p)) if i != 1):
e, t = integer_log(rhs.p, d)
if not t:
continue # rhs.p != d**b
for s in divisors(abs(rhs.q)):
if s**e== rhs.q:
r = Rational(d, s)
check.extend(_solve(lhs.base - r, sym, **flags))
check.extend(_solve(lhs.base + r, sym, **flags))
check.extend(_solve(lhs.exp - e, sym, **flags))
elif rhs.is_irrational:
b_l, e_l = lhs.base.as_base_exp()
n, d = (e_l*lhs.exp).as_numer_denom()
b, e = sqrtdenest(rhs).as_base_exp()
check = [sqrtdenest(i) for i in (_solve(lhs.base - b, sym, **flags))]
check.extend([sqrtdenest(i) for i in (_solve(lhs.exp - e, sym, **flags))])
if e_l*d != 1:
check.extend(_solve(b_l**n - rhs**(e_l*d), sym, **flags))
for s in check:
ok = checksol(eq, sym, s)
if ok is None:
ok = eq.subs(sym, s).equals(0)
if ok:
sol.append(s)
return list(ordered(set(sol)))
elif lhs.is_Function and len(lhs.args) == 1:
if lhs.func in multi_inverses:
# sin(x) = 1/3 -> x - asin(1/3) & x - (pi - asin(1/3))
soln = []
for i in multi_inverses[lhs.func](rhs):
soln.extend(_solve(lhs.args[0] - i, sym, **flags))
return list(ordered(soln))
elif lhs.func == LambertW:
return _solve(lhs.args[0] - rhs*exp(rhs), sym, **flags)
rewrite = lhs.rewrite(exp)
if rewrite != lhs:
return _solve(rewrite - rhs, sym, **flags)
except NotImplementedError:
pass
# maybe it is a lambert pattern
if flags.pop('bivariate', True):
# lambert forms may need some help being recognized, e.g. changing
# 2**(3*x) + x**3*log(2)**3 + 3*x**2*log(2)**2 + 3*x*log(2) + 1
# to 2**(3*x) + (x*log(2) + 1)**3
g = _filtered_gens(eq.as_poly(), sym)
up_or_log = set()
for gi in g:
if isinstance(gi, exp) or isinstance(gi, log):
up_or_log.add(gi)
elif gi.is_Pow:
gisimp = powdenest(expand_power_exp(gi))
if gisimp.is_Pow and sym in gisimp.exp.free_symbols:
up_or_log.add(gi)
eq_down = expand_log(expand_power_exp(eq)).subs(
dict(list(zip(up_or_log, [0]*len(up_or_log)))))
eq = expand_power_exp(factor(eq_down, deep=True) + (eq - eq_down))
rhs, lhs = _invert(eq, sym)
if lhs.has(sym):
try:
poly = lhs.as_poly()
g = _filtered_gens(poly, sym)
_eq = lhs - rhs
sols = _solve_lambert(_eq, sym, g)
# use a simplified form if it satisfies eq
# and has fewer operations
for n, s in enumerate(sols):
ns = nsimplify(s)
if ns != s and ns.count_ops() <= s.count_ops():
ok = checksol(_eq, sym, ns)
if ok is None:
ok = _eq.subs(sym, ns).equals(0)
if ok:
sols[n] = ns
return sols
except NotImplementedError:
# maybe it's a convoluted function
if len(g) == 2:
try:
gpu = bivariate_type(lhs - rhs, *g)
if gpu is None:
raise NotImplementedError
g, p, u = gpu
flags['bivariate'] = False
inversion = _tsolve(g - u, sym, **flags)
if inversion:
sol = _solve(p, u, **flags)
return list(ordered(set([i.subs(u, s)
for i in inversion for s in sol])))
except NotImplementedError:
pass
else:
pass
if flags.pop('force', True):
flags['force'] = False
pos, reps = posify(lhs - rhs)
if rhs == S.ComplexInfinity:
return []
for u, s in reps.items():
if s == sym:
break
else:
u = sym
if pos.has(u):
try:
soln = _solve(pos, u, **flags)
return list(ordered([s.subs(reps) for s in soln]))
except NotImplementedError:
pass
else:
pass # here for coverage
return # here for coverage
# TODO: option for calculating J numerically
@conserve_mpmath_dps
def nsolve(*args, **kwargs):
r"""
Solve a nonlinear equation system numerically: ``nsolve(f, [args,] x0,
modules=['mpmath'], **kwargs)``.
Explanation
===========
``f`` is a vector function of symbolic expressions representing the system.
*args* are the variables. If there is only one variable, this argument can
be omitted. ``x0`` is a starting vector close to a solution.
Use the modules keyword to specify which modules should be used to
evaluate the function and the Jacobian matrix. Make sure to use a module
that supports matrices. For more information on the syntax, please see the
docstring of ``lambdify``.
If the keyword arguments contain ``dict=True`` (default is False) ``nsolve``
will return a list (perhaps empty) of solution mappings. This might be
especially useful if you want to use ``nsolve`` as a fallback to solve since
using the dict argument for both methods produces return values of
consistent type structure. Please note: to keep this consistent with
``solve``, the solution will be returned in a list even though ``nsolve``
(currently at least) only finds one solution at a time.
Overdetermined systems are supported.
Examples
========
>>> from sympy import Symbol, nsolve
>>> import mpmath
>>> mpmath.mp.dps = 15
>>> x1 = Symbol('x1')
>>> x2 = Symbol('x2')
>>> f1 = 3 * x1**2 - 2 * x2**2 - 1
>>> f2 = x1**2 - 2 * x1 + x2**2 + 2 * x2 - 8
>>> print(nsolve((f1, f2), (x1, x2), (-1, 1)))
Matrix([[-1.19287309935246], [1.27844411169911]])
For one-dimensional functions the syntax is simplified:
>>> from sympy import sin, nsolve
>>> from sympy.abc import x
>>> nsolve(sin(x), x, 2)
3.14159265358979
>>> nsolve(sin(x), 2)
3.14159265358979
To solve with higher precision than the default, use the prec argument:
>>> from sympy import cos
>>> nsolve(cos(x) - x, 1)
0.739085133215161
>>> nsolve(cos(x) - x, 1, prec=50)
0.73908513321516064165531208767387340401341175890076
>>> cos(_)
0.73908513321516064165531208767387340401341175890076
To solve for complex roots of real functions, a nonreal initial point
must be specified:
>>> from sympy import I
>>> nsolve(x**2 + 2, I)
1.4142135623731*I
``mpmath.findroot`` is used and you can find their more extensive
documentation, especially concerning keyword parameters and
available solvers. Note, however, that functions which are very
steep near the root, the verification of the solution may fail. In
this case you should use the flag ``verify=False`` and
independently verify the solution.
>>> from sympy import cos, cosh
>>> f = cos(x)*cosh(x) - 1
>>> nsolve(f, 3.14*100)
Traceback (most recent call last):
...
ValueError: Could not find root within given tolerance. (1.39267e+230 > 2.1684e-19)
>>> ans = nsolve(f, 3.14*100, verify=False); ans
312.588469032184
>>> f.subs(x, ans).n(2)
2.1e+121
>>> (f/f.diff(x)).subs(x, ans).n(2)
7.4e-15
One might safely skip the verification if bounds of the root are known
and a bisection method is used:
>>> bounds = lambda i: (3.14*i, 3.14*(i + 1))
>>> nsolve(f, bounds(100), solver='bisect', verify=False)
315.730061685774
Alternatively, a function may be better behaved when the
denominator is ignored. Since this is not always the case, however,
the decision of what function to use is left to the discretion of
the user.
>>> eq = x**2/(1 - x)/(1 - 2*x)**2 - 100
>>> nsolve(eq, 0.46)
Traceback (most recent call last):
...
ValueError: Could not find root within given tolerance. (10000 > 2.1684e-19)
Try another starting point or tweak arguments.
>>> nsolve(eq.as_numer_denom()[0], 0.46)
0.46792545969349058
"""
# there are several other SymPy functions that use method= so
# guard against that here
if 'method' in kwargs:
raise ValueError(filldedent('''
Keyword "method" should not be used in this context. When using
some mpmath solvers directly, the keyword "method" is
used, but when using nsolve (and findroot) the keyword to use is
"solver".'''))
if 'prec' in kwargs:
prec = kwargs.pop('prec')
import mpmath
mpmath.mp.dps = prec
else:
prec = None
# keyword argument to return result as a dictionary
as_dict = kwargs.pop('dict', False)
# interpret arguments
if len(args) == 3:
f = args[0]
fargs = args[1]
x0 = args[2]
if iterable(fargs) and iterable(x0):
if len(x0) != len(fargs):
raise TypeError('nsolve expected exactly %i guess vectors, got %i'
% (len(fargs), len(x0)))
elif len(args) == 2:
f = args[0]
fargs = None
x0 = args[1]
if iterable(f):
raise TypeError('nsolve expected 3 arguments, got 2')
elif len(args) < 2:
raise TypeError('nsolve expected at least 2 arguments, got %i'
% len(args))
else:
raise TypeError('nsolve expected at most 3 arguments, got %i'
% len(args))
modules = kwargs.get('modules', ['mpmath'])
if iterable(f):
f = list(f)
for i, fi in enumerate(f):
if isinstance(fi, Equality):
f[i] = fi.lhs - fi.rhs
f = Matrix(f).T
if iterable(x0):
x0 = list(x0)
if not isinstance(f, Matrix):
# assume it's a sympy expression
if isinstance(f, Equality):
f = f.lhs - f.rhs
syms = f.free_symbols
if fargs is None:
fargs = syms.copy().pop()
if not (len(syms) == 1 and (fargs in syms or fargs[0] in syms)):
raise ValueError(filldedent('''
expected a one-dimensional and numerical function'''))
# the function is much better behaved if there is no denominator
# but sending the numerator is left to the user since sometimes
# the function is better behaved when the denominator is present
# e.g., issue 11768
f = lambdify(fargs, f, modules)
x = sympify(findroot(f, x0, **kwargs))
if as_dict:
return [{fargs: x}]
return x
if len(fargs) > f.cols:
raise NotImplementedError(filldedent('''
need at least as many equations as variables'''))
verbose = kwargs.get('verbose', False)
if verbose:
print('f(x):')
print(f)
# derive Jacobian
J = f.jacobian(fargs)
if verbose:
print('J(x):')
print(J)
# create functions
f = lambdify(fargs, f.T, modules)
J = lambdify(fargs, J, modules)
# solve the system numerically
x = findroot(f, x0, J=J, **kwargs)
if as_dict:
return [dict(zip(fargs, [sympify(xi) for xi in x]))]
return Matrix(x)
def _invert(eq, *symbols, **kwargs):
"""
Return tuple (i, d) where ``i`` is independent of *symbols* and ``d``
contains symbols.
Explanation
===========
``i`` and ``d`` are obtained after recursively using algebraic inversion
until an uninvertible ``d`` remains. If there are no free symbols then
``d`` will be zero. Some (but not necessarily all) solutions to the
expression ``i - d`` will be related to the solutions of the original
expression.
Examples
========
>>> from sympy.solvers.solvers import _invert as invert
>>> from sympy import sqrt, cos
>>> from sympy.abc import x, y
>>> invert(x - 3)
(3, x)
>>> invert(3)
(3, 0)
>>> invert(2*cos(x) - 1)
(1/2, cos(x))
>>> invert(sqrt(x) - 3)
(3, sqrt(x))
>>> invert(sqrt(x) + y, x)
(-y, sqrt(x))
>>> invert(sqrt(x) + y, y)
(-sqrt(x), y)
>>> invert(sqrt(x) + y, x, y)
(0, sqrt(x) + y)
If there is more than one symbol in a power's base and the exponent
is not an Integer, then the principal root will be used for the
inversion:
>>> invert(sqrt(x + y) - 2)
(4, x + y)
>>> invert(sqrt(x + y) - 2)
(4, x + y)
If the exponent is an Integer, setting ``integer_power`` to True
will force the principal root to be selected:
>>> invert(x**2 - 4, integer_power=True)
(2, x)
"""
eq = sympify(eq)
if eq.args:
# make sure we are working with flat eq
eq = eq.func(*eq.args)
free = eq.free_symbols
if not symbols:
symbols = free
if not free & set(symbols):
return eq, S.Zero
dointpow = bool(kwargs.get('integer_power', False))
lhs = eq
rhs = S.Zero
while True:
was = lhs
while True:
indep, dep = lhs.as_independent(*symbols)
# dep + indep == rhs
if lhs.is_Add:
# this indicates we have done it all
if indep.is_zero:
break
lhs = dep
rhs -= indep
# dep * indep == rhs
else:
# this indicates we have done it all
if indep is S.One:
break
lhs = dep
rhs /= indep
# collect like-terms in symbols
if lhs.is_Add:
terms = {}
for a in lhs.args:
i, d = a.as_independent(*symbols)
terms.setdefault(d, []).append(i)
if any(len(v) > 1 for v in terms.values()):
args = []
for d, i in terms.items():
if len(i) > 1:
args.append(Add(*i)*d)
else:
args.append(i[0]*d)
lhs = Add(*args)
# if it's a two-term Add with rhs = 0 and two powers we can get the
# dependent terms together, e.g. 3*f(x) + 2*g(x) -> f(x)/g(x) = -2/3
if lhs.is_Add and not rhs and len(lhs.args) == 2 and \
not lhs.is_polynomial(*symbols):
a, b = ordered(lhs.args)
ai, ad = a.as_independent(*symbols)
bi, bd = b.as_independent(*symbols)
if any(_ispow(i) for i in (ad, bd)):
a_base, a_exp = ad.as_base_exp()
b_base, b_exp = bd.as_base_exp()
if a_base == b_base:
# a = -b
lhs = powsimp(powdenest(ad/bd))
rhs = -bi/ai
else:
rat = ad/bd
_lhs = powsimp(ad/bd)
if _lhs != rat:
lhs = _lhs
rhs = -bi/ai
elif ai == -bi:
if isinstance(ad, Function) and ad.func == bd.func:
if len(ad.args) == len(bd.args) == 1:
lhs = ad.args[0] - bd.args[0]
elif len(ad.args) == len(bd.args):
# should be able to solve
# f(x, y) - f(2 - x, 0) == 0 -> x == 1
raise NotImplementedError(
'equal function with more than 1 argument')
else:
raise ValueError(
'function with different numbers of args')
elif lhs.is_Mul and any(_ispow(a) for a in lhs.args):
lhs = powsimp(powdenest(lhs))
if lhs.is_Function:
if hasattr(lhs, 'inverse') and len(lhs.args) == 1:
# -1
# f(x) = g -> x = f (g)
#
# /!\ inverse should not be defined if there are multiple values
# for the function -- these are handled in _tsolve
#
rhs = lhs.inverse()(rhs)
lhs = lhs.args[0]
elif isinstance(lhs, atan2):
y, x = lhs.args
lhs = 2*atan(y/(sqrt(x**2 + y**2) + x))
elif lhs.func == rhs.func:
if len(lhs.args) == len(rhs.args) == 1:
lhs = lhs.args[0]
rhs = rhs.args[0]
elif len(lhs.args) == len(rhs.args):
# should be able to solve
# f(x, y) == f(2, 3) -> x == 2
# f(x, x + y) == f(2, 3) -> x == 2
raise NotImplementedError(
'equal function with more than 1 argument')
else:
raise ValueError(
'function with different numbers of args')
if rhs and lhs.is_Pow and lhs.exp.is_Integer and lhs.exp < 0:
lhs = 1/lhs
rhs = 1/rhs
# base**a = b -> base = b**(1/a) if
# a is an Integer and dointpow=True (this gives real branch of root)
# a is not an Integer and the equation is multivariate and the
# base has more than 1 symbol in it
# The rationale for this is that right now the multi-system solvers
# doesn't try to resolve generators to see, for example, if the whole
# system is written in terms of sqrt(x + y) so it will just fail, so we
# do that step here.
if lhs.is_Pow and (
lhs.exp.is_Integer and dointpow or not lhs.exp.is_Integer and
len(symbols) > 1 and len(lhs.base.free_symbols & set(symbols)) > 1):
rhs = rhs**(1/lhs.exp)
lhs = lhs.base
if lhs == was:
break
return rhs, lhs
def unrad(eq, *syms, **flags):
"""
Remove radicals with symbolic arguments and return (eq, cov),
None, or raise an error.
Explanation
===========
None is returned if there are no radicals to remove.
NotImplementedError is raised if there are radicals and they cannot be
removed or if the relationship between the original symbols and the
change of variable needed to rewrite the system as a polynomial cannot
be solved.
Otherwise the tuple, ``(eq, cov)``, is returned where:
*eq*, ``cov``
*eq* is an equation without radicals (in the symbol(s) of
interest) whose solutions are a superset of the solutions to the
original expression. *eq* might be rewritten in terms of a new
variable; the relationship to the original variables is given by
``cov`` which is a list containing ``v`` and ``v**p - b`` where
``p`` is the power needed to clear the radical and ``b`` is the
radical now expressed as a polynomial in the symbols of interest.
For example, for sqrt(2 - x) the tuple would be
``(c, c**2 - 2 + x)``. The solutions of *eq* will contain
solutions to the original equation (if there are any).
*syms*
An iterable of symbols which, if provided, will limit the focus of
radical removal: only radicals with one or more of the symbols of
interest will be cleared. All free symbols are used if *syms* is not
set.
*flags* are used internally for communication during recursive calls.
Two options are also recognized:
``take``, when defined, is interpreted as a single-argument function
that returns True if a given Pow should be handled.
Radicals can be removed from an expression if:
* All bases of the radicals are the same; a change of variables is
done in this case.
* If all radicals appear in one term of the expression.
* There are only four terms with sqrt() factors or there are less than
four terms having sqrt() factors.
* There are only two terms with radicals.
Examples
========
>>> from sympy.solvers.solvers import unrad
>>> from sympy.abc import x
>>> from sympy import sqrt, Rational, root
>>> unrad(sqrt(x)*x**Rational(1, 3) + 2)
(x**5 - 64, [])
>>> unrad(sqrt(x) + root(x + 1, 3))
(x**3 - x**2 - 2*x - 1, [])
>>> eq = sqrt(x) + root(x, 3) - 2
>>> unrad(eq)
(_p**3 + _p**2 - 2, [_p, _p**6 - x])
"""
uflags = dict(check=False, simplify=False)
def _cov(p, e):
if cov:
# XXX - uncovered
oldp, olde = cov
if Poly(e, p).degree(p) in (1, 2):
cov[:] = [p, olde.subs(oldp, _solve(e, p, **uflags)[0])]
else:
raise NotImplementedError
else:
cov[:] = [p, e]
def _canonical(eq, cov):
if cov:
# change symbol to vanilla so no solutions are eliminated
p, e = cov
rep = {p: Dummy(p.name)}
eq = eq.xreplace(rep)
cov = [p.xreplace(rep), e.xreplace(rep)]
# remove constants and powers of factors since these don't change
# the location of the root; XXX should factor or factor_terms be used?
eq = factor_terms(_mexpand(eq.as_numer_denom()[0], recursive=True), clear=True)
if eq.is_Mul:
args = []
for f in eq.args:
if f.is_number:
continue
if f.is_Pow and _take(f, True):
args.append(f.base)
else:
args.append(f)
eq = Mul(*args) # leave as Mul for more efficient solving
# make the sign canonical
free = eq.free_symbols
if len(free) == 1:
if eq.coeff(free.pop()**degree(eq)).could_extract_minus_sign():
eq = -eq
elif eq.could_extract_minus_sign():
eq = -eq
return eq, cov
def _Q(pow):
# return leading Rational of denominator of Pow's exponent
c = pow.as_base_exp()[1].as_coeff_Mul()[0]
if not c.is_Rational:
return S.One
return c.q
# define the _take method that will determine whether a term is of interest
def _take(d, take_int_pow):
# return True if coefficient of any factor's exponent's den is not 1
for pow in Mul.make_args(d):
if not (pow.is_Symbol or pow.is_Pow):
continue
b, e = pow.as_base_exp()
if not b.has(*syms):
continue
if not take_int_pow and _Q(pow) == 1:
continue
free = pow.free_symbols
if free.intersection(syms):
return True
return False
_take = flags.setdefault('_take', _take)
cov, nwas, rpt = [flags.setdefault(k, v) for k, v in
sorted(dict(cov=[], n=None, rpt=0).items())]
# preconditioning
eq = powdenest(factor_terms(eq, radical=True, clear=True))
if isinstance(eq, Relational):
eq, d = eq, 1
else:
eq, d = eq.as_numer_denom()
eq = _mexpand(eq, recursive=True)
if eq.is_number:
return
syms = set(syms) or eq.free_symbols
poly = eq.as_poly()
gens = [g for g in poly.gens if _take(g, True)]
if not gens:
return
# check for trivial case
# - already a polynomial in integer powers
if all(_Q(g) == 1 for g in gens):
if (len(gens) == len(poly.gens) and d!=1):
return eq, []
else:
return
# - an exponent has a symbol of interest (don't handle)
if any(g.as_base_exp()[1].has(*syms) for g in gens):
return
def _rads_bases_lcm(poly):
# if all the bases are the same or all the radicals are in one
# term, `lcm` will be the lcm of the denominators of the
# exponents of the radicals
lcm = 1
rads = set()
bases = set()
for g in poly.gens:
if not _take(g, False):
continue
q = _Q(g)
if q != 1:
rads.add(g)
lcm = ilcm(lcm, q)
bases.add(g.base)
return rads, bases, lcm
rads, bases, lcm = _rads_bases_lcm(poly)
if not rads:
return
covsym = Dummy('p', nonnegative=True)
# only keep in syms symbols that actually appear in radicals;
# and update gens
newsyms = set()
for r in rads:
newsyms.update(syms & r.free_symbols)
if newsyms != syms:
syms = newsyms
gens = [g for g in gens if g.free_symbols & syms]
# get terms together that have common generators
drad = dict(list(zip(rads, list(range(len(rads))))))
rterms = {(): []}
args = Add.make_args(poly.as_expr())
for t in args:
if _take(t, False):
common = set(t.as_poly().gens).intersection(rads)
key = tuple(sorted([drad[i] for i in common]))
else:
key = ()
rterms.setdefault(key, []).append(t)
others = Add(*rterms.pop(()))
rterms = [Add(*rterms[k]) for k in rterms.keys()]
# the output will depend on the order terms are processed, so
# make it canonical quickly
rterms = list(reversed(list(ordered(rterms))))
ok = False # we don't have a solution yet
depth = sqrt_depth(eq)
if len(rterms) == 1 and not (rterms[0].is_Add and lcm > 2):
eq = rterms[0]**lcm - ((-others)**lcm)
ok = True
else:
if len(rterms) == 1 and rterms[0].is_Add:
rterms = list(rterms[0].args)
if len(bases) == 1:
b = bases.pop()
if len(syms) > 1:
free = b.free_symbols
x = {g for g in gens if g.is_Symbol} & free
if not x:
x = free
x = ordered(x)
else:
x = syms
x = list(x)[0]
try:
inv = _solve(covsym**lcm - b, x, **uflags)
if not inv:
raise NotImplementedError
eq = poly.as_expr().subs(b, covsym**lcm).subs(x, inv[0])
_cov(covsym, covsym**lcm - b)
return _canonical(eq, cov)
except NotImplementedError:
pass
else:
# no longer consider integer powers as generators
gens = [g for g in gens if _Q(g) != 1]
if len(rterms) == 2:
if not others:
eq = rterms[0]**lcm - (-rterms[1])**lcm
ok = True
elif not log(lcm, 2).is_Integer:
# the lcm-is-power-of-two case is handled below
r0, r1 = rterms
if flags.get('_reverse', False):
r1, r0 = r0, r1
i0 = _rads0, _bases0, lcm0 = _rads_bases_lcm(r0.as_poly())
i1 = _rads1, _bases1, lcm1 = _rads_bases_lcm(r1.as_poly())
for reverse in range(2):
if reverse:
i0, i1 = i1, i0
r0, r1 = r1, r0
_rads1, _, lcm1 = i1
_rads1 = Mul(*_rads1)
t1 = _rads1**lcm1
c = covsym**lcm1 - t1
for x in syms:
try:
sol = _solve(c, x, **uflags)
if not sol:
raise NotImplementedError
neweq = r0.subs(x, sol[0]) + covsym*r1/_rads1 + \
others
tmp = unrad(neweq, covsym)
if tmp:
eq, newcov = tmp
if newcov:
newp, newc = newcov
_cov(newp, c.subs(covsym,
_solve(newc, covsym, **uflags)[0]))
else:
_cov(covsym, c)
else:
eq = neweq
_cov(covsym, c)
ok = True
break
except NotImplementedError:
if reverse:
raise NotImplementedError(
'no successful change of variable found')
else:
pass
if ok:
break
elif len(rterms) == 3:
# two cube roots and another with order less than 5
# (so an analytical solution can be found) or a base
# that matches one of the cube root bases
info = [_rads_bases_lcm(i.as_poly()) for i in rterms]
RAD = 0
BASES = 1
LCM = 2
if info[0][LCM] != 3:
info.append(info.pop(0))
rterms.append(rterms.pop(0))
elif info[1][LCM] != 3:
info.append(info.pop(1))
rterms.append(rterms.pop(1))
if info[0][LCM] == info[1][LCM] == 3:
if info[1][BASES] != info[2][BASES]:
info[0], info[1] = info[1], info[0]
rterms[0], rterms[1] = rterms[1], rterms[0]
if info[1][BASES] == info[2][BASES]:
eq = rterms[0]**3 + (rterms[1] + rterms[2] + others)**3
ok = True
elif info[2][LCM] < 5:
# a*root(A, 3) + b*root(B, 3) + others = c
a, b, c, d, A, B = [Dummy(i) for i in 'abcdAB']
# zz represents the unraded expression into which the
# specifics for this case are substituted
zz = (c - d)*(A**3*a**9 + 3*A**2*B*a**6*b**3 -
3*A**2*a**6*c**3 + 9*A**2*a**6*c**2*d - 9*A**2*a**6*c*d**2 +
3*A**2*a**6*d**3 + 3*A*B**2*a**3*b**6 + 21*A*B*a**3*b**3*c**3 -
63*A*B*a**3*b**3*c**2*d + 63*A*B*a**3*b**3*c*d**2 -
21*A*B*a**3*b**3*d**3 + 3*A*a**3*c**6 - 18*A*a**3*c**5*d +
45*A*a**3*c**4*d**2 - 60*A*a**3*c**3*d**3 + 45*A*a**3*c**2*d**4 -
18*A*a**3*c*d**5 + 3*A*a**3*d**6 + B**3*b**9 - 3*B**2*b**6*c**3 +
9*B**2*b**6*c**2*d - 9*B**2*b**6*c*d**2 + 3*B**2*b**6*d**3 +
3*B*b**3*c**6 - 18*B*b**3*c**5*d + 45*B*b**3*c**4*d**2 -
60*B*b**3*c**3*d**3 + 45*B*b**3*c**2*d**4 - 18*B*b**3*c*d**5 +
3*B*b**3*d**6 - c**9 + 9*c**8*d - 36*c**7*d**2 + 84*c**6*d**3 -
126*c**5*d**4 + 126*c**4*d**5 - 84*c**3*d**6 + 36*c**2*d**7 -
9*c*d**8 + d**9)
def _t(i):
b = Mul(*info[i][RAD])
return cancel(rterms[i]/b), Mul(*info[i][BASES])
aa, AA = _t(0)
bb, BB = _t(1)
cc = -rterms[2]
dd = others
eq = zz.xreplace(dict(zip(
(a, A, b, B, c, d),
(aa, AA, bb, BB, cc, dd))))
ok = True
# handle power-of-2 cases
if not ok:
if log(lcm, 2).is_Integer and (not others and
len(rterms) == 4 or len(rterms) < 4):
def _norm2(a, b):
return a**2 + b**2 + 2*a*b
if len(rterms) == 4:
# (r0+r1)**2 - (r2+r3)**2
r0, r1, r2, r3 = rterms
eq = _norm2(r0, r1) - _norm2(r2, r3)
ok = True
elif len(rterms) == 3:
# (r1+r2)**2 - (r0+others)**2
r0, r1, r2 = rterms
eq = _norm2(r1, r2) - _norm2(r0, others)
ok = True
elif len(rterms) == 2:
# r0**2 - (r1+others)**2
r0, r1 = rterms
eq = r0**2 - _norm2(r1, others)
ok = True
new_depth = sqrt_depth(eq) if ok else depth
rpt += 1 # XXX how many repeats with others unchanging is enough?
if not ok or (
nwas is not None and len(rterms) == nwas and
new_depth is not None and new_depth == depth and
rpt > 3):
raise NotImplementedError('Cannot remove all radicals')
flags.update(dict(cov=cov, n=len(rterms), rpt=rpt))
neq = unrad(eq, *syms, **flags)
if neq:
eq, cov = neq
eq, cov = _canonical(eq, cov)
return eq, cov
from sympy.solvers.bivariate import (
bivariate_type, _solve_lambert, _filtered_gens)
|
dd0a8c323f3327f2ccf2785f43161c1ff432ef0c5f087de7dd82786cb81f5f1a
|
"""
A Printer for generating readable representation of most sympy classes.
"""
from __future__ import print_function, division
from typing import Any, Dict
from sympy.core import S, Rational, Pow, Basic, Mul, Number
from sympy.core.mul import _keep_coeff
from .printer import Printer
from sympy.printing.precedence import precedence, PRECEDENCE
from mpmath.libmp import prec_to_dps, to_str as mlib_to_str
from sympy.utilities import default_sort_key
class StrPrinter(Printer):
printmethod = "_sympystr"
_default_settings = {
"order": None,
"full_prec": "auto",
"sympy_integers": False,
"abbrev": False,
"perm_cyclic": True,
"min": None,
"max": None,
} # type: Dict[str, Any]
_relationals = dict() # type: Dict[str, str]
def parenthesize(self, item, level, strict=False):
if (precedence(item) < level) or ((not strict) and precedence(item) <= level):
return "(%s)" % self._print(item)
else:
return self._print(item)
def stringify(self, args, sep, level=0):
return sep.join([self.parenthesize(item, level) for item in args])
def emptyPrinter(self, expr):
if isinstance(expr, str):
return expr
elif isinstance(expr, Basic):
return repr(expr)
else:
return str(expr)
def _print_Add(self, expr, order=None):
terms = self._as_ordered_terms(expr, order=order)
PREC = precedence(expr)
l = []
for term in terms:
t = self._print(term)
if t.startswith('-'):
sign = "-"
t = t[1:]
else:
sign = "+"
if precedence(term) < PREC:
l.extend([sign, "(%s)" % t])
else:
l.extend([sign, t])
sign = l.pop(0)
if sign == '+':
sign = ""
return sign + ' '.join(l)
def _print_BooleanTrue(self, expr):
return "True"
def _print_BooleanFalse(self, expr):
return "False"
def _print_Not(self, expr):
return '~%s' %(self.parenthesize(expr.args[0],PRECEDENCE["Not"]))
def _print_And(self, expr):
return self.stringify(expr.args, " & ", PRECEDENCE["BitwiseAnd"])
def _print_Or(self, expr):
return self.stringify(expr.args, " | ", PRECEDENCE["BitwiseOr"])
def _print_Xor(self, expr):
return self.stringify(expr.args, " ^ ", PRECEDENCE["BitwiseXor"])
def _print_AppliedPredicate(self, expr):
return '%s(%s)' % (self._print(expr.func), self._print(expr.arg))
def _print_Basic(self, expr):
l = [self._print(o) for o in expr.args]
return expr.__class__.__name__ + "(%s)" % ", ".join(l)
def _print_BlockMatrix(self, B):
if B.blocks.shape == (1, 1):
self._print(B.blocks[0, 0])
return self._print(B.blocks)
def _print_Catalan(self, expr):
return 'Catalan'
def _print_ComplexInfinity(self, expr):
return 'zoo'
def _print_ConditionSet(self, s):
args = tuple([self._print(i) for i in (s.sym, s.condition)])
if s.base_set is S.UniversalSet:
return 'ConditionSet(%s, %s)' % args
args += (self._print(s.base_set),)
return 'ConditionSet(%s, %s, %s)' % args
def _print_Derivative(self, expr):
dexpr = expr.expr
dvars = [i[0] if i[1] == 1 else i for i in expr.variable_count]
return 'Derivative(%s)' % ", ".join(map(lambda arg: self._print(arg), [dexpr] + dvars))
def _print_dict(self, d):
keys = sorted(d.keys(), key=default_sort_key)
items = []
for key in keys:
item = "%s: %s" % (self._print(key), self._print(d[key]))
items.append(item)
return "{%s}" % ", ".join(items)
def _print_Dict(self, expr):
return self._print_dict(expr)
def _print_RandomDomain(self, d):
if hasattr(d, 'as_boolean'):
return 'Domain: ' + self._print(d.as_boolean())
elif hasattr(d, 'set'):
return ('Domain: ' + self._print(d.symbols) + ' in ' +
self._print(d.set))
else:
return 'Domain on ' + self._print(d.symbols)
def _print_Dummy(self, expr):
return '_' + expr.name
def _print_EulerGamma(self, expr):
return 'EulerGamma'
def _print_Exp1(self, expr):
return 'E'
def _print_ExprCondPair(self, expr):
return '(%s, %s)' % (self._print(expr.expr), self._print(expr.cond))
def _print_Function(self, expr):
return expr.func.__name__ + "(%s)" % self.stringify(expr.args, ", ")
def _print_GoldenRatio(self, expr):
return 'GoldenRatio'
def _print_TribonacciConstant(self, expr):
return 'TribonacciConstant'
def _print_ImaginaryUnit(self, expr):
return 'I'
def _print_Infinity(self, expr):
return 'oo'
def _print_Integral(self, expr):
def _xab_tostr(xab):
if len(xab) == 1:
return self._print(xab[0])
else:
return self._print((xab[0],) + tuple(xab[1:]))
L = ', '.join([_xab_tostr(l) for l in expr.limits])
return 'Integral(%s, %s)' % (self._print(expr.function), L)
def _print_Interval(self, i):
fin = 'Interval{m}({a}, {b})'
a, b, l, r = i.args
if a.is_infinite and b.is_infinite:
m = ''
elif a.is_infinite and not r:
m = ''
elif b.is_infinite and not l:
m = ''
elif not l and not r:
m = ''
elif l and r:
m = '.open'
elif l:
m = '.Lopen'
else:
m = '.Ropen'
return fin.format(**{'a': a, 'b': b, 'm': m})
def _print_AccumulationBounds(self, i):
return "AccumBounds(%s, %s)" % (self._print(i.min),
self._print(i.max))
def _print_Inverse(self, I):
return "%s**(-1)" % self.parenthesize(I.arg, PRECEDENCE["Pow"])
def _print_Lambda(self, obj):
expr = obj.expr
sig = obj.signature
if len(sig) == 1 and sig[0].is_symbol:
sig = sig[0]
return "Lambda(%s, %s)" % (self._print(sig), self._print(expr))
def _print_LatticeOp(self, expr):
args = sorted(expr.args, key=default_sort_key)
return expr.func.__name__ + "(%s)" % ", ".join(self._print(arg) for arg in args)
def _print_Limit(self, expr):
e, z, z0, dir = expr.args
if str(dir) == "+":
return "Limit(%s, %s, %s)" % tuple(map(self._print, (e, z, z0)))
else:
return "Limit(%s, %s, %s, dir='%s')" % tuple(map(self._print,
(e, z, z0, dir)))
def _print_list(self, expr):
return "[%s]" % self.stringify(expr, ", ")
def _print_MatrixBase(self, expr):
return expr._format_str(self)
def _print_MutableSparseMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_SparseMatrix(self, expr):
from sympy.matrices import Matrix
return self._print(Matrix(expr))
def _print_ImmutableSparseMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_Matrix(self, expr):
return self._print_MatrixBase(expr)
def _print_DenseMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_MutableDenseMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_ImmutableMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_ImmutableDenseMatrix(self, expr):
return self._print_MatrixBase(expr)
def _print_MatrixElement(self, expr):
return self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True) \
+ '[%s, %s]' % (self._print(expr.i), self._print(expr.j))
def _print_MatrixSlice(self, expr):
def strslice(x, dim):
x = list(x)
if x[2] == 1:
del x[2]
if x[0] == 0:
x[0] = ''
if x[1] == dim:
x[1] = ''
return ':'.join(map(lambda arg: self._print(arg), x))
return (self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True) + '[' +
strslice(expr.rowslice, expr.parent.rows) + ', ' +
strslice(expr.colslice, expr.parent.cols) + ']')
def _print_DeferredVector(self, expr):
return expr.name
def _print_Mul(self, expr):
prec = precedence(expr)
# Check for unevaluated Mul. In this case we need to make sure the
# identities are visible, multiple Rational factors are not combined
# etc so we display in a straight-forward form that fully preserves all
# args and their order.
args = expr.args
if args[0] is S.One or any(isinstance(arg, Number) for arg in args[1:]):
factors = [self.parenthesize(a, prec, strict=False) for a in args]
return '*'.join(factors)
c, e = expr.as_coeff_Mul()
if c < 0:
expr = _keep_coeff(-c, e)
sign = "-"
else:
sign = ""
a = [] # items in the numerator
b = [] # items that are in the denominator (if any)
pow_paren = [] # Will collect all pow with more than one base element and exp = -1
if self.order not in ('old', 'none'):
args = expr.as_ordered_factors()
else:
# use make_args in case expr was something like -x -> x
args = Mul.make_args(expr)
# Gather args for numerator/denominator
for item in args:
if item.is_commutative and item.is_Pow and item.exp.is_Rational and item.exp.is_negative:
if item.exp != -1:
b.append(Pow(item.base, -item.exp, evaluate=False))
else:
if len(item.args[0].args) != 1 and isinstance(item.base, Mul): # To avoid situations like #14160
pow_paren.append(item)
b.append(Pow(item.base, -item.exp))
elif item.is_Rational and item is not S.Infinity:
if item.p != 1:
a.append(Rational(item.p))
if item.q != 1:
b.append(Rational(item.q))
else:
a.append(item)
a = a or [S.One]
a_str = [self.parenthesize(x, prec, strict=False) for x in a]
b_str = [self.parenthesize(x, prec, strict=False) for x in b]
# To parenthesize Pow with exp = -1 and having more than one Symbol
for item in pow_paren:
if item.base in b:
b_str[b.index(item.base)] = "(%s)" % b_str[b.index(item.base)]
if not b:
return sign + '*'.join(a_str)
elif len(b) == 1:
return sign + '*'.join(a_str) + "/" + b_str[0]
else:
return sign + '*'.join(a_str) + "/(%s)" % '*'.join(b_str)
def _print_MatMul(self, expr):
c, m = expr.as_coeff_mmul()
sign = ""
if c.is_number:
re, im = c.as_real_imag()
if im.is_zero and re.is_negative:
expr = _keep_coeff(-c, m)
sign = "-"
elif re.is_zero and im.is_negative:
expr = _keep_coeff(-c, m)
sign = "-"
return sign + '*'.join(
[self.parenthesize(arg, precedence(expr)) for arg in expr.args]
)
def _print_ElementwiseApplyFunction(self, expr):
return "{0}.({1})".format(
expr.function,
self._print(expr.expr),
)
def _print_NaN(self, expr):
return 'nan'
def _print_NegativeInfinity(self, expr):
return '-oo'
def _print_Order(self, expr):
if not expr.variables or all(p is S.Zero for p in expr.point):
if len(expr.variables) <= 1:
return 'O(%s)' % self._print(expr.expr)
else:
return 'O(%s)' % self.stringify((expr.expr,) + expr.variables, ', ', 0)
else:
return 'O(%s)' % self.stringify(expr.args, ', ', 0)
def _print_Ordinal(self, expr):
return expr.__str__()
def _print_Cycle(self, expr):
return expr.__str__()
def _print_Permutation(self, expr):
from sympy.combinatorics.permutations import Permutation, Cycle
from sympy.utilities.exceptions import SymPyDeprecationWarning
perm_cyclic = Permutation.print_cyclic
if perm_cyclic is not None:
SymPyDeprecationWarning(
feature="Permutation.print_cyclic = {}".format(perm_cyclic),
useinstead="init_printing(perm_cyclic={})"
.format(perm_cyclic),
issue=15201,
deprecated_since_version="1.6").warn()
else:
perm_cyclic = self._settings.get("perm_cyclic", True)
if perm_cyclic:
if not expr.size:
return '()'
# before taking Cycle notation, see if the last element is
# a singleton and move it to the head of the string
s = Cycle(expr)(expr.size - 1).__repr__()[len('Cycle'):]
last = s.rfind('(')
if not last == 0 and ',' not in s[last:]:
s = s[last:] + s[:last]
s = s.replace(',', '')
return s
else:
s = expr.support()
if not s:
if expr.size < 5:
return 'Permutation(%s)' % self._print(expr.array_form)
return 'Permutation([], size=%s)' % self._print(expr.size)
trim = self._print(expr.array_form[:s[-1] + 1]) + ', size=%s' % self._print(expr.size)
use = full = self._print(expr.array_form)
if len(trim) < len(full):
use = trim
return 'Permutation(%s)' % use
def _print_Subs(self, obj):
expr, old, new = obj.args
if len(obj.point) == 1:
old = old[0]
new = new[0]
return "Subs(%s, %s, %s)" % (
self._print(expr), self._print(old), self._print(new))
def _print_TensorIndex(self, expr):
return expr._print()
def _print_TensorHead(self, expr):
return expr._print()
def _print_Tensor(self, expr):
return expr._print()
def _print_TensMul(self, expr):
# prints expressions like "A(a)", "3*A(a)", "(1+x)*A(a)"
sign, args = expr._get_args_for_traditional_printer()
return sign + "*".join(
[self.parenthesize(arg, precedence(expr)) for arg in args]
)
def _print_TensAdd(self, expr):
return expr._print()
def _print_PermutationGroup(self, expr):
p = [' %s' % self._print(a) for a in expr.args]
return 'PermutationGroup([\n%s])' % ',\n'.join(p)
def _print_Pi(self, expr):
return 'pi'
def _print_PolyRing(self, ring):
return "Polynomial ring in %s over %s with %s order" % \
(", ".join(map(lambda rs: self._print(rs), ring.symbols)),
self._print(ring.domain), self._print(ring.order))
def _print_FracField(self, field):
return "Rational function field in %s over %s with %s order" % \
(", ".join(map(lambda fs: self._print(fs), field.symbols)),
self._print(field.domain), self._print(field.order))
def _print_FreeGroupElement(self, elm):
return elm.__str__()
def _print_GaussianElement(self, poly):
return "(%s + %s*I)" % (poly.x, poly.y)
def _print_PolyElement(self, poly):
return poly.str(self, PRECEDENCE, "%s**%s", "*")
def _print_FracElement(self, frac):
if frac.denom == 1:
return self._print(frac.numer)
else:
numer = self.parenthesize(frac.numer, PRECEDENCE["Mul"], strict=True)
denom = self.parenthesize(frac.denom, PRECEDENCE["Atom"], strict=True)
return numer + "/" + denom
def _print_Poly(self, expr):
ATOM_PREC = PRECEDENCE["Atom"] - 1
terms, gens = [], [ self.parenthesize(s, ATOM_PREC) for s in expr.gens ]
for monom, coeff in expr.terms():
s_monom = []
for i, exp in enumerate(monom):
if exp > 0:
if exp == 1:
s_monom.append(gens[i])
else:
s_monom.append(gens[i] + "**%d" % exp)
s_monom = "*".join(s_monom)
if coeff.is_Add:
if s_monom:
s_coeff = "(" + self._print(coeff) + ")"
else:
s_coeff = self._print(coeff)
else:
if s_monom:
if coeff is S.One:
terms.extend(['+', s_monom])
continue
if coeff is S.NegativeOne:
terms.extend(['-', s_monom])
continue
s_coeff = self._print(coeff)
if not s_monom:
s_term = s_coeff
else:
s_term = s_coeff + "*" + s_monom
if s_term.startswith('-'):
terms.extend(['-', s_term[1:]])
else:
terms.extend(['+', s_term])
if terms[0] in ['-', '+']:
modifier = terms.pop(0)
if modifier == '-':
terms[0] = '-' + terms[0]
format = expr.__class__.__name__ + "(%s, %s"
from sympy.polys.polyerrors import PolynomialError
try:
format += ", modulus=%s" % expr.get_modulus()
except PolynomialError:
format += ", domain='%s'" % expr.get_domain()
format += ")"
for index, item in enumerate(gens):
if len(item) > 2 and (item[:1] == "(" and item[len(item) - 1:] == ")"):
gens[index] = item[1:len(item) - 1]
return format % (' '.join(terms), ', '.join(gens))
def _print_UniversalSet(self, p):
return 'UniversalSet'
def _print_AlgebraicNumber(self, expr):
if expr.is_aliased:
return self._print(expr.as_poly().as_expr())
else:
return self._print(expr.as_expr())
def _print_Pow(self, expr, rational=False):
"""Printing helper function for ``Pow``
Parameters
==========
rational : bool, optional
If ``True``, it will not attempt printing ``sqrt(x)`` or
``x**S.Half`` as ``sqrt``, and will use ``x**(1/2)``
instead.
See examples for additional details
Examples
========
>>> from sympy.functions import sqrt
>>> from sympy.printing.str import StrPrinter
>>> from sympy.abc import x
How ``rational`` keyword works with ``sqrt``:
>>> printer = StrPrinter()
>>> printer._print_Pow(sqrt(x), rational=True)
'x**(1/2)'
>>> printer._print_Pow(sqrt(x), rational=False)
'sqrt(x)'
>>> printer._print_Pow(1/sqrt(x), rational=True)
'x**(-1/2)'
>>> printer._print_Pow(1/sqrt(x), rational=False)
'1/sqrt(x)'
Notes
=====
``sqrt(x)`` is canonicalized as ``Pow(x, S.Half)`` in SymPy,
so there is no need of defining a separate printer for ``sqrt``.
Instead, it should be handled here as well.
"""
PREC = precedence(expr)
if expr.exp is S.Half and not rational:
return "sqrt(%s)" % self._print(expr.base)
if expr.is_commutative:
if -expr.exp is S.Half and not rational:
# Note: Don't test "expr.exp == -S.Half" here, because that will
# match -0.5, which we don't want.
return "%s/sqrt(%s)" % tuple(map(lambda arg: self._print(arg), (S.One, expr.base)))
if expr.exp is -S.One:
# Similarly to the S.Half case, don't test with "==" here.
return '%s/%s' % (self._print(S.One),
self.parenthesize(expr.base, PREC, strict=False))
e = self.parenthesize(expr.exp, PREC, strict=False)
if self.printmethod == '_sympyrepr' and expr.exp.is_Rational and expr.exp.q != 1:
# the parenthesized exp should be '(Rational(a, b))' so strip parens,
# but just check to be sure.
if e.startswith('(Rational'):
return '%s**%s' % (self.parenthesize(expr.base, PREC, strict=False), e[1:-1])
return '%s**%s' % (self.parenthesize(expr.base, PREC, strict=False), e)
def _print_UnevaluatedExpr(self, expr):
return self._print(expr.args[0])
def _print_MatPow(self, expr):
PREC = precedence(expr)
return '%s**%s' % (self.parenthesize(expr.base, PREC, strict=False),
self.parenthesize(expr.exp, PREC, strict=False))
def _print_ImmutableDenseNDimArray(self, expr):
return str(expr)
def _print_ImmutableSparseNDimArray(self, expr):
return str(expr)
def _print_Integer(self, expr):
if self._settings.get("sympy_integers", False):
return "S(%s)" % (expr)
return str(expr.p)
def _print_Integers(self, expr):
return 'Integers'
def _print_Naturals(self, expr):
return 'Naturals'
def _print_Naturals0(self, expr):
return 'Naturals0'
def _print_Rationals(self, expr):
return 'Rationals'
def _print_Reals(self, expr):
return 'Reals'
def _print_Complexes(self, expr):
return 'Complexes'
def _print_EmptySet(self, expr):
return 'EmptySet'
def _print_EmptySequence(self, expr):
return 'EmptySequence'
def _print_int(self, expr):
return str(expr)
def _print_mpz(self, expr):
return str(expr)
def _print_Rational(self, expr):
if expr.q == 1:
return str(expr.p)
else:
if self._settings.get("sympy_integers", False):
return "S(%s)/%s" % (expr.p, expr.q)
return "%s/%s" % (expr.p, expr.q)
def _print_PythonRational(self, expr):
if expr.q == 1:
return str(expr.p)
else:
return "%d/%d" % (expr.p, expr.q)
def _print_Fraction(self, expr):
if expr.denominator == 1:
return str(expr.numerator)
else:
return "%s/%s" % (expr.numerator, expr.denominator)
def _print_mpq(self, expr):
if expr.denominator == 1:
return str(expr.numerator)
else:
return "%s/%s" % (expr.numerator, expr.denominator)
def _print_Float(self, expr):
prec = expr._prec
if prec < 5:
dps = 0
else:
dps = prec_to_dps(expr._prec)
if self._settings["full_prec"] is True:
strip = False
elif self._settings["full_prec"] is False:
strip = True
elif self._settings["full_prec"] == "auto":
strip = self._print_level > 1
low = self._settings["min"] if "min" in self._settings else None
high = self._settings["max"] if "max" in self._settings else None
rv = mlib_to_str(expr._mpf_, dps, strip_zeros=strip, min_fixed=low, max_fixed=high)
if rv.startswith('-.0'):
rv = '-0.' + rv[3:]
elif rv.startswith('.0'):
rv = '0.' + rv[2:]
if rv.startswith('+'):
# e.g., +inf -> inf
rv = rv[1:]
return rv
def _print_Relational(self, expr):
charmap = {
"==": "Eq",
"!=": "Ne",
":=": "Assignment",
'+=': "AddAugmentedAssignment",
"-=": "SubAugmentedAssignment",
"*=": "MulAugmentedAssignment",
"/=": "DivAugmentedAssignment",
"%=": "ModAugmentedAssignment",
}
if expr.rel_op in charmap:
return '%s(%s, %s)' % (charmap[expr.rel_op], self._print(expr.lhs),
self._print(expr.rhs))
return '%s %s %s' % (self.parenthesize(expr.lhs, precedence(expr)),
self._relationals.get(expr.rel_op) or expr.rel_op,
self.parenthesize(expr.rhs, precedence(expr)))
def _print_ComplexRootOf(self, expr):
return "CRootOf(%s, %d)" % (self._print_Add(expr.expr, order='lex'),
expr.index)
def _print_RootSum(self, expr):
args = [self._print_Add(expr.expr, order='lex')]
if expr.fun is not S.IdentityFunction:
args.append(self._print(expr.fun))
return "RootSum(%s)" % ", ".join(args)
def _print_GroebnerBasis(self, basis):
cls = basis.__class__.__name__
exprs = [self._print_Add(arg, order=basis.order) for arg in basis.exprs]
exprs = "[%s]" % ", ".join(exprs)
gens = [ self._print(gen) for gen in basis.gens ]
domain = "domain='%s'" % self._print(basis.domain)
order = "order='%s'" % self._print(basis.order)
args = [exprs] + gens + [domain, order]
return "%s(%s)" % (cls, ", ".join(args))
def _print_set(self, s):
items = sorted(s, key=default_sort_key)
args = ', '.join(self._print(item) for item in items)
if not args:
return "set()"
return '{%s}' % args
def _print_frozenset(self, s):
if not s:
return "frozenset()"
return "frozenset(%s)" % self._print_set(s)
def _print_Sum(self, expr):
def _xab_tostr(xab):
if len(xab) == 1:
return self._print(xab[0])
else:
return self._print((xab[0],) + tuple(xab[1:]))
L = ', '.join([_xab_tostr(l) for l in expr.limits])
return 'Sum(%s, %s)' % (self._print(expr.function), L)
def _print_Symbol(self, expr):
return expr.name
_print_MatrixSymbol = _print_Symbol
_print_RandomSymbol = _print_Symbol
def _print_Identity(self, expr):
return "I"
def _print_ZeroMatrix(self, expr):
return "0"
def _print_OneMatrix(self, expr):
return "1"
def _print_Predicate(self, expr):
return "Q.%s" % expr.name
def _print_str(self, expr):
return str(expr)
def _print_tuple(self, expr):
if len(expr) == 1:
return "(%s,)" % self._print(expr[0])
else:
return "(%s)" % self.stringify(expr, ", ")
def _print_Tuple(self, expr):
return self._print_tuple(expr)
def _print_Transpose(self, T):
return "%s.T" % self.parenthesize(T.arg, PRECEDENCE["Pow"])
def _print_Uniform(self, expr):
return "Uniform(%s, %s)" % (self._print(expr.a), self._print(expr.b))
def _print_Quantity(self, expr):
if self._settings.get("abbrev", False):
return "%s" % expr.abbrev
return "%s" % expr.name
def _print_Quaternion(self, expr):
s = [self.parenthesize(i, PRECEDENCE["Mul"], strict=True) for i in expr.args]
a = [s[0]] + [i+"*"+j for i, j in zip(s[1:], "ijk")]
return " + ".join(a)
def _print_Dimension(self, expr):
return str(expr)
def _print_Wild(self, expr):
return expr.name + '_'
def _print_WildFunction(self, expr):
return expr.name + '_'
def _print_Zero(self, expr):
if self._settings.get("sympy_integers", False):
return "S(0)"
return "0"
def _print_DMP(self, p):
from sympy.core.sympify import SympifyError
try:
if p.ring is not None:
# TODO incorporate order
return self._print(p.ring.to_sympy(p))
except SympifyError:
pass
cls = p.__class__.__name__
rep = self._print(p.rep)
dom = self._print(p.dom)
ring = self._print(p.ring)
return "%s(%s, %s, %s)" % (cls, rep, dom, ring)
def _print_DMF(self, expr):
return self._print_DMP(expr)
def _print_Object(self, obj):
return 'Object("%s")' % obj.name
def _print_IdentityMorphism(self, morphism):
return 'IdentityMorphism(%s)' % morphism.domain
def _print_NamedMorphism(self, morphism):
return 'NamedMorphism(%s, %s, "%s")' % \
(morphism.domain, morphism.codomain, morphism.name)
def _print_Category(self, category):
return 'Category("%s")' % category.name
def _print_Manifold(self, manifold):
return manifold.name
def _print_Patch(self, patch):
return patch.name
def _print_CoordSystem(self, coords):
return coords.name
def _print_BaseScalarField(self, field):
return field._coord_sys._names[field._index]
def _print_BaseVectorField(self, field):
return 'e_%s' % field._coord_sys._names[field._index]
def _print_Differential(self, diff):
field = diff._form_field
if hasattr(field, '_coord_sys'):
return 'd%s' % field._coord_sys._names[field._index]
else:
return 'd(%s)' % self._print(field)
def _print_Tr(self, expr):
#TODO : Handle indices
return "%s(%s)" % ("Tr", self._print(expr.args[0]))
def sstr(expr, **settings):
"""Returns the expression as a string.
For large expressions where speed is a concern, use the setting
order='none'. If abbrev=True setting is used then units are printed in
abbreviated form.
Examples
========
>>> from sympy import symbols, Eq, sstr
>>> a, b = symbols('a b')
>>> sstr(Eq(a + b, 0))
'Eq(a + b, 0)'
"""
p = StrPrinter(settings)
s = p.doprint(expr)
return s
class StrReprPrinter(StrPrinter):
"""(internal) -- see sstrrepr"""
def _print_str(self, s):
return repr(s)
def sstrrepr(expr, **settings):
"""return expr in mixed str/repr form
i.e. strings are returned in repr form with quotes, and everything else
is returned in str form.
This function could be useful for hooking into sys.displayhook
"""
p = StrReprPrinter(settings)
s = p.doprint(expr)
return s
|
68fe4426feb141d35aa2962719c5f2d7deb5b61b206710553971908ce9f7ccac
|
"""
A Printer which converts an expression into its LaTeX equivalent.
"""
from __future__ import print_function, division
from typing import Any, Dict
import itertools
from sympy.core import Add, Mod, Mul, Number, S, Symbol
from sympy.core.alphabets import greeks
from sympy.core.containers import Tuple
from sympy.core.function import _coeff_isneg, AppliedUndef, Derivative
from sympy.core.operations import AssocOp
from sympy.core.sympify import SympifyError
from sympy.logic.boolalg import true
# sympy.printing imports
from sympy.printing.precedence import precedence_traditional
from sympy.printing.printer import Printer
from sympy.printing.conventions import split_super_sub, requires_partial
from sympy.printing.precedence import precedence, PRECEDENCE
import mpmath.libmp as mlib
from mpmath.libmp import prec_to_dps
from sympy.core.compatibility import default_sort_key
from sympy.utilities.iterables import has_variety
import re
# Hand-picked functions which can be used directly in both LaTeX and MathJax
# Complete list at
# https://docs.mathjax.org/en/latest/tex.html#supported-latex-commands
# This variable only contains those functions which sympy uses.
accepted_latex_functions = ['arcsin', 'arccos', 'arctan', 'sin', 'cos', 'tan',
'sinh', 'cosh', 'tanh', 'sqrt', 'ln', 'log', 'sec',
'csc', 'cot', 'coth', 're', 'im', 'frac', 'root',
'arg',
]
tex_greek_dictionary = {
'Alpha': 'A',
'Beta': 'B',
'Gamma': r'\Gamma',
'Delta': r'\Delta',
'Epsilon': 'E',
'Zeta': 'Z',
'Eta': 'H',
'Theta': r'\Theta',
'Iota': 'I',
'Kappa': 'K',
'Lambda': r'\Lambda',
'Mu': 'M',
'Nu': 'N',
'Xi': r'\Xi',
'omicron': 'o',
'Omicron': 'O',
'Pi': r'\Pi',
'Rho': 'P',
'Sigma': r'\Sigma',
'Tau': 'T',
'Upsilon': r'\Upsilon',
'Phi': r'\Phi',
'Chi': 'X',
'Psi': r'\Psi',
'Omega': r'\Omega',
'lamda': r'\lambda',
'Lamda': r'\Lambda',
'khi': r'\chi',
'Khi': r'X',
'varepsilon': r'\varepsilon',
'varkappa': r'\varkappa',
'varphi': r'\varphi',
'varpi': r'\varpi',
'varrho': r'\varrho',
'varsigma': r'\varsigma',
'vartheta': r'\vartheta',
}
other_symbols = set(['aleph', 'beth', 'daleth', 'gimel', 'ell', 'eth', 'hbar',
'hslash', 'mho', 'wp', ])
# Variable name modifiers
modifier_dict = {
# Accents
'mathring': lambda s: r'\mathring{'+s+r'}',
'ddddot': lambda s: r'\ddddot{'+s+r'}',
'dddot': lambda s: r'\dddot{'+s+r'}',
'ddot': lambda s: r'\ddot{'+s+r'}',
'dot': lambda s: r'\dot{'+s+r'}',
'check': lambda s: r'\check{'+s+r'}',
'breve': lambda s: r'\breve{'+s+r'}',
'acute': lambda s: r'\acute{'+s+r'}',
'grave': lambda s: r'\grave{'+s+r'}',
'tilde': lambda s: r'\tilde{'+s+r'}',
'hat': lambda s: r'\hat{'+s+r'}',
'bar': lambda s: r'\bar{'+s+r'}',
'vec': lambda s: r'\vec{'+s+r'}',
'prime': lambda s: "{"+s+"}'",
'prm': lambda s: "{"+s+"}'",
# Faces
'bold': lambda s: r'\boldsymbol{'+s+r'}',
'bm': lambda s: r'\boldsymbol{'+s+r'}',
'cal': lambda s: r'\mathcal{'+s+r'}',
'scr': lambda s: r'\mathscr{'+s+r'}',
'frak': lambda s: r'\mathfrak{'+s+r'}',
# Brackets
'norm': lambda s: r'\left\|{'+s+r'}\right\|',
'avg': lambda s: r'\left\langle{'+s+r'}\right\rangle',
'abs': lambda s: r'\left|{'+s+r'}\right|',
'mag': lambda s: r'\left|{'+s+r'}\right|',
}
greek_letters_set = frozenset(greeks)
_between_two_numbers_p = (
re.compile(r'[0-9][} ]*$'), # search
re.compile(r'[{ ]*[-+0-9]'), # match
)
class LatexPrinter(Printer):
printmethod = "_latex"
_default_settings = {
"full_prec": False,
"fold_frac_powers": False,
"fold_func_brackets": False,
"fold_short_frac": None,
"inv_trig_style": "abbreviated",
"itex": False,
"ln_notation": False,
"long_frac_ratio": None,
"mat_delim": "[",
"mat_str": None,
"mode": "plain",
"mul_symbol": None,
"order": None,
"symbol_names": {},
"root_notation": True,
"mat_symbol_style": "plain",
"imaginary_unit": "i",
"gothic_re_im": False,
"decimal_separator": "period",
"perm_cyclic": True,
"parenthesize_super": True,
"min": None,
"max": None,
} # type: Dict[str, Any]
def __init__(self, settings=None):
Printer.__init__(self, settings)
if 'mode' in self._settings:
valid_modes = ['inline', 'plain', 'equation',
'equation*']
if self._settings['mode'] not in valid_modes:
raise ValueError("'mode' must be one of 'inline', 'plain', "
"'equation' or 'equation*'")
if self._settings['fold_short_frac'] is None and \
self._settings['mode'] == 'inline':
self._settings['fold_short_frac'] = True
mul_symbol_table = {
None: r" ",
"ldot": r" \,.\, ",
"dot": r" \cdot ",
"times": r" \times "
}
try:
self._settings['mul_symbol_latex'] = \
mul_symbol_table[self._settings['mul_symbol']]
except KeyError:
self._settings['mul_symbol_latex'] = \
self._settings['mul_symbol']
try:
self._settings['mul_symbol_latex_numbers'] = \
mul_symbol_table[self._settings['mul_symbol'] or 'dot']
except KeyError:
if (self._settings['mul_symbol'].strip() in
['', ' ', '\\', '\\,', '\\:', '\\;', '\\quad']):
self._settings['mul_symbol_latex_numbers'] = \
mul_symbol_table['dot']
else:
self._settings['mul_symbol_latex_numbers'] = \
self._settings['mul_symbol']
self._delim_dict = {'(': ')', '[': ']'}
imaginary_unit_table = {
None: r"i",
"i": r"i",
"ri": r"\mathrm{i}",
"ti": r"\text{i}",
"j": r"j",
"rj": r"\mathrm{j}",
"tj": r"\text{j}",
}
try:
self._settings['imaginary_unit_latex'] = \
imaginary_unit_table[self._settings['imaginary_unit']]
except KeyError:
self._settings['imaginary_unit_latex'] = \
self._settings['imaginary_unit']
def _add_parens(self, s):
return r"\left({}\right)".format(s)
# TODO: merge this with the above, which requires a lot of test changes
def _add_parens_lspace(self, s):
return r"\left( {}\right)".format(s)
def parenthesize(self, item, level, is_neg=False, strict=False):
prec_val = precedence_traditional(item)
if is_neg and strict:
return self._add_parens(self._print(item))
if (prec_val < level) or ((not strict) and prec_val <= level):
return self._add_parens(self._print(item))
else:
return self._print(item)
def parenthesize_super(self, s):
"""
Protect superscripts in s
If the parenthesize_super option is set, protect with parentheses, else
wrap in braces.
"""
if "^" in s:
if self._settings['parenthesize_super']:
return self._add_parens(s)
else:
return "{{{}}}".format(s)
return s
def doprint(self, expr):
tex = Printer.doprint(self, expr)
if self._settings['mode'] == 'plain':
return tex
elif self._settings['mode'] == 'inline':
return r"$%s$" % tex
elif self._settings['itex']:
return r"$$%s$$" % tex
else:
env_str = self._settings['mode']
return r"\begin{%s}%s\end{%s}" % (env_str, tex, env_str)
def _needs_brackets(self, expr):
"""
Returns True if the expression needs to be wrapped in brackets when
printed, False otherwise. For example: a + b => True; a => False;
10 => False; -10 => True.
"""
return not ((expr.is_Integer and expr.is_nonnegative)
or (expr.is_Atom and (expr is not S.NegativeOne
and expr.is_Rational is False)))
def _needs_function_brackets(self, expr):
"""
Returns True if the expression needs to be wrapped in brackets when
passed as an argument to a function, False otherwise. This is a more
liberal version of _needs_brackets, in that many expressions which need
to be wrapped in brackets when added/subtracted/raised to a power do
not need them when passed to a function. Such an example is a*b.
"""
if not self._needs_brackets(expr):
return False
else:
# Muls of the form a*b*c... can be folded
if expr.is_Mul and not self._mul_is_clean(expr):
return True
# Pows which don't need brackets can be folded
elif expr.is_Pow and not self._pow_is_clean(expr):
return True
# Add and Function always need brackets
elif expr.is_Add or expr.is_Function:
return True
else:
return False
def _needs_mul_brackets(self, expr, first=False, last=False):
"""
Returns True if the expression needs to be wrapped in brackets when
printed as part of a Mul, False otherwise. This is True for Add,
but also for some container objects that would not need brackets
when appearing last in a Mul, e.g. an Integral. ``last=True``
specifies that this expr is the last to appear in a Mul.
``first=True`` specifies that this expr is the first to appear in
a Mul.
"""
from sympy import Integral, Product, Sum
if expr.is_Mul:
if not first and _coeff_isneg(expr):
return True
elif precedence_traditional(expr) < PRECEDENCE["Mul"]:
return True
elif expr.is_Relational:
return True
if expr.is_Piecewise:
return True
if any([expr.has(x) for x in (Mod,)]):
return True
if (not last and
any([expr.has(x) for x in (Integral, Product, Sum)])):
return True
return False
def _needs_add_brackets(self, expr):
"""
Returns True if the expression needs to be wrapped in brackets when
printed as part of an Add, False otherwise. This is False for most
things.
"""
if expr.is_Relational:
return True
if any([expr.has(x) for x in (Mod,)]):
return True
if expr.is_Add:
return True
return False
def _mul_is_clean(self, expr):
for arg in expr.args:
if arg.is_Function:
return False
return True
def _pow_is_clean(self, expr):
return not self._needs_brackets(expr.base)
def _do_exponent(self, expr, exp):
if exp is not None:
return r"\left(%s\right)^{%s}" % (expr, exp)
else:
return expr
def _print_Basic(self, expr):
ls = [self._print(o) for o in expr.args]
return self._deal_with_super_sub(expr.__class__.__name__) + \
r"\left(%s\right)" % ", ".join(ls)
def _print_bool(self, e):
return r"\text{%s}" % e
_print_BooleanTrue = _print_bool
_print_BooleanFalse = _print_bool
def _print_NoneType(self, e):
return r"\text{%s}" % e
def _print_Add(self, expr, order=None):
terms = self._as_ordered_terms(expr, order=order)
tex = ""
for i, term in enumerate(terms):
if i == 0:
pass
elif _coeff_isneg(term):
tex += " - "
term = -term
else:
tex += " + "
term_tex = self._print(term)
if self._needs_add_brackets(term):
term_tex = r"\left(%s\right)" % term_tex
tex += term_tex
return tex
def _print_Cycle(self, expr):
from sympy.combinatorics.permutations import Permutation
if expr.size == 0:
return r"\left( \right)"
expr = Permutation(expr)
expr_perm = expr.cyclic_form
siz = expr.size
if expr.array_form[-1] == siz - 1:
expr_perm = expr_perm + [[siz - 1]]
term_tex = ''
for i in expr_perm:
term_tex += str(i).replace(',', r"\;")
term_tex = term_tex.replace('[', r"\left( ")
term_tex = term_tex.replace(']', r"\right)")
return term_tex
def _print_Permutation(self, expr):
from sympy.combinatorics.permutations import Permutation
from sympy.utilities.exceptions import SymPyDeprecationWarning
perm_cyclic = Permutation.print_cyclic
if perm_cyclic is not None:
SymPyDeprecationWarning(
feature="Permutation.print_cyclic = {}".format(perm_cyclic),
useinstead="init_printing(perm_cyclic={})"
.format(perm_cyclic),
issue=15201,
deprecated_since_version="1.6").warn()
else:
perm_cyclic = self._settings.get("perm_cyclic", True)
if perm_cyclic:
return self._print_Cycle(expr)
if expr.size == 0:
return r"\left( \right)"
lower = [self._print(arg) for arg in expr.array_form]
upper = [self._print(arg) for arg in range(len(lower))]
row1 = " & ".join(upper)
row2 = " & ".join(lower)
mat = r" \\ ".join((row1, row2))
return r"\begin{pmatrix} %s \end{pmatrix}" % mat
def _print_AppliedPermutation(self, expr):
perm, var = expr.args
return r"\sigma_{%s}(%s)" % (self._print(perm), self._print(var))
def _print_Float(self, expr):
# Based off of that in StrPrinter
dps = prec_to_dps(expr._prec)
strip = False if self._settings['full_prec'] else True
low = self._settings["min"] if "min" in self._settings else None
high = self._settings["max"] if "max" in self._settings else None
str_real = mlib.to_str(expr._mpf_, dps, strip_zeros=strip, min_fixed=low, max_fixed=high)
# Must always have a mul symbol (as 2.5 10^{20} just looks odd)
# thus we use the number separator
separator = self._settings['mul_symbol_latex_numbers']
if 'e' in str_real:
(mant, exp) = str_real.split('e')
if exp[0] == '+':
exp = exp[1:]
if self._settings['decimal_separator'] == 'comma':
mant = mant.replace('.','{,}')
return r"%s%s10^{%s}" % (mant, separator, exp)
elif str_real == "+inf":
return r"\infty"
elif str_real == "-inf":
return r"- \infty"
else:
if self._settings['decimal_separator'] == 'comma':
str_real = str_real.replace('.','{,}')
return str_real
def _print_Cross(self, expr):
vec1 = expr._expr1
vec2 = expr._expr2
return r"%s \times %s" % (self.parenthesize(vec1, PRECEDENCE['Mul']),
self.parenthesize(vec2, PRECEDENCE['Mul']))
def _print_Curl(self, expr):
vec = expr._expr
return r"\nabla\times %s" % self.parenthesize(vec, PRECEDENCE['Mul'])
def _print_Divergence(self, expr):
vec = expr._expr
return r"\nabla\cdot %s" % self.parenthesize(vec, PRECEDENCE['Mul'])
def _print_Dot(self, expr):
vec1 = expr._expr1
vec2 = expr._expr2
return r"%s \cdot %s" % (self.parenthesize(vec1, PRECEDENCE['Mul']),
self.parenthesize(vec2, PRECEDENCE['Mul']))
def _print_Gradient(self, expr):
func = expr._expr
return r"\nabla %s" % self.parenthesize(func, PRECEDENCE['Mul'])
def _print_Laplacian(self, expr):
func = expr._expr
return r"\triangle %s" % self.parenthesize(func, PRECEDENCE['Mul'])
def _print_Mul(self, expr):
from sympy.core.power import Pow
from sympy.physics.units import Quantity
from sympy.simplify import fraction
separator = self._settings['mul_symbol_latex']
numbersep = self._settings['mul_symbol_latex_numbers']
def convert(expr):
if not expr.is_Mul:
return str(self._print(expr))
else:
if self.order not in ('old', 'none'):
args = expr.as_ordered_factors()
else:
args = list(expr.args)
# If quantities are present append them at the back
args = sorted(args, key=lambda x: isinstance(x, Quantity) or
(isinstance(x, Pow) and
isinstance(x.base, Quantity)))
return convert_args(args)
def convert_args(args):
_tex = last_term_tex = ""
for i, term in enumerate(args):
term_tex = self._print(term)
if self._needs_mul_brackets(term, first=(i == 0),
last=(i == len(args) - 1)):
term_tex = r"\left(%s\right)" % term_tex
if _between_two_numbers_p[0].search(last_term_tex) and \
_between_two_numbers_p[1].match(term_tex):
# between two numbers
_tex += numbersep
elif _tex:
_tex += separator
_tex += term_tex
last_term_tex = term_tex
return _tex
# Check for unevaluated Mul. In this case we need to make sure the
# identities are visible, multiple Rational factors are not combined
# etc so we display in a straight-forward form that fully preserves all
# args and their order.
# XXX: _print_Pow calls this routine with instances of Pow...
if isinstance(expr, Mul):
args = expr.args
if args[0] is S.One or any(isinstance(arg, Number) for arg in args[1:]):
return convert_args(args)
include_parens = False
if _coeff_isneg(expr):
expr = -expr
tex = "- "
if expr.is_Add:
tex += "("
include_parens = True
else:
tex = ""
numer, denom = fraction(expr, exact=True)
if denom is S.One and Pow(1, -1, evaluate=False) not in expr.args:
# use the original expression here, since fraction() may have
# altered it when producing numer and denom
tex += convert(expr)
else:
snumer = convert(numer)
sdenom = convert(denom)
ldenom = len(sdenom.split())
ratio = self._settings['long_frac_ratio']
if self._settings['fold_short_frac'] and ldenom <= 2 and \
"^" not in sdenom:
# handle short fractions
if self._needs_mul_brackets(numer, last=False):
tex += r"\left(%s\right) / %s" % (snumer, sdenom)
else:
tex += r"%s / %s" % (snumer, sdenom)
elif ratio is not None and \
len(snumer.split()) > ratio*ldenom:
# handle long fractions
if self._needs_mul_brackets(numer, last=True):
tex += r"\frac{1}{%s}%s\left(%s\right)" \
% (sdenom, separator, snumer)
elif numer.is_Mul:
# split a long numerator
a = S.One
b = S.One
for x in numer.args:
if self._needs_mul_brackets(x, last=False) or \
len(convert(a*x).split()) > ratio*ldenom or \
(b.is_commutative is x.is_commutative is False):
b *= x
else:
a *= x
if self._needs_mul_brackets(b, last=True):
tex += r"\frac{%s}{%s}%s\left(%s\right)" \
% (convert(a), sdenom, separator, convert(b))
else:
tex += r"\frac{%s}{%s}%s%s" \
% (convert(a), sdenom, separator, convert(b))
else:
tex += r"\frac{1}{%s}%s%s" % (sdenom, separator, snumer)
else:
tex += r"\frac{%s}{%s}" % (snumer, sdenom)
if include_parens:
tex += ")"
return tex
def _print_Pow(self, expr):
# Treat x**Rational(1,n) as special case
if expr.exp.is_Rational and abs(expr.exp.p) == 1 and expr.exp.q != 1 \
and self._settings['root_notation']:
base = self._print(expr.base)
expq = expr.exp.q
if expq == 2:
tex = r"\sqrt{%s}" % base
elif self._settings['itex']:
tex = r"\root{%d}{%s}" % (expq, base)
else:
tex = r"\sqrt[%d]{%s}" % (expq, base)
if expr.exp.is_negative:
return r"\frac{1}{%s}" % tex
else:
return tex
elif self._settings['fold_frac_powers'] \
and expr.exp.is_Rational \
and expr.exp.q != 1:
base = self.parenthesize(expr.base, PRECEDENCE['Pow'])
p, q = expr.exp.p, expr.exp.q
# issue #12886: add parentheses for superscripts raised to powers
if expr.base.is_Symbol:
base = self.parenthesize_super(base)
if expr.base.is_Function:
return self._print(expr.base, exp="%s/%s" % (p, q))
return r"%s^{%s/%s}" % (base, p, q)
elif expr.exp.is_Rational and expr.exp.is_negative and \
expr.base.is_commutative:
# special case for 1^(-x), issue 9216
if expr.base == 1:
return r"%s^{%s}" % (expr.base, expr.exp)
# things like 1/x
return self._print_Mul(expr)
else:
if expr.base.is_Function:
return self._print(expr.base, exp=self._print(expr.exp))
else:
tex = r"%s^{%s}"
return self._helper_print_standard_power(expr, tex)
def _helper_print_standard_power(self, expr, template):
exp = self._print(expr.exp)
# issue #12886: add parentheses around superscripts raised
# to powers
base = self.parenthesize(expr.base, PRECEDENCE['Pow'])
if expr.base.is_Symbol:
base = self.parenthesize_super(base)
elif (isinstance(expr.base, Derivative)
and base.startswith(r'\left(')
and re.match(r'\\left\(\\d?d?dot', base)
and base.endswith(r'\right)')):
# don't use parentheses around dotted derivative
base = base[6: -7] # remove outermost added parens
return template % (base, exp)
def _print_UnevaluatedExpr(self, expr):
return self._print(expr.args[0])
def _print_Sum(self, expr):
if len(expr.limits) == 1:
tex = r"\sum_{%s=%s}^{%s} " % \
tuple([self._print(i) for i in expr.limits[0]])
else:
def _format_ineq(l):
return r"%s \leq %s \leq %s" % \
tuple([self._print(s) for s in (l[1], l[0], l[2])])
tex = r"\sum_{\substack{%s}} " % \
str.join('\\\\', [_format_ineq(l) for l in expr.limits])
if isinstance(expr.function, Add):
tex += r"\left(%s\right)" % self._print(expr.function)
else:
tex += self._print(expr.function)
return tex
def _print_Product(self, expr):
if len(expr.limits) == 1:
tex = r"\prod_{%s=%s}^{%s} " % \
tuple([self._print(i) for i in expr.limits[0]])
else:
def _format_ineq(l):
return r"%s \leq %s \leq %s" % \
tuple([self._print(s) for s in (l[1], l[0], l[2])])
tex = r"\prod_{\substack{%s}} " % \
str.join('\\\\', [_format_ineq(l) for l in expr.limits])
if isinstance(expr.function, Add):
tex += r"\left(%s\right)" % self._print(expr.function)
else:
tex += self._print(expr.function)
return tex
def _print_BasisDependent(self, expr):
from sympy.vector import Vector
o1 = []
if expr == expr.zero:
return expr.zero._latex_form
if isinstance(expr, Vector):
items = expr.separate().items()
else:
items = [(0, expr)]
for system, vect in items:
inneritems = list(vect.components.items())
inneritems.sort(key=lambda x: x[0].__str__())
for k, v in inneritems:
if v == 1:
o1.append(' + ' + k._latex_form)
elif v == -1:
o1.append(' - ' + k._latex_form)
else:
arg_str = '(' + LatexPrinter().doprint(v) + ')'
o1.append(' + ' + arg_str + k._latex_form)
outstr = (''.join(o1))
if outstr[1] != '-':
outstr = outstr[3:]
else:
outstr = outstr[1:]
return outstr
def _print_Indexed(self, expr):
tex_base = self._print(expr.base)
tex = '{'+tex_base+'}'+'_{%s}' % ','.join(
map(self._print, expr.indices))
return tex
def _print_IndexedBase(self, expr):
return self._print(expr.label)
def _print_Derivative(self, expr):
if requires_partial(expr.expr):
diff_symbol = r'\partial'
else:
diff_symbol = r'd'
tex = ""
dim = 0
for x, num in reversed(expr.variable_count):
dim += num
if num == 1:
tex += r"%s %s" % (diff_symbol, self._print(x))
else:
tex += r"%s %s^{%s}" % (diff_symbol,
self.parenthesize_super(self._print(x)),
self._print(num))
if dim == 1:
tex = r"\frac{%s}{%s}" % (diff_symbol, tex)
else:
tex = r"\frac{%s^{%s}}{%s}" % (diff_symbol, self._print(dim), tex)
if any(_coeff_isneg(i) for i in expr.args):
return r"%s %s" % (tex, self.parenthesize(expr.expr,
PRECEDENCE["Mul"],
is_neg=True,
strict=True))
return r"%s %s" % (tex, self.parenthesize(expr.expr,
PRECEDENCE["Mul"],
is_neg=False,
strict=True))
def _print_Subs(self, subs):
expr, old, new = subs.args
latex_expr = self._print(expr)
latex_old = (self._print(e) for e in old)
latex_new = (self._print(e) for e in new)
latex_subs = r'\\ '.join(
e[0] + '=' + e[1] for e in zip(latex_old, latex_new))
return r'\left. %s \right|_{\substack{ %s }}' % (latex_expr,
latex_subs)
def _print_Integral(self, expr):
tex, symbols = "", []
# Only up to \iiiint exists
if len(expr.limits) <= 4 and all(len(lim) == 1 for lim in expr.limits):
# Use len(expr.limits)-1 so that syntax highlighters don't think
# \" is an escaped quote
tex = r"\i" + "i"*(len(expr.limits) - 1) + "nt"
symbols = [r"\, d%s" % self._print(symbol[0])
for symbol in expr.limits]
else:
for lim in reversed(expr.limits):
symbol = lim[0]
tex += r"\int"
if len(lim) > 1:
if self._settings['mode'] != 'inline' \
and not self._settings['itex']:
tex += r"\limits"
if len(lim) == 3:
tex += "_{%s}^{%s}" % (self._print(lim[1]),
self._print(lim[2]))
if len(lim) == 2:
tex += "^{%s}" % (self._print(lim[1]))
symbols.insert(0, r"\, d%s" % self._print(symbol))
return r"%s %s%s" % (tex, self.parenthesize(expr.function,
PRECEDENCE["Mul"],
is_neg=any(_coeff_isneg(i) for i in expr.args),
strict=True),
"".join(symbols))
def _print_Limit(self, expr):
e, z, z0, dir = expr.args
tex = r"\lim_{%s \to " % self._print(z)
if str(dir) == '+-' or z0 in (S.Infinity, S.NegativeInfinity):
tex += r"%s}" % self._print(z0)
else:
tex += r"%s^%s}" % (self._print(z0), self._print(dir))
if isinstance(e, AssocOp):
return r"%s\left(%s\right)" % (tex, self._print(e))
else:
return r"%s %s" % (tex, self._print(e))
def _hprint_Function(self, func):
r'''
Logic to decide how to render a function to latex
- if it is a recognized latex name, use the appropriate latex command
- if it is a single letter, just use that letter
- if it is a longer name, then put \operatorname{} around it and be
mindful of undercores in the name
'''
func = self._deal_with_super_sub(func)
if func in accepted_latex_functions:
name = r"\%s" % func
elif len(func) == 1 or func.startswith('\\'):
name = func
else:
name = r"\operatorname{%s}" % func
return name
def _print_Function(self, expr, exp=None):
r'''
Render functions to LaTeX, handling functions that LaTeX knows about
e.g., sin, cos, ... by using the proper LaTeX command (\sin, \cos, ...).
For single-letter function names, render them as regular LaTeX math
symbols. For multi-letter function names that LaTeX does not know
about, (e.g., Li, sech) use \operatorname{} so that the function name
is rendered in Roman font and LaTeX handles spacing properly.
expr is the expression involving the function
exp is an exponent
'''
func = expr.func.__name__
if hasattr(self, '_print_' + func) and \
not isinstance(expr, AppliedUndef):
return getattr(self, '_print_' + func)(expr, exp)
else:
args = [str(self._print(arg)) for arg in expr.args]
# How inverse trig functions should be displayed, formats are:
# abbreviated: asin, full: arcsin, power: sin^-1
inv_trig_style = self._settings['inv_trig_style']
# If we are dealing with a power-style inverse trig function
inv_trig_power_case = False
# If it is applicable to fold the argument brackets
can_fold_brackets = self._settings['fold_func_brackets'] and \
len(args) == 1 and \
not self._needs_function_brackets(expr.args[0])
inv_trig_table = [
"asin", "acos", "atan",
"acsc", "asec", "acot",
"asinh", "acosh", "atanh",
"acsch", "asech", "acoth",
]
# If the function is an inverse trig function, handle the style
if func in inv_trig_table:
if inv_trig_style == "abbreviated":
pass
elif inv_trig_style == "full":
func = "arc" + func[1:]
elif inv_trig_style == "power":
func = func[1:]
inv_trig_power_case = True
# Can never fold brackets if we're raised to a power
if exp is not None:
can_fold_brackets = False
if inv_trig_power_case:
if func in accepted_latex_functions:
name = r"\%s^{-1}" % func
else:
name = r"\operatorname{%s}^{-1}" % func
elif exp is not None:
func_tex = self._hprint_Function(func)
func_tex = self.parenthesize_super(func_tex)
name = r'%s^{%s}' % (func_tex, exp)
else:
name = self._hprint_Function(func)
if can_fold_brackets:
if func in accepted_latex_functions:
# Wrap argument safely to avoid parse-time conflicts
# with the function name itself
name += r" {%s}"
else:
name += r"%s"
else:
name += r"{\left(%s \right)}"
if inv_trig_power_case and exp is not None:
name += r"^{%s}" % exp
return name % ",".join(args)
def _print_UndefinedFunction(self, expr):
return self._hprint_Function(str(expr))
def _print_ElementwiseApplyFunction(self, expr):
return r"{%s}_{\circ}\left({%s}\right)" % (
self._print(expr.function),
self._print(expr.expr),
)
@property
def _special_function_classes(self):
from sympy.functions.special.tensor_functions import KroneckerDelta
from sympy.functions.special.gamma_functions import gamma, lowergamma
from sympy.functions.special.beta_functions import beta
from sympy.functions.special.delta_functions import DiracDelta
from sympy.functions.special.error_functions import Chi
return {KroneckerDelta: r'\delta',
gamma: r'\Gamma',
lowergamma: r'\gamma',
beta: r'\operatorname{B}',
DiracDelta: r'\delta',
Chi: r'\operatorname{Chi}'}
def _print_FunctionClass(self, expr):
for cls in self._special_function_classes:
if issubclass(expr, cls) and expr.__name__ == cls.__name__:
return self._special_function_classes[cls]
return self._hprint_Function(str(expr))
def _print_Lambda(self, expr):
symbols, expr = expr.args
if len(symbols) == 1:
symbols = self._print(symbols[0])
else:
symbols = self._print(tuple(symbols))
tex = r"\left( %s \mapsto %s \right)" % (symbols, self._print(expr))
return tex
def _print_IdentityFunction(self, expr):
return r"\left( x \mapsto x \right)"
def _hprint_variadic_function(self, expr, exp=None):
args = sorted(expr.args, key=default_sort_key)
texargs = [r"%s" % self._print(symbol) for symbol in args]
tex = r"\%s\left(%s\right)" % (str(expr.func).lower(),
", ".join(texargs))
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
_print_Min = _print_Max = _hprint_variadic_function
def _print_floor(self, expr, exp=None):
tex = r"\left\lfloor{%s}\right\rfloor" % self._print(expr.args[0])
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
def _print_ceiling(self, expr, exp=None):
tex = r"\left\lceil{%s}\right\rceil" % self._print(expr.args[0])
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
def _print_log(self, expr, exp=None):
if not self._settings["ln_notation"]:
tex = r"\log{\left(%s \right)}" % self._print(expr.args[0])
else:
tex = r"\ln{\left(%s \right)}" % self._print(expr.args[0])
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
def _print_Abs(self, expr, exp=None):
tex = r"\left|{%s}\right|" % self._print(expr.args[0])
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
_print_Determinant = _print_Abs
def _print_re(self, expr, exp=None):
if self._settings['gothic_re_im']:
tex = r"\Re{%s}" % self.parenthesize(expr.args[0], PRECEDENCE['Atom'])
else:
tex = r"\operatorname{{re}}{{{}}}".format(self.parenthesize(expr.args[0], PRECEDENCE['Atom']))
return self._do_exponent(tex, exp)
def _print_im(self, expr, exp=None):
if self._settings['gothic_re_im']:
tex = r"\Im{%s}" % self.parenthesize(expr.args[0], PRECEDENCE['Atom'])
else:
tex = r"\operatorname{{im}}{{{}}}".format(self.parenthesize(expr.args[0], PRECEDENCE['Atom']))
return self._do_exponent(tex, exp)
def _print_Not(self, e):
from sympy import Equivalent, Implies
if isinstance(e.args[0], Equivalent):
return self._print_Equivalent(e.args[0], r"\not\Leftrightarrow")
if isinstance(e.args[0], Implies):
return self._print_Implies(e.args[0], r"\not\Rightarrow")
if (e.args[0].is_Boolean):
return r"\neg \left(%s\right)" % self._print(e.args[0])
else:
return r"\neg %s" % self._print(e.args[0])
def _print_LogOp(self, args, char):
arg = args[0]
if arg.is_Boolean and not arg.is_Not:
tex = r"\left(%s\right)" % self._print(arg)
else:
tex = r"%s" % self._print(arg)
for arg in args[1:]:
if arg.is_Boolean and not arg.is_Not:
tex += r" %s \left(%s\right)" % (char, self._print(arg))
else:
tex += r" %s %s" % (char, self._print(arg))
return tex
def _print_And(self, e):
args = sorted(e.args, key=default_sort_key)
return self._print_LogOp(args, r"\wedge")
def _print_Or(self, e):
args = sorted(e.args, key=default_sort_key)
return self._print_LogOp(args, r"\vee")
def _print_Xor(self, e):
args = sorted(e.args, key=default_sort_key)
return self._print_LogOp(args, r"\veebar")
def _print_Implies(self, e, altchar=None):
return self._print_LogOp(e.args, altchar or r"\Rightarrow")
def _print_Equivalent(self, e, altchar=None):
args = sorted(e.args, key=default_sort_key)
return self._print_LogOp(args, altchar or r"\Leftrightarrow")
def _print_conjugate(self, expr, exp=None):
tex = r"\overline{%s}" % self._print(expr.args[0])
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
def _print_polar_lift(self, expr, exp=None):
func = r"\operatorname{polar\_lift}"
arg = r"{\left(%s \right)}" % self._print(expr.args[0])
if exp is not None:
return r"%s^{%s}%s" % (func, exp, arg)
else:
return r"%s%s" % (func, arg)
def _print_ExpBase(self, expr, exp=None):
# TODO should exp_polar be printed differently?
# what about exp_polar(0), exp_polar(1)?
tex = r"e^{%s}" % self._print(expr.args[0])
return self._do_exponent(tex, exp)
def _print_elliptic_k(self, expr, exp=None):
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"K^{%s}%s" % (exp, tex)
else:
return r"K%s" % tex
def _print_elliptic_f(self, expr, exp=None):
tex = r"\left(%s\middle| %s\right)" % \
(self._print(expr.args[0]), self._print(expr.args[1]))
if exp is not None:
return r"F^{%s}%s" % (exp, tex)
else:
return r"F%s" % tex
def _print_elliptic_e(self, expr, exp=None):
if len(expr.args) == 2:
tex = r"\left(%s\middle| %s\right)" % \
(self._print(expr.args[0]), self._print(expr.args[1]))
else:
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"E^{%s}%s" % (exp, tex)
else:
return r"E%s" % tex
def _print_elliptic_pi(self, expr, exp=None):
if len(expr.args) == 3:
tex = r"\left(%s; %s\middle| %s\right)" % \
(self._print(expr.args[0]), self._print(expr.args[1]),
self._print(expr.args[2]))
else:
tex = r"\left(%s\middle| %s\right)" % \
(self._print(expr.args[0]), self._print(expr.args[1]))
if exp is not None:
return r"\Pi^{%s}%s" % (exp, tex)
else:
return r"\Pi%s" % tex
def _print_beta(self, expr, exp=None):
tex = r"\left(%s, %s\right)" % (self._print(expr.args[0]),
self._print(expr.args[1]))
if exp is not None:
return r"\operatorname{B}^{%s}%s" % (exp, tex)
else:
return r"\operatorname{B}%s" % tex
def _print_uppergamma(self, expr, exp=None):
tex = r"\left(%s, %s\right)" % (self._print(expr.args[0]),
self._print(expr.args[1]))
if exp is not None:
return r"\Gamma^{%s}%s" % (exp, tex)
else:
return r"\Gamma%s" % tex
def _print_lowergamma(self, expr, exp=None):
tex = r"\left(%s, %s\right)" % (self._print(expr.args[0]),
self._print(expr.args[1]))
if exp is not None:
return r"\gamma^{%s}%s" % (exp, tex)
else:
return r"\gamma%s" % tex
def _hprint_one_arg_func(self, expr, exp=None):
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"%s^{%s}%s" % (self._print(expr.func), exp, tex)
else:
return r"%s%s" % (self._print(expr.func), tex)
_print_gamma = _hprint_one_arg_func
def _print_Chi(self, expr, exp=None):
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"\operatorname{Chi}^{%s}%s" % (exp, tex)
else:
return r"\operatorname{Chi}%s" % tex
def _print_expint(self, expr, exp=None):
tex = r"\left(%s\right)" % self._print(expr.args[1])
nu = self._print(expr.args[0])
if exp is not None:
return r"\operatorname{E}_{%s}^{%s}%s" % (nu, exp, tex)
else:
return r"\operatorname{E}_{%s}%s" % (nu, tex)
def _print_fresnels(self, expr, exp=None):
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"S^{%s}%s" % (exp, tex)
else:
return r"S%s" % tex
def _print_fresnelc(self, expr, exp=None):
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"C^{%s}%s" % (exp, tex)
else:
return r"C%s" % tex
def _print_subfactorial(self, expr, exp=None):
tex = r"!%s" % self.parenthesize(expr.args[0], PRECEDENCE["Func"])
if exp is not None:
return r"\left(%s\right)^{%s}" % (tex, exp)
else:
return tex
def _print_factorial(self, expr, exp=None):
tex = r"%s!" % self.parenthesize(expr.args[0], PRECEDENCE["Func"])
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
def _print_factorial2(self, expr, exp=None):
tex = r"%s!!" % self.parenthesize(expr.args[0], PRECEDENCE["Func"])
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
def _print_binomial(self, expr, exp=None):
tex = r"{\binom{%s}{%s}}" % (self._print(expr.args[0]),
self._print(expr.args[1]))
if exp is not None:
return r"%s^{%s}" % (tex, exp)
else:
return tex
def _print_RisingFactorial(self, expr, exp=None):
n, k = expr.args
base = r"%s" % self.parenthesize(n, PRECEDENCE['Func'])
tex = r"{%s}^{\left(%s\right)}" % (base, self._print(k))
return self._do_exponent(tex, exp)
def _print_FallingFactorial(self, expr, exp=None):
n, k = expr.args
sub = r"%s" % self.parenthesize(k, PRECEDENCE['Func'])
tex = r"{\left(%s\right)}_{%s}" % (self._print(n), sub)
return self._do_exponent(tex, exp)
def _hprint_BesselBase(self, expr, exp, sym):
tex = r"%s" % (sym)
need_exp = False
if exp is not None:
if tex.find('^') == -1:
tex = r"%s^{%s}" % (tex, exp)
else:
need_exp = True
tex = r"%s_{%s}\left(%s\right)" % (tex, self._print(expr.order),
self._print(expr.argument))
if need_exp:
tex = self._do_exponent(tex, exp)
return tex
def _hprint_vec(self, vec):
if not vec:
return ""
s = ""
for i in vec[:-1]:
s += "%s, " % self._print(i)
s += self._print(vec[-1])
return s
def _print_besselj(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'J')
def _print_besseli(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'I')
def _print_besselk(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'K')
def _print_bessely(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'Y')
def _print_yn(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'y')
def _print_jn(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'j')
def _print_hankel1(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'H^{(1)}')
def _print_hankel2(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'H^{(2)}')
def _print_hn1(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'h^{(1)}')
def _print_hn2(self, expr, exp=None):
return self._hprint_BesselBase(expr, exp, 'h^{(2)}')
def _hprint_airy(self, expr, exp=None, notation=""):
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"%s^{%s}%s" % (notation, exp, tex)
else:
return r"%s%s" % (notation, tex)
def _hprint_airy_prime(self, expr, exp=None, notation=""):
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"{%s^\prime}^{%s}%s" % (notation, exp, tex)
else:
return r"%s^\prime%s" % (notation, tex)
def _print_airyai(self, expr, exp=None):
return self._hprint_airy(expr, exp, 'Ai')
def _print_airybi(self, expr, exp=None):
return self._hprint_airy(expr, exp, 'Bi')
def _print_airyaiprime(self, expr, exp=None):
return self._hprint_airy_prime(expr, exp, 'Ai')
def _print_airybiprime(self, expr, exp=None):
return self._hprint_airy_prime(expr, exp, 'Bi')
def _print_hyper(self, expr, exp=None):
tex = r"{{}_{%s}F_{%s}\left(\begin{matrix} %s \\ %s \end{matrix}" \
r"\middle| {%s} \right)}" % \
(self._print(len(expr.ap)), self._print(len(expr.bq)),
self._hprint_vec(expr.ap), self._hprint_vec(expr.bq),
self._print(expr.argument))
if exp is not None:
tex = r"{%s}^{%s}" % (tex, exp)
return tex
def _print_meijerg(self, expr, exp=None):
tex = r"{G_{%s, %s}^{%s, %s}\left(\begin{matrix} %s & %s \\" \
r"%s & %s \end{matrix} \middle| {%s} \right)}" % \
(self._print(len(expr.ap)), self._print(len(expr.bq)),
self._print(len(expr.bm)), self._print(len(expr.an)),
self._hprint_vec(expr.an), self._hprint_vec(expr.aother),
self._hprint_vec(expr.bm), self._hprint_vec(expr.bother),
self._print(expr.argument))
if exp is not None:
tex = r"{%s}^{%s}" % (tex, exp)
return tex
def _print_dirichlet_eta(self, expr, exp=None):
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"\eta^{%s}%s" % (exp, tex)
return r"\eta%s" % tex
def _print_zeta(self, expr, exp=None):
if len(expr.args) == 2:
tex = r"\left(%s, %s\right)" % tuple(map(self._print, expr.args))
else:
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"\zeta^{%s}%s" % (exp, tex)
return r"\zeta%s" % tex
def _print_stieltjes(self, expr, exp=None):
if len(expr.args) == 2:
tex = r"_{%s}\left(%s\right)" % tuple(map(self._print, expr.args))
else:
tex = r"_{%s}" % self._print(expr.args[0])
if exp is not None:
return r"\gamma%s^{%s}" % (tex, exp)
return r"\gamma%s" % tex
def _print_lerchphi(self, expr, exp=None):
tex = r"\left(%s, %s, %s\right)" % tuple(map(self._print, expr.args))
if exp is None:
return r"\Phi%s" % tex
return r"\Phi^{%s}%s" % (exp, tex)
def _print_polylog(self, expr, exp=None):
s, z = map(self._print, expr.args)
tex = r"\left(%s\right)" % z
if exp is None:
return r"\operatorname{Li}_{%s}%s" % (s, tex)
return r"\operatorname{Li}_{%s}^{%s}%s" % (s, exp, tex)
def _print_jacobi(self, expr, exp=None):
n, a, b, x = map(self._print, expr.args)
tex = r"P_{%s}^{\left(%s,%s\right)}\left(%s\right)" % (n, a, b, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (exp)
return tex
def _print_gegenbauer(self, expr, exp=None):
n, a, x = map(self._print, expr.args)
tex = r"C_{%s}^{\left(%s\right)}\left(%s\right)" % (n, a, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (exp)
return tex
def _print_chebyshevt(self, expr, exp=None):
n, x = map(self._print, expr.args)
tex = r"T_{%s}\left(%s\right)" % (n, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (exp)
return tex
def _print_chebyshevu(self, expr, exp=None):
n, x = map(self._print, expr.args)
tex = r"U_{%s}\left(%s\right)" % (n, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (exp)
return tex
def _print_legendre(self, expr, exp=None):
n, x = map(self._print, expr.args)
tex = r"P_{%s}\left(%s\right)" % (n, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (exp)
return tex
def _print_assoc_legendre(self, expr, exp=None):
n, a, x = map(self._print, expr.args)
tex = r"P_{%s}^{\left(%s\right)}\left(%s\right)" % (n, a, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (exp)
return tex
def _print_hermite(self, expr, exp=None):
n, x = map(self._print, expr.args)
tex = r"H_{%s}\left(%s\right)" % (n, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (exp)
return tex
def _print_laguerre(self, expr, exp=None):
n, x = map(self._print, expr.args)
tex = r"L_{%s}\left(%s\right)" % (n, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (exp)
return tex
def _print_assoc_laguerre(self, expr, exp=None):
n, a, x = map(self._print, expr.args)
tex = r"L_{%s}^{\left(%s\right)}\left(%s\right)" % (n, a, x)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (exp)
return tex
def _print_Ynm(self, expr, exp=None):
n, m, theta, phi = map(self._print, expr.args)
tex = r"Y_{%s}^{%s}\left(%s,%s\right)" % (n, m, theta, phi)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (exp)
return tex
def _print_Znm(self, expr, exp=None):
n, m, theta, phi = map(self._print, expr.args)
tex = r"Z_{%s}^{%s}\left(%s,%s\right)" % (n, m, theta, phi)
if exp is not None:
tex = r"\left(" + tex + r"\right)^{%s}" % (exp)
return tex
def __print_mathieu_functions(self, character, args, prime=False, exp=None):
a, q, z = map(self._print, args)
sup = r"^{\prime}" if prime else ""
exp = "" if not exp else "^{%s}" % exp
return r"%s%s\left(%s, %s, %s\right)%s" % (character, sup, a, q, z, exp)
def _print_mathieuc(self, expr, exp=None):
return self.__print_mathieu_functions("C", expr.args, exp=exp)
def _print_mathieus(self, expr, exp=None):
return self.__print_mathieu_functions("S", expr.args, exp=exp)
def _print_mathieucprime(self, expr, exp=None):
return self.__print_mathieu_functions("C", expr.args, prime=True, exp=exp)
def _print_mathieusprime(self, expr, exp=None):
return self.__print_mathieu_functions("S", expr.args, prime=True, exp=exp)
def _print_Rational(self, expr):
if expr.q != 1:
sign = ""
p = expr.p
if expr.p < 0:
sign = "- "
p = -p
if self._settings['fold_short_frac']:
return r"%s%d / %d" % (sign, p, expr.q)
return r"%s\frac{%d}{%d}" % (sign, p, expr.q)
else:
return self._print(expr.p)
def _print_Order(self, expr):
s = self._print(expr.expr)
if expr.point and any(p != S.Zero for p in expr.point) or \
len(expr.variables) > 1:
s += '; '
if len(expr.variables) > 1:
s += self._print(expr.variables)
elif expr.variables:
s += self._print(expr.variables[0])
s += r'\rightarrow '
if len(expr.point) > 1:
s += self._print(expr.point)
else:
s += self._print(expr.point[0])
return r"O\left(%s\right)" % s
def _print_Symbol(self, expr, style='plain'):
if expr in self._settings['symbol_names']:
return self._settings['symbol_names'][expr]
return self._deal_with_super_sub(expr.name, style=style)
_print_RandomSymbol = _print_Symbol
def _deal_with_super_sub(self, string, style='plain'):
if '{' in string:
name, supers, subs = string, [], []
else:
name, supers, subs = split_super_sub(string)
name = translate(name)
supers = [translate(sup) for sup in supers]
subs = [translate(sub) for sub in subs]
# apply the style only to the name
if style == 'bold':
name = "\\mathbf{{{}}}".format(name)
# glue all items together:
if supers:
name += "^{%s}" % " ".join(supers)
if subs:
name += "_{%s}" % " ".join(subs)
return name
def _print_Relational(self, expr):
if self._settings['itex']:
gt = r"\gt"
lt = r"\lt"
else:
gt = ">"
lt = "<"
charmap = {
"==": "=",
">": gt,
"<": lt,
">=": r"\geq",
"<=": r"\leq",
"!=": r"\neq",
}
return "%s %s %s" % (self._print(expr.lhs),
charmap[expr.rel_op], self._print(expr.rhs))
def _print_Piecewise(self, expr):
ecpairs = [r"%s & \text{for}\: %s" % (self._print(e), self._print(c))
for e, c in expr.args[:-1]]
if expr.args[-1].cond == true:
ecpairs.append(r"%s & \text{otherwise}" %
self._print(expr.args[-1].expr))
else:
ecpairs.append(r"%s & \text{for}\: %s" %
(self._print(expr.args[-1].expr),
self._print(expr.args[-1].cond)))
tex = r"\begin{cases} %s \end{cases}"
return tex % r" \\".join(ecpairs)
def _print_MatrixBase(self, expr):
lines = []
for line in range(expr.rows): # horrible, should be 'rows'
lines.append(" & ".join([self._print(i) for i in expr[line, :]]))
mat_str = self._settings['mat_str']
if mat_str is None:
if self._settings['mode'] == 'inline':
mat_str = 'smallmatrix'
else:
if (expr.cols <= 10) is True:
mat_str = 'matrix'
else:
mat_str = 'array'
out_str = r'\begin{%MATSTR%}%s\end{%MATSTR%}'
out_str = out_str.replace('%MATSTR%', mat_str)
if mat_str == 'array':
out_str = out_str.replace('%s', '{' + 'c'*expr.cols + '}%s')
if self._settings['mat_delim']:
left_delim = self._settings['mat_delim']
right_delim = self._delim_dict[left_delim]
out_str = r'\left' + left_delim + out_str + \
r'\right' + right_delim
return out_str % r"\\".join(lines)
_print_ImmutableDenseMatrix = _print_MatrixBase
_print_ImmutableSparseMatrix = _print_MatrixBase
def _print_MatrixElement(self, expr):
return self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True)\
+ '_{%s, %s}' % (self._print(expr.i), self._print(expr.j))
def _print_MatrixSlice(self, expr):
def latexslice(x, dim):
x = list(x)
if x[2] == 1:
del x[2]
if x[0] == 0:
x[0] = None
if x[1] == dim:
x[1] = None
return ':'.join(self._print(xi) if xi is not None else '' for xi in x)
return (self.parenthesize(expr.parent, PRECEDENCE["Atom"], strict=True) + r'\left[' +
latexslice(expr.rowslice, expr.parent.rows) + ', ' +
latexslice(expr.colslice, expr.parent.cols) + r'\right]')
def _print_BlockMatrix(self, expr):
return self._print(expr.blocks)
def _print_Transpose(self, expr):
mat = expr.arg
from sympy.matrices import MatrixSymbol
if not isinstance(mat, MatrixSymbol):
return r"\left(%s\right)^{T}" % self._print(mat)
else:
return "%s^{T}" % self.parenthesize(mat, precedence_traditional(expr), True)
def _print_Trace(self, expr):
mat = expr.arg
return r"\operatorname{tr}\left(%s \right)" % self._print(mat)
def _print_Adjoint(self, expr):
mat = expr.arg
from sympy.matrices import MatrixSymbol
if not isinstance(mat, MatrixSymbol):
return r"\left(%s\right)^{\dagger}" % self._print(mat)
else:
return r"%s^{\dagger}" % self._print(mat)
def _print_MatMul(self, expr):
from sympy import MatMul, Mul
parens = lambda x: self.parenthesize(x, precedence_traditional(expr),
False)
args = expr.args
if isinstance(args[0], Mul):
args = args[0].as_ordered_factors() + list(args[1:])
else:
args = list(args)
if isinstance(expr, MatMul) and _coeff_isneg(expr):
if args[0] == -1:
args = args[1:]
else:
args[0] = -args[0]
return '- ' + ' '.join(map(parens, args))
else:
return ' '.join(map(parens, args))
def _print_Mod(self, expr, exp=None):
if exp is not None:
return r'\left(%s\bmod{%s}\right)^{%s}' % \
(self.parenthesize(expr.args[0], PRECEDENCE['Mul'],
strict=True), self._print(expr.args[1]),
exp)
return r'%s\bmod{%s}' % (self.parenthesize(expr.args[0],
PRECEDENCE['Mul'], strict=True),
self._print(expr.args[1]))
def _print_HadamardProduct(self, expr):
args = expr.args
prec = PRECEDENCE['Pow']
parens = self.parenthesize
return r' \circ '.join(
map(lambda arg: parens(arg, prec, strict=True), args))
def _print_HadamardPower(self, expr):
if precedence_traditional(expr.exp) < PRECEDENCE["Mul"]:
template = r"%s^{\circ \left({%s}\right)}"
else:
template = r"%s^{\circ {%s}}"
return self._helper_print_standard_power(expr, template)
def _print_KroneckerProduct(self, expr):
args = expr.args
prec = PRECEDENCE['Pow']
parens = self.parenthesize
return r' \otimes '.join(
map(lambda arg: parens(arg, prec, strict=True), args))
def _print_MatPow(self, expr):
base, exp = expr.base, expr.exp
from sympy.matrices import MatrixSymbol
if not isinstance(base, MatrixSymbol):
return "\\left(%s\\right)^{%s}" % (self._print(base),
self._print(exp))
else:
return "%s^{%s}" % (self._print(base), self._print(exp))
def _print_MatrixSymbol(self, expr):
return self._print_Symbol(expr, style=self._settings[
'mat_symbol_style'])
def _print_ZeroMatrix(self, Z):
return r"\mathbb{0}" if self._settings[
'mat_symbol_style'] == 'plain' else r"\mathbf{0}"
def _print_OneMatrix(self, O):
return r"\mathbb{1}" if self._settings[
'mat_symbol_style'] == 'plain' else r"\mathbf{1}"
def _print_Identity(self, I):
return r"\mathbb{I}" if self._settings[
'mat_symbol_style'] == 'plain' else r"\mathbf{I}"
def _print_PermutationMatrix(self, P):
perm_str = self._print(P.args[0])
return "P_{%s}" % perm_str
def _print_NDimArray(self, expr):
if expr.rank() == 0:
return self._print(expr[()])
mat_str = self._settings['mat_str']
if mat_str is None:
if self._settings['mode'] == 'inline':
mat_str = 'smallmatrix'
else:
if (expr.rank() == 0) or (expr.shape[-1] <= 10):
mat_str = 'matrix'
else:
mat_str = 'array'
block_str = r'\begin{%MATSTR%}%s\end{%MATSTR%}'
block_str = block_str.replace('%MATSTR%', mat_str)
if self._settings['mat_delim']:
left_delim = self._settings['mat_delim']
right_delim = self._delim_dict[left_delim]
block_str = r'\left' + left_delim + block_str + \
r'\right' + right_delim
if expr.rank() == 0:
return block_str % ""
level_str = [[]] + [[] for i in range(expr.rank())]
shape_ranges = [list(range(i)) for i in expr.shape]
for outer_i in itertools.product(*shape_ranges):
level_str[-1].append(self._print(expr[outer_i]))
even = True
for back_outer_i in range(expr.rank()-1, -1, -1):
if len(level_str[back_outer_i+1]) < expr.shape[back_outer_i]:
break
if even:
level_str[back_outer_i].append(
r" & ".join(level_str[back_outer_i+1]))
else:
level_str[back_outer_i].append(
block_str % (r"\\".join(level_str[back_outer_i+1])))
if len(level_str[back_outer_i+1]) == 1:
level_str[back_outer_i][-1] = r"\left[" + \
level_str[back_outer_i][-1] + r"\right]"
even = not even
level_str[back_outer_i+1] = []
out_str = level_str[0][0]
if expr.rank() % 2 == 1:
out_str = block_str % out_str
return out_str
_print_ImmutableDenseNDimArray = _print_NDimArray
_print_ImmutableSparseNDimArray = _print_NDimArray
_print_MutableDenseNDimArray = _print_NDimArray
_print_MutableSparseNDimArray = _print_NDimArray
def _printer_tensor_indices(self, name, indices, index_map={}):
out_str = self._print(name)
last_valence = None
prev_map = None
for index in indices:
new_valence = index.is_up
if ((index in index_map) or prev_map) and \
last_valence == new_valence:
out_str += ","
if last_valence != new_valence:
if last_valence is not None:
out_str += "}"
if index.is_up:
out_str += "{}^{"
else:
out_str += "{}_{"
out_str += self._print(index.args[0])
if index in index_map:
out_str += "="
out_str += self._print(index_map[index])
prev_map = True
else:
prev_map = False
last_valence = new_valence
if last_valence is not None:
out_str += "}"
return out_str
def _print_Tensor(self, expr):
name = expr.args[0].args[0]
indices = expr.get_indices()
return self._printer_tensor_indices(name, indices)
def _print_TensorElement(self, expr):
name = expr.expr.args[0].args[0]
indices = expr.expr.get_indices()
index_map = expr.index_map
return self._printer_tensor_indices(name, indices, index_map)
def _print_TensMul(self, expr):
# prints expressions like "A(a)", "3*A(a)", "(1+x)*A(a)"
sign, args = expr._get_args_for_traditional_printer()
return sign + "".join(
[self.parenthesize(arg, precedence(expr)) for arg in args]
)
def _print_TensAdd(self, expr):
a = []
args = expr.args
for x in args:
a.append(self.parenthesize(x, precedence(expr)))
a.sort()
s = ' + '.join(a)
s = s.replace('+ -', '- ')
return s
def _print_TensorIndex(self, expr):
return "{}%s{%s}" % (
"^" if expr.is_up else "_",
self._print(expr.args[0])
)
def _print_PartialDerivative(self, expr):
if len(expr.variables) == 1:
return r"\frac{\partial}{\partial {%s}}{%s}" % (
self._print(expr.variables[0]),
self.parenthesize(expr.expr, PRECEDENCE["Mul"], False)
)
else:
return r"\frac{\partial^{%s}}{%s}{%s}" % (
len(expr.variables),
" ".join([r"\partial {%s}" % self._print(i) for i in expr.variables]),
self.parenthesize(expr.expr, PRECEDENCE["Mul"], False)
)
def _print_UniversalSet(self, expr):
return r"\mathbb{U}"
def _print_frac(self, expr, exp=None):
if exp is None:
return r"\operatorname{frac}{\left(%s\right)}" % self._print(expr.args[0])
else:
return r"\operatorname{frac}{\left(%s\right)}^{%s}" % (
self._print(expr.args[0]), exp)
def _print_tuple(self, expr):
if self._settings['decimal_separator'] == 'comma':
sep = ";"
elif self._settings['decimal_separator'] == 'period':
sep = ","
else:
raise ValueError('Unknown Decimal Separator')
if len(expr) == 1:
# 1-tuple needs a trailing separator
return self._add_parens_lspace(self._print(expr[0]) + sep)
else:
return self._add_parens_lspace(
(sep + r" \ ").join([self._print(i) for i in expr]))
def _print_TensorProduct(self, expr):
elements = [self._print(a) for a in expr.args]
return r' \otimes '.join(elements)
def _print_WedgeProduct(self, expr):
elements = [self._print(a) for a in expr.args]
return r' \wedge '.join(elements)
def _print_Tuple(self, expr):
return self._print_tuple(expr)
def _print_list(self, expr):
if self._settings['decimal_separator'] == 'comma':
return r"\left[ %s\right]" % \
r"; \ ".join([self._print(i) for i in expr])
elif self._settings['decimal_separator'] == 'period':
return r"\left[ %s\right]" % \
r", \ ".join([self._print(i) for i in expr])
else:
raise ValueError('Unknown Decimal Separator')
def _print_dict(self, d):
keys = sorted(d.keys(), key=default_sort_key)
items = []
for key in keys:
val = d[key]
items.append("%s : %s" % (self._print(key), self._print(val)))
return r"\left\{ %s\right\}" % r", \ ".join(items)
def _print_Dict(self, expr):
return self._print_dict(expr)
def _print_DiracDelta(self, expr, exp=None):
if len(expr.args) == 1 or expr.args[1] == 0:
tex = r"\delta\left(%s\right)" % self._print(expr.args[0])
else:
tex = r"\delta^{\left( %s \right)}\left( %s \right)" % (
self._print(expr.args[1]), self._print(expr.args[0]))
if exp:
tex = r"\left(%s\right)^{%s}" % (tex, exp)
return tex
def _print_SingularityFunction(self, expr):
shift = self._print(expr.args[0] - expr.args[1])
power = self._print(expr.args[2])
tex = r"{\left\langle %s \right\rangle}^{%s}" % (shift, power)
return tex
def _print_Heaviside(self, expr, exp=None):
tex = r"\theta\left(%s\right)" % self._print(expr.args[0])
if exp:
tex = r"\left(%s\right)^{%s}" % (tex, exp)
return tex
def _print_KroneckerDelta(self, expr, exp=None):
i = self._print(expr.args[0])
j = self._print(expr.args[1])
if expr.args[0].is_Atom and expr.args[1].is_Atom:
tex = r'\delta_{%s %s}' % (i, j)
else:
tex = r'\delta_{%s, %s}' % (i, j)
if exp is not None:
tex = r'\left(%s\right)^{%s}' % (tex, exp)
return tex
def _print_LeviCivita(self, expr, exp=None):
indices = map(self._print, expr.args)
if all(x.is_Atom for x in expr.args):
tex = r'\varepsilon_{%s}' % " ".join(indices)
else:
tex = r'\varepsilon_{%s}' % ", ".join(indices)
if exp:
tex = r'\left(%s\right)^{%s}' % (tex, exp)
return tex
def _print_RandomDomain(self, d):
if hasattr(d, 'as_boolean'):
return '\\text{Domain: }' + self._print(d.as_boolean())
elif hasattr(d, 'set'):
return ('\\text{Domain: }' + self._print(d.symbols) + '\\text{ in }' +
self._print(d.set))
elif hasattr(d, 'symbols'):
return '\\text{Domain on }' + self._print(d.symbols)
else:
return self._print(None)
def _print_FiniteSet(self, s):
items = sorted(s.args, key=default_sort_key)
return self._print_set(items)
def _print_set(self, s):
items = sorted(s, key=default_sort_key)
if self._settings['decimal_separator'] == 'comma':
items = "; ".join(map(self._print, items))
elif self._settings['decimal_separator'] == 'period':
items = ", ".join(map(self._print, items))
else:
raise ValueError('Unknown Decimal Separator')
return r"\left\{%s\right\}" % items
_print_frozenset = _print_set
def _print_Range(self, s):
dots = object()
if s.has(Symbol):
return self._print_Basic(s)
if s.start.is_infinite and s.stop.is_infinite:
if s.step.is_positive:
printset = dots, -1, 0, 1, dots
else:
printset = dots, 1, 0, -1, dots
elif s.start.is_infinite:
printset = dots, s[-1] - s.step, s[-1]
elif s.stop.is_infinite:
it = iter(s)
printset = next(it), next(it), dots
elif len(s) > 4:
it = iter(s)
printset = next(it), next(it), dots, s[-1]
else:
printset = tuple(s)
return (r"\left\{" +
r", ".join(self._print(el) if el is not dots else r'\ldots' for el in printset) +
r"\right\}")
def __print_number_polynomial(self, expr, letter, exp=None):
if len(expr.args) == 2:
if exp is not None:
return r"%s_{%s}^{%s}\left(%s\right)" % (letter,
self._print(expr.args[0]), exp,
self._print(expr.args[1]))
return r"%s_{%s}\left(%s\right)" % (letter,
self._print(expr.args[0]), self._print(expr.args[1]))
tex = r"%s_{%s}" % (letter, self._print(expr.args[0]))
if exp is not None:
tex = r"%s^{%s}" % (tex, exp)
return tex
def _print_bernoulli(self, expr, exp=None):
return self.__print_number_polynomial(expr, "B", exp)
def _print_bell(self, expr, exp=None):
if len(expr.args) == 3:
tex1 = r"B_{%s, %s}" % (self._print(expr.args[0]),
self._print(expr.args[1]))
tex2 = r"\left(%s\right)" % r", ".join(self._print(el) for
el in expr.args[2])
if exp is not None:
tex = r"%s^{%s}%s" % (tex1, exp, tex2)
else:
tex = tex1 + tex2
return tex
return self.__print_number_polynomial(expr, "B", exp)
def _print_fibonacci(self, expr, exp=None):
return self.__print_number_polynomial(expr, "F", exp)
def _print_lucas(self, expr, exp=None):
tex = r"L_{%s}" % self._print(expr.args[0])
if exp is not None:
tex = r"%s^{%s}" % (tex, exp)
return tex
def _print_tribonacci(self, expr, exp=None):
return self.__print_number_polynomial(expr, "T", exp)
def _print_SeqFormula(self, s):
dots = object()
if len(s.start.free_symbols) > 0 or len(s.stop.free_symbols) > 0:
return r"\left\{%s\right\}_{%s=%s}^{%s}" % (
self._print(s.formula),
self._print(s.variables[0]),
self._print(s.start),
self._print(s.stop)
)
if s.start is S.NegativeInfinity:
stop = s.stop
printset = (dots, s.coeff(stop - 3), s.coeff(stop - 2),
s.coeff(stop - 1), s.coeff(stop))
elif s.stop is S.Infinity or s.length > 4:
printset = s[:4]
printset.append(dots)
else:
printset = tuple(s)
return (r"\left[" +
r", ".join(self._print(el) if el is not dots else r'\ldots' for el in printset) +
r"\right]")
_print_SeqPer = _print_SeqFormula
_print_SeqAdd = _print_SeqFormula
_print_SeqMul = _print_SeqFormula
def _print_Interval(self, i):
if i.start == i.end:
return r"\left\{%s\right\}" % self._print(i.start)
else:
if i.left_open:
left = '('
else:
left = '['
if i.right_open:
right = ')'
else:
right = ']'
return r"\left%s%s, %s\right%s" % \
(left, self._print(i.start), self._print(i.end), right)
def _print_AccumulationBounds(self, i):
return r"\left\langle %s, %s\right\rangle" % \
(self._print(i.min), self._print(i.max))
def _print_Union(self, u):
prec = precedence_traditional(u)
args_str = [self.parenthesize(i, prec) for i in u.args]
return r" \cup ".join(args_str)
def _print_Complement(self, u):
prec = precedence_traditional(u)
args_str = [self.parenthesize(i, prec) for i in u.args]
return r" \setminus ".join(args_str)
def _print_Intersection(self, u):
prec = precedence_traditional(u)
args_str = [self.parenthesize(i, prec) for i in u.args]
return r" \cap ".join(args_str)
def _print_SymmetricDifference(self, u):
prec = precedence_traditional(u)
args_str = [self.parenthesize(i, prec) for i in u.args]
return r" \triangle ".join(args_str)
def _print_ProductSet(self, p):
prec = precedence_traditional(p)
if len(p.sets) >= 1 and not has_variety(p.sets):
return self.parenthesize(p.sets[0], prec) + "^{%d}" % len(p.sets)
return r" \times ".join(
self.parenthesize(set, prec) for set in p.sets)
def _print_EmptySet(self, e):
return r"\emptyset"
def _print_Naturals(self, n):
return r"\mathbb{N}"
def _print_Naturals0(self, n):
return r"\mathbb{N}_0"
def _print_Integers(self, i):
return r"\mathbb{Z}"
def _print_Rationals(self, i):
return r"\mathbb{Q}"
def _print_Reals(self, i):
return r"\mathbb{R}"
def _print_Complexes(self, i):
return r"\mathbb{C}"
def _print_ImageSet(self, s):
expr = s.lamda.expr
sig = s.lamda.signature
xys = ((self._print(x), self._print(y)) for x, y in zip(sig, s.base_sets))
xinys = r" , ".join(r"%s \in %s" % xy for xy in xys)
return r"\left\{%s\; |\; %s\right\}" % (self._print(expr), xinys)
def _print_ConditionSet(self, s):
vars_print = ', '.join([self._print(var) for var in Tuple(s.sym)])
if s.base_set is S.UniversalSet:
return r"\left\{%s \mid %s \right\}" % \
(vars_print, self._print(s.condition))
return r"\left\{%s \mid %s \in %s \wedge %s \right\}" % (
vars_print,
vars_print,
self._print(s.base_set),
self._print(s.condition))
def _print_ComplexRegion(self, s):
vars_print = ', '.join([self._print(var) for var in s.variables])
return r"\left\{%s\; |\; %s \in %s \right\}" % (
self._print(s.expr),
vars_print,
self._print(s.sets))
def _print_Contains(self, e):
return r"%s \in %s" % tuple(self._print(a) for a in e.args)
def _print_FourierSeries(self, s):
return self._print_Add(s.truncate()) + r' + \ldots'
def _print_FormalPowerSeries(self, s):
return self._print_Add(s.infinite)
def _print_FiniteField(self, expr):
return r"\mathbb{F}_{%s}" % expr.mod
def _print_IntegerRing(self, expr):
return r"\mathbb{Z}"
def _print_RationalField(self, expr):
return r"\mathbb{Q}"
def _print_RealField(self, expr):
return r"\mathbb{R}"
def _print_ComplexField(self, expr):
return r"\mathbb{C}"
def _print_PolynomialRing(self, expr):
domain = self._print(expr.domain)
symbols = ", ".join(map(self._print, expr.symbols))
return r"%s\left[%s\right]" % (domain, symbols)
def _print_FractionField(self, expr):
domain = self._print(expr.domain)
symbols = ", ".join(map(self._print, expr.symbols))
return r"%s\left(%s\right)" % (domain, symbols)
def _print_PolynomialRingBase(self, expr):
domain = self._print(expr.domain)
symbols = ", ".join(map(self._print, expr.symbols))
inv = ""
if not expr.is_Poly:
inv = r"S_<^{-1}"
return r"%s%s\left[%s\right]" % (inv, domain, symbols)
def _print_Poly(self, poly):
cls = poly.__class__.__name__
terms = []
for monom, coeff in poly.terms():
s_monom = ''
for i, exp in enumerate(monom):
if exp > 0:
if exp == 1:
s_monom += self._print(poly.gens[i])
else:
s_monom += self._print(pow(poly.gens[i], exp))
if coeff.is_Add:
if s_monom:
s_coeff = r"\left(%s\right)" % self._print(coeff)
else:
s_coeff = self._print(coeff)
else:
if s_monom:
if coeff is S.One:
terms.extend(['+', s_monom])
continue
if coeff is S.NegativeOne:
terms.extend(['-', s_monom])
continue
s_coeff = self._print(coeff)
if not s_monom:
s_term = s_coeff
else:
s_term = s_coeff + " " + s_monom
if s_term.startswith('-'):
terms.extend(['-', s_term[1:]])
else:
terms.extend(['+', s_term])
if terms[0] in ['-', '+']:
modifier = terms.pop(0)
if modifier == '-':
terms[0] = '-' + terms[0]
expr = ' '.join(terms)
gens = list(map(self._print, poly.gens))
domain = "domain=%s" % self._print(poly.get_domain())
args = ", ".join([expr] + gens + [domain])
if cls in accepted_latex_functions:
tex = r"\%s {\left(%s \right)}" % (cls, args)
else:
tex = r"\operatorname{%s}{\left( %s \right)}" % (cls, args)
return tex
def _print_ComplexRootOf(self, root):
cls = root.__class__.__name__
if cls == "ComplexRootOf":
cls = "CRootOf"
expr = self._print(root.expr)
index = root.index
if cls in accepted_latex_functions:
return r"\%s {\left(%s, %d\right)}" % (cls, expr, index)
else:
return r"\operatorname{%s} {\left(%s, %d\right)}" % (cls, expr,
index)
def _print_RootSum(self, expr):
cls = expr.__class__.__name__
args = [self._print(expr.expr)]
if expr.fun is not S.IdentityFunction:
args.append(self._print(expr.fun))
if cls in accepted_latex_functions:
return r"\%s {\left(%s\right)}" % (cls, ", ".join(args))
else:
return r"\operatorname{%s} {\left(%s\right)}" % (cls,
", ".join(args))
def _print_PolyElement(self, poly):
mul_symbol = self._settings['mul_symbol_latex']
return poly.str(self, PRECEDENCE, "{%s}^{%d}", mul_symbol)
def _print_FracElement(self, frac):
if frac.denom == 1:
return self._print(frac.numer)
else:
numer = self._print(frac.numer)
denom = self._print(frac.denom)
return r"\frac{%s}{%s}" % (numer, denom)
def _print_euler(self, expr, exp=None):
m, x = (expr.args[0], None) if len(expr.args) == 1 else expr.args
tex = r"E_{%s}" % self._print(m)
if exp is not None:
tex = r"%s^{%s}" % (tex, exp)
if x is not None:
tex = r"%s\left(%s\right)" % (tex, self._print(x))
return tex
def _print_catalan(self, expr, exp=None):
tex = r"C_{%s}" % self._print(expr.args[0])
if exp is not None:
tex = r"%s^{%s}" % (tex, exp)
return tex
def _print_UnifiedTransform(self, expr, s, inverse=False):
return r"\mathcal{{{}}}{}_{{{}}}\left[{}\right]\left({}\right)".format(s, '^{-1}' if inverse else '', self._print(expr.args[1]), self._print(expr.args[0]), self._print(expr.args[2]))
def _print_MellinTransform(self, expr):
return self._print_UnifiedTransform(expr, 'M')
def _print_InverseMellinTransform(self, expr):
return self._print_UnifiedTransform(expr, 'M', True)
def _print_LaplaceTransform(self, expr):
return self._print_UnifiedTransform(expr, 'L')
def _print_InverseLaplaceTransform(self, expr):
return self._print_UnifiedTransform(expr, 'L', True)
def _print_FourierTransform(self, expr):
return self._print_UnifiedTransform(expr, 'F')
def _print_InverseFourierTransform(self, expr):
return self._print_UnifiedTransform(expr, 'F', True)
def _print_SineTransform(self, expr):
return self._print_UnifiedTransform(expr, 'SIN')
def _print_InverseSineTransform(self, expr):
return self._print_UnifiedTransform(expr, 'SIN', True)
def _print_CosineTransform(self, expr):
return self._print_UnifiedTransform(expr, 'COS')
def _print_InverseCosineTransform(self, expr):
return self._print_UnifiedTransform(expr, 'COS', True)
def _print_DMP(self, p):
try:
if p.ring is not None:
# TODO incorporate order
return self._print(p.ring.to_sympy(p))
except SympifyError:
pass
return self._print(repr(p))
def _print_DMF(self, p):
return self._print_DMP(p)
def _print_Object(self, object):
return self._print(Symbol(object.name))
def _print_LambertW(self, expr):
if len(expr.args) == 1:
return r"W\left(%s\right)" % self._print(expr.args[0])
return r"W_{%s}\left(%s\right)" % \
(self._print(expr.args[1]), self._print(expr.args[0]))
def _print_Morphism(self, morphism):
domain = self._print(morphism.domain)
codomain = self._print(morphism.codomain)
return "%s\\rightarrow %s" % (domain, codomain)
def _print_NamedMorphism(self, morphism):
pretty_name = self._print(Symbol(morphism.name))
pretty_morphism = self._print_Morphism(morphism)
return "%s:%s" % (pretty_name, pretty_morphism)
def _print_IdentityMorphism(self, morphism):
from sympy.categories import NamedMorphism
return self._print_NamedMorphism(NamedMorphism(
morphism.domain, morphism.codomain, "id"))
def _print_CompositeMorphism(self, morphism):
# All components of the morphism have names and it is thus
# possible to build the name of the composite.
component_names_list = [self._print(Symbol(component.name)) for
component in morphism.components]
component_names_list.reverse()
component_names = "\\circ ".join(component_names_list) + ":"
pretty_morphism = self._print_Morphism(morphism)
return component_names + pretty_morphism
def _print_Category(self, morphism):
return r"\mathbf{{{}}}".format(self._print(Symbol(morphism.name)))
def _print_Diagram(self, diagram):
if not diagram.premises:
# This is an empty diagram.
return self._print(S.EmptySet)
latex_result = self._print(diagram.premises)
if diagram.conclusions:
latex_result += "\\Longrightarrow %s" % \
self._print(diagram.conclusions)
return latex_result
def _print_DiagramGrid(self, grid):
latex_result = "\\begin{array}{%s}\n" % ("c" * grid.width)
for i in range(grid.height):
for j in range(grid.width):
if grid[i, j]:
latex_result += latex(grid[i, j])
latex_result += " "
if j != grid.width - 1:
latex_result += "& "
if i != grid.height - 1:
latex_result += "\\\\"
latex_result += "\n"
latex_result += "\\end{array}\n"
return latex_result
def _print_FreeModule(self, M):
return '{{{}}}^{{{}}}'.format(self._print(M.ring), self._print(M.rank))
def _print_FreeModuleElement(self, m):
# Print as row vector for convenience, for now.
return r"\left[ {} \right]".format(",".join(
'{' + self._print(x) + '}' for x in m))
def _print_SubModule(self, m):
return r"\left\langle {} \right\rangle".format(",".join(
'{' + self._print(x) + '}' for x in m.gens))
def _print_ModuleImplementedIdeal(self, m):
return r"\left\langle {} \right\rangle".format(",".join(
'{' + self._print(x) + '}' for [x] in m._module.gens))
def _print_Quaternion(self, expr):
# TODO: This expression is potentially confusing,
# shall we print it as `Quaternion( ... )`?
s = [self.parenthesize(i, PRECEDENCE["Mul"], strict=True)
for i in expr.args]
a = [s[0]] + [i+" "+j for i, j in zip(s[1:], "ijk")]
return " + ".join(a)
def _print_QuotientRing(self, R):
# TODO nicer fractions for few generators...
return r"\frac{{{}}}{{{}}}".format(self._print(R.ring),
self._print(R.base_ideal))
def _print_QuotientRingElement(self, x):
return r"{{{}}} + {{{}}}".format(self._print(x.data),
self._print(x.ring.base_ideal))
def _print_QuotientModuleElement(self, m):
return r"{{{}}} + {{{}}}".format(self._print(m.data),
self._print(m.module.killed_module))
def _print_QuotientModule(self, M):
# TODO nicer fractions for few generators...
return r"\frac{{{}}}{{{}}}".format(self._print(M.base),
self._print(M.killed_module))
def _print_MatrixHomomorphism(self, h):
return r"{{{}}} : {{{}}} \to {{{}}}".format(self._print(h._sympy_matrix()),
self._print(h.domain), self._print(h.codomain))
def _print_Manifold(self, manifold):
return r'\text{%s}' % manifold.name
def _print_Patch(self, patch):
return r'\text{%s}_{\text{%s}}' % (patch.name, patch.manifold.name)
def _print_CoordSystem(self, coords):
return r'\text{%s}^{\text{%s}}_{\text{%s}}' % (
coords.name, coords.patch.name, coords.patch.manifold.name
)
def _print_CovarDerivativeOp(self, cvd):
return r'\mathbb{\nabla}_{%s}' % self._print(cvd._wrt)
def _print_BaseScalarField(self, field):
string = field._coord_sys._names[field._index]
return r'\mathbf{{{}}}'.format(self._print(Symbol(string)))
def _print_BaseVectorField(self, field):
string = field._coord_sys._names[field._index]
return r'\partial_{{{}}}'.format(self._print(Symbol(string)))
def _print_Differential(self, diff):
field = diff._form_field
if hasattr(field, '_coord_sys'):
string = field._coord_sys._names[field._index]
return r'\operatorname{{d}}{}'.format(self._print(Symbol(string)))
else:
string = self._print(field)
return r'\operatorname{{d}}\left({}\right)'.format(string)
def _print_Tr(self, p):
# TODO: Handle indices
contents = self._print(p.args[0])
return r'\operatorname{{tr}}\left({}\right)'.format(contents)
def _print_totient(self, expr, exp=None):
if exp is not None:
return r'\left(\phi\left(%s\right)\right)^{%s}' % \
(self._print(expr.args[0]), exp)
return r'\phi\left(%s\right)' % self._print(expr.args[0])
def _print_reduced_totient(self, expr, exp=None):
if exp is not None:
return r'\left(\lambda\left(%s\right)\right)^{%s}' % \
(self._print(expr.args[0]), exp)
return r'\lambda\left(%s\right)' % self._print(expr.args[0])
def _print_divisor_sigma(self, expr, exp=None):
if len(expr.args) == 2:
tex = r"_%s\left(%s\right)" % tuple(map(self._print,
(expr.args[1], expr.args[0])))
else:
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"\sigma^{%s}%s" % (exp, tex)
return r"\sigma%s" % tex
def _print_udivisor_sigma(self, expr, exp=None):
if len(expr.args) == 2:
tex = r"_%s\left(%s\right)" % tuple(map(self._print,
(expr.args[1], expr.args[0])))
else:
tex = r"\left(%s\right)" % self._print(expr.args[0])
if exp is not None:
return r"\sigma^*^{%s}%s" % (exp, tex)
return r"\sigma^*%s" % tex
def _print_primenu(self, expr, exp=None):
if exp is not None:
return r'\left(\nu\left(%s\right)\right)^{%s}' % \
(self._print(expr.args[0]), exp)
return r'\nu\left(%s\right)' % self._print(expr.args[0])
def _print_primeomega(self, expr, exp=None):
if exp is not None:
return r'\left(\Omega\left(%s\right)\right)^{%s}' % \
(self._print(expr.args[0]), exp)
return r'\Omega\left(%s\right)' % self._print(expr.args[0])
def emptyPrinter(self, expr):
# Checks what type of decimal separator to print.
expr = super().emptyPrinter(expr)
if self._settings['decimal_separator'] == 'comma':
expr = expr.replace('.', '{,}')
return expr
def translate(s):
r'''
Check for a modifier ending the string. If present, convert the
modifier to latex and translate the rest recursively.
Given a description of a Greek letter or other special character,
return the appropriate latex.
Let everything else pass as given.
>>> from sympy.printing.latex import translate
>>> translate('alphahatdotprime')
"{\\dot{\\hat{\\alpha}}}'"
'''
# Process the rest
tex = tex_greek_dictionary.get(s)
if tex:
return tex
elif s.lower() in greek_letters_set:
return "\\" + s.lower()
elif s in other_symbols:
return "\\" + s
else:
# Process modifiers, if any, and recurse
for key in sorted(modifier_dict.keys(), key=lambda k:len(k), reverse=True):
if s.lower().endswith(key) and len(s) > len(key):
return modifier_dict[key](translate(s[:-len(key)]))
return s
def latex(expr, full_prec=False, min=None, max=None, fold_frac_powers=False,
fold_func_brackets=False, fold_short_frac=None, inv_trig_style="abbreviated",
itex=False, ln_notation=False, long_frac_ratio=None,
mat_delim="[", mat_str=None, mode="plain", mul_symbol=None,
order=None, symbol_names=None, root_notation=True,
mat_symbol_style="plain", imaginary_unit="i", gothic_re_im=False,
decimal_separator="period", perm_cyclic=True, parenthesize_super=True):
r"""Convert the given expression to LaTeX string representation.
Parameters
==========
full_prec: boolean, optional
If set to True, a floating point number is printed with full precision.
fold_frac_powers : boolean, optional
Emit ``^{p/q}`` instead of ``^{\frac{p}{q}}`` for fractional powers.
fold_func_brackets : boolean, optional
Fold function brackets where applicable.
fold_short_frac : boolean, optional
Emit ``p / q`` instead of ``\frac{p}{q}`` when the denominator is
simple enough (at most two terms and no powers). The default value is
``True`` for inline mode, ``False`` otherwise.
inv_trig_style : string, optional
How inverse trig functions should be displayed. Can be one of
``abbreviated``, ``full``, or ``power``. Defaults to ``abbreviated``.
itex : boolean, optional
Specifies if itex-specific syntax is used, including emitting
``$$...$$``.
ln_notation : boolean, optional
If set to ``True``, ``\ln`` is used instead of default ``\log``.
long_frac_ratio : float or None, optional
The allowed ratio of the width of the numerator to the width of the
denominator before the printer breaks off long fractions. If ``None``
(the default value), long fractions are not broken up.
mat_delim : string, optional
The delimiter to wrap around matrices. Can be one of ``[``, ``(``, or
the empty string. Defaults to ``[``.
mat_str : string, optional
Which matrix environment string to emit. ``smallmatrix``, ``matrix``,
``array``, etc. Defaults to ``smallmatrix`` for inline mode, ``matrix``
for matrices of no more than 10 columns, and ``array`` otherwise.
mode: string, optional
Specifies how the generated code will be delimited. ``mode`` can be one
of ``plain``, ``inline``, ``equation`` or ``equation*``. If ``mode``
is set to ``plain``, then the resulting code will not be delimited at
all (this is the default). If ``mode`` is set to ``inline`` then inline
LaTeX ``$...$`` will be used. If ``mode`` is set to ``equation`` or
``equation*``, the resulting code will be enclosed in the ``equation``
or ``equation*`` environment (remember to import ``amsmath`` for
``equation*``), unless the ``itex`` option is set. In the latter case,
the ``$$...$$`` syntax is used.
mul_symbol : string or None, optional
The symbol to use for multiplication. Can be one of ``None``, ``ldot``,
``dot``, or ``times``.
order: string, optional
Any of the supported monomial orderings (currently ``lex``, ``grlex``,
or ``grevlex``), ``old``, and ``none``. This parameter does nothing for
Mul objects. Setting order to ``old`` uses the compatibility ordering
for Add defined in Printer. For very large expressions, set the
``order`` keyword to ``none`` if speed is a concern.
symbol_names : dictionary of strings mapped to symbols, optional
Dictionary of symbols and the custom strings they should be emitted as.
root_notation : boolean, optional
If set to ``False``, exponents of the form 1/n are printed in fractonal
form. Default is ``True``, to print exponent in root form.
mat_symbol_style : string, optional
Can be either ``plain`` (default) or ``bold``. If set to ``bold``,
a MatrixSymbol A will be printed as ``\mathbf{A}``, otherwise as ``A``.
imaginary_unit : string, optional
String to use for the imaginary unit. Defined options are "i" (default)
and "j". Adding "r" or "t" in front gives ``\mathrm`` or ``\text``, so
"ri" leads to ``\mathrm{i}`` which gives `\mathrm{i}`.
gothic_re_im : boolean, optional
If set to ``True``, `\Re` and `\Im` is used for ``re`` and ``im``, respectively.
The default is ``False`` leading to `\operatorname{re}` and `\operatorname{im}`.
decimal_separator : string, optional
Specifies what separator to use to separate the whole and fractional parts of a
floating point number as in `2.5` for the default, ``period`` or `2{,}5`
when ``comma`` is specified. Lists, sets, and tuple are printed with semicolon
separating the elements when ``comma`` is chosen. For example, [1; 2; 3] when
``comma`` is chosen and [1,2,3] for when ``period`` is chosen.
parenthesize_super : boolean, optional
If set to ``False``, superscripted expressions will not be parenthesized when
powered. Default is ``True``, which parenthesizes the expression when powered.
min: Integer or None, optional
Sets the lower bound for the exponent to print floating point numbers in
fixed-point format.
max: Integer or None, optional
Sets the upper bound for the exponent to print floating point numbers in
fixed-point format.
Notes
=====
Not using a print statement for printing, results in double backslashes for
latex commands since that's the way Python escapes backslashes in strings.
>>> from sympy import latex, Rational
>>> from sympy.abc import tau
>>> latex((2*tau)**Rational(7,2))
'8 \\sqrt{2} \\tau^{\\frac{7}{2}}'
>>> print(latex((2*tau)**Rational(7,2)))
8 \sqrt{2} \tau^{\frac{7}{2}}
Examples
========
>>> from sympy import latex, pi, sin, asin, Integral, Matrix, Rational, log
>>> from sympy.abc import x, y, mu, r, tau
Basic usage:
>>> print(latex((2*tau)**Rational(7,2)))
8 \sqrt{2} \tau^{\frac{7}{2}}
``mode`` and ``itex`` options:
>>> print(latex((2*mu)**Rational(7,2), mode='plain'))
8 \sqrt{2} \mu^{\frac{7}{2}}
>>> print(latex((2*tau)**Rational(7,2), mode='inline'))
$8 \sqrt{2} \tau^{7 / 2}$
>>> print(latex((2*mu)**Rational(7,2), mode='equation*'))
\begin{equation*}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation*}
>>> print(latex((2*mu)**Rational(7,2), mode='equation'))
\begin{equation}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation}
>>> print(latex((2*mu)**Rational(7,2), mode='equation', itex=True))
$$8 \sqrt{2} \mu^{\frac{7}{2}}$$
>>> print(latex((2*mu)**Rational(7,2), mode='plain'))
8 \sqrt{2} \mu^{\frac{7}{2}}
>>> print(latex((2*tau)**Rational(7,2), mode='inline'))
$8 \sqrt{2} \tau^{7 / 2}$
>>> print(latex((2*mu)**Rational(7,2), mode='equation*'))
\begin{equation*}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation*}
>>> print(latex((2*mu)**Rational(7,2), mode='equation'))
\begin{equation}8 \sqrt{2} \mu^{\frac{7}{2}}\end{equation}
>>> print(latex((2*mu)**Rational(7,2), mode='equation', itex=True))
$$8 \sqrt{2} \mu^{\frac{7}{2}}$$
Fraction options:
>>> print(latex((2*tau)**Rational(7,2), fold_frac_powers=True))
8 \sqrt{2} \tau^{7/2}
>>> print(latex((2*tau)**sin(Rational(7,2))))
\left(2 \tau\right)^{\sin{\left(\frac{7}{2} \right)}}
>>> print(latex((2*tau)**sin(Rational(7,2)), fold_func_brackets=True))
\left(2 \tau\right)^{\sin {\frac{7}{2}}}
>>> print(latex(3*x**2/y))
\frac{3 x^{2}}{y}
>>> print(latex(3*x**2/y, fold_short_frac=True))
3 x^{2} / y
>>> print(latex(Integral(r, r)/2/pi, long_frac_ratio=2))
\frac{\int r\, dr}{2 \pi}
>>> print(latex(Integral(r, r)/2/pi, long_frac_ratio=0))
\frac{1}{2 \pi} \int r\, dr
Multiplication options:
>>> print(latex((2*tau)**sin(Rational(7,2)), mul_symbol="times"))
\left(2 \times \tau\right)^{\sin{\left(\frac{7}{2} \right)}}
Trig options:
>>> print(latex(asin(Rational(7,2))))
\operatorname{asin}{\left(\frac{7}{2} \right)}
>>> print(latex(asin(Rational(7,2)), inv_trig_style="full"))
\arcsin{\left(\frac{7}{2} \right)}
>>> print(latex(asin(Rational(7,2)), inv_trig_style="power"))
\sin^{-1}{\left(\frac{7}{2} \right)}
Matrix options:
>>> print(latex(Matrix(2, 1, [x, y])))
\left[\begin{matrix}x\\y\end{matrix}\right]
>>> print(latex(Matrix(2, 1, [x, y]), mat_str = "array"))
\left[\begin{array}{c}x\\y\end{array}\right]
>>> print(latex(Matrix(2, 1, [x, y]), mat_delim="("))
\left(\begin{matrix}x\\y\end{matrix}\right)
Custom printing of symbols:
>>> print(latex(x**2, symbol_names={x: 'x_i'}))
x_i^{2}
Logarithms:
>>> print(latex(log(10)))
\log{\left(10 \right)}
>>> print(latex(log(10), ln_notation=True))
\ln{\left(10 \right)}
``latex()`` also supports the builtin container types list, tuple, and
dictionary.
>>> print(latex([2/x, y], mode='inline'))
$\left[ 2 / x, \ y\right]$
"""
if symbol_names is None:
symbol_names = {}
settings = {
'full_prec': full_prec,
'fold_frac_powers': fold_frac_powers,
'fold_func_brackets': fold_func_brackets,
'fold_short_frac': fold_short_frac,
'inv_trig_style': inv_trig_style,
'itex': itex,
'ln_notation': ln_notation,
'long_frac_ratio': long_frac_ratio,
'mat_delim': mat_delim,
'mat_str': mat_str,
'mode': mode,
'mul_symbol': mul_symbol,
'order': order,
'symbol_names': symbol_names,
'root_notation': root_notation,
'mat_symbol_style': mat_symbol_style,
'imaginary_unit': imaginary_unit,
'gothic_re_im': gothic_re_im,
'decimal_separator': decimal_separator,
'perm_cyclic' : perm_cyclic,
'parenthesize_super' : parenthesize_super,
'min': min,
'max': max,
}
return LatexPrinter(settings).doprint(expr)
def print_latex(expr, **settings):
"""Prints LaTeX representation of the given expression. Takes the same
settings as ``latex()``."""
print(latex(expr, **settings))
def multiline_latex(lhs, rhs, terms_per_line=1, environment="align*", use_dots=False, **settings):
r"""
This function generates a LaTeX equation with a multiline right-hand side
in an ``align*``, ``eqnarray`` or ``IEEEeqnarray`` environment.
Parameters
==========
lhs : Expr
Left-hand side of equation
rhs : Expr
Right-hand side of equation
terms_per_line : integer, optional
Number of terms per line to print. Default is 1.
environment : "string", optional
Which LaTeX wnvironment to use for the output. Options are "align*"
(default), "eqnarray", and "IEEEeqnarray".
use_dots : boolean, optional
If ``True``, ``\\dots`` is added to the end of each line. Default is ``False``.
Examples
========
>>> from sympy import multiline_latex, symbols, sin, cos, exp, log, I
>>> x, y, alpha = symbols('x y alpha')
>>> expr = sin(alpha*y) + exp(I*alpha) - cos(log(y))
>>> print(multiline_latex(x, expr))
\begin{align*}
x = & e^{i \alpha} \\
& + \sin{\left(\alpha y \right)} \\
& - \cos{\left(\log{\left(y \right)} \right)}
\end{align*}
Using at most two terms per line:
>>> print(multiline_latex(x, expr, 2))
\begin{align*}
x = & e^{i \alpha} + \sin{\left(\alpha y \right)} \\
& - \cos{\left(\log{\left(y \right)} \right)}
\end{align*}
Using ``eqnarray`` and dots:
>>> print(multiline_latex(x, expr, terms_per_line=2, environment="eqnarray", use_dots=True))
\begin{eqnarray}
x & = & e^{i \alpha} + \sin{\left(\alpha y \right)} \dots\nonumber\\
& & - \cos{\left(\log{\left(y \right)} \right)}
\end{eqnarray}
Using ``IEEEeqnarray``:
>>> print(multiline_latex(x, expr, environment="IEEEeqnarray"))
\begin{IEEEeqnarray}{rCl}
x & = & e^{i \alpha} \nonumber\\
& & + \sin{\left(\alpha y \right)} \nonumber\\
& & - \cos{\left(\log{\left(y \right)} \right)}
\end{IEEEeqnarray}
Notes
=====
All optional parameters from ``latex`` can also be used.
"""
# Based on code from https://github.com/sympy/sympy/issues/3001
l = LatexPrinter(**settings)
if environment == "eqnarray":
result = r'\begin{eqnarray}' + '\n'
first_term = '& = &'
nonumber = r'\nonumber'
end_term = '\n\\end{eqnarray}'
doubleet = True
elif environment == "IEEEeqnarray":
result = r'\begin{IEEEeqnarray}{rCl}' + '\n'
first_term = '& = &'
nonumber = r'\nonumber'
end_term = '\n\\end{IEEEeqnarray}'
doubleet = True
elif environment == "align*":
result = r'\begin{align*}' + '\n'
first_term = '= &'
nonumber = ''
end_term = '\n\\end{align*}'
doubleet = False
else:
raise ValueError("Unknown environment: {}".format(environment))
dots = ''
if use_dots:
dots=r'\dots'
terms = rhs.as_ordered_terms()
n_terms = len(terms)
term_count = 1
for i in range(n_terms):
term = terms[i]
term_start = ''
term_end = ''
sign = '+'
if term_count > terms_per_line:
if doubleet:
term_start = '& & '
else:
term_start = '& '
term_count = 1
if term_count == terms_per_line:
# End of line
if i < n_terms-1:
# There are terms remaining
term_end = dots + nonumber + r'\\' + '\n'
else:
term_end = ''
if term.as_ordered_factors()[0] == -1:
term = -1*term
sign = r'-'
if i == 0: # beginning
if sign == '+':
sign = ''
result += r'{:s} {:s}{:s} {:s} {:s}'.format(l.doprint(lhs),
first_term, sign, l.doprint(term), term_end)
else:
result += r'{:s}{:s} {:s} {:s}'.format(term_start, sign,
l.doprint(term), term_end)
term_count += 1
result += end_term
return result
|
b756ddc7e5a0d015bae9d8e8592a86b0b64bbfcdf26cc5ec5a615c2c8dd95ed0
|
from __future__ import print_function, division
from sympy.core._print_helpers import Printable
# alias for compatibility
Printable.__module__ = __name__
DefaultPrinting = Printable
|
feba30c7c3894b44d05ae61e95a4c5245626bc4865dc074d23eeef37af84381a
|
from sympy.concrete.expr_with_limits import AddWithLimits
from sympy.core.add import Add
from sympy.core.basic import Basic
from sympy.core.compatibility import is_sequence
from sympy.core.containers import Tuple
from sympy.core.expr import Expr
from sympy.core.function import diff
from sympy.core.logic import fuzzy_bool
from sympy.core.mul import Mul
from sympy.core.numbers import oo, pi
from sympy.core.relational import Ne
from sympy.core.singleton import S
from sympy.core.symbol import (Dummy, Symbol, Wild)
from sympy.core.sympify import sympify
from sympy.functions import Piecewise, sqrt, piecewise_fold, tan, cot, atan
from sympy.functions.elementary.exponential import log
from sympy.functions.elementary.integers import floor
from sympy.functions.elementary.complexes import Abs, sign
from sympy.functions.elementary.miscellaneous import Min, Max
from sympy.integrals.manualintegrate import manualintegrate
from sympy.integrals.trigonometry import trigintegrate
from sympy.integrals.meijerint import meijerint_definite, meijerint_indefinite
from sympy.matrices import MatrixBase
from sympy.polys import Poly, PolynomialError
from sympy.series import limit
from sympy.series.order import Order
from sympy.series.formal import FormalPowerSeries
from sympy.simplify.fu import sincos_to_sum
from sympy.utilities.misc import filldedent
from sympy.utilities.exceptions import SymPyDeprecationWarning
class Integral(AddWithLimits):
"""Represents unevaluated integral."""
__slots__ = ('is_commutative',)
def __new__(cls, function, *symbols, **assumptions):
"""Create an unevaluated integral.
Arguments are an integrand followed by one or more limits.
If no limits are given and there is only one free symbol in the
expression, that symbol will be used, otherwise an error will be
raised.
>>> from sympy import Integral
>>> from sympy.abc import x, y
>>> Integral(x)
Integral(x, x)
>>> Integral(y)
Integral(y, y)
When limits are provided, they are interpreted as follows (using
``x`` as though it were the variable of integration):
(x,) or x - indefinite integral
(x, a) - "evaluate at" integral is an abstract antiderivative
(x, a, b) - definite integral
The ``as_dummy`` method can be used to see which symbols cannot be
targeted by subs: those with a prepended underscore cannot be
changed with ``subs``. (Also, the integration variables themselves --
the first element of a limit -- can never be changed by subs.)
>>> i = Integral(x, x)
>>> at = Integral(x, (x, x))
>>> i.as_dummy()
Integral(x, x)
>>> at.as_dummy()
Integral(_0, (_0, x))
"""
#This will help other classes define their own definitions
#of behaviour with Integral.
if hasattr(function, '_eval_Integral'):
return function._eval_Integral(*symbols, **assumptions)
if isinstance(function, Poly):
SymPyDeprecationWarning(
feature="Using integrate/Integral with Poly",
issue=18613,
deprecated_since_version="1.6",
useinstead="the as_expr or integrate methods of Poly").warn()
obj = AddWithLimits.__new__(cls, function, *symbols, **assumptions)
return obj
def __getnewargs__(self):
return (self.function,) + tuple([tuple(xab) for xab in self.limits])
@property
def free_symbols(self):
"""
This method returns the symbols that will exist when the
integral is evaluated. This is useful if one is trying to
determine whether an integral depends on a certain
symbol or not.
Examples
========
>>> from sympy import Integral
>>> from sympy.abc import x, y
>>> Integral(x, (x, y, 1)).free_symbols
{y}
See Also
========
sympy.concrete.expr_with_limits.ExprWithLimits.function
sympy.concrete.expr_with_limits.ExprWithLimits.limits
sympy.concrete.expr_with_limits.ExprWithLimits.variables
"""
return AddWithLimits.free_symbols.fget(self)
def _eval_is_zero(self):
# This is a very naive and quick test, not intended to do the integral to
# answer whether it is zero or not, e.g. Integral(sin(x), (x, 0, 2*pi))
# is zero but this routine should return None for that case. But, like
# Mul, there are trivial situations for which the integral will be
# zero so we check for those.
if self.function.is_zero:
return True
got_none = False
for l in self.limits:
if len(l) == 3:
z = (l[1] == l[2]) or (l[1] - l[2]).is_zero
if z:
return True
elif z is None:
got_none = True
free = self.function.free_symbols
for xab in self.limits:
if len(xab) == 1:
free.add(xab[0])
continue
if len(xab) == 2 and xab[0] not in free:
if xab[1].is_zero:
return True
elif xab[1].is_zero is None:
got_none = True
# take integration symbol out of free since it will be replaced
# with the free symbols in the limits
free.discard(xab[0])
# add in the new symbols
for i in xab[1:]:
free.update(i.free_symbols)
if self.function.is_zero is False and got_none is False:
return False
def transform(self, x, u):
r"""
Performs a change of variables from `x` to `u` using the relationship
given by `x` and `u` which will define the transformations `f` and `F`
(which are inverses of each other) as follows:
1) If `x` is a Symbol (which is a variable of integration) then `u`
will be interpreted as some function, f(u), with inverse F(u).
This, in effect, just makes the substitution of x with f(x).
2) If `u` is a Symbol then `x` will be interpreted as some function,
F(x), with inverse f(u). This is commonly referred to as
u-substitution.
Once f and F have been identified, the transformation is made as
follows:
.. math:: \int_a^b x \mathrm{d}x \rightarrow \int_{F(a)}^{F(b)} f(x)
\frac{\mathrm{d}}{\mathrm{d}x}
where `F(x)` is the inverse of `f(x)` and the limits and integrand have
been corrected so as to retain the same value after integration.
Notes
=====
The mappings, F(x) or f(u), must lead to a unique integral. Linear
or rational linear expression, `2*x`, `1/x` and `sqrt(x)`, will
always work; quadratic expressions like `x**2 - 1` are acceptable
as long as the resulting integrand does not depend on the sign of
the solutions (see examples).
The integral will be returned unchanged if `x` is not a variable of
integration.
`x` must be (or contain) only one of of the integration variables. If
`u` has more than one free symbol then it should be sent as a tuple
(`u`, `uvar`) where `uvar` identifies which variable is replacing
the integration variable.
XXX can it contain another integration variable?
Examples
========
>>> from sympy.abc import a, x, u
>>> from sympy import Integral, cos, sqrt
>>> i = Integral(x*cos(x**2 - 1), (x, 0, 1))
transform can change the variable of integration
>>> i.transform(x, u)
Integral(u*cos(u**2 - 1), (u, 0, 1))
transform can perform u-substitution as long as a unique
integrand is obtained:
>>> i.transform(x**2 - 1, u)
Integral(cos(u)/2, (u, -1, 0))
This attempt fails because x = +/-sqrt(u + 1) and the
sign does not cancel out of the integrand:
>>> Integral(cos(x**2 - 1), (x, 0, 1)).transform(x**2 - 1, u)
Traceback (most recent call last):
...
ValueError:
The mapping between F(x) and f(u) did not give a unique integrand.
transform can do a substitution. Here, the previous
result is transformed back into the original expression
using "u-substitution":
>>> ui = _
>>> _.transform(sqrt(u + 1), x) == i
True
We can accomplish the same with a regular substitution:
>>> ui.transform(u, x**2 - 1) == i
True
If the `x` does not contain a symbol of integration then
the integral will be returned unchanged. Integral `i` does
not have an integration variable `a` so no change is made:
>>> i.transform(a, x) == i
True
When `u` has more than one free symbol the symbol that is
replacing `x` must be identified by passing `u` as a tuple:
>>> Integral(x, (x, 0, 1)).transform(x, (u + a, u))
Integral(a + u, (u, -a, 1 - a))
>>> Integral(x, (x, 0, 1)).transform(x, (u + a, a))
Integral(a + u, (a, -u, 1 - u))
See Also
========
sympy.concrete.expr_with_limits.ExprWithLimits.variables : Lists the integration variables
as_dummy : Replace integration variables with dummy ones
"""
from sympy.solvers.solvers import solve, posify
d = Dummy('d')
xfree = x.free_symbols.intersection(self.variables)
if len(xfree) > 1:
raise ValueError(
'F(x) can only contain one of: %s' % self.variables)
xvar = xfree.pop() if xfree else d
if xvar not in self.variables:
return self
u = sympify(u)
if isinstance(u, Expr):
ufree = u.free_symbols
if len(ufree) == 0:
raise ValueError(filldedent('''
f(u) cannot be a constant'''))
if len(ufree) > 1:
raise ValueError(filldedent('''
When f(u) has more than one free symbol, the one replacing x
must be identified: pass f(u) as (f(u), u)'''))
uvar = ufree.pop()
else:
u, uvar = u
if uvar not in u.free_symbols:
raise ValueError(filldedent('''
Expecting a tuple (expr, symbol) where symbol identified
a free symbol in expr, but symbol is not in expr's free
symbols.'''))
if not isinstance(uvar, Symbol):
# This probably never evaluates to True
raise ValueError(filldedent('''
Expecting a tuple (expr, symbol) but didn't get
a symbol; got %s''' % uvar))
if x.is_Symbol and u.is_Symbol:
return self.xreplace({x: u})
if not x.is_Symbol and not u.is_Symbol:
raise ValueError('either x or u must be a symbol')
if uvar == xvar:
return self.transform(x, (u.subs(uvar, d), d)).xreplace({d: uvar})
if uvar in self.limits:
raise ValueError(filldedent('''
u must contain the same variable as in x
or a variable that is not already an integration variable'''))
if not x.is_Symbol:
F = [x.subs(xvar, d)]
soln = solve(u - x, xvar, check=False)
if not soln:
raise ValueError('no solution for solve(F(x) - f(u), x)')
f = [fi.subs(uvar, d) for fi in soln]
else:
f = [u.subs(uvar, d)]
pdiff, reps = posify(u - x)
puvar = uvar.subs([(v, k) for k, v in reps.items()])
soln = [s.subs(reps) for s in solve(pdiff, puvar)]
if not soln:
raise ValueError('no solution for solve(F(x) - f(u), u)')
F = [fi.subs(xvar, d) for fi in soln]
newfuncs = {(self.function.subs(xvar, fi)*fi.diff(d)
).subs(d, uvar) for fi in f}
if len(newfuncs) > 1:
raise ValueError(filldedent('''
The mapping between F(x) and f(u) did not give
a unique integrand.'''))
newfunc = newfuncs.pop()
def _calc_limit_1(F, a, b):
"""
replace d with a, using subs if possible, otherwise limit
where sign of b is considered
"""
wok = F.subs(d, a)
if wok is S.NaN or wok.is_finite is False and a.is_finite:
return limit(sign(b)*F, d, a)
return wok
def _calc_limit(a, b):
"""
replace d with a, using subs if possible, otherwise limit
where sign of b is considered
"""
avals = list({_calc_limit_1(Fi, a, b) for Fi in F})
if len(avals) > 1:
raise ValueError(filldedent('''
The mapping between F(x) and f(u) did not
give a unique limit.'''))
return avals[0]
newlimits = []
for xab in self.limits:
sym = xab[0]
if sym == xvar:
if len(xab) == 3:
a, b = xab[1:]
a, b = _calc_limit(a, b), _calc_limit(b, a)
if fuzzy_bool(a - b > 0):
a, b = b, a
newfunc = -newfunc
newlimits.append((uvar, a, b))
elif len(xab) == 2:
a = _calc_limit(xab[1], 1)
newlimits.append((uvar, a))
else:
newlimits.append(uvar)
else:
newlimits.append(xab)
return self.func(newfunc, *newlimits)
def doit(self, **hints):
"""
Perform the integration using any hints given.
Examples
========
>>> from sympy import Piecewise, S
>>> from sympy.abc import x, t
>>> p = x**2 + Piecewise((0, x/t < 0), (1, True))
>>> p.integrate((t, S(4)/5, 1), (x, -1, 1))
1/3
See Also
========
sympy.integrals.trigonometry.trigintegrate
sympy.integrals.heurisch.heurisch
sympy.integrals.rationaltools.ratint
as_sum : Approximate the integral using a sum
"""
from sympy.concrete.summations import Sum
if not hints.get('integrals', True):
return self
deep = hints.get('deep', True)
meijerg = hints.get('meijerg', None)
conds = hints.get('conds', 'piecewise')
risch = hints.get('risch', None)
heurisch = hints.get('heurisch', None)
manual = hints.get('manual', None)
if len(list(filter(None, (manual, meijerg, risch, heurisch)))) > 1:
raise ValueError("At most one of manual, meijerg, risch, heurisch can be True")
elif manual:
meijerg = risch = heurisch = False
elif meijerg:
manual = risch = heurisch = False
elif risch:
manual = meijerg = heurisch = False
elif heurisch:
manual = meijerg = risch = False
eval_kwargs = dict(meijerg=meijerg, risch=risch, manual=manual, heurisch=heurisch,
conds=conds)
if conds not in ['separate', 'piecewise', 'none']:
raise ValueError('conds must be one of "separate", "piecewise", '
'"none", got: %s' % conds)
if risch and any(len(xab) > 1 for xab in self.limits):
raise ValueError('risch=True is only allowed for indefinite integrals.')
# check for the trivial zero
if self.is_zero:
return S.Zero
# hacks to handle integrals of
# nested summations
if isinstance(self.function, Sum):
if any(v in self.function.limits[0] for v in self.variables):
raise ValueError('Limit of the sum cannot be an integration variable.')
if any(l.is_infinite for l in self.function.limits[0][1:]):
return self
_i = self
_sum = self.function
return _sum.func(_i.func(_sum.function, *_i.limits).doit(), *_sum.limits).doit()
# now compute and check the function
function = self.function
if deep:
function = function.doit(**hints)
if function.is_zero:
return S.Zero
# hacks to handle special cases
if isinstance(function, MatrixBase):
return function.applyfunc(
lambda f: self.func(f, self.limits).doit(**hints))
if isinstance(function, FormalPowerSeries):
if len(self.limits) > 1:
raise NotImplementedError
xab = self.limits[0]
if len(xab) > 1:
return function.integrate(xab, **eval_kwargs)
else:
return function.integrate(xab[0], **eval_kwargs)
# There is no trivial answer and special handling
# is done so continue
# first make sure any definite limits have integration
# variables with matching assumptions
reps = {}
for xab in self.limits:
if len(xab) != 3:
continue
x, a, b = xab
l = (a, b)
if all(i.is_nonnegative for i in l) and not x.is_nonnegative:
d = Dummy(positive=True)
elif all(i.is_nonpositive for i in l) and not x.is_nonpositive:
d = Dummy(negative=True)
elif all(i.is_real for i in l) and not x.is_real:
d = Dummy(real=True)
else:
d = None
if d:
reps[x] = d
if reps:
undo = {v: k for k, v in reps.items()}
did = self.xreplace(reps).doit(**hints)
if type(did) is tuple: # when separate=True
did = tuple([i.xreplace(undo) for i in did])
else:
did = did.xreplace(undo)
return did
# continue with existing assumptions
undone_limits = []
# ulj = free symbols of any undone limits' upper and lower limits
ulj = set()
for xab in self.limits:
# compute uli, the free symbols in the
# Upper and Lower limits of limit I
if len(xab) == 1:
uli = set(xab[:1])
elif len(xab) == 2:
uli = xab[1].free_symbols
elif len(xab) == 3:
uli = xab[1].free_symbols.union(xab[2].free_symbols)
# this integral can be done as long as there is no blocking
# limit that has been undone. An undone limit is blocking if
# it contains an integration variable that is in this limit's
# upper or lower free symbols or vice versa
if xab[0] in ulj or any(v[0] in uli for v in undone_limits):
undone_limits.append(xab)
ulj.update(uli)
function = self.func(*([function] + [xab]))
factored_function = function.factor()
if not isinstance(factored_function, Integral):
function = factored_function
continue
if function.has(Abs, sign) and (
(len(xab) < 3 and all(x.is_extended_real for x in xab)) or
(len(xab) == 3 and all(x.is_extended_real and not x.is_infinite for
x in xab[1:]))):
# some improper integrals are better off with Abs
xr = Dummy("xr", real=True)
function = (function.xreplace({xab[0]: xr})
.rewrite(Piecewise).xreplace({xr: xab[0]}))
elif function.has(Min, Max):
function = function.rewrite(Piecewise)
if (function.has(Piecewise) and
not isinstance(function, Piecewise)):
function = piecewise_fold(function)
if isinstance(function, Piecewise):
if len(xab) == 1:
antideriv = function._eval_integral(xab[0],
**eval_kwargs)
else:
antideriv = self._eval_integral(
function, xab[0], **eval_kwargs)
else:
# There are a number of tradeoffs in using the
# Meijer G method. It can sometimes be a lot faster
# than other methods, and sometimes slower. And
# there are certain types of integrals for which it
# is more likely to work than others. These
# heuristics are incorporated in deciding what
# integration methods to try, in what order. See the
# integrate() docstring for details.
def try_meijerg(function, xab):
ret = None
if len(xab) == 3 and meijerg is not False:
x, a, b = xab
try:
res = meijerint_definite(function, x, a, b)
except NotImplementedError:
from sympy.integrals.meijerint import _debug
_debug('NotImplementedError '
'from meijerint_definite')
res = None
if res is not None:
f, cond = res
if conds == 'piecewise':
ret = Piecewise(
(f, cond),
(self.func(
function, (x, a, b)), True))
elif conds == 'separate':
if len(self.limits) != 1:
raise ValueError(filldedent('''
conds=separate not supported in
multiple integrals'''))
ret = f, cond
else:
ret = f
return ret
meijerg1 = meijerg
if (meijerg is not False and
len(xab) == 3 and xab[1].is_extended_real and xab[2].is_extended_real
and not function.is_Poly and
(xab[1].has(oo, -oo) or xab[2].has(oo, -oo))):
ret = try_meijerg(function, xab)
if ret is not None:
function = ret
continue
meijerg1 = False
# If the special meijerg code did not succeed in
# finding a definite integral, then the code using
# meijerint_indefinite will not either (it might
# find an antiderivative, but the answer is likely
# to be nonsensical). Thus if we are requested to
# only use Meijer G-function methods, we give up at
# this stage. Otherwise we just disable G-function
# methods.
if meijerg1 is False and meijerg is True:
antideriv = None
else:
antideriv = self._eval_integral(
function, xab[0], **eval_kwargs)
if antideriv is None and meijerg is True:
ret = try_meijerg(function, xab)
if ret is not None:
function = ret
continue
if not isinstance(antideriv, Integral) and antideriv is not None:
for atan_term in antideriv.atoms(atan):
atan_arg = atan_term.args[0]
# Checking `atan_arg` to be linear combination of `tan` or `cot`
for tan_part in atan_arg.atoms(tan):
x1 = Dummy('x1')
tan_exp1 = atan_arg.subs(tan_part, x1)
# The coefficient of `tan` should be constant
coeff = tan_exp1.diff(x1)
if x1 not in coeff.free_symbols:
a = tan_part.args[0]
antideriv = antideriv.subs(atan_term, Add(atan_term,
sign(coeff)*pi*floor((a-pi/2)/pi)))
for cot_part in atan_arg.atoms(cot):
x1 = Dummy('x1')
cot_exp1 = atan_arg.subs(cot_part, x1)
# The coefficient of `cot` should be constant
coeff = cot_exp1.diff(x1)
if x1 not in coeff.free_symbols:
a = cot_part.args[0]
antideriv = antideriv.subs(atan_term, Add(atan_term,
sign(coeff)*pi*floor((a)/pi)))
if antideriv is None:
undone_limits.append(xab)
function = self.func(*([function] + [xab])).factor()
factored_function = function.factor()
if not isinstance(factored_function, Integral):
function = factored_function
continue
else:
if len(xab) == 1:
function = antideriv
else:
if len(xab) == 3:
x, a, b = xab
elif len(xab) == 2:
x, b = xab
a = None
else:
raise NotImplementedError
if deep:
if isinstance(a, Basic):
a = a.doit(**hints)
if isinstance(b, Basic):
b = b.doit(**hints)
if antideriv.is_Poly:
gens = list(antideriv.gens)
gens.remove(x)
antideriv = antideriv.as_expr()
function = antideriv._eval_interval(x, a, b)
function = Poly(function, *gens)
else:
def is_indef_int(g, x):
return (isinstance(g, Integral) and
any(i == (x,) for i in g.limits))
def eval_factored(f, x, a, b):
# _eval_interval for integrals with
# (constant) factors
# a single indefinite integral is assumed
args = []
for g in Mul.make_args(f):
if is_indef_int(g, x):
args.append(g._eval_interval(x, a, b))
else:
args.append(g)
return Mul(*args)
integrals, others, piecewises = [], [], []
for f in Add.make_args(antideriv):
if any(is_indef_int(g, x)
for g in Mul.make_args(f)):
integrals.append(f)
elif any(isinstance(g, Piecewise)
for g in Mul.make_args(f)):
piecewises.append(piecewise_fold(f))
else:
others.append(f)
uneval = Add(*[eval_factored(f, x, a, b)
for f in integrals])
try:
evalued = Add(*others)._eval_interval(x, a, b)
evalued_pw = piecewise_fold(Add(*piecewises))._eval_interval(x, a, b)
function = uneval + evalued + evalued_pw
except NotImplementedError:
# This can happen if _eval_interval depends in a
# complicated way on limits that cannot be computed
undone_limits.append(xab)
function = self.func(*([function] + [xab]))
factored_function = function.factor()
if not isinstance(factored_function, Integral):
function = factored_function
return function
def _eval_derivative(self, sym):
"""Evaluate the derivative of the current Integral object by
differentiating under the integral sign [1], using the Fundamental
Theorem of Calculus [2] when possible.
Whenever an Integral is encountered that is equivalent to zero or
has an integrand that is independent of the variable of integration
those integrals are performed. All others are returned as Integral
instances which can be resolved with doit() (provided they are integrable).
References:
[1] https://en.wikipedia.org/wiki/Differentiation_under_the_integral_sign
[2] https://en.wikipedia.org/wiki/Fundamental_theorem_of_calculus
Examples
========
>>> from sympy import Integral
>>> from sympy.abc import x, y
>>> i = Integral(x + y, y, (y, 1, x))
>>> i.diff(x)
Integral(x + y, (y, x)) + Integral(1, y, (y, 1, x))
>>> i.doit().diff(x) == i.diff(x).doit()
True
>>> i.diff(y)
0
The previous must be true since there is no y in the evaluated integral:
>>> i.free_symbols
{x}
>>> i.doit()
2*x**3/3 - x/2 - 1/6
"""
# differentiate under the integral sign; we do not
# check for regularity conditions (TODO), see issue 4215
# get limits and the function
f, limits = self.function, list(self.limits)
# the order matters if variables of integration appear in the limits
# so work our way in from the outside to the inside.
limit = limits.pop(-1)
if len(limit) == 3:
x, a, b = limit
elif len(limit) == 2:
x, b = limit
a = None
else:
a = b = None
x = limit[0]
if limits: # f is the argument to an integral
f = self.func(f, *tuple(limits))
# assemble the pieces
def _do(f, ab):
dab_dsym = diff(ab, sym)
if not dab_dsym:
return S.Zero
if isinstance(f, Integral):
limits = [(x, x) if (len(l) == 1 and l[0] == x) else l
for l in f.limits]
f = self.func(f.function, *limits)
return f.subs(x, ab)*dab_dsym
rv = S.Zero
if b is not None:
rv += _do(f, b)
if a is not None:
rv -= _do(f, a)
if len(limit) == 1 and sym == x:
# the dummy variable *is* also the real-world variable
arg = f
rv += arg
else:
# the dummy variable might match sym but it's
# only a dummy and the actual variable is determined
# by the limits, so mask off the variable of integration
# while differentiating
u = Dummy('u')
arg = f.subs(x, u).diff(sym).subs(u, x)
if arg:
rv += self.func(arg, Tuple(x, a, b))
return rv
def _eval_integral(self, f, x, meijerg=None, risch=None, manual=None,
heurisch=None, conds='piecewise'):
"""
Calculate the anti-derivative to the function f(x).
The following algorithms are applied (roughly in this order):
1. Simple heuristics (based on pattern matching and integral table):
- most frequently used functions (e.g. polynomials, products of
trig functions)
2. Integration of rational functions:
- A complete algorithm for integrating rational functions is
implemented (the Lazard-Rioboo-Trager algorithm). The algorithm
also uses the partial fraction decomposition algorithm
implemented in apart() as a preprocessor to make this process
faster. Note that the integral of a rational function is always
elementary, but in general, it may include a RootSum.
3. Full Risch algorithm:
- The Risch algorithm is a complete decision
procedure for integrating elementary functions, which means that
given any elementary function, it will either compute an
elementary antiderivative, or else prove that none exists.
Currently, part of transcendental case is implemented, meaning
elementary integrals containing exponentials, logarithms, and
(soon!) trigonometric functions can be computed. The algebraic
case, e.g., functions containing roots, is much more difficult
and is not implemented yet.
- If the routine fails (because the integrand is not elementary, or
because a case is not implemented yet), it continues on to the
next algorithms below. If the routine proves that the integrals
is nonelementary, it still moves on to the algorithms below,
because we might be able to find a closed-form solution in terms
of special functions. If risch=True, however, it will stop here.
4. The Meijer G-Function algorithm:
- This algorithm works by first rewriting the integrand in terms of
very general Meijer G-Function (meijerg in SymPy), integrating
it, and then rewriting the result back, if possible. This
algorithm is particularly powerful for definite integrals (which
is actually part of a different method of Integral), since it can
compute closed-form solutions of definite integrals even when no
closed-form indefinite integral exists. But it also is capable
of computing many indefinite integrals as well.
- Another advantage of this method is that it can use some results
about the Meijer G-Function to give a result in terms of a
Piecewise expression, which allows to express conditionally
convergent integrals.
- Setting meijerg=True will cause integrate() to use only this
method.
5. The "manual integration" algorithm:
- This algorithm tries to mimic how a person would find an
antiderivative by hand, for example by looking for a
substitution or applying integration by parts. This algorithm
does not handle as many integrands but can return results in a
more familiar form.
- Sometimes this algorithm can evaluate parts of an integral; in
this case integrate() will try to evaluate the rest of the
integrand using the other methods here.
- Setting manual=True will cause integrate() to use only this
method.
6. The Heuristic Risch algorithm:
- This is a heuristic version of the Risch algorithm, meaning that
it is not deterministic. This is tried as a last resort because
it can be very slow. It is still used because not enough of the
full Risch algorithm is implemented, so that there are still some
integrals that can only be computed using this method. The goal
is to implement enough of the Risch and Meijer G-function methods
so that this can be deleted.
Setting heurisch=True will cause integrate() to use only this
method. Set heurisch=False to not use it.
"""
from sympy.integrals.deltafunctions import deltaintegrate
from sympy.integrals.singularityfunctions import singularityintegrate
from sympy.integrals.heurisch import heurisch as heurisch_, heurisch_wrapper
from sympy.integrals.rationaltools import ratint
from sympy.integrals.risch import risch_integrate
if risch:
try:
return risch_integrate(f, x, conds=conds)
except NotImplementedError:
return None
if manual:
try:
result = manualintegrate(f, x)
if result is not None and result.func != Integral:
return result
except (ValueError, PolynomialError):
pass
eval_kwargs = dict(meijerg=meijerg, risch=risch, manual=manual,
heurisch=heurisch, conds=conds)
# if it is a poly(x) then let the polynomial integrate itself (fast)
#
# It is important to make this check first, otherwise the other code
# will return a sympy expression instead of a Polynomial.
#
# see Polynomial for details.
if isinstance(f, Poly) and not (manual or meijerg or risch):
SymPyDeprecationWarning(
feature="Using integrate/Integral with Poly",
issue=18613,
deprecated_since_version="1.6",
useinstead="the as_expr or integrate methods of Poly").warn()
return f.integrate(x)
# Piecewise antiderivatives need to call special integrate.
if isinstance(f, Piecewise):
return f.piecewise_integrate(x, **eval_kwargs)
# let's cut it short if `f` does not depend on `x`; if
# x is only a dummy, that will be handled below
if not f.has(x):
return f*x
# try to convert to poly(x) and then integrate if successful (fast)
poly = f.as_poly(x)
if poly is not None and not (manual or meijerg or risch):
return poly.integrate().as_expr()
if risch is not False:
try:
result, i = risch_integrate(f, x, separate_integral=True,
conds=conds)
except NotImplementedError:
pass
else:
if i:
# There was a nonelementary integral. Try integrating it.
# if no part of the NonElementaryIntegral is integrated by
# the Risch algorithm, then use the original function to
# integrate, instead of re-written one
if result == 0:
from sympy.integrals.risch import NonElementaryIntegral
return NonElementaryIntegral(f, x).doit(risch=False)
else:
return result + i.doit(risch=False)
else:
return result
# since Integral(f=g1+g2+...) == Integral(g1) + Integral(g2) + ...
# we are going to handle Add terms separately,
# if `f` is not Add -- we only have one term
# Note that in general, this is a bad idea, because Integral(g1) +
# Integral(g2) might not be computable, even if Integral(g1 + g2) is.
# For example, Integral(x**x + x**x*log(x)). But many heuristics only
# work term-wise. So we compute this step last, after trying
# risch_integrate. We also try risch_integrate again in this loop,
# because maybe the integral is a sum of an elementary part and a
# nonelementary part (like erf(x) + exp(x)). risch_integrate() is
# quite fast, so this is acceptable.
parts = []
args = Add.make_args(f)
for g in args:
coeff, g = g.as_independent(x)
# g(x) = const
if g is S.One and not meijerg:
parts.append(coeff*x)
continue
# g(x) = expr + O(x**n)
order_term = g.getO()
if order_term is not None:
h = self._eval_integral(g.removeO(), x, **eval_kwargs)
if h is not None:
h_order_expr = self._eval_integral(order_term.expr, x, **eval_kwargs)
if h_order_expr is not None:
h_order_term = order_term.func(
h_order_expr, *order_term.variables)
parts.append(coeff*(h + h_order_term))
continue
# NOTE: if there is O(x**n) and we fail to integrate then
# there is no point in trying other methods because they
# will fail, too.
return None
# c
# g(x) = (a*x+b)
if g.is_Pow and not g.exp.has(x) and not meijerg:
a = Wild('a', exclude=[x])
b = Wild('b', exclude=[x])
M = g.base.match(a*x + b)
if M is not None:
if g.exp == -1:
h = log(g.base)
elif conds != 'piecewise':
h = g.base**(g.exp + 1) / (g.exp + 1)
else:
h1 = log(g.base)
h2 = g.base**(g.exp + 1) / (g.exp + 1)
h = Piecewise((h2, Ne(g.exp, -1)), (h1, True))
parts.append(coeff * h / M[a])
continue
# poly(x)
# g(x) = -------
# poly(x)
if g.is_rational_function(x) and not (manual or meijerg or risch):
parts.append(coeff * ratint(g, x))
continue
if not (manual or meijerg or risch):
# g(x) = Mul(trig)
h = trigintegrate(g, x, conds=conds)
if h is not None:
parts.append(coeff * h)
continue
# g(x) has at least a DiracDelta term
h = deltaintegrate(g, x)
if h is not None:
parts.append(coeff * h)
continue
# g(x) has at least a Singularity Function term
h = singularityintegrate(g, x)
if h is not None:
parts.append(coeff * h)
continue
# Try risch again.
if risch is not False:
try:
h, i = risch_integrate(g, x,
separate_integral=True, conds=conds)
except NotImplementedError:
h = None
else:
if i:
h = h + i.doit(risch=False)
parts.append(coeff*h)
continue
# fall back to heurisch
if heurisch is not False:
try:
if conds == 'piecewise':
h = heurisch_wrapper(g, x, hints=[])
else:
h = heurisch_(g, x, hints=[])
except PolynomialError:
# XXX: this exception means there is a bug in the
# implementation of heuristic Risch integration
# algorithm.
h = None
else:
h = None
if meijerg is not False and h is None:
# rewrite using G functions
try:
h = meijerint_indefinite(g, x)
except NotImplementedError:
from sympy.integrals.meijerint import _debug
_debug('NotImplementedError from meijerint_definite')
if h is not None:
parts.append(coeff * h)
continue
if h is None and manual is not False:
try:
result = manualintegrate(g, x)
if result is not None and not isinstance(result, Integral):
if result.has(Integral) and not manual:
# Try to have other algorithms do the integrals
# manualintegrate can't handle,
# unless we were asked to use manual only.
# Keep the rest of eval_kwargs in case another
# method was set to False already
new_eval_kwargs = eval_kwargs
new_eval_kwargs["manual"] = False
result = result.func(*[
arg.doit(**new_eval_kwargs) if
arg.has(Integral) else arg
for arg in result.args
]).expand(multinomial=False,
log=False,
power_exp=False,
power_base=False)
if not result.has(Integral):
parts.append(coeff * result)
continue
except (ValueError, PolynomialError):
# can't handle some SymPy expressions
pass
# if we failed maybe it was because we had
# a product that could have been expanded,
# so let's try an expansion of the whole
# thing before giving up; we don't try this
# at the outset because there are things
# that cannot be solved unless they are
# NOT expanded e.g., x**x*(1+log(x)). There
# should probably be a checker somewhere in this
# routine to look for such cases and try to do
# collection on the expressions if they are already
# in an expanded form
if not h and len(args) == 1:
f = sincos_to_sum(f).expand(mul=True, deep=False)
if f.is_Add:
# Note: risch will be identical on the expanded
# expression, but maybe it will be able to pick out parts,
# like x*(exp(x) + erf(x)).
return self._eval_integral(f, x, **eval_kwargs)
if h is not None:
parts.append(coeff * h)
else:
return None
return Add(*parts)
def _eval_lseries(self, x, logx, cdir=0):
expr = self.as_dummy()
symb = x
for l in expr.limits:
if x in l[1:]:
symb = l[0]
break
for term in expr.function.lseries(symb, logx):
yield integrate(term, *expr.limits)
def _eval_nseries(self, x, n, logx, cdir=0):
expr = self.as_dummy()
symb = x
for l in expr.limits:
if x in l[1:]:
symb = l[0]
break
terms, order = expr.function.nseries(
x=symb, n=n, logx=logx).as_coeff_add(Order)
order = [o.subs(symb, x) for o in order]
return integrate(terms, *expr.limits) + Add(*order)*x
def _eval_as_leading_term(self, x, cdir=0):
series_gen = self.args[0].lseries(x)
for leading_term in series_gen:
if leading_term != 0:
break
return integrate(leading_term, *self.args[1:])
def _eval_simplify(self, **kwargs):
from sympy.core.exprtools import factor_terms
from sympy.simplify.simplify import simplify
expr = factor_terms(self)
if isinstance(expr, Integral):
return expr.func(*[simplify(i, **kwargs) for i in expr.args])
return expr.simplify(**kwargs)
def as_sum(self, n=None, method="midpoint", evaluate=True):
"""
Approximates a definite integral by a sum.
Arguments
---------
n
The number of subintervals to use, optional.
method
One of: 'left', 'right', 'midpoint', 'trapezoid'.
evaluate
If False, returns an unevaluated Sum expression. The default
is True, evaluate the sum.
These methods of approximate integration are described in [1].
[1] https://en.wikipedia.org/wiki/Riemann_sum#Methods
Examples
========
>>> from sympy import sin, sqrt
>>> from sympy.abc import x, n
>>> from sympy.integrals import Integral
>>> e = Integral(sin(x), (x, 3, 7))
>>> e
Integral(sin(x), (x, 3, 7))
For demonstration purposes, this interval will only be split into 2
regions, bounded by [3, 5] and [5, 7].
The left-hand rule uses function evaluations at the left of each
interval:
>>> e.as_sum(2, 'left')
2*sin(5) + 2*sin(3)
The midpoint rule uses evaluations at the center of each interval:
>>> e.as_sum(2, 'midpoint')
2*sin(4) + 2*sin(6)
The right-hand rule uses function evaluations at the right of each
interval:
>>> e.as_sum(2, 'right')
2*sin(5) + 2*sin(7)
The trapezoid rule uses function evaluations on both sides of the
intervals. This is equivalent to taking the average of the left and
right hand rule results:
>>> e.as_sum(2, 'trapezoid')
2*sin(5) + sin(3) + sin(7)
>>> (e.as_sum(2, 'left') + e.as_sum(2, 'right'))/2 == _
True
Here, the discontinuity at x = 0 can be avoided by using the
midpoint or right-hand method:
>>> e = Integral(1/sqrt(x), (x, 0, 1))
>>> e.as_sum(5).n(4)
1.730
>>> e.as_sum(10).n(4)
1.809
>>> e.doit().n(4) # the actual value is 2
2.000
The left- or trapezoid method will encounter the discontinuity and
return infinity:
>>> e.as_sum(5, 'left')
zoo
The number of intervals can be symbolic. If omitted, a dummy symbol
will be used for it.
>>> e = Integral(x**2, (x, 0, 2))
>>> e.as_sum(n, 'right').expand()
8/3 + 4/n + 4/(3*n**2)
This shows that the midpoint rule is more accurate, as its error
term decays as the square of n:
>>> e.as_sum(method='midpoint').expand()
8/3 - 2/(3*_n**2)
A symbolic sum is returned with evaluate=False:
>>> e.as_sum(n, 'midpoint', evaluate=False)
2*Sum((2*_k/n - 1/n)**2, (_k, 1, n))/n
See Also
========
Integral.doit : Perform the integration using any hints
"""
from sympy.concrete.summations import Sum
limits = self.limits
if len(limits) > 1:
raise NotImplementedError(
"Multidimensional midpoint rule not implemented yet")
else:
limit = limits[0]
if (len(limit) != 3 or limit[1].is_finite is False or
limit[2].is_finite is False):
raise ValueError("Expecting a definite integral over "
"a finite interval.")
if n is None:
n = Dummy('n', integer=True, positive=True)
else:
n = sympify(n)
if (n.is_positive is False or n.is_integer is False or
n.is_finite is False):
raise ValueError("n must be a positive integer, got %s" % n)
x, a, b = limit
dx = (b - a)/n
k = Dummy('k', integer=True, positive=True)
f = self.function
if method == "left":
result = dx*Sum(f.subs(x, a + (k-1)*dx), (k, 1, n))
elif method == "right":
result = dx*Sum(f.subs(x, a + k*dx), (k, 1, n))
elif method == "midpoint":
result = dx*Sum(f.subs(x, a + k*dx - dx/2), (k, 1, n))
elif method == "trapezoid":
result = dx*((f.subs(x, a) + f.subs(x, b))/2 +
Sum(f.subs(x, a + k*dx), (k, 1, n - 1)))
else:
raise ValueError("Unknown method %s" % method)
return result.doit() if evaluate else result
def _sage_(self):
import sage.all as sage
f, limits = self.function._sage_(), list(self.limits)
for limit_ in limits:
if len(limit_) == 1:
x = limit_[0]
f = sage.integral(f,
x._sage_(),
hold=True)
elif len(limit_) == 2:
x, b = limit_
f = sage.integral(f,
x._sage_(),
b._sage_(),
hold=True)
else:
x, a, b = limit_
f = sage.integral(f,
(x._sage_(),
a._sage_(),
b._sage_()),
hold=True)
return f
def principal_value(self, **kwargs):
"""
Compute the Cauchy Principal Value of the definite integral of a real function in the given interval
on the real axis.
In mathematics, the Cauchy principal value, is a method for assigning values to certain improper
integrals which would otherwise be undefined.
Examples
========
>>> from sympy import oo
>>> from sympy.integrals.integrals import Integral
>>> from sympy.abc import x
>>> Integral(x+1, (x, -oo, oo)).principal_value()
oo
>>> f = 1 / (x**3)
>>> Integral(f, (x, -oo, oo)).principal_value()
0
>>> Integral(f, (x, -10, 10)).principal_value()
0
>>> Integral(f, (x, -10, oo)).principal_value() + Integral(f, (x, -oo, 10)).principal_value()
0
References
==========
.. [1] https://en.wikipedia.org/wiki/Cauchy_principal_value
.. [2] http://mathworld.wolfram.com/CauchyPrincipalValue.html
"""
from sympy.calculus import singularities
if len(self.limits) != 1 or len(list(self.limits[0])) != 3:
raise ValueError("You need to insert a variable, lower_limit, and upper_limit correctly to calculate "
"cauchy's principal value")
x, a, b = self.limits[0]
if not (a.is_comparable and b.is_comparable and a <= b):
raise ValueError("The lower_limit must be smaller than or equal to the upper_limit to calculate "
"cauchy's principal value. Also, a and b need to be comparable.")
if a == b:
return 0
r = Dummy('r')
f = self.function
singularities_list = [s for s in singularities(f, x) if s.is_comparable and a <= s <= b]
for i in singularities_list:
if (i == b) or (i == a):
raise ValueError(
'The principal value is not defined in the given interval due to singularity at %d.' % (i))
F = integrate(f, x, **kwargs)
if F.has(Integral):
return self
if a is -oo and b is oo:
I = limit(F - F.subs(x, -x), x, oo)
else:
I = limit(F, x, b, '-') - limit(F, x, a, '+')
for s in singularities_list:
I += limit(((F.subs(x, s - r)) - F.subs(x, s + r)), r, 0, '+')
return I
def integrate(*args, **kwargs):
"""integrate(f, var, ...)
Compute definite or indefinite integral of one or more variables
using Risch-Norman algorithm and table lookup. This procedure is
able to handle elementary algebraic and transcendental functions
and also a huge class of special functions, including Airy,
Bessel, Whittaker and Lambert.
var can be:
- a symbol -- indefinite integration
- a tuple (symbol, a) -- indefinite integration with result
given with `a` replacing `symbol`
- a tuple (symbol, a, b) -- definite integration
Several variables can be specified, in which case the result is
multiple integration. (If var is omitted and the integrand is
univariate, the indefinite integral in that variable will be performed.)
Indefinite integrals are returned without terms that are independent
of the integration variables. (see examples)
Definite improper integrals often entail delicate convergence
conditions. Pass conds='piecewise', 'separate' or 'none' to have
these returned, respectively, as a Piecewise function, as a separate
result (i.e. result will be a tuple), or not at all (default is
'piecewise').
**Strategy**
SymPy uses various approaches to definite integration. One method is to
find an antiderivative for the integrand, and then use the fundamental
theorem of calculus. Various functions are implemented to integrate
polynomial, rational and trigonometric functions, and integrands
containing DiracDelta terms.
SymPy also implements the part of the Risch algorithm, which is a decision
procedure for integrating elementary functions, i.e., the algorithm can
either find an elementary antiderivative, or prove that one does not
exist. There is also a (very successful, albeit somewhat slow) general
implementation of the heuristic Risch algorithm. This algorithm will
eventually be phased out as more of the full Risch algorithm is
implemented. See the docstring of Integral._eval_integral() for more
details on computing the antiderivative using algebraic methods.
The option risch=True can be used to use only the (full) Risch algorithm.
This is useful if you want to know if an elementary function has an
elementary antiderivative. If the indefinite Integral returned by this
function is an instance of NonElementaryIntegral, that means that the
Risch algorithm has proven that integral to be non-elementary. Note that
by default, additional methods (such as the Meijer G method outlined
below) are tried on these integrals, as they may be expressible in terms
of special functions, so if you only care about elementary answers, use
risch=True. Also note that an unevaluated Integral returned by this
function is not necessarily a NonElementaryIntegral, even with risch=True,
as it may just be an indication that the particular part of the Risch
algorithm needed to integrate that function is not yet implemented.
Another family of strategies comes from re-writing the integrand in
terms of so-called Meijer G-functions. Indefinite integrals of a
single G-function can always be computed, and the definite integral
of a product of two G-functions can be computed from zero to
infinity. Various strategies are implemented to rewrite integrands
as G-functions, and use this information to compute integrals (see
the ``meijerint`` module).
The option manual=True can be used to use only an algorithm that tries
to mimic integration by hand. This algorithm does not handle as many
integrands as the other algorithms implemented but may return results in
a more familiar form. The ``manualintegrate`` module has functions that
return the steps used (see the module docstring for more information).
In general, the algebraic methods work best for computing
antiderivatives of (possibly complicated) combinations of elementary
functions. The G-function methods work best for computing definite
integrals from zero to infinity of moderately complicated
combinations of special functions, or indefinite integrals of very
simple combinations of special functions.
The strategy employed by the integration code is as follows:
- If computing a definite integral, and both limits are real,
and at least one limit is +- oo, try the G-function method of
definite integration first.
- Try to find an antiderivative, using all available methods, ordered
by performance (that is try fastest method first, slowest last; in
particular polynomial integration is tried first, Meijer
G-functions second to last, and heuristic Risch last).
- If still not successful, try G-functions irrespective of the
limits.
The option meijerg=True, False, None can be used to, respectively:
always use G-function methods and no others, never use G-function
methods, or use all available methods (in order as described above).
It defaults to None.
Examples
========
>>> from sympy import integrate, log, exp, oo
>>> from sympy.abc import a, x, y
>>> integrate(x*y, x)
x**2*y/2
>>> integrate(log(x), x)
x*log(x) - x
>>> integrate(log(x), (x, 1, a))
a*log(a) - a + 1
>>> integrate(x)
x**2/2
Terms that are independent of x are dropped by indefinite integration:
>>> from sympy import sqrt
>>> integrate(sqrt(1 + x), (x, 0, x))
2*(x + 1)**(3/2)/3 - 2/3
>>> integrate(sqrt(1 + x), x)
2*(x + 1)**(3/2)/3
>>> integrate(x*y)
Traceback (most recent call last):
...
ValueError: specify integration variables to integrate x*y
Note that ``integrate(x)`` syntax is meant only for convenience
in interactive sessions and should be avoided in library code.
>>> integrate(x**a*exp(-x), (x, 0, oo)) # same as conds='piecewise'
Piecewise((gamma(a + 1), re(a) > -1),
(Integral(x**a*exp(-x), (x, 0, oo)), True))
>>> integrate(x**a*exp(-x), (x, 0, oo), conds='none')
gamma(a + 1)
>>> integrate(x**a*exp(-x), (x, 0, oo), conds='separate')
(gamma(a + 1), -re(a) < 1)
See Also
========
Integral, Integral.doit
"""
doit_flags = {
'deep': False,
'meijerg': kwargs.pop('meijerg', None),
'conds': kwargs.pop('conds', 'piecewise'),
'risch': kwargs.pop('risch', None),
'heurisch': kwargs.pop('heurisch', None),
'manual': kwargs.pop('manual', None)
}
integral = Integral(*args, **kwargs)
if isinstance(integral, Integral):
return integral.doit(**doit_flags)
else:
new_args = [a.doit(**doit_flags) if isinstance(a, Integral) else a
for a in integral.args]
return integral.func(*new_args)
def line_integrate(field, curve, vars):
"""line_integrate(field, Curve, variables)
Compute the line integral.
Examples
========
>>> from sympy import Curve, line_integrate, E, ln
>>> from sympy.abc import x, y, t
>>> C = Curve([E**t + 1, E**t - 1], (t, 0, ln(2)))
>>> line_integrate(x + y, C, [x, y])
3*sqrt(2)
See Also
========
sympy.integrals.integrals.integrate, Integral
"""
from sympy.geometry import Curve
F = sympify(field)
if not F:
raise ValueError(
"Expecting function specifying field as first argument.")
if not isinstance(curve, Curve):
raise ValueError("Expecting Curve entity as second argument.")
if not is_sequence(vars):
raise ValueError("Expecting ordered iterable for variables.")
if len(curve.functions) != len(vars):
raise ValueError("Field variable size does not match curve dimension.")
if curve.parameter in vars:
raise ValueError("Curve parameter clashes with field parameters.")
# Calculate derivatives for line parameter functions
# F(r) -> F(r(t)) and finally F(r(t)*r'(t))
Ft = F
dldt = 0
for i, var in enumerate(vars):
_f = curve.functions[i]
_dn = diff(_f, curve.parameter)
# ...arc length
dldt = dldt + (_dn * _dn)
Ft = Ft.subs(var, _f)
Ft = Ft * sqrt(dldt)
integral = Integral(Ft, curve.limits).doit(deep=False)
return integral
|
e240b2c9c86e033f77ef03ae0762b5b037fb48bbc5dd586f222216102fe8ba3e
|
"""Base class for all the objects in SymPy"""
from collections import defaultdict
from itertools import chain, zip_longest
from .assumptions import BasicMeta, ManagedProperties
from .cache import cacheit
from .sympify import _sympify, sympify, SympifyError
from .compatibility import iterable, ordered, Mapping
from .singleton import S
from ._print_helpers import Printable
from inspect import getmro
def as_Basic(expr):
"""Return expr as a Basic instance using strict sympify
or raise a TypeError; this is just a wrapper to _sympify,
raising a TypeError instead of a SympifyError."""
from sympy.utilities.misc import func_name
try:
return _sympify(expr)
except SympifyError:
raise TypeError(
'Argument must be a Basic object, not `%s`' % func_name(
expr))
class Basic(Printable, metaclass=ManagedProperties):
"""
Base class for all SymPy objects.
Notes and conventions
=====================
1) Always use ``.args``, when accessing parameters of some instance:
>>> from sympy import cot
>>> from sympy.abc import x, y
>>> cot(x).args
(x,)
>>> cot(x).args[0]
x
>>> (x*y).args
(x, y)
>>> (x*y).args[1]
y
2) Never use internal methods or variables (the ones prefixed with ``_``):
>>> cot(x)._args # do not use this, use cot(x).args instead
(x,)
3) By "SymPy object" we mean something that can be returned by
``sympify``. But not all objects one encounters using SymPy are
subclasses of Basic. For example, mutable objects are not:
>>> from sympy import Basic, Matrix, sympify
>>> A = Matrix([[1, 2], [3, 4]]).as_mutable()
>>> isinstance(A, Basic)
False
>>> B = sympify(A)
>>> isinstance(B, Basic)
True
"""
__slots__ = ('_mhash', # hash value
'_args', # arguments
'_assumptions'
)
# To be overridden with True in the appropriate subclasses
is_number = False
is_Atom = False
is_Symbol = False
is_symbol = False
is_Indexed = False
is_Dummy = False
is_Wild = False
is_Function = False
is_Add = False
is_Mul = False
is_Pow = False
is_Number = False
is_Float = False
is_Rational = False
is_Integer = False
is_NumberSymbol = False
is_Order = False
is_Derivative = False
is_Piecewise = False
is_Poly = False
is_AlgebraicNumber = False
is_Relational = False
is_Equality = False
is_Boolean = False
is_Not = False
is_Matrix = False
is_Vector = False
is_Point = False
is_MatAdd = False
is_MatMul = False
def __new__(cls, *args):
obj = object.__new__(cls)
obj._assumptions = cls.default_assumptions
obj._mhash = None # will be set by __hash__ method.
obj._args = args # all items in args must be Basic objects
return obj
def copy(self):
return self.func(*self.args)
def __reduce_ex__(self, proto):
""" Pickling support."""
return type(self), self.__getnewargs__(), self.__getstate__()
def __getnewargs__(self):
return self.args
def __getstate__(self):
return {}
def __setstate__(self, state):
for k, v in state.items():
setattr(self, k, v)
def __hash__(self):
# hash cannot be cached using cache_it because infinite recurrence
# occurs as hash is needed for setting cache dictionary keys
h = self._mhash
if h is None:
h = hash((type(self).__name__,) + self._hashable_content())
self._mhash = h
return h
def _hashable_content(self):
"""Return a tuple of information about self that can be used to
compute the hash. If a class defines additional attributes,
like ``name`` in Symbol, then this method should be updated
accordingly to return such relevant attributes.
Defining more than _hashable_content is necessary if __eq__ has
been defined by a class. See note about this in Basic.__eq__."""
return self._args
@property
def assumptions0(self):
"""
Return object `type` assumptions.
For example:
Symbol('x', real=True)
Symbol('x', integer=True)
are different objects. In other words, besides Python type (Symbol in
this case), the initial assumptions are also forming their typeinfo.
Examples
========
>>> from sympy import Symbol
>>> from sympy.abc import x
>>> x.assumptions0
{'commutative': True}
>>> x = Symbol("x", positive=True)
>>> x.assumptions0
{'commutative': True, 'complex': True, 'extended_negative': False,
'extended_nonnegative': True, 'extended_nonpositive': False,
'extended_nonzero': True, 'extended_positive': True, 'extended_real':
True, 'finite': True, 'hermitian': True, 'imaginary': False,
'infinite': False, 'negative': False, 'nonnegative': True,
'nonpositive': False, 'nonzero': True, 'positive': True, 'real':
True, 'zero': False}
"""
return {}
def compare(self, other):
"""
Return -1, 0, 1 if the object is smaller, equal, or greater than other.
Not in the mathematical sense. If the object is of a different type
from the "other" then their classes are ordered according to
the sorted_classes list.
Examples
========
>>> from sympy.abc import x, y
>>> x.compare(y)
-1
>>> x.compare(x)
0
>>> y.compare(x)
1
"""
# all redefinitions of __cmp__ method should start with the
# following lines:
if self is other:
return 0
n1 = self.__class__
n2 = other.__class__
c = (n1 > n2) - (n1 < n2)
if c:
return c
#
st = self._hashable_content()
ot = other._hashable_content()
c = (len(st) > len(ot)) - (len(st) < len(ot))
if c:
return c
for l, r in zip(st, ot):
l = Basic(*l) if isinstance(l, frozenset) else l
r = Basic(*r) if isinstance(r, frozenset) else r
if isinstance(l, Basic):
c = l.compare(r)
else:
c = (l > r) - (l < r)
if c:
return c
return 0
@staticmethod
def _compare_pretty(a, b):
from sympy.series.order import Order
if isinstance(a, Order) and not isinstance(b, Order):
return 1
if not isinstance(a, Order) and isinstance(b, Order):
return -1
if a.is_Rational and b.is_Rational:
l = a.p * b.q
r = b.p * a.q
return (l > r) - (l < r)
else:
from sympy.core.symbol import Wild
p1, p2, p3 = Wild("p1"), Wild("p2"), Wild("p3")
r_a = a.match(p1 * p2**p3)
if r_a and p3 in r_a:
a3 = r_a[p3]
r_b = b.match(p1 * p2**p3)
if r_b and p3 in r_b:
b3 = r_b[p3]
c = Basic.compare(a3, b3)
if c != 0:
return c
return Basic.compare(a, b)
@classmethod
def fromiter(cls, args, **assumptions):
"""
Create a new object from an iterable.
This is a convenience function that allows one to create objects from
any iterable, without having to convert to a list or tuple first.
Examples
========
>>> from sympy import Tuple
>>> Tuple.fromiter(i for i in range(5))
(0, 1, 2, 3, 4)
"""
return cls(*tuple(args), **assumptions)
@classmethod
def class_key(cls):
"""Nice order of classes. """
return 5, 0, cls.__name__
@cacheit
def sort_key(self, order=None):
"""
Return a sort key.
Examples
========
>>> from sympy.core import S, I
>>> sorted([S(1)/2, I, -I], key=lambda x: x.sort_key())
[1/2, -I, I]
>>> S("[x, 1/x, 1/x**2, x**2, x**(1/2), x**(1/4), x**(3/2)]")
[x, 1/x, x**(-2), x**2, sqrt(x), x**(1/4), x**(3/2)]
>>> sorted(_, key=lambda x: x.sort_key())
[x**(-2), 1/x, x**(1/4), sqrt(x), x, x**(3/2), x**2]
"""
# XXX: remove this when issue 5169 is fixed
def inner_key(arg):
if isinstance(arg, Basic):
return arg.sort_key(order)
else:
return arg
args = self._sorted_args
args = len(args), tuple([inner_key(arg) for arg in args])
return self.class_key(), args, S.One.sort_key(), S.One
def __eq__(self, other):
"""Return a boolean indicating whether a == b on the basis of
their symbolic trees.
This is the same as a.compare(b) == 0 but faster.
Notes
=====
If a class that overrides __eq__() needs to retain the
implementation of __hash__() from a parent class, the
interpreter must be told this explicitly by setting __hash__ =
<ParentClass>.__hash__. Otherwise the inheritance of __hash__()
will be blocked, just as if __hash__ had been explicitly set to
None.
References
==========
from http://docs.python.org/dev/reference/datamodel.html#object.__hash__
"""
if self is other:
return True
tself = type(self)
tother = type(other)
if tself is not tother:
try:
other = _sympify(other)
tother = type(other)
except SympifyError:
return NotImplemented
# As long as we have the ordering of classes (sympy.core),
# comparing types will be slow in Python 2, because it uses
# __cmp__. Until we can remove it
# (https://github.com/sympy/sympy/issues/4269), we only compare
# types in Python 2 directly if they actually have __ne__.
if type(tself).__ne__ is not type.__ne__:
if tself != tother:
return False
elif tself is not tother:
return False
return self._hashable_content() == other._hashable_content()
def __ne__(self, other):
"""``a != b`` -> Compare two symbolic trees and see whether they are different
this is the same as:
``a.compare(b) != 0``
but faster
"""
return not self == other
def dummy_eq(self, other, symbol=None):
"""
Compare two expressions and handle dummy symbols.
Examples
========
>>> from sympy import Dummy
>>> from sympy.abc import x, y
>>> u = Dummy('u')
>>> (u**2 + 1).dummy_eq(x**2 + 1)
True
>>> (u**2 + 1) == (x**2 + 1)
False
>>> (u**2 + y).dummy_eq(x**2 + y, x)
True
>>> (u**2 + y).dummy_eq(x**2 + y, y)
False
"""
s = self.as_dummy()
o = _sympify(other)
o = o.as_dummy()
dummy_symbols = [i for i in s.free_symbols if i.is_Dummy]
if len(dummy_symbols) == 1:
dummy = dummy_symbols.pop()
else:
return s == o
if symbol is None:
symbols = o.free_symbols
if len(symbols) == 1:
symbol = symbols.pop()
else:
return s == o
tmp = dummy.__class__()
return s.xreplace({dummy: tmp}) == o.xreplace({symbol: tmp})
def atoms(self, *types):
"""Returns the atoms that form the current object.
By default, only objects that are truly atomic and can't
be divided into smaller pieces are returned: symbols, numbers,
and number symbols like I and pi. It is possible to request
atoms of any type, however, as demonstrated below.
Examples
========
>>> from sympy import I, pi, sin
>>> from sympy.abc import x, y
>>> (1 + x + 2*sin(y + I*pi)).atoms()
{1, 2, I, pi, x, y}
If one or more types are given, the results will contain only
those types of atoms.
>>> from sympy import Number, NumberSymbol, Symbol
>>> (1 + x + 2*sin(y + I*pi)).atoms(Symbol)
{x, y}
>>> (1 + x + 2*sin(y + I*pi)).atoms(Number)
{1, 2}
>>> (1 + x + 2*sin(y + I*pi)).atoms(Number, NumberSymbol)
{1, 2, pi}
>>> (1 + x + 2*sin(y + I*pi)).atoms(Number, NumberSymbol, I)
{1, 2, I, pi}
Note that I (imaginary unit) and zoo (complex infinity) are special
types of number symbols and are not part of the NumberSymbol class.
The type can be given implicitly, too:
>>> (1 + x + 2*sin(y + I*pi)).atoms(x) # x is a Symbol
{x, y}
Be careful to check your assumptions when using the implicit option
since ``S(1).is_Integer = True`` but ``type(S(1))`` is ``One``, a special type
of sympy atom, while ``type(S(2))`` is type ``Integer`` and will find all
integers in an expression:
>>> from sympy import S
>>> (1 + x + 2*sin(y + I*pi)).atoms(S(1))
{1}
>>> (1 + x + 2*sin(y + I*pi)).atoms(S(2))
{1, 2}
Finally, arguments to atoms() can select more than atomic atoms: any
sympy type (loaded in core/__init__.py) can be listed as an argument
and those types of "atoms" as found in scanning the arguments of the
expression recursively:
>>> from sympy import Function, Mul
>>> from sympy.core.function import AppliedUndef
>>> f = Function('f')
>>> (1 + f(x) + 2*sin(y + I*pi)).atoms(Function)
{f(x), sin(y + I*pi)}
>>> (1 + f(x) + 2*sin(y + I*pi)).atoms(AppliedUndef)
{f(x)}
>>> (1 + x + 2*sin(y + I*pi)).atoms(Mul)
{I*pi, 2*sin(y + I*pi)}
"""
if types:
types = tuple(
[t if isinstance(t, type) else type(t) for t in types])
nodes = preorder_traversal(self)
if types:
result = {node for node in nodes if isinstance(node, types)}
else:
result = {node for node in nodes if not node.args}
return result
@property
def free_symbols(self):
"""Return from the atoms of self those which are free symbols.
For most expressions, all symbols are free symbols. For some classes
this is not true. e.g. Integrals use Symbols for the dummy variables
which are bound variables, so Integral has a method to return all
symbols except those. Derivative keeps track of symbols with respect
to which it will perform a derivative; those are
bound variables, too, so it has its own free_symbols method.
Any other method that uses bound variables should implement a
free_symbols method."""
return set().union(*[a.free_symbols for a in self.args])
@property
def expr_free_symbols(self):
return set()
def as_dummy(self):
"""Return the expression with any objects having structurally
bound symbols replaced with unique, canonical symbols within
the object in which they appear and having only the default
assumption for commutativity being True. When applied to a
symbol a new symbol having only the same commutativity will be
returned.
Examples
========
>>> from sympy import Integral, Symbol
>>> from sympy.abc import x
>>> r = Symbol('r', real=True)
>>> Integral(r, (r, x)).as_dummy()
Integral(_0, (_0, x))
>>> _.variables[0].is_real is None
True
>>> r.as_dummy()
_r
Notes
=====
Any object that has structurally bound variables should have
a property, `bound_symbols` that returns those symbols
appearing in the object.
"""
from sympy.core.symbol import Dummy, Symbol
def can(x):
# mask free that shadow bound
free = x.free_symbols
bound = set(x.bound_symbols)
d = {i: Dummy() for i in bound & free}
x = x.subs(d)
# replace bound with canonical names
x = x.xreplace(x.canonical_variables)
# return after undoing masking
return x.xreplace({v: k for k, v in d.items()})
if not self.has(Symbol):
return self
return self.replace(
lambda x: hasattr(x, 'bound_symbols'),
lambda x: can(x),
simultaneous=False)
@property
def canonical_variables(self):
"""Return a dictionary mapping any variable defined in
``self.bound_symbols`` to Symbols that do not clash
with any free symbols in the expression.
Examples
========
>>> from sympy import Lambda
>>> from sympy.abc import x
>>> Lambda(x, 2*x).canonical_variables
{x: _0}
"""
from sympy.utilities.iterables import numbered_symbols
if not hasattr(self, 'bound_symbols'):
return {}
dums = numbered_symbols('_')
reps = {}
# watch out for free symbol that are not in bound symbols;
# those that are in bound symbols are about to get changed
bound = self.bound_symbols
names = {i.name for i in self.free_symbols - set(bound)}
for b in bound:
d = next(dums)
if b.is_Symbol:
while d.name in names:
d = next(dums)
reps[b] = d
return reps
def rcall(self, *args):
"""Apply on the argument recursively through the expression tree.
This method is used to simulate a common abuse of notation for
operators. For instance in SymPy the the following will not work:
``(x+Lambda(y, 2*y))(z) == x+2*z``,
however you can use
>>> from sympy import Lambda
>>> from sympy.abc import x, y, z
>>> (x + Lambda(y, 2*y)).rcall(z)
x + 2*z
"""
return Basic._recursive_call(self, args)
@staticmethod
def _recursive_call(expr_to_call, on_args):
"""Helper for rcall method."""
from sympy import Symbol
def the_call_method_is_overridden(expr):
for cls in getmro(type(expr)):
if '__call__' in cls.__dict__:
return cls != Basic
if callable(expr_to_call) and the_call_method_is_overridden(expr_to_call):
if isinstance(expr_to_call, Symbol): # XXX When you call a Symbol it is
return expr_to_call # transformed into an UndefFunction
else:
return expr_to_call(*on_args)
elif expr_to_call.args:
args = [Basic._recursive_call(
sub, on_args) for sub in expr_to_call.args]
return type(expr_to_call)(*args)
else:
return expr_to_call
def is_hypergeometric(self, k):
from sympy.simplify import hypersimp
return hypersimp(self, k) is not None
@property
def is_comparable(self):
"""Return True if self can be computed to a real number
(or already is a real number) with precision, else False.
Examples
========
>>> from sympy import exp_polar, pi, I
>>> (I*exp_polar(I*pi/2)).is_comparable
True
>>> (I*exp_polar(I*pi*2)).is_comparable
False
A False result does not mean that `self` cannot be rewritten
into a form that would be comparable. For example, the
difference computed below is zero but without simplification
it does not evaluate to a zero with precision:
>>> e = 2**pi*(1 + 2**pi)
>>> dif = e - e.expand()
>>> dif.is_comparable
False
>>> dif.n(2)._prec
1
"""
is_extended_real = self.is_extended_real
if is_extended_real is False:
return False
if not self.is_number:
return False
# don't re-eval numbers that are already evaluated since
# this will create spurious precision
n, i = [p.evalf(2) if not p.is_Number else p
for p in self.as_real_imag()]
if not (i.is_Number and n.is_Number):
return False
if i:
# if _prec = 1 we can't decide and if not,
# the answer is False because numbers with
# imaginary parts can't be compared
# so return False
return False
else:
return n._prec != 1
@property
def func(self):
"""
The top-level function in an expression.
The following should hold for all objects::
>> x == x.func(*x.args)
Examples
========
>>> from sympy.abc import x
>>> a = 2*x
>>> a.func
<class 'sympy.core.mul.Mul'>
>>> a.args
(2, x)
>>> a.func(*a.args)
2*x
>>> a == a.func(*a.args)
True
"""
return self.__class__
@property
def args(self):
"""Returns a tuple of arguments of 'self'.
Examples
========
>>> from sympy import cot
>>> from sympy.abc import x, y
>>> cot(x).args
(x,)
>>> cot(x).args[0]
x
>>> (x*y).args
(x, y)
>>> (x*y).args[1]
y
Notes
=====
Never use self._args, always use self.args.
Only use _args in __new__ when creating a new function.
Don't override .args() from Basic (so that it's easy to
change the interface in the future if needed).
"""
return self._args
@property
def _sorted_args(self):
"""
The same as ``args``. Derived classes which don't fix an
order on their arguments should override this method to
produce the sorted representation.
"""
return self.args
def as_content_primitive(self, radical=False, clear=True):
"""A stub to allow Basic args (like Tuple) to be skipped when computing
the content and primitive components of an expression.
See Also
========
sympy.core.expr.Expr.as_content_primitive
"""
return S.One, self
def subs(self, *args, **kwargs):
"""
Substitutes old for new in an expression after sympifying args.
`args` is either:
- two arguments, e.g. foo.subs(old, new)
- one iterable argument, e.g. foo.subs(iterable). The iterable may be
o an iterable container with (old, new) pairs. In this case the
replacements are processed in the order given with successive
patterns possibly affecting replacements already made.
o a dict or set whose key/value items correspond to old/new pairs.
In this case the old/new pairs will be sorted by op count and in
case of a tie, by number of args and the default_sort_key. The
resulting sorted list is then processed as an iterable container
(see previous).
If the keyword ``simultaneous`` is True, the subexpressions will not be
evaluated until all the substitutions have been made.
Examples
========
>>> from sympy import pi, exp, limit, oo
>>> from sympy.abc import x, y
>>> (1 + x*y).subs(x, pi)
pi*y + 1
>>> (1 + x*y).subs({x:pi, y:2})
1 + 2*pi
>>> (1 + x*y).subs([(x, pi), (y, 2)])
1 + 2*pi
>>> reps = [(y, x**2), (x, 2)]
>>> (x + y).subs(reps)
6
>>> (x + y).subs(reversed(reps))
x**2 + 2
>>> (x**2 + x**4).subs(x**2, y)
y**2 + y
To replace only the x**2 but not the x**4, use xreplace:
>>> (x**2 + x**4).xreplace({x**2: y})
x**4 + y
To delay evaluation until all substitutions have been made,
set the keyword ``simultaneous`` to True:
>>> (x/y).subs([(x, 0), (y, 0)])
0
>>> (x/y).subs([(x, 0), (y, 0)], simultaneous=True)
nan
This has the added feature of not allowing subsequent substitutions
to affect those already made:
>>> ((x + y)/y).subs({x + y: y, y: x + y})
1
>>> ((x + y)/y).subs({x + y: y, y: x + y}, simultaneous=True)
y/(x + y)
In order to obtain a canonical result, unordered iterables are
sorted by count_op length, number of arguments and by the
default_sort_key to break any ties. All other iterables are left
unsorted.
>>> from sympy import sqrt, sin, cos
>>> from sympy.abc import a, b, c, d, e
>>> A = (sqrt(sin(2*x)), a)
>>> B = (sin(2*x), b)
>>> C = (cos(2*x), c)
>>> D = (x, d)
>>> E = (exp(x), e)
>>> expr = sqrt(sin(2*x))*sin(exp(x)*x)*cos(2*x) + sin(2*x)
>>> expr.subs(dict([A, B, C, D, E]))
a*c*sin(d*e) + b
The resulting expression represents a literal replacement of the
old arguments with the new arguments. This may not reflect the
limiting behavior of the expression:
>>> (x**3 - 3*x).subs({x: oo})
nan
>>> limit(x**3 - 3*x, x, oo)
oo
If the substitution will be followed by numerical
evaluation, it is better to pass the substitution to
evalf as
>>> (1/x).evalf(subs={x: 3.0}, n=21)
0.333333333333333333333
rather than
>>> (1/x).subs({x: 3.0}).evalf(21)
0.333333333333333314830
as the former will ensure that the desired level of precision is
obtained.
See Also
========
replace: replacement capable of doing wildcard-like matching,
parsing of match, and conditional replacements
xreplace: exact node replacement in expr tree; also capable of
using matching rules
sympy.core.evalf.EvalfMixin.evalf: calculates the given formula to a desired level of precision
"""
from sympy.core.compatibility import _nodes, default_sort_key
from sympy.core.containers import Dict
from sympy.core.symbol import Dummy, Symbol
from sympy.utilities.misc import filldedent
unordered = False
if len(args) == 1:
sequence = args[0]
if isinstance(sequence, set):
unordered = True
elif isinstance(sequence, (Dict, Mapping)):
unordered = True
sequence = sequence.items()
elif not iterable(sequence):
raise ValueError(filldedent("""
When a single argument is passed to subs
it should be a dictionary of old: new pairs or an iterable
of (old, new) tuples."""))
elif len(args) == 2:
sequence = [args]
else:
raise ValueError("subs accepts either 1 or 2 arguments")
sequence = list(sequence)
for i, s in enumerate(sequence):
if isinstance(s[0], str):
# when old is a string we prefer Symbol
s = Symbol(s[0]), s[1]
try:
s = [sympify(_, strict=not isinstance(_, str))
for _ in s]
except SympifyError:
# if it can't be sympified, skip it
sequence[i] = None
continue
# skip if there is no change
sequence[i] = None if _aresame(*s) else tuple(s)
sequence = list(filter(None, sequence))
if unordered:
sequence = dict(sequence)
# order so more complex items are first and items
# of identical complexity are ordered so
# f(x) < f(y) < x < y
# \___ 2 __/ \_1_/ <- number of nodes
#
# For more complex ordering use an unordered sequence.
k = list(ordered(sequence, default=False, keys=(
lambda x: -_nodes(x),
lambda x: default_sort_key(x),
)))
sequence = [(k, sequence[k]) for k in k]
if kwargs.pop('simultaneous', False): # XXX should this be the default for dict subs?
reps = {}
rv = self
kwargs['hack2'] = True
m = Dummy('subs_m')
for old, new in sequence:
com = new.is_commutative
if com is None:
com = True
d = Dummy('subs_d', commutative=com)
# using d*m so Subs will be used on dummy variables
# in things like Derivative(f(x, y), x) in which x
# is both free and bound
rv = rv._subs(old, d*m, **kwargs)
if not isinstance(rv, Basic):
break
reps[d] = new
reps[m] = S.One # get rid of m
return rv.xreplace(reps)
else:
rv = self
for old, new in sequence:
rv = rv._subs(old, new, **kwargs)
if not isinstance(rv, Basic):
break
return rv
@cacheit
def _subs(self, old, new, **hints):
"""Substitutes an expression old -> new.
If self is not equal to old then _eval_subs is called.
If _eval_subs doesn't want to make any special replacement
then a None is received which indicates that the fallback
should be applied wherein a search for replacements is made
amongst the arguments of self.
>>> from sympy import Add
>>> from sympy.abc import x, y, z
Examples
========
Add's _eval_subs knows how to target x + y in the following
so it makes the change:
>>> (x + y + z).subs(x + y, 1)
z + 1
Add's _eval_subs doesn't need to know how to find x + y in
the following:
>>> Add._eval_subs(z*(x + y) + 3, x + y, 1) is None
True
The returned None will cause the fallback routine to traverse the args and
pass the z*(x + y) arg to Mul where the change will take place and the
substitution will succeed:
>>> (z*(x + y) + 3).subs(x + y, 1)
z + 3
** Developers Notes **
An _eval_subs routine for a class should be written if:
1) any arguments are not instances of Basic (e.g. bool, tuple);
2) some arguments should not be targeted (as in integration
variables);
3) if there is something other than a literal replacement
that should be attempted (as in Piecewise where the condition
may be updated without doing a replacement).
If it is overridden, here are some special cases that might arise:
1) If it turns out that no special change was made and all
the original sub-arguments should be checked for
replacements then None should be returned.
2) If it is necessary to do substitutions on a portion of
the expression then _subs should be called. _subs will
handle the case of any sub-expression being equal to old
(which usually would not be the case) while its fallback
will handle the recursion into the sub-arguments. For
example, after Add's _eval_subs removes some matching terms
it must process the remaining terms so it calls _subs
on each of the un-matched terms and then adds them
onto the terms previously obtained.
3) If the initial expression should remain unchanged then
the original expression should be returned. (Whenever an
expression is returned, modified or not, no further
substitution of old -> new is attempted.) Sum's _eval_subs
routine uses this strategy when a substitution is attempted
on any of its summation variables.
"""
def fallback(self, old, new):
"""
Try to replace old with new in any of self's arguments.
"""
hit = False
args = list(self.args)
for i, arg in enumerate(args):
if not hasattr(arg, '_eval_subs'):
continue
arg = arg._subs(old, new, **hints)
if not _aresame(arg, args[i]):
hit = True
args[i] = arg
if hit:
rv = self.func(*args)
hack2 = hints.get('hack2', False)
if hack2 and self.is_Mul and not rv.is_Mul: # 2-arg hack
coeff = S.One
nonnumber = []
for i in args:
if i.is_Number:
coeff *= i
else:
nonnumber.append(i)
nonnumber = self.func(*nonnumber)
if coeff is S.One:
return nonnumber
else:
return self.func(coeff, nonnumber, evaluate=False)
return rv
return self
if _aresame(self, old):
return new
rv = self._eval_subs(old, new)
if rv is None:
rv = fallback(self, old, new)
return rv
def _eval_subs(self, old, new):
"""Override this stub if you want to do anything more than
attempt a replacement of old with new in the arguments of self.
See also
========
_subs
"""
return None
def xreplace(self, rule):
"""
Replace occurrences of objects within the expression.
Parameters
==========
rule : dict-like
Expresses a replacement rule
Returns
=======
xreplace : the result of the replacement
Examples
========
>>> from sympy import symbols, pi, exp
>>> x, y, z = symbols('x y z')
>>> (1 + x*y).xreplace({x: pi})
pi*y + 1
>>> (1 + x*y).xreplace({x: pi, y: 2})
1 + 2*pi
Replacements occur only if an entire node in the expression tree is
matched:
>>> (x*y + z).xreplace({x*y: pi})
z + pi
>>> (x*y*z).xreplace({x*y: pi})
x*y*z
>>> (2*x).xreplace({2*x: y, x: z})
y
>>> (2*2*x).xreplace({2*x: y, x: z})
4*z
>>> (x + y + 2).xreplace({x + y: 2})
x + y + 2
>>> (x + 2 + exp(x + 2)).xreplace({x + 2: y})
x + exp(y) + 2
xreplace doesn't differentiate between free and bound symbols. In the
following, subs(x, y) would not change x since it is a bound symbol,
but xreplace does:
>>> from sympy import Integral
>>> Integral(x, (x, 1, 2*x)).xreplace({x: y})
Integral(y, (y, 1, 2*y))
Trying to replace x with an expression raises an error:
>>> Integral(x, (x, 1, 2*x)).xreplace({x: 2*y}) # doctest: +SKIP
ValueError: Invalid limits given: ((2*y, 1, 4*y),)
See Also
========
replace: replacement capable of doing wildcard-like matching,
parsing of match, and conditional replacements
subs: substitution of subexpressions as defined by the objects
themselves.
"""
value, _ = self._xreplace(rule)
return value
def _xreplace(self, rule):
"""
Helper for xreplace. Tracks whether a replacement actually occurred.
"""
if self in rule:
return rule[self], True
elif rule:
args = []
changed = False
for a in self.args:
_xreplace = getattr(a, '_xreplace', None)
if _xreplace is not None:
a_xr = _xreplace(rule)
args.append(a_xr[0])
changed |= a_xr[1]
else:
args.append(a)
args = tuple(args)
if changed:
return self.func(*args), True
return self, False
@cacheit
def has(self, *patterns):
"""
Test whether any subexpression matches any of the patterns.
Examples
========
>>> from sympy import sin
>>> from sympy.abc import x, y, z
>>> (x**2 + sin(x*y)).has(z)
False
>>> (x**2 + sin(x*y)).has(x, y, z)
True
>>> x.has(x)
True
Note ``has`` is a structural algorithm with no knowledge of
mathematics. Consider the following half-open interval:
>>> from sympy.sets import Interval
>>> i = Interval.Lopen(0, 5); i
Interval.Lopen(0, 5)
>>> i.args
(0, 5, True, False)
>>> i.has(4) # there is no "4" in the arguments
False
>>> i.has(0) # there *is* a "0" in the arguments
True
Instead, use ``contains`` to determine whether a number is in the
interval or not:
>>> i.contains(4)
True
>>> i.contains(0)
False
Note that ``expr.has(*patterns)`` is exactly equivalent to
``any(expr.has(p) for p in patterns)``. In particular, ``False`` is
returned when the list of patterns is empty.
>>> x.has()
False
"""
return any(self._has(pattern) for pattern in patterns)
def _has(self, pattern):
"""Helper for .has()"""
from sympy.core.function import UndefinedFunction, Function
if isinstance(pattern, UndefinedFunction):
return any(f.func == pattern or f == pattern
for f in self.atoms(Function, UndefinedFunction))
pattern = _sympify(pattern)
if isinstance(pattern, BasicMeta):
return any(isinstance(arg, pattern)
for arg in preorder_traversal(self))
_has_matcher = getattr(pattern, '_has_matcher', None)
if _has_matcher is not None:
match = _has_matcher()
return any(match(arg) for arg in preorder_traversal(self))
else:
return any(arg == pattern for arg in preorder_traversal(self))
def _has_matcher(self):
"""Helper for .has()"""
return lambda other: self == other
def replace(self, query, value, map=False, simultaneous=True, exact=None):
"""
Replace matching subexpressions of ``self`` with ``value``.
If ``map = True`` then also return the mapping {old: new} where ``old``
was a sub-expression found with query and ``new`` is the replacement
value for it. If the expression itself doesn't match the query, then
the returned value will be ``self.xreplace(map)`` otherwise it should
be ``self.subs(ordered(map.items()))``.
Traverses an expression tree and performs replacement of matching
subexpressions from the bottom to the top of the tree. The default
approach is to do the replacement in a simultaneous fashion so
changes made are targeted only once. If this is not desired or causes
problems, ``simultaneous`` can be set to False.
In addition, if an expression containing more than one Wild symbol
is being used to match subexpressions and the ``exact`` flag is None
it will be set to True so the match will only succeed if all non-zero
values are received for each Wild that appears in the match pattern.
Setting this to False accepts a match of 0; while setting it True
accepts all matches that have a 0 in them. See example below for
cautions.
The list of possible combinations of queries and replacement values
is listed below:
Examples
========
Initial setup
>>> from sympy import log, sin, cos, tan, Wild, Mul, Add
>>> from sympy.abc import x, y
>>> f = log(sin(x)) + tan(sin(x**2))
1.1. type -> type
obj.replace(type, newtype)
When object of type ``type`` is found, replace it with the
result of passing its argument(s) to ``newtype``.
>>> f.replace(sin, cos)
log(cos(x)) + tan(cos(x**2))
>>> sin(x).replace(sin, cos, map=True)
(cos(x), {sin(x): cos(x)})
>>> (x*y).replace(Mul, Add)
x + y
1.2. type -> func
obj.replace(type, func)
When object of type ``type`` is found, apply ``func`` to its
argument(s). ``func`` must be written to handle the number
of arguments of ``type``.
>>> f.replace(sin, lambda arg: sin(2*arg))
log(sin(2*x)) + tan(sin(2*x**2))
>>> (x*y).replace(Mul, lambda *args: sin(2*Mul(*args)))
sin(2*x*y)
2.1. pattern -> expr
obj.replace(pattern(wild), expr(wild))
Replace subexpressions matching ``pattern`` with the expression
written in terms of the Wild symbols in ``pattern``.
>>> a, b = map(Wild, 'ab')
>>> f.replace(sin(a), tan(a))
log(tan(x)) + tan(tan(x**2))
>>> f.replace(sin(a), tan(a/2))
log(tan(x/2)) + tan(tan(x**2/2))
>>> f.replace(sin(a), a)
log(x) + tan(x**2)
>>> (x*y).replace(a*x, a)
y
Matching is exact by default when more than one Wild symbol
is used: matching fails unless the match gives non-zero
values for all Wild symbols:
>>> (2*x + y).replace(a*x + b, b - a)
y - 2
>>> (2*x).replace(a*x + b, b - a)
2*x
When set to False, the results may be non-intuitive:
>>> (2*x).replace(a*x + b, b - a, exact=False)
2/x
2.2. pattern -> func
obj.replace(pattern(wild), lambda wild: expr(wild))
All behavior is the same as in 2.1 but now a function in terms of
pattern variables is used rather than an expression:
>>> f.replace(sin(a), lambda a: sin(2*a))
log(sin(2*x)) + tan(sin(2*x**2))
3.1. func -> func
obj.replace(filter, func)
Replace subexpression ``e`` with ``func(e)`` if ``filter(e)``
is True.
>>> g = 2*sin(x**3)
>>> g.replace(lambda expr: expr.is_Number, lambda expr: expr**2)
4*sin(x**9)
The expression itself is also targeted by the query but is done in
such a fashion that changes are not made twice.
>>> e = x*(x*y + 1)
>>> e.replace(lambda x: x.is_Mul, lambda x: 2*x)
2*x*(2*x*y + 1)
When matching a single symbol, `exact` will default to True, but
this may or may not be the behavior that is desired:
Here, we want `exact=False`:
>>> from sympy import Function
>>> f = Function('f')
>>> e = f(1) + f(0)
>>> q = f(a), lambda a: f(a + 1)
>>> e.replace(*q, exact=False)
f(1) + f(2)
>>> e.replace(*q, exact=True)
f(0) + f(2)
But here, the nature of matching makes selecting
the right setting tricky:
>>> e = x**(1 + y)
>>> (x**(1 + y)).replace(x**(1 + a), lambda a: x**-a, exact=False)
x
>>> (x**(1 + y)).replace(x**(1 + a), lambda a: x**-a, exact=True)
x**(-x - y + 1)
>>> (x**y).replace(x**(1 + a), lambda a: x**-a, exact=False)
x
>>> (x**y).replace(x**(1 + a), lambda a: x**-a, exact=True)
x**(1 - y)
It is probably better to use a different form of the query
that describes the target expression more precisely:
>>> (1 + x**(1 + y)).replace(
... lambda x: x.is_Pow and x.exp.is_Add and x.exp.args[0] == 1,
... lambda x: x.base**(1 - (x.exp - 1)))
...
x**(1 - y) + 1
See Also
========
subs: substitution of subexpressions as defined by the objects
themselves.
xreplace: exact node replacement in expr tree; also capable of
using matching rules
"""
from sympy.core.symbol import Wild
try:
query = _sympify(query)
except SympifyError:
pass
try:
value = _sympify(value)
except SympifyError:
pass
if isinstance(query, type):
_query = lambda expr: isinstance(expr, query)
if isinstance(value, type):
_value = lambda expr, result: value(*expr.args)
elif callable(value):
_value = lambda expr, result: value(*expr.args)
else:
raise TypeError(
"given a type, replace() expects another "
"type or a callable")
elif isinstance(query, Basic):
_query = lambda expr: expr.match(query)
if exact is None:
exact = (len(query.atoms(Wild)) > 1)
if isinstance(value, Basic):
if exact:
_value = lambda expr, result: (value.subs(result)
if all(result.values()) else expr)
else:
_value = lambda expr, result: value.subs(result)
elif callable(value):
# match dictionary keys get the trailing underscore stripped
# from them and are then passed as keywords to the callable;
# if ``exact`` is True, only accept match if there are no null
# values amongst those matched.
if exact:
_value = lambda expr, result: (value(**
{str(k)[:-1]: v for k, v in result.items()})
if all(val for val in result.values()) else expr)
else:
_value = lambda expr, result: value(**
{str(k)[:-1]: v for k, v in result.items()})
else:
raise TypeError(
"given an expression, replace() expects "
"another expression or a callable")
elif callable(query):
_query = query
if callable(value):
_value = lambda expr, result: value(expr)
else:
raise TypeError(
"given a callable, replace() expects "
"another callable")
else:
raise TypeError(
"first argument to replace() must be a "
"type, an expression or a callable")
def walk(rv, F):
"""Apply ``F`` to args and then to result.
"""
args = getattr(rv, 'args', None)
if args is not None:
if args:
newargs = tuple([walk(a, F) for a in args])
if args != newargs:
rv = rv.func(*newargs)
if simultaneous:
# if rv is something that was already
# matched (that was changed) then skip
# applying F again
for i, e in enumerate(args):
if rv == e and e != newargs[i]:
return rv
rv = F(rv)
return rv
mapping = {} # changes that took place
def rec_replace(expr):
result = _query(expr)
if result or result == {}:
v = _value(expr, result)
if v is not None and v != expr:
if map:
mapping[expr] = v
expr = v
return expr
rv = walk(self, rec_replace)
return (rv, mapping) if map else rv
def find(self, query, group=False):
"""Find all subexpressions matching a query. """
query = _make_find_query(query)
results = list(filter(query, preorder_traversal(self)))
if not group:
return set(results)
else:
groups = {}
for result in results:
if result in groups:
groups[result] += 1
else:
groups[result] = 1
return groups
def count(self, query):
"""Count the number of matching subexpressions. """
query = _make_find_query(query)
return sum(bool(query(sub)) for sub in preorder_traversal(self))
def matches(self, expr, repl_dict={}, old=False):
"""
Helper method for match() that looks for a match between Wild symbols
in self and expressions in expr.
Examples
========
>>> from sympy import symbols, Wild, Basic
>>> a, b, c = symbols('a b c')
>>> x = Wild('x')
>>> Basic(a + x, x).matches(Basic(a + b, c)) is None
True
>>> Basic(a + x, x).matches(Basic(a + b + c, b + c))
{x_: b + c}
"""
repl_dict = repl_dict.copy()
expr = sympify(expr)
if not isinstance(expr, self.__class__):
return None
if self == expr:
return repl_dict
if len(self.args) != len(expr.args):
return None
d = repl_dict.copy()
for arg, other_arg in zip(self.args, expr.args):
if arg == other_arg:
continue
d = arg.xreplace(d).matches(other_arg, d, old=old)
if d is None:
return None
return d
def match(self, pattern, old=False):
"""
Pattern matching.
Wild symbols match all.
Return ``None`` when expression (self) does not match
with pattern. Otherwise return a dictionary such that::
pattern.xreplace(self.match(pattern)) == self
Examples
========
>>> from sympy import Wild, Sum
>>> from sympy.abc import x, y
>>> p = Wild("p")
>>> q = Wild("q")
>>> r = Wild("r")
>>> e = (x+y)**(x+y)
>>> e.match(p**p)
{p_: x + y}
>>> e.match(p**q)
{p_: x + y, q_: x + y}
>>> e = (2*x)**2
>>> e.match(p*q**r)
{p_: 4, q_: x, r_: 2}
>>> (p*q**r).xreplace(e.match(p*q**r))
4*x**2
Structurally bound symbols are ignored during matching:
>>> Sum(x, (x, 1, 2)).match(Sum(y, (y, 1, p)))
{p_: 2}
But they can be identified if desired:
>>> Sum(x, (x, 1, 2)).match(Sum(q, (q, 1, p)))
{p_: 2, q_: x}
The ``old`` flag will give the old-style pattern matching where
expressions and patterns are essentially solved to give the
match. Both of the following give None unless ``old=True``:
>>> (x - 2).match(p - x, old=True)
{p_: 2*x - 2}
>>> (2/x).match(p*x, old=True)
{p_: 2/x**2}
"""
from sympy.core.symbol import Wild
from sympy.core.function import WildFunction
from sympy.utilities.misc import filldedent
pattern = sympify(pattern)
# match non-bound symbols
canonical = lambda x: x if x.is_Symbol else x.as_dummy()
m = canonical(pattern).matches(canonical(self), old=old)
if m is None:
return m
wild = pattern.atoms(Wild, WildFunction)
# sanity check
if set(m) - wild:
raise ValueError(filldedent('''
Some `matches` routine did not use a copy of repl_dict
and injected unexpected symbols. Report this as an
error at https://github.com/sympy/sympy/issues'''))
# now see if bound symbols were requested
bwild = wild - set(m)
if not bwild:
return m
# replace free-Wild symbols in pattern with match result
# so they will match but not be in the next match
wpat = pattern.xreplace(m)
# identify remaining bound wild
w = wpat.matches(self, old=old)
# add them to m
if w:
m.update(w)
# done
return m
def count_ops(self, visual=None):
"""wrapper for count_ops that returns the operation count."""
from sympy import count_ops
return count_ops(self, visual)
def doit(self, **hints):
"""Evaluate objects that are not evaluated by default like limits,
integrals, sums and products. All objects of this kind will be
evaluated recursively, unless some species were excluded via 'hints'
or unless the 'deep' hint was set to 'False'.
>>> from sympy import Integral
>>> from sympy.abc import x
>>> 2*Integral(x, x)
2*Integral(x, x)
>>> (2*Integral(x, x)).doit()
x**2
>>> (2*Integral(x, x)).doit(deep=False)
2*Integral(x, x)
"""
if hints.get('deep', True):
terms = [term.doit(**hints) if isinstance(term, Basic) else term
for term in self.args]
return self.func(*terms)
else:
return self
def simplify(self, **kwargs):
"""See the simplify function in sympy.simplify"""
from sympy.simplify import simplify
return simplify(self, **kwargs)
def _eval_rewrite(self, pattern, rule, **hints):
if self.is_Atom:
if hasattr(self, rule):
return getattr(self, rule)()
return self
if hints.get('deep', True):
args = [a._eval_rewrite(pattern, rule, **hints)
if isinstance(a, Basic) else a
for a in self.args]
else:
args = self.args
if pattern is None or isinstance(self, pattern):
if hasattr(self, rule):
rewritten = getattr(self, rule)(*args, **hints)
if rewritten is not None:
return rewritten
return self.func(*args) if hints.get('evaluate', True) else self
def _accept_eval_derivative(self, s):
# This method needs to be overridden by array-like objects
return s._visit_eval_derivative_scalar(self)
def _visit_eval_derivative_scalar(self, base):
# Base is a scalar
# Types are (base: scalar, self: scalar)
return base._eval_derivative(self)
def _visit_eval_derivative_array(self, base):
# Types are (base: array/matrix, self: scalar)
# Base is some kind of array/matrix,
# it should have `.applyfunc(lambda x: x.diff(self)` implemented:
return base._eval_derivative_array(self)
def _eval_derivative_n_times(self, s, n):
# This is the default evaluator for derivatives (as called by `diff`
# and `Derivative`), it will attempt a loop to derive the expression
# `n` times by calling the corresponding `_eval_derivative` method,
# while leaving the derivative unevaluated if `n` is symbolic. This
# method should be overridden if the object has a closed form for its
# symbolic n-th derivative.
from sympy import Integer
if isinstance(n, (int, Integer)):
obj = self
for i in range(n):
obj2 = obj._accept_eval_derivative(s)
if obj == obj2 or obj2 is None:
break
obj = obj2
return obj2
else:
return None
def rewrite(self, *args, **hints):
""" Rewrite functions in terms of other functions.
Rewrites expression containing applications of functions
of one kind in terms of functions of different kind. For
example you can rewrite trigonometric functions as complex
exponentials or combinatorial functions as gamma function.
As a pattern this function accepts a list of functions to
to rewrite (instances of DefinedFunction class). As rule
you can use string or a destination function instance (in
this case rewrite() will use the str() function).
There is also the possibility to pass hints on how to rewrite
the given expressions. For now there is only one such hint
defined called 'deep'. When 'deep' is set to False it will
forbid functions to rewrite their contents.
Examples
========
>>> from sympy import sin, exp
>>> from sympy.abc import x
Unspecified pattern:
>>> sin(x).rewrite(exp)
-I*(exp(I*x) - exp(-I*x))/2
Pattern as a single function:
>>> sin(x).rewrite(sin, exp)
-I*(exp(I*x) - exp(-I*x))/2
Pattern as a list of functions:
>>> sin(x).rewrite([sin, ], exp)
-I*(exp(I*x) - exp(-I*x))/2
"""
if not args:
return self
else:
pattern = args[:-1]
if isinstance(args[-1], str):
rule = '_eval_rewrite_as_' + args[-1]
else:
# rewrite arg is usually a class but can also be a
# singleton (e.g. GoldenRatio) so we check
# __name__ or __class__.__name__
clsname = getattr(args[-1], "__name__", None)
if clsname is None:
clsname = args[-1].__class__.__name__
rule = '_eval_rewrite_as_' + clsname
if not pattern:
return self._eval_rewrite(None, rule, **hints)
else:
if iterable(pattern[0]):
pattern = pattern[0]
pattern = [p for p in pattern if self.has(p)]
if pattern:
return self._eval_rewrite(tuple(pattern), rule, **hints)
else:
return self
_constructor_postprocessor_mapping = {} # type: ignore
@classmethod
def _exec_constructor_postprocessors(cls, obj):
# WARNING: This API is experimental.
# This is an experimental API that introduces constructor
# postprosessors for SymPy Core elements. If an argument of a SymPy
# expression has a `_constructor_postprocessor_mapping` attribute, it will
# be interpreted as a dictionary containing lists of postprocessing
# functions for matching expression node names.
clsname = obj.__class__.__name__
postprocessors = defaultdict(list)
for i in obj.args:
try:
postprocessor_mappings = (
Basic._constructor_postprocessor_mapping[cls].items()
for cls in type(i).mro()
if cls in Basic._constructor_postprocessor_mapping
)
for k, v in chain.from_iterable(postprocessor_mappings):
postprocessors[k].extend([j for j in v if j not in postprocessors[k]])
except TypeError:
pass
for f in postprocessors.get(clsname, []):
obj = f(obj)
return obj
class Atom(Basic):
"""
A parent class for atomic things. An atom is an expression with no subexpressions.
Examples
========
Symbol, Number, Rational, Integer, ...
But not: Add, Mul, Pow, ...
"""
is_Atom = True
__slots__ = ()
def matches(self, expr, repl_dict={}, old=False):
if self == expr:
return repl_dict.copy()
def xreplace(self, rule, hack2=False):
return rule.get(self, self)
def doit(self, **hints):
return self
@classmethod
def class_key(cls):
return 2, 0, cls.__name__
@cacheit
def sort_key(self, order=None):
return self.class_key(), (1, (str(self),)), S.One.sort_key(), S.One
def _eval_simplify(self, **kwargs):
return self
@property
def _sorted_args(self):
# this is here as a safeguard against accidentally using _sorted_args
# on Atoms -- they cannot be rebuilt as atom.func(*atom._sorted_args)
# since there are no args. So the calling routine should be checking
# to see that this property is not called for Atoms.
raise AttributeError('Atoms have no args. It might be necessary'
' to make a check for Atoms in the calling code.')
def _aresame(a, b):
"""Return True if a and b are structurally the same, else False.
Examples
========
In SymPy (as in Python) two numbers compare the same if they
have the same underlying base-2 representation even though
they may not be the same type:
>>> from sympy import S
>>> 2.0 == S(2)
True
>>> 0.5 == S.Half
True
This routine was written to provide a query for such cases that
would give false when the types do not match:
>>> from sympy.core.basic import _aresame
>>> _aresame(S(2.0), S(2))
False
"""
from .numbers import Number
from .function import AppliedUndef, UndefinedFunction as UndefFunc
if isinstance(a, Number) and isinstance(b, Number):
return a == b and a.__class__ == b.__class__
for i, j in zip_longest(preorder_traversal(a), preorder_traversal(b)):
if i != j or type(i) != type(j):
if ((isinstance(i, UndefFunc) and isinstance(j, UndefFunc)) or
(isinstance(i, AppliedUndef) and isinstance(j, AppliedUndef))):
if i.class_key() != j.class_key():
return False
else:
return False
return True
def _atomic(e, recursive=False):
"""Return atom-like quantities as far as substitution is
concerned: Derivatives, Functions and Symbols. Don't
return any 'atoms' that are inside such quantities unless
they also appear outside, too, unless `recursive` is True.
Examples
========
>>> from sympy import Derivative, Function, cos
>>> from sympy.abc import x, y
>>> from sympy.core.basic import _atomic
>>> f = Function('f')
>>> _atomic(x + y)
{x, y}
>>> _atomic(x + f(y))
{x, f(y)}
>>> _atomic(Derivative(f(x), x) + cos(x) + y)
{y, cos(x), Derivative(f(x), x)}
"""
from sympy import Derivative, Function, Symbol
pot = preorder_traversal(e)
seen = set()
if isinstance(e, Basic):
free = getattr(e, "free_symbols", None)
if free is None:
return {e}
else:
return set()
atoms = set()
for p in pot:
if p in seen:
pot.skip()
continue
seen.add(p)
if isinstance(p, Symbol) and p in free:
atoms.add(p)
elif isinstance(p, (Derivative, Function)):
if not recursive:
pot.skip()
atoms.add(p)
return atoms
class preorder_traversal:
"""
Do a pre-order traversal of a tree.
This iterator recursively yields nodes that it has visited in a pre-order
fashion. That is, it yields the current node then descends through the
tree breadth-first to yield all of a node's children's pre-order
traversal.
For an expression, the order of the traversal depends on the order of
.args, which in many cases can be arbitrary.
Parameters
==========
node : sympy expression
The expression to traverse.
keys : (default None) sort key(s)
The key(s) used to sort args of Basic objects. When None, args of Basic
objects are processed in arbitrary order. If key is defined, it will
be passed along to ordered() as the only key(s) to use to sort the
arguments; if ``key`` is simply True then the default keys of ordered
will be used.
Yields
======
subtree : sympy expression
All of the subtrees in the tree.
Examples
========
>>> from sympy import symbols
>>> from sympy.core.basic import preorder_traversal
>>> x, y, z = symbols('x y z')
The nodes are returned in the order that they are encountered unless key
is given; simply passing key=True will guarantee that the traversal is
unique.
>>> list(preorder_traversal((x + y)*z, keys=None)) # doctest: +SKIP
[z*(x + y), z, x + y, y, x]
>>> list(preorder_traversal((x + y)*z, keys=True))
[z*(x + y), z, x + y, x, y]
"""
def __init__(self, node, keys=None):
self._skip_flag = False
self._pt = self._preorder_traversal(node, keys)
def _preorder_traversal(self, node, keys):
yield node
if self._skip_flag:
self._skip_flag = False
return
if isinstance(node, Basic):
if not keys and hasattr(node, '_argset'):
# LatticeOp keeps args as a set. We should use this if we
# don't care about the order, to prevent unnecessary sorting.
args = node._argset
else:
args = node.args
if keys:
if keys != True:
args = ordered(args, keys, default=False)
else:
args = ordered(args)
for arg in args:
yield from self._preorder_traversal(arg, keys)
elif iterable(node):
for item in node:
yield from self._preorder_traversal(item, keys)
def skip(self):
"""
Skip yielding current node's (last yielded node's) subtrees.
Examples
========
>>> from sympy.core import symbols
>>> from sympy.core.basic import preorder_traversal
>>> x, y, z = symbols('x y z')
>>> pt = preorder_traversal((x+y*z)*z)
>>> for i in pt:
... print(i)
... if i == x+y*z:
... pt.skip()
z*(x + y*z)
z
x + y*z
"""
self._skip_flag = True
def __next__(self):
return next(self._pt)
def __iter__(self):
return self
def _make_find_query(query):
"""Convert the argument of Basic.find() into a callable"""
try:
query = _sympify(query)
except SympifyError:
pass
if isinstance(query, type):
return lambda expr: isinstance(expr, query)
elif isinstance(query, Basic):
return lambda expr: expr.match(query) is not None
return query
|
9b83021a70b0c0172346ba7d537cc32db9cccf7acf52ac69043b162162f6b36c
|
from math import log as _log
from .sympify import _sympify
from .cache import cacheit
from .singleton import S
from .expr import Expr
from .evalf import PrecisionExhausted
from .function import (_coeff_isneg, expand_complex, expand_multinomial,
expand_mul)
from .logic import fuzzy_bool, fuzzy_not, fuzzy_and
from .compatibility import as_int, HAS_GMPY, gmpy
from .parameters import global_parameters
from sympy.utilities.iterables import sift
from sympy.utilities.exceptions import SymPyDeprecationWarning
from mpmath.libmp import sqrtrem as mpmath_sqrtrem
from math import sqrt as _sqrt
def isqrt(n):
"""Return the largest integer less than or equal to sqrt(n)."""
if n < 0:
raise ValueError("n must be nonnegative")
n = int(n)
# Fast path: with IEEE 754 binary64 floats and a correctly-rounded
# math.sqrt, int(math.sqrt(n)) works for any integer n satisfying 0 <= n <
# 4503599761588224 = 2**52 + 2**27. But Python doesn't guarantee either
# IEEE 754 format floats *or* correct rounding of math.sqrt, so check the
# answer and fall back to the slow method if necessary.
if n < 4503599761588224:
s = int(_sqrt(n))
if 0 <= n - s*s <= 2*s:
return s
return integer_nthroot(n, 2)[0]
def integer_nthroot(y, n):
"""
Return a tuple containing x = floor(y**(1/n))
and a boolean indicating whether the result is exact (that is,
whether x**n == y).
Examples
========
>>> from sympy import integer_nthroot
>>> integer_nthroot(16, 2)
(4, True)
>>> integer_nthroot(26, 2)
(5, False)
To simply determine if a number is a perfect square, the is_square
function should be used:
>>> from sympy.ntheory.primetest import is_square
>>> is_square(26)
False
See Also
========
sympy.ntheory.primetest.is_square
integer_log
"""
y, n = as_int(y), as_int(n)
if y < 0:
raise ValueError("y must be nonnegative")
if n < 1:
raise ValueError("n must be positive")
if HAS_GMPY and n < 2**63:
# Currently it works only for n < 2**63, else it produces TypeError
# sympy issue: https://github.com/sympy/sympy/issues/18374
# gmpy2 issue: https://github.com/aleaxit/gmpy/issues/257
if HAS_GMPY >= 2:
x, t = gmpy.iroot(y, n)
else:
x, t = gmpy.root(y, n)
return as_int(x), bool(t)
return _integer_nthroot_python(y, n)
def _integer_nthroot_python(y, n):
if y in (0, 1):
return y, True
if n == 1:
return y, True
if n == 2:
x, rem = mpmath_sqrtrem(y)
return int(x), not rem
if n > y:
return 1, False
# Get initial estimate for Newton's method. Care must be taken to
# avoid overflow
try:
guess = int(y**(1./n) + 0.5)
except OverflowError:
exp = _log(y, 2)/n
if exp > 53:
shift = int(exp - 53)
guess = int(2.0**(exp - shift) + 1) << shift
else:
guess = int(2.0**exp)
if guess > 2**50:
# Newton iteration
xprev, x = -1, guess
while 1:
t = x**(n - 1)
xprev, x = x, ((n - 1)*x + y//t)//n
if abs(x - xprev) < 2:
break
else:
x = guess
# Compensate
t = x**n
while t < y:
x += 1
t = x**n
while t > y:
x -= 1
t = x**n
return int(x), t == y # int converts long to int if possible
def integer_log(y, x):
r"""
Returns ``(e, bool)`` where e is the largest nonnegative integer
such that :math:`|y| \geq |x^e|` and ``bool`` is True if $y = x^e$.
Examples
========
>>> from sympy import integer_log
>>> integer_log(125, 5)
(3, True)
>>> integer_log(17, 9)
(1, False)
>>> integer_log(4, -2)
(2, True)
>>> integer_log(-125,-5)
(3, True)
See Also
========
integer_nthroot
sympy.ntheory.primetest.is_square
sympy.ntheory.factor_.multiplicity
sympy.ntheory.factor_.perfect_power
"""
if x == 1:
raise ValueError('x cannot take value as 1')
if y == 0:
raise ValueError('y cannot take value as 0')
if x in (-2, 2):
x = int(x)
y = as_int(y)
e = y.bit_length() - 1
return e, x**e == y
if x < 0:
n, b = integer_log(y if y > 0 else -y, -x)
return n, b and bool(n % 2 if y < 0 else not n % 2)
x = as_int(x)
y = as_int(y)
r = e = 0
while y >= x:
d = x
m = 1
while y >= d:
y, rem = divmod(y, d)
r = r or rem
e += m
if y > d:
d *= d
m *= 2
return e, r == 0 and y == 1
class Pow(Expr):
"""
Defines the expression x**y as "x raised to a power y"
Singleton definitions involving (0, 1, -1, oo, -oo, I, -I):
+--------------+---------+-----------------------------------------------+
| expr | value | reason |
+==============+=========+===============================================+
| z**0 | 1 | Although arguments over 0**0 exist, see [2]. |
+--------------+---------+-----------------------------------------------+
| z**1 | z | |
+--------------+---------+-----------------------------------------------+
| (-oo)**(-1) | 0 | |
+--------------+---------+-----------------------------------------------+
| (-1)**-1 | -1 | |
+--------------+---------+-----------------------------------------------+
| S.Zero**-1 | zoo | This is not strictly true, as 0**-1 may be |
| | | undefined, but is convenient in some contexts |
| | | where the base is assumed to be positive. |
+--------------+---------+-----------------------------------------------+
| 1**-1 | 1 | |
+--------------+---------+-----------------------------------------------+
| oo**-1 | 0 | |
+--------------+---------+-----------------------------------------------+
| 0**oo | 0 | Because for all complex numbers z near |
| | | 0, z**oo -> 0. |
+--------------+---------+-----------------------------------------------+
| 0**-oo | zoo | This is not strictly true, as 0**oo may be |
| | | oscillating between positive and negative |
| | | values or rotating in the complex plane. |
| | | It is convenient, however, when the base |
| | | is positive. |
+--------------+---------+-----------------------------------------------+
| 1**oo | nan | Because there are various cases where |
| 1**-oo | | lim(x(t),t)=1, lim(y(t),t)=oo (or -oo), |
| | | but lim( x(t)**y(t), t) != 1. See [3]. |
+--------------+---------+-----------------------------------------------+
| b**zoo | nan | Because b**z has no limit as z -> zoo |
+--------------+---------+-----------------------------------------------+
| (-1)**oo | nan | Because of oscillations in the limit. |
| (-1)**(-oo) | | |
+--------------+---------+-----------------------------------------------+
| oo**oo | oo | |
+--------------+---------+-----------------------------------------------+
| oo**-oo | 0 | |
+--------------+---------+-----------------------------------------------+
| (-oo)**oo | nan | |
| (-oo)**-oo | | |
+--------------+---------+-----------------------------------------------+
| oo**I | nan | oo**e could probably be best thought of as |
| (-oo)**I | | the limit of x**e for real x as x tends to |
| | | oo. If e is I, then the limit does not exist |
| | | and nan is used to indicate that. |
+--------------+---------+-----------------------------------------------+
| oo**(1+I) | zoo | If the real part of e is positive, then the |
| (-oo)**(1+I) | | limit of abs(x**e) is oo. So the limit value |
| | | is zoo. |
+--------------+---------+-----------------------------------------------+
| oo**(-1+I) | 0 | If the real part of e is negative, then the |
| -oo**(-1+I) | | limit is 0. |
+--------------+---------+-----------------------------------------------+
Because symbolic computations are more flexible that floating point
calculations and we prefer to never return an incorrect answer,
we choose not to conform to all IEEE 754 conventions. This helps
us avoid extra test-case code in the calculation of limits.
See Also
========
sympy.core.numbers.Infinity
sympy.core.numbers.NegativeInfinity
sympy.core.numbers.NaN
References
==========
.. [1] https://en.wikipedia.org/wiki/Exponentiation
.. [2] https://en.wikipedia.org/wiki/Exponentiation#Zero_to_the_power_of_zero
.. [3] https://en.wikipedia.org/wiki/Indeterminate_forms
"""
is_Pow = True
__slots__ = ('is_commutative',)
@cacheit
def __new__(cls, b, e, evaluate=None):
if evaluate is None:
evaluate = global_parameters.evaluate
from sympy.functions.elementary.exponential import exp_polar
b = _sympify(b)
e = _sympify(e)
# XXX: This can be removed when non-Expr args are disallowed rather
# than deprecated.
from sympy.core.relational import Relational
if isinstance(b, Relational) or isinstance(e, Relational):
raise TypeError('Relational can not be used in Pow')
# XXX: This should raise TypeError once deprecation period is over:
if not (isinstance(b, Expr) and isinstance(e, Expr)):
SymPyDeprecationWarning(
feature="Pow with non-Expr args",
useinstead="Expr args",
issue=19445,
deprecated_since_version="1.7"
).warn()
if evaluate:
if e is S.ComplexInfinity:
return S.NaN
if e is S.Zero:
return S.One
elif e is S.One:
return b
elif e == -1 and not b:
return S.ComplexInfinity
# Only perform autosimplification if exponent or base is a Symbol or number
elif (b.is_Symbol or b.is_number) and (e.is_Symbol or e.is_number) and\
e.is_integer and _coeff_isneg(b):
if e.is_even:
b = -b
elif e.is_odd:
return -Pow(-b, e)
if S.NaN in (b, e): # XXX S.NaN**x -> S.NaN under assumption that x != 0
return S.NaN
elif b is S.One:
if abs(e).is_infinite:
return S.NaN
return S.One
else:
# recognize base as E
if not e.is_Atom and b is not S.Exp1 and not isinstance(b, exp_polar):
from sympy import numer, denom, log, sign, im, factor_terms
c, ex = factor_terms(e, sign=False).as_coeff_Mul()
den = denom(ex)
if isinstance(den, log) and den.args[0] == b:
return S.Exp1**(c*numer(ex))
elif den.is_Add:
s = sign(im(b))
if s.is_Number and s and den == \
log(-factor_terms(b, sign=False)) + s*S.ImaginaryUnit*S.Pi:
return S.Exp1**(c*numer(ex))
obj = b._eval_power(e)
if obj is not None:
return obj
obj = Expr.__new__(cls, b, e)
obj = cls._exec_constructor_postprocessors(obj)
if not isinstance(obj, Pow):
return obj
obj.is_commutative = (b.is_commutative and e.is_commutative)
return obj
@property
def base(self):
return self._args[0]
@property
def exp(self):
return self._args[1]
@classmethod
def class_key(cls):
return 3, 2, cls.__name__
def _eval_refine(self, assumptions):
from sympy.assumptions.ask import ask, Q
b, e = self.as_base_exp()
if ask(Q.integer(e), assumptions) and _coeff_isneg(b):
if ask(Q.even(e), assumptions):
return Pow(-b, e)
elif ask(Q.odd(e), assumptions):
return -Pow(-b, e)
def _eval_power(self, other):
from sympy import arg, exp, floor, im, log, re, sign
b, e = self.as_base_exp()
if b is S.NaN:
return (b**e)**other # let __new__ handle it
s = None
if other.is_integer:
s = 1
elif b.is_polar: # e.g. exp_polar, besselj, var('p', polar=True)...
s = 1
elif e.is_extended_real is not None:
# helper functions ===========================
def _half(e):
"""Return True if the exponent has a literal 2 as the
denominator, else None."""
if getattr(e, 'q', None) == 2:
return True
n, d = e.as_numer_denom()
if n.is_integer and d == 2:
return True
def _n2(e):
"""Return ``e`` evaluated to a Number with 2 significant
digits, else None."""
try:
rv = e.evalf(2, strict=True)
if rv.is_Number:
return rv
except PrecisionExhausted:
pass
# ===================================================
if e.is_extended_real:
# we need _half(other) with constant floor or
# floor(S.Half - e*arg(b)/2/pi) == 0
# handle -1 as special case
if e == -1:
# floor arg. is 1/2 + arg(b)/2/pi
if _half(other):
if b.is_negative is True:
return S.NegativeOne**other*Pow(-b, e*other)
elif b.is_negative is False:
return Pow(b, -other)
elif e.is_even:
if b.is_extended_real:
b = abs(b)
if b.is_imaginary:
b = abs(im(b))*S.ImaginaryUnit
if (abs(e) < 1) == True or e == 1:
s = 1 # floor = 0
elif b.is_extended_nonnegative:
s = 1 # floor = 0
elif re(b).is_extended_nonnegative and (abs(e) < 2) == True:
s = 1 # floor = 0
elif fuzzy_not(im(b).is_zero) and abs(e) == 2:
s = 1 # floor = 0
elif _half(other):
s = exp(2*S.Pi*S.ImaginaryUnit*other*floor(
S.Half - e*arg(b)/(2*S.Pi)))
if s.is_extended_real and _n2(sign(s) - s) == 0:
s = sign(s)
else:
s = None
else:
# e.is_extended_real is False requires:
# _half(other) with constant floor or
# floor(S.Half - im(e*log(b))/2/pi) == 0
try:
s = exp(2*S.ImaginaryUnit*S.Pi*other*
floor(S.Half - im(e*log(b))/2/S.Pi))
# be careful to test that s is -1 or 1 b/c sign(I) == I:
# so check that s is real
if s.is_extended_real and _n2(sign(s) - s) == 0:
s = sign(s)
else:
s = None
except PrecisionExhausted:
s = None
if s is not None:
return s*Pow(b, e*other)
def _eval_Mod(self, q):
r"""A dispatched function to compute `b^e \bmod q`, dispatched
by ``Mod``.
Notes
=====
Algorithms:
1. For unevaluated integer power, use built-in ``pow`` function
with 3 arguments, if powers are not too large wrt base.
2. For very large powers, use totient reduction if e >= lg(m).
Bound on m, is for safe factorization memory wise ie m^(1/4).
For pollard-rho to be faster than built-in pow lg(e) > m^(1/4)
check is added.
3. For any unevaluated power found in `b` or `e`, the step 2
will be recursed down to the base and the exponent
such that the `b \bmod q` becomes the new base and
``\phi(q) + e \bmod \phi(q)`` becomes the new exponent, and then
the computation for the reduced expression can be done.
"""
from sympy.ntheory import totient
from .mod import Mod
base, exp = self.base, self.exp
if exp.is_integer and exp.is_positive:
if q.is_integer and base % q == 0:
return S.Zero
if base.is_Integer and exp.is_Integer and q.is_Integer:
b, e, m = int(base), int(exp), int(q)
mb = m.bit_length()
if mb <= 80 and e >= mb and e.bit_length()**4 >= m:
phi = totient(m)
return Integer(pow(b, phi + e%phi, m))
return Integer(pow(b, e, m))
if isinstance(base, Pow) and base.is_integer and base.is_number:
base = Mod(base, q)
return Mod(Pow(base, exp, evaluate=False), q)
if isinstance(exp, Pow) and exp.is_integer and exp.is_number:
bit_length = int(q).bit_length()
# XXX Mod-Pow actually attempts to do a hanging evaluation
# if this dispatched function returns None.
# May need some fixes in the dispatcher itself.
if bit_length <= 80:
phi = totient(q)
exp = phi + Mod(exp, phi)
return Mod(Pow(base, exp, evaluate=False), q)
def _eval_is_even(self):
if self.exp.is_integer and self.exp.is_positive:
return self.base.is_even
def _eval_is_negative(self):
ext_neg = Pow._eval_is_extended_negative(self)
if ext_neg is True:
return self.is_finite
return ext_neg
def _eval_is_positive(self):
ext_pos = Pow._eval_is_extended_positive(self)
if ext_pos is True:
return self.is_finite
return ext_pos
def _eval_is_extended_positive(self):
from sympy import log
if self.base == self.exp:
if self.base.is_extended_nonnegative:
return True
elif self.base.is_positive:
if self.exp.is_real:
return True
elif self.base.is_extended_negative:
if self.exp.is_even:
return True
if self.exp.is_odd:
return False
elif self.base.is_zero:
if self.exp.is_extended_real:
return self.exp.is_zero
elif self.base.is_extended_nonpositive:
if self.exp.is_odd:
return False
elif self.base.is_imaginary:
if self.exp.is_integer:
m = self.exp % 4
if m.is_zero:
return True
if m.is_integer and m.is_zero is False:
return False
if self.exp.is_imaginary:
return log(self.base).is_imaginary
def _eval_is_extended_negative(self):
if self.exp is S(1)/2:
if self.base.is_complex or self.base.is_extended_real:
return False
if self.base.is_extended_negative:
if self.exp.is_odd and self.base.is_finite:
return True
if self.exp.is_even:
return False
elif self.base.is_extended_positive:
if self.exp.is_extended_real:
return False
elif self.base.is_zero:
if self.exp.is_extended_real:
return False
elif self.base.is_extended_nonnegative:
if self.exp.is_extended_nonnegative:
return False
elif self.base.is_extended_nonpositive:
if self.exp.is_even:
return False
elif self.base.is_extended_real:
if self.exp.is_even:
return False
def _eval_is_zero(self):
if self.base.is_zero:
if self.exp.is_extended_positive:
return True
elif self.exp.is_extended_nonpositive:
return False
elif self.base.is_zero is False:
if self.base.is_finite and self.exp.is_finite:
return False
elif self.exp.is_negative:
return self.base.is_infinite
elif self.exp.is_nonnegative:
return False
elif self.exp.is_infinite and self.exp.is_extended_real:
if (1 - abs(self.base)).is_extended_positive:
return self.exp.is_extended_positive
elif (1 - abs(self.base)).is_extended_negative:
return self.exp.is_extended_negative
else: # when self.base.is_zero is None
if self.base.is_finite and self.exp.is_negative:
return False
def _eval_is_integer(self):
b, e = self.args
if b.is_rational:
if b.is_integer is False and e.is_positive:
return False # rat**nonneg
if b.is_integer and e.is_integer:
if b is S.NegativeOne:
return True
if e.is_nonnegative or e.is_positive:
return True
if b.is_integer and e.is_negative and (e.is_finite or e.is_integer):
if fuzzy_not((b - 1).is_zero) and fuzzy_not((b + 1).is_zero):
return False
if b.is_Number and e.is_Number:
check = self.func(*self.args)
return check.is_Integer
if e.is_negative and b.is_positive and (b - 1).is_positive:
return False
if e.is_negative and b.is_negative and (b + 1).is_negative:
return False
def _eval_is_extended_real(self):
from sympy import arg, exp, log, Mul
real_b = self.base.is_extended_real
if real_b is None:
if self.base.func == exp and self.base.args[0].is_imaginary:
return self.exp.is_imaginary
return
real_e = self.exp.is_extended_real
if real_e is None:
return
if real_b and real_e:
if self.base.is_extended_positive:
return True
elif self.base.is_extended_nonnegative and self.exp.is_extended_nonnegative:
return True
elif self.exp.is_integer and self.base.is_extended_nonzero:
return True
elif self.exp.is_integer and self.exp.is_nonnegative:
return True
elif self.base.is_extended_negative:
if self.exp.is_Rational:
return False
if real_e and self.exp.is_extended_negative and self.base.is_zero is False:
return Pow(self.base, -self.exp).is_extended_real
im_b = self.base.is_imaginary
im_e = self.exp.is_imaginary
if im_b:
if self.exp.is_integer:
if self.exp.is_even:
return True
elif self.exp.is_odd:
return False
elif im_e and log(self.base).is_imaginary:
return True
elif self.exp.is_Add:
c, a = self.exp.as_coeff_Add()
if c and c.is_Integer:
return Mul(
self.base**c, self.base**a, evaluate=False).is_extended_real
elif self.base in (-S.ImaginaryUnit, S.ImaginaryUnit):
if (self.exp/2).is_integer is False:
return False
if real_b and im_e:
if self.base is S.NegativeOne:
return True
c = self.exp.coeff(S.ImaginaryUnit)
if c:
if self.base.is_rational and c.is_rational:
if self.base.is_nonzero and (self.base - 1).is_nonzero and c.is_nonzero:
return False
ok = (c*log(self.base)/S.Pi).is_integer
if ok is not None:
return ok
if real_b is False: # we already know it's not imag
i = arg(self.base)*self.exp/S.Pi
if i.is_complex: # finite
return i.is_integer
def _eval_is_complex(self):
if all(a.is_complex for a in self.args) and self._eval_is_finite():
return True
def _eval_is_imaginary(self):
from sympy import arg, log
if self.base.is_imaginary:
if self.exp.is_integer:
odd = self.exp.is_odd
if odd is not None:
return odd
return
if self.exp.is_imaginary:
imlog = log(self.base).is_imaginary
if imlog is not None:
return False # I**i -> real; (2*I)**i -> complex ==> not imaginary
if self.base.is_extended_real and self.exp.is_extended_real:
if self.base.is_positive:
return False
else:
rat = self.exp.is_rational
if not rat:
return rat
if self.exp.is_integer:
return False
else:
half = (2*self.exp).is_integer
if half:
return self.base.is_negative
return half
if self.base.is_extended_real is False: # we already know it's not imag
i = arg(self.base)*self.exp/S.Pi
isodd = (2*i).is_odd
if isodd is not None:
return isodd
if self.exp.is_negative:
return (1/self).is_imaginary
def _eval_is_odd(self):
if self.exp.is_integer:
if self.exp.is_positive:
return self.base.is_odd
elif self.exp.is_nonnegative and self.base.is_odd:
return True
elif self.base is S.NegativeOne:
return True
def _eval_is_finite(self):
if self.exp.is_negative:
if self.base.is_zero:
return False
if self.base.is_infinite or self.base.is_nonzero:
return True
c1 = self.base.is_finite
if c1 is None:
return
c2 = self.exp.is_finite
if c2 is None:
return
if c1 and c2:
if self.exp.is_nonnegative or fuzzy_not(self.base.is_zero):
return True
def _eval_is_prime(self):
'''
An integer raised to the n(>=2)-th power cannot be a prime.
'''
if self.base.is_integer and self.exp.is_integer and (self.exp - 1).is_positive:
return False
def _eval_is_composite(self):
"""
A power is composite if both base and exponent are greater than 1
"""
if (self.base.is_integer and self.exp.is_integer and
((self.base - 1).is_positive and (self.exp - 1).is_positive or
(self.base + 1).is_negative and self.exp.is_positive and self.exp.is_even)):
return True
def _eval_is_polar(self):
return self.base.is_polar
def _eval_subs(self, old, new):
from sympy import exp, log, Symbol
def _check(ct1, ct2, old):
"""Return (bool, pow, remainder_pow) where, if bool is True, then the
exponent of Pow `old` will combine with `pow` so the substitution
is valid, otherwise bool will be False.
For noncommutative objects, `pow` will be an integer, and a factor
`Pow(old.base, remainder_pow)` needs to be included. If there is
no such factor, None is returned. For commutative objects,
remainder_pow is always None.
cti are the coefficient and terms of an exponent of self or old
In this _eval_subs routine a change like (b**(2*x)).subs(b**x, y)
will give y**2 since (b**x)**2 == b**(2*x); if that equality does
not hold then the substitution should not occur so `bool` will be
False.
"""
coeff1, terms1 = ct1
coeff2, terms2 = ct2
if terms1 == terms2:
if old.is_commutative:
# Allow fractional powers for commutative objects
pow = coeff1/coeff2
try:
as_int(pow, strict=False)
combines = True
except ValueError:
combines = isinstance(Pow._eval_power(
Pow(*old.as_base_exp(), evaluate=False),
pow), (Pow, exp, Symbol))
return combines, pow, None
else:
# With noncommutative symbols, substitute only integer powers
if not isinstance(terms1, tuple):
terms1 = (terms1,)
if not all(term.is_integer for term in terms1):
return False, None, None
try:
# Round pow toward zero
pow, remainder = divmod(as_int(coeff1), as_int(coeff2))
if pow < 0 and remainder != 0:
pow += 1
remainder -= as_int(coeff2)
if remainder == 0:
remainder_pow = None
else:
remainder_pow = Mul(remainder, *terms1)
return True, pow, remainder_pow
except ValueError:
# Can't substitute
pass
return False, None, None
if old == self.base:
return new**self.exp._subs(old, new)
# issue 10829: (4**x - 3*y + 2).subs(2**x, y) -> y**2 - 3*y + 2
if isinstance(old, self.func) and self.exp == old.exp:
l = log(self.base, old.base)
if l.is_Number:
return Pow(new, l)
if isinstance(old, self.func) and self.base == old.base:
if self.exp.is_Add is False:
ct1 = self.exp.as_independent(Symbol, as_Add=False)
ct2 = old.exp.as_independent(Symbol, as_Add=False)
ok, pow, remainder_pow = _check(ct1, ct2, old)
if ok:
# issue 5180: (x**(6*y)).subs(x**(3*y),z)->z**2
result = self.func(new, pow)
if remainder_pow is not None:
result = Mul(result, Pow(old.base, remainder_pow))
return result
else: # b**(6*x + a).subs(b**(3*x), y) -> y**2 * b**a
# exp(exp(x) + exp(x**2)).subs(exp(exp(x)), w) -> w * exp(exp(x**2))
oarg = old.exp
new_l = []
o_al = []
ct2 = oarg.as_coeff_mul()
for a in self.exp.args:
newa = a._subs(old, new)
ct1 = newa.as_coeff_mul()
ok, pow, remainder_pow = _check(ct1, ct2, old)
if ok:
new_l.append(new**pow)
if remainder_pow is not None:
o_al.append(remainder_pow)
continue
elif not old.is_commutative and not newa.is_integer:
# If any term in the exponent is non-integer,
# we do not do any substitutions in the noncommutative case
return
o_al.append(newa)
if new_l:
expo = Add(*o_al)
new_l.append(Pow(self.base, expo, evaluate=False) if expo != 1 else self.base)
return Mul(*new_l)
if isinstance(old, exp) and self.exp.is_extended_real and self.base.is_positive:
ct1 = old.args[0].as_independent(Symbol, as_Add=False)
ct2 = (self.exp*log(self.base)).as_independent(
Symbol, as_Add=False)
ok, pow, remainder_pow = _check(ct1, ct2, old)
if ok:
result = self.func(new, pow) # (2**x).subs(exp(x*log(2)), z) -> z
if remainder_pow is not None:
result = Mul(result, Pow(old.base, remainder_pow))
return result
def as_base_exp(self):
"""Return base and exp of self.
If base is 1/Integer, then return Integer, -exp. If this extra
processing is not needed, the base and exp properties will
give the raw arguments
Examples
========
>>> from sympy import Pow, S
>>> p = Pow(S.Half, 2, evaluate=False)
>>> p.as_base_exp()
(2, -2)
>>> p.args
(1/2, 2)
"""
b, e = self.args
if b.is_Rational and b.p == 1 and b.q != 1:
return Integer(b.q), -e
return b, e
def _eval_adjoint(self):
from sympy.functions.elementary.complexes import adjoint
i, p = self.exp.is_integer, self.base.is_positive
if i:
return adjoint(self.base)**self.exp
if p:
return self.base**adjoint(self.exp)
if i is False and p is False:
expanded = expand_complex(self)
if expanded != self:
return adjoint(expanded)
def _eval_conjugate(self):
from sympy.functions.elementary.complexes import conjugate as c
i, p = self.exp.is_integer, self.base.is_positive
if i:
return c(self.base)**self.exp
if p:
return self.base**c(self.exp)
if i is False and p is False:
expanded = expand_complex(self)
if expanded != self:
return c(expanded)
if self.is_extended_real:
return self
def _eval_transpose(self):
from sympy.functions.elementary.complexes import transpose
i, p = self.exp.is_integer, (self.base.is_complex or self.base.is_infinite)
if p:
return self.base**self.exp
if i:
return transpose(self.base)**self.exp
if i is False and p is False:
expanded = expand_complex(self)
if expanded != self:
return transpose(expanded)
def _eval_expand_power_exp(self, **hints):
"""a**(n + m) -> a**n*a**m"""
b = self.base
e = self.exp
if e.is_Add and e.is_commutative:
expr = []
for x in e.args:
expr.append(self.func(self.base, x))
return Mul(*expr)
return self.func(b, e)
def _eval_expand_power_base(self, **hints):
"""(a*b)**n -> a**n * b**n"""
force = hints.get('force', False)
b = self.base
e = self.exp
if not b.is_Mul:
return self
cargs, nc = b.args_cnc(split_1=False)
# expand each term - this is top-level-only
# expansion but we have to watch out for things
# that don't have an _eval_expand method
if nc:
nc = [i._eval_expand_power_base(**hints)
if hasattr(i, '_eval_expand_power_base') else i
for i in nc]
if e.is_Integer:
if e.is_positive:
rv = Mul(*nc*e)
else:
rv = Mul(*[i**-1 for i in nc[::-1]]*-e)
if cargs:
rv *= Mul(*cargs)**e
return rv
if not cargs:
return self.func(Mul(*nc), e, evaluate=False)
nc = [Mul(*nc)]
# sift the commutative bases
other, maybe_real = sift(cargs, lambda x: x.is_extended_real is False,
binary=True)
def pred(x):
if x is S.ImaginaryUnit:
return S.ImaginaryUnit
polar = x.is_polar
if polar:
return True
if polar is None:
return fuzzy_bool(x.is_extended_nonnegative)
sifted = sift(maybe_real, pred)
nonneg = sifted[True]
other += sifted[None]
neg = sifted[False]
imag = sifted[S.ImaginaryUnit]
if imag:
I = S.ImaginaryUnit
i = len(imag) % 4
if i == 0:
pass
elif i == 1:
other.append(I)
elif i == 2:
if neg:
nonn = -neg.pop()
if nonn is not S.One:
nonneg.append(nonn)
else:
neg.append(S.NegativeOne)
else:
if neg:
nonn = -neg.pop()
if nonn is not S.One:
nonneg.append(nonn)
else:
neg.append(S.NegativeOne)
other.append(I)
del imag
# bring out the bases that can be separated from the base
if force or e.is_integer:
# treat all commutatives the same and put nc in other
cargs = nonneg + neg + other
other = nc
else:
# this is just like what is happening automatically, except
# that now we are doing it for an arbitrary exponent for which
# no automatic expansion is done
assert not e.is_Integer
# handle negatives by making them all positive and putting
# the residual -1 in other
if len(neg) > 1:
o = S.One
if not other and neg[0].is_Number:
o *= neg.pop(0)
if len(neg) % 2:
o = -o
for n in neg:
nonneg.append(-n)
if o is not S.One:
other.append(o)
elif neg and other:
if neg[0].is_Number and neg[0] is not S.NegativeOne:
other.append(S.NegativeOne)
nonneg.append(-neg[0])
else:
other.extend(neg)
else:
other.extend(neg)
del neg
cargs = nonneg
other += nc
rv = S.One
if cargs:
if e.is_Rational:
npow, cargs = sift(cargs, lambda x: x.is_Pow and
x.exp.is_Rational and x.base.is_number,
binary=True)
rv = Mul(*[self.func(b.func(*b.args), e) for b in npow])
rv *= Mul(*[self.func(b, e, evaluate=False) for b in cargs])
if other:
rv *= self.func(Mul(*other), e, evaluate=False)
return rv
def _eval_expand_multinomial(self, **hints):
"""(a + b + ..)**n -> a**n + n*a**(n-1)*b + .., n is nonzero integer"""
base, exp = self.args
result = self
if exp.is_Rational and exp.p > 0 and base.is_Add:
if not exp.is_Integer:
n = Integer(exp.p // exp.q)
if not n:
return result
else:
radical, result = self.func(base, exp - n), []
expanded_base_n = self.func(base, n)
if expanded_base_n.is_Pow:
expanded_base_n = \
expanded_base_n._eval_expand_multinomial()
for term in Add.make_args(expanded_base_n):
result.append(term*radical)
return Add(*result)
n = int(exp)
if base.is_commutative:
order_terms, other_terms = [], []
for b in base.args:
if b.is_Order:
order_terms.append(b)
else:
other_terms.append(b)
if order_terms:
# (f(x) + O(x^n))^m -> f(x)^m + m*f(x)^{m-1} *O(x^n)
f = Add(*other_terms)
o = Add(*order_terms)
if n == 2:
return expand_multinomial(f**n, deep=False) + n*f*o
else:
g = expand_multinomial(f**(n - 1), deep=False)
return expand_mul(f*g, deep=False) + n*g*o
if base.is_number:
# Efficiently expand expressions of the form (a + b*I)**n
# where 'a' and 'b' are real numbers and 'n' is integer.
a, b = base.as_real_imag()
if a.is_Rational and b.is_Rational:
if not a.is_Integer:
if not b.is_Integer:
k = self.func(a.q * b.q, n)
a, b = a.p*b.q, a.q*b.p
else:
k = self.func(a.q, n)
a, b = a.p, a.q*b
elif not b.is_Integer:
k = self.func(b.q, n)
a, b = a*b.q, b.p
else:
k = 1
a, b, c, d = int(a), int(b), 1, 0
while n:
if n & 1:
c, d = a*c - b*d, b*c + a*d
n -= 1
a, b = a*a - b*b, 2*a*b
n //= 2
I = S.ImaginaryUnit
if k == 1:
return c + I*d
else:
return Integer(c)/k + I*d/k
p = other_terms
# (x + y)**3 -> x**3 + 3*x**2*y + 3*x*y**2 + y**3
# in this particular example:
# p = [x,y]; n = 3
# so now it's easy to get the correct result -- we get the
# coefficients first:
from sympy import multinomial_coefficients
from sympy.polys.polyutils import basic_from_dict
expansion_dict = multinomial_coefficients(len(p), n)
# in our example: {(3, 0): 1, (1, 2): 3, (0, 3): 1, (2, 1): 3}
# and now construct the expression.
return basic_from_dict(expansion_dict, *p)
else:
if n == 2:
return Add(*[f*g for f in base.args for g in base.args])
else:
multi = (base**(n - 1))._eval_expand_multinomial()
if multi.is_Add:
return Add(*[f*g for f in base.args
for g in multi.args])
else:
# XXX can this ever happen if base was an Add?
return Add(*[f*multi for f in base.args])
elif (exp.is_Rational and exp.p < 0 and base.is_Add and
abs(exp.p) > exp.q):
return 1 / self.func(base, -exp)._eval_expand_multinomial()
elif exp.is_Add and base.is_Number:
# a + b a b
# n --> n n , where n, a, b are Numbers
coeff, tail = S.One, S.Zero
for term in exp.args:
if term.is_Number:
coeff *= self.func(base, term)
else:
tail += term
return coeff * self.func(base, tail)
else:
return result
def as_real_imag(self, deep=True, **hints):
from sympy import atan2, cos, im, re, sin
from sympy.polys.polytools import poly
if self.exp.is_Integer:
exp = self.exp
re_e, im_e = self.base.as_real_imag(deep=deep)
if not im_e:
return self, S.Zero
a, b = symbols('a b', cls=Dummy)
if exp >= 0:
if re_e.is_Number and im_e.is_Number:
# We can be more efficient in this case
expr = expand_multinomial(self.base**exp)
if expr != self:
return expr.as_real_imag()
expr = poly(
(a + b)**exp) # a = re, b = im; expr = (a + b*I)**exp
else:
mag = re_e**2 + im_e**2
re_e, im_e = re_e/mag, -im_e/mag
if re_e.is_Number and im_e.is_Number:
# We can be more efficient in this case
expr = expand_multinomial((re_e + im_e*S.ImaginaryUnit)**-exp)
if expr != self:
return expr.as_real_imag()
expr = poly((a + b)**-exp)
# Terms with even b powers will be real
r = [i for i in expr.terms() if not i[0][1] % 2]
re_part = Add(*[cc*a**aa*b**bb for (aa, bb), cc in r])
# Terms with odd b powers will be imaginary
r = [i for i in expr.terms() if i[0][1] % 4 == 1]
im_part1 = Add(*[cc*a**aa*b**bb for (aa, bb), cc in r])
r = [i for i in expr.terms() if i[0][1] % 4 == 3]
im_part3 = Add(*[cc*a**aa*b**bb for (aa, bb), cc in r])
return (re_part.subs({a: re_e, b: S.ImaginaryUnit*im_e}),
im_part1.subs({a: re_e, b: im_e}) + im_part3.subs({a: re_e, b: -im_e}))
elif self.exp.is_Rational:
re_e, im_e = self.base.as_real_imag(deep=deep)
if im_e.is_zero and self.exp is S.Half:
if re_e.is_extended_nonnegative:
return self, S.Zero
if re_e.is_extended_nonpositive:
return S.Zero, (-self.base)**self.exp
# XXX: This is not totally correct since for x**(p/q) with
# x being imaginary there are actually q roots, but
# only a single one is returned from here.
r = self.func(self.func(re_e, 2) + self.func(im_e, 2), S.Half)
t = atan2(im_e, re_e)
rp, tp = self.func(r, self.exp), t*self.exp
return (rp*cos(tp), rp*sin(tp))
else:
if deep:
hints['complex'] = False
expanded = self.expand(deep, **hints)
if hints.get('ignore') == expanded:
return None
else:
return (re(expanded), im(expanded))
else:
return (re(self), im(self))
def _eval_derivative(self, s):
from sympy import log
dbase = self.base.diff(s)
dexp = self.exp.diff(s)
return self * (dexp * log(self.base) + dbase * self.exp/self.base)
def _eval_evalf(self, prec):
base, exp = self.as_base_exp()
base = base._evalf(prec)
if not exp.is_Integer:
exp = exp._evalf(prec)
if exp.is_negative and base.is_number and base.is_extended_real is False:
base = base.conjugate() / (base * base.conjugate())._evalf(prec)
exp = -exp
return self.func(base, exp).expand()
return self.func(base, exp)
def _eval_is_polynomial(self, syms):
if self.exp.has(*syms):
return False
if self.base.has(*syms):
return bool(self.base._eval_is_polynomial(syms) and
self.exp.is_Integer and (self.exp >= 0))
else:
return True
def _eval_is_rational(self):
# The evaluation of self.func below can be very expensive in the case
# of integer**integer if the exponent is large. We should try to exit
# before that if possible:
if (self.exp.is_integer and self.base.is_rational
and fuzzy_not(fuzzy_and([self.exp.is_negative, self.base.is_zero]))):
return True
p = self.func(*self.as_base_exp()) # in case it's unevaluated
if not p.is_Pow:
return p.is_rational
b, e = p.as_base_exp()
if e.is_Rational and b.is_Rational:
# we didn't check that e is not an Integer
# because Rational**Integer autosimplifies
return False
if e.is_integer:
if b.is_rational:
if fuzzy_not(b.is_zero) or e.is_nonnegative:
return True
if b == e: # always rational, even for 0**0
return True
elif b.is_irrational:
return e.is_zero
def _eval_is_algebraic(self):
def _is_one(expr):
try:
return (expr - 1).is_zero
except ValueError:
# when the operation is not allowed
return False
if self.base.is_zero or _is_one(self.base):
return True
elif self.exp.is_rational:
if self.base.is_algebraic is False:
return self.exp.is_zero
if self.base.is_zero is False:
if self.exp.is_nonzero:
return self.base.is_algebraic
elif self.base.is_algebraic:
return True
if self.exp.is_positive:
return self.base.is_algebraic
elif self.base.is_algebraic and self.exp.is_algebraic:
if ((fuzzy_not(self.base.is_zero)
and fuzzy_not(_is_one(self.base)))
or self.base.is_integer is False
or self.base.is_irrational):
return self.exp.is_rational
def _eval_is_rational_function(self, syms):
if self.exp.has(*syms):
return False
if self.base.has(*syms):
return self.base._eval_is_rational_function(syms) and \
self.exp.is_Integer
else:
return True
def _eval_is_meromorphic(self, x, a):
# f**g is meromorphic if g is an integer and f is meromorphic.
# E**(log(f)*g) is meromorphic if log(f)*g is meromorphic
# and finite.
base_merom = self.base._eval_is_meromorphic(x, a)
exp_integer = self.exp.is_Integer
if exp_integer:
return base_merom
exp_merom = self.exp._eval_is_meromorphic(x, a)
if base_merom is False:
# f**g = E**(log(f)*g) may be meromorphic if the
# singularities of log(f) and g cancel each other,
# for example, if g = 1/log(f). Hence,
return False if exp_merom else None
elif base_merom is None:
return None
b = self.base.subs(x, a)
# b is extended complex as base is meromorphic.
# log(base) is finite and meromorphic when b != 0, zoo.
b_zero = b.is_zero
if b_zero:
log_defined = False
else:
log_defined = fuzzy_and((b.is_finite, fuzzy_not(b_zero)))
if log_defined is False: # zero or pole of base
return exp_integer # False or None
elif log_defined is None:
return None
if not exp_merom:
return exp_merom # False or None
return self.exp.subs(x, a).is_finite
def _eval_is_algebraic_expr(self, syms):
if self.exp.has(*syms):
return False
if self.base.has(*syms):
return self.base._eval_is_algebraic_expr(syms) and \
self.exp.is_Rational
else:
return True
def _eval_rewrite_as_exp(self, base, expo, **kwargs):
from sympy import exp, log, I, arg
if base.is_zero or base.has(exp) or expo.has(exp):
return base**expo
if base.has(Symbol):
# delay evaluation if expo is non symbolic
# (as exp(x*log(5)) automatically reduces to x**5)
return exp(log(base)*expo, evaluate=expo.has(Symbol))
else:
return exp((log(abs(base)) + I*arg(base))*expo)
def as_numer_denom(self):
if not self.is_commutative:
return self, S.One
base, exp = self.as_base_exp()
n, d = base.as_numer_denom()
# this should be the same as ExpBase.as_numer_denom wrt
# exponent handling
neg_exp = exp.is_negative
if not neg_exp and not (-exp).is_negative:
neg_exp = _coeff_isneg(exp)
int_exp = exp.is_integer
# the denominator cannot be separated from the numerator if
# its sign is unknown unless the exponent is an integer, e.g.
# sqrt(a/b) != sqrt(a)/sqrt(b) when a=1 and b=-1. But if the
# denominator is negative the numerator and denominator can
# be negated and the denominator (now positive) separated.
if not (d.is_extended_real or int_exp):
n = base
d = S.One
dnonpos = d.is_nonpositive
if dnonpos:
n, d = -n, -d
elif dnonpos is None and not int_exp:
n = base
d = S.One
if neg_exp:
n, d = d, n
exp = -exp
if exp.is_infinite:
if n is S.One and d is not S.One:
return n, self.func(d, exp)
if n is not S.One and d is S.One:
return self.func(n, exp), d
return self.func(n, exp), self.func(d, exp)
def matches(self, expr, repl_dict={}, old=False):
expr = _sympify(expr)
repl_dict = repl_dict.copy()
# special case, pattern = 1 and expr.exp can match to 0
if expr is S.One:
d = self.exp.matches(S.Zero, repl_dict)
if d is not None:
return d
# make sure the expression to be matched is an Expr
if not isinstance(expr, Expr):
return None
b, e = expr.as_base_exp()
# special case number
sb, se = self.as_base_exp()
if sb.is_Symbol and se.is_Integer and expr:
if e.is_rational:
return sb.matches(b**(e/se), repl_dict)
return sb.matches(expr**(1/se), repl_dict)
d = repl_dict.copy()
d = self.base.matches(b, d)
if d is None:
return None
d = self.exp.xreplace(d).matches(e, d)
if d is None:
return Expr.matches(self, expr, repl_dict)
return d
def _eval_nseries(self, x, n, logx, cdir=0):
# NOTE! This function is an important part of the gruntz algorithm
# for computing limits. It has to return a generalized power
# series with coefficients in C(log, log(x)). In more detail:
# It has to return an expression
# c_0*x**e_0 + c_1*x**e_1 + ... (finitely many terms)
# where e_i are numbers (not necessarily integers) and c_i are
# expressions involving only numbers, the log function, and log(x).
# The series expansion of b**e is computed as follows:
# 1) We express b as f*(1 + g) where f is the leading term of b.
# g has order O(x**d) where d is strictly positive.
# 2) Then b**e = (f**e)*((1 + g)**e).
# (1 + g)**e is computed using binomial series.
from sympy import im, I, ceiling, polygamma, logcombine, EulerGamma, exp, nan, zoo, log, factorial, ff, PoleError, O, powdenest, Wild
from itertools import product
self = powdenest(self, force=True).trigsimp()
b, e = self.as_base_exp()
if e.has(S.Infinity, S.NegativeInfinity, S.ComplexInfinity, S.NaN):
raise PoleError()
if e.has(x):
return exp(e*log(b))._eval_nseries(x, n=n, logx=logx, cdir=cdir)
if logx is not None and b.has(log):
c, ex = symbols('c, ex', cls=Wild, exclude=[x])
b = b.replace(log(c*x**ex), log(c) + ex*logx)
self = b**e
b = b.removeO()
try:
if b.has(polygamma, EulerGamma) and logx is not None:
raise ValueError()
_, m = b.leadterm(x)
except ValueError:
b = b._eval_nseries(x, n=max(2, n), logx=logx, cdir=cdir).removeO()
if b.has(nan, zoo):
raise NotImplementedError()
_, m = b.leadterm(x)
if e.has(log):
e = logcombine(e).cancel()
if not (m.is_zero or e.is_number and e.is_real):
return exp(e*log(b))._eval_nseries(x, n=n, logx=logx, cdir=cdir)
f = b.as_leading_term(x)
g = (b/f - S.One).cancel()
maxpow = n - m*e
if maxpow < S.Zero:
return O(x**(m*e), x)
if g.is_zero:
return f**e
def coeff_exp(term, x):
coeff, exp = S.One, S.Zero
for factor in Mul.make_args(term):
if factor.has(x):
base, exp = factor.as_base_exp()
if base != x:
try:
return term.leadterm(x)
except ValueError:
return term, S.Zero
else:
coeff *= factor
return coeff, exp
def mul(d1, d2):
res = {}
for e1, e2 in product(d1, d2):
ex = e1 + e2
if ex < maxpow:
res[ex] = res.get(ex, S.Zero) + d1[e1]*d2[e2]
return res
_, d = g.leadterm(x)
if not d.is_positive:
g = (b - f).simplify()/f
_, d = g.leadterm(x)
if not d.is_positive:
raise NotImplementedError()
gpoly = g._eval_nseries(x, n=ceiling(maxpow), logx=logx, cdir=cdir).removeO()
gterms = {}
for term in Add.make_args(gpoly):
co1, e1 = coeff_exp(term, x)
gterms[e1] = gterms.get(e1, S.Zero) + co1
k = S.One
terms = {S.Zero: S.One}
tk = gterms
while k*d < maxpow:
coeff = ff(e, k)/factorial(k)
for ex in tk:
terms[ex] = terms.get(ex, S.Zero) + coeff*tk[ex]
tk = mul(tk, gterms)
k += S.One
if (not e.is_integer and m.is_zero and f.is_real
and f.is_negative and im((b - f).dir(x, cdir)) < 0):
inco, inex = coeff_exp(f**e*exp(-2*e*S.Pi*I), x)
else:
inco, inex = coeff_exp(f**e, x)
res = S.Zero
for e1 in terms:
ex = e1 + inex
res += terms[e1]*inco*x**(ex)
if (res - self).cancel() == S.Zero:
return res
return res + O(x**n, x)
def _eval_as_leading_term(self, x, cdir=0):
from sympy import exp, I, im, log
e = self.exp
b = self.base
if e.has(x):
return exp(e * log(b)).as_leading_term(x, cdir=cdir)
f = b.as_leading_term(x, cdir=cdir)
if (not e.is_integer and f.is_constant() and f.is_real
and f.is_negative and im((b - f).dir(x, cdir)) < 0):
return self.func(f, e)*exp(-2*e*S.Pi*I)
return self.func(f, e)
@cacheit
def _taylor_term(self, n, x, *previous_terms): # of (1 + x)**e
from sympy import binomial
return binomial(self.exp, n) * self.func(x, n)
def _sage_(self):
return self.args[0]._sage_()**self.args[1]._sage_()
def as_content_primitive(self, radical=False, clear=True):
"""Return the tuple (R, self/R) where R is the positive Rational
extracted from self.
Examples
========
>>> from sympy import sqrt
>>> sqrt(4 + 4*sqrt(2)).as_content_primitive()
(2, sqrt(1 + sqrt(2)))
>>> sqrt(3 + 3*sqrt(2)).as_content_primitive()
(1, sqrt(3)*sqrt(1 + sqrt(2)))
>>> from sympy import expand_power_base, powsimp, Mul
>>> from sympy.abc import x, y
>>> ((2*x + 2)**2).as_content_primitive()
(4, (x + 1)**2)
>>> (4**((1 + y)/2)).as_content_primitive()
(2, 4**(y/2))
>>> (3**((1 + y)/2)).as_content_primitive()
(1, 3**((y + 1)/2))
>>> (3**((5 + y)/2)).as_content_primitive()
(9, 3**((y + 1)/2))
>>> eq = 3**(2 + 2*x)
>>> powsimp(eq) == eq
True
>>> eq.as_content_primitive()
(9, 3**(2*x))
>>> powsimp(Mul(*_))
3**(2*x + 2)
>>> eq = (2 + 2*x)**y
>>> s = expand_power_base(eq); s.is_Mul, s
(False, (2*x + 2)**y)
>>> eq.as_content_primitive()
(1, (2*(x + 1))**y)
>>> s = expand_power_base(_[1]); s.is_Mul, s
(True, 2**y*(x + 1)**y)
See docstring of Expr.as_content_primitive for more examples.
"""
b, e = self.as_base_exp()
b = _keep_coeff(*b.as_content_primitive(radical=radical, clear=clear))
ce, pe = e.as_content_primitive(radical=radical, clear=clear)
if b.is_Rational:
#e
#= ce*pe
#= ce*(h + t)
#= ce*h + ce*t
#=> self
#= b**(ce*h)*b**(ce*t)
#= b**(cehp/cehq)*b**(ce*t)
#= b**(iceh + r/cehq)*b**(ce*t)
#= b**(iceh)*b**(r/cehq)*b**(ce*t)
#= b**(iceh)*b**(ce*t + r/cehq)
h, t = pe.as_coeff_Add()
if h.is_Rational:
ceh = ce*h
c = self.func(b, ceh)
r = S.Zero
if not c.is_Rational:
iceh, r = divmod(ceh.p, ceh.q)
c = self.func(b, iceh)
return c, self.func(b, _keep_coeff(ce, t + r/ce/ceh.q))
e = _keep_coeff(ce, pe)
# b**e = (h*t)**e = h**e*t**e = c*m*t**e
if e.is_Rational and b.is_Mul:
h, t = b.as_content_primitive(radical=radical, clear=clear) # h is positive
c, m = self.func(h, e).as_coeff_Mul() # so c is positive
m, me = m.as_base_exp()
if m is S.One or me == e: # probably always true
# return the following, not return c, m*Pow(t, e)
# which would change Pow into Mul; we let sympy
# decide what to do by using the unevaluated Mul, e.g
# should it stay as sqrt(2 + 2*sqrt(5)) or become
# sqrt(2)*sqrt(1 + sqrt(5))
return c, self.func(_keep_coeff(m, t), e)
return S.One, self.func(b, e)
def is_constant(self, *wrt, **flags):
expr = self
if flags.get('simplify', True):
expr = expr.simplify()
b, e = expr.as_base_exp()
bz = b.equals(0)
if bz: # recalculate with assumptions in case it's unevaluated
new = b**e
if new != expr:
return new.is_constant()
econ = e.is_constant(*wrt)
bcon = b.is_constant(*wrt)
if bcon:
if econ:
return True
bz = b.equals(0)
if bz is False:
return False
elif bcon is None:
return None
return e.equals(0)
def _eval_difference_delta(self, n, step):
b, e = self.args
if e.has(n) and not b.has(n):
new_e = e.subs(n, n + step)
return (b**(new_e - e) - 1) * self
from .add import Add
from .numbers import Integer
from .mul import Mul, _keep_coeff
from .symbol import Symbol, Dummy, symbols
|
8b3c257fe98a2902e17eeb63f692400ba230287041627c51483201c01a441a97
|
"""
There are three types of functions implemented in SymPy:
1) defined functions (in the sense that they can be evaluated) like
exp or sin; they have a name and a body:
f = exp
2) undefined function which have a name but no body. Undefined
functions can be defined using a Function class as follows:
f = Function('f')
(the result will be a Function instance)
3) anonymous function (or lambda function) which have a body (defined
with dummy variables) but have no name:
f = Lambda(x, exp(x)*x)
f = Lambda((x, y), exp(x)*y)
The fourth type of functions are composites, like (sin + cos)(x); these work in
SymPy core, but are not yet part of SymPy.
Examples
========
>>> import sympy
>>> f = sympy.Function("f")
>>> from sympy.abc import x
>>> f(x)
f(x)
>>> print(sympy.srepr(f(x).func))
Function('f')
>>> f(x).args
(x,)
"""
from typing import Any, Dict as tDict, Optional, Set as tSet
from .add import Add
from .assumptions import ManagedProperties
from .basic import Basic, _atomic
from .cache import cacheit
from .compatibility import iterable, is_sequence, as_int, ordered, Iterable
from .decorators import _sympifyit
from .expr import Expr, AtomicExpr
from .numbers import Rational, Float
from .operations import LatticeOp
from .rules import Transform
from .singleton import S
from .sympify import sympify
from sympy.core.containers import Tuple, Dict
from sympy.core.parameters import global_parameters
from sympy.core.logic import fuzzy_and, fuzzy_or, fuzzy_not
from sympy.utilities import default_sort_key
from sympy.utilities.exceptions import SymPyDeprecationWarning
from sympy.utilities.iterables import has_dups, sift
from sympy.utilities.misc import filldedent
import mpmath
import mpmath.libmp as mlib
import inspect
from collections import Counter
def _coeff_isneg(a):
"""Return True if the leading Number is negative.
Examples
========
>>> from sympy.core.function import _coeff_isneg
>>> from sympy import S, Symbol, oo, pi
>>> _coeff_isneg(-3*pi)
True
>>> _coeff_isneg(S(3))
False
>>> _coeff_isneg(-oo)
True
>>> _coeff_isneg(Symbol('n', negative=True)) # coeff is 1
False
For matrix expressions:
>>> from sympy import MatrixSymbol, sqrt
>>> A = MatrixSymbol("A", 3, 3)
>>> _coeff_isneg(-sqrt(2)*A)
True
>>> _coeff_isneg(sqrt(2)*A)
False
"""
if a.is_MatMul:
a = a.args[0]
if a.is_Mul:
a = a.args[0]
return a.is_Number and a.is_extended_negative
class PoleError(Exception):
pass
class ArgumentIndexError(ValueError):
def __str__(self):
return ("Invalid operation with argument number %s for Function %s" %
(self.args[1], self.args[0]))
class BadSignatureError(TypeError):
'''Raised when a Lambda is created with an invalid signature'''
pass
class BadArgumentsError(TypeError):
'''Raised when a Lambda is called with an incorrect number of arguments'''
pass
# Python 2/3 version that does not raise a Deprecation warning
def arity(cls):
"""Return the arity of the function if it is known, else None.
When default values are specified for some arguments, they are
optional and the arity is reported as a tuple of possible values.
Examples
========
>>> from sympy.core.function import arity
>>> from sympy import log
>>> arity(lambda x: x)
1
>>> arity(log)
(1, 2)
>>> arity(lambda *x: sum(x)) is None
True
"""
eval_ = getattr(cls, 'eval', cls)
parameters = inspect.signature(eval_).parameters.items()
if [p for _, p in parameters if p.kind == p.VAR_POSITIONAL]:
return
p_or_k = [p for _, p in parameters if p.kind == p.POSITIONAL_OR_KEYWORD]
# how many have no default and how many have a default value
no, yes = map(len, sift(p_or_k,
lambda p:p.default == p.empty, binary=True))
return no if not yes else tuple(range(no, no + yes + 1))
class FunctionClass(ManagedProperties):
"""
Base class for function classes. FunctionClass is a subclass of type.
Use Function('<function name>' [ , signature ]) to create
undefined function classes.
"""
_new = type.__new__
def __init__(cls, *args, **kwargs):
# honor kwarg value or class-defined value before using
# the number of arguments in the eval function (if present)
nargs = kwargs.pop('nargs', cls.__dict__.get('nargs', arity(cls)))
if nargs is None and 'nargs' not in cls.__dict__:
for supcls in cls.__mro__:
if hasattr(supcls, '_nargs'):
nargs = supcls._nargs
break
else:
continue
# Canonicalize nargs here; change to set in nargs.
if is_sequence(nargs):
if not nargs:
raise ValueError(filldedent('''
Incorrectly specified nargs as %s:
if there are no arguments, it should be
`nargs = 0`;
if there are any number of arguments,
it should be
`nargs = None`''' % str(nargs)))
nargs = tuple(ordered(set(nargs)))
elif nargs is not None:
nargs = (as_int(nargs),)
cls._nargs = nargs
super().__init__(*args, **kwargs)
@property
def __signature__(self):
"""
Allow Python 3's inspect.signature to give a useful signature for
Function subclasses.
"""
# Python 3 only, but backports (like the one in IPython) still might
# call this.
try:
from inspect import signature
except ImportError:
return None
# TODO: Look at nargs
return signature(self.eval)
@property
def free_symbols(self):
return set()
@property
def xreplace(self):
# Function needs args so we define a property that returns
# a function that takes args...and then use that function
# to return the right value
return lambda rule, **_: rule.get(self, self)
@property
def nargs(self):
"""Return a set of the allowed number of arguments for the function.
Examples
========
>>> from sympy.core.function import Function
>>> f = Function('f')
If the function can take any number of arguments, the set of whole
numbers is returned:
>>> Function('f').nargs
Naturals0
If the function was initialized to accept one or more arguments, a
corresponding set will be returned:
>>> Function('f', nargs=1).nargs
FiniteSet(1)
>>> Function('f', nargs=(2, 1)).nargs
FiniteSet(1, 2)
The undefined function, after application, also has the nargs
attribute; the actual number of arguments is always available by
checking the ``args`` attribute:
>>> f = Function('f')
>>> f(1).nargs
Naturals0
>>> len(f(1).args)
1
"""
from sympy.sets.sets import FiniteSet
# XXX it would be nice to handle this in __init__ but there are import
# problems with trying to import FiniteSet there
return FiniteSet(*self._nargs) if self._nargs else S.Naturals0
def __repr__(cls):
return cls.__name__
class Application(Basic, metaclass=FunctionClass):
"""
Base class for applied functions.
Instances of Application represent the result of applying an application of
any type to any object.
"""
is_Function = True
@cacheit
def __new__(cls, *args, **options):
from sympy.sets.fancysets import Naturals0
from sympy.sets.sets import FiniteSet
args = list(map(sympify, args))
evaluate = options.pop('evaluate', global_parameters.evaluate)
# WildFunction (and anything else like it) may have nargs defined
# and we throw that value away here
options.pop('nargs', None)
if options:
raise ValueError("Unknown options: %s" % options)
if evaluate:
evaluated = cls.eval(*args)
if evaluated is not None:
return evaluated
obj = super().__new__(cls, *args, **options)
# make nargs uniform here
sentinel = object()
objnargs = getattr(obj, "nargs", sentinel)
if objnargs is not sentinel:
# things passing through here:
# - functions subclassed from Function (e.g. myfunc(1).nargs)
# - functions like cos(1).nargs
# - AppliedUndef with given nargs like Function('f', nargs=1)(1).nargs
# Canonicalize nargs here
if is_sequence(objnargs):
nargs = tuple(ordered(set(objnargs)))
elif objnargs is not None:
nargs = (as_int(objnargs),)
else:
nargs = None
else:
# things passing through here:
# - WildFunction('f').nargs
# - AppliedUndef with no nargs like Function('f')(1).nargs
nargs = obj._nargs # note the underscore here
# convert to FiniteSet
obj.nargs = FiniteSet(*nargs) if nargs else Naturals0()
return obj
@classmethod
def eval(cls, *args):
"""
Returns a canonical form of cls applied to arguments args.
The eval() method is called when the class cls is about to be
instantiated and it should return either some simplified instance
(possible of some other class), or if the class cls should be
unmodified, return None.
Examples of eval() for the function "sign"
---------------------------------------------
.. code-block:: python
@classmethod
def eval(cls, arg):
if arg is S.NaN:
return S.NaN
if arg.is_zero: return S.Zero
if arg.is_positive: return S.One
if arg.is_negative: return S.NegativeOne
if isinstance(arg, Mul):
coeff, terms = arg.as_coeff_Mul(rational=True)
if coeff is not S.One:
return cls(coeff) * cls(terms)
"""
return
@property
def func(self):
return self.__class__
def _eval_subs(self, old, new):
if (old.is_Function and new.is_Function and
callable(old) and callable(new) and
old == self.func and len(self.args) in new.nargs):
return new(*[i._subs(old, new) for i in self.args])
class Function(Application, Expr):
"""
Base class for applied mathematical functions.
It also serves as a constructor for undefined function classes.
Examples
========
First example shows how to use Function as a constructor for undefined
function classes:
>>> from sympy import Function, Symbol
>>> x = Symbol('x')
>>> f = Function('f')
>>> g = Function('g')(x)
>>> f
f
>>> f(x)
f(x)
>>> g
g(x)
>>> f(x).diff(x)
Derivative(f(x), x)
>>> g.diff(x)
Derivative(g(x), x)
Assumptions can be passed to Function, and if function is initialized with a
Symbol, the function inherits the name and assumptions associated with the Symbol:
>>> f_real = Function('f', real=True)
>>> f_real(x).is_real
True
>>> f_real_inherit = Function(Symbol('f', real=True))
>>> f_real_inherit(x).is_real
True
Note that assumptions on a function are unrelated to the assumptions on
the variable it is called on. If you want to add a relationship, subclass
Function and define the appropriate ``_eval_is_assumption`` methods.
In the following example Function is used as a base class for
``my_func`` that represents a mathematical function *my_func*. Suppose
that it is well known, that *my_func(0)* is *1* and *my_func* at infinity
goes to *0*, so we want those two simplifications to occur automatically.
Suppose also that *my_func(x)* is real exactly when *x* is real. Here is
an implementation that honours those requirements:
>>> from sympy import Function, S, oo, I, sin
>>> class my_func(Function):
...
... @classmethod
... def eval(cls, x):
... if x.is_Number:
... if x.is_zero:
... return S.One
... elif x is S.Infinity:
... return S.Zero
...
... def _eval_is_real(self):
... return self.args[0].is_real
...
>>> x = S('x')
>>> my_func(0) + sin(0)
1
>>> my_func(oo)
0
>>> my_func(3.54).n() # Not yet implemented for my_func.
my_func(3.54)
>>> my_func(I).is_real
False
In order for ``my_func`` to become useful, several other methods would
need to be implemented. See source code of some of the already
implemented functions for more complete examples.
Also, if the function can take more than one argument, then ``nargs``
must be defined, e.g. if ``my_func`` can take one or two arguments
then,
>>> class my_func(Function):
... nargs = (1, 2)
...
>>>
"""
@property
def _diff_wrt(self):
return False
@cacheit
def __new__(cls, *args, **options):
# Handle calls like Function('f')
if cls is Function:
return UndefinedFunction(*args, **options)
n = len(args)
if n not in cls.nargs:
# XXX: exception message must be in exactly this format to
# make it work with NumPy's functions like vectorize(). See,
# for example, https://github.com/numpy/numpy/issues/1697.
# The ideal solution would be just to attach metadata to
# the exception and change NumPy to take advantage of this.
temp = ('%(name)s takes %(qual)s %(args)s '
'argument%(plural)s (%(given)s given)')
raise TypeError(temp % {
'name': cls,
'qual': 'exactly' if len(cls.nargs) == 1 else 'at least',
'args': min(cls.nargs),
'plural': 's'*(min(cls.nargs) != 1),
'given': n})
evaluate = options.get('evaluate', global_parameters.evaluate)
result = super().__new__(cls, *args, **options)
if evaluate and isinstance(result, cls) and result.args:
pr2 = min(cls._should_evalf(a) for a in result.args)
if pr2 > 0:
pr = max(cls._should_evalf(a) for a in result.args)
result = result.evalf(mlib.libmpf.prec_to_dps(pr))
return result
@classmethod
def _should_evalf(cls, arg):
"""
Decide if the function should automatically evalf().
By default (in this implementation), this happens if (and only if) the
ARG is a floating point number.
This function is used by __new__.
Returns the precision to evalf to, or -1 if it shouldn't evalf.
"""
from sympy.core.evalf import pure_complex
if arg.is_Float:
return arg._prec
if not arg.is_Add:
return -1
m = pure_complex(arg)
if m is None or not (m[0].is_Float or m[1].is_Float):
return -1
l = [i._prec for i in m if i.is_Float]
l.append(-1)
return max(l)
@classmethod
def class_key(cls):
from sympy.sets.fancysets import Naturals0
funcs = {
'exp': 10,
'log': 11,
'sin': 20,
'cos': 21,
'tan': 22,
'cot': 23,
'sinh': 30,
'cosh': 31,
'tanh': 32,
'coth': 33,
'conjugate': 40,
're': 41,
'im': 42,
'arg': 43,
}
name = cls.__name__
try:
i = funcs[name]
except KeyError:
i = 0 if isinstance(cls.nargs, Naturals0) else 10000
return 4, i, name
def _eval_evalf(self, prec):
def _get_mpmath_func(fname):
"""Lookup mpmath function based on name"""
if isinstance(self, AppliedUndef):
# Shouldn't lookup in mpmath but might have ._imp_
return None
if not hasattr(mpmath, fname):
from sympy.utilities.lambdify import MPMATH_TRANSLATIONS
fname = MPMATH_TRANSLATIONS.get(fname, None)
if fname is None:
return None
return getattr(mpmath, fname)
func = _get_mpmath_func(self.func.__name__)
# Fall-back evaluation
if func is None:
imp = getattr(self, '_imp_', None)
if imp is None:
return None
try:
return Float(imp(*[i.evalf(prec) for i in self.args]), prec)
except (TypeError, ValueError):
return None
# Convert all args to mpf or mpc
# Convert the arguments to *higher* precision than requested for the
# final result.
# XXX + 5 is a guess, it is similar to what is used in evalf.py. Should
# we be more intelligent about it?
try:
args = [arg._to_mpmath(prec + 5) for arg in self.args]
def bad(m):
from mpmath import mpf, mpc
# the precision of an mpf value is the last element
# if that is 1 (and m[1] is not 1 which would indicate a
# power of 2), then the eval failed; so check that none of
# the arguments failed to compute to a finite precision.
# Note: An mpc value has two parts, the re and imag tuple;
# check each of those parts, too. Anything else is allowed to
# pass
if isinstance(m, mpf):
m = m._mpf_
return m[1] !=1 and m[-1] == 1
elif isinstance(m, mpc):
m, n = m._mpc_
return m[1] !=1 and m[-1] == 1 and \
n[1] !=1 and n[-1] == 1
else:
return False
if any(bad(a) for a in args):
raise ValueError # one or more args failed to compute with significance
except ValueError:
return
with mpmath.workprec(prec):
v = func(*args)
return Expr._from_mpmath(v, prec)
def _eval_derivative(self, s):
# f(x).diff(s) -> x.diff(s) * f.fdiff(1)(s)
i = 0
l = []
for a in self.args:
i += 1
da = a.diff(s)
if da.is_zero:
continue
try:
df = self.fdiff(i)
except ArgumentIndexError:
df = Function.fdiff(self, i)
l.append(df * da)
return Add(*l)
def _eval_is_commutative(self):
return fuzzy_and(a.is_commutative for a in self.args)
def _eval_is_meromorphic(self, x, a):
if not self.args:
return True
if any(arg.has(x) for arg in self.args[1:]):
return False
arg = self.args[0]
if not arg._eval_is_meromorphic(x, a):
return None
return fuzzy_not(type(self).is_singular(arg.subs(x, a)))
_singularities = None # indeterminate
@classmethod
def is_singular(cls, a):
"""
Tests whether the argument is an essential singularity
or a branch point, or the functions is non-holomorphic.
"""
ss = cls._singularities
if ss in (True, None, False):
return ss
return fuzzy_or(a.is_infinite if s is S.ComplexInfinity
else (a - s).is_zero for s in ss)
def as_base_exp(self):
"""
Returns the method as the 2-tuple (base, exponent).
"""
return self, S.One
def _eval_aseries(self, n, args0, x, logx):
"""
Compute an asymptotic expansion around args0, in terms of self.args.
This function is only used internally by _eval_nseries and should not
be called directly; derived classes can overwrite this to implement
asymptotic expansions.
"""
from sympy.utilities.misc import filldedent
raise PoleError(filldedent('''
Asymptotic expansion of %s around %s is
not implemented.''' % (type(self), args0)))
def _eval_nseries(self, x, n, logx, cdir=0):
"""
This function does compute series for multivariate functions,
but the expansion is always in terms of *one* variable.
Examples
========
>>> from sympy import atan2
>>> from sympy.abc import x, y
>>> atan2(x, y).series(x, n=2)
atan2(0, y) + x/y + O(x**2)
>>> atan2(x, y).series(y, n=2)
-y/x + atan2(x, 0) + O(y**2)
This function also computes asymptotic expansions, if necessary
and possible:
>>> from sympy import loggamma
>>> loggamma(1/x)._eval_nseries(x,0,None)
-1/x - log(x)/x + log(x)/2 + O(1)
"""
from sympy import Order
from sympy.sets.sets import FiniteSet
args = self.args
args0 = [t.limit(x, 0) for t in args]
if any(t.is_finite is False for t in args0):
from sympy import oo, zoo, nan
# XXX could use t.as_leading_term(x) here but it's a little
# slower
a = [t.compute_leading_term(x, logx=logx) for t in args]
a0 = [t.limit(x, 0) for t in a]
if any([t.has(oo, -oo, zoo, nan) for t in a0]):
return self._eval_aseries(n, args0, x, logx)
# Careful: the argument goes to oo, but only logarithmically so. We
# are supposed to do a power series expansion "around the
# logarithmic term". e.g.
# f(1+x+log(x))
# -> f(1+logx) + x*f'(1+logx) + O(x**2)
# where 'logx' is given in the argument
a = [t._eval_nseries(x, n, logx) for t in args]
z = [r - r0 for (r, r0) in zip(a, a0)]
p = [Dummy() for _ in z]
q = []
v = None
for ai, zi, pi in zip(a0, z, p):
if zi.has(x):
if v is not None:
raise NotImplementedError
q.append(ai + pi)
v = pi
else:
q.append(ai)
e1 = self.func(*q)
if v is None:
return e1
s = e1._eval_nseries(v, n, logx)
o = s.getO()
s = s.removeO()
s = s.subs(v, zi).expand() + Order(o.expr.subs(v, zi), x)
return s
if (self.func.nargs is S.Naturals0
or (self.func.nargs == FiniteSet(1) and args0[0])
or any(c > 1 for c in self.func.nargs)):
e = self
e1 = e.expand()
if e == e1:
#for example when e = sin(x+1) or e = sin(cos(x))
#let's try the general algorithm
if len(e.args) == 1:
# issue 14411
e = e.func(e.args[0].cancel())
term = e.subs(x, S.Zero)
if term.is_finite is False or term is S.NaN:
raise PoleError("Cannot expand %s around 0" % (self))
series = term
fact = S.One
_x = Dummy('x')
e = e.subs(x, _x)
for i in range(n - 1):
i += 1
fact *= Rational(i)
e = e.diff(_x)
subs = e.subs(_x, S.Zero)
if subs is S.NaN:
# try to evaluate a limit if we have to
subs = e.limit(_x, S.Zero)
if subs.is_finite is False:
raise PoleError("Cannot expand %s around 0" % (self))
term = subs*(x**i)/fact
term = term.expand()
series += term
return series + Order(x**n, x)
return e1.nseries(x, n=n, logx=logx)
arg = self.args[0]
l = []
g = None
# try to predict a number of terms needed
nterms = n + 2
cf = Order(arg.as_leading_term(x), x).getn()
if cf != 0:
nterms = (n/cf).ceiling()
for i in range(nterms):
g = self.taylor_term(i, arg, g)
g = g.nseries(x, n=n, logx=logx)
l.append(g)
return Add(*l) + Order(x**n, x)
def fdiff(self, argindex=1):
"""
Returns the first derivative of the function.
"""
if not (1 <= argindex <= len(self.args)):
raise ArgumentIndexError(self, argindex)
ix = argindex - 1
A = self.args[ix]
if A._diff_wrt:
if len(self.args) == 1 or not A.is_Symbol:
return Derivative(self, A)
for i, v in enumerate(self.args):
if i != ix and A in v.free_symbols:
# it can't be in any other argument's free symbols
# issue 8510
break
else:
return Derivative(self, A)
# See issue 4624 and issue 4719, 5600 and 8510
D = Dummy('xi_%i' % argindex, dummy_index=hash(A))
args = self.args[:ix] + (D,) + self.args[ix + 1:]
return Subs(Derivative(self.func(*args), D), D, A)
def _eval_as_leading_term(self, x, cdir=0):
"""Stub that should be overridden by new Functions to return
the first non-zero term in a series if ever an x-dependent
argument whose leading term vanishes as x -> 0 might be encountered.
See, for example, cos._eval_as_leading_term.
"""
from sympy import Order
args = [a.as_leading_term(x) for a in self.args]
o = Order(1, x)
if any(x in a.free_symbols and o.contains(a) for a in args):
# Whereas x and any finite number are contained in O(1, x),
# expressions like 1/x are not. If any arg simplified to a
# vanishing expression as x -> 0 (like x or x**2, but not
# 3, 1/x, etc...) then the _eval_as_leading_term is needed
# to supply the first non-zero term of the series,
#
# e.g. expression leading term
# ---------- ------------
# cos(1/x) cos(1/x)
# cos(cos(x)) cos(1)
# cos(x) 1 <- _eval_as_leading_term needed
# sin(x) x <- _eval_as_leading_term needed
#
raise NotImplementedError(
'%s has no _eval_as_leading_term routine' % self.func)
else:
return self.func(*args)
def _sage_(self):
import sage.all as sage
fname = self.func.__name__
func = getattr(sage, fname, None)
args = [arg._sage_() for arg in self.args]
# In the case the function is not known in sage:
if func is None:
import sympy
if getattr(sympy, fname, None) is None:
# abstract function
return sage.function(fname)(*args)
else:
# the function defined in sympy is not known in sage
# this exception is caught in sage
raise AttributeError
return func(*args)
class AppliedUndef(Function):
"""
Base class for expressions resulting from the application of an undefined
function.
"""
is_number = False
def __new__(cls, *args, **options):
args = list(map(sympify, args))
u = [a.name for a in args if isinstance(a, UndefinedFunction)]
if u:
raise TypeError('Invalid argument: expecting an expression, not UndefinedFunction%s: %s' % (
's'*(len(u) > 1), ', '.join(u)))
obj = super().__new__(cls, *args, **options)
return obj
def _eval_as_leading_term(self, x, cdir=0):
return self
def _sage_(self):
import sage.all as sage
fname = str(self.func)
args = [arg._sage_() for arg in self.args]
func = sage.function(fname)(*args)
return func
@property
def _diff_wrt(self):
"""
Allow derivatives wrt to undefined functions.
Examples
========
>>> from sympy import Function, Symbol
>>> f = Function('f')
>>> x = Symbol('x')
>>> f(x)._diff_wrt
True
>>> f(x).diff(x)
Derivative(f(x), x)
"""
return True
class UndefSageHelper:
"""
Helper to facilitate Sage conversion.
"""
def __get__(self, ins, typ):
import sage.all as sage
if ins is None:
return lambda: sage.function(typ.__name__)
else:
args = [arg._sage_() for arg in ins.args]
return lambda : sage.function(ins.__class__.__name__)(*args)
_undef_sage_helper = UndefSageHelper()
class UndefinedFunction(FunctionClass):
"""
The (meta)class of undefined functions.
"""
def __new__(mcl, name, bases=(AppliedUndef,), __dict__=None, **kwargs):
from .symbol import _filter_assumptions
# Allow Function('f', real=True)
# and/or Function(Symbol('f', real=True))
assumptions, kwargs = _filter_assumptions(kwargs)
if isinstance(name, Symbol):
assumptions = name._merge(assumptions)
name = name.name
elif not isinstance(name, str):
raise TypeError('expecting string or Symbol for name')
else:
commutative = assumptions.get('commutative', None)
assumptions = Symbol(name, **assumptions).assumptions0
if commutative is None:
assumptions.pop('commutative')
__dict__ = __dict__ or {}
# put the `is_*` for into __dict__
__dict__.update({'is_%s' % k: v for k, v in assumptions.items()})
# You can add other attributes, although they do have to be hashable
# (but seriously, if you want to add anything other than assumptions,
# just subclass Function)
__dict__.update(kwargs)
# add back the sanitized assumptions without the is_ prefix
kwargs.update(assumptions)
# Save these for __eq__
__dict__.update({'_kwargs': kwargs})
# do this for pickling
__dict__['__module__'] = None
obj = super().__new__(mcl, name, bases, __dict__)
obj.name = name
obj._sage_ = _undef_sage_helper
return obj
def __instancecheck__(cls, instance):
return cls in type(instance).__mro__
_kwargs = {} # type: tDict[str, Optional[bool]]
def __hash__(self):
return hash((self.class_key(), frozenset(self._kwargs.items())))
def __eq__(self, other):
return (isinstance(other, self.__class__) and
self.class_key() == other.class_key() and
self._kwargs == other._kwargs)
def __ne__(self, other):
return not self == other
@property
def _diff_wrt(self):
return False
# XXX: The type: ignore on WildFunction is because mypy complains:
#
# sympy/core/function.py:939: error: Cannot determine type of 'sort_key' in
# base class 'Expr'
#
# Somehow this is because of the @cacheit decorator but it is not clear how to
# fix it.
class WildFunction(Function, AtomicExpr): # type: ignore
"""
A WildFunction function matches any function (with its arguments).
Examples
========
>>> from sympy import WildFunction, Function, cos
>>> from sympy.abc import x, y
>>> F = WildFunction('F')
>>> f = Function('f')
>>> F.nargs
Naturals0
>>> x.match(F)
>>> F.match(F)
{F_: F_}
>>> f(x).match(F)
{F_: f(x)}
>>> cos(x).match(F)
{F_: cos(x)}
>>> f(x, y).match(F)
{F_: f(x, y)}
To match functions with a given number of arguments, set ``nargs`` to the
desired value at instantiation:
>>> F = WildFunction('F', nargs=2)
>>> F.nargs
FiniteSet(2)
>>> f(x).match(F)
>>> f(x, y).match(F)
{F_: f(x, y)}
To match functions with a range of arguments, set ``nargs`` to a tuple
containing the desired number of arguments, e.g. if ``nargs = (1, 2)``
then functions with 1 or 2 arguments will be matched.
>>> F = WildFunction('F', nargs=(1, 2))
>>> F.nargs
FiniteSet(1, 2)
>>> f(x).match(F)
{F_: f(x)}
>>> f(x, y).match(F)
{F_: f(x, y)}
>>> f(x, y, 1).match(F)
"""
# XXX: What is this class attribute used for?
include = set() # type: tSet[Any]
def __init__(cls, name, **assumptions):
from sympy.sets.sets import Set, FiniteSet
cls.name = name
nargs = assumptions.pop('nargs', S.Naturals0)
if not isinstance(nargs, Set):
# Canonicalize nargs here. See also FunctionClass.
if is_sequence(nargs):
nargs = tuple(ordered(set(nargs)))
elif nargs is not None:
nargs = (as_int(nargs),)
nargs = FiniteSet(*nargs)
cls.nargs = nargs
def matches(self, expr, repl_dict={}, old=False):
if not isinstance(expr, (AppliedUndef, Function)):
return None
if len(expr.args) not in self.nargs:
return None
repl_dict = repl_dict.copy()
repl_dict[self] = expr
return repl_dict
class Derivative(Expr):
"""
Carries out differentiation of the given expression with respect to symbols.
Examples
========
>>> from sympy import Derivative, Function, symbols, Subs
>>> from sympy.abc import x, y
>>> f, g = symbols('f g', cls=Function)
>>> Derivative(x**2, x, evaluate=True)
2*x
Denesting of derivatives retains the ordering of variables:
>>> Derivative(Derivative(f(x, y), y), x)
Derivative(f(x, y), y, x)
Contiguously identical symbols are merged into a tuple giving
the symbol and the count:
>>> Derivative(f(x), x, x, y, x)
Derivative(f(x), (x, 2), y, x)
If the derivative cannot be performed, and evaluate is True, the
order of the variables of differentiation will be made canonical:
>>> Derivative(f(x, y), y, x, evaluate=True)
Derivative(f(x, y), x, y)
Derivatives with respect to undefined functions can be calculated:
>>> Derivative(f(x)**2, f(x), evaluate=True)
2*f(x)
Such derivatives will show up when the chain rule is used to
evalulate a derivative:
>>> f(g(x)).diff(x)
Derivative(f(g(x)), g(x))*Derivative(g(x), x)
Substitution is used to represent derivatives of functions with
arguments that are not symbols or functions:
>>> f(2*x + 3).diff(x) == 2*Subs(f(y).diff(y), y, 2*x + 3)
True
Notes
=====
Simplification of high-order derivatives:
Because there can be a significant amount of simplification that can be
done when multiple differentiations are performed, results will be
automatically simplified in a fairly conservative fashion unless the
keyword ``simplify`` is set to False.
>>> from sympy import sqrt, diff, Function, symbols
>>> from sympy.abc import x, y, z
>>> f, g = symbols('f,g', cls=Function)
>>> e = sqrt((x + 1)**2 + x)
>>> diff(e, (x, 5), simplify=False).count_ops()
136
>>> diff(e, (x, 5)).count_ops()
30
Ordering of variables:
If evaluate is set to True and the expression cannot be evaluated, the
list of differentiation symbols will be sorted, that is, the expression is
assumed to have continuous derivatives up to the order asked.
Derivative wrt non-Symbols:
For the most part, one may not differentiate wrt non-symbols.
For example, we do not allow differentiation wrt `x*y` because
there are multiple ways of structurally defining where x*y appears
in an expression: a very strict definition would make
(x*y*z).diff(x*y) == 0. Derivatives wrt defined functions (like
cos(x)) are not allowed, either:
>>> (x*y*z).diff(x*y)
Traceback (most recent call last):
...
ValueError: Can't calculate derivative wrt x*y.
To make it easier to work with variational calculus, however,
derivatives wrt AppliedUndef and Derivatives are allowed.
For example, in the Euler-Lagrange method one may write
F(t, u, v) where u = f(t) and v = f'(t). These variables can be
written explicitly as functions of time::
>>> from sympy.abc import t
>>> F = Function('F')
>>> U = f(t)
>>> V = U.diff(t)
The derivative wrt f(t) can be obtained directly:
>>> direct = F(t, U, V).diff(U)
When differentiation wrt a non-Symbol is attempted, the non-Symbol
is temporarily converted to a Symbol while the differentiation
is performed and the same answer is obtained:
>>> indirect = F(t, U, V).subs(U, x).diff(x).subs(x, U)
>>> assert direct == indirect
The implication of this non-symbol replacement is that all
functions are treated as independent of other functions and the
symbols are independent of the functions that contain them::
>>> x.diff(f(x))
0
>>> g(x).diff(f(x))
0
It also means that derivatives are assumed to depend only
on the variables of differentiation, not on anything contained
within the expression being differentiated::
>>> F = f(x)
>>> Fx = F.diff(x)
>>> Fx.diff(F) # derivative depends on x, not F
0
>>> Fxx = Fx.diff(x)
>>> Fxx.diff(Fx) # derivative depends on x, not Fx
0
The last example can be made explicit by showing the replacement
of Fx in Fxx with y:
>>> Fxx.subs(Fx, y)
Derivative(y, x)
Since that in itself will evaluate to zero, differentiating
wrt Fx will also be zero:
>>> _.doit()
0
Replacing undefined functions with concrete expressions
One must be careful to replace undefined functions with expressions
that contain variables consistent with the function definition and
the variables of differentiation or else insconsistent result will
be obtained. Consider the following example:
>>> eq = f(x)*g(y)
>>> eq.subs(f(x), x*y).diff(x, y).doit()
y*Derivative(g(y), y) + g(y)
>>> eq.diff(x, y).subs(f(x), x*y).doit()
y*Derivative(g(y), y)
The results differ because `f(x)` was replaced with an expression
that involved both variables of differentiation. In the abstract
case, differentiation of `f(x)` by `y` is 0; in the concrete case,
the presence of `y` made that derivative nonvanishing and produced
the extra `g(y)` term.
Defining differentiation for an object
An object must define ._eval_derivative(symbol) method that returns
the differentiation result. This function only needs to consider the
non-trivial case where expr contains symbol and it should call the diff()
method internally (not _eval_derivative); Derivative should be the only
one to call _eval_derivative.
Any class can allow derivatives to be taken with respect to
itself (while indicating its scalar nature). See the
docstring of Expr._diff_wrt.
See Also
========
_sort_variable_count
"""
is_Derivative = True
@property
def _diff_wrt(self):
"""An expression may be differentiated wrt a Derivative if
it is in elementary form.
Examples
========
>>> from sympy import Function, Derivative, cos
>>> from sympy.abc import x
>>> f = Function('f')
>>> Derivative(f(x), x)._diff_wrt
True
>>> Derivative(cos(x), x)._diff_wrt
False
>>> Derivative(x + 1, x)._diff_wrt
False
A Derivative might be an unevaluated form of what will not be
a valid variable of differentiation if evaluated. For example,
>>> Derivative(f(f(x)), x).doit()
Derivative(f(x), x)*Derivative(f(f(x)), f(x))
Such an expression will present the same ambiguities as arise
when dealing with any other product, like ``2*x``, so ``_diff_wrt``
is False:
>>> Derivative(f(f(x)), x)._diff_wrt
False
"""
return self.expr._diff_wrt and isinstance(self.doit(), Derivative)
def __new__(cls, expr, *variables, **kwargs):
from sympy.matrices.common import MatrixCommon
from sympy import Integer, MatrixExpr
from sympy.tensor.array import Array, NDimArray
from sympy.utilities.misc import filldedent
expr = sympify(expr)
symbols_or_none = getattr(expr, "free_symbols", None)
has_symbol_set = isinstance(symbols_or_none, set)
if not has_symbol_set:
raise ValueError(filldedent('''
Since there are no variables in the expression %s,
it cannot be differentiated.''' % expr))
# determine value for variables if it wasn't given
if not variables:
variables = expr.free_symbols
if len(variables) != 1:
if expr.is_number:
return S.Zero
if len(variables) == 0:
raise ValueError(filldedent('''
Since there are no variables in the expression,
the variable(s) of differentiation must be supplied
to differentiate %s''' % expr))
else:
raise ValueError(filldedent('''
Since there is more than one variable in the
expression, the variable(s) of differentiation
must be supplied to differentiate %s''' % expr))
# Standardize the variables by sympifying them:
variables = list(sympify(variables))
# Split the list of variables into a list of the variables we are diff
# wrt, where each element of the list has the form (s, count) where
# s is the entity to diff wrt and count is the order of the
# derivative.
variable_count = []
array_likes = (tuple, list, Tuple)
for i, v in enumerate(variables):
if isinstance(v, Integer):
if i == 0:
raise ValueError("First variable cannot be a number: %i" % v)
count = v
prev, prevcount = variable_count[-1]
if prevcount != 1:
raise TypeError("tuple {} followed by number {}".format((prev, prevcount), v))
if count == 0:
variable_count.pop()
else:
variable_count[-1] = Tuple(prev, count)
else:
if isinstance(v, array_likes):
if len(v) == 0:
# Ignore empty tuples: Derivative(expr, ... , (), ... )
continue
if isinstance(v[0], array_likes):
# Derive by array: Derivative(expr, ... , [[x, y, z]], ... )
if len(v) == 1:
v = Array(v[0])
count = 1
else:
v, count = v
v = Array(v)
else:
v, count = v
if count == 0:
continue
elif isinstance(v, UndefinedFunction):
raise TypeError(
"cannot differentiate wrt "
"UndefinedFunction: %s" % v)
else:
count = 1
variable_count.append(Tuple(v, count))
# light evaluation of contiguous, identical
# items: (x, 1), (x, 1) -> (x, 2)
merged = []
for t in variable_count:
v, c = t
if c.is_negative:
raise ValueError(
'order of differentiation must be nonnegative')
if merged and merged[-1][0] == v:
c += merged[-1][1]
if not c:
merged.pop()
else:
merged[-1] = Tuple(v, c)
else:
merged.append(t)
variable_count = merged
# sanity check of variables of differentation; we waited
# until the counts were computed since some variables may
# have been removed because the count was 0
for v, c in variable_count:
# v must have _diff_wrt True
if not v._diff_wrt:
__ = '' # filler to make error message neater
raise ValueError(filldedent('''
Can't calculate derivative wrt %s.%s''' % (v,
__)))
# We make a special case for 0th derivative, because there is no
# good way to unambiguously print this.
if len(variable_count) == 0:
return expr
evaluate = kwargs.get('evaluate', False)
if evaluate:
if isinstance(expr, Derivative):
expr = expr.canonical
variable_count = [
(v.canonical if isinstance(v, Derivative) else v, c)
for v, c in variable_count]
# Look for a quick exit if there are symbols that don't appear in
# expression at all. Note, this cannot check non-symbols like
# Derivatives as those can be created by intermediate
# derivatives.
zero = False
free = expr.free_symbols
for v, c in variable_count:
vfree = v.free_symbols
if c.is_positive and vfree:
if isinstance(v, AppliedUndef):
# these match exactly since
# x.diff(f(x)) == g(x).diff(f(x)) == 0
# and are not created by differentiation
D = Dummy()
if not expr.xreplace({v: D}).has(D):
zero = True
break
elif isinstance(v, MatrixExpr):
zero = False
break
elif isinstance(v, Symbol) and v not in free:
zero = True
break
else:
if not free & vfree:
# e.g. v is IndexedBase or Matrix
zero = True
break
if zero:
if isinstance(expr, (MatrixCommon, NDimArray)):
return expr.zeros(*expr.shape)
elif isinstance(expr, MatrixExpr):
from sympy import ZeroMatrix
return ZeroMatrix(*expr.shape)
elif expr.is_scalar:
return S.Zero
# make the order of symbols canonical
#TODO: check if assumption of discontinuous derivatives exist
variable_count = cls._sort_variable_count(variable_count)
# denest
if isinstance(expr, Derivative):
variable_count = list(expr.variable_count) + variable_count
expr = expr.expr
return Derivative(expr, *variable_count, **kwargs)
# we return here if evaluate is False or if there is no
# _eval_derivative method
if not evaluate or not hasattr(expr, '_eval_derivative'):
# return an unevaluated Derivative
if evaluate and variable_count == [(expr, 1)] and expr.is_scalar:
# special hack providing evaluation for classes
# that have defined is_scalar=True but have no
# _eval_derivative defined
return S.One
return Expr.__new__(cls, expr, *variable_count)
# evaluate the derivative by calling _eval_derivative method
# of expr for each variable
# -------------------------------------------------------------
nderivs = 0 # how many derivatives were performed
unhandled = []
for i, (v, count) in enumerate(variable_count):
old_expr = expr
old_v = None
is_symbol = v.is_symbol or isinstance(v,
(Iterable, Tuple, MatrixCommon, NDimArray))
if not is_symbol:
old_v = v
v = Dummy('xi')
expr = expr.xreplace({old_v: v})
# Derivatives and UndefinedFunctions are independent
# of all others
clashing = not (isinstance(old_v, Derivative) or \
isinstance(old_v, AppliedUndef))
if not v in expr.free_symbols and not clashing:
return expr.diff(v) # expr's version of 0
if not old_v.is_scalar and not hasattr(
old_v, '_eval_derivative'):
# special hack providing evaluation for classes
# that have defined is_scalar=True but have no
# _eval_derivative defined
expr *= old_v.diff(old_v)
# Evaluate the derivative `n` times. If
# `_eval_derivative_n_times` is not overridden by the current
# object, the default in `Basic` will call a loop over
# `_eval_derivative`:
obj = expr._eval_derivative_n_times(v, count)
if obj is not None and obj.is_zero:
return obj
nderivs += count
if old_v is not None:
if obj is not None:
# remove the dummy that was used
obj = obj.subs(v, old_v)
# restore expr
expr = old_expr
if obj is None:
# we've already checked for quick-exit conditions
# that give 0 so the remaining variables
# are contained in the expression but the expression
# did not compute a derivative so we stop taking
# derivatives
unhandled = variable_count[i:]
break
expr = obj
# what we have so far can be made canonical
expr = expr.replace(
lambda x: isinstance(x, Derivative),
lambda x: x.canonical)
if unhandled:
if isinstance(expr, Derivative):
unhandled = list(expr.variable_count) + unhandled
expr = expr.expr
expr = Expr.__new__(cls, expr, *unhandled)
if (nderivs > 1) == True and kwargs.get('simplify', True):
from sympy.core.exprtools import factor_terms
from sympy.simplify.simplify import signsimp
expr = factor_terms(signsimp(expr))
return expr
@property
def canonical(cls):
return cls.func(cls.expr,
*Derivative._sort_variable_count(cls.variable_count))
@classmethod
def _sort_variable_count(cls, vc):
"""
Sort (variable, count) pairs into canonical order while
retaining order of variables that do not commute during
differentiation:
* symbols and functions commute with each other
* derivatives commute with each other
* a derivative doesn't commute with anything it contains
* any other object is not allowed to commute if it has
free symbols in common with another object
Examples
========
>>> from sympy import Derivative, Function, symbols
>>> vsort = Derivative._sort_variable_count
>>> x, y, z = symbols('x y z')
>>> f, g, h = symbols('f g h', cls=Function)
Contiguous items are collapsed into one pair:
>>> vsort([(x, 1), (x, 1)])
[(x, 2)]
>>> vsort([(y, 1), (f(x), 1), (y, 1), (f(x), 1)])
[(y, 2), (f(x), 2)]
Ordering is canonical.
>>> def vsort0(*v):
... # docstring helper to
... # change vi -> (vi, 0), sort, and return vi vals
... return [i[0] for i in vsort([(i, 0) for i in v])]
>>> vsort0(y, x)
[x, y]
>>> vsort0(g(y), g(x), f(y))
[f(y), g(x), g(y)]
Symbols are sorted as far to the left as possible but never
move to the left of a derivative having the same symbol in
its variables; the same applies to AppliedUndef which are
always sorted after Symbols:
>>> dfx = f(x).diff(x)
>>> assert vsort0(dfx, y) == [y, dfx]
>>> assert vsort0(dfx, x) == [dfx, x]
"""
from sympy.utilities.iterables import uniq, topological_sort
if not vc:
return []
vc = list(vc)
if len(vc) == 1:
return [Tuple(*vc[0])]
V = list(range(len(vc)))
E = []
v = lambda i: vc[i][0]
D = Dummy()
def _block(d, v, wrt=False):
# return True if v should not come before d else False
if d == v:
return wrt
if d.is_Symbol:
return False
if isinstance(d, Derivative):
# a derivative blocks if any of it's variables contain
# v; the wrt flag will return True for an exact match
# and will cause an AppliedUndef to block if v is in
# the arguments
if any(_block(k, v, wrt=True)
for k in d._wrt_variables):
return True
return False
if not wrt and isinstance(d, AppliedUndef):
return False
if v.is_Symbol:
return v in d.free_symbols
if isinstance(v, AppliedUndef):
return _block(d.xreplace({v: D}), D)
return d.free_symbols & v.free_symbols
for i in range(len(vc)):
for j in range(i):
if _block(v(j), v(i)):
E.append((j,i))
# this is the default ordering to use in case of ties
O = dict(zip(ordered(uniq([i for i, c in vc])), range(len(vc))))
ix = topological_sort((V, E), key=lambda i: O[v(i)])
# merge counts of contiguously identical items
merged = []
for v, c in [vc[i] for i in ix]:
if merged and merged[-1][0] == v:
merged[-1][1] += c
else:
merged.append([v, c])
return [Tuple(*i) for i in merged]
def _eval_is_commutative(self):
return self.expr.is_commutative
def _eval_derivative(self, v):
# If v (the variable of differentiation) is not in
# self.variables, we might be able to take the derivative.
if v not in self._wrt_variables:
dedv = self.expr.diff(v)
if isinstance(dedv, Derivative):
return dedv.func(dedv.expr, *(self.variable_count + dedv.variable_count))
# dedv (d(self.expr)/dv) could have simplified things such that the
# derivative wrt things in self.variables can now be done. Thus,
# we set evaluate=True to see if there are any other derivatives
# that can be done. The most common case is when dedv is a simple
# number so that the derivative wrt anything else will vanish.
return self.func(dedv, *self.variables, evaluate=True)
# In this case v was in self.variables so the derivative wrt v has
# already been attempted and was not computed, either because it
# couldn't be or evaluate=False originally.
variable_count = list(self.variable_count)
variable_count.append((v, 1))
return self.func(self.expr, *variable_count, evaluate=False)
def doit(self, **hints):
expr = self.expr
if hints.get('deep', True):
expr = expr.doit(**hints)
hints['evaluate'] = True
rv = self.func(expr, *self.variable_count, **hints)
if rv!= self and rv.has(Derivative):
rv = rv.doit(**hints)
return rv
@_sympifyit('z0', NotImplementedError)
def doit_numerically(self, z0):
"""
Evaluate the derivative at z numerically.
When we can represent derivatives at a point, this should be folded
into the normal evalf. For now, we need a special method.
"""
if len(self.free_symbols) != 1 or len(self.variables) != 1:
raise NotImplementedError('partials and higher order derivatives')
z = list(self.free_symbols)[0]
def eval(x):
f0 = self.expr.subs(z, Expr._from_mpmath(x, prec=mpmath.mp.prec))
f0 = f0.evalf(mlib.libmpf.prec_to_dps(mpmath.mp.prec))
return f0._to_mpmath(mpmath.mp.prec)
return Expr._from_mpmath(mpmath.diff(eval,
z0._to_mpmath(mpmath.mp.prec)),
mpmath.mp.prec)
@property
def expr(self):
return self._args[0]
@property
def _wrt_variables(self):
# return the variables of differentiation without
# respect to the type of count (int or symbolic)
return [i[0] for i in self.variable_count]
@property
def variables(self):
# TODO: deprecate? YES, make this 'enumerated_variables' and
# name _wrt_variables as variables
# TODO: support for `d^n`?
rv = []
for v, count in self.variable_count:
if not count.is_Integer:
raise TypeError(filldedent('''
Cannot give expansion for symbolic count. If you just
want a list of all variables of differentiation, use
_wrt_variables.'''))
rv.extend([v]*count)
return tuple(rv)
@property
def variable_count(self):
return self._args[1:]
@property
def derivative_count(self):
return sum([count for var, count in self.variable_count], 0)
@property
def free_symbols(self):
ret = self.expr.free_symbols
# Add symbolic counts to free_symbols
for var, count in self.variable_count:
ret.update(count.free_symbols)
return ret
def _eval_subs(self, old, new):
# The substitution (old, new) cannot be done inside
# Derivative(expr, vars) for a variety of reasons
# as handled below.
if old in self._wrt_variables:
# first handle the counts
expr = self.func(self.expr, *[(v, c.subs(old, new))
for v, c in self.variable_count])
if expr != self:
return expr._eval_subs(old, new)
# quick exit case
if not getattr(new, '_diff_wrt', False):
# case (0): new is not a valid variable of
# differentiation
if isinstance(old, Symbol):
# don't introduce a new symbol if the old will do
return Subs(self, old, new)
else:
xi = Dummy('xi')
return Subs(self.xreplace({old: xi}), xi, new)
# If both are Derivatives with the same expr, check if old is
# equivalent to self or if old is a subderivative of self.
if old.is_Derivative and old.expr == self.expr:
if self.canonical == old.canonical:
return new
# collections.Counter doesn't have __le__
def _subset(a, b):
return all((a[i] <= b[i]) == True for i in a)
old_vars = Counter(dict(reversed(old.variable_count)))
self_vars = Counter(dict(reversed(self.variable_count)))
if _subset(old_vars, self_vars):
return Derivative(new, *(self_vars - old_vars).items()).canonical
args = list(self.args)
newargs = list(x._subs(old, new) for x in args)
if args[0] == old:
# complete replacement of self.expr
# we already checked that the new is valid so we know
# it won't be a problem should it appear in variables
return Derivative(*newargs)
if newargs[0] != args[0]:
# case (1) can't change expr by introducing something that is in
# the _wrt_variables if it was already in the expr
# e.g.
# for Derivative(f(x, g(y)), y), x cannot be replaced with
# anything that has y in it; for f(g(x), g(y)).diff(g(y))
# g(x) cannot be replaced with anything that has g(y)
syms = {vi: Dummy() for vi in self._wrt_variables
if not vi.is_Symbol}
wrt = {syms.get(vi, vi) for vi in self._wrt_variables}
forbidden = args[0].xreplace(syms).free_symbols & wrt
nfree = new.xreplace(syms).free_symbols
ofree = old.xreplace(syms).free_symbols
if (nfree - ofree) & forbidden:
return Subs(self, old, new)
viter = ((i, j) for ((i, _), (j, _)) in zip(newargs[1:], args[1:]))
if any(i != j for i, j in viter): # a wrt-variable change
# case (2) can't change vars by introducing a variable
# that is contained in expr, e.g.
# for Derivative(f(z, g(h(x), y)), y), y cannot be changed to
# x, h(x), or g(h(x), y)
for a in _atomic(self.expr, recursive=True):
for i in range(1, len(newargs)):
vi, _ = newargs[i]
if a == vi and vi != args[i][0]:
return Subs(self, old, new)
# more arg-wise checks
vc = newargs[1:]
oldv = self._wrt_variables
newe = self.expr
subs = []
for i, (vi, ci) in enumerate(vc):
if not vi._diff_wrt:
# case (3) invalid differentiation expression so
# create a replacement dummy
xi = Dummy('xi_%i' % i)
# replace the old valid variable with the dummy
# in the expression
newe = newe.xreplace({oldv[i]: xi})
# and replace the bad variable with the dummy
vc[i] = (xi, ci)
# and record the dummy with the new (invalid)
# differentiation expression
subs.append((xi, vi))
if subs:
# handle any residual substitution in the expression
newe = newe._subs(old, new)
# return the Subs-wrapped derivative
return Subs(Derivative(newe, *vc), *zip(*subs))
# everything was ok
return Derivative(*newargs)
def _eval_lseries(self, x, logx, cdir=0):
dx = self.variables
for term in self.expr.lseries(x, logx=logx, cdir=cdir):
yield self.func(term, *dx)
def _eval_nseries(self, x, n, logx, cdir=0):
arg = self.expr.nseries(x, n=n, logx=logx)
o = arg.getO()
dx = self.variables
rv = [self.func(a, *dx) for a in Add.make_args(arg.removeO())]
if o:
rv.append(o/x)
return Add(*rv)
def _eval_as_leading_term(self, x, cdir=0):
series_gen = self.expr.lseries(x)
d = S.Zero
for leading_term in series_gen:
d = diff(leading_term, *self.variables)
if d != 0:
break
return d
def _sage_(self):
import sage.all as sage
args = [arg._sage_() for arg in self.args]
return sage.derivative(*args)
def as_finite_difference(self, points=1, x0=None, wrt=None):
""" Expresses a Derivative instance as a finite difference.
Parameters
==========
points : sequence or coefficient, optional
If sequence: discrete values (length >= order+1) of the
independent variable used for generating the finite
difference weights.
If it is a coefficient, it will be used as the step-size
for generating an equidistant sequence of length order+1
centered around ``x0``. Default: 1 (step-size 1)
x0 : number or Symbol, optional
the value of the independent variable (``wrt``) at which the
derivative is to be approximated. Default: same as ``wrt``.
wrt : Symbol, optional
"with respect to" the variable for which the (partial)
derivative is to be approximated for. If not provided it
is required that the derivative is ordinary. Default: ``None``.
Examples
========
>>> from sympy import symbols, Function, exp, sqrt, Symbol
>>> x, h = symbols('x h')
>>> f = Function('f')
>>> f(x).diff(x).as_finite_difference()
-f(x - 1/2) + f(x + 1/2)
The default step size and number of points are 1 and
``order + 1`` respectively. We can change the step size by
passing a symbol as a parameter:
>>> f(x).diff(x).as_finite_difference(h)
-f(-h/2 + x)/h + f(h/2 + x)/h
We can also specify the discretized values to be used in a
sequence:
>>> f(x).diff(x).as_finite_difference([x, x+h, x+2*h])
-3*f(x)/(2*h) + 2*f(h + x)/h - f(2*h + x)/(2*h)
The algorithm is not restricted to use equidistant spacing, nor
do we need to make the approximation around ``x0``, but we can get
an expression estimating the derivative at an offset:
>>> e, sq2 = exp(1), sqrt(2)
>>> xl = [x-h, x+h, x+e*h]
>>> f(x).diff(x, 1).as_finite_difference(xl, x+h*sq2) # doctest: +ELLIPSIS
2*h*((h + sqrt(2)*h)/(2*h) - (-sqrt(2)*h + h)/(2*h))*f(E*h + x)/...
To approximate ``Derivative`` around ``x0`` using a non-equidistant
spacing step, the algorithm supports assignment of undefined
functions to ``points``:
>>> dx = Function('dx')
>>> f(x).diff(x).as_finite_difference(points=dx(x), x0=x-h)
-f(-h + x - dx(-h + x)/2)/dx(-h + x) + f(-h + x + dx(-h + x)/2)/dx(-h + x)
Partial derivatives are also supported:
>>> y = Symbol('y')
>>> d2fdxdy=f(x,y).diff(x,y)
>>> d2fdxdy.as_finite_difference(wrt=x)
-Derivative(f(x - 1/2, y), y) + Derivative(f(x + 1/2, y), y)
We can apply ``as_finite_difference`` to ``Derivative`` instances in
compound expressions using ``replace``:
>>> (1 + 42**f(x).diff(x)).replace(lambda arg: arg.is_Derivative,
... lambda arg: arg.as_finite_difference())
42**(-f(x - 1/2) + f(x + 1/2)) + 1
See also
========
sympy.calculus.finite_diff.apply_finite_diff
sympy.calculus.finite_diff.differentiate_finite
sympy.calculus.finite_diff.finite_diff_weights
"""
from ..calculus.finite_diff import _as_finite_diff
return _as_finite_diff(self, points, x0, wrt)
class Lambda(Expr):
"""
Lambda(x, expr) represents a lambda function similar to Python's
'lambda x: expr'. A function of several variables is written as
Lambda((x, y, ...), expr).
Examples
========
A simple example:
>>> from sympy import Lambda
>>> from sympy.abc import x
>>> f = Lambda(x, x**2)
>>> f(4)
16
For multivariate functions, use:
>>> from sympy.abc import y, z, t
>>> f2 = Lambda((x, y, z, t), x + y**z + t**z)
>>> f2(1, 2, 3, 4)
73
It is also possible to unpack tuple arguments:
>>> f = Lambda( ((x, y), z) , x + y + z)
>>> f((1, 2), 3)
6
A handy shortcut for lots of arguments:
>>> p = x, y, z
>>> f = Lambda(p, x + y*z)
>>> f(*p)
x + y*z
"""
is_Function = True
def __new__(cls, signature, expr):
if iterable(signature) and not isinstance(signature, (tuple, Tuple)):
SymPyDeprecationWarning(
feature="non tuple iterable of argument symbols to Lambda",
useinstead="tuple of argument symbols",
issue=17474,
deprecated_since_version="1.5").warn()
signature = tuple(signature)
sig = signature if iterable(signature) else (signature,)
sig = sympify(sig)
cls._check_signature(sig)
if len(sig) == 1 and sig[0] == expr:
return S.IdentityFunction
return Expr.__new__(cls, sig, sympify(expr))
@classmethod
def _check_signature(cls, sig):
syms = set()
def rcheck(args):
for a in args:
if a.is_symbol:
if a in syms:
raise BadSignatureError("Duplicate symbol %s" % a)
syms.add(a)
elif isinstance(a, Tuple):
rcheck(a)
else:
raise BadSignatureError("Lambda signature should be only tuples"
" and symbols, not %s" % a)
if not isinstance(sig, Tuple):
raise BadSignatureError("Lambda signature should be a tuple not %s" % sig)
# Recurse through the signature:
rcheck(sig)
@property
def signature(self):
"""The expected form of the arguments to be unpacked into variables"""
return self._args[0]
@property
def expr(self):
"""The return value of the function"""
return self._args[1]
@property
def variables(self):
"""The variables used in the internal representation of the function"""
def _variables(args):
if isinstance(args, Tuple):
for arg in args:
yield from _variables(arg)
else:
yield args
return tuple(_variables(self.signature))
@property
def nargs(self):
from sympy.sets.sets import FiniteSet
return FiniteSet(len(self.signature))
bound_symbols = variables
@property
def free_symbols(self):
return self.expr.free_symbols - set(self.variables)
def __call__(self, *args):
n = len(args)
if n not in self.nargs: # Lambda only ever has 1 value in nargs
# XXX: exception message must be in exactly this format to
# make it work with NumPy's functions like vectorize(). See,
# for example, https://github.com/numpy/numpy/issues/1697.
# The ideal solution would be just to attach metadata to
# the exception and change NumPy to take advantage of this.
## XXX does this apply to Lambda? If not, remove this comment.
temp = ('%(name)s takes exactly %(args)s '
'argument%(plural)s (%(given)s given)')
raise BadArgumentsError(temp % {
'name': self,
'args': list(self.nargs)[0],
'plural': 's'*(list(self.nargs)[0] != 1),
'given': n})
d = self._match_signature(self.signature, args)
return self.expr.xreplace(d)
def _match_signature(self, sig, args):
symargmap = {}
def rmatch(pars, args):
for par, arg in zip(pars, args):
if par.is_symbol:
symargmap[par] = arg
elif isinstance(par, Tuple):
if not isinstance(arg, (tuple, Tuple)) or len(args) != len(pars):
raise BadArgumentsError("Can't match %s and %s" % (args, pars))
rmatch(par, arg)
rmatch(sig, args)
return symargmap
@property
def is_identity(self):
"""Return ``True`` if this ``Lambda`` is an identity function. """
return self.signature == self.expr
class Subs(Expr):
"""
Represents unevaluated substitutions of an expression.
``Subs(expr, x, x0)`` receives 3 arguments: an expression, a variable or
list of distinct variables and a point or list of evaluation points
corresponding to those variables.
``Subs`` objects are generally useful to represent unevaluated derivatives
calculated at a point.
The variables may be expressions, but they are subjected to the limitations
of subs(), so it is usually a good practice to use only symbols for
variables, since in that case there can be no ambiguity.
There's no automatic expansion - use the method .doit() to effect all
possible substitutions of the object and also of objects inside the
expression.
When evaluating derivatives at a point that is not a symbol, a Subs object
is returned. One is also able to calculate derivatives of Subs objects - in
this case the expression is always expanded (for the unevaluated form, use
Derivative()).
Examples
========
>>> from sympy import Subs, Function, sin, cos
>>> from sympy.abc import x, y, z
>>> f = Function('f')
Subs are created when a particular substitution cannot be made. The
x in the derivative cannot be replaced with 0 because 0 is not a
valid variables of differentiation:
>>> f(x).diff(x).subs(x, 0)
Subs(Derivative(f(x), x), x, 0)
Once f is known, the derivative and evaluation at 0 can be done:
>>> _.subs(f, sin).doit() == sin(x).diff(x).subs(x, 0) == cos(0)
True
Subs can also be created directly with one or more variables:
>>> Subs(f(x)*sin(y) + z, (x, y), (0, 1))
Subs(z + f(x)*sin(y), (x, y), (0, 1))
>>> _.doit()
z + f(0)*sin(1)
Notes
=====
In order to allow expressions to combine before doit is done, a
representation of the Subs expression is used internally to make
expressions that are superficially different compare the same:
>>> a, b = Subs(x, x, 0), Subs(y, y, 0)
>>> a + b
2*Subs(x, x, 0)
This can lead to unexpected consequences when using methods
like `has` that are cached:
>>> s = Subs(x, x, 0)
>>> s.has(x), s.has(y)
(True, False)
>>> ss = s.subs(x, y)
>>> ss.has(x), ss.has(y)
(True, False)
>>> s, ss
(Subs(x, x, 0), Subs(y, y, 0))
"""
def __new__(cls, expr, variables, point, **assumptions):
from sympy import Symbol
if not is_sequence(variables, Tuple):
variables = [variables]
variables = Tuple(*variables)
if has_dups(variables):
repeated = [str(v) for v, i in Counter(variables).items() if i > 1]
__ = ', '.join(repeated)
raise ValueError(filldedent('''
The following expressions appear more than once: %s
''' % __))
point = Tuple(*(point if is_sequence(point, Tuple) else [point]))
if len(point) != len(variables):
raise ValueError('Number of point values must be the same as '
'the number of variables.')
if not point:
return sympify(expr)
# denest
if isinstance(expr, Subs):
variables = expr.variables + variables
point = expr.point + point
expr = expr.expr
else:
expr = sympify(expr)
# use symbols with names equal to the point value (with prepended _)
# to give a variable-independent expression
pre = "_"
pts = sorted(set(point), key=default_sort_key)
from sympy.printing import StrPrinter
class CustomStrPrinter(StrPrinter):
def _print_Dummy(self, expr):
return str(expr) + str(expr.dummy_index)
def mystr(expr, **settings):
p = CustomStrPrinter(settings)
return p.doprint(expr)
while 1:
s_pts = {p: Symbol(pre + mystr(p)) for p in pts}
reps = [(v, s_pts[p])
for v, p in zip(variables, point)]
# if any underscore-prepended symbol is already a free symbol
# and is a variable with a different point value, then there
# is a clash, e.g. _0 clashes in Subs(_0 + _1, (_0, _1), (1, 0))
# because the new symbol that would be created is _1 but _1
# is already mapped to 0 so __0 and __1 are used for the new
# symbols
if any(r in expr.free_symbols and
r in variables and
Symbol(pre + mystr(point[variables.index(r)])) != r
for _, r in reps):
pre += "_"
continue
break
obj = Expr.__new__(cls, expr, Tuple(*variables), point)
obj._expr = expr.xreplace(dict(reps))
return obj
def _eval_is_commutative(self):
return self.expr.is_commutative
def doit(self, **hints):
e, v, p = self.args
# remove self mappings
for i, (vi, pi) in enumerate(zip(v, p)):
if vi == pi:
v = v[:i] + v[i + 1:]
p = p[:i] + p[i + 1:]
if not v:
return self.expr
if isinstance(e, Derivative):
# apply functions first, e.g. f -> cos
undone = []
for i, vi in enumerate(v):
if isinstance(vi, FunctionClass):
e = e.subs(vi, p[i])
else:
undone.append((vi, p[i]))
if not isinstance(e, Derivative):
e = e.doit()
if isinstance(e, Derivative):
# do Subs that aren't related to differentiation
undone2 = []
D = Dummy()
for vi, pi in undone:
if D not in e.xreplace({vi: D}).free_symbols:
e = e.subs(vi, pi)
else:
undone2.append((vi, pi))
undone = undone2
# differentiate wrt variables that are present
wrt = []
D = Dummy()
expr = e.expr
free = expr.free_symbols
for vi, ci in e.variable_count:
if isinstance(vi, Symbol) and vi in free:
expr = expr.diff((vi, ci))
elif D in expr.subs(vi, D).free_symbols:
expr = expr.diff((vi, ci))
else:
wrt.append((vi, ci))
# inject remaining subs
rv = expr.subs(undone)
# do remaining differentiation *in order given*
for vc in wrt:
rv = rv.diff(vc)
else:
# inject remaining subs
rv = e.subs(undone)
else:
rv = e.doit(**hints).subs(list(zip(v, p)))
if hints.get('deep', True) and rv != self:
rv = rv.doit(**hints)
return rv
def evalf(self, prec=None, **options):
return self.doit().evalf(prec, **options)
n = evalf
@property
def variables(self):
"""The variables to be evaluated"""
return self._args[1]
bound_symbols = variables
@property
def expr(self):
"""The expression on which the substitution operates"""
return self._args[0]
@property
def point(self):
"""The values for which the variables are to be substituted"""
return self._args[2]
@property
def free_symbols(self):
return (self.expr.free_symbols - set(self.variables) |
set(self.point.free_symbols))
@property
def expr_free_symbols(self):
return (self.expr.expr_free_symbols - set(self.variables) |
set(self.point.expr_free_symbols))
def __eq__(self, other):
if not isinstance(other, Subs):
return False
return self._hashable_content() == other._hashable_content()
def __ne__(self, other):
return not(self == other)
def __hash__(self):
return super().__hash__()
def _hashable_content(self):
return (self._expr.xreplace(self.canonical_variables),
) + tuple(ordered([(v, p) for v, p in
zip(self.variables, self.point) if not self.expr.has(v)]))
def _eval_subs(self, old, new):
# Subs doit will do the variables in order; the semantics
# of subs for Subs is have the following invariant for
# Subs object foo:
# foo.doit().subs(reps) == foo.subs(reps).doit()
pt = list(self.point)
if old in self.variables:
if _atomic(new) == {new} and not any(
i.has(new) for i in self.args):
# the substitution is neutral
return self.xreplace({old: new})
# any occurrence of old before this point will get
# handled by replacements from here on
i = self.variables.index(old)
for j in range(i, len(self.variables)):
pt[j] = pt[j]._subs(old, new)
return self.func(self.expr, self.variables, pt)
v = [i._subs(old, new) for i in self.variables]
if v != list(self.variables):
return self.func(self.expr, self.variables + (old,), pt + [new])
expr = self.expr._subs(old, new)
pt = [i._subs(old, new) for i in self.point]
return self.func(expr, v, pt)
def _eval_derivative(self, s):
# Apply the chain rule of the derivative on the substitution variables:
val = Add.fromiter(p.diff(s) * Subs(self.expr.diff(v), self.variables, self.point).doit() for v, p in zip(self.variables, self.point))
# Check if there are free symbols in `self.expr`:
# First get the `expr_free_symbols`, which returns the free symbols
# that are directly contained in an expression node (i.e. stop
# searching if the node isn't an expression). At this point turn the
# expressions into `free_symbols` and check if there are common free
# symbols in `self.expr` and the deriving factor.
fs1 = {j for i in self.expr_free_symbols for j in i.free_symbols}
if len(fs1 & s.free_symbols) > 0:
val += Subs(self.expr.diff(s), self.variables, self.point).doit()
return val
def _eval_nseries(self, x, n, logx, cdir=0):
if x in self.point:
# x is the variable being substituted into
apos = self.point.index(x)
other = self.variables[apos]
else:
other = x
arg = self.expr.nseries(other, n=n, logx=logx)
o = arg.getO()
terms = Add.make_args(arg.removeO())
rv = Add(*[self.func(a, *self.args[1:]) for a in terms])
if o:
rv += o.subs(other, x)
return rv
def _eval_as_leading_term(self, x, cdir=0):
if x in self.point:
ipos = self.point.index(x)
xvar = self.variables[ipos]
return self.expr.as_leading_term(xvar)
if x in self.variables:
# if `x` is a dummy variable, it means it won't exist after the
# substitution has been performed:
return self
# The variable is independent of the substitution:
return self.expr.as_leading_term(x)
def diff(f, *symbols, **kwargs):
"""
Differentiate f with respect to symbols.
This is just a wrapper to unify .diff() and the Derivative class; its
interface is similar to that of integrate(). You can use the same
shortcuts for multiple variables as with Derivative. For example,
diff(f(x), x, x, x) and diff(f(x), x, 3) both return the third derivative
of f(x).
You can pass evaluate=False to get an unevaluated Derivative class. Note
that if there are 0 symbols (such as diff(f(x), x, 0), then the result will
be the function (the zeroth derivative), even if evaluate=False.
Examples
========
>>> from sympy import sin, cos, Function, diff
>>> from sympy.abc import x, y
>>> f = Function('f')
>>> diff(sin(x), x)
cos(x)
>>> diff(f(x), x, x, x)
Derivative(f(x), (x, 3))
>>> diff(f(x), x, 3)
Derivative(f(x), (x, 3))
>>> diff(sin(x)*cos(y), x, 2, y, 2)
sin(x)*cos(y)
>>> type(diff(sin(x), x))
cos
>>> type(diff(sin(x), x, evaluate=False))
<class 'sympy.core.function.Derivative'>
>>> type(diff(sin(x), x, 0))
sin
>>> type(diff(sin(x), x, 0, evaluate=False))
sin
>>> diff(sin(x))
cos(x)
>>> diff(sin(x*y))
Traceback (most recent call last):
...
ValueError: specify differentiation variables to differentiate sin(x*y)
Note that ``diff(sin(x))`` syntax is meant only for convenience
in interactive sessions and should be avoided in library code.
References
==========
http://reference.wolfram.com/legacy/v5_2/Built-inFunctions/AlgebraicComputation/Calculus/D.html
See Also
========
Derivative
idiff: computes the derivative implicitly
"""
if hasattr(f, 'diff'):
return f.diff(*symbols, **kwargs)
kwargs.setdefault('evaluate', True)
return Derivative(f, *symbols, **kwargs)
def expand(e, deep=True, modulus=None, power_base=True, power_exp=True,
mul=True, log=True, multinomial=True, basic=True, **hints):
r"""
Expand an expression using methods given as hints.
Hints evaluated unless explicitly set to False are: ``basic``, ``log``,
``multinomial``, ``mul``, ``power_base``, and ``power_exp`` The following
hints are supported but not applied unless set to True: ``complex``,
``func``, and ``trig``. In addition, the following meta-hints are
supported by some or all of the other hints: ``frac``, ``numer``,
``denom``, ``modulus``, and ``force``. ``deep`` is supported by all
hints. Additionally, subclasses of Expr may define their own hints or
meta-hints.
The ``basic`` hint is used for any special rewriting of an object that
should be done automatically (along with the other hints like ``mul``)
when expand is called. This is a catch-all hint to handle any sort of
expansion that may not be described by the existing hint names. To use
this hint an object should override the ``_eval_expand_basic`` method.
Objects may also define their own expand methods, which are not run by
default. See the API section below.
If ``deep`` is set to ``True`` (the default), things like arguments of
functions are recursively expanded. Use ``deep=False`` to only expand on
the top level.
If the ``force`` hint is used, assumptions about variables will be ignored
in making the expansion.
Hints
=====
These hints are run by default
mul
---
Distributes multiplication over addition:
>>> from sympy import cos, exp, sin
>>> from sympy.abc import x, y, z
>>> (y*(x + z)).expand(mul=True)
x*y + y*z
multinomial
-----------
Expand (x + y + ...)**n where n is a positive integer.
>>> ((x + y + z)**2).expand(multinomial=True)
x**2 + 2*x*y + 2*x*z + y**2 + 2*y*z + z**2
power_exp
---------
Expand addition in exponents into multiplied bases.
>>> exp(x + y).expand(power_exp=True)
exp(x)*exp(y)
>>> (2**(x + y)).expand(power_exp=True)
2**x*2**y
power_base
----------
Split powers of multiplied bases.
This only happens by default if assumptions allow, or if the
``force`` meta-hint is used:
>>> ((x*y)**z).expand(power_base=True)
(x*y)**z
>>> ((x*y)**z).expand(power_base=True, force=True)
x**z*y**z
>>> ((2*y)**z).expand(power_base=True)
2**z*y**z
Note that in some cases where this expansion always holds, SymPy performs
it automatically:
>>> (x*y)**2
x**2*y**2
log
---
Pull out power of an argument as a coefficient and split logs products
into sums of logs.
Note that these only work if the arguments of the log function have the
proper assumptions--the arguments must be positive and the exponents must
be real--or else the ``force`` hint must be True:
>>> from sympy import log, symbols
>>> log(x**2*y).expand(log=True)
log(x**2*y)
>>> log(x**2*y).expand(log=True, force=True)
2*log(x) + log(y)
>>> x, y = symbols('x,y', positive=True)
>>> log(x**2*y).expand(log=True)
2*log(x) + log(y)
basic
-----
This hint is intended primarily as a way for custom subclasses to enable
expansion by default.
These hints are not run by default:
complex
-------
Split an expression into real and imaginary parts.
>>> x, y = symbols('x,y')
>>> (x + y).expand(complex=True)
re(x) + re(y) + I*im(x) + I*im(y)
>>> cos(x).expand(complex=True)
-I*sin(re(x))*sinh(im(x)) + cos(re(x))*cosh(im(x))
Note that this is just a wrapper around ``as_real_imag()``. Most objects
that wish to redefine ``_eval_expand_complex()`` should consider
redefining ``as_real_imag()`` instead.
func
----
Expand other functions.
>>> from sympy import gamma
>>> gamma(x + 1).expand(func=True)
x*gamma(x)
trig
----
Do trigonometric expansions.
>>> cos(x + y).expand(trig=True)
-sin(x)*sin(y) + cos(x)*cos(y)
>>> sin(2*x).expand(trig=True)
2*sin(x)*cos(x)
Note that the forms of ``sin(n*x)`` and ``cos(n*x)`` in terms of ``sin(x)``
and ``cos(x)`` are not unique, due to the identity `\sin^2(x) + \cos^2(x)
= 1`. The current implementation uses the form obtained from Chebyshev
polynomials, but this may change. See `this MathWorld article
<http://mathworld.wolfram.com/Multiple-AngleFormulas.html>`_ for more
information.
Notes
=====
- You can shut off unwanted methods::
>>> (exp(x + y)*(x + y)).expand()
x*exp(x)*exp(y) + y*exp(x)*exp(y)
>>> (exp(x + y)*(x + y)).expand(power_exp=False)
x*exp(x + y) + y*exp(x + y)
>>> (exp(x + y)*(x + y)).expand(mul=False)
(x + y)*exp(x)*exp(y)
- Use deep=False to only expand on the top level::
>>> exp(x + exp(x + y)).expand()
exp(x)*exp(exp(x)*exp(y))
>>> exp(x + exp(x + y)).expand(deep=False)
exp(x)*exp(exp(x + y))
- Hints are applied in an arbitrary, but consistent order (in the current
implementation, they are applied in alphabetical order, except
multinomial comes before mul, but this may change). Because of this,
some hints may prevent expansion by other hints if they are applied
first. For example, ``mul`` may distribute multiplications and prevent
``log`` and ``power_base`` from expanding them. Also, if ``mul`` is
applied before ``multinomial`, the expression might not be fully
distributed. The solution is to use the various ``expand_hint`` helper
functions or to use ``hint=False`` to this function to finely control
which hints are applied. Here are some examples::
>>> from sympy import expand, expand_mul, expand_power_base
>>> x, y, z = symbols('x,y,z', positive=True)
>>> expand(log(x*(y + z)))
log(x) + log(y + z)
Here, we see that ``log`` was applied before ``mul``. To get the mul
expanded form, either of the following will work::
>>> expand_mul(log(x*(y + z)))
log(x*y + x*z)
>>> expand(log(x*(y + z)), log=False)
log(x*y + x*z)
A similar thing can happen with the ``power_base`` hint::
>>> expand((x*(y + z))**x)
(x*y + x*z)**x
To get the ``power_base`` expanded form, either of the following will
work::
>>> expand((x*(y + z))**x, mul=False)
x**x*(y + z)**x
>>> expand_power_base((x*(y + z))**x)
x**x*(y + z)**x
>>> expand((x + y)*y/x)
y + y**2/x
The parts of a rational expression can be targeted::
>>> expand((x + y)*y/x/(x + 1), frac=True)
(x*y + y**2)/(x**2 + x)
>>> expand((x + y)*y/x/(x + 1), numer=True)
(x*y + y**2)/(x*(x + 1))
>>> expand((x + y)*y/x/(x + 1), denom=True)
y*(x + y)/(x**2 + x)
- The ``modulus`` meta-hint can be used to reduce the coefficients of an
expression post-expansion::
>>> expand((3*x + 1)**2)
9*x**2 + 6*x + 1
>>> expand((3*x + 1)**2, modulus=5)
4*x**2 + x + 1
- Either ``expand()`` the function or ``.expand()`` the method can be
used. Both are equivalent::
>>> expand((x + 1)**2)
x**2 + 2*x + 1
>>> ((x + 1)**2).expand()
x**2 + 2*x + 1
API
===
Objects can define their own expand hints by defining
``_eval_expand_hint()``. The function should take the form::
def _eval_expand_hint(self, **hints):
# Only apply the method to the top-level expression
...
See also the example below. Objects should define ``_eval_expand_hint()``
methods only if ``hint`` applies to that specific object. The generic
``_eval_expand_hint()`` method defined in Expr will handle the no-op case.
Each hint should be responsible for expanding that hint only.
Furthermore, the expansion should be applied to the top-level expression
only. ``expand()`` takes care of the recursion that happens when
``deep=True``.
You should only call ``_eval_expand_hint()`` methods directly if you are
100% sure that the object has the method, as otherwise you are liable to
get unexpected ``AttributeError``s. Note, again, that you do not need to
recursively apply the hint to args of your object: this is handled
automatically by ``expand()``. ``_eval_expand_hint()`` should
generally not be used at all outside of an ``_eval_expand_hint()`` method.
If you want to apply a specific expansion from within another method, use
the public ``expand()`` function, method, or ``expand_hint()`` functions.
In order for expand to work, objects must be rebuildable by their args,
i.e., ``obj.func(*obj.args) == obj`` must hold.
Expand methods are passed ``**hints`` so that expand hints may use
'metahints'--hints that control how different expand methods are applied.
For example, the ``force=True`` hint described above that causes
``expand(log=True)`` to ignore assumptions is such a metahint. The
``deep`` meta-hint is handled exclusively by ``expand()`` and is not
passed to ``_eval_expand_hint()`` methods.
Note that expansion hints should generally be methods that perform some
kind of 'expansion'. For hints that simply rewrite an expression, use the
.rewrite() API.
Examples
========
>>> from sympy import Expr, sympify
>>> class MyClass(Expr):
... def __new__(cls, *args):
... args = sympify(args)
... return Expr.__new__(cls, *args)
...
... def _eval_expand_double(self, **hints):
... '''
... Doubles the args of MyClass.
...
... If there more than four args, doubling is not performed,
... unless force=True is also used (False by default).
... '''
... force = hints.pop('force', False)
... if not force and len(self.args) > 4:
... return self
... return self.func(*(self.args + self.args))
...
>>> a = MyClass(1, 2, MyClass(3, 4))
>>> a
MyClass(1, 2, MyClass(3, 4))
>>> a.expand(double=True)
MyClass(1, 2, MyClass(3, 4, 3, 4), 1, 2, MyClass(3, 4, 3, 4))
>>> a.expand(double=True, deep=False)
MyClass(1, 2, MyClass(3, 4), 1, 2, MyClass(3, 4))
>>> b = MyClass(1, 2, 3, 4, 5)
>>> b.expand(double=True)
MyClass(1, 2, 3, 4, 5)
>>> b.expand(double=True, force=True)
MyClass(1, 2, 3, 4, 5, 1, 2, 3, 4, 5)
See Also
========
expand_log, expand_mul, expand_multinomial, expand_complex, expand_trig,
expand_power_base, expand_power_exp, expand_func, sympy.simplify.hyperexpand.hyperexpand
"""
# don't modify this; modify the Expr.expand method
hints['power_base'] = power_base
hints['power_exp'] = power_exp
hints['mul'] = mul
hints['log'] = log
hints['multinomial'] = multinomial
hints['basic'] = basic
return sympify(e).expand(deep=deep, modulus=modulus, **hints)
# This is a special application of two hints
def _mexpand(expr, recursive=False):
# expand multinomials and then expand products; this may not always
# be sufficient to give a fully expanded expression (see
# test_issue_8247_8354 in test_arit)
if expr is None:
return
was = None
while was != expr:
was, expr = expr, expand_mul(expand_multinomial(expr))
if not recursive:
break
return expr
# These are simple wrappers around single hints.
def expand_mul(expr, deep=True):
"""
Wrapper around expand that only uses the mul hint. See the expand
docstring for more information.
Examples
========
>>> from sympy import symbols, expand_mul, exp, log
>>> x, y = symbols('x,y', positive=True)
>>> expand_mul(exp(x+y)*(x+y)*log(x*y**2))
x*exp(x + y)*log(x*y**2) + y*exp(x + y)*log(x*y**2)
"""
return sympify(expr).expand(deep=deep, mul=True, power_exp=False,
power_base=False, basic=False, multinomial=False, log=False)
def expand_multinomial(expr, deep=True):
"""
Wrapper around expand that only uses the multinomial hint. See the expand
docstring for more information.
Examples
========
>>> from sympy import symbols, expand_multinomial, exp
>>> x, y = symbols('x y', positive=True)
>>> expand_multinomial((x + exp(x + 1))**2)
x**2 + 2*x*exp(x + 1) + exp(2*x + 2)
"""
return sympify(expr).expand(deep=deep, mul=False, power_exp=False,
power_base=False, basic=False, multinomial=True, log=False)
def expand_log(expr, deep=True, force=False, factor=False):
"""
Wrapper around expand that only uses the log hint. See the expand
docstring for more information.
Examples
========
>>> from sympy import symbols, expand_log, exp, log
>>> x, y = symbols('x,y', positive=True)
>>> expand_log(exp(x+y)*(x+y)*log(x*y**2))
(x + y)*(log(x) + 2*log(y))*exp(x + y)
"""
from sympy import Mul, log
if factor is False:
def _handle(x):
x1 = expand_mul(expand_log(x, deep=deep, force=force, factor=True))
if x1.count(log) <= x.count(log):
return x1
return x
expr = expr.replace(
lambda x: x.is_Mul and all(any(isinstance(i, log) and i.args[0].is_Rational
for i in Mul.make_args(j)) for j in x.as_numer_denom()),
lambda x: _handle(x))
return sympify(expr).expand(deep=deep, log=True, mul=False,
power_exp=False, power_base=False, multinomial=False,
basic=False, force=force, factor=factor)
def expand_func(expr, deep=True):
"""
Wrapper around expand that only uses the func hint. See the expand
docstring for more information.
Examples
========
>>> from sympy import expand_func, gamma
>>> from sympy.abc import x
>>> expand_func(gamma(x + 2))
x*(x + 1)*gamma(x)
"""
return sympify(expr).expand(deep=deep, func=True, basic=False,
log=False, mul=False, power_exp=False, power_base=False, multinomial=False)
def expand_trig(expr, deep=True):
"""
Wrapper around expand that only uses the trig hint. See the expand
docstring for more information.
Examples
========
>>> from sympy import expand_trig, sin
>>> from sympy.abc import x, y
>>> expand_trig(sin(x+y)*(x+y))
(x + y)*(sin(x)*cos(y) + sin(y)*cos(x))
"""
return sympify(expr).expand(deep=deep, trig=True, basic=False,
log=False, mul=False, power_exp=False, power_base=False, multinomial=False)
def expand_complex(expr, deep=True):
"""
Wrapper around expand that only uses the complex hint. See the expand
docstring for more information.
Examples
========
>>> from sympy import expand_complex, exp, sqrt, I
>>> from sympy.abc import z
>>> expand_complex(exp(z))
I*exp(re(z))*sin(im(z)) + exp(re(z))*cos(im(z))
>>> expand_complex(sqrt(I))
sqrt(2)/2 + sqrt(2)*I/2
See Also
========
sympy.core.expr.Expr.as_real_imag
"""
return sympify(expr).expand(deep=deep, complex=True, basic=False,
log=False, mul=False, power_exp=False, power_base=False, multinomial=False)
def expand_power_base(expr, deep=True, force=False):
"""
Wrapper around expand that only uses the power_base hint.
See the expand docstring for more information.
A wrapper to expand(power_base=True) which separates a power with a base
that is a Mul into a product of powers, without performing any other
expansions, provided that assumptions about the power's base and exponent
allow.
deep=False (default is True) will only apply to the top-level expression.
force=True (default is False) will cause the expansion to ignore
assumptions about the base and exponent. When False, the expansion will
only happen if the base is non-negative or the exponent is an integer.
>>> from sympy.abc import x, y, z
>>> from sympy import expand_power_base, sin, cos, exp
>>> (x*y)**2
x**2*y**2
>>> (2*x)**y
(2*x)**y
>>> expand_power_base(_)
2**y*x**y
>>> expand_power_base((x*y)**z)
(x*y)**z
>>> expand_power_base((x*y)**z, force=True)
x**z*y**z
>>> expand_power_base(sin((x*y)**z), deep=False)
sin((x*y)**z)
>>> expand_power_base(sin((x*y)**z), force=True)
sin(x**z*y**z)
>>> expand_power_base((2*sin(x))**y + (2*cos(x))**y)
2**y*sin(x)**y + 2**y*cos(x)**y
>>> expand_power_base((2*exp(y))**x)
2**x*exp(y)**x
>>> expand_power_base((2*cos(x))**y)
2**y*cos(x)**y
Notice that sums are left untouched. If this is not the desired behavior,
apply full ``expand()`` to the expression:
>>> expand_power_base(((x+y)*z)**2)
z**2*(x + y)**2
>>> (((x+y)*z)**2).expand()
x**2*z**2 + 2*x*y*z**2 + y**2*z**2
>>> expand_power_base((2*y)**(1+z))
2**(z + 1)*y**(z + 1)
>>> ((2*y)**(1+z)).expand()
2*2**z*y*y**z
"""
return sympify(expr).expand(deep=deep, log=False, mul=False,
power_exp=False, power_base=True, multinomial=False,
basic=False, force=force)
def expand_power_exp(expr, deep=True):
"""
Wrapper around expand that only uses the power_exp hint.
See the expand docstring for more information.
Examples
========
>>> from sympy import expand_power_exp
>>> from sympy.abc import x, y
>>> expand_power_exp(x**(y + 2))
x**2*x**y
"""
return sympify(expr).expand(deep=deep, complex=False, basic=False,
log=False, mul=False, power_exp=True, power_base=False, multinomial=False)
def count_ops(expr, visual=False):
"""
Return a representation (integer or expression) of the operations in expr.
If ``visual`` is ``False`` (default) then the sum of the coefficients of the
visual expression will be returned.
If ``visual`` is ``True`` then the number of each type of operation is shown
with the core class types (or their virtual equivalent) multiplied by the
number of times they occur.
If expr is an iterable, the sum of the op counts of the
items will be returned.
Examples
========
>>> from sympy.abc import a, b, x, y
>>> from sympy import sin, count_ops
Although there isn't a SUB object, minus signs are interpreted as
either negations or subtractions:
>>> (x - y).count_ops(visual=True)
SUB
>>> (-x).count_ops(visual=True)
NEG
Here, there are two Adds and a Pow:
>>> (1 + a + b**2).count_ops(visual=True)
2*ADD + POW
In the following, an Add, Mul, Pow and two functions:
>>> (sin(x)*x + sin(x)**2).count_ops(visual=True)
ADD + MUL + POW + 2*SIN
for a total of 5:
>>> (sin(x)*x + sin(x)**2).count_ops(visual=False)
5
Note that "what you type" is not always what you get. The expression
1/x/y is translated by sympy into 1/(x*y) so it gives a DIV and MUL rather
than two DIVs:
>>> (1/x/y).count_ops(visual=True)
DIV + MUL
The visual option can be used to demonstrate the difference in
operations for expressions in different forms. Here, the Horner
representation is compared with the expanded form of a polynomial:
>>> eq=x*(1 + x*(2 + x*(3 + x)))
>>> count_ops(eq.expand(), visual=True) - count_ops(eq, visual=True)
-MUL + 3*POW
The count_ops function also handles iterables:
>>> count_ops([x, sin(x), None, True, x + 2], visual=False)
2
>>> count_ops([x, sin(x), None, True, x + 2], visual=True)
ADD + SIN
>>> count_ops({x: sin(x), x + 2: y + 1}, visual=True)
2*ADD + SIN
"""
from sympy import Integral, Sum, Symbol
from sympy.core.relational import Relational
from sympy.simplify.radsimp import fraction
from sympy.logic.boolalg import BooleanFunction
from sympy.utilities.misc import func_name
expr = sympify(expr)
if isinstance(expr, Expr) and not expr.is_Relational:
ops = []
args = [expr]
NEG = Symbol('NEG')
DIV = Symbol('DIV')
SUB = Symbol('SUB')
ADD = Symbol('ADD')
while args:
a = args.pop()
if a.is_Rational:
#-1/3 = NEG + DIV
if a is not S.One:
if a.p < 0:
ops.append(NEG)
if a.q != 1:
ops.append(DIV)
continue
elif a.is_Mul or a.is_MatMul:
if _coeff_isneg(a):
ops.append(NEG)
if a.args[0] is S.NegativeOne:
a = a.as_two_terms()[1]
else:
a = -a
n, d = fraction(a)
if n.is_Integer:
ops.append(DIV)
if n < 0:
ops.append(NEG)
args.append(d)
continue # won't be -Mul but could be Add
elif d is not S.One:
if not d.is_Integer:
args.append(d)
ops.append(DIV)
args.append(n)
continue # could be -Mul
elif a.is_Add or a.is_MatAdd:
aargs = list(a.args)
negs = 0
for i, ai in enumerate(aargs):
if _coeff_isneg(ai):
negs += 1
args.append(-ai)
if i > 0:
ops.append(SUB)
else:
args.append(ai)
if i > 0:
ops.append(ADD)
if negs == len(aargs): # -x - y = NEG + SUB
ops.append(NEG)
elif _coeff_isneg(aargs[0]): # -x + y = SUB, but already recorded ADD
ops.append(SUB - ADD)
continue
if a.is_Pow and a.exp is S.NegativeOne:
ops.append(DIV)
args.append(a.base) # won't be -Mul but could be Add
continue
if a.is_Mul or isinstance(a, LatticeOp):
o = Symbol(a.func.__name__.upper())
# count the args
ops.append(o*(len(a.args) - 1))
elif a.args and (
a.is_Pow or
a.is_Function or
isinstance(a, Derivative) or
isinstance(a, Integral) or
isinstance(a, Sum)):
# if it's not in the list above we don't
# consider a.func something to count, e.g.
# Tuple, MatrixSymbol, etc...
o = Symbol(a.func.__name__.upper())
ops.append(o)
if not a.is_Symbol:
args.extend(a.args)
elif isinstance(expr, Dict):
ops = [count_ops(k, visual=visual) +
count_ops(v, visual=visual) for k, v in expr.items()]
elif iterable(expr):
ops = [count_ops(i, visual=visual) for i in expr]
elif isinstance(expr, (Relational, BooleanFunction)):
ops = []
for arg in expr.args:
ops.append(count_ops(arg, visual=True))
o = Symbol(func_name(expr, short=True).upper())
ops.append(o)
elif not isinstance(expr, Basic):
ops = []
else: # it's Basic not isinstance(expr, Expr):
if not isinstance(expr, Basic):
raise TypeError("Invalid type of expr")
else:
ops = []
args = [expr]
while args:
a = args.pop()
if a.args:
o = Symbol(a.func.__name__.upper())
if a.is_Boolean:
ops.append(o*(len(a.args)-1))
else:
ops.append(o)
args.extend(a.args)
if not ops:
if visual:
return S.Zero
return 0
ops = Add(*ops)
if visual:
return ops
if ops.is_Number:
return int(ops)
return sum(int((a.args or [1])[0]) for a in Add.make_args(ops))
def nfloat(expr, n=15, exponent=False, dkeys=False):
"""Make all Rationals in expr Floats except those in exponents
(unless the exponents flag is set to True). When processing
dictionaries, don't modify the keys unless ``dkeys=True``.
Examples
========
>>> from sympy.core.function import nfloat
>>> from sympy.abc import x, y
>>> from sympy import cos, pi, sqrt
>>> nfloat(x**4 + x/2 + cos(pi/3) + 1 + sqrt(y))
x**4 + 0.5*x + sqrt(y) + 1.5
>>> nfloat(x**4 + sqrt(y), exponent=True)
x**4.0 + y**0.5
Container types are not modified:
>>> type(nfloat((1, 2))) is tuple
True
"""
from sympy.core.power import Pow
from sympy.polys.rootoftools import RootOf
from sympy import MatrixBase
kw = dict(n=n, exponent=exponent, dkeys=dkeys)
if isinstance(expr, MatrixBase):
return expr.applyfunc(lambda e: nfloat(e, **kw))
# handling of iterable containers
if iterable(expr, exclude=str):
if isinstance(expr, (dict, Dict)):
if dkeys:
args = [tuple(map(lambda i: nfloat(i, **kw), a))
for a in expr.items()]
else:
args = [(k, nfloat(v, **kw)) for k, v in expr.items()]
if isinstance(expr, dict):
return type(expr)(args)
else:
return expr.func(*args)
elif isinstance(expr, Basic):
return expr.func(*[nfloat(a, **kw) for a in expr.args])
return type(expr)([nfloat(a, **kw) for a in expr])
rv = sympify(expr)
if rv.is_Number:
return Float(rv, n)
elif rv.is_number:
# evalf doesn't always set the precision
rv = rv.n(n)
if rv.is_Number:
rv = Float(rv.n(n), n)
else:
pass # pure_complex(rv) is likely True
return rv
elif rv.is_Atom:
return rv
elif rv.is_Relational:
args_nfloat = (nfloat(arg, **kw) for arg in rv.args)
return rv.func(*args_nfloat)
# watch out for RootOf instances that don't like to have
# their exponents replaced with Dummies and also sometimes have
# problems with evaluating at low precision (issue 6393)
rv = rv.xreplace({ro: ro.n(n) for ro in rv.atoms(RootOf)})
if not exponent:
reps = [(p, Pow(p.base, Dummy())) for p in rv.atoms(Pow)]
rv = rv.xreplace(dict(reps))
rv = rv.n(n)
if not exponent:
rv = rv.xreplace({d.exp: p.exp for p, d in reps})
else:
# Pow._eval_evalf special cases Integer exponents so if
# exponent is suppose to be handled we have to do so here
rv = rv.xreplace(Transform(
lambda x: Pow(x.base, Float(x.exp, n)),
lambda x: x.is_Pow and x.exp.is_Integer))
return rv.xreplace(Transform(
lambda x: x.func(*nfloat(x.args, n, exponent)),
lambda x: isinstance(x, Function)))
from sympy.core.symbol import Dummy, Symbol
|
d0e5181024f9e2919dd6f6cf3eb842cda5994ed3ce2fba1f298e978897306fb9
|
from collections import defaultdict
from functools import cmp_to_key
from .basic import Basic
from .compatibility import reduce, is_sequence
from .parameters import global_parameters
from .logic import _fuzzy_group, fuzzy_or, fuzzy_not
from .singleton import S
from .operations import AssocOp
from .cache import cacheit
from .numbers import ilcm, igcd
from .expr import Expr
# Key for sorting commutative args in canonical order
_args_sortkey = cmp_to_key(Basic.compare)
def _addsort(args):
# in-place sorting of args
args.sort(key=_args_sortkey)
def _unevaluated_Add(*args):
"""Return a well-formed unevaluated Add: Numbers are collected and
put in slot 0 and args are sorted. Use this when args have changed
but you still want to return an unevaluated Add.
Examples
========
>>> from sympy.core.add import _unevaluated_Add as uAdd
>>> from sympy import S, Add
>>> from sympy.abc import x, y
>>> a = uAdd(*[S(1.0), x, S(2)])
>>> a.args[0]
3.00000000000000
>>> a.args[1]
x
Beyond the Number being in slot 0, there is no other assurance of
order for the arguments since they are hash sorted. So, for testing
purposes, output produced by this in some other function can only
be tested against the output of this function or as one of several
options:
>>> opts = (Add(x, y, evaluated=False), Add(y, x, evaluated=False))
>>> a = uAdd(x, y)
>>> assert a in opts and a == uAdd(x, y)
>>> uAdd(x + 1, x + 2)
x + x + 3
"""
args = list(args)
newargs = []
co = S.Zero
while args:
a = args.pop()
if a.is_Add:
# this will keep nesting from building up
# so that x + (x + 1) -> x + x + 1 (3 args)
args.extend(a.args)
elif a.is_Number:
co += a
else:
newargs.append(a)
_addsort(newargs)
if co:
newargs.insert(0, co)
return Add._from_args(newargs)
class Add(Expr, AssocOp):
__slots__ = ()
is_Add = True
_args_type = Expr
@classmethod
def flatten(cls, seq):
"""
Takes the sequence "seq" of nested Adds and returns a flatten list.
Returns: (commutative_part, noncommutative_part, order_symbols)
Applies associativity, all terms are commutable with respect to
addition.
NB: the removal of 0 is already handled by AssocOp.__new__
See also
========
sympy.core.mul.Mul.flatten
"""
from sympy.calculus.util import AccumBounds
from sympy.matrices.expressions import MatrixExpr
from sympy.tensor.tensor import TensExpr
rv = None
if len(seq) == 2:
a, b = seq
if b.is_Rational:
a, b = b, a
if a.is_Rational:
if b.is_Mul:
rv = [a, b], [], None
if rv:
if all(s.is_commutative for s in rv[0]):
return rv
return [], rv[0], None
terms = {} # term -> coeff
# e.g. x**2 -> 5 for ... + 5*x**2 + ...
coeff = S.Zero # coefficient (Number or zoo) to always be in slot 0
# e.g. 3 + ...
order_factors = []
extra = []
for o in seq:
# O(x)
if o.is_Order:
if o.expr.is_zero:
continue
for o1 in order_factors:
if o1.contains(o):
o = None
break
if o is None:
continue
order_factors = [o] + [
o1 for o1 in order_factors if not o.contains(o1)]
continue
# 3 or NaN
elif o.is_Number:
if (o is S.NaN or coeff is S.ComplexInfinity and
o.is_finite is False) and not extra:
# we know for sure the result will be nan
return [S.NaN], [], None
if coeff.is_Number or isinstance(coeff, AccumBounds):
coeff += o
if coeff is S.NaN and not extra:
# we know for sure the result will be nan
return [S.NaN], [], None
continue
elif isinstance(o, AccumBounds):
coeff = o.__add__(coeff)
continue
elif isinstance(o, MatrixExpr):
# can't add 0 to Matrix so make sure coeff is not 0
extra.append(o)
continue
elif isinstance(o, TensExpr):
coeff = o.__add__(coeff) if coeff else o
continue
elif o is S.ComplexInfinity:
if coeff.is_finite is False and not extra:
# we know for sure the result will be nan
return [S.NaN], [], None
coeff = S.ComplexInfinity
continue
# Add([...])
elif o.is_Add:
# NB: here we assume Add is always commutative
seq.extend(o.args) # TODO zerocopy?
continue
# Mul([...])
elif o.is_Mul:
c, s = o.as_coeff_Mul()
# check for unevaluated Pow, e.g. 2**3 or 2**(-1/2)
elif o.is_Pow:
b, e = o.as_base_exp()
if b.is_Number and (e.is_Integer or
(e.is_Rational and e.is_negative)):
seq.append(b**e)
continue
c, s = S.One, o
else:
# everything else
c = S.One
s = o
# now we have:
# o = c*s, where
#
# c is a Number
# s is an expression with number factor extracted
# let's collect terms with the same s, so e.g.
# 2*x**2 + 3*x**2 -> 5*x**2
if s in terms:
terms[s] += c
if terms[s] is S.NaN and not extra:
# we know for sure the result will be nan
return [S.NaN], [], None
else:
terms[s] = c
# now let's construct new args:
# [2*x**2, x**3, 7*x**4, pi, ...]
newseq = []
noncommutative = False
for s, c in terms.items():
# 0*s
if c.is_zero:
continue
# 1*s
elif c is S.One:
newseq.append(s)
# c*s
else:
if s.is_Mul:
# Mul, already keeps its arguments in perfect order.
# so we can simply put c in slot0 and go the fast way.
cs = s._new_rawargs(*((c,) + s.args))
newseq.append(cs)
elif s.is_Add:
# we just re-create the unevaluated Mul
newseq.append(Mul(c, s, evaluate=False))
else:
# alternatively we have to call all Mul's machinery (slow)
newseq.append(Mul(c, s))
noncommutative = noncommutative or not s.is_commutative
# oo, -oo
if coeff is S.Infinity:
newseq = [f for f in newseq if not (f.is_extended_nonnegative or f.is_real)]
elif coeff is S.NegativeInfinity:
newseq = [f for f in newseq if not (f.is_extended_nonpositive or f.is_real)]
if coeff is S.ComplexInfinity:
# zoo might be
# infinite_real + finite_im
# finite_real + infinite_im
# infinite_real + infinite_im
# addition of a finite real or imaginary number won't be able to
# change the zoo nature; adding an infinite qualtity would result
# in a NaN condition if it had sign opposite of the infinite
# portion of zoo, e.g., infinite_real - infinite_real.
newseq = [c for c in newseq if not (c.is_finite and
c.is_extended_real is not None)]
# process O(x)
if order_factors:
newseq2 = []
for t in newseq:
for o in order_factors:
# x + O(x) -> O(x)
if o.contains(t):
t = None
break
# x + O(x**2) -> x + O(x**2)
if t is not None:
newseq2.append(t)
newseq = newseq2 + order_factors
# 1 + O(1) -> O(1)
for o in order_factors:
if o.contains(coeff):
coeff = S.Zero
break
# order args canonically
_addsort(newseq)
# current code expects coeff to be first
if coeff is not S.Zero:
newseq.insert(0, coeff)
if extra:
newseq += extra
noncommutative = True
# we are done
if noncommutative:
return [], newseq, None
else:
return newseq, [], None
@classmethod
def class_key(cls):
"""Nice order of classes"""
return 3, 1, cls.__name__
def as_coefficients_dict(a):
"""Return a dictionary mapping terms to their Rational coefficient.
Since the dictionary is a defaultdict, inquiries about terms which
were not present will return a coefficient of 0. If an expression is
not an Add it is considered to have a single term.
Examples
========
>>> from sympy.abc import a, x
>>> (3*x + a*x + 4).as_coefficients_dict()
{1: 4, x: 3, a*x: 1}
>>> _[a]
0
>>> (3*a*x).as_coefficients_dict()
{a*x: 3}
"""
d = defaultdict(list)
for ai in a.args:
c, m = ai.as_coeff_Mul()
d[m].append(c)
for k, v in d.items():
if len(v) == 1:
d[k] = v[0]
else:
d[k] = Add(*v)
di = defaultdict(int)
di.update(d)
return di
@cacheit
def as_coeff_add(self, *deps):
"""
Returns a tuple (coeff, args) where self is treated as an Add and coeff
is the Number term and args is a tuple of all other terms.
Examples
========
>>> from sympy.abc import x
>>> (7 + 3*x).as_coeff_add()
(7, (3*x,))
>>> (7*x).as_coeff_add()
(0, (7*x,))
"""
if deps:
from sympy.utilities.iterables import sift
l1, l2 = sift(self.args, lambda x: x.has(*deps), binary=True)
return self._new_rawargs(*l2), tuple(l1)
coeff, notrat = self.args[0].as_coeff_add()
if coeff is not S.Zero:
return coeff, notrat + self.args[1:]
return S.Zero, self.args
def as_coeff_Add(self, rational=False, deps=None):
"""
Efficiently extract the coefficient of a summation.
"""
coeff, args = self.args[0], self.args[1:]
if coeff.is_Number and not rational or coeff.is_Rational:
return coeff, self._new_rawargs(*args)
return S.Zero, self
# Note, we intentionally do not implement Add.as_coeff_mul(). Rather, we
# let Expr.as_coeff_mul() just always return (S.One, self) for an Add. See
# issue 5524.
def _eval_power(self, e):
if e.is_Rational and self.is_number:
from sympy.core.evalf import pure_complex
from sympy.core.mul import _unevaluated_Mul
from sympy.core.exprtools import factor_terms
from sympy.core.function import expand_multinomial
from sympy.functions.elementary.complexes import sign
from sympy.functions.elementary.miscellaneous import sqrt
ri = pure_complex(self)
if ri:
r, i = ri
if e.q == 2:
D = sqrt(r**2 + i**2)
if D.is_Rational:
# (r, i, D) is a Pythagorean triple
root = sqrt(factor_terms((D - r)/2))**e.p
return root*expand_multinomial((
# principle value
(D + r)/abs(i) + sign(i)*S.ImaginaryUnit)**e.p)
elif e == -1:
return _unevaluated_Mul(
r - i*S.ImaginaryUnit,
1/(r**2 + i**2))
elif e.is_Number and abs(e) != 1:
# handle the Float case: (2.0 + 4*x)**e -> 4**e*(0.5 + x)**e
c, m = zip(*[i.as_coeff_Mul() for i in self.args])
if any(i.is_Float for i in c): # XXX should this always be done?
big = -1
for i in c:
if abs(i) >= big:
big = abs(i)
if big > 0 and big != 1:
from sympy.functions.elementary.complexes import sign
bigs = (big, -big)
c = [sign(i) if i in bigs else i/big for i in c]
addpow = Add(*[c*m for c, m in zip(c, m)])**e
return big**e*addpow
@cacheit
def _eval_derivative(self, s):
return self.func(*[a.diff(s) for a in self.args])
def _eval_nseries(self, x, n, logx, cdir=0):
terms = [t.nseries(x, n=n, logx=logx, cdir=cdir) for t in self.args]
return self.func(*terms)
def _matches_simple(self, expr, repl_dict):
# handle (w+3).matches('x+5') -> {w: x+2}
coeff, terms = self.as_coeff_add()
if len(terms) == 1:
return terms[0].matches(expr - coeff, repl_dict)
return
def matches(self, expr, repl_dict={}, old=False):
return self._matches_commutative(expr, repl_dict, old)
@staticmethod
def _combine_inverse(lhs, rhs):
"""
Returns lhs - rhs, but treats oo like a symbol so oo - oo
returns 0, instead of a nan.
"""
from sympy.simplify.simplify import signsimp
from sympy.core.symbol import Dummy
inf = (S.Infinity, S.NegativeInfinity)
if lhs.has(*inf) or rhs.has(*inf):
oo = Dummy('oo')
reps = {
S.Infinity: oo,
S.NegativeInfinity: -oo}
ireps = {v: k for k, v in reps.items()}
eq = signsimp(lhs.xreplace(reps) - rhs.xreplace(reps))
if eq.has(oo):
eq = eq.replace(
lambda x: x.is_Pow and x.base is oo,
lambda x: x.base)
return eq.xreplace(ireps)
else:
return signsimp(lhs - rhs)
@cacheit
def as_two_terms(self):
"""Return head and tail of self.
This is the most efficient way to get the head and tail of an
expression.
- if you want only the head, use self.args[0];
- if you want to process the arguments of the tail then use
self.as_coef_add() which gives the head and a tuple containing
the arguments of the tail when treated as an Add.
- if you want the coefficient when self is treated as a Mul
then use self.as_coeff_mul()[0]
>>> from sympy.abc import x, y
>>> (3*x - 2*y + 5).as_two_terms()
(5, 3*x - 2*y)
"""
return self.args[0], self._new_rawargs(*self.args[1:])
def as_numer_denom(self):
"""
Decomposes an expression to its numerator part and its
denominator part.
Examples
========
>>> from sympy.abc import x, y, z
>>> (x*y/z).as_numer_denom()
(x*y, z)
>>> (x*(y + 1)/y**7).as_numer_denom()
(x*(y + 1), y**7)
See Also
========
sympy.core.expr.Expr.as_numer_denom
"""
# clear rational denominator
content, expr = self.primitive()
ncon, dcon = content.as_numer_denom()
# collect numerators and denominators of the terms
nd = defaultdict(list)
for f in expr.args:
ni, di = f.as_numer_denom()
nd[di].append(ni)
# check for quick exit
if len(nd) == 1:
d, n = nd.popitem()
return self.func(
*[_keep_coeff(ncon, ni) for ni in n]), _keep_coeff(dcon, d)
# sum up the terms having a common denominator
for d, n in nd.items():
if len(n) == 1:
nd[d] = n[0]
else:
nd[d] = self.func(*n)
# assemble single numerator and denominator
denoms, numers = [list(i) for i in zip(*iter(nd.items()))]
n, d = self.func(*[Mul(*(denoms[:i] + [numers[i]] + denoms[i + 1:]))
for i in range(len(numers))]), Mul(*denoms)
return _keep_coeff(ncon, n), _keep_coeff(dcon, d)
def _eval_is_polynomial(self, syms):
return all(term._eval_is_polynomial(syms) for term in self.args)
def _eval_is_rational_function(self, syms):
return all(term._eval_is_rational_function(syms) for term in self.args)
def _eval_is_meromorphic(self, x, a):
return _fuzzy_group((arg.is_meromorphic(x, a) for arg in self.args),
quick_exit=True)
def _eval_is_algebraic_expr(self, syms):
return all(term._eval_is_algebraic_expr(syms) for term in self.args)
# assumption methods
_eval_is_real = lambda self: _fuzzy_group(
(a.is_real for a in self.args), quick_exit=True)
_eval_is_extended_real = lambda self: _fuzzy_group(
(a.is_extended_real for a in self.args), quick_exit=True)
_eval_is_complex = lambda self: _fuzzy_group(
(a.is_complex for a in self.args), quick_exit=True)
_eval_is_antihermitian = lambda self: _fuzzy_group(
(a.is_antihermitian for a in self.args), quick_exit=True)
_eval_is_finite = lambda self: _fuzzy_group(
(a.is_finite for a in self.args), quick_exit=True)
_eval_is_hermitian = lambda self: _fuzzy_group(
(a.is_hermitian for a in self.args), quick_exit=True)
_eval_is_integer = lambda self: _fuzzy_group(
(a.is_integer for a in self.args), quick_exit=True)
_eval_is_rational = lambda self: _fuzzy_group(
(a.is_rational for a in self.args), quick_exit=True)
_eval_is_algebraic = lambda self: _fuzzy_group(
(a.is_algebraic for a in self.args), quick_exit=True)
_eval_is_commutative = lambda self: _fuzzy_group(
a.is_commutative for a in self.args)
def _eval_is_infinite(self):
sawinf = False
for a in self.args:
ainf = a.is_infinite
if ainf is None:
return None
elif ainf is True:
# infinite+infinite might not be infinite
if sawinf is True:
return None
sawinf = True
return sawinf
def _eval_is_imaginary(self):
nz = []
im_I = []
for a in self.args:
if a.is_extended_real:
if a.is_zero:
pass
elif a.is_zero is False:
nz.append(a)
else:
return
elif a.is_imaginary:
im_I.append(a*S.ImaginaryUnit)
elif (S.ImaginaryUnit*a).is_extended_real:
im_I.append(a*S.ImaginaryUnit)
else:
return
b = self.func(*nz)
if b.is_zero:
return fuzzy_not(self.func(*im_I).is_zero)
elif b.is_zero is False:
return False
def _eval_is_zero(self):
if self.is_commutative is False:
# issue 10528: there is no way to know if a nc symbol
# is zero or not
return
nz = []
z = 0
im_or_z = False
im = False
for a in self.args:
if a.is_extended_real:
if a.is_zero:
z += 1
elif a.is_zero is False:
nz.append(a)
else:
return
elif a.is_imaginary:
im = True
elif (S.ImaginaryUnit*a).is_extended_real:
im_or_z = True
else:
return
if z == len(self.args):
return True
if len(nz) == 0 or len(nz) == len(self.args):
return None
b = self.func(*nz)
if b.is_zero:
if not im_or_z and not im:
return True
if im and not im_or_z:
return False
if b.is_zero is False:
return False
def _eval_is_odd(self):
l = [f for f in self.args if not (f.is_even is True)]
if not l:
return False
if l[0].is_odd:
return self._new_rawargs(*l[1:]).is_even
def _eval_is_irrational(self):
for t in self.args:
a = t.is_irrational
if a:
others = list(self.args)
others.remove(t)
if all(x.is_rational is True for x in others):
return True
return None
if a is None:
return
return False
def _eval_is_extended_positive(self):
from sympy.core.exprtools import _monotonic_sign
if self.is_number:
return super()._eval_is_extended_positive()
c, a = self.as_coeff_Add()
if not c.is_zero:
v = _monotonic_sign(a)
if v is not None:
s = v + c
if s != self and s.is_extended_positive and a.is_extended_nonnegative:
return True
if len(self.free_symbols) == 1:
v = _monotonic_sign(self)
if v is not None and v != self and v.is_extended_positive:
return True
pos = nonneg = nonpos = unknown_sign = False
saw_INF = set()
args = [a for a in self.args if not a.is_zero]
if not args:
return False
for a in args:
ispos = a.is_extended_positive
infinite = a.is_infinite
if infinite:
saw_INF.add(fuzzy_or((ispos, a.is_extended_nonnegative)))
if True in saw_INF and False in saw_INF:
return
if ispos:
pos = True
continue
elif a.is_extended_nonnegative:
nonneg = True
continue
elif a.is_extended_nonpositive:
nonpos = True
continue
if infinite is None:
return
unknown_sign = True
if saw_INF:
if len(saw_INF) > 1:
return
return saw_INF.pop()
elif unknown_sign:
return
elif not nonpos and not nonneg and pos:
return True
elif not nonpos and pos:
return True
elif not pos and not nonneg:
return False
def _eval_is_extended_nonnegative(self):
from sympy.core.exprtools import _monotonic_sign
if not self.is_number:
c, a = self.as_coeff_Add()
if not c.is_zero and a.is_extended_nonnegative:
v = _monotonic_sign(a)
if v is not None:
s = v + c
if s != self and s.is_extended_nonnegative:
return True
if len(self.free_symbols) == 1:
v = _monotonic_sign(self)
if v is not None and v != self and v.is_extended_nonnegative:
return True
def _eval_is_extended_nonpositive(self):
from sympy.core.exprtools import _monotonic_sign
if not self.is_number:
c, a = self.as_coeff_Add()
if not c.is_zero and a.is_extended_nonpositive:
v = _monotonic_sign(a)
if v is not None:
s = v + c
if s != self and s.is_extended_nonpositive:
return True
if len(self.free_symbols) == 1:
v = _monotonic_sign(self)
if v is not None and v != self and v.is_extended_nonpositive:
return True
def _eval_is_extended_negative(self):
from sympy.core.exprtools import _monotonic_sign
if self.is_number:
return super()._eval_is_extended_negative()
c, a = self.as_coeff_Add()
if not c.is_zero:
v = _monotonic_sign(a)
if v is not None:
s = v + c
if s != self and s.is_extended_negative and a.is_extended_nonpositive:
return True
if len(self.free_symbols) == 1:
v = _monotonic_sign(self)
if v is not None and v != self and v.is_extended_negative:
return True
neg = nonpos = nonneg = unknown_sign = False
saw_INF = set()
args = [a for a in self.args if not a.is_zero]
if not args:
return False
for a in args:
isneg = a.is_extended_negative
infinite = a.is_infinite
if infinite:
saw_INF.add(fuzzy_or((isneg, a.is_extended_nonpositive)))
if True in saw_INF and False in saw_INF:
return
if isneg:
neg = True
continue
elif a.is_extended_nonpositive:
nonpos = True
continue
elif a.is_extended_nonnegative:
nonneg = True
continue
if infinite is None:
return
unknown_sign = True
if saw_INF:
if len(saw_INF) > 1:
return
return saw_INF.pop()
elif unknown_sign:
return
elif not nonneg and not nonpos and neg:
return True
elif not nonneg and neg:
return True
elif not neg and not nonpos:
return False
def _eval_subs(self, old, new):
if not old.is_Add:
if old is S.Infinity and -old in self.args:
# foo - oo is foo + (-oo) internally
return self.xreplace({-old: -new})
return None
coeff_self, terms_self = self.as_coeff_Add()
coeff_old, terms_old = old.as_coeff_Add()
if coeff_self.is_Rational and coeff_old.is_Rational:
if terms_self == terms_old: # (2 + a).subs( 3 + a, y) -> -1 + y
return self.func(new, coeff_self, -coeff_old)
if terms_self == -terms_old: # (2 + a).subs(-3 - a, y) -> -1 - y
return self.func(-new, coeff_self, coeff_old)
if coeff_self.is_Rational and coeff_old.is_Rational \
or coeff_self == coeff_old:
args_old, args_self = self.func.make_args(
terms_old), self.func.make_args(terms_self)
if len(args_old) < len(args_self): # (a+b+c).subs(b+c,x) -> a+x
self_set = set(args_self)
old_set = set(args_old)
if old_set < self_set:
ret_set = self_set - old_set
return self.func(new, coeff_self, -coeff_old,
*[s._subs(old, new) for s in ret_set])
args_old = self.func.make_args(
-terms_old) # (a+b+c+d).subs(-b-c,x) -> a-x+d
old_set = set(args_old)
if old_set < self_set:
ret_set = self_set - old_set
return self.func(-new, coeff_self, coeff_old,
*[s._subs(old, new) for s in ret_set])
def removeO(self):
args = [a for a in self.args if not a.is_Order]
return self._new_rawargs(*args)
def getO(self):
args = [a for a in self.args if a.is_Order]
if args:
return self._new_rawargs(*args)
@cacheit
def extract_leading_order(self, symbols, point=None):
"""
Returns the leading term and its order.
Examples
========
>>> from sympy.abc import x
>>> (x + 1 + 1/x**5).extract_leading_order(x)
((x**(-5), O(x**(-5))),)
>>> (1 + x).extract_leading_order(x)
((1, O(1)),)
>>> (x + x**2).extract_leading_order(x)
((x, O(x)),)
"""
from sympy import Order
lst = []
symbols = list(symbols if is_sequence(symbols) else [symbols])
if not point:
point = [0]*len(symbols)
seq = [(f, Order(f, *zip(symbols, point))) for f in self.args]
for ef, of in seq:
for e, o in lst:
if o.contains(of) and o != of:
of = None
break
if of is None:
continue
new_lst = [(ef, of)]
for e, o in lst:
if of.contains(o) and o != of:
continue
new_lst.append((e, o))
lst = new_lst
return tuple(lst)
def as_real_imag(self, deep=True, **hints):
"""
returns a tuple representing a complex number
Examples
========
>>> from sympy import I
>>> (7 + 9*I).as_real_imag()
(7, 9)
>>> ((1 + I)/(1 - I)).as_real_imag()
(0, 1)
>>> ((1 + 2*I)*(1 + 3*I)).as_real_imag()
(-5, 5)
"""
sargs = self.args
re_part, im_part = [], []
for term in sargs:
re, im = term.as_real_imag(deep=deep)
re_part.append(re)
im_part.append(im)
return (self.func(*re_part), self.func(*im_part))
def _eval_as_leading_term(self, x, cdir=0):
from sympy import expand_mul, Order
old = self
expr = expand_mul(self)
if not expr.is_Add:
return expr.as_leading_term(x, cdir=cdir)
infinite = [t for t in expr.args if t.is_infinite]
leading_terms = [t.as_leading_term(x, cdir=cdir) for t in expr.args]
min, new_expr = Order(0), 0
try:
for term in leading_terms:
order = Order(term, x)
if not min or order not in min:
min = order
new_expr = term
elif min in order:
new_expr += term
except TypeError:
return expr
new_expr=new_expr.together()
if new_expr.is_Add:
new_expr = new_expr.simplify()
if not new_expr:
# simple leading term analysis gave us cancelled terms but we have to send
# back a term, so compute the leading term (via series)
return old.compute_leading_term(x)
elif new_expr is S.NaN:
return old.func._from_args(infinite)
else:
return new_expr
def _eval_adjoint(self):
return self.func(*[t.adjoint() for t in self.args])
def _eval_conjugate(self):
return self.func(*[t.conjugate() for t in self.args])
def _eval_transpose(self):
return self.func(*[t.transpose() for t in self.args])
def _sage_(self):
s = 0
for x in self.args:
s += x._sage_()
return s
def primitive(self):
"""
Return ``(R, self/R)`` where ``R``` is the Rational GCD of ``self```.
``R`` is collected only from the leading coefficient of each term.
Examples
========
>>> from sympy.abc import x, y
>>> (2*x + 4*y).primitive()
(2, x + 2*y)
>>> (2*x/3 + 4*y/9).primitive()
(2/9, 3*x + 2*y)
>>> (2*x/3 + 4.2*y).primitive()
(1/3, 2*x + 12.6*y)
No subprocessing of term factors is performed:
>>> ((2 + 2*x)*x + 2).primitive()
(1, x*(2*x + 2) + 2)
Recursive processing can be done with the ``as_content_primitive()``
method:
>>> ((2 + 2*x)*x + 2).as_content_primitive()
(2, x*(x + 1) + 1)
See also: primitive() function in polytools.py
"""
terms = []
inf = False
for a in self.args:
c, m = a.as_coeff_Mul()
if not c.is_Rational:
c = S.One
m = a
inf = inf or m is S.ComplexInfinity
terms.append((c.p, c.q, m))
if not inf:
ngcd = reduce(igcd, [t[0] for t in terms], 0)
dlcm = reduce(ilcm, [t[1] for t in terms], 1)
else:
ngcd = reduce(igcd, [t[0] for t in terms if t[1]], 0)
dlcm = reduce(ilcm, [t[1] for t in terms if t[1]], 1)
if ngcd == dlcm == 1:
return S.One, self
if not inf:
for i, (p, q, term) in enumerate(terms):
terms[i] = _keep_coeff(Rational((p//ngcd)*(dlcm//q)), term)
else:
for i, (p, q, term) in enumerate(terms):
if q:
terms[i] = _keep_coeff(Rational((p//ngcd)*(dlcm//q)), term)
else:
terms[i] = _keep_coeff(Rational(p, q), term)
# we don't need a complete re-flattening since no new terms will join
# so we just use the same sort as is used in Add.flatten. When the
# coefficient changes, the ordering of terms may change, e.g.
# (3*x, 6*y) -> (2*y, x)
#
# We do need to make sure that term[0] stays in position 0, however.
#
if terms[0].is_Number or terms[0] is S.ComplexInfinity:
c = terms.pop(0)
else:
c = None
_addsort(terms)
if c:
terms.insert(0, c)
return Rational(ngcd, dlcm), self._new_rawargs(*terms)
def as_content_primitive(self, radical=False, clear=True):
"""Return the tuple (R, self/R) where R is the positive Rational
extracted from self. If radical is True (default is False) then
common radicals will be removed and included as a factor of the
primitive expression.
Examples
========
>>> from sympy import sqrt
>>> (3 + 3*sqrt(2)).as_content_primitive()
(3, 1 + sqrt(2))
Radical content can also be factored out of the primitive:
>>> (2*sqrt(2) + 4*sqrt(10)).as_content_primitive(radical=True)
(2, sqrt(2)*(1 + 2*sqrt(5)))
See docstring of Expr.as_content_primitive for more examples.
"""
con, prim = self.func(*[_keep_coeff(*a.as_content_primitive(
radical=radical, clear=clear)) for a in self.args]).primitive()
if not clear and not con.is_Integer and prim.is_Add:
con, d = con.as_numer_denom()
_p = prim/d
if any(a.as_coeff_Mul()[0].is_Integer for a in _p.args):
prim = _p
else:
con /= d
if radical and prim.is_Add:
# look for common radicals that can be removed
args = prim.args
rads = []
common_q = None
for m in args:
term_rads = defaultdict(list)
for ai in Mul.make_args(m):
if ai.is_Pow:
b, e = ai.as_base_exp()
if e.is_Rational and b.is_Integer:
term_rads[e.q].append(abs(int(b))**e.p)
if not term_rads:
break
if common_q is None:
common_q = set(term_rads.keys())
else:
common_q = common_q & set(term_rads.keys())
if not common_q:
break
rads.append(term_rads)
else:
# process rads
# keep only those in common_q
for r in rads:
for q in list(r.keys()):
if q not in common_q:
r.pop(q)
for q in r:
r[q] = prod(r[q])
# find the gcd of bases for each q
G = []
for q in common_q:
g = reduce(igcd, [r[q] for r in rads], 0)
if g != 1:
G.append(g**Rational(1, q))
if G:
G = Mul(*G)
args = [ai/G for ai in args]
prim = G*prim.func(*args)
return con, prim
@property
def _sorted_args(self):
from sympy.core.compatibility import default_sort_key
return tuple(sorted(self.args, key=default_sort_key))
def _eval_difference_delta(self, n, step):
from sympy.series.limitseq import difference_delta as dd
return self.func(*[dd(a, n, step) for a in self.args])
@property
def _mpc_(self):
"""
Convert self to an mpmath mpc if possible
"""
from sympy.core.numbers import I, Float
re_part, rest = self.as_coeff_Add()
im_part, imag_unit = rest.as_coeff_Mul()
if not imag_unit == I:
# ValueError may seem more reasonable but since it's a @property,
# we need to use AttributeError to keep from confusing things like
# hasattr.
raise AttributeError("Cannot convert Add to mpc. Must be of the form Number + Number*I")
return (Float(re_part)._mpf_, Float(im_part)._mpf_)
def __neg__(self):
if not global_parameters.distribute:
return super().__neg__()
return Add(*[-i for i in self.args])
from .mul import Mul, _keep_coeff, prod
from sympy.core.numbers import Rational
|
413171aae49a833d8fea2bc6dbd9af8c9e71a3ed6b7288a2fba1bdd64bec34ba
|
from typing import Tuple as tTuple
from .sympify import sympify, _sympify, SympifyError
from .basic import Basic, Atom
from .singleton import S
from .evalf import EvalfMixin, pure_complex
from .decorators import call_highest_priority, sympify_method_args, sympify_return
from .cache import cacheit
from .compatibility import reduce, as_int, default_sort_key, Iterable
from sympy.utilities.misc import func_name
from mpmath.libmp import mpf_log, prec_to_dps
from collections import defaultdict
@sympify_method_args
class Expr(Basic, EvalfMixin):
"""
Base class for algebraic expressions.
Everything that requires arithmetic operations to be defined
should subclass this class, instead of Basic (which should be
used only for argument storage and expression manipulation, i.e.
pattern matching, substitutions, etc).
See Also
========
sympy.core.basic.Basic
"""
__slots__ = () # type: tTuple[str, ...]
is_scalar = True # self derivative is 1
@property
def _diff_wrt(self):
"""Return True if one can differentiate with respect to this
object, else False.
Subclasses such as Symbol, Function and Derivative return True
to enable derivatives wrt them. The implementation in Derivative
separates the Symbol and non-Symbol (_diff_wrt=True) variables and
temporarily converts the non-Symbols into Symbols when performing
the differentiation. By default, any object deriving from Expr
will behave like a scalar with self.diff(self) == 1. If this is
not desired then the object must also set `is_scalar = False` or
else define an _eval_derivative routine.
Note, see the docstring of Derivative for how this should work
mathematically. In particular, note that expr.subs(yourclass, Symbol)
should be well-defined on a structural level, or this will lead to
inconsistent results.
Examples
========
>>> from sympy import Expr
>>> e = Expr()
>>> e._diff_wrt
False
>>> class MyScalar(Expr):
... _diff_wrt = True
...
>>> MyScalar().diff(MyScalar())
1
>>> class MySymbol(Expr):
... _diff_wrt = True
... is_scalar = False
...
>>> MySymbol().diff(MySymbol())
Derivative(MySymbol(), MySymbol())
"""
return False
@cacheit
def sort_key(self, order=None):
coeff, expr = self.as_coeff_Mul()
if expr.is_Pow:
expr, exp = expr.args
else:
expr, exp = expr, S.One
if expr.is_Dummy:
args = (expr.sort_key(),)
elif expr.is_Atom:
args = (str(expr),)
else:
if expr.is_Add:
args = expr.as_ordered_terms(order=order)
elif expr.is_Mul:
args = expr.as_ordered_factors(order=order)
else:
args = expr.args
args = tuple(
[ default_sort_key(arg, order=order) for arg in args ])
args = (len(args), tuple(args))
exp = exp.sort_key(order=order)
return expr.class_key(), args, exp, coeff
def __hash__(self):
# hash cannot be cached using cache_it because infinite recurrence
# occurs as hash is needed for setting cache dictionary keys
h = self._mhash
if h is None:
h = hash((type(self).__name__,) + self._hashable_content())
self._mhash = h
return h
def _hashable_content(self):
"""Return a tuple of information about self that can be used to
compute the hash. If a class defines additional attributes,
like ``name`` in Symbol, then this method should be updated
accordingly to return such relevant attributes.
Defining more than _hashable_content is necessary if __eq__ has
been defined by a class. See note about this in Basic.__eq__."""
return self._args
def __eq__(self, other):
try:
other = _sympify(other)
if not isinstance(other, Expr):
return False
except (SympifyError, SyntaxError):
return False
# check for pure number expr
if not (self.is_Number and other.is_Number) and (
type(self) != type(other)):
return False
a, b = self._hashable_content(), other._hashable_content()
if a != b:
return False
# check number *in* an expression
for a, b in zip(a, b):
if not isinstance(a, Expr):
continue
if a.is_Number and type(a) != type(b):
return False
return True
# ***************
# * Arithmetics *
# ***************
# Expr and its sublcasses use _op_priority to determine which object
# passed to a binary special method (__mul__, etc.) will handle the
# operation. In general, the 'call_highest_priority' decorator will choose
# the object with the highest _op_priority to handle the call.
# Custom subclasses that want to define their own binary special methods
# should set an _op_priority value that is higher than the default.
#
# **NOTE**:
# This is a temporary fix, and will eventually be replaced with
# something better and more powerful. See issue 5510.
_op_priority = 10.0
def __pos__(self):
return self
def __neg__(self):
# Mul has its own __neg__ routine, so we just
# create a 2-args Mul with the -1 in the canonical
# slot 0.
c = self.is_commutative
return Mul._from_args((S.NegativeOne, self), c)
def __abs__(self):
from sympy import Abs
return Abs(self)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__radd__')
def __add__(self, other):
return Add(self, other)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__add__')
def __radd__(self, other):
return Add(other, self)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__rsub__')
def __sub__(self, other):
return Add(self, -other)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__sub__')
def __rsub__(self, other):
return Add(other, -self)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__rmul__')
def __mul__(self, other):
return Mul(self, other)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__mul__')
def __rmul__(self, other):
return Mul(other, self)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__rpow__')
def _pow(self, other):
return Pow(self, other)
def __pow__(self, other, mod=None):
if mod is None:
return self._pow(other)
try:
_self, other, mod = as_int(self), as_int(other), as_int(mod)
if other >= 0:
return pow(_self, other, mod)
else:
from sympy.core.numbers import mod_inverse
return mod_inverse(pow(_self, -other, mod), mod)
except ValueError:
power = self._pow(other)
try:
return power%mod
except TypeError:
return NotImplemented
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__pow__')
def __rpow__(self, other):
return Pow(other, self)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__rdiv__')
def __div__(self, other):
denom = Pow(other, S.NegativeOne)
if self is S.One:
return denom
else:
return Mul(self, denom)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__div__')
def __rdiv__(self, other):
denom = Pow(self, S.NegativeOne)
if other is S.One:
return denom
else:
return Mul(other, denom)
__truediv__ = __div__
__rtruediv__ = __rdiv__
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__rmod__')
def __mod__(self, other):
return Mod(self, other)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__mod__')
def __rmod__(self, other):
return Mod(other, self)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__rfloordiv__')
def __floordiv__(self, other):
from sympy.functions.elementary.integers import floor
return floor(self / other)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__floordiv__')
def __rfloordiv__(self, other):
from sympy.functions.elementary.integers import floor
return floor(other / self)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__rdivmod__')
def __divmod__(self, other):
from sympy.functions.elementary.integers import floor
return floor(self / other), Mod(self, other)
@sympify_return([('other', 'Expr')], NotImplemented)
@call_highest_priority('__divmod__')
def __rdivmod__(self, other):
from sympy.functions.elementary.integers import floor
return floor(other / self), Mod(other, self)
def __int__(self):
# Although we only need to round to the units position, we'll
# get one more digit so the extra testing below can be avoided
# unless the rounded value rounded to an integer, e.g. if an
# expression were equal to 1.9 and we rounded to the unit position
# we would get a 2 and would not know if this rounded up or not
# without doing a test (as done below). But if we keep an extra
# digit we know that 1.9 is not the same as 1 and there is no
# need for further testing: our int value is correct. If the value
# were 1.99, however, this would round to 2.0 and our int value is
# off by one. So...if our round value is the same as the int value
# (regardless of how much extra work we do to calculate extra decimal
# places) we need to test whether we are off by one.
from sympy import Dummy
if not self.is_number:
raise TypeError("can't convert symbols to int")
r = self.round(2)
if not r.is_Number:
raise TypeError("can't convert complex to int")
if r in (S.NaN, S.Infinity, S.NegativeInfinity):
raise TypeError("can't convert %s to int" % r)
i = int(r)
if not i:
return 0
# off-by-one check
if i == r and not (self - i).equals(0):
isign = 1 if i > 0 else -1
x = Dummy()
# in the following (self - i).evalf(2) will not always work while
# (self - r).evalf(2) and the use of subs does; if the test that
# was added when this comment was added passes, it might be safe
# to simply use sign to compute this rather than doing this by hand:
diff_sign = 1 if (self - x).evalf(2, subs={x: i}) > 0 else -1
if diff_sign != isign:
i -= isign
return i
__long__ = __int__
def __float__(self):
# Don't bother testing if it's a number; if it's not this is going
# to fail, and if it is we still need to check that it evalf'ed to
# a number.
result = self.evalf()
if result.is_Number:
return float(result)
if result.is_number and result.as_real_imag()[1]:
raise TypeError("can't convert complex to float")
raise TypeError("can't convert expression to float")
def __complex__(self):
result = self.evalf()
re, im = result.as_real_imag()
return complex(float(re), float(im))
def _cmp(self, other, op, cls):
assert op in ("<", ">", "<=", ">=")
try:
other = _sympify(other)
except SympifyError:
return NotImplemented
if not isinstance(other, Expr):
return NotImplemented
for me in (self, other):
if me.is_extended_real is False:
raise TypeError("Invalid comparison of non-real %s" % me)
if me is S.NaN:
raise TypeError("Invalid NaN comparison")
n2 = _n2(self, other)
if n2 is not None:
# use float comparison for infinity.
# otherwise get stuck in infinite recursion
if n2 in (S.Infinity, S.NegativeInfinity):
n2 = float(n2)
if op == "<":
return _sympify(n2 < 0)
elif op == ">":
return _sympify(n2 > 0)
elif op == "<=":
return _sympify(n2 <= 0)
else: # >=
return _sympify(n2 >= 0)
if self.is_extended_real and other.is_extended_real:
if op in ("<=", ">") \
and ((self.is_infinite and self.is_extended_negative) \
or (other.is_infinite and other.is_extended_positive)):
return S.true if op == "<=" else S.false
if op in ("<", ">=") \
and ((self.is_infinite and self.is_extended_positive) \
or (other.is_infinite and other.is_extended_negative)):
return S.true if op == ">=" else S.false
diff = self - other
if diff is not S.NaN:
if op == "<":
test = diff.is_extended_negative
elif op == ">":
test = diff.is_extended_positive
elif op == "<=":
test = diff.is_extended_nonpositive
else: # >=
test = diff.is_extended_nonnegative
if test is not None:
return S.true if test == True else S.false
# return unevaluated comparison object
return cls(self, other, evaluate=False)
def __ge__(self, other):
from sympy import GreaterThan
return self._cmp(other, ">=", GreaterThan)
def __le__(self, other):
from sympy import LessThan
return self._cmp(other, "<=", LessThan)
def __gt__(self, other):
from sympy import StrictGreaterThan
return self._cmp(other, ">", StrictGreaterThan)
def __lt__(self, other):
from sympy import StrictLessThan
return self._cmp(other, "<", StrictLessThan)
def __trunc__(self):
if not self.is_number:
raise TypeError("can't truncate symbols and expressions")
else:
return Integer(self)
@staticmethod
def _from_mpmath(x, prec):
from sympy import Float
if hasattr(x, "_mpf_"):
return Float._new(x._mpf_, prec)
elif hasattr(x, "_mpc_"):
re, im = x._mpc_
re = Float._new(re, prec)
im = Float._new(im, prec)*S.ImaginaryUnit
return re + im
else:
raise TypeError("expected mpmath number (mpf or mpc)")
@property
def is_number(self):
"""Returns True if ``self`` has no free symbols and no
undefined functions (AppliedUndef, to be precise). It will be
faster than ``if not self.free_symbols``, however, since
``is_number`` will fail as soon as it hits a free symbol
or undefined function.
Examples
========
>>> from sympy import Integral, cos, sin, pi
>>> from sympy.core.function import Function
>>> from sympy.abc import x
>>> f = Function('f')
>>> x.is_number
False
>>> f(1).is_number
False
>>> (2*x).is_number
False
>>> (2 + Integral(2, x)).is_number
False
>>> (2 + Integral(2, (x, 1, 2))).is_number
True
Not all numbers are Numbers in the SymPy sense:
>>> pi.is_number, pi.is_Number
(True, False)
If something is a number it should evaluate to a number with
real and imaginary parts that are Numbers; the result may not
be comparable, however, since the real and/or imaginary part
of the result may not have precision.
>>> cos(1).is_number and cos(1).is_comparable
True
>>> z = cos(1)**2 + sin(1)**2 - 1
>>> z.is_number
True
>>> z.is_comparable
False
See Also
========
sympy.core.basic.Basic.is_comparable
"""
return all(obj.is_number for obj in self.args)
def _random(self, n=None, re_min=-1, im_min=-1, re_max=1, im_max=1):
"""Return self evaluated, if possible, replacing free symbols with
random complex values, if necessary.
The random complex value for each free symbol is generated
by the random_complex_number routine giving real and imaginary
parts in the range given by the re_min, re_max, im_min, and im_max
values. The returned value is evaluated to a precision of n
(if given) else the maximum of 15 and the precision needed
to get more than 1 digit of precision. If the expression
could not be evaluated to a number, or could not be evaluated
to more than 1 digit of precision, then None is returned.
Examples
========
>>> from sympy import sqrt
>>> from sympy.abc import x, y
>>> x._random() # doctest: +SKIP
0.0392918155679172 + 0.916050214307199*I
>>> x._random(2) # doctest: +SKIP
-0.77 - 0.87*I
>>> (x + y/2)._random(2) # doctest: +SKIP
-0.57 + 0.16*I
>>> sqrt(2)._random(2)
1.4
See Also
========
sympy.testing.randtest.random_complex_number
"""
free = self.free_symbols
prec = 1
if free:
from sympy.testing.randtest import random_complex_number
a, c, b, d = re_min, re_max, im_min, im_max
reps = dict(list(zip(free, [random_complex_number(a, b, c, d, rational=True)
for zi in free])))
try:
nmag = abs(self.evalf(2, subs=reps))
except (ValueError, TypeError):
# if an out of range value resulted in evalf problems
# then return None -- XXX is there a way to know how to
# select a good random number for a given expression?
# e.g. when calculating n! negative values for n should not
# be used
return None
else:
reps = {}
nmag = abs(self.evalf(2))
if not hasattr(nmag, '_prec'):
# e.g. exp_polar(2*I*pi) doesn't evaluate but is_number is True
return None
if nmag._prec == 1:
# increase the precision up to the default maximum
# precision to see if we can get any significance
from mpmath.libmp.libintmath import giant_steps
from sympy.core.evalf import DEFAULT_MAXPREC as target
# evaluate
for prec in giant_steps(2, target):
nmag = abs(self.evalf(prec, subs=reps))
if nmag._prec != 1:
break
if nmag._prec != 1:
if n is None:
n = max(prec, 15)
return self.evalf(n, subs=reps)
# never got any significance
return None
def is_constant(self, *wrt, **flags):
"""Return True if self is constant, False if not, or None if
the constancy could not be determined conclusively.
If an expression has no free symbols then it is a constant. If
there are free symbols it is possible that the expression is a
constant, perhaps (but not necessarily) zero. To test such
expressions, a few strategies are tried:
1) numerical evaluation at two random points. If two such evaluations
give two different values and the values have a precision greater than
1 then self is not constant. If the evaluations agree or could not be
obtained with any precision, no decision is made. The numerical testing
is done only if ``wrt`` is different than the free symbols.
2) differentiation with respect to variables in 'wrt' (or all free
symbols if omitted) to see if the expression is constant or not. This
will not always lead to an expression that is zero even though an
expression is constant (see added test in test_expr.py). If
all derivatives are zero then self is constant with respect to the
given symbols.
3) finding out zeros of denominator expression with free_symbols.
It won't be constant if there are zeros. It gives more negative
answers for expression that are not constant.
If neither evaluation nor differentiation can prove the expression is
constant, None is returned unless two numerical values happened to be
the same and the flag ``failing_number`` is True -- in that case the
numerical value will be returned.
If flag simplify=False is passed, self will not be simplified;
the default is True since self should be simplified before testing.
Examples
========
>>> from sympy import cos, sin, Sum, S, pi
>>> from sympy.abc import a, n, x, y
>>> x.is_constant()
False
>>> S(2).is_constant()
True
>>> Sum(x, (x, 1, 10)).is_constant()
True
>>> Sum(x, (x, 1, n)).is_constant()
False
>>> Sum(x, (x, 1, n)).is_constant(y)
True
>>> Sum(x, (x, 1, n)).is_constant(n)
False
>>> Sum(x, (x, 1, n)).is_constant(x)
True
>>> eq = a*cos(x)**2 + a*sin(x)**2 - a
>>> eq.is_constant()
True
>>> eq.subs({x: pi, a: 2}) == eq.subs({x: pi, a: 3}) == 0
True
>>> (0**x).is_constant()
False
>>> x.is_constant()
False
>>> (x**x).is_constant()
False
>>> one = cos(x)**2 + sin(x)**2
>>> one.is_constant()
True
>>> ((one - 1)**(x + 1)).is_constant() in (True, False) # could be 0 or 1
True
"""
def check_denominator_zeros(expression):
from sympy.solvers.solvers import denoms
retNone = False
for den in denoms(expression):
z = den.is_zero
if z is True:
return True
if z is None:
retNone = True
if retNone:
return None
return False
simplify = flags.get('simplify', True)
if self.is_number:
return True
free = self.free_symbols
if not free:
return True # assume f(1) is some constant
# if we are only interested in some symbols and they are not in the
# free symbols then this expression is constant wrt those symbols
wrt = set(wrt)
if wrt and not wrt & free:
return True
wrt = wrt or free
# simplify unless this has already been done
expr = self
if simplify:
expr = expr.simplify()
# is_zero should be a quick assumptions check; it can be wrong for
# numbers (see test_is_not_constant test), giving False when it
# shouldn't, but hopefully it will never give True unless it is sure.
if expr.is_zero:
return True
# try numerical evaluation to see if we get two different values
failing_number = None
if wrt == free:
# try 0 (for a) and 1 (for b)
try:
a = expr.subs(list(zip(free, [0]*len(free))),
simultaneous=True)
if a is S.NaN:
# evaluation may succeed when substitution fails
a = expr._random(None, 0, 0, 0, 0)
except ZeroDivisionError:
a = None
if a is not None and a is not S.NaN:
try:
b = expr.subs(list(zip(free, [1]*len(free))),
simultaneous=True)
if b is S.NaN:
# evaluation may succeed when substitution fails
b = expr._random(None, 1, 0, 1, 0)
except ZeroDivisionError:
b = None
if b is not None and b is not S.NaN and b.equals(a) is False:
return False
# try random real
b = expr._random(None, -1, 0, 1, 0)
if b is not None and b is not S.NaN and b.equals(a) is False:
return False
# try random complex
b = expr._random()
if b is not None and b is not S.NaN:
if b.equals(a) is False:
return False
failing_number = a if a.is_number else b
# now we will test each wrt symbol (or all free symbols) to see if the
# expression depends on them or not using differentiation. This is
# not sufficient for all expressions, however, so we don't return
# False if we get a derivative other than 0 with free symbols.
for w in wrt:
deriv = expr.diff(w)
if simplify:
deriv = deriv.simplify()
if deriv != 0:
if not (pure_complex(deriv, or_real=True)):
if flags.get('failing_number', False):
return failing_number
elif deriv.free_symbols:
# dead line provided _random returns None in such cases
return None
return False
cd = check_denominator_zeros(self)
if cd is True:
return False
elif cd is None:
return None
return True
def equals(self, other, failing_expression=False):
"""Return True if self == other, False if it doesn't, or None. If
failing_expression is True then the expression which did not simplify
to a 0 will be returned instead of None.
If ``self`` is a Number (or complex number) that is not zero, then
the result is False.
If ``self`` is a number and has not evaluated to zero, evalf will be
used to test whether the expression evaluates to zero. If it does so
and the result has significance (i.e. the precision is either -1, for
a Rational result, or is greater than 1) then the evalf value will be
used to return True or False.
"""
from sympy.simplify.simplify import nsimplify, simplify
from sympy.solvers.solvers import solve
from sympy.polys.polyerrors import NotAlgebraic
from sympy.polys.numberfields import minimal_polynomial
other = sympify(other)
if self == other:
return True
# they aren't the same so see if we can make the difference 0;
# don't worry about doing simplification steps one at a time
# because if the expression ever goes to 0 then the subsequent
# simplification steps that are done will be very fast.
diff = factor_terms(simplify(self - other), radical=True)
if not diff:
return True
if not diff.has(Add, Mod):
# if there is no expanding to be done after simplifying
# then this can't be a zero
return False
constant = diff.is_constant(simplify=False, failing_number=True)
if constant is False:
return False
if not diff.is_number:
if constant is None:
# e.g. unless the right simplification is done, a symbolic
# zero is possible (see expression of issue 6829: without
# simplification constant will be None).
return
if constant is True:
# this gives a number whether there are free symbols or not
ndiff = diff._random()
# is_comparable will work whether the result is real
# or complex; it could be None, however.
if ndiff and ndiff.is_comparable:
return False
# sometimes we can use a simplified result to give a clue as to
# what the expression should be; if the expression is *not* zero
# then we should have been able to compute that and so now
# we can just consider the cases where the approximation appears
# to be zero -- we try to prove it via minimal_polynomial.
#
# removed
# ns = nsimplify(diff)
# if diff.is_number and (not ns or ns == diff):
#
# The thought was that if it nsimplifies to 0 that's a sure sign
# to try the following to prove it; or if it changed but wasn't
# zero that might be a sign that it's not going to be easy to
# prove. But tests seem to be working without that logic.
#
if diff.is_number:
# try to prove via self-consistency
surds = [s for s in diff.atoms(Pow) if s.args[0].is_Integer]
# it seems to work better to try big ones first
surds.sort(key=lambda x: -x.args[0])
for s in surds:
try:
# simplify is False here -- this expression has already
# been identified as being hard to identify as zero;
# we will handle the checking ourselves using nsimplify
# to see if we are in the right ballpark or not and if so
# *then* the simplification will be attempted.
sol = solve(diff, s, simplify=False)
if sol:
if s in sol:
# the self-consistent result is present
return True
if all(si.is_Integer for si in sol):
# perfect powers are removed at instantiation
# so surd s cannot be an integer
return False
if all(i.is_algebraic is False for i in sol):
# a surd is algebraic
return False
if any(si in surds for si in sol):
# it wasn't equal to s but it is in surds
# and different surds are not equal
return False
if any(nsimplify(s - si) == 0 and
simplify(s - si) == 0 for si in sol):
return True
if s.is_real:
if any(nsimplify(si, [s]) == s and simplify(si) == s
for si in sol):
return True
except NotImplementedError:
pass
# try to prove with minimal_polynomial but know when
# *not* to use this or else it can take a long time. e.g. issue 8354
if True: # change True to condition that assures non-hang
try:
mp = minimal_polynomial(diff)
if mp.is_Symbol:
return True
return False
except (NotAlgebraic, NotImplementedError):
pass
# diff has not simplified to zero; constant is either None, True
# or the number with significance (is_comparable) that was randomly
# calculated twice as the same value.
if constant not in (True, None) and constant != 0:
return False
if failing_expression:
return diff
return None
def _eval_is_positive(self):
finite = self.is_finite
if finite is False:
return False
extended_positive = self.is_extended_positive
if finite is True:
return extended_positive
if extended_positive is False:
return False
def _eval_is_negative(self):
finite = self.is_finite
if finite is False:
return False
extended_negative = self.is_extended_negative
if finite is True:
return extended_negative
if extended_negative is False:
return False
def _eval_is_extended_positive_negative(self, positive):
from sympy.polys.numberfields import minimal_polynomial
from sympy.polys.polyerrors import NotAlgebraic
if self.is_number:
if self.is_extended_real is False:
return False
# check to see that we can get a value
try:
n2 = self._eval_evalf(2)
# XXX: This shouldn't be caught here
# Catches ValueError: hypsum() failed to converge to the requested
# 34 bits of accuracy
except ValueError:
return None
if n2 is None:
return None
if getattr(n2, '_prec', 1) == 1: # no significance
return None
if n2 is S.NaN:
return None
r, i = self.evalf(2).as_real_imag()
if not i.is_Number or not r.is_Number:
return False
if r._prec != 1 and i._prec != 1:
return bool(not i and ((r > 0) if positive else (r < 0)))
elif r._prec == 1 and (not i or i._prec == 1) and \
self.is_algebraic and not self.has(Function):
try:
if minimal_polynomial(self).is_Symbol:
return False
except (NotAlgebraic, NotImplementedError):
pass
def _eval_is_extended_positive(self):
return self._eval_is_extended_positive_negative(positive=True)
def _eval_is_extended_negative(self):
return self._eval_is_extended_positive_negative(positive=False)
def _eval_interval(self, x, a, b):
"""
Returns evaluation over an interval. For most functions this is:
self.subs(x, b) - self.subs(x, a),
possibly using limit() if NaN is returned from subs, or if
singularities are found between a and b.
If b or a is None, it only evaluates -self.subs(x, a) or self.subs(b, x),
respectively.
"""
from sympy.series import limit, Limit
from sympy.solvers.solveset import solveset
from sympy.sets.sets import Interval
from sympy.functions.elementary.exponential import log
from sympy.calculus.util import AccumBounds
if (a is None and b is None):
raise ValueError('Both interval ends cannot be None.')
def _eval_endpoint(left):
c = a if left else b
if c is None:
return 0
else:
C = self.subs(x, c)
if C.has(S.NaN, S.Infinity, S.NegativeInfinity,
S.ComplexInfinity, AccumBounds):
if (a < b) != False:
C = limit(self, x, c, "+" if left else "-")
else:
C = limit(self, x, c, "-" if left else "+")
if isinstance(C, Limit):
raise NotImplementedError("Could not compute limit")
return C
if a == b:
return 0
A = _eval_endpoint(left=True)
if A is S.NaN:
return A
B = _eval_endpoint(left=False)
if (a and b) is None:
return B - A
value = B - A
if a.is_comparable and b.is_comparable:
if a < b:
domain = Interval(a, b)
else:
domain = Interval(b, a)
# check the singularities of self within the interval
# if singularities is a ConditionSet (not iterable), catch the exception and pass
singularities = solveset(self.cancel().as_numer_denom()[1], x,
domain=domain)
for logterm in self.atoms(log):
singularities = singularities | solveset(logterm.args[0], x,
domain=domain)
try:
for s in singularities:
if value is S.NaN:
# no need to keep adding, it will stay NaN
break
if not s.is_comparable:
continue
if (a < s) == (s < b) == True:
value += -limit(self, x, s, "+") + limit(self, x, s, "-")
elif (b < s) == (s < a) == True:
value += limit(self, x, s, "+") - limit(self, x, s, "-")
except TypeError:
pass
return value
def _eval_power(self, other):
# subclass to compute self**other for cases when
# other is not NaN, 0, or 1
return None
def _eval_conjugate(self):
if self.is_extended_real:
return self
elif self.is_imaginary:
return -self
def conjugate(self):
"""Returns the complex conjugate of 'self'."""
from sympy.functions.elementary.complexes import conjugate as c
return c(self)
def dir(self, x, cdir):
from sympy import log
minexp = S.Zero
if self.is_zero:
return S.Zero
arg = self
while arg:
minexp += S.One
arg = arg.diff(x)
coeff = arg.subs(x, 0)
if coeff in (S.NaN, S.ComplexInfinity):
try:
coeff, _ = arg.leadterm(x)
if coeff.has(log(x)):
raise ValueError()
except ValueError:
coeff = arg.limit(x, 0)
if coeff != S.Zero:
break
return coeff*cdir**minexp
def _eval_transpose(self):
from sympy.functions.elementary.complexes import conjugate
if (self.is_complex or self.is_infinite):
return self
elif self.is_hermitian:
return conjugate(self)
elif self.is_antihermitian:
return -conjugate(self)
def transpose(self):
from sympy.functions.elementary.complexes import transpose
return transpose(self)
def _eval_adjoint(self):
from sympy.functions.elementary.complexes import conjugate, transpose
if self.is_hermitian:
return self
elif self.is_antihermitian:
return -self
obj = self._eval_conjugate()
if obj is not None:
return transpose(obj)
obj = self._eval_transpose()
if obj is not None:
return conjugate(obj)
def adjoint(self):
from sympy.functions.elementary.complexes import adjoint
return adjoint(self)
@classmethod
def _parse_order(cls, order):
"""Parse and configure the ordering of terms. """
from sympy.polys.orderings import monomial_key
startswith = getattr(order, "startswith", None)
if startswith is None:
reverse = False
else:
reverse = startswith('rev-')
if reverse:
order = order[4:]
monom_key = monomial_key(order)
def neg(monom):
result = []
for m in monom:
if isinstance(m, tuple):
result.append(neg(m))
else:
result.append(-m)
return tuple(result)
def key(term):
_, ((re, im), monom, ncpart) = term
monom = neg(monom_key(monom))
ncpart = tuple([e.sort_key(order=order) for e in ncpart])
coeff = ((bool(im), im), (re, im))
return monom, ncpart, coeff
return key, reverse
def as_ordered_factors(self, order=None):
"""Return list of ordered factors (if Mul) else [self]."""
return [self]
def as_poly(self, *gens, **args):
"""Converts ``self`` to a polynomial or returns ``None``.
>>> from sympy import sin
>>> from sympy.abc import x, y
>>> print((x**2 + x*y).as_poly())
Poly(x**2 + x*y, x, y, domain='ZZ')
>>> print((x**2 + x*y).as_poly(x, y))
Poly(x**2 + x*y, x, y, domain='ZZ')
>>> print((x**2 + sin(y)).as_poly(x, y))
None
"""
from sympy.polys import Poly, PolynomialError
try:
poly = Poly(self, *gens, **args)
if not poly.is_Poly:
return None
else:
return poly
except PolynomialError:
return None
def as_ordered_terms(self, order=None, data=False):
"""
Transform an expression to an ordered list of terms.
Examples
========
>>> from sympy import sin, cos
>>> from sympy.abc import x
>>> (sin(x)**2*cos(x) + sin(x)**2 + 1).as_ordered_terms()
[sin(x)**2*cos(x), sin(x)**2, 1]
"""
from .numbers import Number, NumberSymbol
if order is None and self.is_Add:
# Spot the special case of Add(Number, Mul(Number, expr)) with the
# first number positive and thhe second number nagative
key = lambda x:not isinstance(x, (Number, NumberSymbol))
add_args = sorted(Add.make_args(self), key=key)
if (len(add_args) == 2
and isinstance(add_args[0], (Number, NumberSymbol))
and isinstance(add_args[1], Mul)):
mul_args = sorted(Mul.make_args(add_args[1]), key=key)
if (len(mul_args) == 2
and isinstance(mul_args[0], Number)
and add_args[0].is_positive
and mul_args[0].is_negative):
return add_args
key, reverse = self._parse_order(order)
terms, gens = self.as_terms()
if not any(term.is_Order for term, _ in terms):
ordered = sorted(terms, key=key, reverse=reverse)
else:
_terms, _order = [], []
for term, repr in terms:
if not term.is_Order:
_terms.append((term, repr))
else:
_order.append((term, repr))
ordered = sorted(_terms, key=key, reverse=True) \
+ sorted(_order, key=key, reverse=True)
if data:
return ordered, gens
else:
return [term for term, _ in ordered]
def as_terms(self):
"""Transform an expression to a list of terms. """
from .add import Add
from .mul import Mul
from .exprtools import decompose_power
gens, terms = set(), []
for term in Add.make_args(self):
coeff, _term = term.as_coeff_Mul()
coeff = complex(coeff)
cpart, ncpart = {}, []
if _term is not S.One:
for factor in Mul.make_args(_term):
if factor.is_number:
try:
coeff *= complex(factor)
except (TypeError, ValueError):
pass
else:
continue
if factor.is_commutative:
base, exp = decompose_power(factor)
cpart[base] = exp
gens.add(base)
else:
ncpart.append(factor)
coeff = coeff.real, coeff.imag
ncpart = tuple(ncpart)
terms.append((term, (coeff, cpart, ncpart)))
gens = sorted(gens, key=default_sort_key)
k, indices = len(gens), {}
for i, g in enumerate(gens):
indices[g] = i
result = []
for term, (coeff, cpart, ncpart) in terms:
monom = [0]*k
for base, exp in cpart.items():
monom[indices[base]] = exp
result.append((term, (coeff, tuple(monom), ncpart)))
return result, gens
def removeO(self):
"""Removes the additive O(..) symbol if there is one"""
return self
def getO(self):
"""Returns the additive O(..) symbol if there is one, else None."""
return None
def getn(self):
"""
Returns the order of the expression.
The order is determined either from the O(...) term. If there
is no O(...) term, it returns None.
Examples
========
>>> from sympy import O
>>> from sympy.abc import x
>>> (1 + x + O(x**2)).getn()
2
>>> (1 + x).getn()
"""
from sympy import Dummy, Symbol
o = self.getO()
if o is None:
return None
elif o.is_Order:
o = o.expr
if o is S.One:
return S.Zero
if o.is_Symbol:
return S.One
if o.is_Pow:
return o.args[1]
if o.is_Mul: # x**n*log(x)**n or x**n/log(x)**n
for oi in o.args:
if oi.is_Symbol:
return S.One
if oi.is_Pow:
syms = oi.atoms(Symbol)
if len(syms) == 1:
x = syms.pop()
oi = oi.subs(x, Dummy('x', positive=True))
if oi.base.is_Symbol and oi.exp.is_Rational:
return abs(oi.exp)
raise NotImplementedError('not sure of order of %s' % o)
def count_ops(self, visual=None):
"""wrapper for count_ops that returns the operation count."""
from .function import count_ops
return count_ops(self, visual)
def args_cnc(self, cset=False, warn=True, split_1=True):
"""Return [commutative factors, non-commutative factors] of self.
self is treated as a Mul and the ordering of the factors is maintained.
If ``cset`` is True the commutative factors will be returned in a set.
If there were repeated factors (as may happen with an unevaluated Mul)
then an error will be raised unless it is explicitly suppressed by
setting ``warn`` to False.
Note: -1 is always separated from a Number unless split_1 is False.
>>> from sympy import symbols, oo
>>> A, B = symbols('A B', commutative=0)
>>> x, y = symbols('x y')
>>> (-2*x*y).args_cnc()
[[-1, 2, x, y], []]
>>> (-2.5*x).args_cnc()
[[-1, 2.5, x], []]
>>> (-2*x*A*B*y).args_cnc()
[[-1, 2, x, y], [A, B]]
>>> (-2*x*A*B*y).args_cnc(split_1=False)
[[-2, x, y], [A, B]]
>>> (-2*x*y).args_cnc(cset=True)
[{-1, 2, x, y}, []]
The arg is always treated as a Mul:
>>> (-2 + x + A).args_cnc()
[[], [x - 2 + A]]
>>> (-oo).args_cnc() # -oo is a singleton
[[-1, oo], []]
"""
if self.is_Mul:
args = list(self.args)
else:
args = [self]
for i, mi in enumerate(args):
if not mi.is_commutative:
c = args[:i]
nc = args[i:]
break
else:
c = args
nc = []
if c and split_1 and (
c[0].is_Number and
c[0].is_extended_negative and
c[0] is not S.NegativeOne):
c[:1] = [S.NegativeOne, -c[0]]
if cset:
clen = len(c)
c = set(c)
if clen and warn and len(c) != clen:
raise ValueError('repeated commutative arguments: %s' %
[ci for ci in c if list(self.args).count(ci) > 1])
return [c, nc]
def coeff(self, x, n=1, right=False):
"""
Returns the coefficient from the term(s) containing ``x**n``. If ``n``
is zero then all terms independent of ``x`` will be returned.
When ``x`` is noncommutative, the coefficient to the left (default) or
right of ``x`` can be returned. The keyword 'right' is ignored when
``x`` is commutative.
See Also
========
as_coefficient: separate the expression into a coefficient and factor
as_coeff_Add: separate the additive constant from an expression
as_coeff_Mul: separate the multiplicative constant from an expression
as_independent: separate x-dependent terms/factors from others
sympy.polys.polytools.Poly.coeff_monomial: efficiently find the single coefficient of a monomial in Poly
sympy.polys.polytools.Poly.nth: like coeff_monomial but powers of monomial terms are used
Examples
========
>>> from sympy import symbols
>>> from sympy.abc import x, y, z
You can select terms that have an explicit negative in front of them:
>>> (-x + 2*y).coeff(-1)
x
>>> (x - 2*y).coeff(-1)
2*y
You can select terms with no Rational coefficient:
>>> (x + 2*y).coeff(1)
x
>>> (3 + 2*x + 4*x**2).coeff(1)
0
You can select terms independent of x by making n=0; in this case
expr.as_independent(x)[0] is returned (and 0 will be returned instead
of None):
>>> (3 + 2*x + 4*x**2).coeff(x, 0)
3
>>> eq = ((x + 1)**3).expand() + 1
>>> eq
x**3 + 3*x**2 + 3*x + 2
>>> [eq.coeff(x, i) for i in reversed(range(4))]
[1, 3, 3, 2]
>>> eq -= 2
>>> [eq.coeff(x, i) for i in reversed(range(4))]
[1, 3, 3, 0]
You can select terms that have a numerical term in front of them:
>>> (-x - 2*y).coeff(2)
-y
>>> from sympy import sqrt
>>> (x + sqrt(2)*x).coeff(sqrt(2))
x
The matching is exact:
>>> (3 + 2*x + 4*x**2).coeff(x)
2
>>> (3 + 2*x + 4*x**2).coeff(x**2)
4
>>> (3 + 2*x + 4*x**2).coeff(x**3)
0
>>> (z*(x + y)**2).coeff((x + y)**2)
z
>>> (z*(x + y)**2).coeff(x + y)
0
In addition, no factoring is done, so 1 + z*(1 + y) is not obtained
from the following:
>>> (x + z*(x + x*y)).coeff(x)
1
If such factoring is desired, factor_terms can be used first:
>>> from sympy import factor_terms
>>> factor_terms(x + z*(x + x*y)).coeff(x)
z*(y + 1) + 1
>>> n, m, o = symbols('n m o', commutative=False)
>>> n.coeff(n)
1
>>> (3*n).coeff(n)
3
>>> (n*m + m*n*m).coeff(n) # = (1 + m)*n*m
1 + m
>>> (n*m + m*n*m).coeff(n, right=True) # = (1 + m)*n*m
m
If there is more than one possible coefficient 0 is returned:
>>> (n*m + m*n).coeff(n)
0
If there is only one possible coefficient, it is returned:
>>> (n*m + x*m*n).coeff(m*n)
x
>>> (n*m + x*m*n).coeff(m*n, right=1)
1
"""
x = sympify(x)
if not isinstance(x, Basic):
return S.Zero
n = as_int(n)
if not x:
return S.Zero
if x == self:
if n == 1:
return S.One
return S.Zero
if x is S.One:
co = [a for a in Add.make_args(self)
if a.as_coeff_Mul()[0] is S.One]
if not co:
return S.Zero
return Add(*co)
if n == 0:
if x.is_Add and self.is_Add:
c = self.coeff(x, right=right)
if not c:
return S.Zero
if not right:
return self - Add(*[a*x for a in Add.make_args(c)])
return self - Add(*[x*a for a in Add.make_args(c)])
return self.as_independent(x, as_Add=True)[0]
# continue with the full method, looking for this power of x:
x = x**n
def incommon(l1, l2):
if not l1 or not l2:
return []
n = min(len(l1), len(l2))
for i in range(n):
if l1[i] != l2[i]:
return l1[:i]
return l1[:]
def find(l, sub, first=True):
""" Find where list sub appears in list l. When ``first`` is True
the first occurrence from the left is returned, else the last
occurrence is returned. Return None if sub is not in l.
>> l = range(5)*2
>> find(l, [2, 3])
2
>> find(l, [2, 3], first=0)
7
>> find(l, [2, 4])
None
"""
if not sub or not l or len(sub) > len(l):
return None
n = len(sub)
if not first:
l.reverse()
sub.reverse()
for i in range(0, len(l) - n + 1):
if all(l[i + j] == sub[j] for j in range(n)):
break
else:
i = None
if not first:
l.reverse()
sub.reverse()
if i is not None and not first:
i = len(l) - (i + n)
return i
co = []
args = Add.make_args(self)
self_c = self.is_commutative
x_c = x.is_commutative
if self_c and not x_c:
return S.Zero
one_c = self_c or x_c
xargs, nx = x.args_cnc(cset=True, warn=bool(not x_c))
# find the parts that pass the commutative terms
for a in args:
margs, nc = a.args_cnc(cset=True, warn=bool(not self_c))
if nc is None:
nc = []
if len(xargs) > len(margs):
continue
resid = margs.difference(xargs)
if len(resid) + len(xargs) == len(margs):
if one_c:
co.append(Mul(*(list(resid) + nc)))
else:
co.append((resid, nc))
if one_c:
if co == []:
return S.Zero
elif co:
return Add(*co)
else: # both nc
# now check the non-comm parts
if not co:
return S.Zero
if all(n == co[0][1] for r, n in co):
ii = find(co[0][1], nx, right)
if ii is not None:
if not right:
return Mul(Add(*[Mul(*r) for r, c in co]), Mul(*co[0][1][:ii]))
else:
return Mul(*co[0][1][ii + len(nx):])
beg = reduce(incommon, (n[1] for n in co))
if beg:
ii = find(beg, nx, right)
if ii is not None:
if not right:
gcdc = co[0][0]
for i in range(1, len(co)):
gcdc = gcdc.intersection(co[i][0])
if not gcdc:
break
return Mul(*(list(gcdc) + beg[:ii]))
else:
m = ii + len(nx)
return Add(*[Mul(*(list(r) + n[m:])) for r, n in co])
end = list(reversed(
reduce(incommon, (list(reversed(n[1])) for n in co))))
if end:
ii = find(end, nx, right)
if ii is not None:
if not right:
return Add(*[Mul(*(list(r) + n[:-len(end) + ii])) for r, n in co])
else:
return Mul(*end[ii + len(nx):])
# look for single match
hit = None
for i, (r, n) in enumerate(co):
ii = find(n, nx, right)
if ii is not None:
if not hit:
hit = ii, r, n
else:
break
else:
if hit:
ii, r, n = hit
if not right:
return Mul(*(list(r) + n[:ii]))
else:
return Mul(*n[ii + len(nx):])
return S.Zero
def as_expr(self, *gens):
"""
Convert a polynomial to a SymPy expression.
Examples
========
>>> from sympy import sin
>>> from sympy.abc import x, y
>>> f = (x**2 + x*y).as_poly(x, y)
>>> f.as_expr()
x**2 + x*y
>>> sin(x).as_expr()
sin(x)
"""
return self
def as_coefficient(self, expr):
"""
Extracts symbolic coefficient at the given expression. In
other words, this functions separates 'self' into the product
of 'expr' and 'expr'-free coefficient. If such separation
is not possible it will return None.
Examples
========
>>> from sympy import E, pi, sin, I, Poly
>>> from sympy.abc import x
>>> E.as_coefficient(E)
1
>>> (2*E).as_coefficient(E)
2
>>> (2*sin(E)*E).as_coefficient(E)
Two terms have E in them so a sum is returned. (If one were
desiring the coefficient of the term exactly matching E then
the constant from the returned expression could be selected.
Or, for greater precision, a method of Poly can be used to
indicate the desired term from which the coefficient is
desired.)
>>> (2*E + x*E).as_coefficient(E)
x + 2
>>> _.args[0] # just want the exact match
2
>>> p = Poly(2*E + x*E); p
Poly(x*E + 2*E, x, E, domain='ZZ')
>>> p.coeff_monomial(E)
2
>>> p.nth(0, 1)
2
Since the following cannot be written as a product containing
E as a factor, None is returned. (If the coefficient ``2*x`` is
desired then the ``coeff`` method should be used.)
>>> (2*E*x + x).as_coefficient(E)
>>> (2*E*x + x).coeff(E)
2*x
>>> (E*(x + 1) + x).as_coefficient(E)
>>> (2*pi*I).as_coefficient(pi*I)
2
>>> (2*I).as_coefficient(pi*I)
See Also
========
coeff: return sum of terms have a given factor
as_coeff_Add: separate the additive constant from an expression
as_coeff_Mul: separate the multiplicative constant from an expression
as_independent: separate x-dependent terms/factors from others
sympy.polys.polytools.Poly.coeff_monomial: efficiently find the single coefficient of a monomial in Poly
sympy.polys.polytools.Poly.nth: like coeff_monomial but powers of monomial terms are used
"""
r = self.extract_multiplicatively(expr)
if r and not r.has(expr):
return r
def as_independent(self, *deps, **hint):
"""
A mostly naive separation of a Mul or Add into arguments that are not
are dependent on deps. To obtain as complete a separation of variables
as possible, use a separation method first, e.g.:
* separatevars() to change Mul, Add and Pow (including exp) into Mul
* .expand(mul=True) to change Add or Mul into Add
* .expand(log=True) to change log expr into an Add
The only non-naive thing that is done here is to respect noncommutative
ordering of variables and to always return (0, 0) for `self` of zero
regardless of hints.
For nonzero `self`, the returned tuple (i, d) has the
following interpretation:
* i will has no variable that appears in deps
* d will either have terms that contain variables that are in deps, or
be equal to 0 (when self is an Add) or 1 (when self is a Mul)
* if self is an Add then self = i + d
* if self is a Mul then self = i*d
* otherwise (self, S.One) or (S.One, self) is returned.
To force the expression to be treated as an Add, use the hint as_Add=True
Examples
========
-- self is an Add
>>> from sympy import sin, cos, exp
>>> from sympy.abc import x, y, z
>>> (x + x*y).as_independent(x)
(0, x*y + x)
>>> (x + x*y).as_independent(y)
(x, x*y)
>>> (2*x*sin(x) + y + x + z).as_independent(x)
(y + z, 2*x*sin(x) + x)
>>> (2*x*sin(x) + y + x + z).as_independent(x, y)
(z, 2*x*sin(x) + x + y)
-- self is a Mul
>>> (x*sin(x)*cos(y)).as_independent(x)
(cos(y), x*sin(x))
non-commutative terms cannot always be separated out when self is a Mul
>>> from sympy import symbols
>>> n1, n2, n3 = symbols('n1 n2 n3', commutative=False)
>>> (n1 + n1*n2).as_independent(n2)
(n1, n1*n2)
>>> (n2*n1 + n1*n2).as_independent(n2)
(0, n1*n2 + n2*n1)
>>> (n1*n2*n3).as_independent(n1)
(1, n1*n2*n3)
>>> (n1*n2*n3).as_independent(n2)
(n1, n2*n3)
>>> ((x-n1)*(x-y)).as_independent(x)
(1, (x - y)*(x - n1))
-- self is anything else:
>>> (sin(x)).as_independent(x)
(1, sin(x))
>>> (sin(x)).as_independent(y)
(sin(x), 1)
>>> exp(x+y).as_independent(x)
(1, exp(x + y))
-- force self to be treated as an Add:
>>> (3*x).as_independent(x, as_Add=True)
(0, 3*x)
-- force self to be treated as a Mul:
>>> (3+x).as_independent(x, as_Add=False)
(1, x + 3)
>>> (-3+x).as_independent(x, as_Add=False)
(1, x - 3)
Note how the below differs from the above in making the
constant on the dep term positive.
>>> (y*(-3+x)).as_independent(x)
(y, x - 3)
-- use .as_independent() for true independence testing instead
of .has(). The former considers only symbols in the free
symbols while the latter considers all symbols
>>> from sympy import Integral
>>> I = Integral(x, (x, 1, 2))
>>> I.has(x)
True
>>> x in I.free_symbols
False
>>> I.as_independent(x) == (I, 1)
True
>>> (I + x).as_independent(x) == (I, x)
True
Note: when trying to get independent terms, a separation method
might need to be used first. In this case, it is important to keep
track of what you send to this routine so you know how to interpret
the returned values
>>> from sympy import separatevars, log
>>> separatevars(exp(x+y)).as_independent(x)
(exp(y), exp(x))
>>> (x + x*y).as_independent(y)
(x, x*y)
>>> separatevars(x + x*y).as_independent(y)
(x, y + 1)
>>> (x*(1 + y)).as_independent(y)
(x, y + 1)
>>> (x*(1 + y)).expand(mul=True).as_independent(y)
(x, x*y)
>>> a, b=symbols('a b', positive=True)
>>> (log(a*b).expand(log=True)).as_independent(b)
(log(a), log(b))
See Also
========
.separatevars(), .expand(log=True), sympy.core.add.Add.as_two_terms(),
sympy.core.mul.Mul.as_two_terms(), .as_coeff_add(), .as_coeff_mul()
"""
from .symbol import Symbol
from .add import _unevaluated_Add
from .mul import _unevaluated_Mul
from sympy.utilities.iterables import sift
if self.is_zero:
return S.Zero, S.Zero
func = self.func
if hint.get('as_Add', isinstance(self, Add) ):
want = Add
else:
want = Mul
# sift out deps into symbolic and other and ignore
# all symbols but those that are in the free symbols
sym = set()
other = []
for d in deps:
if isinstance(d, Symbol): # Symbol.is_Symbol is True
sym.add(d)
else:
other.append(d)
def has(e):
"""return the standard has() if there are no literal symbols, else
check to see that symbol-deps are in the free symbols."""
has_other = e.has(*other)
if not sym:
return has_other
return has_other or e.has(*(e.free_symbols & sym))
if (want is not func or
func is not Add and func is not Mul):
if has(self):
return (want.identity, self)
else:
return (self, want.identity)
else:
if func is Add:
args = list(self.args)
else:
args, nc = self.args_cnc()
d = sift(args, lambda x: has(x))
depend = d[True]
indep = d[False]
if func is Add: # all terms were treated as commutative
return (Add(*indep), _unevaluated_Add(*depend))
else: # handle noncommutative by stopping at first dependent term
for i, n in enumerate(nc):
if has(n):
depend.extend(nc[i:])
break
indep.append(n)
return Mul(*indep), (
Mul(*depend, evaluate=False) if nc else
_unevaluated_Mul(*depend))
def as_real_imag(self, deep=True, **hints):
"""Performs complex expansion on 'self' and returns a tuple
containing collected both real and imaginary parts. This
method can't be confused with re() and im() functions,
which does not perform complex expansion at evaluation.
However it is possible to expand both re() and im()
functions and get exactly the same results as with
a single call to this function.
>>> from sympy import symbols, I
>>> x, y = symbols('x,y', real=True)
>>> (x + y*I).as_real_imag()
(x, y)
>>> from sympy.abc import z, w
>>> (z + w*I).as_real_imag()
(re(z) - im(w), re(w) + im(z))
"""
from sympy import im, re
if hints.get('ignore') == self:
return None
else:
return (re(self), im(self))
def as_powers_dict(self):
"""Return self as a dictionary of factors with each factor being
treated as a power. The keys are the bases of the factors and the
values, the corresponding exponents. The resulting dictionary should
be used with caution if the expression is a Mul and contains non-
commutative factors since the order that they appeared will be lost in
the dictionary.
See Also
========
as_ordered_factors: An alternative for noncommutative applications,
returning an ordered list of factors.
args_cnc: Similar to as_ordered_factors, but guarantees separation
of commutative and noncommutative factors.
"""
d = defaultdict(int)
d.update(dict([self.as_base_exp()]))
return d
def as_coefficients_dict(self):
"""Return a dictionary mapping terms to their Rational coefficient.
Since the dictionary is a defaultdict, inquiries about terms which
were not present will return a coefficient of 0. If an expression is
not an Add it is considered to have a single term.
Examples
========
>>> from sympy.abc import a, x
>>> (3*x + a*x + 4).as_coefficients_dict()
{1: 4, x: 3, a*x: 1}
>>> _[a]
0
>>> (3*a*x).as_coefficients_dict()
{a*x: 3}
"""
c, m = self.as_coeff_Mul()
if not c.is_Rational:
c = S.One
m = self
d = defaultdict(int)
d.update({m: c})
return d
def as_base_exp(self):
# a -> b ** e
return self, S.One
def as_coeff_mul(self, *deps, **kwargs):
"""Return the tuple (c, args) where self is written as a Mul, ``m``.
c should be a Rational multiplied by any factors of the Mul that are
independent of deps.
args should be a tuple of all other factors of m; args is empty
if self is a Number or if self is independent of deps (when given).
This should be used when you don't know if self is a Mul or not but
you want to treat self as a Mul or if you want to process the
individual arguments of the tail of self as a Mul.
- if you know self is a Mul and want only the head, use self.args[0];
- if you don't want to process the arguments of the tail but need the
tail then use self.as_two_terms() which gives the head and tail;
- if you want to split self into an independent and dependent parts
use ``self.as_independent(*deps)``
>>> from sympy import S
>>> from sympy.abc import x, y
>>> (S(3)).as_coeff_mul()
(3, ())
>>> (3*x*y).as_coeff_mul()
(3, (x, y))
>>> (3*x*y).as_coeff_mul(x)
(3*y, (x,))
>>> (3*y).as_coeff_mul(x)
(3*y, ())
"""
if deps:
if not self.has(*deps):
return self, tuple()
return S.One, (self,)
def as_coeff_add(self, *deps):
"""Return the tuple (c, args) where self is written as an Add, ``a``.
c should be a Rational added to any terms of the Add that are
independent of deps.
args should be a tuple of all other terms of ``a``; args is empty
if self is a Number or if self is independent of deps (when given).
This should be used when you don't know if self is an Add or not but
you want to treat self as an Add or if you want to process the
individual arguments of the tail of self as an Add.
- if you know self is an Add and want only the head, use self.args[0];
- if you don't want to process the arguments of the tail but need the
tail then use self.as_two_terms() which gives the head and tail.
- if you want to split self into an independent and dependent parts
use ``self.as_independent(*deps)``
>>> from sympy import S
>>> from sympy.abc import x, y
>>> (S(3)).as_coeff_add()
(3, ())
>>> (3 + x).as_coeff_add()
(3, (x,))
>>> (3 + x + y).as_coeff_add(x)
(y + 3, (x,))
>>> (3 + y).as_coeff_add(x)
(y + 3, ())
"""
if deps:
if not self.has(*deps):
return self, tuple()
return S.Zero, (self,)
def primitive(self):
"""Return the positive Rational that can be extracted non-recursively
from every term of self (i.e., self is treated like an Add). This is
like the as_coeff_Mul() method but primitive always extracts a positive
Rational (never a negative or a Float).
Examples
========
>>> from sympy.abc import x
>>> (3*(x + 1)**2).primitive()
(3, (x + 1)**2)
>>> a = (6*x + 2); a.primitive()
(2, 3*x + 1)
>>> b = (x/2 + 3); b.primitive()
(1/2, x + 6)
>>> (a*b).primitive() == (1, a*b)
True
"""
if not self:
return S.One, S.Zero
c, r = self.as_coeff_Mul(rational=True)
if c.is_negative:
c, r = -c, -r
return c, r
def as_content_primitive(self, radical=False, clear=True):
"""This method should recursively remove a Rational from all arguments
and return that (content) and the new self (primitive). The content
should always be positive and ``Mul(*foo.as_content_primitive()) == foo``.
The primitive need not be in canonical form and should try to preserve
the underlying structure if possible (i.e. expand_mul should not be
applied to self).
Examples
========
>>> from sympy import sqrt
>>> from sympy.abc import x, y, z
>>> eq = 2 + 2*x + 2*y*(3 + 3*y)
The as_content_primitive function is recursive and retains structure:
>>> eq.as_content_primitive()
(2, x + 3*y*(y + 1) + 1)
Integer powers will have Rationals extracted from the base:
>>> ((2 + 6*x)**2).as_content_primitive()
(4, (3*x + 1)**2)
>>> ((2 + 6*x)**(2*y)).as_content_primitive()
(1, (2*(3*x + 1))**(2*y))
Terms may end up joining once their as_content_primitives are added:
>>> ((5*(x*(1 + y)) + 2*x*(3 + 3*y))).as_content_primitive()
(11, x*(y + 1))
>>> ((3*(x*(1 + y)) + 2*x*(3 + 3*y))).as_content_primitive()
(9, x*(y + 1))
>>> ((3*(z*(1 + y)) + 2.0*x*(3 + 3*y))).as_content_primitive()
(1, 6.0*x*(y + 1) + 3*z*(y + 1))
>>> ((5*(x*(1 + y)) + 2*x*(3 + 3*y))**2).as_content_primitive()
(121, x**2*(y + 1)**2)
>>> ((x*(1 + y) + 0.4*x*(3 + 3*y))**2).as_content_primitive()
(1, 4.84*x**2*(y + 1)**2)
Radical content can also be factored out of the primitive:
>>> (2*sqrt(2) + 4*sqrt(10)).as_content_primitive(radical=True)
(2, sqrt(2)*(1 + 2*sqrt(5)))
If clear=False (default is True) then content will not be removed
from an Add if it can be distributed to leave one or more
terms with integer coefficients.
>>> (x/2 + y).as_content_primitive()
(1/2, x + 2*y)
>>> (x/2 + y).as_content_primitive(clear=False)
(1, x/2 + y)
"""
return S.One, self
def as_numer_denom(self):
""" expression -> a/b -> a, b
This is just a stub that should be defined by
an object's class methods to get anything else.
See Also
========
normal: return a/b instead of a, b
"""
return self, S.One
def normal(self):
from .mul import _unevaluated_Mul
n, d = self.as_numer_denom()
if d is S.One:
return n
if d.is_Number:
return _unevaluated_Mul(n, 1/d)
else:
return n/d
def extract_multiplicatively(self, c):
"""Return None if it's not possible to make self in the form
c * something in a nice way, i.e. preserving the properties
of arguments of self.
Examples
========
>>> from sympy import symbols, Rational
>>> x, y = symbols('x,y', real=True)
>>> ((x*y)**3).extract_multiplicatively(x**2 * y)
x*y**2
>>> ((x*y)**3).extract_multiplicatively(x**4 * y)
>>> (2*x).extract_multiplicatively(2)
x
>>> (2*x).extract_multiplicatively(3)
>>> (Rational(1, 2)*x).extract_multiplicatively(3)
x/6
"""
from .add import _unevaluated_Add
c = sympify(c)
if self is S.NaN:
return None
if c is S.One:
return self
elif c == self:
return S.One
if c.is_Add:
cc, pc = c.primitive()
if cc is not S.One:
c = Mul(cc, pc, evaluate=False)
if c.is_Mul:
a, b = c.as_two_terms()
x = self.extract_multiplicatively(a)
if x is not None:
return x.extract_multiplicatively(b)
else:
return x
quotient = self / c
if self.is_Number:
if self is S.Infinity:
if c.is_positive:
return S.Infinity
elif self is S.NegativeInfinity:
if c.is_negative:
return S.Infinity
elif c.is_positive:
return S.NegativeInfinity
elif self is S.ComplexInfinity:
if not c.is_zero:
return S.ComplexInfinity
elif self.is_Integer:
if not quotient.is_Integer:
return None
elif self.is_positive and quotient.is_negative:
return None
else:
return quotient
elif self.is_Rational:
if not quotient.is_Rational:
return None
elif self.is_positive and quotient.is_negative:
return None
else:
return quotient
elif self.is_Float:
if not quotient.is_Float:
return None
elif self.is_positive and quotient.is_negative:
return None
else:
return quotient
elif self.is_NumberSymbol or self.is_Symbol or self is S.ImaginaryUnit:
if quotient.is_Mul and len(quotient.args) == 2:
if quotient.args[0].is_Integer and quotient.args[0].is_positive and quotient.args[1] == self:
return quotient
elif quotient.is_Integer and c.is_Number:
return quotient
elif self.is_Add:
cs, ps = self.primitive()
# assert cs >= 1
if c.is_Number and c is not S.NegativeOne:
# assert c != 1 (handled at top)
if cs is not S.One:
if c.is_negative:
xc = -(cs.extract_multiplicatively(-c))
else:
xc = cs.extract_multiplicatively(c)
if xc is not None:
return xc*ps # rely on 2-arg Mul to restore Add
return # |c| != 1 can only be extracted from cs
if c == ps:
return cs
# check args of ps
newargs = []
for arg in ps.args:
newarg = arg.extract_multiplicatively(c)
if newarg is None:
return # all or nothing
newargs.append(newarg)
if cs is not S.One:
args = [cs*t for t in newargs]
# args may be in different order
return _unevaluated_Add(*args)
else:
return Add._from_args(newargs)
elif self.is_Mul:
args = list(self.args)
for i, arg in enumerate(args):
newarg = arg.extract_multiplicatively(c)
if newarg is not None:
args[i] = newarg
return Mul(*args)
elif self.is_Pow:
if c.is_Pow and c.base == self.base:
new_exp = self.exp.extract_additively(c.exp)
if new_exp is not None:
return self.base ** (new_exp)
elif c == self.base:
new_exp = self.exp.extract_additively(1)
if new_exp is not None:
return self.base ** (new_exp)
def extract_additively(self, c):
"""Return self - c if it's possible to subtract c from self and
make all matching coefficients move towards zero, else return None.
Examples
========
>>> from sympy.abc import x, y
>>> e = 2*x + 3
>>> e.extract_additively(x + 1)
x + 2
>>> e.extract_additively(3*x)
>>> e.extract_additively(4)
>>> (y*(x + 1)).extract_additively(x + 1)
>>> ((x + 1)*(x + 2*y + 1) + 3).extract_additively(x + 1)
(x + 1)*(x + 2*y) + 3
Sometimes auto-expansion will return a less simplified result
than desired; gcd_terms might be used in such cases:
>>> from sympy import gcd_terms
>>> (4*x*(y + 1) + y).extract_additively(x)
4*x*(y + 1) + x*(4*y + 3) - x*(4*y + 4) + y
>>> gcd_terms(_)
x*(4*y + 3) + y
See Also
========
extract_multiplicatively
coeff
as_coefficient
"""
c = sympify(c)
if self is S.NaN:
return None
if c.is_zero:
return self
elif c == self:
return S.Zero
elif self == S.Zero:
return None
if self.is_Number:
if not c.is_Number:
return None
co = self
diff = co - c
# XXX should we match types? i.e should 3 - .1 succeed?
if (co > 0 and diff > 0 and diff < co or
co < 0 and diff < 0 and diff > co):
return diff
return None
if c.is_Number:
co, t = self.as_coeff_Add()
xa = co.extract_additively(c)
if xa is None:
return None
return xa + t
# handle the args[0].is_Number case separately
# since we will have trouble looking for the coeff of
# a number.
if c.is_Add and c.args[0].is_Number:
# whole term as a term factor
co = self.coeff(c)
xa0 = (co.extract_additively(1) or 0)*c
if xa0:
diff = self - co*c
return (xa0 + (diff.extract_additively(c) or diff)) or None
# term-wise
h, t = c.as_coeff_Add()
sh, st = self.as_coeff_Add()
xa = sh.extract_additively(h)
if xa is None:
return None
xa2 = st.extract_additively(t)
if xa2 is None:
return None
return xa + xa2
# whole term as a term factor
co = self.coeff(c)
xa0 = (co.extract_additively(1) or 0)*c
if xa0:
diff = self - co*c
return (xa0 + (diff.extract_additively(c) or diff)) or None
# term-wise
coeffs = []
for a in Add.make_args(c):
ac, at = a.as_coeff_Mul()
co = self.coeff(at)
if not co:
return None
coc, cot = co.as_coeff_Add()
xa = coc.extract_additively(ac)
if xa is None:
return None
self -= co*at
coeffs.append((cot + xa)*at)
coeffs.append(self)
return Add(*coeffs)
@property
def expr_free_symbols(self):
"""
Like ``free_symbols``, but returns the free symbols only if they are contained in an expression node.
Examples
========
>>> from sympy.abc import x, y
>>> (x + y).expr_free_symbols
{x, y}
If the expression is contained in a non-expression object, don't return
the free symbols. Compare:
>>> from sympy import Tuple
>>> t = Tuple(x + y)
>>> t.expr_free_symbols
set()
>>> t.free_symbols
{x, y}
"""
return {j for i in self.args for j in i.expr_free_symbols}
def could_extract_minus_sign(self):
"""Return True if self is not in a canonical form with respect
to its sign.
For most expressions, e, there will be a difference in e and -e.
When there is, True will be returned for one and False for the
other; False will be returned if there is no difference.
Examples
========
>>> from sympy.abc import x, y
>>> e = x - y
>>> {i.could_extract_minus_sign() for i in (e, -e)}
{False, True}
"""
negative_self = -self
if self == negative_self:
return False # e.g. zoo*x == -zoo*x
self_has_minus = (self.extract_multiplicatively(-1) is not None)
negative_self_has_minus = (
(negative_self).extract_multiplicatively(-1) is not None)
if self_has_minus != negative_self_has_minus:
return self_has_minus
else:
if self.is_Add:
# We choose the one with less arguments with minus signs
all_args = len(self.args)
negative_args = len([False for arg in self.args if arg.could_extract_minus_sign()])
positive_args = all_args - negative_args
if positive_args > negative_args:
return False
elif positive_args < negative_args:
return True
elif self.is_Mul:
# We choose the one with an odd number of minus signs
num, den = self.as_numer_denom()
args = Mul.make_args(num) + Mul.make_args(den)
arg_signs = [arg.could_extract_minus_sign() for arg in args]
negative_args = list(filter(None, arg_signs))
return len(negative_args) % 2 == 1
# As a last resort, we choose the one with greater value of .sort_key()
return bool(self.sort_key() < negative_self.sort_key())
def extract_branch_factor(self, allow_half=False):
"""
Try to write self as ``exp_polar(2*pi*I*n)*z`` in a nice way.
Return (z, n).
>>> from sympy import exp_polar, I, pi
>>> from sympy.abc import x, y
>>> exp_polar(I*pi).extract_branch_factor()
(exp_polar(I*pi), 0)
>>> exp_polar(2*I*pi).extract_branch_factor()
(1, 1)
>>> exp_polar(-pi*I).extract_branch_factor()
(exp_polar(I*pi), -1)
>>> exp_polar(3*pi*I + x).extract_branch_factor()
(exp_polar(x + I*pi), 1)
>>> (y*exp_polar(-5*pi*I)*exp_polar(3*pi*I + 2*pi*x)).extract_branch_factor()
(y*exp_polar(2*pi*x), -1)
>>> exp_polar(-I*pi/2).extract_branch_factor()
(exp_polar(-I*pi/2), 0)
If allow_half is True, also extract exp_polar(I*pi):
>>> exp_polar(I*pi).extract_branch_factor(allow_half=True)
(1, 1/2)
>>> exp_polar(2*I*pi).extract_branch_factor(allow_half=True)
(1, 1)
>>> exp_polar(3*I*pi).extract_branch_factor(allow_half=True)
(1, 3/2)
>>> exp_polar(-I*pi).extract_branch_factor(allow_half=True)
(1, -1/2)
"""
from sympy import exp_polar, pi, I, ceiling, Add
n = S.Zero
res = S.One
args = Mul.make_args(self)
exps = []
for arg in args:
if isinstance(arg, exp_polar):
exps += [arg.exp]
else:
res *= arg
piimult = S.Zero
extras = []
while exps:
exp = exps.pop()
if exp.is_Add:
exps += exp.args
continue
if exp.is_Mul:
coeff = exp.as_coefficient(pi*I)
if coeff is not None:
piimult += coeff
continue
extras += [exp]
if piimult.is_number:
coeff = piimult
tail = ()
else:
coeff, tail = piimult.as_coeff_add(*piimult.free_symbols)
# round down to nearest multiple of 2
branchfact = ceiling(coeff/2 - S.Half)*2
n += branchfact/2
c = coeff - branchfact
if allow_half:
nc = c.extract_additively(1)
if nc is not None:
n += S.Half
c = nc
newexp = pi*I*Add(*((c, ) + tail)) + Add(*extras)
if newexp != 0:
res *= exp_polar(newexp)
return res, n
def _eval_is_polynomial(self, syms):
if self.free_symbols.intersection(syms) == set():
return True
return False
def is_polynomial(self, *syms):
r"""
Return True if self is a polynomial in syms and False otherwise.
This checks if self is an exact polynomial in syms. This function
returns False for expressions that are "polynomials" with symbolic
exponents. Thus, you should be able to apply polynomial algorithms to
expressions for which this returns True, and Poly(expr, \*syms) should
work if and only if expr.is_polynomial(\*syms) returns True. The
polynomial does not have to be in expanded form. If no symbols are
given, all free symbols in the expression will be used.
This is not part of the assumptions system. You cannot do
Symbol('z', polynomial=True).
Examples
========
>>> from sympy import Symbol
>>> x = Symbol('x')
>>> ((x**2 + 1)**4).is_polynomial(x)
True
>>> ((x**2 + 1)**4).is_polynomial()
True
>>> (2**x + 1).is_polynomial(x)
False
>>> n = Symbol('n', nonnegative=True, integer=True)
>>> (x**n + 1).is_polynomial(x)
False
This function does not attempt any nontrivial simplifications that may
result in an expression that does not appear to be a polynomial to
become one.
>>> from sympy import sqrt, factor, cancel
>>> y = Symbol('y', positive=True)
>>> a = sqrt(y**2 + 2*y + 1)
>>> a.is_polynomial(y)
False
>>> factor(a)
y + 1
>>> factor(a).is_polynomial(y)
True
>>> b = (y**2 + 2*y + 1)/(y + 1)
>>> b.is_polynomial(y)
False
>>> cancel(b)
y + 1
>>> cancel(b).is_polynomial(y)
True
See also .is_rational_function()
"""
if syms:
syms = set(map(sympify, syms))
else:
syms = self.free_symbols
if syms.intersection(self.free_symbols) == set():
# constant polynomial
return True
else:
return self._eval_is_polynomial(syms)
def _eval_is_rational_function(self, syms):
if self.free_symbols.intersection(syms) == set():
return True
return False
def is_rational_function(self, *syms):
"""
Test whether function is a ratio of two polynomials in the given
symbols, syms. When syms is not given, all free symbols will be used.
The rational function does not have to be in expanded or in any kind of
canonical form.
This function returns False for expressions that are "rational
functions" with symbolic exponents. Thus, you should be able to call
.as_numer_denom() and apply polynomial algorithms to the result for
expressions for which this returns True.
This is not part of the assumptions system. You cannot do
Symbol('z', rational_function=True).
Examples
========
>>> from sympy import Symbol, sin
>>> from sympy.abc import x, y
>>> (x/y).is_rational_function()
True
>>> (x**2).is_rational_function()
True
>>> (x/sin(y)).is_rational_function(y)
False
>>> n = Symbol('n', integer=True)
>>> (x**n + 1).is_rational_function(x)
False
This function does not attempt any nontrivial simplifications that may
result in an expression that does not appear to be a rational function
to become one.
>>> from sympy import sqrt, factor
>>> y = Symbol('y', positive=True)
>>> a = sqrt(y**2 + 2*y + 1)/y
>>> a.is_rational_function(y)
False
>>> factor(a)
(y + 1)/y
>>> factor(a).is_rational_function(y)
True
See also is_algebraic_expr().
"""
if self in [S.NaN, S.Infinity, S.NegativeInfinity, S.ComplexInfinity]:
return False
if syms:
syms = set(map(sympify, syms))
else:
syms = self.free_symbols
if syms.intersection(self.free_symbols) == set():
# constant rational function
return True
else:
return self._eval_is_rational_function(syms)
def _eval_is_meromorphic(self, x, a):
# Default implementation, return True for constants.
return None if self.has(x) else True
def is_meromorphic(self, x, a):
"""
This tests whether an expression is meromorphic as
a function of the given symbol ``x`` at the point ``a``.
This method is intended as a quick test that will return
None if no decision can be made without simplification or
more detailed analysis.
Examples
========
>>> from sympy import zoo, log, sin, sqrt
>>> from sympy.abc import x
>>> f = 1/x**2 + 1 - 2*x**3
>>> f.is_meromorphic(x, 0)
True
>>> f.is_meromorphic(x, 1)
True
>>> f.is_meromorphic(x, zoo)
True
>>> g = x**log(3)
>>> g.is_meromorphic(x, 0)
False
>>> g.is_meromorphic(x, 1)
True
>>> g.is_meromorphic(x, zoo)
False
>>> h = sin(1/x)*x**2
>>> h.is_meromorphic(x, 0)
False
>>> h.is_meromorphic(x, 1)
True
>>> h.is_meromorphic(x, zoo)
True
Multivalued functions are considered meromorphic when their
branches are meromorphic. Thus most functions are meromorphic
everywhere except at essential singularities and branch points.
In particular, they will be meromorphic also on branch cuts
except at their endpoints.
>>> log(x).is_meromorphic(x, -1)
True
>>> log(x).is_meromorphic(x, 0)
False
>>> sqrt(x).is_meromorphic(x, -1)
True
>>> sqrt(x).is_meromorphic(x, 0)
False
"""
if not x.is_symbol:
raise TypeError("{} should be of symbol type".format(x))
a = sympify(a)
return self._eval_is_meromorphic(x, a)
def _eval_is_algebraic_expr(self, syms):
if self.free_symbols.intersection(syms) == set():
return True
return False
def is_algebraic_expr(self, *syms):
"""
This tests whether a given expression is algebraic or not, in the
given symbols, syms. When syms is not given, all free symbols
will be used. The rational function does not have to be in expanded
or in any kind of canonical form.
This function returns False for expressions that are "algebraic
expressions" with symbolic exponents. This is a simple extension to the
is_rational_function, including rational exponentiation.
Examples
========
>>> from sympy import Symbol, sqrt
>>> x = Symbol('x', real=True)
>>> sqrt(1 + x).is_rational_function()
False
>>> sqrt(1 + x).is_algebraic_expr()
True
This function does not attempt any nontrivial simplifications that may
result in an expression that does not appear to be an algebraic
expression to become one.
>>> from sympy import exp, factor
>>> a = sqrt(exp(x)**2 + 2*exp(x) + 1)/(exp(x) + 1)
>>> a.is_algebraic_expr(x)
False
>>> factor(a).is_algebraic_expr()
True
See Also
========
is_rational_function()
References
==========
- https://en.wikipedia.org/wiki/Algebraic_expression
"""
if syms:
syms = set(map(sympify, syms))
else:
syms = self.free_symbols
if syms.intersection(self.free_symbols) == set():
# constant algebraic expression
return True
else:
return self._eval_is_algebraic_expr(syms)
###################################################################################
##################### SERIES, LEADING TERM, LIMIT, ORDER METHODS ##################
###################################################################################
def series(self, x=None, x0=0, n=6, dir="+", logx=None, cdir=0):
"""
Series expansion of "self" around ``x = x0`` yielding either terms of
the series one by one (the lazy series given when n=None), else
all the terms at once when n != None.
Returns the series expansion of "self" around the point ``x = x0``
with respect to ``x`` up to ``O((x - x0)**n, x, x0)`` (default n is 6).
If ``x=None`` and ``self`` is univariate, the univariate symbol will
be supplied, otherwise an error will be raised.
Parameters
==========
expr : Expression
The expression whose series is to be expanded.
x : Symbol
It is the variable of the expression to be calculated.
x0 : Value
The value around which ``x`` is calculated. Can be any value
from ``-oo`` to ``oo``.
n : Value
The number of terms upto which the series is to be expanded.
dir : String, optional
The series-expansion can be bi-directional. If ``dir="+"``,
then (x->x0+). If ``dir="-", then (x->x0-). For infinite
``x0`` (``oo`` or ``-oo``), the ``dir`` argument is determined
from the direction of the infinity (i.e., ``dir="-"`` for
``oo``).
logx : optional
It is used to replace any log(x) in the returned series with a
symbolic value rather than evaluating the actual value.
cdir : optional
It stands for complex direction, and indicates the direction
from which the expansion needs to be evaluated.
Examples
========
>>> from sympy import cos, exp, tan
>>> from sympy.abc import x, y
>>> cos(x).series()
1 - x**2/2 + x**4/24 + O(x**6)
>>> cos(x).series(n=4)
1 - x**2/2 + O(x**4)
>>> cos(x).series(x, x0=1, n=2)
cos(1) - (x - 1)*sin(1) + O((x - 1)**2, (x, 1))
>>> e = cos(x + exp(y))
>>> e.series(y, n=2)
cos(x + 1) - y*sin(x + 1) + O(y**2)
>>> e.series(x, n=2)
cos(exp(y)) - x*sin(exp(y)) + O(x**2)
If ``n=None`` then a generator of the series terms will be returned.
>>> term=cos(x).series(n=None)
>>> [next(term) for i in range(2)]
[1, -x**2/2]
For ``dir=+`` (default) the series is calculated from the right and
for ``dir=-`` the series from the left. For smooth functions this
flag will not alter the results.
>>> abs(x).series(dir="+")
x
>>> abs(x).series(dir="-")
-x
>>> f = tan(x)
>>> f.series(x, 2, 6, "+")
tan(2) + (1 + tan(2)**2)*(x - 2) + (x - 2)**2*(tan(2)**3 + tan(2)) +
(x - 2)**3*(1/3 + 4*tan(2)**2/3 + tan(2)**4) + (x - 2)**4*(tan(2)**5 +
5*tan(2)**3/3 + 2*tan(2)/3) + (x - 2)**5*(2/15 + 17*tan(2)**2/15 +
2*tan(2)**4 + tan(2)**6) + O((x - 2)**6, (x, 2))
>>> f.series(x, 2, 3, "-")
tan(2) + (2 - x)*(-tan(2)**2 - 1) + (2 - x)**2*(tan(2)**3 + tan(2))
+ O((x - 2)**3, (x, 2))
Returns
=======
Expr : Expression
Series expansion of the expression about x0
Raises
======
TypeError
If "n" and "x0" are infinity objects
PoleError
If "x0" is an infinity object
"""
from sympy import collect, Dummy, Order, Rational, Symbol, ceiling
if x is None:
syms = self.free_symbols
if not syms:
return self
elif len(syms) > 1:
raise ValueError('x must be given for multivariate functions.')
x = syms.pop()
if isinstance(x, Symbol):
dep = x in self.free_symbols
else:
d = Dummy()
dep = d in self.xreplace({x: d}).free_symbols
if not dep:
if n is None:
return (s for s in [self])
else:
return self
if len(dir) != 1 or dir not in '+-':
raise ValueError("Dir must be '+' or '-'")
if x0 in [S.Infinity, S.NegativeInfinity]:
sgn = 1 if x0 is S.Infinity else -1
s = self.subs(x, sgn/x).series(x, n=n, dir='+', cdir=cdir)
if n is None:
return (si.subs(x, sgn/x) for si in s)
return s.subs(x, sgn/x)
# use rep to shift origin to x0 and change sign (if dir is negative)
# and undo the process with rep2
if x0 or dir == '-':
if dir == '-':
rep = -x + x0
rep2 = -x
rep2b = x0
else:
rep = x + x0
rep2 = x
rep2b = -x0
s = self.subs(x, rep).series(x, x0=0, n=n, dir='+', logx=logx, cdir=cdir)
if n is None: # lseries...
return (si.subs(x, rep2 + rep2b) for si in s)
return s.subs(x, rep2 + rep2b)
# from here on it's x0=0 and dir='+' handling
if x.is_positive is x.is_negative is None or x.is_Symbol is not True:
# replace x with an x that has a positive assumption
xpos = Dummy('x', positive=True, finite=True)
rv = self.subs(x, xpos).series(xpos, x0, n, dir, logx=logx, cdir=cdir)
if n is None:
return (s.subs(xpos, x) for s in rv)
else:
return rv.subs(xpos, x)
if n is not None: # nseries handling
s1 = self._eval_nseries(x, n=n, logx=logx, cdir=cdir)
o = s1.getO() or S.Zero
if o:
# make sure the requested order is returned
ngot = o.getn()
if ngot > n:
# leave o in its current form (e.g. with x*log(x)) so
# it eats terms properly, then replace it below
if n != 0:
s1 += o.subs(x, x**Rational(n, ngot))
else:
s1 += Order(1, x)
elif ngot < n:
# increase the requested number of terms to get the desired
# number keep increasing (up to 9) until the received order
# is different than the original order and then predict how
# many additional terms are needed
for more in range(1, 9):
s1 = self._eval_nseries(x, n=n + more, logx=logx, cdir=cdir)
newn = s1.getn()
if newn != ngot:
ndo = n + ceiling((n - ngot)*more/(newn - ngot))
s1 = self._eval_nseries(x, n=ndo, logx=logx, cdir=cdir)
while s1.getn() < n:
s1 = self._eval_nseries(x, n=ndo, logx=logx, cdir=cdir)
ndo += 1
break
else:
raise ValueError('Could not calculate %s terms for %s'
% (str(n), self))
s1 += Order(x**n, x)
o = s1.getO()
s1 = s1.removeO()
else:
o = Order(x**n, x)
s1done = s1.doit()
if (s1done + o).removeO() == s1done:
o = S.Zero
try:
return collect(s1, x) + o
except NotImplementedError:
return s1 + o
else: # lseries handling
def yield_lseries(s):
"""Return terms of lseries one at a time."""
for si in s:
if not si.is_Add:
yield si
continue
# yield terms 1 at a time if possible
# by increasing order until all the
# terms have been returned
yielded = 0
o = Order(si, x)*x
ndid = 0
ndo = len(si.args)
while 1:
do = (si - yielded + o).removeO()
o *= x
if not do or do.is_Order:
continue
if do.is_Add:
ndid += len(do.args)
else:
ndid += 1
yield do
if ndid == ndo:
break
yielded += do
return yield_lseries(self.removeO()._eval_lseries(x, logx=logx, cdir=cdir))
def aseries(self, x=None, n=6, bound=0, hir=False):
"""Asymptotic Series expansion of self.
This is equivalent to ``self.series(x, oo, n)``.
Parameters
==========
self : Expression
The expression whose series is to be expanded.
x : Symbol
It is the variable of the expression to be calculated.
n : Value
The number of terms upto which the series is to be expanded.
hir : Boolean
Set this parameter to be True to produce hierarchical series.
It stops the recursion at an early level and may provide nicer
and more useful results.
bound : Value, Integer
Use the ``bound`` parameter to give limit on rewriting
coefficients in its normalised form.
Examples
========
>>> from sympy import sin, exp
>>> from sympy.abc import x
>>> e = sin(1/x + exp(-x)) - sin(1/x)
>>> e.aseries(x)
(1/(24*x**4) - 1/(2*x**2) + 1 + O(x**(-6), (x, oo)))*exp(-x)
>>> e.aseries(x, n=3, hir=True)
-exp(-2*x)*sin(1/x)/2 + exp(-x)*cos(1/x) + O(exp(-3*x), (x, oo))
>>> e = exp(exp(x)/(1 - 1/x))
>>> e.aseries(x)
exp(exp(x)/(1 - 1/x))
>>> e.aseries(x, bound=3)
exp(exp(x)/x**2)*exp(exp(x)/x)*exp(-exp(x) + exp(x)/(1 - 1/x) - exp(x)/x - exp(x)/x**2)*exp(exp(x))
Returns
=======
Expr
Asymptotic series expansion of the expression.
Notes
=====
This algorithm is directly induced from the limit computational algorithm provided by Gruntz.
It majorly uses the mrv and rewrite sub-routines. The overall idea of this algorithm is first
to look for the most rapidly varying subexpression w of a given expression f and then expands f
in a series in w. Then same thing is recursively done on the leading coefficient
till we get constant coefficients.
If the most rapidly varying subexpression of a given expression f is f itself,
the algorithm tries to find a normalised representation of the mrv set and rewrites f
using this normalised representation.
If the expansion contains an order term, it will be either ``O(x ** (-n))`` or ``O(w ** (-n))``
where ``w`` belongs to the most rapidly varying expression of ``self``.
References
==========
.. [1] A New Algorithm for Computing Asymptotic Series - Dominik Gruntz
.. [2] Gruntz thesis - p90
.. [3] http://en.wikipedia.org/wiki/Asymptotic_expansion
See Also
========
Expr.aseries: See the docstring of this function for complete details of this wrapper.
"""
from sympy import Order, Dummy
from sympy.functions import exp, log
from sympy.series.gruntz import mrv, rewrite
if x.is_positive is x.is_negative is None:
xpos = Dummy('x', positive=True)
return self.subs(x, xpos).aseries(xpos, n, bound, hir).subs(xpos, x)
om, exps = mrv(self, x)
# We move one level up by replacing `x` by `exp(x)`, and then
# computing the asymptotic series for f(exp(x)). Then asymptotic series
# can be obtained by moving one-step back, by replacing x by ln(x).
if x in om:
s = self.subs(x, exp(x)).aseries(x, n, bound, hir).subs(x, log(x))
if s.getO():
return s + Order(1/x**n, (x, S.Infinity))
return s
k = Dummy('k', positive=True)
# f is rewritten in terms of omega
func, logw = rewrite(exps, om, x, k)
if self in om:
if bound <= 0:
return self
s = (self.exp).aseries(x, n, bound=bound)
s = s.func(*[t.removeO() for t in s.args])
res = exp(s.subs(x, 1/x).as_leading_term(x).subs(x, 1/x))
func = exp(self.args[0] - res.args[0]) / k
logw = log(1/res)
s = func.series(k, 0, n)
# Hierarchical series
if hir:
return s.subs(k, exp(logw))
o = s.getO()
terms = sorted(Add.make_args(s.removeO()), key=lambda i: int(i.as_coeff_exponent(k)[1]))
s = S.Zero
has_ord = False
# Then we recursively expand these coefficients one by one into
# their asymptotic series in terms of their most rapidly varying subexpressions.
for t in terms:
coeff, expo = t.as_coeff_exponent(k)
if coeff.has(x):
# Recursive step
snew = coeff.aseries(x, n, bound=bound-1)
if has_ord and snew.getO():
break
elif snew.getO():
has_ord = True
s += (snew * k**expo)
else:
s += t
if not o or has_ord:
return s.subs(k, exp(logw))
return (s + o).subs(k, exp(logw))
def taylor_term(self, n, x, *previous_terms):
"""General method for the taylor term.
This method is slow, because it differentiates n-times. Subclasses can
redefine it to make it faster by using the "previous_terms".
"""
from sympy import Dummy, factorial
x = sympify(x)
_x = Dummy('x')
return self.subs(x, _x).diff(_x, n).subs(_x, x).subs(x, 0) * x**n / factorial(n)
def lseries(self, x=None, x0=0, dir='+', logx=None, cdir=0):
"""
Wrapper for series yielding an iterator of the terms of the series.
Note: an infinite series will yield an infinite iterator. The following,
for exaxmple, will never terminate. It will just keep printing terms
of the sin(x) series::
for term in sin(x).lseries(x):
print term
The advantage of lseries() over nseries() is that many times you are
just interested in the next term in the series (i.e. the first term for
example), but you don't know how many you should ask for in nseries()
using the "n" parameter.
See also nseries().
"""
return self.series(x, x0, n=None, dir=dir, logx=logx, cdir=cdir)
def _eval_lseries(self, x, logx=None, cdir=0):
# default implementation of lseries is using nseries(), and adaptively
# increasing the "n". As you can see, it is not very efficient, because
# we are calculating the series over and over again. Subclasses should
# override this method and implement much more efficient yielding of
# terms.
n = 0
series = self._eval_nseries(x, n=n, logx=logx, cdir=cdir)
if not series.is_Order:
newseries = series.cancel()
if not newseries.is_Order:
if series.is_Add:
yield series.removeO()
else:
yield series
return
else:
series = newseries
while series.is_Order:
n += 1
series = self._eval_nseries(x, n=n, logx=logx, cdir=cdir)
e = series.removeO()
yield e
if e.is_zero:
return
while 1:
while 1:
n += 1
series = self._eval_nseries(x, n=n, logx=logx, cdir=cdir).removeO()
if e != series:
break
if (series - self).cancel() is S.Zero:
return
yield series - e
e = series
def nseries(self, x=None, x0=0, n=6, dir='+', logx=None, cdir=0):
"""
Wrapper to _eval_nseries if assumptions allow, else to series.
If x is given, x0 is 0, dir='+', and self has x, then _eval_nseries is
called. This calculates "n" terms in the innermost expressions and
then builds up the final series just by "cross-multiplying" everything
out.
The optional ``logx`` parameter can be used to replace any log(x) in the
returned series with a symbolic value to avoid evaluating log(x) at 0. A
symbol to use in place of log(x) should be provided.
Advantage -- it's fast, because we don't have to determine how many
terms we need to calculate in advance.
Disadvantage -- you may end up with less terms than you may have
expected, but the O(x**n) term appended will always be correct and
so the result, though perhaps shorter, will also be correct.
If any of those assumptions is not met, this is treated like a
wrapper to series which will try harder to return the correct
number of terms.
See also lseries().
Examples
========
>>> from sympy import sin, log, Symbol
>>> from sympy.abc import x, y
>>> sin(x).nseries(x, 0, 6)
x - x**3/6 + x**5/120 + O(x**6)
>>> log(x+1).nseries(x, 0, 5)
x - x**2/2 + x**3/3 - x**4/4 + O(x**5)
Handling of the ``logx`` parameter --- in the following example the
expansion fails since ``sin`` does not have an asymptotic expansion
at -oo (the limit of log(x) as x approaches 0):
>>> e = sin(log(x))
>>> e.nseries(x, 0, 6)
Traceback (most recent call last):
...
PoleError: ...
...
>>> logx = Symbol('logx')
>>> e.nseries(x, 0, 6, logx=logx)
sin(logx)
In the following example, the expansion works but gives only an Order term
unless the ``logx`` parameter is used:
>>> e = x**y
>>> e.nseries(x, 0, 2)
O(log(x)**2)
>>> e.nseries(x, 0, 2, logx=logx)
exp(logx*y)
"""
if x and not x in self.free_symbols:
return self
if x is None or x0 or dir != '+': # {see XPOS above} or (x.is_positive == x.is_negative == None):
return self.series(x, x0, n, dir, cdir=cdir)
else:
return self._eval_nseries(x, n=n, logx=logx, cdir=cdir)
def _eval_nseries(self, x, n, logx, cdir):
"""
Return terms of series for self up to O(x**n) at x=0
from the positive direction.
This is a method that should be overridden in subclasses. Users should
never call this method directly (use .nseries() instead), so you don't
have to write docstrings for _eval_nseries().
"""
from sympy.utilities.misc import filldedent
raise NotImplementedError(filldedent("""
The _eval_nseries method should be added to
%s to give terms up to O(x**n) at x=0
from the positive direction so it is available when
nseries calls it.""" % self.func)
)
def limit(self, x, xlim, dir='+'):
""" Compute limit x->xlim.
"""
from sympy.series.limits import limit
return limit(self, x, xlim, dir)
def compute_leading_term(self, x, logx=None):
"""
as_leading_term is only allowed for results of .series()
This is a wrapper to compute a series first.
"""
from sympy import Dummy, log, Piecewise, piecewise_fold
from sympy.series.gruntz import calculate_series
if self.has(Piecewise):
expr = piecewise_fold(self)
else:
expr = self
if self.removeO() == 0:
return self
if logx is None:
d = Dummy('logx')
s = calculate_series(expr, x, d).subs(d, log(x))
else:
s = calculate_series(expr, x, logx)
return s.as_leading_term(x)
@cacheit
def as_leading_term(self, *symbols, cdir=0):
"""
Returns the leading (nonzero) term of the series expansion of self.
The _eval_as_leading_term routines are used to do this, and they must
always return a non-zero value.
Examples
========
>>> from sympy.abc import x
>>> (1 + x + x**2).as_leading_term(x)
1
>>> (1/x**2 + x + x**2).as_leading_term(x)
x**(-2)
"""
from sympy import powsimp
if len(symbols) > 1:
c = self
for x in symbols:
c = c.as_leading_term(x, cdir=cdir)
return c
elif not symbols:
return self
x = sympify(symbols[0])
if not x.is_symbol:
raise ValueError('expecting a Symbol but got %s' % x)
if x not in self.free_symbols:
return self
obj = self._eval_as_leading_term(x, cdir=cdir)
if obj is not None:
return powsimp(obj, deep=True, combine='exp')
raise NotImplementedError('as_leading_term(%s, %s)' % (self, x))
def _eval_as_leading_term(self, x, cdir=0):
return self
def as_coeff_exponent(self, x):
""" ``c*x**e -> c,e`` where x can be any symbolic expression.
"""
from sympy import collect
s = collect(self, x)
c, p = s.as_coeff_mul(x)
if len(p) == 1:
b, e = p[0].as_base_exp()
if b == x:
return c, e
return s, S.Zero
def leadterm(self, x, cdir=0):
"""
Returns the leading term a*x**b as a tuple (a, b).
Examples
========
>>> from sympy.abc import x
>>> (1+x+x**2).leadterm(x)
(1, 0)
>>> (1/x**2+x+x**2).leadterm(x)
(1, -2)
"""
from sympy import Dummy, log
l = self.as_leading_term(x, cdir=cdir)
d = Dummy('logx')
if l.has(log(x)):
l = l.subs(log(x), d)
c, e = l.as_coeff_exponent(x)
if x in c.free_symbols:
from sympy.utilities.misc import filldedent
raise ValueError(filldedent("""
cannot compute leadterm(%s, %s). The coefficient
should have been free of %s but got %s""" % (self, x, x, c)))
c = c.subs(d, log(x))
return c, e
def as_coeff_Mul(self, rational=False):
"""Efficiently extract the coefficient of a product. """
return S.One, self
def as_coeff_Add(self, rational=False):
"""Efficiently extract the coefficient of a summation. """
return S.Zero, self
def fps(self, x=None, x0=0, dir=1, hyper=True, order=4, rational=True,
full=False):
"""
Compute formal power power series of self.
See the docstring of the :func:`fps` function in sympy.series.formal for
more information.
"""
from sympy.series.formal import fps
return fps(self, x, x0, dir, hyper, order, rational, full)
def fourier_series(self, limits=None):
"""Compute fourier sine/cosine series of self.
See the docstring of the :func:`fourier_series` in sympy.series.fourier
for more information.
"""
from sympy.series.fourier import fourier_series
return fourier_series(self, limits)
###################################################################################
##################### DERIVATIVE, INTEGRAL, FUNCTIONAL METHODS ####################
###################################################################################
def diff(self, *symbols, **assumptions):
assumptions.setdefault("evaluate", True)
return Derivative(self, *symbols, **assumptions)
###########################################################################
###################### EXPRESSION EXPANSION METHODS #######################
###########################################################################
# Relevant subclasses should override _eval_expand_hint() methods. See
# the docstring of expand() for more info.
def _eval_expand_complex(self, **hints):
real, imag = self.as_real_imag(**hints)
return real + S.ImaginaryUnit*imag
@staticmethod
def _expand_hint(expr, hint, deep=True, **hints):
"""
Helper for ``expand()``. Recursively calls ``expr._eval_expand_hint()``.
Returns ``(expr, hit)``, where expr is the (possibly) expanded
``expr`` and ``hit`` is ``True`` if ``expr`` was truly expanded and
``False`` otherwise.
"""
hit = False
# XXX: Hack to support non-Basic args
# |
# V
if deep and getattr(expr, 'args', ()) and not expr.is_Atom:
sargs = []
for arg in expr.args:
arg, arghit = Expr._expand_hint(arg, hint, **hints)
hit |= arghit
sargs.append(arg)
if hit:
expr = expr.func(*sargs)
if hasattr(expr, hint):
newexpr = getattr(expr, hint)(**hints)
if newexpr != expr:
return (newexpr, True)
return (expr, hit)
@cacheit
def expand(self, deep=True, modulus=None, power_base=True, power_exp=True,
mul=True, log=True, multinomial=True, basic=True, **hints):
"""
Expand an expression using hints.
See the docstring of the expand() function in sympy.core.function for
more information.
"""
from sympy.simplify.radsimp import fraction
hints.update(power_base=power_base, power_exp=power_exp, mul=mul,
log=log, multinomial=multinomial, basic=basic)
expr = self
if hints.pop('frac', False):
n, d = [a.expand(deep=deep, modulus=modulus, **hints)
for a in fraction(self)]
return n/d
elif hints.pop('denom', False):
n, d = fraction(self)
return n/d.expand(deep=deep, modulus=modulus, **hints)
elif hints.pop('numer', False):
n, d = fraction(self)
return n.expand(deep=deep, modulus=modulus, **hints)/d
# Although the hints are sorted here, an earlier hint may get applied
# at a given node in the expression tree before another because of how
# the hints are applied. e.g. expand(log(x*(y + z))) -> log(x*y +
# x*z) because while applying log at the top level, log and mul are
# applied at the deeper level in the tree so that when the log at the
# upper level gets applied, the mul has already been applied at the
# lower level.
# Additionally, because hints are only applied once, the expression
# may not be expanded all the way. For example, if mul is applied
# before multinomial, x*(x + 1)**2 won't be expanded all the way. For
# now, we just use a special case to make multinomial run before mul,
# so that at least polynomials will be expanded all the way. In the
# future, smarter heuristics should be applied.
# TODO: Smarter heuristics
def _expand_hint_key(hint):
"""Make multinomial come before mul"""
if hint == 'mul':
return 'mulz'
return hint
for hint in sorted(hints.keys(), key=_expand_hint_key):
use_hint = hints[hint]
if use_hint:
hint = '_eval_expand_' + hint
expr, hit = Expr._expand_hint(expr, hint, deep=deep, **hints)
while True:
was = expr
if hints.get('multinomial', False):
expr, _ = Expr._expand_hint(
expr, '_eval_expand_multinomial', deep=deep, **hints)
if hints.get('mul', False):
expr, _ = Expr._expand_hint(
expr, '_eval_expand_mul', deep=deep, **hints)
if hints.get('log', False):
expr, _ = Expr._expand_hint(
expr, '_eval_expand_log', deep=deep, **hints)
if expr == was:
break
if modulus is not None:
modulus = sympify(modulus)
if not modulus.is_Integer or modulus <= 0:
raise ValueError(
"modulus must be a positive integer, got %s" % modulus)
terms = []
for term in Add.make_args(expr):
coeff, tail = term.as_coeff_Mul(rational=True)
coeff %= modulus
if coeff:
terms.append(coeff*tail)
expr = Add(*terms)
return expr
###########################################################################
################### GLOBAL ACTION VERB WRAPPER METHODS ####################
###########################################################################
def integrate(self, *args, **kwargs):
"""See the integrate function in sympy.integrals"""
from sympy.integrals import integrate
return integrate(self, *args, **kwargs)
def nsimplify(self, constants=[], tolerance=None, full=False):
"""See the nsimplify function in sympy.simplify"""
from sympy.simplify import nsimplify
return nsimplify(self, constants, tolerance, full)
def separate(self, deep=False, force=False):
"""See the separate function in sympy.simplify"""
from sympy.core.function import expand_power_base
return expand_power_base(self, deep=deep, force=force)
def collect(self, syms, func=None, evaluate=True, exact=False, distribute_order_term=True):
"""See the collect function in sympy.simplify"""
from sympy.simplify import collect
return collect(self, syms, func, evaluate, exact, distribute_order_term)
def together(self, *args, **kwargs):
"""See the together function in sympy.polys"""
from sympy.polys import together
return together(self, *args, **kwargs)
def apart(self, x=None, **args):
"""See the apart function in sympy.polys"""
from sympy.polys import apart
return apart(self, x, **args)
def ratsimp(self):
"""See the ratsimp function in sympy.simplify"""
from sympy.simplify import ratsimp
return ratsimp(self)
def trigsimp(self, **args):
"""See the trigsimp function in sympy.simplify"""
from sympy.simplify import trigsimp
return trigsimp(self, **args)
def radsimp(self, **kwargs):
"""See the radsimp function in sympy.simplify"""
from sympy.simplify import radsimp
return radsimp(self, **kwargs)
def powsimp(self, *args, **kwargs):
"""See the powsimp function in sympy.simplify"""
from sympy.simplify import powsimp
return powsimp(self, *args, **kwargs)
def combsimp(self):
"""See the combsimp function in sympy.simplify"""
from sympy.simplify import combsimp
return combsimp(self)
def gammasimp(self):
"""See the gammasimp function in sympy.simplify"""
from sympy.simplify import gammasimp
return gammasimp(self)
def factor(self, *gens, **args):
"""See the factor() function in sympy.polys.polytools"""
from sympy.polys import factor
return factor(self, *gens, **args)
def refine(self, assumption=True):
"""See the refine function in sympy.assumptions"""
from sympy.assumptions import refine
return refine(self, assumption)
def cancel(self, *gens, **args):
"""See the cancel function in sympy.polys"""
from sympy.polys import cancel
return cancel(self, *gens, **args)
def invert(self, g, *gens, **args):
"""Return the multiplicative inverse of ``self`` mod ``g``
where ``self`` (and ``g``) may be symbolic expressions).
See Also
========
sympy.core.numbers.mod_inverse, sympy.polys.polytools.invert
"""
from sympy.polys.polytools import invert
from sympy.core.numbers import mod_inverse
if self.is_number and getattr(g, 'is_number', True):
return mod_inverse(self, g)
return invert(self, g, *gens, **args)
def round(self, n=None):
"""Return x rounded to the given decimal place.
If a complex number would results, apply round to the real
and imaginary components of the number.
Examples
========
>>> from sympy import pi, E, I, S, Number
>>> pi.round()
3
>>> pi.round(2)
3.14
>>> (2*pi + E*I).round()
6 + 3*I
The round method has a chopping effect:
>>> (2*pi + I/10).round()
6
>>> (pi/10 + 2*I).round()
2*I
>>> (pi/10 + E*I).round(2)
0.31 + 2.72*I
Notes
=====
The Python ``round`` function uses the SymPy ``round`` method so it
will always return a SymPy number (not a Python float or int):
>>> isinstance(round(S(123), -2), Number)
True
"""
from sympy.core.numbers import Float
x = self
if not x.is_number:
raise TypeError("can't round symbolic expression")
if not x.is_Atom:
if not pure_complex(x.n(2), or_real=True):
raise TypeError(
'Expected a number but got %s:' % func_name(x))
elif x in (S.NaN, S.Infinity, S.NegativeInfinity, S.ComplexInfinity):
return x
if not x.is_extended_real:
r, i = x.as_real_imag()
return r.round(n) + S.ImaginaryUnit*i.round(n)
if not x:
return S.Zero if n is None else x
p = as_int(n or 0)
if x.is_Integer:
return Integer(round(int(x), p))
digits_to_decimal = _mag(x) # _mag(12) = 2, _mag(.012) = -1
allow = digits_to_decimal + p
precs = [f._prec for f in x.atoms(Float)]
dps = prec_to_dps(max(precs)) if precs else None
if dps is None:
# assume everything is exact so use the Python
# float default or whatever was requested
dps = max(15, allow)
else:
allow = min(allow, dps)
# this will shift all digits to right of decimal
# and give us dps to work with as an int
shift = -digits_to_decimal + dps
extra = 1 # how far we look past known digits
# NOTE
# mpmath will calculate the binary representation to
# an arbitrary number of digits but we must base our
# answer on a finite number of those digits, e.g.
# .575 2589569785738035/2**52 in binary.
# mpmath shows us that the first 18 digits are
# >>> Float(.575).n(18)
# 0.574999999999999956
# The default precision is 15 digits and if we ask
# for 15 we get
# >>> Float(.575).n(15)
# 0.575000000000000
# mpmath handles rounding at the 15th digit. But we
# need to be careful since the user might be asking
# for rounding at the last digit and our semantics
# are to round toward the even final digit when there
# is a tie. So the extra digit will be used to make
# that decision. In this case, the value is the same
# to 15 digits:
# >>> Float(.575).n(16)
# 0.5750000000000000
# Now converting this to the 15 known digits gives
# 575000000000000.0
# which rounds to integer
# 5750000000000000
# And now we can round to the desired digt, e.g. at
# the second from the left and we get
# 5800000000000000
# and rescaling that gives
# 0.58
# as the final result.
# If the value is made slightly less than 0.575 we might
# still obtain the same value:
# >>> Float(.575-1e-16).n(16)*10**15
# 574999999999999.8
# What 15 digits best represents the known digits (which are
# to the left of the decimal? 5750000000000000, the same as
# before. The only way we will round down (in this case) is
# if we declared that we had more than 15 digits of precision.
# For example, if we use 16 digits of precision, the integer
# we deal with is
# >>> Float(.575-1e-16).n(17)*10**16
# 5749999999999998.4
# and this now rounds to 5749999999999998 and (if we round to
# the 2nd digit from the left) we get 5700000000000000.
#
xf = x.n(dps + extra)*Pow(10, shift)
xi = Integer(xf)
# use the last digit to select the value of xi
# nearest to x before rounding at the desired digit
sign = 1 if x > 0 else -1
dif2 = sign*(xf - xi).n(extra)
if dif2 < 0:
raise NotImplementedError(
'not expecting int(x) to round away from 0')
if dif2 > .5:
xi += sign # round away from 0
elif dif2 == .5:
xi += sign if xi%2 else -sign # round toward even
# shift p to the new position
ip = p - shift
# let Python handle the int rounding then rescale
xr = round(xi.p, ip)
# restore scale
rv = Rational(xr, Pow(10, shift))
# return Float or Integer
if rv.is_Integer:
if n is None: # the single-arg case
return rv
# use str or else it won't be a float
return Float(str(rv), dps) # keep same precision
else:
if not allow and rv > self:
allow += 1
return Float(rv, allow)
__round__ = round
def _eval_derivative_matrix_lines(self, x):
from sympy.matrices.expressions.matexpr import _LeftRightArgs
return [_LeftRightArgs([S.One, S.One], higher=self._eval_derivative(x))]
class AtomicExpr(Atom, Expr):
"""
A parent class for object which are both atoms and Exprs.
For example: Symbol, Number, Rational, Integer, ...
But not: Add, Mul, Pow, ...
"""
is_number = False
is_Atom = True
__slots__ = ()
def _eval_derivative(self, s):
if self == s:
return S.One
return S.Zero
def _eval_derivative_n_times(self, s, n):
from sympy import Piecewise, Eq
from sympy import Tuple, MatrixExpr
from sympy.matrices.common import MatrixCommon
if isinstance(s, (MatrixCommon, Tuple, Iterable, MatrixExpr)):
return super()._eval_derivative_n_times(s, n)
if self == s:
return Piecewise((self, Eq(n, 0)), (1, Eq(n, 1)), (0, True))
else:
return Piecewise((self, Eq(n, 0)), (0, True))
def _eval_is_polynomial(self, syms):
return True
def _eval_is_rational_function(self, syms):
return True
def _eval_is_meromorphic(self, x, a):
from sympy.calculus.util import AccumBounds
return (not self.is_Number or self.is_finite) and not isinstance(self, AccumBounds)
def _eval_is_algebraic_expr(self, syms):
return True
def _eval_nseries(self, x, n, logx, cdir=0):
return self
@property
def expr_free_symbols(self):
return {self}
def _mag(x):
"""Return integer ``i`` such that .1 <= x/10**i < 1
Examples
========
>>> from sympy.core.expr import _mag
>>> from sympy import Float
>>> _mag(Float(.1))
0
>>> _mag(Float(.01))
-1
>>> _mag(Float(1234))
4
"""
from math import log10, ceil, log
from sympy import Float
xpos = abs(x.n())
if not xpos:
return S.Zero
try:
mag_first_dig = int(ceil(log10(xpos)))
except (ValueError, OverflowError):
mag_first_dig = int(ceil(Float(mpf_log(xpos._mpf_, 53))/log(10)))
# check that we aren't off by 1
if (xpos/10**mag_first_dig) >= 1:
assert 1 <= (xpos/10**mag_first_dig) < 10
mag_first_dig += 1
return mag_first_dig
class UnevaluatedExpr(Expr):
"""
Expression that is not evaluated unless released.
Examples
========
>>> from sympy import UnevaluatedExpr
>>> from sympy.abc import x
>>> x*(1/x)
1
>>> x*UnevaluatedExpr(1/x)
x*1/x
"""
def __new__(cls, arg, **kwargs):
arg = _sympify(arg)
obj = Expr.__new__(cls, arg, **kwargs)
return obj
def doit(self, **kwargs):
if kwargs.get("deep", True):
return self.args[0].doit(**kwargs)
else:
return self.args[0]
def _n2(a, b):
"""Return (a - b).evalf(2) if a and b are comparable, else None.
This should only be used when a and b are already sympified.
"""
# /!\ it is very important (see issue 8245) not to
# use a re-evaluated number in the calculation of dif
if a.is_comparable and b.is_comparable:
dif = (a - b).evalf(2)
if dif.is_comparable:
return dif
def unchanged(func, *args):
"""Return True if `func` applied to the `args` is unchanged.
Can be used instead of `assert foo == foo`.
Examples
========
>>> from sympy import Piecewise, cos, pi
>>> from sympy.core.expr import unchanged
>>> from sympy.abc import x
>>> unchanged(cos, 1) # instead of assert cos(1) == cos(1)
True
>>> unchanged(cos, pi)
False
Comparison of args uses the builtin capabilities of the object's
arguments to test for equality so args can be defined loosely. Here,
the ExprCondPair arguments of Piecewise compare as equal to the
tuples that can be used to create the Piecewise:
>>> unchanged(Piecewise, (x, x > 1), (0, True))
True
"""
f = func(*args)
return f.func == func and f.args == args
class ExprBuilder:
def __init__(self, op, args=[], validator=None, check=True):
if not hasattr(op, "__call__"):
raise TypeError("op {} needs to be callable".format(op))
self.op = op
self.args = args
self.validator = validator
if (validator is not None) and check:
self.validate()
@staticmethod
def _build_args(args):
return [i.build() if isinstance(i, ExprBuilder) else i for i in args]
def validate(self):
if self.validator is None:
return
args = self._build_args(self.args)
self.validator(*args)
def build(self, check=True):
args = self._build_args(self.args)
if self.validator and check:
self.validator(*args)
return self.op(*args)
def append_argument(self, arg, check=True):
self.args.append(arg)
if self.validator and check:
self.validate(*self.args)
def __getitem__(self, item):
if item == 0:
return self.op
else:
return self.args[item-1]
def __repr__(self):
return str(self.build())
def search_element(self, elem):
for i, arg in enumerate(self.args):
if isinstance(arg, ExprBuilder):
ret = arg.search_index(elem)
if ret is not None:
return (i,) + ret
elif id(arg) == id(elem):
return (i,)
return None
from .mul import Mul
from .add import Add
from .power import Pow
from .function import Derivative, Function
from .mod import Mod
from .exprtools import factor_terms
from .numbers import Integer, Rational
|
934fc2d4deed5b58276c7f0742efda1aa0c2bd73693c781a993f93a4ce375239
|
"""
Reimplementations of constructs introduced in later versions of Python than
we support. Also some functions that are needed SymPy-wide and are located
here for easy import.
"""
from typing import Tuple, Type
import operator
from collections import defaultdict
from sympy.external import import_module
"""
Python 2 and Python 3 compatible imports
String and Unicode compatible changes:
* `unicode()` removed in Python 3, import `unicode` for Python 2/3
compatible function
* Use `u()` for escaped unicode sequences (e.g. u'\u2020' -> u('\u2020'))
* Use `u_decode()` to decode utf-8 formatted unicode strings
Renamed function attributes:
* Python 2 `.func_code`, Python 3 `.__func__`, access with
`get_function_code()`
* Python 2 `.func_globals`, Python 3 `.__globals__`, access with
`get_function_globals()`
* Python 2 `.func_name`, Python 3 `.__name__`, access with
`get_function_name()`
Moved modules:
* `reduce()`
* `StringIO()`
* `cStringIO()` (same as `StingIO()` in Python 3)
* Python 2 `__builtin__`, access with Python 3 name, `builtins`
exec:
* Use `exec_()`, with parameters `exec_(code, globs=None, locs=None)`
Metaclasses:
* Use `with_metaclass()`, examples below
* Define class `Foo` with metaclass `Meta`, and no parent:
class Foo(with_metaclass(Meta)):
pass
* Define class `Foo` with metaclass `Meta` and parent class `Bar`:
class Foo(with_metaclass(Meta, Bar)):
pass
"""
__all__ = [
'PY3', 'int_info', 'SYMPY_INTS', 'clock',
'unicode', 'u_decode', 'get_function_code', 'gmpy',
'get_function_globals', 'get_function_name', 'builtins', 'reduce',
'StringIO', 'cStringIO', 'exec_', 'Mapping', 'Callable',
'MutableMapping', 'MutableSet', 'Iterable', 'Hashable', 'unwrap',
'accumulate', 'with_metaclass', 'NotIterable', 'iterable', 'is_sequence',
'as_int', 'default_sort_key', 'ordered', 'GROUND_TYPES', 'HAS_GMPY',
]
import sys
PY3 = sys.version_info[0] > 2
if PY3:
int_info = sys.int_info
# String / unicode compatibility
unicode = str
def u_decode(x):
return x
# Moved definitions
get_function_code = operator.attrgetter("__code__")
get_function_globals = operator.attrgetter("__globals__")
get_function_name = operator.attrgetter("__name__")
import builtins
from functools import reduce
from io import StringIO
cStringIO = StringIO
exec_ = getattr(builtins, "exec")
from collections.abc import (Mapping, Callable, MutableMapping,
MutableSet, Iterable, Hashable)
from inspect import unwrap
from itertools import accumulate
else:
int_info = sys.long_info
# String / unicode compatibility
unicode = unicode
def u_decode(x):
return x.decode('utf-8')
# Moved definitions
get_function_code = operator.attrgetter("func_code")
get_function_globals = operator.attrgetter("func_globals")
get_function_name = operator.attrgetter("func_name")
import __builtin__ as builtins
reduce = reduce
from StringIO import StringIO
from cStringIO import StringIO as cStringIO
def exec_(_code_, _globs_=None, _locs_=None):
"""Execute code in a namespace."""
if _globs_ is None:
frame = sys._getframe(1)
_globs_ = frame.f_globals
if _locs_ is None:
_locs_ = frame.f_locals
del frame
elif _locs_ is None:
_locs_ = _globs_
exec("exec _code_ in _globs_, _locs_")
from collections import (Mapping, Callable, MutableMapping,
MutableSet, Iterable, Hashable)
def unwrap(func, stop=None):
"""Get the object wrapped by *func*.
Follows the chain of :attr:`__wrapped__` attributes returning the last
object in the chain.
*stop* is an optional callback accepting an object in the wrapper chain
as its sole argument that allows the unwrapping to be terminated early if
the callback returns a true value. If the callback never returns a true
value, the last object in the chain is returned as usual. For example,
:func:`signature` uses this to stop unwrapping if any object in the
chain has a ``__signature__`` attribute defined.
:exc:`ValueError` is raised if a cycle is encountered.
"""
if stop is None:
def _is_wrapper(f):
return hasattr(f, '__wrapped__')
else:
def _is_wrapper(f):
return hasattr(f, '__wrapped__') and not stop(f)
f = func # remember the original func for error reporting
memo = {id(f)} # Memoise by id to tolerate non-hashable objects
while _is_wrapper(func):
func = func.__wrapped__
id_func = id(func)
if id_func in memo:
raise ValueError('wrapper loop when unwrapping {!r}'.format(f))
memo.add(id_func)
return func
def accumulate(iterable, func=operator.add):
state = iterable[0]
yield state
for i in iterable[1:]:
state = func(state, i)
yield state
def with_metaclass(meta, *bases):
"""
Create a base class with a metaclass.
For example, if you have the metaclass
>>> class Meta(type):
... pass
Use this as the metaclass by doing
>>> from sympy.core.compatibility import with_metaclass
>>> class MyClass(with_metaclass(Meta, object)):
... pass
This is equivalent to the Python 2::
class MyClass(object):
__metaclass__ = Meta
or Python 3::
class MyClass(object, metaclass=Meta):
pass
That is, the first argument is the metaclass, and the remaining arguments
are the base classes. Note that if the base class is just ``object``, you
may omit it.
>>> MyClass.__mro__
(<class '...MyClass'>, <... 'object'>)
>>> type(MyClass)
<class '...Meta'>
"""
# This requires a bit of explanation: the basic idea is to make a dummy
# metaclass for one level of class instantiation that replaces itself with
# the actual metaclass.
# Code copied from the 'six' library.
class metaclass(meta):
def __new__(cls, name, this_bases, d):
return meta(name, bases, d)
return type.__new__(metaclass, "NewBase", (), {})
# These are in here because telling if something is an iterable just by calling
# hasattr(obj, "__iter__") behaves differently in Python 2 and Python 3. In
# particular, hasattr(str, "__iter__") is False in Python 2 and True in Python 3.
# I think putting them here also makes it easier to use them in the core.
class NotIterable:
"""
Use this as mixin when creating a class which is not supposed to
return true when iterable() is called on its instances because
calling list() on the instance, for example, would result in
an infinite loop.
"""
pass
def iterable(i, exclude=(str, dict, NotIterable)):
"""
Return a boolean indicating whether ``i`` is SymPy iterable.
True also indicates that the iterator is finite, e.g. you can
call list(...) on the instance.
When SymPy is working with iterables, it is almost always assuming
that the iterable is not a string or a mapping, so those are excluded
by default. If you want a pure Python definition, make exclude=None. To
exclude multiple items, pass them as a tuple.
You can also set the _iterable attribute to True or False on your class,
which will override the checks here, including the exclude test.
As a rule of thumb, some SymPy functions use this to check if they should
recursively map over an object. If an object is technically iterable in
the Python sense but does not desire this behavior (e.g., because its
iteration is not finite, or because iteration might induce an unwanted
computation), it should disable it by setting the _iterable attribute to False.
See also: is_sequence
Examples
========
>>> from sympy.utilities.iterables import iterable
>>> from sympy import Tuple
>>> things = [[1], (1,), set([1]), Tuple(1), (j for j in [1, 2]), {1:2}, '1', 1]
>>> for i in things:
... print('%s %s' % (iterable(i), type(i)))
True <... 'list'>
True <... 'tuple'>
True <... 'set'>
True <class 'sympy.core.containers.Tuple'>
True <... 'generator'>
False <... 'dict'>
False <... 'str'>
False <... 'int'>
>>> iterable({}, exclude=None)
True
>>> iterable({}, exclude=str)
True
>>> iterable("no", exclude=str)
False
"""
if hasattr(i, '_iterable'):
return i._iterable
try:
iter(i)
except TypeError:
return False
if exclude:
return not isinstance(i, exclude)
return True
def is_sequence(i, include=None):
"""
Return a boolean indicating whether ``i`` is a sequence in the SymPy
sense. If anything that fails the test below should be included as
being a sequence for your application, set 'include' to that object's
type; multiple types should be passed as a tuple of types.
Note: although generators can generate a sequence, they often need special
handling to make sure their elements are captured before the generator is
exhausted, so these are not included by default in the definition of a
sequence.
See also: iterable
Examples
========
>>> from sympy.utilities.iterables import is_sequence
>>> from types import GeneratorType
>>> is_sequence([])
True
>>> is_sequence(set())
False
>>> is_sequence('abc')
False
>>> is_sequence('abc', include=str)
True
>>> generator = (c for c in 'abc')
>>> is_sequence(generator)
False
>>> is_sequence(generator, include=(str, GeneratorType))
True
"""
return (hasattr(i, '__getitem__') and
iterable(i) or
bool(include) and
isinstance(i, include))
def as_int(n, strict=True):
"""
Convert the argument to a builtin integer.
The return value is guaranteed to be equal to the input. ValueError is
raised if the input has a non-integral value. When ``strict`` is True, this
uses `__index__ <https://docs.python.org/3/reference/datamodel.html#object.__index__>`_
and when it is False it uses ``int``.
Examples
========
>>> from sympy.core.compatibility import as_int
>>> from sympy import sqrt, S
The function is primarily concerned with sanitizing input for
functions that need to work with builtin integers, so anything that
is unambiguously an integer should be returned as an int:
>>> as_int(S(3))
3
Floats, being of limited precision, are not assumed to be exact and
will raise an error unless the ``strict`` flag is False. This
precision issue becomes apparent for large floating point numbers:
>>> big = 1e23
>>> type(big) is float
True
>>> big == int(big)
True
>>> as_int(big)
Traceback (most recent call last):
...
ValueError: ... is not an integer
>>> as_int(big, strict=False)
99999999999999991611392
Input that might be a complex representation of an integer value is
also rejected by default:
>>> one = sqrt(3 + 2*sqrt(2)) - sqrt(2)
>>> int(one) == 1
True
>>> as_int(one)
Traceback (most recent call last):
...
ValueError: ... is not an integer
"""
if strict:
try:
if type(n) is bool:
raise TypeError
return operator.index(n)
except TypeError:
raise ValueError('%s is not an integer' % (n,))
else:
try:
result = int(n)
except TypeError:
raise ValueError('%s is not an integer' % (n,))
if n != result:
raise ValueError('%s is not an integer' % (n,))
return result
def default_sort_key(item, order=None):
"""Return a key that can be used for sorting.
The key has the structure:
(class_key, (len(args), args), exponent.sort_key(), coefficient)
This key is supplied by the sort_key routine of Basic objects when
``item`` is a Basic object or an object (other than a string) that
sympifies to a Basic object. Otherwise, this function produces the
key.
The ``order`` argument is passed along to the sort_key routine and is
used to determine how the terms *within* an expression are ordered.
(See examples below) ``order`` options are: 'lex', 'grlex', 'grevlex',
and reversed values of the same (e.g. 'rev-lex'). The default order
value is None (which translates to 'lex').
Examples
========
>>> from sympy import S, I, default_sort_key, sin, cos, sqrt
>>> from sympy.core.function import UndefinedFunction
>>> from sympy.abc import x
The following are equivalent ways of getting the key for an object:
>>> x.sort_key() == default_sort_key(x)
True
Here are some examples of the key that is produced:
>>> default_sort_key(UndefinedFunction('f'))
((0, 0, 'UndefinedFunction'), (1, ('f',)), ((1, 0, 'Number'),
(0, ()), (), 1), 1)
>>> default_sort_key('1')
((0, 0, 'str'), (1, ('1',)), ((1, 0, 'Number'), (0, ()), (), 1), 1)
>>> default_sort_key(S.One)
((1, 0, 'Number'), (0, ()), (), 1)
>>> default_sort_key(2)
((1, 0, 'Number'), (0, ()), (), 2)
While sort_key is a method only defined for SymPy objects,
default_sort_key will accept anything as an argument so it is
more robust as a sorting key. For the following, using key=
lambda i: i.sort_key() would fail because 2 doesn't have a sort_key
method; that's why default_sort_key is used. Note, that it also
handles sympification of non-string items likes ints:
>>> a = [2, I, -I]
>>> sorted(a, key=default_sort_key)
[2, -I, I]
The returned key can be used anywhere that a key can be specified for
a function, e.g. sort, min, max, etc...:
>>> a.sort(key=default_sort_key); a[0]
2
>>> min(a, key=default_sort_key)
2
Note
----
The key returned is useful for getting items into a canonical order
that will be the same across platforms. It is not directly useful for
sorting lists of expressions:
>>> a, b = x, 1/x
Since ``a`` has only 1 term, its value of sort_key is unaffected by
``order``:
>>> a.sort_key() == a.sort_key('rev-lex')
True
If ``a`` and ``b`` are combined then the key will differ because there
are terms that can be ordered:
>>> eq = a + b
>>> eq.sort_key() == eq.sort_key('rev-lex')
False
>>> eq.as_ordered_terms()
[x, 1/x]
>>> eq.as_ordered_terms('rev-lex')
[1/x, x]
But since the keys for each of these terms are independent of ``order``'s
value, they don't sort differently when they appear separately in a list:
>>> sorted(eq.args, key=default_sort_key)
[1/x, x]
>>> sorted(eq.args, key=lambda i: default_sort_key(i, order='rev-lex'))
[1/x, x]
The order of terms obtained when using these keys is the order that would
be obtained if those terms were *factors* in a product.
Although it is useful for quickly putting expressions in canonical order,
it does not sort expressions based on their complexity defined by the
number of operations, power of variables and others:
>>> sorted([sin(x)*cos(x), sin(x)], key=default_sort_key)
[sin(x)*cos(x), sin(x)]
>>> sorted([x, x**2, sqrt(x), x**3], key=default_sort_key)
[sqrt(x), x, x**2, x**3]
See Also
========
ordered, sympy.core.expr.as_ordered_factors, sympy.core.expr.as_ordered_terms
"""
from .singleton import S
from .basic import Basic
from .sympify import sympify, SympifyError
from .compatibility import iterable
if isinstance(item, Basic):
return item.sort_key(order=order)
if iterable(item, exclude=str):
if isinstance(item, dict):
args = item.items()
unordered = True
elif isinstance(item, set):
args = item
unordered = True
else:
# e.g. tuple, list
args = list(item)
unordered = False
args = [default_sort_key(arg, order=order) for arg in args]
if unordered:
# e.g. dict, set
args = sorted(args)
cls_index, args = 10, (len(args), tuple(args))
else:
if not isinstance(item, str):
try:
item = sympify(item, strict=True)
except SympifyError:
# e.g. lambda x: x
pass
else:
if isinstance(item, Basic):
# e.g int -> Integer
return default_sort_key(item)
# e.g. UndefinedFunction
# e.g. str
cls_index, args = 0, (1, (str(item),))
return (cls_index, 0, item.__class__.__name__
), args, S.One.sort_key(), S.One
def _nodes(e):
"""
A helper for ordered() which returns the node count of ``e`` which
for Basic objects is the number of Basic nodes in the expression tree
but for other objects is 1 (unless the object is an iterable or dict
for which the sum of nodes is returned).
"""
from .basic import Basic
from .function import Derivative
if isinstance(e, Basic):
if isinstance(e, Derivative):
return _nodes(e.expr) + len(e.variables)
return e.count(Basic)
elif iterable(e):
return 1 + sum(_nodes(ei) for ei in e)
elif isinstance(e, dict):
return 1 + sum(_nodes(k) + _nodes(v) for k, v in e.items())
else:
return 1
def ordered(seq, keys=None, default=True, warn=False):
"""Return an iterator of the seq where keys are used to break ties in
a conservative fashion: if, after applying a key, there are no ties
then no other keys will be computed.
Two default keys will be applied if 1) keys are not provided or 2) the
given keys don't resolve all ties (but only if ``default`` is True). The
two keys are ``_nodes`` (which places smaller expressions before large) and
``default_sort_key`` which (if the ``sort_key`` for an object is defined
properly) should resolve any ties.
If ``warn`` is True then an error will be raised if there were no
keys remaining to break ties. This can be used if it was expected that
there should be no ties between items that are not identical.
Examples
========
>>> from sympy.utilities.iterables import ordered
>>> from sympy import count_ops
>>> from sympy.abc import x, y
The count_ops is not sufficient to break ties in this list and the first
two items appear in their original order (i.e. the sorting is stable):
>>> list(ordered([y + 2, x + 2, x**2 + y + 3],
... count_ops, default=False, warn=False))
...
[y + 2, x + 2, x**2 + y + 3]
The default_sort_key allows the tie to be broken:
>>> list(ordered([y + 2, x + 2, x**2 + y + 3]))
...
[x + 2, y + 2, x**2 + y + 3]
Here, sequences are sorted by length, then sum:
>>> seq, keys = [[[1, 2, 1], [0, 3, 1], [1, 1, 3], [2], [1]], [
... lambda x: len(x),
... lambda x: sum(x)]]
...
>>> list(ordered(seq, keys, default=False, warn=False))
[[1], [2], [1, 2, 1], [0, 3, 1], [1, 1, 3]]
If ``warn`` is True, an error will be raised if there were not
enough keys to break ties:
>>> list(ordered(seq, keys, default=False, warn=True))
Traceback (most recent call last):
...
ValueError: not enough keys to break ties
Notes
=====
The decorated sort is one of the fastest ways to sort a sequence for
which special item comparison is desired: the sequence is decorated,
sorted on the basis of the decoration (e.g. making all letters lower
case) and then undecorated. If one wants to break ties for items that
have the same decorated value, a second key can be used. But if the
second key is expensive to compute then it is inefficient to decorate
all items with both keys: only those items having identical first key
values need to be decorated. This function applies keys successively
only when needed to break ties. By yielding an iterator, use of the
tie-breaker is delayed as long as possible.
This function is best used in cases when use of the first key is
expected to be a good hashing function; if there are no unique hashes
from application of a key, then that key should not have been used. The
exception, however, is that even if there are many collisions, if the
first group is small and one does not need to process all items in the
list then time will not be wasted sorting what one was not interested
in. For example, if one were looking for the minimum in a list and
there were several criteria used to define the sort order, then this
function would be good at returning that quickly if the first group
of candidates is small relative to the number of items being processed.
"""
d = defaultdict(list)
if keys:
if not isinstance(keys, (list, tuple)):
keys = [keys]
keys = list(keys)
f = keys.pop(0)
for a in seq:
d[f(a)].append(a)
else:
if not default:
raise ValueError('if default=False then keys must be provided')
d[None].extend(seq)
for k in sorted(d.keys()):
if len(d[k]) > 1:
if keys:
d[k] = ordered(d[k], keys, default, warn)
elif default:
d[k] = ordered(d[k], (_nodes, default_sort_key,),
default=False, warn=warn)
elif warn:
from sympy.utilities.iterables import uniq
u = list(uniq(d[k]))
if len(u) > 1:
raise ValueError(
'not enough keys to break ties: %s' % u)
yield from d[k]
d.pop(k)
# If HAS_GMPY is 0, no supported version of gmpy is available. Otherwise,
# HAS_GMPY contains the major version number of gmpy; i.e. 1 for gmpy, and
# 2 for gmpy2.
# Versions of gmpy prior to 1.03 do not work correctly with int(largempz)
# For example, int(gmpy.mpz(2**256)) would raise OverflowError.
# See issue 4980.
# Minimum version of gmpy changed to 1.13 to allow a single code base to also
# work with gmpy2.
def _getenv(key, default=None):
from os import getenv
return getenv(key, default)
GROUND_TYPES = _getenv('SYMPY_GROUND_TYPES', 'auto').lower()
HAS_GMPY = 0
if GROUND_TYPES != 'python':
# Don't try to import gmpy2 if ground types is set to gmpy1. This is
# primarily intended for testing.
if GROUND_TYPES != 'gmpy1':
gmpy = import_module('gmpy2', min_module_version='2.0.0',
module_version_attr='version', module_version_attr_call_args=())
if gmpy:
HAS_GMPY = 2
else:
GROUND_TYPES = 'gmpy'
if not HAS_GMPY:
gmpy = import_module('gmpy', min_module_version='1.13',
module_version_attr='version', module_version_attr_call_args=())
if gmpy:
HAS_GMPY = 1
else:
gmpy = None
if GROUND_TYPES == 'auto':
if HAS_GMPY:
GROUND_TYPES = 'gmpy'
else:
GROUND_TYPES = 'python'
if GROUND_TYPES == 'gmpy' and not HAS_GMPY:
from warnings import warn
warn("gmpy library is not installed, switching to 'python' ground types")
GROUND_TYPES = 'python'
# SYMPY_INTS is a tuple containing the base types for valid integer types.
SYMPY_INTS = (int, ) # type: Tuple[Type, ...]
if GROUND_TYPES == 'gmpy':
SYMPY_INTS += (type(gmpy.mpz(0)),)
from time import perf_counter as clock
|
4d433189224d38438128219b0f7e57867054d77256be03fca90feaea2e5ddab8
|
""" Caching facility for SymPy """
class _cache(list):
""" List of cached functions """
def print_cache(self):
"""print cache info"""
for item in self:
name = item.__name__
myfunc = item
while hasattr(myfunc, '__wrapped__'):
if hasattr(myfunc, 'cache_info'):
info = myfunc.cache_info()
break
else:
myfunc = myfunc.__wrapped__
else:
info = None
print(name, info)
def clear_cache(self):
"""clear cache content"""
for item in self:
myfunc = item
while hasattr(myfunc, '__wrapped__'):
if hasattr(myfunc, 'cache_clear'):
myfunc.cache_clear()
break
else:
myfunc = myfunc.__wrapped__
# global cache registry:
CACHE = _cache()
# make clear and print methods available
print_cache = CACHE.print_cache
clear_cache = CACHE.clear_cache
from functools import lru_cache
def __cacheit(maxsize):
"""caching decorator.
important: the result of cached function must be *immutable*
Examples
========
>>> from sympy.core.cache import cacheit
>>> @cacheit
... def f(a, b):
... return a+b
>>> @cacheit
... def f(a, b): # noqa: F811
... return [a, b] # <-- WRONG, returns mutable object
to force cacheit to check returned results mutability and consistency,
set environment variable SYMPY_USE_CACHE to 'debug'
"""
def func_wrapper(func):
from .decorators import wraps
cfunc = lru_cache(maxsize, typed=True)(func)
@wraps(func)
def wrapper(*args, **kwargs):
try:
retval = cfunc(*args, **kwargs)
except TypeError:
retval = func(*args, **kwargs)
return retval
wrapper.cache_info = cfunc.cache_info
wrapper.cache_clear = cfunc.cache_clear
CACHE.append(wrapper)
return wrapper
return func_wrapper
########################################
def __cacheit_nocache(func):
return func
def __cacheit_debug(maxsize):
"""cacheit + code to check cache consistency"""
def func_wrapper(func):
from .decorators import wraps
cfunc = __cacheit(maxsize)(func)
@wraps(func)
def wrapper(*args, **kw_args):
# always call function itself and compare it with cached version
r1 = func(*args, **kw_args)
r2 = cfunc(*args, **kw_args)
# try to see if the result is immutable
#
# this works because:
#
# hash([1,2,3]) -> raise TypeError
# hash({'a':1, 'b':2}) -> raise TypeError
# hash((1,[2,3])) -> raise TypeError
#
# hash((1,2,3)) -> just computes the hash
hash(r1), hash(r2)
# also see if returned values are the same
if r1 != r2:
raise RuntimeError("Returned values are not the same")
return r1
return wrapper
return func_wrapper
def _getenv(key, default=None):
from os import getenv
return getenv(key, default)
# SYMPY_USE_CACHE=yes/no/debug
USE_CACHE = _getenv('SYMPY_USE_CACHE', 'yes').lower()
# SYMPY_CACHE_SIZE=some_integer/None
# special cases :
# SYMPY_CACHE_SIZE=0 -> No caching
# SYMPY_CACHE_SIZE=None -> Unbounded caching
scs = _getenv('SYMPY_CACHE_SIZE', '1000')
if scs.lower() == 'none':
SYMPY_CACHE_SIZE = None
else:
try:
SYMPY_CACHE_SIZE = int(scs)
except ValueError:
raise RuntimeError(
'SYMPY_CACHE_SIZE must be a valid integer or None. ' + \
'Got: %s' % SYMPY_CACHE_SIZE)
if USE_CACHE == 'no':
cacheit = __cacheit_nocache
elif USE_CACHE == 'yes':
cacheit = __cacheit(SYMPY_CACHE_SIZE)
elif USE_CACHE == 'debug':
cacheit = __cacheit_debug(SYMPY_CACHE_SIZE) # a lot slower
else:
raise RuntimeError(
'unrecognized value for SYMPY_USE_CACHE: %s' % USE_CACHE)
|
3b6b8a90b7d8734958f90fcac2af301dd9d92a37dc95cb3dedc89cc7d12e3fb2
|
"""
Base class to provide str and repr hooks that `init_printing` can overwrite.
This is exposed publicly in the `printing.defaults` module,
but cannot be defined there without causing circular imports.
"""
from typing import Any
class Printable:
"""
The default implementation of printing for SymPy classes.
This implements a hack that allows us to print elements of built-in
Python containers in a readable way. Natively Python uses ``repr()``
even if ``str()`` was explicitly requested. Mix in this trait into
a class to get proper default printing.
This also adds support for LaTeX printing in jupyter notebooks.
"""
# Note, we always use the default ordering (lex) in __str__ and __repr__,
# regardless of the global setting. See issue 5487.
def __str__(self):
from sympy.printing.str import sstr
return sstr(self, order=None)
__repr__ = __str__
# We don't define _repr_png_ here because it would add a large amount of
# data to any notebook containing SymPy expressions, without adding
# anything useful to the notebook. It can still enabled manually, e.g.,
# for the qtconsole, with init_printing().
def _repr_latex_(self):
"""
IPython/Jupyter LaTeX printing
To change the behavior of this (e.g., pass in some settings to LaTeX),
use init_printing(). init_printing() will also enable LaTeX printing
for built in numeric types like ints and container types that contain
SymPy objects, like lists and dictionaries of expressions.
"""
from sympy.printing.latex import latex
s = latex(self, mode='plain')
return "$\\displaystyle %s$" % s
_repr_latex_orig = _repr_latex_ # type: Any
|
edd9d9ecfa9b32a3f7b1459ac1567bd7551bef50e93c8b2336bede9f7a15c042
|
from collections import defaultdict
from functools import cmp_to_key
import operator
from .sympify import sympify
from .basic import Basic
from .singleton import S
from .operations import AssocOp
from .cache import cacheit
from .logic import fuzzy_not, _fuzzy_group, fuzzy_and
from .compatibility import reduce
from .expr import Expr
from .parameters import global_parameters
# internal marker to indicate:
# "there are still non-commutative objects -- don't forget to process them"
class NC_Marker:
is_Order = False
is_Mul = False
is_Number = False
is_Poly = False
is_commutative = False
# Key for sorting commutative args in canonical order
_args_sortkey = cmp_to_key(Basic.compare)
def _mulsort(args):
# in-place sorting of args
args.sort(key=_args_sortkey)
def _unevaluated_Mul(*args):
"""Return a well-formed unevaluated Mul: Numbers are collected and
put in slot 0, any arguments that are Muls will be flattened, and args
are sorted. Use this when args have changed but you still want to return
an unevaluated Mul.
Examples
========
>>> from sympy.core.mul import _unevaluated_Mul as uMul
>>> from sympy import S, sqrt, Mul
>>> from sympy.abc import x
>>> a = uMul(*[S(3.0), x, S(2)])
>>> a.args[0]
6.00000000000000
>>> a.args[1]
x
Two unevaluated Muls with the same arguments will
always compare as equal during testing:
>>> m = uMul(sqrt(2), sqrt(3))
>>> m == uMul(sqrt(3), sqrt(2))
True
>>> u = Mul(sqrt(3), sqrt(2), evaluate=False)
>>> m == uMul(u)
True
>>> m == Mul(*m.args)
False
"""
args = list(args)
newargs = []
ncargs = []
co = S.One
while args:
a = args.pop()
if a.is_Mul:
c, nc = a.args_cnc()
args.extend(c)
if nc:
ncargs.append(Mul._from_args(nc))
elif a.is_Number:
co *= a
else:
newargs.append(a)
_mulsort(newargs)
if co is not S.One:
newargs.insert(0, co)
if ncargs:
newargs.append(Mul._from_args(ncargs))
return Mul._from_args(newargs)
class Mul(Expr, AssocOp):
__slots__ = ()
is_Mul = True
_args_type = Expr
def __neg__(self):
c, args = self.as_coeff_mul()
c = -c
if c is not S.One:
if args[0].is_Number:
args = list(args)
if c is S.NegativeOne:
args[0] = -args[0]
else:
args[0] *= c
else:
args = (c,) + args
return self._from_args(args, self.is_commutative)
@classmethod
def flatten(cls, seq):
"""Return commutative, noncommutative and order arguments by
combining related terms.
Notes
=====
* In an expression like ``a*b*c``, python process this through sympy
as ``Mul(Mul(a, b), c)``. This can have undesirable consequences.
- Sometimes terms are not combined as one would like:
{c.f. https://github.com/sympy/sympy/issues/4596}
>>> from sympy import Mul, sqrt
>>> from sympy.abc import x, y, z
>>> 2*(x + 1) # this is the 2-arg Mul behavior
2*x + 2
>>> y*(x + 1)*2
2*y*(x + 1)
>>> 2*(x + 1)*y # 2-arg result will be obtained first
y*(2*x + 2)
>>> Mul(2, x + 1, y) # all 3 args simultaneously processed
2*y*(x + 1)
>>> 2*((x + 1)*y) # parentheses can control this behavior
2*y*(x + 1)
Powers with compound bases may not find a single base to
combine with unless all arguments are processed at once.
Post-processing may be necessary in such cases.
{c.f. https://github.com/sympy/sympy/issues/5728}
>>> a = sqrt(x*sqrt(y))
>>> a**3
(x*sqrt(y))**(3/2)
>>> Mul(a,a,a)
(x*sqrt(y))**(3/2)
>>> a*a*a
x*sqrt(y)*sqrt(x*sqrt(y))
>>> _.subs(a.base, z).subs(z, a.base)
(x*sqrt(y))**(3/2)
- If more than two terms are being multiplied then all the
previous terms will be re-processed for each new argument.
So if each of ``a``, ``b`` and ``c`` were :class:`Mul`
expression, then ``a*b*c`` (or building up the product
with ``*=``) will process all the arguments of ``a`` and
``b`` twice: once when ``a*b`` is computed and again when
``c`` is multiplied.
Using ``Mul(a, b, c)`` will process all arguments once.
* The results of Mul are cached according to arguments, so flatten
will only be called once for ``Mul(a, b, c)``. If you can
structure a calculation so the arguments are most likely to be
repeats then this can save time in computing the answer. For
example, say you had a Mul, M, that you wished to divide by ``d[i]``
and multiply by ``n[i]`` and you suspect there are many repeats
in ``n``. It would be better to compute ``M*n[i]/d[i]`` rather
than ``M/d[i]*n[i]`` since every time n[i] is a repeat, the
product, ``M*n[i]`` will be returned without flattening -- the
cached value will be returned. If you divide by the ``d[i]``
first (and those are more unique than the ``n[i]``) then that will
create a new Mul, ``M/d[i]`` the args of which will be traversed
again when it is multiplied by ``n[i]``.
{c.f. https://github.com/sympy/sympy/issues/5706}
This consideration is moot if the cache is turned off.
NB
--
The validity of the above notes depends on the implementation
details of Mul and flatten which may change at any time. Therefore,
you should only consider them when your code is highly performance
sensitive.
Removal of 1 from the sequence is already handled by AssocOp.__new__.
"""
from sympy.calculus.util import AccumBounds
from sympy.matrices.expressions import MatrixExpr
rv = None
if len(seq) == 2:
a, b = seq
if b.is_Rational:
a, b = b, a
seq = [a, b]
assert not a is S.One
if not a.is_zero and a.is_Rational:
r, b = b.as_coeff_Mul()
if b.is_Add:
if r is not S.One: # 2-arg hack
# leave the Mul as a Mul?
ar = a*r
if ar is S.One:
arb = b
else:
arb = cls(a*r, b, evaluate=False)
rv = [arb], [], None
elif global_parameters.distribute and b.is_commutative:
r, b = b.as_coeff_Add()
bargs = [_keep_coeff(a, bi) for bi in Add.make_args(b)]
_addsort(bargs)
ar = a*r
if ar:
bargs.insert(0, ar)
bargs = [Add._from_args(bargs)]
rv = bargs, [], None
if rv:
return rv
# apply associativity, separate commutative part of seq
c_part = [] # out: commutative factors
nc_part = [] # out: non-commutative factors
nc_seq = []
coeff = S.One # standalone term
# e.g. 3 * ...
c_powers = [] # (base,exp) n
# e.g. (x,n) for x
num_exp = [] # (num-base, exp) y
# e.g. (3, y) for ... * 3 * ...
neg1e = S.Zero # exponent on -1 extracted from Number-based Pow and I
pnum_rat = {} # (num-base, Rat-exp) 1/2
# e.g. (3, 1/2) for ... * 3 * ...
order_symbols = None
# --- PART 1 ---
#
# "collect powers and coeff":
#
# o coeff
# o c_powers
# o num_exp
# o neg1e
# o pnum_rat
#
# NOTE: this is optimized for all-objects-are-commutative case
for o in seq:
# O(x)
if o.is_Order:
o, order_symbols = o.as_expr_variables(order_symbols)
# Mul([...])
if o.is_Mul:
if o.is_commutative:
seq.extend(o.args) # XXX zerocopy?
else:
# NCMul can have commutative parts as well
for q in o.args:
if q.is_commutative:
seq.append(q)
else:
nc_seq.append(q)
# append non-commutative marker, so we don't forget to
# process scheduled non-commutative objects
seq.append(NC_Marker)
continue
# 3
elif o.is_Number:
if o is S.NaN or coeff is S.ComplexInfinity and o.is_zero:
# we know for sure the result will be nan
return [S.NaN], [], None
elif coeff.is_Number or isinstance(coeff, AccumBounds): # it could be zoo
coeff *= o
if coeff is S.NaN:
# we know for sure the result will be nan
return [S.NaN], [], None
continue
elif isinstance(o, AccumBounds):
coeff = o.__mul__(coeff)
continue
elif o is S.ComplexInfinity:
if not coeff:
# 0 * zoo = NaN
return [S.NaN], [], None
coeff = S.ComplexInfinity
continue
elif o is S.ImaginaryUnit:
neg1e += S.Half
continue
elif o.is_commutative:
# e
# o = b
b, e = o.as_base_exp()
# y
# 3
if o.is_Pow:
if b.is_Number:
# get all the factors with numeric base so they can be
# combined below, but don't combine negatives unless
# the exponent is an integer
if e.is_Rational:
if e.is_Integer:
coeff *= Pow(b, e) # it is an unevaluated power
continue
elif e.is_negative: # also a sign of an unevaluated power
seq.append(Pow(b, e))
continue
elif b.is_negative:
neg1e += e
b = -b
if b is not S.One:
pnum_rat.setdefault(b, []).append(e)
continue
elif b.is_positive or e.is_integer:
num_exp.append((b, e))
continue
c_powers.append((b, e))
# NON-COMMUTATIVE
# TODO: Make non-commutative exponents not combine automatically
else:
if o is not NC_Marker:
nc_seq.append(o)
# process nc_seq (if any)
while nc_seq:
o = nc_seq.pop(0)
if not nc_part:
nc_part.append(o)
continue
# b c b+c
# try to combine last terms: a * a -> a
o1 = nc_part.pop()
b1, e1 = o1.as_base_exp()
b2, e2 = o.as_base_exp()
new_exp = e1 + e2
# Only allow powers to combine if the new exponent is
# not an Add. This allow things like a**2*b**3 == a**5
# if a.is_commutative == False, but prohibits
# a**x*a**y and x**a*x**b from combining (x,y commute).
if b1 == b2 and (not new_exp.is_Add):
o12 = b1 ** new_exp
# now o12 could be a commutative object
if o12.is_commutative:
seq.append(o12)
continue
else:
nc_seq.insert(0, o12)
else:
nc_part.append(o1)
nc_part.append(o)
# We do want a combined exponent if it would not be an Add, such as
# y 2y 3y
# x * x -> x
# We determine if two exponents have the same term by using
# as_coeff_Mul.
#
# Unfortunately, this isn't smart enough to consider combining into
# exponents that might already be adds, so things like:
# z - y y
# x * x will be left alone. This is because checking every possible
# combination can slow things down.
# gather exponents of common bases...
def _gather(c_powers):
common_b = {} # b:e
for b, e in c_powers:
co = e.as_coeff_Mul()
common_b.setdefault(b, {}).setdefault(
co[1], []).append(co[0])
for b, d in common_b.items():
for di, li in d.items():
d[di] = Add(*li)
new_c_powers = []
for b, e in common_b.items():
new_c_powers.extend([(b, c*t) for t, c in e.items()])
return new_c_powers
# in c_powers
c_powers = _gather(c_powers)
# and in num_exp
num_exp = _gather(num_exp)
# --- PART 2 ---
#
# o process collected powers (x**0 -> 1; x**1 -> x; otherwise Pow)
# o combine collected powers (2**x * 3**x -> 6**x)
# with numeric base
# ................................
# now we have:
# - coeff:
# - c_powers: (b, e)
# - num_exp: (2, e)
# - pnum_rat: {(1/3, [1/3, 2/3, 1/4])}
# 0 1
# x -> 1 x -> x
# this should only need to run twice; if it fails because
# it needs to be run more times, perhaps this should be
# changed to a "while True" loop -- the only reason it
# isn't such now is to allow a less-than-perfect result to
# be obtained rather than raising an error or entering an
# infinite loop
for i in range(2):
new_c_powers = []
changed = False
for b, e in c_powers:
if e.is_zero:
# canceling out infinities yields NaN
if (b.is_Add or b.is_Mul) and any(infty in b.args
for infty in (S.ComplexInfinity, S.Infinity,
S.NegativeInfinity)):
return [S.NaN], [], None
continue
if e is S.One:
if b.is_Number:
coeff *= b
continue
p = b
if e is not S.One:
p = Pow(b, e)
# check to make sure that the base doesn't change
# after exponentiation; to allow for unevaluated
# Pow, we only do so if b is not already a Pow
if p.is_Pow and not b.is_Pow:
bi = b
b, e = p.as_base_exp()
if b != bi:
changed = True
c_part.append(p)
new_c_powers.append((b, e))
# there might have been a change, but unless the base
# matches some other base, there is nothing to do
if changed and len({
b for b, e in new_c_powers}) != len(new_c_powers):
# start over again
c_part = []
c_powers = _gather(new_c_powers)
else:
break
# x x x
# 2 * 3 -> 6
inv_exp_dict = {} # exp:Mul(num-bases) x x
# e.g. x:6 for ... * 2 * 3 * ...
for b, e in num_exp:
inv_exp_dict.setdefault(e, []).append(b)
for e, b in inv_exp_dict.items():
inv_exp_dict[e] = cls(*b)
c_part.extend([Pow(b, e) for e, b in inv_exp_dict.items() if e])
# b, e -> e' = sum(e), b
# {(1/5, [1/3]), (1/2, [1/12, 1/4]} -> {(1/3, [1/5, 1/2])}
comb_e = {}
for b, e in pnum_rat.items():
comb_e.setdefault(Add(*e), []).append(b)
del pnum_rat
# process them, reducing exponents to values less than 1
# and updating coeff if necessary else adding them to
# num_rat for further processing
num_rat = []
for e, b in comb_e.items():
b = cls(*b)
if e.q == 1:
coeff *= Pow(b, e)
continue
if e.p > e.q:
e_i, ep = divmod(e.p, e.q)
coeff *= Pow(b, e_i)
e = Rational(ep, e.q)
num_rat.append((b, e))
del comb_e
# extract gcd of bases in num_rat
# 2**(1/3)*6**(1/4) -> 2**(1/3+1/4)*3**(1/4)
pnew = defaultdict(list)
i = 0 # steps through num_rat which may grow
while i < len(num_rat):
bi, ei = num_rat[i]
grow = []
for j in range(i + 1, len(num_rat)):
bj, ej = num_rat[j]
g = bi.gcd(bj)
if g is not S.One:
# 4**r1*6**r2 -> 2**(r1+r2) * 2**r1 * 3**r2
# this might have a gcd with something else
e = ei + ej
if e.q == 1:
coeff *= Pow(g, e)
else:
if e.p > e.q:
e_i, ep = divmod(e.p, e.q) # change e in place
coeff *= Pow(g, e_i)
e = Rational(ep, e.q)
grow.append((g, e))
# update the jth item
num_rat[j] = (bj/g, ej)
# update bi that we are checking with
bi = bi/g
if bi is S.One:
break
if bi is not S.One:
obj = Pow(bi, ei)
if obj.is_Number:
coeff *= obj
else:
# changes like sqrt(12) -> 2*sqrt(3)
for obj in Mul.make_args(obj):
if obj.is_Number:
coeff *= obj
else:
assert obj.is_Pow
bi, ei = obj.args
pnew[ei].append(bi)
num_rat.extend(grow)
i += 1
# combine bases of the new powers
for e, b in pnew.items():
pnew[e] = cls(*b)
# handle -1 and I
if neg1e:
# treat I as (-1)**(1/2) and compute -1's total exponent
p, q = neg1e.as_numer_denom()
# if the integer part is odd, extract -1
n, p = divmod(p, q)
if n % 2:
coeff = -coeff
# if it's a multiple of 1/2 extract I
if q == 2:
c_part.append(S.ImaginaryUnit)
elif p:
# see if there is any positive base this power of
# -1 can join
neg1e = Rational(p, q)
for e, b in pnew.items():
if e == neg1e and b.is_positive:
pnew[e] = -b
break
else:
# keep it separate; we've already evaluated it as
# much as possible so evaluate=False
c_part.append(Pow(S.NegativeOne, neg1e, evaluate=False))
# add all the pnew powers
c_part.extend([Pow(b, e) for e, b in pnew.items()])
# oo, -oo
if (coeff is S.Infinity) or (coeff is S.NegativeInfinity):
def _handle_for_oo(c_part, coeff_sign):
new_c_part = []
for t in c_part:
if t.is_extended_positive:
continue
if t.is_extended_negative:
coeff_sign *= -1
continue
new_c_part.append(t)
return new_c_part, coeff_sign
c_part, coeff_sign = _handle_for_oo(c_part, 1)
nc_part, coeff_sign = _handle_for_oo(nc_part, coeff_sign)
coeff *= coeff_sign
# zoo
if coeff is S.ComplexInfinity:
# zoo might be
# infinite_real + bounded_im
# bounded_real + infinite_im
# infinite_real + infinite_im
# and non-zero real or imaginary will not change that status.
c_part = [c for c in c_part if not (fuzzy_not(c.is_zero) and
c.is_extended_real is not None)]
nc_part = [c for c in nc_part if not (fuzzy_not(c.is_zero) and
c.is_extended_real is not None)]
# 0
elif coeff.is_zero:
# we know for sure the result will be 0 except the multiplicand
# is infinity or a matrix
if any(isinstance(c, MatrixExpr) for c in nc_part):
return [coeff], nc_part, order_symbols
if any(c.is_finite == False for c in c_part):
return [S.NaN], [], order_symbols
return [coeff], [], order_symbols
# check for straggling Numbers that were produced
_new = []
for i in c_part:
if i.is_Number:
coeff *= i
else:
_new.append(i)
c_part = _new
# order commutative part canonically
_mulsort(c_part)
# current code expects coeff to be always in slot-0
if coeff is not S.One:
c_part.insert(0, coeff)
# we are done
if (global_parameters.distribute and not nc_part and len(c_part) == 2 and
c_part[0].is_Number and c_part[0].is_finite and c_part[1].is_Add):
# 2*(1+a) -> 2 + 2 * a
coeff = c_part[0]
c_part = [Add(*[coeff*f for f in c_part[1].args])]
return c_part, nc_part, order_symbols
def _eval_power(self, e):
# don't break up NC terms: (A*B)**3 != A**3*B**3, it is A*B*A*B*A*B
cargs, nc = self.args_cnc(split_1=False)
if e.is_Integer:
return Mul(*[Pow(b, e, evaluate=False) for b in cargs]) * \
Pow(Mul._from_args(nc), e, evaluate=False)
if e.is_Rational and e.q == 2:
from sympy.core.power import integer_nthroot
from sympy.functions.elementary.complexes import sign
if self.is_imaginary:
a = self.as_real_imag()[1]
if a.is_Rational:
n, d = abs(a/2).as_numer_denom()
n, t = integer_nthroot(n, 2)
if t:
d, t = integer_nthroot(d, 2)
if t:
r = sympify(n)/d
return _unevaluated_Mul(r**e.p, (1 + sign(a)*S.ImaginaryUnit)**e.p)
p = Pow(self, e, evaluate=False)
if e.is_Rational or e.is_Float:
return p._eval_expand_power_base()
return p
@classmethod
def class_key(cls):
return 3, 0, cls.__name__
def _eval_evalf(self, prec):
c, m = self.as_coeff_Mul()
if c is S.NegativeOne:
if m.is_Mul:
rv = -AssocOp._eval_evalf(m, prec)
else:
mnew = m._eval_evalf(prec)
if mnew is not None:
m = mnew
rv = -m
else:
rv = AssocOp._eval_evalf(self, prec)
if rv.is_number:
return rv.expand()
return rv
@property
def _mpc_(self):
"""
Convert self to an mpmath mpc if possible
"""
from sympy.core.numbers import I, Float
im_part, imag_unit = self.as_coeff_Mul()
if not imag_unit == I:
# ValueError may seem more reasonable but since it's a @property,
# we need to use AttributeError to keep from confusing things like
# hasattr.
raise AttributeError("Cannot convert Mul to mpc. Must be of the form Number*I")
return (Float(0)._mpf_, Float(im_part)._mpf_)
@cacheit
def as_two_terms(self):
"""Return head and tail of self.
This is the most efficient way to get the head and tail of an
expression.
- if you want only the head, use self.args[0];
- if you want to process the arguments of the tail then use
self.as_coef_mul() which gives the head and a tuple containing
the arguments of the tail when treated as a Mul.
- if you want the coefficient when self is treated as an Add
then use self.as_coeff_add()[0]
>>> from sympy.abc import x, y
>>> (3*x*y).as_two_terms()
(3, x*y)
"""
args = self.args
if len(args) == 1:
return S.One, self
elif len(args) == 2:
return args
else:
return args[0], self._new_rawargs(*args[1:])
@cacheit
def as_coefficients_dict(self):
"""Return a dictionary mapping terms to their coefficient.
Since the dictionary is a defaultdict, inquiries about terms which
were not present will return a coefficient of 0. The dictionary
is considered to have a single term.
Examples
========
>>> from sympy.abc import a, x
>>> (3*a*x).as_coefficients_dict()
{a*x: 3}
>>> _[a]
0
"""
d = defaultdict(int)
args = self.args
if len(args) == 1 or not args[0].is_Number:
d[self] = S.One
else:
d[self._new_rawargs(*args[1:])] = args[0]
return d
@cacheit
def as_coeff_mul(self, *deps, **kwargs):
if deps:
from sympy.utilities.iterables import sift
l1, l2 = sift(self.args, lambda x: x.has(*deps), binary=True)
return self._new_rawargs(*l2), tuple(l1)
rational = kwargs.pop('rational', True)
args = self.args
if args[0].is_Number:
if not rational or args[0].is_Rational:
return args[0], args[1:]
elif args[0].is_extended_negative:
return S.NegativeOne, (-args[0],) + args[1:]
return S.One, args
def as_coeff_Mul(self, rational=False):
"""
Efficiently extract the coefficient of a product.
"""
coeff, args = self.args[0], self.args[1:]
if coeff.is_Number:
if not rational or coeff.is_Rational:
if len(args) == 1:
return coeff, args[0]
else:
return coeff, self._new_rawargs(*args)
elif coeff.is_extended_negative:
return S.NegativeOne, self._new_rawargs(*((-coeff,) + args))
return S.One, self
def as_real_imag(self, deep=True, **hints):
from sympy import Abs, expand_mul, im, re
other = []
coeffr = []
coeffi = []
addterms = S.One
for a in self.args:
r, i = a.as_real_imag()
if i.is_zero:
coeffr.append(r)
elif r.is_zero:
coeffi.append(i*S.ImaginaryUnit)
elif a.is_commutative:
# search for complex conjugate pairs:
for i, x in enumerate(other):
if x == a.conjugate():
coeffr.append(Abs(x)**2)
del other[i]
break
else:
if a.is_Add:
addterms *= a
else:
other.append(a)
else:
other.append(a)
m = self.func(*other)
if hints.get('ignore') == m:
return
if len(coeffi) % 2:
imco = im(coeffi.pop(0))
# all other pairs make a real factor; they will be
# put into reco below
else:
imco = S.Zero
reco = self.func(*(coeffr + coeffi))
r, i = (reco*re(m), reco*im(m))
if addterms == 1:
if m == 1:
if imco.is_zero:
return (reco, S.Zero)
else:
return (S.Zero, reco*imco)
if imco is S.Zero:
return (r, i)
return (-imco*i, imco*r)
addre, addim = expand_mul(addterms, deep=False).as_real_imag()
if imco is S.Zero:
return (r*addre - i*addim, i*addre + r*addim)
else:
r, i = -imco*i, imco*r
return (r*addre - i*addim, r*addim + i*addre)
@staticmethod
def _expandsums(sums):
"""
Helper function for _eval_expand_mul.
sums must be a list of instances of Basic.
"""
L = len(sums)
if L == 1:
return sums[0].args
terms = []
left = Mul._expandsums(sums[:L//2])
right = Mul._expandsums(sums[L//2:])
terms = [Mul(a, b) for a in left for b in right]
added = Add(*terms)
return Add.make_args(added) # it may have collapsed down to one term
def _eval_expand_mul(self, **hints):
from sympy import fraction
# Handle things like 1/(x*(x + 1)), which are automatically converted
# to 1/x*1/(x + 1)
expr = self
n, d = fraction(expr)
if d.is_Mul:
n, d = [i._eval_expand_mul(**hints) if i.is_Mul else i
for i in (n, d)]
expr = n/d
if not expr.is_Mul:
return expr
plain, sums, rewrite = [], [], False
for factor in expr.args:
if factor.is_Add:
sums.append(factor)
rewrite = True
else:
if factor.is_commutative:
plain.append(factor)
else:
sums.append(Basic(factor)) # Wrapper
if not rewrite:
return expr
else:
plain = self.func(*plain)
if sums:
deep = hints.get("deep", False)
terms = self.func._expandsums(sums)
args = []
for term in terms:
t = self.func(plain, term)
if t.is_Mul and any(a.is_Add for a in t.args) and deep:
t = t._eval_expand_mul()
args.append(t)
return Add(*args)
else:
return plain
@cacheit
def _eval_derivative(self, s):
args = list(self.args)
terms = []
for i in range(len(args)):
d = args[i].diff(s)
if d:
# Note: reduce is used in step of Mul as Mul is unable to
# handle subtypes and operation priority:
terms.append(reduce(lambda x, y: x*y, (args[:i] + [d] + args[i + 1:]), S.One))
return Add.fromiter(terms)
@cacheit
def _eval_derivative_n_times(self, s, n):
from sympy import Integer, factorial, prod, Sum, Max
from sympy.ntheory.multinomial import multinomial_coefficients_iterator
from .function import AppliedUndef
from .symbol import Symbol, symbols, Dummy
if not isinstance(s, AppliedUndef) and not isinstance(s, Symbol):
# other types of s may not be well behaved, e.g.
# (cos(x)*sin(y)).diff([[x, y, z]])
return super()._eval_derivative_n_times(s, n)
args = self.args
m = len(args)
if isinstance(n, (int, Integer)):
# https://en.wikipedia.org/wiki/General_Leibniz_rule#More_than_two_factors
terms = []
for kvals, c in multinomial_coefficients_iterator(m, n):
p = prod([arg.diff((s, k)) for k, arg in zip(kvals, args)])
terms.append(c * p)
return Add(*terms)
kvals = symbols("k1:%i" % m, cls=Dummy)
klast = n - sum(kvals)
nfact = factorial(n)
e, l = (# better to use the multinomial?
nfact/prod(map(factorial, kvals))/factorial(klast)*\
prod([args[t].diff((s, kvals[t])) for t in range(m-1)])*\
args[-1].diff((s, Max(0, klast))),
[(k, 0, n) for k in kvals])
return Sum(e, *l)
def _eval_difference_delta(self, n, step):
from sympy.series.limitseq import difference_delta as dd
arg0 = self.args[0]
rest = Mul(*self.args[1:])
return (arg0.subs(n, n + step) * dd(rest, n, step) + dd(arg0, n, step) *
rest)
def _matches_simple(self, expr, repl_dict):
# handle (w*3).matches('x*5') -> {w: x*5/3}
coeff, terms = self.as_coeff_Mul()
terms = Mul.make_args(terms)
if len(terms) == 1:
newexpr = self.__class__._combine_inverse(expr, coeff)
return terms[0].matches(newexpr, repl_dict)
return
def matches(self, expr, repl_dict={}, old=False):
expr = sympify(expr)
repl_dict = repl_dict.copy()
if self.is_commutative and expr.is_commutative:
return self._matches_commutative(expr, repl_dict, old)
elif self.is_commutative is not expr.is_commutative:
return None
# Proceed only if both both expressions are non-commutative
c1, nc1 = self.args_cnc()
c2, nc2 = expr.args_cnc()
c1, c2 = [c or [1] for c in [c1, c2]]
# TODO: Should these be self.func?
comm_mul_self = Mul(*c1)
comm_mul_expr = Mul(*c2)
repl_dict = comm_mul_self.matches(comm_mul_expr, repl_dict, old)
# If the commutative arguments didn't match and aren't equal, then
# then the expression as a whole doesn't match
if repl_dict is None and c1 != c2:
return None
# Now match the non-commutative arguments, expanding powers to
# multiplications
nc1 = Mul._matches_expand_pows(nc1)
nc2 = Mul._matches_expand_pows(nc2)
repl_dict = Mul._matches_noncomm(nc1, nc2, repl_dict)
return repl_dict or None
@staticmethod
def _matches_expand_pows(arg_list):
new_args = []
for arg in arg_list:
if arg.is_Pow and arg.exp > 0:
new_args.extend([arg.base] * arg.exp)
else:
new_args.append(arg)
return new_args
@staticmethod
def _matches_noncomm(nodes, targets, repl_dict={}):
"""Non-commutative multiplication matcher.
`nodes` is a list of symbols within the matcher multiplication
expression, while `targets` is a list of arguments in the
multiplication expression being matched against.
"""
repl_dict = repl_dict.copy()
# List of possible future states to be considered
agenda = []
# The current matching state, storing index in nodes and targets
state = (0, 0)
node_ind, target_ind = state
# Mapping between wildcard indices and the index ranges they match
wildcard_dict = {}
repl_dict = repl_dict.copy()
while target_ind < len(targets) and node_ind < len(nodes):
node = nodes[node_ind]
if node.is_Wild:
Mul._matches_add_wildcard(wildcard_dict, state)
states_matches = Mul._matches_new_states(wildcard_dict, state,
nodes, targets)
if states_matches:
new_states, new_matches = states_matches
agenda.extend(new_states)
if new_matches:
for match in new_matches:
repl_dict[match] = new_matches[match]
if not agenda:
return None
else:
state = agenda.pop()
node_ind, target_ind = state
return repl_dict
@staticmethod
def _matches_add_wildcard(dictionary, state):
node_ind, target_ind = state
if node_ind in dictionary:
begin, end = dictionary[node_ind]
dictionary[node_ind] = (begin, target_ind)
else:
dictionary[node_ind] = (target_ind, target_ind)
@staticmethod
def _matches_new_states(dictionary, state, nodes, targets):
node_ind, target_ind = state
node = nodes[node_ind]
target = targets[target_ind]
# Don't advance at all if we've exhausted the targets but not the nodes
if target_ind >= len(targets) - 1 and node_ind < len(nodes) - 1:
return None
if node.is_Wild:
match_attempt = Mul._matches_match_wilds(dictionary, node_ind,
nodes, targets)
if match_attempt:
# If the same node has been matched before, don't return
# anything if the current match is diverging from the previous
# match
other_node_inds = Mul._matches_get_other_nodes(dictionary,
nodes, node_ind)
for ind in other_node_inds:
other_begin, other_end = dictionary[ind]
curr_begin, curr_end = dictionary[node_ind]
other_targets = targets[other_begin:other_end + 1]
current_targets = targets[curr_begin:curr_end + 1]
for curr, other in zip(current_targets, other_targets):
if curr != other:
return None
# A wildcard node can match more than one target, so only the
# target index is advanced
new_state = [(node_ind, target_ind + 1)]
# Only move on to the next node if there is one
if node_ind < len(nodes) - 1:
new_state.append((node_ind + 1, target_ind + 1))
return new_state, match_attempt
else:
# If we're not at a wildcard, then make sure we haven't exhausted
# nodes but not targets, since in this case one node can only match
# one target
if node_ind >= len(nodes) - 1 and target_ind < len(targets) - 1:
return None
match_attempt = node.matches(target)
if match_attempt:
return [(node_ind + 1, target_ind + 1)], match_attempt
elif node == target:
return [(node_ind + 1, target_ind + 1)], None
else:
return None
@staticmethod
def _matches_match_wilds(dictionary, wildcard_ind, nodes, targets):
"""Determine matches of a wildcard with sub-expression in `target`."""
wildcard = nodes[wildcard_ind]
begin, end = dictionary[wildcard_ind]
terms = targets[begin:end + 1]
# TODO: Should this be self.func?
mul = Mul(*terms) if len(terms) > 1 else terms[0]
return wildcard.matches(mul)
@staticmethod
def _matches_get_other_nodes(dictionary, nodes, node_ind):
"""Find other wildcards that may have already been matched."""
other_node_inds = []
for ind in dictionary:
if nodes[ind] == nodes[node_ind]:
other_node_inds.append(ind)
return other_node_inds
@staticmethod
def _combine_inverse(lhs, rhs):
"""
Returns lhs/rhs, but treats arguments like symbols, so things
like oo/oo return 1 (instead of a nan) and ``I`` behaves like
a symbol instead of sqrt(-1).
"""
from .symbol import Dummy
if lhs == rhs:
return S.One
def check(l, r):
if l.is_Float and r.is_comparable:
# if both objects are added to 0 they will share the same "normalization"
# and are more likely to compare the same. Since Add(foo, 0) will not allow
# the 0 to pass, we use __add__ directly.
return l.__add__(0) == r.evalf().__add__(0)
return False
if check(lhs, rhs) or check(rhs, lhs):
return S.One
if any(i.is_Pow or i.is_Mul for i in (lhs, rhs)):
# gruntz and limit wants a literal I to not combine
# with a power of -1
d = Dummy('I')
_i = {S.ImaginaryUnit: d}
i_ = {d: S.ImaginaryUnit}
a = lhs.xreplace(_i).as_powers_dict()
b = rhs.xreplace(_i).as_powers_dict()
blen = len(b)
for bi in tuple(b.keys()):
if bi in a:
a[bi] -= b.pop(bi)
if not a[bi]:
a.pop(bi)
if len(b) != blen:
lhs = Mul(*[k**v for k, v in a.items()]).xreplace(i_)
rhs = Mul(*[k**v for k, v in b.items()]).xreplace(i_)
return lhs/rhs
def as_powers_dict(self):
d = defaultdict(int)
for term in self.args:
for b, e in term.as_powers_dict().items():
d[b] += e
return d
def as_numer_denom(self):
# don't use _from_args to rebuild the numerators and denominators
# as the order is not guaranteed to be the same once they have
# been separated from each other
numers, denoms = list(zip(*[f.as_numer_denom() for f in self.args]))
return self.func(*numers), self.func(*denoms)
def as_base_exp(self):
e1 = None
bases = []
nc = 0
for m in self.args:
b, e = m.as_base_exp()
if not b.is_commutative:
nc += 1
if e1 is None:
e1 = e
elif e != e1 or nc > 1:
return self, S.One
bases.append(b)
return self.func(*bases), e1
def _eval_is_polynomial(self, syms):
return all(term._eval_is_polynomial(syms) for term in self.args)
def _eval_is_rational_function(self, syms):
return all(term._eval_is_rational_function(syms) for term in self.args)
def _eval_is_meromorphic(self, x, a):
return _fuzzy_group((arg.is_meromorphic(x, a) for arg in self.args),
quick_exit=True)
def _eval_is_algebraic_expr(self, syms):
return all(term._eval_is_algebraic_expr(syms) for term in self.args)
_eval_is_commutative = lambda self: _fuzzy_group(
a.is_commutative for a in self.args)
def _eval_is_complex(self):
comp = _fuzzy_group(a.is_complex for a in self.args)
if comp is False:
if any(a.is_infinite for a in self.args):
if any(a.is_zero is not False for a in self.args):
return None
return False
return comp
def _eval_is_finite(self):
if all(a.is_finite for a in self.args):
return True
if any(a.is_infinite for a in self.args):
if all(a.is_zero is False for a in self.args):
return False
def _eval_is_infinite(self):
if any(a.is_infinite for a in self.args):
if any(a.is_zero for a in self.args):
return S.NaN.is_infinite
if any(a.is_zero is None for a in self.args):
return None
return True
def _eval_is_rational(self):
r = _fuzzy_group((a.is_rational for a in self.args), quick_exit=True)
if r:
return r
elif r is False:
return self.is_zero
def _eval_is_algebraic(self):
r = _fuzzy_group((a.is_algebraic for a in self.args), quick_exit=True)
if r:
return r
elif r is False:
return self.is_zero
def _eval_is_zero(self):
zero = infinite = False
for a in self.args:
z = a.is_zero
if z:
if infinite:
return # 0*oo is nan and nan.is_zero is None
zero = True
else:
if not a.is_finite:
if zero:
return # 0*oo is nan and nan.is_zero is None
infinite = True
if zero is False and z is None: # trap None
zero = None
return zero
def _eval_is_integer(self):
from sympy import fraction
from sympy.core.numbers import Float
is_rational = self._eval_is_rational()
if is_rational is False:
return False
# use exact=True to avoid recomputing num or den
n, d = fraction(self, exact=True)
if is_rational:
if d is S.One:
return True
if d.is_even:
if d.is_prime: # literal or symbolic 2
return n.is_even
if n.is_odd:
return False # true even if d = 0
if n == d:
return fuzzy_and([not bool(self.atoms(Float)),
fuzzy_not(d.is_zero)])
def _eval_is_polar(self):
has_polar = any(arg.is_polar for arg in self.args)
return has_polar and \
all(arg.is_polar or arg.is_positive for arg in self.args)
def _eval_is_extended_real(self):
return self._eval_real_imag(True)
def _eval_real_imag(self, real):
zero = False
t_not_re_im = None
for t in self.args:
if (t.is_complex or t.is_infinite) is False and t.is_extended_real is False:
return False
elif t.is_imaginary: # I
real = not real
elif t.is_extended_real: # 2
if not zero:
z = t.is_zero
if not z and zero is False:
zero = z
elif z:
if all(a.is_finite for a in self.args):
return True
return
elif t.is_extended_real is False:
# symbolic or literal like `2 + I` or symbolic imaginary
if t_not_re_im:
return # complex terms might cancel
t_not_re_im = t
elif t.is_imaginary is False: # symbolic like `2` or `2 + I`
if t_not_re_im:
return # complex terms might cancel
t_not_re_im = t
else:
return
if t_not_re_im:
if t_not_re_im.is_extended_real is False:
if real: # like 3
return zero # 3*(smthng like 2 + I or i) is not real
if t_not_re_im.is_imaginary is False: # symbolic 2 or 2 + I
if not real: # like I
return zero # I*(smthng like 2 or 2 + I) is not real
elif zero is False:
return real # can't be trumped by 0
elif real:
return real # doesn't matter what zero is
def _eval_is_imaginary(self):
z = self.is_zero
if z:
return False
if self.is_finite is False:
return False
elif z is False and self.is_finite is True:
return self._eval_real_imag(False)
def _eval_is_hermitian(self):
return self._eval_herm_antiherm(True)
def _eval_herm_antiherm(self, real):
one_nc = zero = one_neither = False
for t in self.args:
if not t.is_commutative:
if one_nc:
return
one_nc = True
if t.is_antihermitian:
real = not real
elif t.is_hermitian:
if not zero:
z = t.is_zero
if not z and zero is False:
zero = z
elif z:
if all(a.is_finite for a in self.args):
return True
return
elif t.is_hermitian is False:
if one_neither:
return
one_neither = True
else:
return
if one_neither:
if real:
return zero
elif zero is False or real:
return real
def _eval_is_antihermitian(self):
z = self.is_zero
if z:
return False
elif z is False:
return self._eval_herm_antiherm(False)
def _eval_is_irrational(self):
for t in self.args:
a = t.is_irrational
if a:
others = list(self.args)
others.remove(t)
if all((x.is_rational and fuzzy_not(x.is_zero)) is True for x in others):
return True
return
if a is None:
return
if all(x.is_real for x in self.args):
return False
def _eval_is_extended_positive(self):
"""Return True if self is positive, False if not, and None if it
cannot be determined.
This algorithm is non-recursive and works by keeping track of the
sign which changes when a negative or nonpositive is encountered.
Whether a nonpositive or nonnegative is seen is also tracked since
the presence of these makes it impossible to return True, but
possible to return False if the end result is nonpositive. e.g.
pos * neg * nonpositive -> pos or zero -> None is returned
pos * neg * nonnegative -> neg or zero -> False is returned
"""
return self._eval_pos_neg(1)
def _eval_pos_neg(self, sign):
saw_NON = saw_NOT = False
for t in self.args:
if t.is_extended_positive:
continue
elif t.is_extended_negative:
sign = -sign
elif t.is_zero:
if all(a.is_finite for a in self.args):
return False
return
elif t.is_extended_nonpositive:
sign = -sign
saw_NON = True
elif t.is_extended_nonnegative:
saw_NON = True
# FIXME: is_positive/is_negative is False doesn't take account of
# Symbol('x', infinite=True, extended_real=True) which has
# e.g. is_positive is False but has uncertain sign.
elif t.is_positive is False:
sign = -sign
if saw_NOT:
return
saw_NOT = True
elif t.is_negative is False:
if saw_NOT:
return
saw_NOT = True
else:
return
if sign == 1 and saw_NON is False and saw_NOT is False:
return True
if sign < 0:
return False
def _eval_is_extended_negative(self):
return self._eval_pos_neg(-1)
def _eval_is_odd(self):
is_integer = self.is_integer
if is_integer:
r, acc = True, 1
for t in self.args:
if not t.is_integer:
return None
elif t.is_even:
r = False
elif t.is_integer:
if r is False:
pass
elif acc != 1 and (acc + t).is_odd:
r = False
elif t.is_odd is None:
r = None
acc = t
return r
# !integer -> !odd
elif is_integer is False:
return False
def _eval_is_even(self):
is_integer = self.is_integer
if is_integer:
return fuzzy_not(self.is_odd)
elif is_integer is False:
return False
def _eval_is_composite(self):
"""
Here we count the number of arguments that have a minimum value
greater than two.
If there are more than one of such a symbol then the result is composite.
Else, the result cannot be determined.
"""
number_of_args = 0 # count of symbols with minimum value greater than one
for arg in self.args:
if not (arg.is_integer and arg.is_positive):
return None
if (arg-1).is_positive:
number_of_args += 1
if number_of_args > 1:
return True
def _eval_subs(self, old, new):
from sympy.functions.elementary.complexes import sign
from sympy.ntheory.factor_ import multiplicity
from sympy.simplify.powsimp import powdenest
from sympy.simplify.radsimp import fraction
if not old.is_Mul:
return None
# try keep replacement literal so -2*x doesn't replace 4*x
if old.args[0].is_Number and old.args[0] < 0:
if self.args[0].is_Number:
if self.args[0] < 0:
return self._subs(-old, -new)
return None
def base_exp(a):
# if I and -1 are in a Mul, they get both end up with
# a -1 base (see issue 6421); all we want here are the
# true Pow or exp separated into base and exponent
from sympy import exp
if a.is_Pow or isinstance(a, exp):
return a.as_base_exp()
return a, S.One
def breakup(eq):
"""break up powers of eq when treated as a Mul:
b**(Rational*e) -> b**e, Rational
commutatives come back as a dictionary {b**e: Rational}
noncommutatives come back as a list [(b**e, Rational)]
"""
(c, nc) = (defaultdict(int), list())
for a in Mul.make_args(eq):
a = powdenest(a)
(b, e) = base_exp(a)
if e is not S.One:
(co, _) = e.as_coeff_mul()
b = Pow(b, e/co)
e = co
if a.is_commutative:
c[b] += e
else:
nc.append([b, e])
return (c, nc)
def rejoin(b, co):
"""
Put rational back with exponent; in general this is not ok, but
since we took it from the exponent for analysis, it's ok to put
it back.
"""
(b, e) = base_exp(b)
return Pow(b, e*co)
def ndiv(a, b):
"""if b divides a in an extractive way (like 1/4 divides 1/2
but not vice versa, and 2/5 does not divide 1/3) then return
the integer number of times it divides, else return 0.
"""
if not b.q % a.q or not a.q % b.q:
return int(a/b)
return 0
# give Muls in the denominator a chance to be changed (see issue 5651)
# rv will be the default return value
rv = None
n, d = fraction(self)
self2 = self
if d is not S.One:
self2 = n._subs(old, new)/d._subs(old, new)
if not self2.is_Mul:
return self2._subs(old, new)
if self2 != self:
rv = self2
# Now continue with regular substitution.
# handle the leading coefficient and use it to decide if anything
# should even be started; we always know where to find the Rational
# so it's a quick test
co_self = self2.args[0]
co_old = old.args[0]
co_xmul = None
if co_old.is_Rational and co_self.is_Rational:
# if coeffs are the same there will be no updating to do
# below after breakup() step; so skip (and keep co_xmul=None)
if co_old != co_self:
co_xmul = co_self.extract_multiplicatively(co_old)
elif co_old.is_Rational:
return rv
# break self and old into factors
(c, nc) = breakup(self2)
(old_c, old_nc) = breakup(old)
# update the coefficients if we had an extraction
# e.g. if co_self were 2*(3/35*x)**2 and co_old = 3/5
# then co_self in c is replaced by (3/5)**2 and co_residual
# is 2*(1/7)**2
if co_xmul and co_xmul.is_Rational and abs(co_old) != 1:
mult = S(multiplicity(abs(co_old), co_self))
c.pop(co_self)
if co_old in c:
c[co_old] += mult
else:
c[co_old] = mult
co_residual = co_self/co_old**mult
else:
co_residual = 1
# do quick tests to see if we can't succeed
ok = True
if len(old_nc) > len(nc):
# more non-commutative terms
ok = False
elif len(old_c) > len(c):
# more commutative terms
ok = False
elif {i[0] for i in old_nc}.difference({i[0] for i in nc}):
# unmatched non-commutative bases
ok = False
elif set(old_c).difference(set(c)):
# unmatched commutative terms
ok = False
elif any(sign(c[b]) != sign(old_c[b]) for b in old_c):
# differences in sign
ok = False
if not ok:
return rv
if not old_c:
cdid = None
else:
rat = []
for (b, old_e) in old_c.items():
c_e = c[b]
rat.append(ndiv(c_e, old_e))
if not rat[-1]:
return rv
cdid = min(rat)
if not old_nc:
ncdid = None
for i in range(len(nc)):
nc[i] = rejoin(*nc[i])
else:
ncdid = 0 # number of nc replacements we did
take = len(old_nc) # how much to look at each time
limit = cdid or S.Infinity # max number that we can take
failed = [] # failed terms will need subs if other terms pass
i = 0
while limit and i + take <= len(nc):
hit = False
# the bases must be equivalent in succession, and
# the powers must be extractively compatible on the
# first and last factor but equal in between.
rat = []
for j in range(take):
if nc[i + j][0] != old_nc[j][0]:
break
elif j == 0:
rat.append(ndiv(nc[i + j][1], old_nc[j][1]))
elif j == take - 1:
rat.append(ndiv(nc[i + j][1], old_nc[j][1]))
elif nc[i + j][1] != old_nc[j][1]:
break
else:
rat.append(1)
j += 1
else:
ndo = min(rat)
if ndo:
if take == 1:
if cdid:
ndo = min(cdid, ndo)
nc[i] = Pow(new, ndo)*rejoin(nc[i][0],
nc[i][1] - ndo*old_nc[0][1])
else:
ndo = 1
# the left residual
l = rejoin(nc[i][0], nc[i][1] - ndo*
old_nc[0][1])
# eliminate all middle terms
mid = new
# the right residual (which may be the same as the middle if take == 2)
ir = i + take - 1
r = (nc[ir][0], nc[ir][1] - ndo*
old_nc[-1][1])
if r[1]:
if i + take < len(nc):
nc[i:i + take] = [l*mid, r]
else:
r = rejoin(*r)
nc[i:i + take] = [l*mid*r]
else:
# there was nothing left on the right
nc[i:i + take] = [l*mid]
limit -= ndo
ncdid += ndo
hit = True
if not hit:
# do the subs on this failing factor
failed.append(i)
i += 1
else:
if not ncdid:
return rv
# although we didn't fail, certain nc terms may have
# failed so we rebuild them after attempting a partial
# subs on them
failed.extend(range(i, len(nc)))
for i in failed:
nc[i] = rejoin(*nc[i]).subs(old, new)
# rebuild the expression
if cdid is None:
do = ncdid
elif ncdid is None:
do = cdid
else:
do = min(ncdid, cdid)
margs = []
for b in c:
if b in old_c:
# calculate the new exponent
e = c[b] - old_c[b]*do
margs.append(rejoin(b, e))
else:
margs.append(rejoin(b.subs(old, new), c[b]))
if cdid and not ncdid:
# in case we are replacing commutative with non-commutative,
# we want the new term to come at the front just like the
# rest of this routine
margs = [Pow(new, cdid)] + margs
return co_residual*self2.func(*margs)*self2.func(*nc)
def _eval_nseries(self, x, n, logx, cdir=0):
from sympy import Mul, Order, ceiling, powsimp
from itertools import product
def coeff_exp(term, x):
coeff, exp = S.One, S.Zero
for factor in Mul.make_args(term):
if factor.has(x):
base, exp = factor.as_base_exp()
if base != x:
try:
return term.leadterm(x)
except ValueError:
return term, S.Zero
else:
coeff *= factor
return coeff, exp
ords = []
try:
for t in self.args:
coeff, exp = t.leadterm(x)
if not coeff.has(x):
ords.append((t, exp))
else:
raise ValueError
n0 = sum(t[1] for t in ords)
facs = []
for t, m in ords:
n1 = ceiling(n - n0 + m)
s = t.nseries(x, n=n1, logx=logx, cdir=cdir)
ns = s.getn()
if ns is not None:
if ns < n1: # less than expected
n -= n1 - ns # reduce n
facs.append(s.removeO())
except (ValueError, NotImplementedError, TypeError, AttributeError):
facs = [t.nseries(x, n=n, logx=logx, cdir=cdir) for t in self.args]
res = powsimp(self.func(*facs).expand(), combine='exp', deep=True)
if res.has(Order):
res += Order(x**n, x)
return res
res = 0
ords2 = [Add.make_args(factor) for factor in facs]
for fac in product(*ords2):
ords3 = [coeff_exp(term, x) for term in fac]
coeffs, powers = zip(*ords3)
power = sum(powers)
if power < n:
res += Mul(*coeffs)*(x**power)
if (res - self).expand() is not S.Zero:
res += Order(x**n, x)
return res
def _eval_as_leading_term(self, x, cdir=0):
return self.func(*[t.as_leading_term(x, cdir=cdir) for t in self.args])
def _eval_conjugate(self):
return self.func(*[t.conjugate() for t in self.args])
def _eval_transpose(self):
return self.func(*[t.transpose() for t in self.args[::-1]])
def _eval_adjoint(self):
return self.func(*[t.adjoint() for t in self.args[::-1]])
def _sage_(self):
s = 1
for x in self.args:
s *= x._sage_()
return s
def as_content_primitive(self, radical=False, clear=True):
"""Return the tuple (R, self/R) where R is the positive Rational
extracted from self.
Examples
========
>>> from sympy import sqrt
>>> (-3*sqrt(2)*(2 - 2*sqrt(2))).as_content_primitive()
(6, -sqrt(2)*(1 - sqrt(2)))
See docstring of Expr.as_content_primitive for more examples.
"""
coef = S.One
args = []
for i, a in enumerate(self.args):
c, p = a.as_content_primitive(radical=radical, clear=clear)
coef *= c
if p is not S.One:
args.append(p)
# don't use self._from_args here to reconstruct args
# since there may be identical args now that should be combined
# e.g. (2+2*x)*(3+3*x) should be (6, (1 + x)**2) not (6, (1+x)*(1+x))
return coef, self.func(*args)
def as_ordered_factors(self, order=None):
"""Transform an expression into an ordered list of factors.
Examples
========
>>> from sympy import sin, cos
>>> from sympy.abc import x, y
>>> (2*x*y*sin(x)*cos(x)).as_ordered_factors()
[2, x, y, sin(x), cos(x)]
"""
cpart, ncpart = self.args_cnc()
cpart.sort(key=lambda expr: expr.sort_key(order=order))
return cpart + ncpart
@property
def _sorted_args(self):
return tuple(self.as_ordered_factors())
def prod(a, start=1):
"""Return product of elements of a. Start with int 1 so if only
ints are included then an int result is returned.
Examples
========
>>> from sympy import prod, S
>>> prod(range(3))
0
>>> type(_) is int
True
>>> prod([S(2), 3])
6
>>> _.is_Integer
True
You can start the product at something other than 1:
>>> prod([1, 2], 3)
6
"""
return reduce(operator.mul, a, start)
def _keep_coeff(coeff, factors, clear=True, sign=False):
"""Return ``coeff*factors`` unevaluated if necessary.
If ``clear`` is False, do not keep the coefficient as a factor
if it can be distributed on a single factor such that one or
more terms will still have integer coefficients.
If ``sign`` is True, allow a coefficient of -1 to remain factored out.
Examples
========
>>> from sympy.core.mul import _keep_coeff
>>> from sympy.abc import x, y
>>> from sympy import S
>>> _keep_coeff(S.Half, x + 2)
(x + 2)/2
>>> _keep_coeff(S.Half, x + 2, clear=False)
x/2 + 1
>>> _keep_coeff(S.Half, (x + 2)*y, clear=False)
y*(x + 2)/2
>>> _keep_coeff(S(-1), x + y)
-x - y
>>> _keep_coeff(S(-1), x + y, sign=True)
-(x + y)
"""
if not coeff.is_Number:
if factors.is_Number:
factors, coeff = coeff, factors
else:
return coeff*factors
if coeff is S.One:
return factors
elif coeff is S.NegativeOne and not sign:
return -factors
elif factors.is_Add:
if not clear and coeff.is_Rational and coeff.q != 1:
q = S(coeff.q)
for i in factors.args:
c, t = i.as_coeff_Mul()
r = c/q
if r == int(r):
return coeff*factors
return Mul(coeff, factors, evaluate=False)
elif factors.is_Mul:
margs = list(factors.args)
if margs[0].is_Number:
margs[0] *= coeff
if margs[0] == 1:
margs.pop(0)
else:
margs.insert(0, coeff)
return Mul._from_args(margs)
else:
return coeff*factors
def expand_2arg(e):
from sympy.simplify.simplify import bottom_up
def do(e):
if e.is_Mul:
c, r = e.as_coeff_Mul()
if c.is_Number and r.is_Add:
return _unevaluated_Add(*[c*ri for ri in r.args])
return e
return bottom_up(e, do)
from .numbers import Rational
from .power import Pow
from .add import Add, _addsort, _unevaluated_Add
|
ad4be7df0e91f07f39df0fe031a5d698fd6d6dd20373f8fe78087747dccc6b4f
|
"""Tools for setting up printing in interactive sessions. """
import sys
from distutils.version import LooseVersion as V
from io import BytesIO
from sympy import latex as default_latex
from sympy import preview
from sympy.utilities.misc import debug
from sympy.printing.defaults import Printable
def _init_python_printing(stringify_func, **settings):
"""Setup printing in Python interactive session. """
import sys
from sympy.core.compatibility import builtins
def _displayhook(arg):
"""Python's pretty-printer display hook.
This function was adapted from:
http://www.python.org/dev/peps/pep-0217/
"""
if arg is not None:
builtins._ = None
print(stringify_func(arg, **settings))
builtins._ = arg
sys.displayhook = _displayhook
def _init_ipython_printing(ip, stringify_func, use_latex, euler, forecolor,
backcolor, fontsize, latex_mode, print_builtin,
latex_printer, scale, **settings):
"""Setup printing in IPython interactive session. """
try:
from IPython.lib.latextools import latex_to_png
except ImportError:
pass
# Guess best font color if none was given based on the ip.colors string.
# From the IPython documentation:
# It has four case-insensitive values: 'nocolor', 'neutral', 'linux',
# 'lightbg'. The default is neutral, which should be legible on either
# dark or light terminal backgrounds. linux is optimised for dark
# backgrounds and lightbg for light ones.
if forecolor is None:
color = ip.colors.lower()
if color == 'lightbg':
forecolor = 'Black'
elif color == 'linux':
forecolor = 'White'
else:
# No idea, go with gray.
forecolor = 'Gray'
debug("init_printing: Automatic foreground color:", forecolor)
preamble = "\\documentclass[varwidth,%s]{standalone}\n" \
"\\usepackage{amsmath,amsfonts}%s\\begin{document}"
if euler:
addpackages = '\\usepackage{euler}'
else:
addpackages = ''
if use_latex == "svg":
addpackages = addpackages + "\n\\special{color %s}" % forecolor
preamble = preamble % (fontsize, addpackages)
imagesize = 'tight'
offset = "0cm,0cm"
resolution = round(150*scale)
dvi = r"-T %s -D %d -bg %s -fg %s -O %s" % (
imagesize, resolution, backcolor, forecolor, offset)
dvioptions = dvi.split()
svg_scale = 150/72*scale
dvioptions_svg = ["--no-fonts", "--scale={}".format(svg_scale)]
debug("init_printing: DVIOPTIONS:", dvioptions)
debug("init_printing: DVIOPTIONS_SVG:", dvioptions_svg)
debug("init_printing: PREAMBLE:", preamble)
latex = latex_printer or default_latex
def _print_plain(arg, p, cycle):
"""caller for pretty, for use in IPython 0.11"""
if _can_print(arg):
p.text(stringify_func(arg))
else:
p.text(IPython.lib.pretty.pretty(arg))
def _preview_wrapper(o):
exprbuffer = BytesIO()
try:
preview(o, output='png', viewer='BytesIO',
outputbuffer=exprbuffer, preamble=preamble,
dvioptions=dvioptions)
except Exception as e:
# IPython swallows exceptions
debug("png printing:", "_preview_wrapper exception raised:",
repr(e))
raise
return exprbuffer.getvalue()
def _svg_wrapper(o):
exprbuffer = BytesIO()
try:
preview(o, output='svg', viewer='BytesIO',
outputbuffer=exprbuffer, preamble=preamble,
dvioptions=dvioptions_svg)
except Exception as e:
# IPython swallows exceptions
debug("svg printing:", "_preview_wrapper exception raised:",
repr(e))
raise
return exprbuffer.getvalue().decode('utf-8')
def _matplotlib_wrapper(o):
# mathtext does not understand certain latex flags, so we try to
# replace them with suitable subs
o = o.replace(r'\operatorname', '')
o = o.replace(r'\overline', r'\bar')
# mathtext can't render some LaTeX commands. For example, it can't
# render any LaTeX environments such as array or matrix. So here we
# ensure that if mathtext fails to render, we return None.
try:
try:
return latex_to_png(o, color=forecolor, scale=scale)
except TypeError: # Old IPython version without color and scale
return latex_to_png(o)
except ValueError as e:
debug('matplotlib exception caught:', repr(e))
return None
# Hook methods for builtin sympy printers
printing_hooks = ('_latex', '_sympystr', '_pretty', '_sympyrepr')
def _can_print(o):
"""Return True if type o can be printed with one of the sympy printers.
If o is a container type, this is True if and only if every element of
o can be printed in this way.
"""
try:
# If you're adding another type, make sure you add it to printable_types
# later in this file as well
builtin_types = (list, tuple, set, frozenset)
if isinstance(o, builtin_types):
# If the object is a custom subclass with a custom str or
# repr, use that instead.
if (type(o).__str__ not in (i.__str__ for i in builtin_types) or
type(o).__repr__ not in (i.__repr__ for i in builtin_types)):
return False
return all(_can_print(i) for i in o)
elif isinstance(o, dict):
return all(_can_print(i) and _can_print(o[i]) for i in o)
elif isinstance(o, bool):
return False
elif isinstance(o, Printable):
# types known to sympy
return True
elif any(hasattr(o, hook) for hook in printing_hooks):
# types which add support themselves
return True
elif isinstance(o, (float, int)) and print_builtin:
return True
return False
except RuntimeError:
return False
# This is in case maximum recursion depth is reached.
# Since RecursionError is for versions of Python 3.5+
# so this is to guard against RecursionError for older versions.
def _print_latex_png(o):
"""
A function that returns a png rendered by an external latex
distribution, falling back to matplotlib rendering
"""
if _can_print(o):
s = latex(o, mode=latex_mode, **settings)
if latex_mode == 'plain':
s = '$\\displaystyle %s$' % s
try:
return _preview_wrapper(s)
except RuntimeError as e:
debug('preview failed with:', repr(e),
' Falling back to matplotlib backend')
if latex_mode != 'inline':
s = latex(o, mode='inline', **settings)
return _matplotlib_wrapper(s)
def _print_latex_svg(o):
"""
A function that returns a svg rendered by an external latex
distribution, no fallback available.
"""
if _can_print(o):
s = latex(o, mode=latex_mode, **settings)
if latex_mode == 'plain':
s = '$\\displaystyle %s$' % s
try:
return _svg_wrapper(s)
except RuntimeError as e:
debug('preview failed with:', repr(e),
' No fallback available.')
def _print_latex_matplotlib(o):
"""
A function that returns a png rendered by mathtext
"""
if _can_print(o):
s = latex(o, mode='inline', **settings)
return _matplotlib_wrapper(s)
def _print_latex_text(o):
"""
A function to generate the latex representation of sympy expressions.
"""
if _can_print(o):
s = latex(o, mode=latex_mode, **settings)
if latex_mode == 'plain':
return '$\\displaystyle %s$' % s
return s
def _result_display(self, arg):
"""IPython's pretty-printer display hook, for use in IPython 0.10
This function was adapted from:
ipython/IPython/hooks.py:155
"""
if self.rc.pprint:
out = stringify_func(arg)
if '\n' in out:
print
print(out)
else:
print(repr(arg))
import IPython
if V(IPython.__version__) >= '0.11':
printable_types = [Printable, float, tuple, list, set,
frozenset, dict, int]
plaintext_formatter = ip.display_formatter.formatters['text/plain']
for cls in printable_types:
plaintext_formatter.for_type(cls, _print_plain)
svg_formatter = ip.display_formatter.formatters['image/svg+xml']
if use_latex in ('svg', ):
debug("init_printing: using svg formatter")
for cls in printable_types:
svg_formatter.for_type(cls, _print_latex_svg)
else:
debug("init_printing: not using any svg formatter")
for cls in printable_types:
# Better way to set this, but currently does not work in IPython
#png_formatter.for_type(cls, None)
if cls in svg_formatter.type_printers:
svg_formatter.type_printers.pop(cls)
png_formatter = ip.display_formatter.formatters['image/png']
if use_latex in (True, 'png'):
debug("init_printing: using png formatter")
for cls in printable_types:
png_formatter.for_type(cls, _print_latex_png)
elif use_latex == 'matplotlib':
debug("init_printing: using matplotlib formatter")
for cls in printable_types:
png_formatter.for_type(cls, _print_latex_matplotlib)
else:
debug("init_printing: not using any png formatter")
for cls in printable_types:
# Better way to set this, but currently does not work in IPython
#png_formatter.for_type(cls, None)
if cls in png_formatter.type_printers:
png_formatter.type_printers.pop(cls)
latex_formatter = ip.display_formatter.formatters['text/latex']
if use_latex in (True, 'mathjax'):
debug("init_printing: using mathjax formatter")
for cls in printable_types:
latex_formatter.for_type(cls, _print_latex_text)
Printable._repr_latex_ = Printable._repr_latex_orig
else:
debug("init_printing: not using text/latex formatter")
for cls in printable_types:
# Better way to set this, but currently does not work in IPython
#latex_formatter.for_type(cls, None)
if cls in latex_formatter.type_printers:
latex_formatter.type_printers.pop(cls)
Printable._repr_latex_ = None
else:
ip.set_hook('result_display', _result_display)
def _is_ipython(shell):
"""Is a shell instance an IPython shell?"""
# shortcut, so we don't import IPython if we don't have to
if 'IPython' not in sys.modules:
return False
try:
from IPython.core.interactiveshell import InteractiveShell
except ImportError:
# IPython < 0.11
try:
from IPython.iplib import InteractiveShell
except ImportError:
# Reaching this points means IPython has changed in a backward-incompatible way
# that we don't know about. Warn?
return False
return isinstance(shell, InteractiveShell)
# Used by the doctester to override the default for no_global
NO_GLOBAL = False
def init_printing(pretty_print=True, order=None, use_unicode=None,
use_latex=None, wrap_line=None, num_columns=None,
no_global=False, ip=None, euler=False, forecolor=None,
backcolor='Transparent', fontsize='10pt',
latex_mode='plain', print_builtin=True,
str_printer=None, pretty_printer=None,
latex_printer=None, scale=1.0, **settings):
r"""
Initializes pretty-printer depending on the environment.
Parameters
==========
pretty_print : boolean, default=True
If True, use pretty_print to stringify or the provided pretty
printer; if False, use sstrrepr to stringify or the provided string
printer.
order : string or None, default='lex'
There are a few different settings for this parameter:
lex (default), which is lexographic order;
grlex, which is graded lexographic order;
grevlex, which is reversed graded lexographic order;
old, which is used for compatibility reasons and for long expressions;
None, which sets it to lex.
use_unicode : boolean or None, default=None
If True, use unicode characters;
if False, do not use unicode characters;
if None, make a guess based on the environment.
use_latex : string, boolean, or None, default=None
If True, use default LaTeX rendering in GUI interfaces (png and
mathjax);
if False, do not use LaTeX rendering;
if None, make a guess based on the environment;
if 'png', enable latex rendering with an external latex compiler,
falling back to matplotlib if external compilation fails;
if 'matplotlib', enable LaTeX rendering with matplotlib;
if 'mathjax', enable LaTeX text generation, for example MathJax
rendering in IPython notebook or text rendering in LaTeX documents;
if 'svg', enable LaTeX rendering with an external latex compiler,
no fallback
wrap_line : boolean
If True, lines will wrap at the end; if False, they will not wrap
but continue as one line. This is only relevant if ``pretty_print`` is
True.
num_columns : int or None, default=None
If int, number of columns before wrapping is set to num_columns; if
None, number of columns before wrapping is set to terminal width.
This is only relevant if ``pretty_print`` is True.
no_global : boolean, default=False
If True, the settings become system wide;
if False, use just for this console/session.
ip : An interactive console
This can either be an instance of IPython,
or a class that derives from code.InteractiveConsole.
euler : boolean, optional, default=False
Loads the euler package in the LaTeX preamble for handwritten style
fonts (http://www.ctan.org/pkg/euler).
forecolor : string or None, optional, default=None
DVI setting for foreground color. None means that either 'Black',
'White', or 'Gray' will be selected based on a guess of the IPython
terminal color setting. See notes.
backcolor : string, optional, default='Transparent'
DVI setting for background color. See notes.
fontsize : string, optional, default='10pt'
A font size to pass to the LaTeX documentclass function in the
preamble. Note that the options are limited by the documentclass.
Consider using scale instead.
latex_mode : string, optional, default='plain'
The mode used in the LaTeX printer. Can be one of:
{'inline'|'plain'|'equation'|'equation*'}.
print_builtin : boolean, optional, default=True
If ``True`` then floats and integers will be printed. If ``False`` the
printer will only print SymPy types.
str_printer : function, optional, default=None
A custom string printer function. This should mimic
sympy.printing.sstrrepr().
pretty_printer : function, optional, default=None
A custom pretty printer. This should mimic sympy.printing.pretty().
latex_printer : function, optional, default=None
A custom LaTeX printer. This should mimic sympy.printing.latex().
scale : float, optional, default=1.0
Scale the LaTeX output when using the ``png`` or ``svg`` backends.
Useful for high dpi screens.
settings :
Any additional settings for the ``latex`` and ``pretty`` commands can
be used to fine-tune the output.
Examples
========
>>> from sympy.interactive import init_printing
>>> from sympy import Symbol, sqrt
>>> from sympy.abc import x, y
>>> sqrt(5)
sqrt(5)
>>> init_printing(pretty_print=True) # doctest: +SKIP
>>> sqrt(5) # doctest: +SKIP
___
\/ 5
>>> theta = Symbol('theta') # doctest: +SKIP
>>> init_printing(use_unicode=True) # doctest: +SKIP
>>> theta # doctest: +SKIP
\u03b8
>>> init_printing(use_unicode=False) # doctest: +SKIP
>>> theta # doctest: +SKIP
theta
>>> init_printing(order='lex') # doctest: +SKIP
>>> str(y + x + y**2 + x**2) # doctest: +SKIP
x**2 + x + y**2 + y
>>> init_printing(order='grlex') # doctest: +SKIP
>>> str(y + x + y**2 + x**2) # doctest: +SKIP
x**2 + x + y**2 + y
>>> init_printing(order='grevlex') # doctest: +SKIP
>>> str(y * x**2 + x * y**2) # doctest: +SKIP
x**2*y + x*y**2
>>> init_printing(order='old') # doctest: +SKIP
>>> str(x**2 + y**2 + x + y) # doctest: +SKIP
x**2 + x + y**2 + y
>>> init_printing(num_columns=10) # doctest: +SKIP
>>> x**2 + x + y**2 + y # doctest: +SKIP
x + y +
x**2 + y**2
Notes
=====
The foreground and background colors can be selected when using 'png' or
'svg' LaTeX rendering. Note that before the ``init_printing`` command is
executed, the LaTeX rendering is handled by the IPython console and not SymPy.
The colors can be selected among the 68 standard colors known to ``dvips``,
for a list see [1]_. In addition, the background color can be
set to 'Transparent' (which is the default value).
When using the 'Auto' foreground color, the guess is based on the
``colors`` variable in the IPython console, see [2]_. Hence, if
that variable is set correctly in your IPython console, there is a high
chance that the output will be readable, although manual settings may be
needed.
References
==========
.. [1] https://en.wikibooks.org/wiki/LaTeX/Colors#The_68_standard_colors_known_to_dvips
.. [2] https://ipython.readthedocs.io/en/stable/config/details.html#terminal-colors
See Also
========
sympy.printing.latex
sympy.printing.pretty
"""
import sys
from sympy.printing.printer import Printer
if pretty_print:
if pretty_printer is not None:
stringify_func = pretty_printer
else:
from sympy.printing import pretty as stringify_func
else:
if str_printer is not None:
stringify_func = str_printer
else:
from sympy.printing import sstrrepr as stringify_func
# Even if ip is not passed, double check that not in IPython shell
in_ipython = False
if ip is None:
try:
ip = get_ipython()
except NameError:
pass
else:
in_ipython = (ip is not None)
if ip and not in_ipython:
in_ipython = _is_ipython(ip)
if in_ipython and pretty_print:
try:
import IPython
# IPython 1.0 deprecates the frontend module, so we import directly
# from the terminal module to prevent a deprecation message from being
# shown.
if V(IPython.__version__) >= '1.0':
from IPython.terminal.interactiveshell import TerminalInteractiveShell
else:
from IPython.frontend.terminal.interactiveshell import TerminalInteractiveShell
from code import InteractiveConsole
except ImportError:
pass
else:
# This will be True if we are in the qtconsole or notebook
if not isinstance(ip, (InteractiveConsole, TerminalInteractiveShell)) \
and 'ipython-console' not in ''.join(sys.argv):
if use_unicode is None:
debug("init_printing: Setting use_unicode to True")
use_unicode = True
if use_latex is None:
debug("init_printing: Setting use_latex to True")
use_latex = True
if not NO_GLOBAL and not no_global:
Printer.set_global_settings(order=order, use_unicode=use_unicode,
wrap_line=wrap_line, num_columns=num_columns)
else:
_stringify_func = stringify_func
if pretty_print:
stringify_func = lambda expr, **settings: \
_stringify_func(expr, order=order,
use_unicode=use_unicode,
wrap_line=wrap_line,
num_columns=num_columns,
**settings)
else:
stringify_func = \
lambda expr, **settings: _stringify_func(
expr, order=order, **settings)
if in_ipython:
mode_in_settings = settings.pop("mode", None)
if mode_in_settings:
debug("init_printing: Mode is not able to be set due to internals"
"of IPython printing")
_init_ipython_printing(ip, stringify_func, use_latex, euler,
forecolor, backcolor, fontsize, latex_mode,
print_builtin, latex_printer, scale,
**settings)
else:
_init_python_printing(stringify_func, **settings)
|
2db6100cf411cc827b97e06cc56c7f3e935c176d57678f2c01596b8148771cc0
|
"""Advanced tools for dense recursive polynomials in ``K[x]`` or ``K[X]``. """
from __future__ import print_function, division
from sympy.polys.densearith import (
dup_add_term, dmp_add_term,
dup_lshift,
dup_add, dmp_add,
dup_sub, dmp_sub,
dup_mul, dmp_mul,
dup_sqr,
dup_div,
dup_rem, dmp_rem,
dmp_expand,
dup_mul_ground, dmp_mul_ground,
dup_quo_ground, dmp_quo_ground,
dup_exquo_ground, dmp_exquo_ground,
)
from sympy.polys.densebasic import (
dup_strip, dmp_strip,
dup_convert, dmp_convert,
dup_degree, dmp_degree,
dmp_to_dict,
dmp_from_dict,
dup_LC, dmp_LC, dmp_ground_LC,
dup_TC, dmp_TC,
dmp_zero, dmp_ground,
dmp_zero_p,
dup_to_raw_dict, dup_from_raw_dict,
dmp_zeros
)
from sympy.polys.polyerrors import (
MultivariatePolynomialError,
DomainError
)
from sympy.utilities import variations
from math import ceil as _ceil, log as _log
def dup_integrate(f, m, K):
"""
Computes the indefinite integral of ``f`` in ``K[x]``.
Examples
========
>>> from sympy.polys import ring, QQ
>>> R, x = ring("x", QQ)
>>> R.dup_integrate(x**2 + 2*x, 1)
1/3*x**3 + x**2
>>> R.dup_integrate(x**2 + 2*x, 2)
1/12*x**4 + 1/3*x**3
"""
if m <= 0 or not f:
return f
g = [K.zero]*m
for i, c in enumerate(reversed(f)):
n = i + 1
for j in range(1, m):
n *= i + j + 1
g.insert(0, K.exquo(c, K(n)))
return g
def dmp_integrate(f, m, u, K):
"""
Computes the indefinite integral of ``f`` in ``x_0`` in ``K[X]``.
Examples
========
>>> from sympy.polys import ring, QQ
>>> R, x,y = ring("x,y", QQ)
>>> R.dmp_integrate(x + 2*y, 1)
1/2*x**2 + 2*x*y
>>> R.dmp_integrate(x + 2*y, 2)
1/6*x**3 + x**2*y
"""
if not u:
return dup_integrate(f, m, K)
if m <= 0 or dmp_zero_p(f, u):
return f
g, v = dmp_zeros(m, u - 1, K), u - 1
for i, c in enumerate(reversed(f)):
n = i + 1
for j in range(1, m):
n *= i + j + 1
g.insert(0, dmp_quo_ground(c, K(n), v, K))
return g
def _rec_integrate_in(g, m, v, i, j, K):
"""Recursive helper for :func:`dmp_integrate_in`."""
if i == j:
return dmp_integrate(g, m, v, K)
w, i = v - 1, i + 1
return dmp_strip([ _rec_integrate_in(c, m, w, i, j, K) for c in g ], v)
def dmp_integrate_in(f, m, j, u, K):
"""
Computes the indefinite integral of ``f`` in ``x_j`` in ``K[X]``.
Examples
========
>>> from sympy.polys import ring, QQ
>>> R, x,y = ring("x,y", QQ)
>>> R.dmp_integrate_in(x + 2*y, 1, 0)
1/2*x**2 + 2*x*y
>>> R.dmp_integrate_in(x + 2*y, 1, 1)
x*y + y**2
"""
if j < 0 or j > u:
raise IndexError("0 <= j <= u expected, got u = %d, j = %d" % (u, j))
return _rec_integrate_in(f, m, u, 0, j, K)
def dup_diff(f, m, K):
"""
``m``-th order derivative of a polynomial in ``K[x]``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x = ring("x", ZZ)
>>> R.dup_diff(x**3 + 2*x**2 + 3*x + 4, 1)
3*x**2 + 4*x + 3
>>> R.dup_diff(x**3 + 2*x**2 + 3*x + 4, 2)
6*x + 4
"""
if m <= 0:
return f
n = dup_degree(f)
if n < m:
return []
deriv = []
if m == 1:
for coeff in f[:-m]:
deriv.append(K(n)*coeff)
n -= 1
else:
for coeff in f[:-m]:
k = n
for i in range(n - 1, n - m, -1):
k *= i
deriv.append(K(k)*coeff)
n -= 1
return dup_strip(deriv)
def dmp_diff(f, m, u, K):
"""
``m``-th order derivative in ``x_0`` of a polynomial in ``K[X]``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x,y = ring("x,y", ZZ)
>>> f = x*y**2 + 2*x*y + 3*x + 2*y**2 + 3*y + 1
>>> R.dmp_diff(f, 1)
y**2 + 2*y + 3
>>> R.dmp_diff(f, 2)
0
"""
if not u:
return dup_diff(f, m, K)
if m <= 0:
return f
n = dmp_degree(f, u)
if n < m:
return dmp_zero(u)
deriv, v = [], u - 1
if m == 1:
for coeff in f[:-m]:
deriv.append(dmp_mul_ground(coeff, K(n), v, K))
n -= 1
else:
for coeff in f[:-m]:
k = n
for i in range(n - 1, n - m, -1):
k *= i
deriv.append(dmp_mul_ground(coeff, K(k), v, K))
n -= 1
return dmp_strip(deriv, u)
def _rec_diff_in(g, m, v, i, j, K):
"""Recursive helper for :func:`dmp_diff_in`."""
if i == j:
return dmp_diff(g, m, v, K)
w, i = v - 1, i + 1
return dmp_strip([ _rec_diff_in(c, m, w, i, j, K) for c in g ], v)
def dmp_diff_in(f, m, j, u, K):
"""
``m``-th order derivative in ``x_j`` of a polynomial in ``K[X]``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x,y = ring("x,y", ZZ)
>>> f = x*y**2 + 2*x*y + 3*x + 2*y**2 + 3*y + 1
>>> R.dmp_diff_in(f, 1, 0)
y**2 + 2*y + 3
>>> R.dmp_diff_in(f, 1, 1)
2*x*y + 2*x + 4*y + 3
"""
if j < 0 or j > u:
raise IndexError("0 <= j <= %s expected, got %s" % (u, j))
return _rec_diff_in(f, m, u, 0, j, K)
def dup_eval(f, a, K):
"""
Evaluate a polynomial at ``x = a`` in ``K[x]`` using Horner scheme.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x = ring("x", ZZ)
>>> R.dup_eval(x**2 + 2*x + 3, 2)
11
"""
if not a:
return dup_TC(f, K)
result = K.zero
for c in f:
result *= a
result += c
return result
def dmp_eval(f, a, u, K):
"""
Evaluate a polynomial at ``x_0 = a`` in ``K[X]`` using the Horner scheme.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x,y = ring("x,y", ZZ)
>>> R.dmp_eval(2*x*y + 3*x + y + 2, 2)
5*y + 8
"""
if not u:
return dup_eval(f, a, K)
if not a:
return dmp_TC(f, K)
result, v = dmp_LC(f, K), u - 1
for coeff in f[1:]:
result = dmp_mul_ground(result, a, v, K)
result = dmp_add(result, coeff, v, K)
return result
def _rec_eval_in(g, a, v, i, j, K):
"""Recursive helper for :func:`dmp_eval_in`."""
if i == j:
return dmp_eval(g, a, v, K)
v, i = v - 1, i + 1
return dmp_strip([ _rec_eval_in(c, a, v, i, j, K) for c in g ], v)
def dmp_eval_in(f, a, j, u, K):
"""
Evaluate a polynomial at ``x_j = a`` in ``K[X]`` using the Horner scheme.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x,y = ring("x,y", ZZ)
>>> f = 2*x*y + 3*x + y + 2
>>> R.dmp_eval_in(f, 2, 0)
5*y + 8
>>> R.dmp_eval_in(f, 2, 1)
7*x + 4
"""
if j < 0 or j > u:
raise IndexError("0 <= j <= %s expected, got %s" % (u, j))
return _rec_eval_in(f, a, u, 0, j, K)
def _rec_eval_tail(g, i, A, u, K):
"""Recursive helper for :func:`dmp_eval_tail`."""
if i == u:
return dup_eval(g, A[-1], K)
else:
h = [ _rec_eval_tail(c, i + 1, A, u, K) for c in g ]
if i < u - len(A) + 1:
return h
else:
return dup_eval(h, A[-u + i - 1], K)
def dmp_eval_tail(f, A, u, K):
"""
Evaluate a polynomial at ``x_j = a_j, ...`` in ``K[X]``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x,y = ring("x,y", ZZ)
>>> f = 2*x*y + 3*x + y + 2
>>> R.dmp_eval_tail(f, [2])
7*x + 4
>>> R.dmp_eval_tail(f, [2, 2])
18
"""
if not A:
return f
if dmp_zero_p(f, u):
return dmp_zero(u - len(A))
e = _rec_eval_tail(f, 0, A, u, K)
if u == len(A) - 1:
return e
else:
return dmp_strip(e, u - len(A))
def _rec_diff_eval(g, m, a, v, i, j, K):
"""Recursive helper for :func:`dmp_diff_eval`."""
if i == j:
return dmp_eval(dmp_diff(g, m, v, K), a, v, K)
v, i = v - 1, i + 1
return dmp_strip([ _rec_diff_eval(c, m, a, v, i, j, K) for c in g ], v)
def dmp_diff_eval_in(f, m, a, j, u, K):
"""
Differentiate and evaluate a polynomial in ``x_j`` at ``a`` in ``K[X]``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x,y = ring("x,y", ZZ)
>>> f = x*y**2 + 2*x*y + 3*x + 2*y**2 + 3*y + 1
>>> R.dmp_diff_eval_in(f, 1, 2, 0)
y**2 + 2*y + 3
>>> R.dmp_diff_eval_in(f, 1, 2, 1)
6*x + 11
"""
if j > u:
raise IndexError("-%s <= j < %s expected, got %s" % (u, u, j))
if not j:
return dmp_eval(dmp_diff(f, m, u, K), a, u, K)
return _rec_diff_eval(f, m, a, u, 0, j, K)
def dup_trunc(f, p, K):
"""
Reduce a ``K[x]`` polynomial modulo a constant ``p`` in ``K``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x = ring("x", ZZ)
>>> R.dup_trunc(2*x**3 + 3*x**2 + 5*x + 7, ZZ(3))
-x**3 - x + 1
"""
if K.is_ZZ:
g = []
for c in f:
c = c % p
if c > p // 2:
g.append(c - p)
else:
g.append(c)
else:
g = [ c % p for c in f ]
return dup_strip(g)
def dmp_trunc(f, p, u, K):
"""
Reduce a ``K[X]`` polynomial modulo a polynomial ``p`` in ``K[Y]``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x,y = ring("x,y", ZZ)
>>> f = 3*x**2*y + 8*x**2 + 5*x*y + 6*x + 2*y + 3
>>> g = (y - 1).drop(x)
>>> R.dmp_trunc(f, g)
11*x**2 + 11*x + 5
"""
return dmp_strip([ dmp_rem(c, p, u - 1, K) for c in f ], u)
def dmp_ground_trunc(f, p, u, K):
"""
Reduce a ``K[X]`` polynomial modulo a constant ``p`` in ``K``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x,y = ring("x,y", ZZ)
>>> f = 3*x**2*y + 8*x**2 + 5*x*y + 6*x + 2*y + 3
>>> R.dmp_ground_trunc(f, ZZ(3))
-x**2 - x*y - y
"""
if not u:
return dup_trunc(f, p, K)
v = u - 1
return dmp_strip([ dmp_ground_trunc(c, p, v, K) for c in f ], u)
def dup_monic(f, K):
"""
Divide all coefficients by ``LC(f)`` in ``K[x]``.
Examples
========
>>> from sympy.polys import ring, ZZ, QQ
>>> R, x = ring("x", ZZ)
>>> R.dup_monic(3*x**2 + 6*x + 9)
x**2 + 2*x + 3
>>> R, x = ring("x", QQ)
>>> R.dup_monic(3*x**2 + 4*x + 2)
x**2 + 4/3*x + 2/3
"""
if not f:
return f
lc = dup_LC(f, K)
if K.is_one(lc):
return f
else:
return dup_exquo_ground(f, lc, K)
def dmp_ground_monic(f, u, K):
"""
Divide all coefficients by ``LC(f)`` in ``K[X]``.
Examples
========
>>> from sympy.polys import ring, ZZ, QQ
>>> R, x,y = ring("x,y", ZZ)
>>> f = 3*x**2*y + 6*x**2 + 3*x*y + 9*y + 3
>>> R.dmp_ground_monic(f)
x**2*y + 2*x**2 + x*y + 3*y + 1
>>> R, x,y = ring("x,y", QQ)
>>> f = 3*x**2*y + 8*x**2 + 5*x*y + 6*x + 2*y + 3
>>> R.dmp_ground_monic(f)
x**2*y + 8/3*x**2 + 5/3*x*y + 2*x + 2/3*y + 1
"""
if not u:
return dup_monic(f, K)
if dmp_zero_p(f, u):
return f
lc = dmp_ground_LC(f, u, K)
if K.is_one(lc):
return f
else:
return dmp_exquo_ground(f, lc, u, K)
def dup_content(f, K):
"""
Compute the GCD of coefficients of ``f`` in ``K[x]``.
Examples
========
>>> from sympy.polys import ring, ZZ, QQ
>>> R, x = ring("x", ZZ)
>>> f = 6*x**2 + 8*x + 12
>>> R.dup_content(f)
2
>>> R, x = ring("x", QQ)
>>> f = 6*x**2 + 8*x + 12
>>> R.dup_content(f)
2
"""
from sympy.polys.domains import QQ
if not f:
return K.zero
cont = K.zero
if K == QQ:
for c in f:
cont = K.gcd(cont, c)
else:
for c in f:
cont = K.gcd(cont, c)
if K.is_one(cont):
break
return cont
def dmp_ground_content(f, u, K):
"""
Compute the GCD of coefficients of ``f`` in ``K[X]``.
Examples
========
>>> from sympy.polys import ring, ZZ, QQ
>>> R, x,y = ring("x,y", ZZ)
>>> f = 2*x*y + 6*x + 4*y + 12
>>> R.dmp_ground_content(f)
2
>>> R, x,y = ring("x,y", QQ)
>>> f = 2*x*y + 6*x + 4*y + 12
>>> R.dmp_ground_content(f)
2
"""
from sympy.polys.domains import QQ
if not u:
return dup_content(f, K)
if dmp_zero_p(f, u):
return K.zero
cont, v = K.zero, u - 1
if K == QQ:
for c in f:
cont = K.gcd(cont, dmp_ground_content(c, v, K))
else:
for c in f:
cont = K.gcd(cont, dmp_ground_content(c, v, K))
if K.is_one(cont):
break
return cont
def dup_primitive(f, K):
"""
Compute content and the primitive form of ``f`` in ``K[x]``.
Examples
========
>>> from sympy.polys import ring, ZZ, QQ
>>> R, x = ring("x", ZZ)
>>> f = 6*x**2 + 8*x + 12
>>> R.dup_primitive(f)
(2, 3*x**2 + 4*x + 6)
>>> R, x = ring("x", QQ)
>>> f = 6*x**2 + 8*x + 12
>>> R.dup_primitive(f)
(2, 3*x**2 + 4*x + 6)
"""
if not f:
return K.zero, f
cont = dup_content(f, K)
if K.is_one(cont):
return cont, f
else:
return cont, dup_quo_ground(f, cont, K)
def dmp_ground_primitive(f, u, K):
"""
Compute content and the primitive form of ``f`` in ``K[X]``.
Examples
========
>>> from sympy.polys import ring, ZZ, QQ
>>> R, x,y = ring("x,y", ZZ)
>>> f = 2*x*y + 6*x + 4*y + 12
>>> R.dmp_ground_primitive(f)
(2, x*y + 3*x + 2*y + 6)
>>> R, x,y = ring("x,y", QQ)
>>> f = 2*x*y + 6*x + 4*y + 12
>>> R.dmp_ground_primitive(f)
(2, x*y + 3*x + 2*y + 6)
"""
if not u:
return dup_primitive(f, K)
if dmp_zero_p(f, u):
return K.zero, f
cont = dmp_ground_content(f, u, K)
if K.is_one(cont):
return cont, f
else:
return cont, dmp_quo_ground(f, cont, u, K)
def dup_extract(f, g, K):
"""
Extract common content from a pair of polynomials in ``K[x]``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x = ring("x", ZZ)
>>> R.dup_extract(6*x**2 + 12*x + 18, 4*x**2 + 8*x + 12)
(2, 3*x**2 + 6*x + 9, 2*x**2 + 4*x + 6)
"""
fc = dup_content(f, K)
gc = dup_content(g, K)
gcd = K.gcd(fc, gc)
if not K.is_one(gcd):
f = dup_quo_ground(f, gcd, K)
g = dup_quo_ground(g, gcd, K)
return gcd, f, g
def dmp_ground_extract(f, g, u, K):
"""
Extract common content from a pair of polynomials in ``K[X]``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x,y = ring("x,y", ZZ)
>>> R.dmp_ground_extract(6*x*y + 12*x + 18, 4*x*y + 8*x + 12)
(2, 3*x*y + 6*x + 9, 2*x*y + 4*x + 6)
"""
fc = dmp_ground_content(f, u, K)
gc = dmp_ground_content(g, u, K)
gcd = K.gcd(fc, gc)
if not K.is_one(gcd):
f = dmp_quo_ground(f, gcd, u, K)
g = dmp_quo_ground(g, gcd, u, K)
return gcd, f, g
def dup_real_imag(f, K):
"""
Return bivariate polynomials ``f1`` and ``f2``, such that ``f = f1 + f2*I``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x,y = ring("x,y", ZZ)
>>> R.dup_real_imag(x**3 + x**2 + x + 1)
(x**3 + x**2 - 3*x*y**2 + x - y**2 + 1, 3*x**2*y + 2*x*y - y**3 + y)
"""
if not K.is_ZZ and not K.is_QQ:
raise DomainError("computing real and imaginary parts is not supported over %s" % K)
f1 = dmp_zero(1)
f2 = dmp_zero(1)
if not f:
return f1, f2
g = [[[K.one, K.zero]], [[K.one], []]]
h = dmp_ground(f[0], 2)
for c in f[1:]:
h = dmp_mul(h, g, 2, K)
h = dmp_add_term(h, dmp_ground(c, 1), 0, 2, K)
H = dup_to_raw_dict(h)
for k, h in H.items():
m = k % 4
if not m:
f1 = dmp_add(f1, h, 1, K)
elif m == 1:
f2 = dmp_add(f2, h, 1, K)
elif m == 2:
f1 = dmp_sub(f1, h, 1, K)
else:
f2 = dmp_sub(f2, h, 1, K)
return f1, f2
def dup_mirror(f, K):
"""
Evaluate efficiently the composition ``f(-x)`` in ``K[x]``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x = ring("x", ZZ)
>>> R.dup_mirror(x**3 + 2*x**2 - 4*x + 2)
-x**3 + 2*x**2 + 4*x + 2
"""
f = list(f)
for i in range(len(f) - 2, -1, -2):
f[i] = -f[i]
return f
def dup_scale(f, a, K):
"""
Evaluate efficiently composition ``f(a*x)`` in ``K[x]``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x = ring("x", ZZ)
>>> R.dup_scale(x**2 - 2*x + 1, ZZ(2))
4*x**2 - 4*x + 1
"""
f, n, b = list(f), len(f) - 1, a
for i in range(n - 1, -1, -1):
f[i], b = b*f[i], b*a
return f
def dup_shift(f, a, K):
"""
Evaluate efficiently Taylor shift ``f(x + a)`` in ``K[x]``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x = ring("x", ZZ)
>>> R.dup_shift(x**2 - 2*x + 1, ZZ(2))
x**2 + 2*x + 1
"""
f, n = list(f), len(f) - 1
for i in range(n, 0, -1):
for j in range(0, i):
f[j + 1] += a*f[j]
return f
def dup_transform(f, p, q, K):
"""
Evaluate functional transformation ``q**n * f(p/q)`` in ``K[x]``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x = ring("x", ZZ)
>>> R.dup_transform(x**2 - 2*x + 1, x**2 + 1, x - 1)
x**4 - 2*x**3 + 5*x**2 - 4*x + 4
"""
if not f:
return []
n = len(f) - 1
h, Q = [f[0]], [[K.one]]
for i in range(0, n):
Q.append(dup_mul(Q[-1], q, K))
for c, q in zip(f[1:], Q[1:]):
h = dup_mul(h, p, K)
q = dup_mul_ground(q, c, K)
h = dup_add(h, q, K)
return h
def dup_compose(f, g, K):
"""
Evaluate functional composition ``f(g)`` in ``K[x]``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x = ring("x", ZZ)
>>> R.dup_compose(x**2 + x, x - 1)
x**2 - x
"""
if len(g) <= 1:
return dup_strip([dup_eval(f, dup_LC(g, K), K)])
if not f:
return []
h = [f[0]]
for c in f[1:]:
h = dup_mul(h, g, K)
h = dup_add_term(h, c, 0, K)
return h
def dmp_compose(f, g, u, K):
"""
Evaluate functional composition ``f(g)`` in ``K[X]``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x,y = ring("x,y", ZZ)
>>> R.dmp_compose(x*y + 2*x + y, y)
y**2 + 3*y
"""
if not u:
return dup_compose(f, g, K)
if dmp_zero_p(f, u):
return f
h = [f[0]]
for c in f[1:]:
h = dmp_mul(h, g, u, K)
h = dmp_add_term(h, c, 0, u, K)
return h
def _dup_right_decompose(f, s, K):
"""Helper function for :func:`_dup_decompose`."""
n = len(f) - 1
lc = dup_LC(f, K)
f = dup_to_raw_dict(f)
g = { s: K.one }
r = n // s
for i in range(1, s):
coeff = K.zero
for j in range(0, i):
if not n + j - i in f:
continue
if not s - j in g:
continue
fc, gc = f[n + j - i], g[s - j]
coeff += (i - r*j)*fc*gc
g[s - i] = K.quo(coeff, i*r*lc)
return dup_from_raw_dict(g, K)
def _dup_left_decompose(f, h, K):
"""Helper function for :func:`_dup_decompose`."""
g, i = {}, 0
while f:
q, r = dup_div(f, h, K)
if dup_degree(r) > 0:
return None
else:
g[i] = dup_LC(r, K)
f, i = q, i + 1
return dup_from_raw_dict(g, K)
def _dup_decompose(f, K):
"""Helper function for :func:`dup_decompose`."""
df = len(f) - 1
for s in range(2, df):
if df % s != 0:
continue
h = _dup_right_decompose(f, s, K)
if h is not None:
g = _dup_left_decompose(f, h, K)
if g is not None:
return g, h
return None
def dup_decompose(f, K):
"""
Computes functional decomposition of ``f`` in ``K[x]``.
Given a univariate polynomial ``f`` with coefficients in a field of
characteristic zero, returns list ``[f_1, f_2, ..., f_n]``, where::
f = f_1 o f_2 o ... f_n = f_1(f_2(... f_n))
and ``f_2, ..., f_n`` are monic and homogeneous polynomials of at
least second degree.
Unlike factorization, complete functional decompositions of
polynomials are not unique, consider examples:
1. ``f o g = f(x + b) o (g - b)``
2. ``x**n o x**m = x**m o x**n``
3. ``T_n o T_m = T_m o T_n``
where ``T_n`` and ``T_m`` are Chebyshev polynomials.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x = ring("x", ZZ)
>>> R.dup_decompose(x**4 - 2*x**3 + x**2)
[x**2, x**2 - x]
References
==========
.. [1] [Kozen89]_
"""
F = []
while True:
result = _dup_decompose(f, K)
if result is not None:
f, h = result
F = [h] + F
else:
break
return [f] + F
def dmp_lift(f, u, K):
"""
Convert algebraic coefficients to integers in ``K[X]``.
Examples
========
>>> from sympy.polys import ring, QQ
>>> from sympy import I
>>> K = QQ.algebraic_field(I)
>>> R, x = ring("x", K)
>>> f = x**2 + K([QQ(1), QQ(0)])*x + K([QQ(2), QQ(0)])
>>> R.dmp_lift(f)
x**8 + 2*x**6 + 9*x**4 - 8*x**2 + 16
"""
if K.is_GaussianField:
K1 = K.as_AlgebraicField()
f = dmp_convert(f, u, K, K1)
K = K1
if not K.is_Algebraic:
raise DomainError(
'computation can be done only in an algebraic domain')
F, monoms, polys = dmp_to_dict(f, u), [], []
for monom, coeff in F.items():
if not coeff.is_ground:
monoms.append(monom)
perms = variations([-1, 1], len(monoms), repetition=True)
for perm in perms:
G = dict(F)
for sign, monom in zip(perm, monoms):
if sign == -1:
G[monom] = -G[monom]
polys.append(dmp_from_dict(G, u, K))
return dmp_convert(dmp_expand(polys, u, K), u, K, K.dom)
def dup_sign_variations(f, K):
"""
Compute the number of sign variations of ``f`` in ``K[x]``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x = ring("x", ZZ)
>>> R.dup_sign_variations(x**4 - x**2 - x + 1)
2
"""
prev, k = K.zero, 0
for coeff in f:
if K.is_negative(coeff*prev):
k += 1
if coeff:
prev = coeff
return k
def dup_clear_denoms(f, K0, K1=None, convert=False):
"""
Clear denominators, i.e. transform ``K_0`` to ``K_1``.
Examples
========
>>> from sympy.polys import ring, QQ
>>> R, x = ring("x", QQ)
>>> f = QQ(1,2)*x + QQ(1,3)
>>> R.dup_clear_denoms(f, convert=False)
(6, 3*x + 2)
>>> R.dup_clear_denoms(f, convert=True)
(6, 3*x + 2)
"""
if K1 is None:
if K0.has_assoc_Ring:
K1 = K0.get_ring()
else:
K1 = K0
common = K1.one
for c in f:
common = K1.lcm(common, K0.denom(c))
if not K1.is_one(common):
f = dup_mul_ground(f, common, K0)
if not convert:
return common, f
else:
return common, dup_convert(f, K0, K1)
def _rec_clear_denoms(g, v, K0, K1):
"""Recursive helper for :func:`dmp_clear_denoms`."""
common = K1.one
if not v:
for c in g:
common = K1.lcm(common, K0.denom(c))
else:
w = v - 1
for c in g:
common = K1.lcm(common, _rec_clear_denoms(c, w, K0, K1))
return common
def dmp_clear_denoms(f, u, K0, K1=None, convert=False):
"""
Clear denominators, i.e. transform ``K_0`` to ``K_1``.
Examples
========
>>> from sympy.polys import ring, QQ
>>> R, x,y = ring("x,y", QQ)
>>> f = QQ(1,2)*x + QQ(1,3)*y + 1
>>> R.dmp_clear_denoms(f, convert=False)
(6, 3*x + 2*y + 6)
>>> R.dmp_clear_denoms(f, convert=True)
(6, 3*x + 2*y + 6)
"""
if not u:
return dup_clear_denoms(f, K0, K1, convert=convert)
if K1 is None:
if K0.has_assoc_Ring:
K1 = K0.get_ring()
else:
K1 = K0
common = _rec_clear_denoms(f, u, K0, K1)
if not K1.is_one(common):
f = dmp_mul_ground(f, common, u, K0)
if not convert:
return common, f
else:
return common, dmp_convert(f, u, K0, K1)
def dup_revert(f, n, K):
"""
Compute ``f**(-1)`` mod ``x**n`` using Newton iteration.
This function computes first ``2**n`` terms of a polynomial that
is a result of inversion of a polynomial modulo ``x**n``. This is
useful to efficiently compute series expansion of ``1/f``.
Examples
========
>>> from sympy.polys import ring, QQ
>>> R, x = ring("x", QQ)
>>> f = -QQ(1,720)*x**6 + QQ(1,24)*x**4 - QQ(1,2)*x**2 + 1
>>> R.dup_revert(f, 8)
61/720*x**6 + 5/24*x**4 + 1/2*x**2 + 1
"""
g = [K.revert(dup_TC(f, K))]
h = [K.one, K.zero, K.zero]
N = int(_ceil(_log(n, 2)))
for i in range(1, N + 1):
a = dup_mul_ground(g, K(2), K)
b = dup_mul(f, dup_sqr(g, K), K)
g = dup_rem(dup_sub(a, b, K), h, K)
h = dup_lshift(h, dup_degree(h), K)
return g
def dmp_revert(f, g, u, K):
"""
Compute ``f**(-1)`` mod ``x**n`` using Newton iteration.
Examples
========
>>> from sympy.polys import ring, QQ
>>> R, x,y = ring("x,y", QQ)
"""
if not u:
return dup_revert(f, g, K)
else:
raise MultivariatePolynomialError(f, g)
|
ca1027f59f2539d760a7111f6f3af67d2882cc0618f088c82d319121aeac88e0
|
"""User-friendly public interface to polynomial functions. """
from __future__ import print_function, division
from functools import wraps, reduce
from operator import mul
from sympy.core import (
S, Basic, Expr, I, Integer, Add, Mul, Dummy, Tuple
)
from sympy.core.basic import preorder_traversal
from sympy.core.compatibility import iterable, ordered
from sympy.core.decorators import _sympifyit
from sympy.core.evalf import pure_complex
from sympy.core.function import Derivative
from sympy.core.mul import _keep_coeff
from sympy.core.relational import Relational
from sympy.core.symbol import Symbol
from sympy.core.sympify import sympify, _sympify
from sympy.logic.boolalg import BooleanAtom
from sympy.polys import polyoptions as options
from sympy.polys.constructor import construct_domain
from sympy.polys.domains import FF, QQ, ZZ
from sympy.polys.fglmtools import matrix_fglm
from sympy.polys.groebnertools import groebner as _groebner
from sympy.polys.monomials import Monomial
from sympy.polys.orderings import monomial_key
from sympy.polys.polyclasses import DMP
from sympy.polys.polyerrors import (
OperationNotSupported, DomainError,
CoercionFailed, UnificationFailed,
GeneratorsNeeded, PolynomialError,
MultivariatePolynomialError,
ExactQuotientFailed,
PolificationFailed,
ComputationFailed,
GeneratorsError,
)
from sympy.polys.polyutils import (
basic_from_dict,
_sort_gens,
_unify_gens,
_dict_reorder,
_dict_from_expr,
_parallel_dict_from_expr,
)
from sympy.polys.rationaltools import together
from sympy.polys.rootisolation import dup_isolate_real_roots_list
from sympy.utilities import group, sift, public, filldedent
from sympy.utilities.exceptions import SymPyDeprecationWarning
# Required to avoid errors
import sympy.polys
import mpmath
from mpmath.libmp.libhyper import NoConvergence
def _polifyit(func):
@wraps(func)
def wrapper(f, g):
g = _sympify(g)
if isinstance(g, Poly):
return func(f, g)
elif isinstance(g, Expr):
try:
g = f.from_expr(g, *f.gens)
except PolynomialError:
if g.is_Matrix:
return NotImplemented
expr_method = getattr(f.as_expr(), func.__name__)
result = expr_method(g)
if result is not NotImplemented:
SymPyDeprecationWarning(
feature="Mixing Poly with non-polynomial expressions in binary operations",
issue=18613,
deprecated_since_version="1.6",
useinstead="the as_expr or as_poly method to convert types").warn()
return result
else:
return func(f, g)
else:
return NotImplemented
return wrapper
@public
class Poly(Basic):
"""
Generic class for representing and operating on polynomial expressions.
Poly is a subclass of Basic rather than Expr but instances can be
converted to Expr with the ``as_expr`` method.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
Create a univariate polynomial:
>>> Poly(x*(x**2 + x - 1)**2)
Poly(x**5 + 2*x**4 - x**3 - 2*x**2 + x, x, domain='ZZ')
Create a univariate polynomial with specific domain:
>>> from sympy import sqrt
>>> Poly(x**2 + 2*x + sqrt(3), domain='R')
Poly(1.0*x**2 + 2.0*x + 1.73205080756888, x, domain='RR')
Create a multivariate polynomial:
>>> Poly(y*x**2 + x*y + 1)
Poly(x**2*y + x*y + 1, x, y, domain='ZZ')
Create a univariate polynomial, where y is a constant:
>>> Poly(y*x**2 + x*y + 1,x)
Poly(y*x**2 + y*x + 1, x, domain='ZZ[y]')
You can evaluate the above polynomial as a function of y:
>>> Poly(y*x**2 + x*y + 1,x).eval(2)
6*y + 1
See Also
========
sympy.core.expr.Expr
"""
__slots__ = ('rep', 'gens')
is_commutative = True
is_Poly = True
_op_priority = 10.001
def __new__(cls, rep, *gens, **args):
"""Create a new polynomial instance out of something useful. """
opt = options.build_options(gens, args)
if 'order' in opt:
raise NotImplementedError("'order' keyword is not implemented yet")
if iterable(rep, exclude=str):
if isinstance(rep, dict):
return cls._from_dict(rep, opt)
else:
return cls._from_list(list(rep), opt)
else:
rep = sympify(rep)
if rep.is_Poly:
return cls._from_poly(rep, opt)
else:
return cls._from_expr(rep, opt)
# Poly does not pass its args to Basic.__new__ to be stored in _args so we
# have to emulate them here with an args property that derives from rep
# and gens which are instance attributes. This also means we need to
# define _hashable_content. The _hashable_content is rep and gens but args
# uses expr instead of rep (expr is the Basic version of rep). Passing
# expr in args means that Basic methods like subs should work. Using rep
# otherwise means that Poly can remain more efficient than Basic by
# avoiding creating a Basic instance just to be hashable.
@classmethod
def new(cls, rep, *gens):
"""Construct :class:`Poly` instance from raw representation. """
if not isinstance(rep, DMP):
raise PolynomialError(
"invalid polynomial representation: %s" % rep)
elif rep.lev != len(gens) - 1:
raise PolynomialError("invalid arguments: %s, %s" % (rep, gens))
obj = Basic.__new__(cls)
obj.rep = rep
obj.gens = gens
return obj
@property
def expr(self):
return basic_from_dict(self.rep.to_sympy_dict(), *self.gens)
@property
def args(self):
return (self.expr,) + self.gens
def _hashable_content(self):
return (self.rep,) + self.gens
@classmethod
def from_dict(cls, rep, *gens, **args):
"""Construct a polynomial from a ``dict``. """
opt = options.build_options(gens, args)
return cls._from_dict(rep, opt)
@classmethod
def from_list(cls, rep, *gens, **args):
"""Construct a polynomial from a ``list``. """
opt = options.build_options(gens, args)
return cls._from_list(rep, opt)
@classmethod
def from_poly(cls, rep, *gens, **args):
"""Construct a polynomial from a polynomial. """
opt = options.build_options(gens, args)
return cls._from_poly(rep, opt)
@classmethod
def from_expr(cls, rep, *gens, **args):
"""Construct a polynomial from an expression. """
opt = options.build_options(gens, args)
return cls._from_expr(rep, opt)
@classmethod
def _from_dict(cls, rep, opt):
"""Construct a polynomial from a ``dict``. """
gens = opt.gens
if not gens:
raise GeneratorsNeeded(
"can't initialize from 'dict' without generators")
level = len(gens) - 1
domain = opt.domain
if domain is None:
domain, rep = construct_domain(rep, opt=opt)
else:
for monom, coeff in rep.items():
rep[monom] = domain.convert(coeff)
return cls.new(DMP.from_dict(rep, level, domain), *gens)
@classmethod
def _from_list(cls, rep, opt):
"""Construct a polynomial from a ``list``. """
gens = opt.gens
if not gens:
raise GeneratorsNeeded(
"can't initialize from 'list' without generators")
elif len(gens) != 1:
raise MultivariatePolynomialError(
"'list' representation not supported")
level = len(gens) - 1
domain = opt.domain
if domain is None:
domain, rep = construct_domain(rep, opt=opt)
else:
rep = list(map(domain.convert, rep))
return cls.new(DMP.from_list(rep, level, domain), *gens)
@classmethod
def _from_poly(cls, rep, opt):
"""Construct a polynomial from a polynomial. """
if cls != rep.__class__:
rep = cls.new(rep.rep, *rep.gens)
gens = opt.gens
field = opt.field
domain = opt.domain
if gens and rep.gens != gens:
if set(rep.gens) != set(gens):
return cls._from_expr(rep.as_expr(), opt)
else:
rep = rep.reorder(*gens)
if 'domain' in opt and domain:
rep = rep.set_domain(domain)
elif field is True:
rep = rep.to_field()
return rep
@classmethod
def _from_expr(cls, rep, opt):
"""Construct a polynomial from an expression. """
rep, opt = _dict_from_expr(rep, opt)
return cls._from_dict(rep, opt)
def __hash__(self):
return super(Poly, self).__hash__()
@property
def free_symbols(self):
"""
Free symbols of a polynomial expression.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y, z
>>> Poly(x**2 + 1).free_symbols
{x}
>>> Poly(x**2 + y).free_symbols
{x, y}
>>> Poly(x**2 + y, x).free_symbols
{x, y}
>>> Poly(x**2 + y, x, z).free_symbols
{x, y}
"""
symbols = set()
gens = self.gens
for i in range(len(gens)):
for monom in self.monoms():
if monom[i]:
symbols |= gens[i].free_symbols
break
return symbols | self.free_symbols_in_domain
@property
def free_symbols_in_domain(self):
"""
Free symbols of the domain of ``self``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x**2 + 1).free_symbols_in_domain
set()
>>> Poly(x**2 + y).free_symbols_in_domain
set()
>>> Poly(x**2 + y, x).free_symbols_in_domain
{y}
"""
domain, symbols = self.rep.dom, set()
if domain.is_Composite:
for gen in domain.symbols:
symbols |= gen.free_symbols
elif domain.is_EX:
for coeff in self.coeffs():
symbols |= coeff.free_symbols
return symbols
@property
def gen(self):
"""
Return the principal generator.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 + 1, x).gen
x
"""
return self.gens[0]
@property
def domain(self):
"""Get the ground domain of ``self``. """
return self.get_domain()
@property
def zero(self):
"""Return zero polynomial with ``self``'s properties. """
return self.new(self.rep.zero(self.rep.lev, self.rep.dom), *self.gens)
@property
def one(self):
"""Return one polynomial with ``self``'s properties. """
return self.new(self.rep.one(self.rep.lev, self.rep.dom), *self.gens)
@property
def unit(self):
"""Return unit polynomial with ``self``'s properties. """
return self.new(self.rep.unit(self.rep.lev, self.rep.dom), *self.gens)
def unify(f, g):
"""
Make ``f`` and ``g`` belong to the same domain.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> f, g = Poly(x/2 + 1), Poly(2*x + 1)
>>> f
Poly(1/2*x + 1, x, domain='QQ')
>>> g
Poly(2*x + 1, x, domain='ZZ')
>>> F, G = f.unify(g)
>>> F
Poly(1/2*x + 1, x, domain='QQ')
>>> G
Poly(2*x + 1, x, domain='QQ')
"""
_, per, F, G = f._unify(g)
return per(F), per(G)
def _unify(f, g):
g = sympify(g)
if not g.is_Poly:
try:
return f.rep.dom, f.per, f.rep, f.rep.per(f.rep.dom.from_sympy(g))
except CoercionFailed:
raise UnificationFailed("can't unify %s with %s" % (f, g))
if isinstance(f.rep, DMP) and isinstance(g.rep, DMP):
gens = _unify_gens(f.gens, g.gens)
dom, lev = f.rep.dom.unify(g.rep.dom, gens), len(gens) - 1
if f.gens != gens:
f_monoms, f_coeffs = _dict_reorder(
f.rep.to_dict(), f.gens, gens)
if f.rep.dom != dom:
f_coeffs = [dom.convert(c, f.rep.dom) for c in f_coeffs]
F = DMP(dict(list(zip(f_monoms, f_coeffs))), dom, lev)
else:
F = f.rep.convert(dom)
if g.gens != gens:
g_monoms, g_coeffs = _dict_reorder(
g.rep.to_dict(), g.gens, gens)
if g.rep.dom != dom:
g_coeffs = [dom.convert(c, g.rep.dom) for c in g_coeffs]
G = DMP(dict(list(zip(g_monoms, g_coeffs))), dom, lev)
else:
G = g.rep.convert(dom)
else:
raise UnificationFailed("can't unify %s with %s" % (f, g))
cls = f.__class__
def per(rep, dom=dom, gens=gens, remove=None):
if remove is not None:
gens = gens[:remove] + gens[remove + 1:]
if not gens:
return dom.to_sympy(rep)
return cls.new(rep, *gens)
return dom, per, F, G
def per(f, rep, gens=None, remove=None):
"""
Create a Poly out of the given representation.
Examples
========
>>> from sympy import Poly, ZZ
>>> from sympy.abc import x, y
>>> from sympy.polys.polyclasses import DMP
>>> a = Poly(x**2 + 1)
>>> a.per(DMP([ZZ(1), ZZ(1)], ZZ), gens=[y])
Poly(y + 1, y, domain='ZZ')
"""
if gens is None:
gens = f.gens
if remove is not None:
gens = gens[:remove] + gens[remove + 1:]
if not gens:
return f.rep.dom.to_sympy(rep)
return f.__class__.new(rep, *gens)
def set_domain(f, domain):
"""Set the ground domain of ``f``. """
opt = options.build_options(f.gens, {'domain': domain})
return f.per(f.rep.convert(opt.domain))
def get_domain(f):
"""Get the ground domain of ``f``. """
return f.rep.dom
def set_modulus(f, modulus):
"""
Set the modulus of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(5*x**2 + 2*x - 1, x).set_modulus(2)
Poly(x**2 + 1, x, modulus=2)
"""
modulus = options.Modulus.preprocess(modulus)
return f.set_domain(FF(modulus))
def get_modulus(f):
"""
Get the modulus of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 + 1, modulus=2).get_modulus()
2
"""
domain = f.get_domain()
if domain.is_FiniteField:
return Integer(domain.characteristic())
else:
raise PolynomialError("not a polynomial over a Galois field")
def _eval_subs(f, old, new):
"""Internal implementation of :func:`subs`. """
if old in f.gens:
if new.is_number:
return f.eval(old, new)
else:
try:
return f.replace(old, new)
except PolynomialError:
pass
return f.as_expr().subs(old, new)
def exclude(f):
"""
Remove unnecessary generators from ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import a, b, c, d, x
>>> Poly(a + x, a, b, c, d, x).exclude()
Poly(a + x, a, x, domain='ZZ')
"""
J, new = f.rep.exclude()
gens = []
for j in range(len(f.gens)):
if j not in J:
gens.append(f.gens[j])
return f.per(new, gens=gens)
def replace(f, x, y=None, *_ignore):
# XXX this does not match Basic's signature
"""
Replace ``x`` with ``y`` in generators list.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x**2 + 1, x).replace(x, y)
Poly(y**2 + 1, y, domain='ZZ')
"""
if y is None:
if f.is_univariate:
x, y = f.gen, x
else:
raise PolynomialError(
"syntax supported only in univariate case")
if x == y or x not in f.gens:
return f
if x in f.gens and y not in f.gens:
dom = f.get_domain()
if not dom.is_Composite or y not in dom.symbols:
gens = list(f.gens)
gens[gens.index(x)] = y
return f.per(f.rep, gens=gens)
raise PolynomialError("can't replace %s with %s in %s" % (x, y, f))
def match(f, *args, **kwargs):
"""Match expression from Poly. See Basic.match()"""
return f.as_expr().match(*args, **kwargs)
def reorder(f, *gens, **args):
"""
Efficiently apply new order of generators.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x**2 + x*y**2, x, y).reorder(y, x)
Poly(y**2*x + x**2, y, x, domain='ZZ')
"""
opt = options.Options((), args)
if not gens:
gens = _sort_gens(f.gens, opt=opt)
elif set(f.gens) != set(gens):
raise PolynomialError(
"generators list can differ only up to order of elements")
rep = dict(list(zip(*_dict_reorder(f.rep.to_dict(), f.gens, gens))))
return f.per(DMP(rep, f.rep.dom, len(gens) - 1), gens=gens)
def ltrim(f, gen):
"""
Remove dummy generators from ``f`` that are to the left of
specified ``gen`` in the generators as ordered. When ``gen``
is an integer, it refers to the generator located at that
position within the tuple of generators of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y, z
>>> Poly(y**2 + y*z**2, x, y, z).ltrim(y)
Poly(y**2 + y*z**2, y, z, domain='ZZ')
>>> Poly(z, x, y, z).ltrim(-1)
Poly(z, z, domain='ZZ')
"""
rep = f.as_dict(native=True)
j = f._gen_to_level(gen)
terms = {}
for monom, coeff in rep.items():
if any(monom[:j]):
# some generator is used in the portion to be trimmed
raise PolynomialError("can't left trim %s" % f)
terms[monom[j:]] = coeff
gens = f.gens[j:]
return f.new(DMP.from_dict(terms, len(gens) - 1, f.rep.dom), *gens)
def has_only_gens(f, *gens):
"""
Return ``True`` if ``Poly(f, *gens)`` retains ground domain.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y, z
>>> Poly(x*y + 1, x, y, z).has_only_gens(x, y)
True
>>> Poly(x*y + z, x, y, z).has_only_gens(x, y)
False
"""
indices = set()
for gen in gens:
try:
index = f.gens.index(gen)
except ValueError:
raise GeneratorsError(
"%s doesn't have %s as generator" % (f, gen))
else:
indices.add(index)
for monom in f.monoms():
for i, elt in enumerate(monom):
if i not in indices and elt:
return False
return True
def to_ring(f):
"""
Make the ground domain a ring.
Examples
========
>>> from sympy import Poly, QQ
>>> from sympy.abc import x
>>> Poly(x**2 + 1, domain=QQ).to_ring()
Poly(x**2 + 1, x, domain='ZZ')
"""
if hasattr(f.rep, 'to_ring'):
result = f.rep.to_ring()
else: # pragma: no cover
raise OperationNotSupported(f, 'to_ring')
return f.per(result)
def to_field(f):
"""
Make the ground domain a field.
Examples
========
>>> from sympy import Poly, ZZ
>>> from sympy.abc import x
>>> Poly(x**2 + 1, x, domain=ZZ).to_field()
Poly(x**2 + 1, x, domain='QQ')
"""
if hasattr(f.rep, 'to_field'):
result = f.rep.to_field()
else: # pragma: no cover
raise OperationNotSupported(f, 'to_field')
return f.per(result)
def to_exact(f):
"""
Make the ground domain exact.
Examples
========
>>> from sympy import Poly, RR
>>> from sympy.abc import x
>>> Poly(x**2 + 1.0, x, domain=RR).to_exact()
Poly(x**2 + 1, x, domain='QQ')
"""
if hasattr(f.rep, 'to_exact'):
result = f.rep.to_exact()
else: # pragma: no cover
raise OperationNotSupported(f, 'to_exact')
return f.per(result)
def retract(f, field=None):
"""
Recalculate the ground domain of a polynomial.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> f = Poly(x**2 + 1, x, domain='QQ[y]')
>>> f
Poly(x**2 + 1, x, domain='QQ[y]')
>>> f.retract()
Poly(x**2 + 1, x, domain='ZZ')
>>> f.retract(field=True)
Poly(x**2 + 1, x, domain='QQ')
"""
dom, rep = construct_domain(f.as_dict(zero=True),
field=field, composite=f.domain.is_Composite or None)
return f.from_dict(rep, f.gens, domain=dom)
def slice(f, x, m, n=None):
"""Take a continuous subsequence of terms of ``f``. """
if n is None:
j, m, n = 0, x, m
else:
j = f._gen_to_level(x)
m, n = int(m), int(n)
if hasattr(f.rep, 'slice'):
result = f.rep.slice(m, n, j)
else: # pragma: no cover
raise OperationNotSupported(f, 'slice')
return f.per(result)
def coeffs(f, order=None):
"""
Returns all non-zero coefficients from ``f`` in lex order.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**3 + 2*x + 3, x).coeffs()
[1, 2, 3]
See Also
========
all_coeffs
coeff_monomial
nth
"""
return [f.rep.dom.to_sympy(c) for c in f.rep.coeffs(order=order)]
def monoms(f, order=None):
"""
Returns all non-zero monomials from ``f`` in lex order.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x**2 + 2*x*y**2 + x*y + 3*y, x, y).monoms()
[(2, 0), (1, 2), (1, 1), (0, 1)]
See Also
========
all_monoms
"""
return f.rep.monoms(order=order)
def terms(f, order=None):
"""
Returns all non-zero terms from ``f`` in lex order.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x**2 + 2*x*y**2 + x*y + 3*y, x, y).terms()
[((2, 0), 1), ((1, 2), 2), ((1, 1), 1), ((0, 1), 3)]
See Also
========
all_terms
"""
return [(m, f.rep.dom.to_sympy(c)) for m, c in f.rep.terms(order=order)]
def all_coeffs(f):
"""
Returns all coefficients from a univariate polynomial ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**3 + 2*x - 1, x).all_coeffs()
[1, 0, 2, -1]
"""
return [f.rep.dom.to_sympy(c) for c in f.rep.all_coeffs()]
def all_monoms(f):
"""
Returns all monomials from a univariate polynomial ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**3 + 2*x - 1, x).all_monoms()
[(3,), (2,), (1,), (0,)]
See Also
========
all_terms
"""
return f.rep.all_monoms()
def all_terms(f):
"""
Returns all terms from a univariate polynomial ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**3 + 2*x - 1, x).all_terms()
[((3,), 1), ((2,), 0), ((1,), 2), ((0,), -1)]
"""
return [(m, f.rep.dom.to_sympy(c)) for m, c in f.rep.all_terms()]
def termwise(f, func, *gens, **args):
"""
Apply a function to all terms of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> def func(k, coeff):
... k = k[0]
... return coeff//10**(2-k)
>>> Poly(x**2 + 20*x + 400).termwise(func)
Poly(x**2 + 2*x + 4, x, domain='ZZ')
"""
terms = {}
for monom, coeff in f.terms():
result = func(monom, coeff)
if isinstance(result, tuple):
monom, coeff = result
else:
coeff = result
if coeff:
if monom not in terms:
terms[monom] = coeff
else:
raise PolynomialError(
"%s monomial was generated twice" % monom)
return f.from_dict(terms, *(gens or f.gens), **args)
def length(f):
"""
Returns the number of non-zero terms in ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 + 2*x - 1).length()
3
"""
return len(f.as_dict())
def as_dict(f, native=False, zero=False):
"""
Switch to a ``dict`` representation.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x**2 + 2*x*y**2 - y, x, y).as_dict()
{(0, 1): -1, (1, 2): 2, (2, 0): 1}
"""
if native:
return f.rep.to_dict(zero=zero)
else:
return f.rep.to_sympy_dict(zero=zero)
def as_list(f, native=False):
"""Switch to a ``list`` representation. """
if native:
return f.rep.to_list()
else:
return f.rep.to_sympy_list()
def as_expr(f, *gens):
"""
Convert a Poly instance to an Expr instance.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> f = Poly(x**2 + 2*x*y**2 - y, x, y)
>>> f.as_expr()
x**2 + 2*x*y**2 - y
>>> f.as_expr({x: 5})
10*y**2 - y + 25
>>> f.as_expr(5, 6)
379
"""
if not gens:
return f.expr
if len(gens) == 1 and isinstance(gens[0], dict):
mapping = gens[0]
gens = list(f.gens)
for gen, value in mapping.items():
try:
index = gens.index(gen)
except ValueError:
raise GeneratorsError(
"%s doesn't have %s as generator" % (f, gen))
else:
gens[index] = value
return basic_from_dict(f.rep.to_sympy_dict(), *gens)
def as_poly(self, *gens, **args):
"""Converts ``self`` to a polynomial or returns ``None``.
>>> from sympy import sin
>>> from sympy.abc import x, y
>>> print((x**2 + x*y).as_poly())
Poly(x**2 + x*y, x, y, domain='ZZ')
>>> print((x**2 + x*y).as_poly(x, y))
Poly(x**2 + x*y, x, y, domain='ZZ')
>>> print((x**2 + sin(y)).as_poly(x, y))
None
"""
try:
poly = Poly(self, *gens, **args)
if not poly.is_Poly:
return None
else:
return poly
except PolynomialError:
return None
def lift(f):
"""
Convert algebraic coefficients to rationals.
Examples
========
>>> from sympy import Poly, I
>>> from sympy.abc import x
>>> Poly(x**2 + I*x + 1, x, extension=I).lift()
Poly(x**4 + 3*x**2 + 1, x, domain='QQ')
"""
if hasattr(f.rep, 'lift'):
result = f.rep.lift()
else: # pragma: no cover
raise OperationNotSupported(f, 'lift')
return f.per(result)
def deflate(f):
"""
Reduce degree of ``f`` by mapping ``x_i**m`` to ``y_i``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x**6*y**2 + x**3 + 1, x, y).deflate()
((3, 2), Poly(x**2*y + x + 1, x, y, domain='ZZ'))
"""
if hasattr(f.rep, 'deflate'):
J, result = f.rep.deflate()
else: # pragma: no cover
raise OperationNotSupported(f, 'deflate')
return J, f.per(result)
def inject(f, front=False):
"""
Inject ground domain generators into ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> f = Poly(x**2*y + x*y**3 + x*y + 1, x)
>>> f.inject()
Poly(x**2*y + x*y**3 + x*y + 1, x, y, domain='ZZ')
>>> f.inject(front=True)
Poly(y**3*x + y*x**2 + y*x + 1, y, x, domain='ZZ')
"""
dom = f.rep.dom
if dom.is_Numerical:
return f
elif not dom.is_Poly:
raise DomainError("can't inject generators over %s" % dom)
if hasattr(f.rep, 'inject'):
result = f.rep.inject(front=front)
else: # pragma: no cover
raise OperationNotSupported(f, 'inject')
if front:
gens = dom.symbols + f.gens
else:
gens = f.gens + dom.symbols
return f.new(result, *gens)
def eject(f, *gens):
"""
Eject selected generators into the ground domain.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> f = Poly(x**2*y + x*y**3 + x*y + 1, x, y)
>>> f.eject(x)
Poly(x*y**3 + (x**2 + x)*y + 1, y, domain='ZZ[x]')
>>> f.eject(y)
Poly(y*x**2 + (y**3 + y)*x + 1, x, domain='ZZ[y]')
"""
dom = f.rep.dom
if not dom.is_Numerical:
raise DomainError("can't eject generators over %s" % dom)
k = len(gens)
if f.gens[:k] == gens:
_gens, front = f.gens[k:], True
elif f.gens[-k:] == gens:
_gens, front = f.gens[:-k], False
else:
raise NotImplementedError(
"can only eject front or back generators")
dom = dom.inject(*gens)
if hasattr(f.rep, 'eject'):
result = f.rep.eject(dom, front=front)
else: # pragma: no cover
raise OperationNotSupported(f, 'eject')
return f.new(result, *_gens)
def terms_gcd(f):
"""
Remove GCD of terms from the polynomial ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x**6*y**2 + x**3*y, x, y).terms_gcd()
((3, 1), Poly(x**3*y + 1, x, y, domain='ZZ'))
"""
if hasattr(f.rep, 'terms_gcd'):
J, result = f.rep.terms_gcd()
else: # pragma: no cover
raise OperationNotSupported(f, 'terms_gcd')
return J, f.per(result)
def add_ground(f, coeff):
"""
Add an element of the ground domain to ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x + 1).add_ground(2)
Poly(x + 3, x, domain='ZZ')
"""
if hasattr(f.rep, 'add_ground'):
result = f.rep.add_ground(coeff)
else: # pragma: no cover
raise OperationNotSupported(f, 'add_ground')
return f.per(result)
def sub_ground(f, coeff):
"""
Subtract an element of the ground domain from ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x + 1).sub_ground(2)
Poly(x - 1, x, domain='ZZ')
"""
if hasattr(f.rep, 'sub_ground'):
result = f.rep.sub_ground(coeff)
else: # pragma: no cover
raise OperationNotSupported(f, 'sub_ground')
return f.per(result)
def mul_ground(f, coeff):
"""
Multiply ``f`` by a an element of the ground domain.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x + 1).mul_ground(2)
Poly(2*x + 2, x, domain='ZZ')
"""
if hasattr(f.rep, 'mul_ground'):
result = f.rep.mul_ground(coeff)
else: # pragma: no cover
raise OperationNotSupported(f, 'mul_ground')
return f.per(result)
def quo_ground(f, coeff):
"""
Quotient of ``f`` by a an element of the ground domain.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(2*x + 4).quo_ground(2)
Poly(x + 2, x, domain='ZZ')
>>> Poly(2*x + 3).quo_ground(2)
Poly(x + 1, x, domain='ZZ')
"""
if hasattr(f.rep, 'quo_ground'):
result = f.rep.quo_ground(coeff)
else: # pragma: no cover
raise OperationNotSupported(f, 'quo_ground')
return f.per(result)
def exquo_ground(f, coeff):
"""
Exact quotient of ``f`` by a an element of the ground domain.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(2*x + 4).exquo_ground(2)
Poly(x + 2, x, domain='ZZ')
>>> Poly(2*x + 3).exquo_ground(2)
Traceback (most recent call last):
...
ExactQuotientFailed: 2 does not divide 3 in ZZ
"""
if hasattr(f.rep, 'exquo_ground'):
result = f.rep.exquo_ground(coeff)
else: # pragma: no cover
raise OperationNotSupported(f, 'exquo_ground')
return f.per(result)
def abs(f):
"""
Make all coefficients in ``f`` positive.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 - 1, x).abs()
Poly(x**2 + 1, x, domain='ZZ')
"""
if hasattr(f.rep, 'abs'):
result = f.rep.abs()
else: # pragma: no cover
raise OperationNotSupported(f, 'abs')
return f.per(result)
def neg(f):
"""
Negate all coefficients in ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 - 1, x).neg()
Poly(-x**2 + 1, x, domain='ZZ')
>>> -Poly(x**2 - 1, x)
Poly(-x**2 + 1, x, domain='ZZ')
"""
if hasattr(f.rep, 'neg'):
result = f.rep.neg()
else: # pragma: no cover
raise OperationNotSupported(f, 'neg')
return f.per(result)
def add(f, g):
"""
Add two polynomials ``f`` and ``g``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 + 1, x).add(Poly(x - 2, x))
Poly(x**2 + x - 1, x, domain='ZZ')
>>> Poly(x**2 + 1, x) + Poly(x - 2, x)
Poly(x**2 + x - 1, x, domain='ZZ')
"""
g = sympify(g)
if not g.is_Poly:
return f.add_ground(g)
_, per, F, G = f._unify(g)
if hasattr(f.rep, 'add'):
result = F.add(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'add')
return per(result)
def sub(f, g):
"""
Subtract two polynomials ``f`` and ``g``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 + 1, x).sub(Poly(x - 2, x))
Poly(x**2 - x + 3, x, domain='ZZ')
>>> Poly(x**2 + 1, x) - Poly(x - 2, x)
Poly(x**2 - x + 3, x, domain='ZZ')
"""
g = sympify(g)
if not g.is_Poly:
return f.sub_ground(g)
_, per, F, G = f._unify(g)
if hasattr(f.rep, 'sub'):
result = F.sub(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'sub')
return per(result)
def mul(f, g):
"""
Multiply two polynomials ``f`` and ``g``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 + 1, x).mul(Poly(x - 2, x))
Poly(x**3 - 2*x**2 + x - 2, x, domain='ZZ')
>>> Poly(x**2 + 1, x)*Poly(x - 2, x)
Poly(x**3 - 2*x**2 + x - 2, x, domain='ZZ')
"""
g = sympify(g)
if not g.is_Poly:
return f.mul_ground(g)
_, per, F, G = f._unify(g)
if hasattr(f.rep, 'mul'):
result = F.mul(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'mul')
return per(result)
def sqr(f):
"""
Square a polynomial ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x - 2, x).sqr()
Poly(x**2 - 4*x + 4, x, domain='ZZ')
>>> Poly(x - 2, x)**2
Poly(x**2 - 4*x + 4, x, domain='ZZ')
"""
if hasattr(f.rep, 'sqr'):
result = f.rep.sqr()
else: # pragma: no cover
raise OperationNotSupported(f, 'sqr')
return f.per(result)
def pow(f, n):
"""
Raise ``f`` to a non-negative power ``n``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x - 2, x).pow(3)
Poly(x**3 - 6*x**2 + 12*x - 8, x, domain='ZZ')
>>> Poly(x - 2, x)**3
Poly(x**3 - 6*x**2 + 12*x - 8, x, domain='ZZ')
"""
n = int(n)
if hasattr(f.rep, 'pow'):
result = f.rep.pow(n)
else: # pragma: no cover
raise OperationNotSupported(f, 'pow')
return f.per(result)
def pdiv(f, g):
"""
Polynomial pseudo-division of ``f`` by ``g``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 + 1, x).pdiv(Poly(2*x - 4, x))
(Poly(2*x + 4, x, domain='ZZ'), Poly(20, x, domain='ZZ'))
"""
_, per, F, G = f._unify(g)
if hasattr(f.rep, 'pdiv'):
q, r = F.pdiv(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'pdiv')
return per(q), per(r)
def prem(f, g):
"""
Polynomial pseudo-remainder of ``f`` by ``g``.
Caveat: The function prem(f, g, x) can be safely used to compute
in Z[x] _only_ subresultant polynomial remainder sequences (prs's).
To safely compute Euclidean and Sturmian prs's in Z[x]
employ anyone of the corresponding functions found in
the module sympy.polys.subresultants_qq_zz. The functions
in the module with suffix _pg compute prs's in Z[x] employing
rem(f, g, x), whereas the functions with suffix _amv
compute prs's in Z[x] employing rem_z(f, g, x).
The function rem_z(f, g, x) differs from prem(f, g, x) in that
to compute the remainder polynomials in Z[x] it premultiplies
the divident times the absolute value of the leading coefficient
of the divisor raised to the power degree(f, x) - degree(g, x) + 1.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 + 1, x).prem(Poly(2*x - 4, x))
Poly(20, x, domain='ZZ')
"""
_, per, F, G = f._unify(g)
if hasattr(f.rep, 'prem'):
result = F.prem(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'prem')
return per(result)
def pquo(f, g):
"""
Polynomial pseudo-quotient of ``f`` by ``g``.
See the Caveat note in the function prem(f, g).
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 + 1, x).pquo(Poly(2*x - 4, x))
Poly(2*x + 4, x, domain='ZZ')
>>> Poly(x**2 - 1, x).pquo(Poly(2*x - 2, x))
Poly(2*x + 2, x, domain='ZZ')
"""
_, per, F, G = f._unify(g)
if hasattr(f.rep, 'pquo'):
result = F.pquo(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'pquo')
return per(result)
def pexquo(f, g):
"""
Polynomial exact pseudo-quotient of ``f`` by ``g``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 - 1, x).pexquo(Poly(2*x - 2, x))
Poly(2*x + 2, x, domain='ZZ')
>>> Poly(x**2 + 1, x).pexquo(Poly(2*x - 4, x))
Traceback (most recent call last):
...
ExactQuotientFailed: 2*x - 4 does not divide x**2 + 1
"""
_, per, F, G = f._unify(g)
if hasattr(f.rep, 'pexquo'):
try:
result = F.pexquo(G)
except ExactQuotientFailed as exc:
raise exc.new(f.as_expr(), g.as_expr())
else: # pragma: no cover
raise OperationNotSupported(f, 'pexquo')
return per(result)
def div(f, g, auto=True):
"""
Polynomial division with remainder of ``f`` by ``g``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 + 1, x).div(Poly(2*x - 4, x))
(Poly(1/2*x + 1, x, domain='QQ'), Poly(5, x, domain='QQ'))
>>> Poly(x**2 + 1, x).div(Poly(2*x - 4, x), auto=False)
(Poly(0, x, domain='ZZ'), Poly(x**2 + 1, x, domain='ZZ'))
"""
dom, per, F, G = f._unify(g)
retract = False
if auto and dom.is_Ring and not dom.is_Field:
F, G = F.to_field(), G.to_field()
retract = True
if hasattr(f.rep, 'div'):
q, r = F.div(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'div')
if retract:
try:
Q, R = q.to_ring(), r.to_ring()
except CoercionFailed:
pass
else:
q, r = Q, R
return per(q), per(r)
def rem(f, g, auto=True):
"""
Computes the polynomial remainder of ``f`` by ``g``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 + 1, x).rem(Poly(2*x - 4, x))
Poly(5, x, domain='ZZ')
>>> Poly(x**2 + 1, x).rem(Poly(2*x - 4, x), auto=False)
Poly(x**2 + 1, x, domain='ZZ')
"""
dom, per, F, G = f._unify(g)
retract = False
if auto and dom.is_Ring and not dom.is_Field:
F, G = F.to_field(), G.to_field()
retract = True
if hasattr(f.rep, 'rem'):
r = F.rem(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'rem')
if retract:
try:
r = r.to_ring()
except CoercionFailed:
pass
return per(r)
def quo(f, g, auto=True):
"""
Computes polynomial quotient of ``f`` by ``g``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 + 1, x).quo(Poly(2*x - 4, x))
Poly(1/2*x + 1, x, domain='QQ')
>>> Poly(x**2 - 1, x).quo(Poly(x - 1, x))
Poly(x + 1, x, domain='ZZ')
"""
dom, per, F, G = f._unify(g)
retract = False
if auto and dom.is_Ring and not dom.is_Field:
F, G = F.to_field(), G.to_field()
retract = True
if hasattr(f.rep, 'quo'):
q = F.quo(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'quo')
if retract:
try:
q = q.to_ring()
except CoercionFailed:
pass
return per(q)
def exquo(f, g, auto=True):
"""
Computes polynomial exact quotient of ``f`` by ``g``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 - 1, x).exquo(Poly(x - 1, x))
Poly(x + 1, x, domain='ZZ')
>>> Poly(x**2 + 1, x).exquo(Poly(2*x - 4, x))
Traceback (most recent call last):
...
ExactQuotientFailed: 2*x - 4 does not divide x**2 + 1
"""
dom, per, F, G = f._unify(g)
retract = False
if auto and dom.is_Ring and not dom.is_Field:
F, G = F.to_field(), G.to_field()
retract = True
if hasattr(f.rep, 'exquo'):
try:
q = F.exquo(G)
except ExactQuotientFailed as exc:
raise exc.new(f.as_expr(), g.as_expr())
else: # pragma: no cover
raise OperationNotSupported(f, 'exquo')
if retract:
try:
q = q.to_ring()
except CoercionFailed:
pass
return per(q)
def _gen_to_level(f, gen):
"""Returns level associated with the given generator. """
if isinstance(gen, int):
length = len(f.gens)
if -length <= gen < length:
if gen < 0:
return length + gen
else:
return gen
else:
raise PolynomialError("-%s <= gen < %s expected, got %s" %
(length, length, gen))
else:
try:
return f.gens.index(sympify(gen))
except ValueError:
raise PolynomialError(
"a valid generator expected, got %s" % gen)
def degree(f, gen=0):
"""
Returns degree of ``f`` in ``x_j``.
The degree of 0 is negative infinity.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x**2 + y*x + 1, x, y).degree()
2
>>> Poly(x**2 + y*x + y, x, y).degree(y)
1
>>> Poly(0, x).degree()
-oo
"""
j = f._gen_to_level(gen)
if hasattr(f.rep, 'degree'):
return f.rep.degree(j)
else: # pragma: no cover
raise OperationNotSupported(f, 'degree')
def degree_list(f):
"""
Returns a list of degrees of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x**2 + y*x + 1, x, y).degree_list()
(2, 1)
"""
if hasattr(f.rep, 'degree_list'):
return f.rep.degree_list()
else: # pragma: no cover
raise OperationNotSupported(f, 'degree_list')
def total_degree(f):
"""
Returns the total degree of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x**2 + y*x + 1, x, y).total_degree()
2
>>> Poly(x + y**5, x, y).total_degree()
5
"""
if hasattr(f.rep, 'total_degree'):
return f.rep.total_degree()
else: # pragma: no cover
raise OperationNotSupported(f, 'total_degree')
def homogenize(f, s):
"""
Returns the homogeneous polynomial of ``f``.
A homogeneous polynomial is a polynomial whose all monomials with
non-zero coefficients have the same total degree. If you only
want to check if a polynomial is homogeneous, then use
:func:`Poly.is_homogeneous`. If you want not only to check if a
polynomial is homogeneous but also compute its homogeneous order,
then use :func:`Poly.homogeneous_order`.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y, z
>>> f = Poly(x**5 + 2*x**2*y**2 + 9*x*y**3)
>>> f.homogenize(z)
Poly(x**5 + 2*x**2*y**2*z + 9*x*y**3*z, x, y, z, domain='ZZ')
"""
if not isinstance(s, Symbol):
raise TypeError("``Symbol`` expected, got %s" % type(s))
if s in f.gens:
i = f.gens.index(s)
gens = f.gens
else:
i = len(f.gens)
gens = f.gens + (s,)
if hasattr(f.rep, 'homogenize'):
return f.per(f.rep.homogenize(i), gens=gens)
raise OperationNotSupported(f, 'homogeneous_order')
def homogeneous_order(f):
"""
Returns the homogeneous order of ``f``.
A homogeneous polynomial is a polynomial whose all monomials with
non-zero coefficients have the same total degree. This degree is
the homogeneous order of ``f``. If you only want to check if a
polynomial is homogeneous, then use :func:`Poly.is_homogeneous`.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> f = Poly(x**5 + 2*x**3*y**2 + 9*x*y**4)
>>> f.homogeneous_order()
5
"""
if hasattr(f.rep, 'homogeneous_order'):
return f.rep.homogeneous_order()
else: # pragma: no cover
raise OperationNotSupported(f, 'homogeneous_order')
def LC(f, order=None):
"""
Returns the leading coefficient of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(4*x**3 + 2*x**2 + 3*x, x).LC()
4
"""
if order is not None:
return f.coeffs(order)[0]
if hasattr(f.rep, 'LC'):
result = f.rep.LC()
else: # pragma: no cover
raise OperationNotSupported(f, 'LC')
return f.rep.dom.to_sympy(result)
def TC(f):
"""
Returns the trailing coefficient of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**3 + 2*x**2 + 3*x, x).TC()
0
"""
if hasattr(f.rep, 'TC'):
result = f.rep.TC()
else: # pragma: no cover
raise OperationNotSupported(f, 'TC')
return f.rep.dom.to_sympy(result)
def EC(f, order=None):
"""
Returns the last non-zero coefficient of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**3 + 2*x**2 + 3*x, x).EC()
3
"""
if hasattr(f.rep, 'coeffs'):
return f.coeffs(order)[-1]
else: # pragma: no cover
raise OperationNotSupported(f, 'EC')
def coeff_monomial(f, monom):
"""
Returns the coefficient of ``monom`` in ``f`` if there, else None.
Examples
========
>>> from sympy import Poly, exp
>>> from sympy.abc import x, y
>>> p = Poly(24*x*y*exp(8) + 23*x, x, y)
>>> p.coeff_monomial(x)
23
>>> p.coeff_monomial(y)
0
>>> p.coeff_monomial(x*y)
24*exp(8)
Note that ``Expr.coeff()`` behaves differently, collecting terms
if possible; the Poly must be converted to an Expr to use that
method, however:
>>> p.as_expr().coeff(x)
24*y*exp(8) + 23
>>> p.as_expr().coeff(y)
24*x*exp(8)
>>> p.as_expr().coeff(x*y)
24*exp(8)
See Also
========
nth: more efficient query using exponents of the monomial's generators
"""
return f.nth(*Monomial(monom, f.gens).exponents)
def nth(f, *N):
"""
Returns the ``n``-th coefficient of ``f`` where ``N`` are the
exponents of the generators in the term of interest.
Examples
========
>>> from sympy import Poly, sqrt
>>> from sympy.abc import x, y
>>> Poly(x**3 + 2*x**2 + 3*x, x).nth(2)
2
>>> Poly(x**3 + 2*x*y**2 + y**2, x, y).nth(1, 2)
2
>>> Poly(4*sqrt(x)*y)
Poly(4*y*(sqrt(x)), y, sqrt(x), domain='ZZ')
>>> _.nth(1, 1)
4
See Also
========
coeff_monomial
"""
if hasattr(f.rep, 'nth'):
if len(N) != len(f.gens):
raise ValueError('exponent of each generator must be specified')
result = f.rep.nth(*list(map(int, N)))
else: # pragma: no cover
raise OperationNotSupported(f, 'nth')
return f.rep.dom.to_sympy(result)
def coeff(f, x, n=1, right=False):
# the semantics of coeff_monomial and Expr.coeff are different;
# if someone is working with a Poly, they should be aware of the
# differences and chose the method best suited for the query.
# Alternatively, a pure-polys method could be written here but
# at this time the ``right`` keyword would be ignored because Poly
# doesn't work with non-commutatives.
raise NotImplementedError(
'Either convert to Expr with `as_expr` method '
'to use Expr\'s coeff method or else use the '
'`coeff_monomial` method of Polys.')
def LM(f, order=None):
"""
Returns the leading monomial of ``f``.
The Leading monomial signifies the monomial having
the highest power of the principal generator in the
expression f.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(4*x**2 + 2*x*y**2 + x*y + 3*y, x, y).LM()
x**2*y**0
"""
return Monomial(f.monoms(order)[0], f.gens)
def EM(f, order=None):
"""
Returns the last non-zero monomial of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(4*x**2 + 2*x*y**2 + x*y + 3*y, x, y).EM()
x**0*y**1
"""
return Monomial(f.monoms(order)[-1], f.gens)
def LT(f, order=None):
"""
Returns the leading term of ``f``.
The Leading term signifies the term having
the highest power of the principal generator in the
expression f along with its coefficient.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(4*x**2 + 2*x*y**2 + x*y + 3*y, x, y).LT()
(x**2*y**0, 4)
"""
monom, coeff = f.terms(order)[0]
return Monomial(monom, f.gens), coeff
def ET(f, order=None):
"""
Returns the last non-zero term of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(4*x**2 + 2*x*y**2 + x*y + 3*y, x, y).ET()
(x**0*y**1, 3)
"""
monom, coeff = f.terms(order)[-1]
return Monomial(monom, f.gens), coeff
def max_norm(f):
"""
Returns maximum norm of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(-x**2 + 2*x - 3, x).max_norm()
3
"""
if hasattr(f.rep, 'max_norm'):
result = f.rep.max_norm()
else: # pragma: no cover
raise OperationNotSupported(f, 'max_norm')
return f.rep.dom.to_sympy(result)
def l1_norm(f):
"""
Returns l1 norm of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(-x**2 + 2*x - 3, x).l1_norm()
6
"""
if hasattr(f.rep, 'l1_norm'):
result = f.rep.l1_norm()
else: # pragma: no cover
raise OperationNotSupported(f, 'l1_norm')
return f.rep.dom.to_sympy(result)
def clear_denoms(self, convert=False):
"""
Clear denominators, but keep the ground domain.
Examples
========
>>> from sympy import Poly, S, QQ
>>> from sympy.abc import x
>>> f = Poly(x/2 + S(1)/3, x, domain=QQ)
>>> f.clear_denoms()
(6, Poly(3*x + 2, x, domain='QQ'))
>>> f.clear_denoms(convert=True)
(6, Poly(3*x + 2, x, domain='ZZ'))
"""
f = self
if not f.rep.dom.is_Field:
return S.One, f
dom = f.get_domain()
if dom.has_assoc_Ring:
dom = f.rep.dom.get_ring()
if hasattr(f.rep, 'clear_denoms'):
coeff, result = f.rep.clear_denoms()
else: # pragma: no cover
raise OperationNotSupported(f, 'clear_denoms')
coeff, f = dom.to_sympy(coeff), f.per(result)
if not convert or not dom.has_assoc_Ring:
return coeff, f
else:
return coeff, f.to_ring()
def rat_clear_denoms(self, g):
"""
Clear denominators in a rational function ``f/g``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> f = Poly(x**2/y + 1, x)
>>> g = Poly(x**3 + y, x)
>>> p, q = f.rat_clear_denoms(g)
>>> p
Poly(x**2 + y, x, domain='ZZ[y]')
>>> q
Poly(y*x**3 + y**2, x, domain='ZZ[y]')
"""
f = self
dom, per, f, g = f._unify(g)
f = per(f)
g = per(g)
if not (dom.is_Field and dom.has_assoc_Ring):
return f, g
a, f = f.clear_denoms(convert=True)
b, g = g.clear_denoms(convert=True)
f = f.mul_ground(b)
g = g.mul_ground(a)
return f, g
def integrate(self, *specs, **args):
"""
Computes indefinite integral of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x**2 + 2*x + 1, x).integrate()
Poly(1/3*x**3 + x**2 + x, x, domain='QQ')
>>> Poly(x*y**2 + x, x, y).integrate((0, 1), (1, 0))
Poly(1/2*x**2*y**2 + 1/2*x**2, x, y, domain='QQ')
"""
f = self
if args.get('auto', True) and f.rep.dom.is_Ring:
f = f.to_field()
if hasattr(f.rep, 'integrate'):
if not specs:
return f.per(f.rep.integrate(m=1))
rep = f.rep
for spec in specs:
if type(spec) is tuple:
gen, m = spec
else:
gen, m = spec, 1
rep = rep.integrate(int(m), f._gen_to_level(gen))
return f.per(rep)
else: # pragma: no cover
raise OperationNotSupported(f, 'integrate')
def diff(f, *specs, **kwargs):
"""
Computes partial derivative of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x**2 + 2*x + 1, x).diff()
Poly(2*x + 2, x, domain='ZZ')
>>> Poly(x*y**2 + x, x, y).diff((0, 0), (1, 1))
Poly(2*x*y, x, y, domain='ZZ')
"""
if not kwargs.get('evaluate', True):
return Derivative(f, *specs, **kwargs)
if hasattr(f.rep, 'diff'):
if not specs:
return f.per(f.rep.diff(m=1))
rep = f.rep
for spec in specs:
if type(spec) is tuple:
gen, m = spec
else:
gen, m = spec, 1
rep = rep.diff(int(m), f._gen_to_level(gen))
return f.per(rep)
else: # pragma: no cover
raise OperationNotSupported(f, 'diff')
_eval_derivative = diff
def eval(self, x, a=None, auto=True):
"""
Evaluate ``f`` at ``a`` in the given variable.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y, z
>>> Poly(x**2 + 2*x + 3, x).eval(2)
11
>>> Poly(2*x*y + 3*x + y + 2, x, y).eval(x, 2)
Poly(5*y + 8, y, domain='ZZ')
>>> f = Poly(2*x*y + 3*x + y + 2*z, x, y, z)
>>> f.eval({x: 2})
Poly(5*y + 2*z + 6, y, z, domain='ZZ')
>>> f.eval({x: 2, y: 5})
Poly(2*z + 31, z, domain='ZZ')
>>> f.eval({x: 2, y: 5, z: 7})
45
>>> f.eval((2, 5))
Poly(2*z + 31, z, domain='ZZ')
>>> f(2, 5)
Poly(2*z + 31, z, domain='ZZ')
"""
f = self
if a is None:
if isinstance(x, dict):
mapping = x
for gen, value in mapping.items():
f = f.eval(gen, value)
return f
elif isinstance(x, (tuple, list)):
values = x
if len(values) > len(f.gens):
raise ValueError("too many values provided")
for gen, value in zip(f.gens, values):
f = f.eval(gen, value)
return f
else:
j, a = 0, x
else:
j = f._gen_to_level(x)
if not hasattr(f.rep, 'eval'): # pragma: no cover
raise OperationNotSupported(f, 'eval')
try:
result = f.rep.eval(a, j)
except CoercionFailed:
if not auto:
raise DomainError("can't evaluate at %s in %s" % (a, f.rep.dom))
else:
a_domain, [a] = construct_domain([a])
new_domain = f.get_domain().unify_with_symbols(a_domain, f.gens)
f = f.set_domain(new_domain)
a = new_domain.convert(a, a_domain)
result = f.rep.eval(a, j)
return f.per(result, remove=j)
def __call__(f, *values):
"""
Evaluate ``f`` at the give values.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y, z
>>> f = Poly(2*x*y + 3*x + y + 2*z, x, y, z)
>>> f(2)
Poly(5*y + 2*z + 6, y, z, domain='ZZ')
>>> f(2, 5)
Poly(2*z + 31, z, domain='ZZ')
>>> f(2, 5, 7)
45
"""
return f.eval(values)
def half_gcdex(f, g, auto=True):
"""
Half extended Euclidean algorithm of ``f`` and ``g``.
Returns ``(s, h)`` such that ``h = gcd(f, g)`` and ``s*f = h (mod g)``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> f = x**4 - 2*x**3 - 6*x**2 + 12*x + 15
>>> g = x**3 + x**2 - 4*x - 4
>>> Poly(f).half_gcdex(Poly(g))
(Poly(-1/5*x + 3/5, x, domain='QQ'), Poly(x + 1, x, domain='QQ'))
"""
dom, per, F, G = f._unify(g)
if auto and dom.is_Ring:
F, G = F.to_field(), G.to_field()
if hasattr(f.rep, 'half_gcdex'):
s, h = F.half_gcdex(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'half_gcdex')
return per(s), per(h)
def gcdex(f, g, auto=True):
"""
Extended Euclidean algorithm of ``f`` and ``g``.
Returns ``(s, t, h)`` such that ``h = gcd(f, g)`` and ``s*f + t*g = h``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> f = x**4 - 2*x**3 - 6*x**2 + 12*x + 15
>>> g = x**3 + x**2 - 4*x - 4
>>> Poly(f).gcdex(Poly(g))
(Poly(-1/5*x + 3/5, x, domain='QQ'),
Poly(1/5*x**2 - 6/5*x + 2, x, domain='QQ'),
Poly(x + 1, x, domain='QQ'))
"""
dom, per, F, G = f._unify(g)
if auto and dom.is_Ring:
F, G = F.to_field(), G.to_field()
if hasattr(f.rep, 'gcdex'):
s, t, h = F.gcdex(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'gcdex')
return per(s), per(t), per(h)
def invert(f, g, auto=True):
"""
Invert ``f`` modulo ``g`` when possible.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 - 1, x).invert(Poly(2*x - 1, x))
Poly(-4/3, x, domain='QQ')
>>> Poly(x**2 - 1, x).invert(Poly(x - 1, x))
Traceback (most recent call last):
...
NotInvertible: zero divisor
"""
dom, per, F, G = f._unify(g)
if auto and dom.is_Ring:
F, G = F.to_field(), G.to_field()
if hasattr(f.rep, 'invert'):
result = F.invert(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'invert')
return per(result)
def revert(f, n):
"""
Compute ``f**(-1)`` mod ``x**n``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(1, x).revert(2)
Poly(1, x, domain='ZZ')
>>> Poly(1 + x, x).revert(1)
Poly(1, x, domain='ZZ')
>>> Poly(x**2 - 1, x).revert(1)
Traceback (most recent call last):
...
NotReversible: only unity is reversible in a ring
>>> Poly(1/x, x).revert(1)
Traceback (most recent call last):
...
PolynomialError: 1/x contains an element of the generators set
"""
if hasattr(f.rep, 'revert'):
result = f.rep.revert(int(n))
else: # pragma: no cover
raise OperationNotSupported(f, 'revert')
return f.per(result)
def subresultants(f, g):
"""
Computes the subresultant PRS of ``f`` and ``g``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 + 1, x).subresultants(Poly(x**2 - 1, x))
[Poly(x**2 + 1, x, domain='ZZ'),
Poly(x**2 - 1, x, domain='ZZ'),
Poly(-2, x, domain='ZZ')]
"""
_, per, F, G = f._unify(g)
if hasattr(f.rep, 'subresultants'):
result = F.subresultants(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'subresultants')
return list(map(per, result))
def resultant(f, g, includePRS=False):
"""
Computes the resultant of ``f`` and ``g`` via PRS.
If includePRS=True, it includes the subresultant PRS in the result.
Because the PRS is used to calculate the resultant, this is more
efficient than calling :func:`subresultants` separately.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> f = Poly(x**2 + 1, x)
>>> f.resultant(Poly(x**2 - 1, x))
4
>>> f.resultant(Poly(x**2 - 1, x), includePRS=True)
(4, [Poly(x**2 + 1, x, domain='ZZ'), Poly(x**2 - 1, x, domain='ZZ'),
Poly(-2, x, domain='ZZ')])
"""
_, per, F, G = f._unify(g)
if hasattr(f.rep, 'resultant'):
if includePRS:
result, R = F.resultant(G, includePRS=includePRS)
else:
result = F.resultant(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'resultant')
if includePRS:
return (per(result, remove=0), list(map(per, R)))
return per(result, remove=0)
def discriminant(f):
"""
Computes the discriminant of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 + 2*x + 3, x).discriminant()
-8
"""
if hasattr(f.rep, 'discriminant'):
result = f.rep.discriminant()
else: # pragma: no cover
raise OperationNotSupported(f, 'discriminant')
return f.per(result, remove=0)
def dispersionset(f, g=None):
r"""Compute the *dispersion set* of two polynomials.
For two polynomials `f(x)` and `g(x)` with `\deg f > 0`
and `\deg g > 0` the dispersion set `\operatorname{J}(f, g)` is defined as:
.. math::
\operatorname{J}(f, g)
& := \{a \in \mathbb{N}_0 | \gcd(f(x), g(x+a)) \neq 1\} \\
& = \{a \in \mathbb{N}_0 | \deg \gcd(f(x), g(x+a)) \geq 1\}
For a single polynomial one defines `\operatorname{J}(f) := \operatorname{J}(f, f)`.
Examples
========
>>> from sympy import poly
>>> from sympy.polys.dispersion import dispersion, dispersionset
>>> from sympy.abc import x
Dispersion set and dispersion of a simple polynomial:
>>> fp = poly((x - 3)*(x + 3), x)
>>> sorted(dispersionset(fp))
[0, 6]
>>> dispersion(fp)
6
Note that the definition of the dispersion is not symmetric:
>>> fp = poly(x**4 - 3*x**2 + 1, x)
>>> gp = fp.shift(-3)
>>> sorted(dispersionset(fp, gp))
[2, 3, 4]
>>> dispersion(fp, gp)
4
>>> sorted(dispersionset(gp, fp))
[]
>>> dispersion(gp, fp)
-oo
Computing the dispersion also works over field extensions:
>>> from sympy import sqrt
>>> fp = poly(x**2 + sqrt(5)*x - 1, x, domain='QQ<sqrt(5)>')
>>> gp = poly(x**2 + (2 + sqrt(5))*x + sqrt(5), x, domain='QQ<sqrt(5)>')
>>> sorted(dispersionset(fp, gp))
[2]
>>> sorted(dispersionset(gp, fp))
[1, 4]
We can even perform the computations for polynomials
having symbolic coefficients:
>>> from sympy.abc import a
>>> fp = poly(4*x**4 + (4*a + 8)*x**3 + (a**2 + 6*a + 4)*x**2 + (a**2 + 2*a)*x, x)
>>> sorted(dispersionset(fp))
[0, 1]
See Also
========
dispersion
References
==========
1. [ManWright94]_
2. [Koepf98]_
3. [Abramov71]_
4. [Man93]_
"""
from sympy.polys.dispersion import dispersionset
return dispersionset(f, g)
def dispersion(f, g=None):
r"""Compute the *dispersion* of polynomials.
For two polynomials `f(x)` and `g(x)` with `\deg f > 0`
and `\deg g > 0` the dispersion `\operatorname{dis}(f, g)` is defined as:
.. math::
\operatorname{dis}(f, g)
& := \max\{ J(f,g) \cup \{0\} \} \\
& = \max\{ \{a \in \mathbb{N} | \gcd(f(x), g(x+a)) \neq 1\} \cup \{0\} \}
and for a single polynomial `\operatorname{dis}(f) := \operatorname{dis}(f, f)`.
Examples
========
>>> from sympy import poly
>>> from sympy.polys.dispersion import dispersion, dispersionset
>>> from sympy.abc import x
Dispersion set and dispersion of a simple polynomial:
>>> fp = poly((x - 3)*(x + 3), x)
>>> sorted(dispersionset(fp))
[0, 6]
>>> dispersion(fp)
6
Note that the definition of the dispersion is not symmetric:
>>> fp = poly(x**4 - 3*x**2 + 1, x)
>>> gp = fp.shift(-3)
>>> sorted(dispersionset(fp, gp))
[2, 3, 4]
>>> dispersion(fp, gp)
4
>>> sorted(dispersionset(gp, fp))
[]
>>> dispersion(gp, fp)
-oo
Computing the dispersion also works over field extensions:
>>> from sympy import sqrt
>>> fp = poly(x**2 + sqrt(5)*x - 1, x, domain='QQ<sqrt(5)>')
>>> gp = poly(x**2 + (2 + sqrt(5))*x + sqrt(5), x, domain='QQ<sqrt(5)>')
>>> sorted(dispersionset(fp, gp))
[2]
>>> sorted(dispersionset(gp, fp))
[1, 4]
We can even perform the computations for polynomials
having symbolic coefficients:
>>> from sympy.abc import a
>>> fp = poly(4*x**4 + (4*a + 8)*x**3 + (a**2 + 6*a + 4)*x**2 + (a**2 + 2*a)*x, x)
>>> sorted(dispersionset(fp))
[0, 1]
See Also
========
dispersionset
References
==========
1. [ManWright94]_
2. [Koepf98]_
3. [Abramov71]_
4. [Man93]_
"""
from sympy.polys.dispersion import dispersion
return dispersion(f, g)
def cofactors(f, g):
"""
Returns the GCD of ``f`` and ``g`` and their cofactors.
Returns polynomials ``(h, cff, cfg)`` such that ``h = gcd(f, g)``, and
``cff = quo(f, h)`` and ``cfg = quo(g, h)`` are, so called, cofactors
of ``f`` and ``g``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 - 1, x).cofactors(Poly(x**2 - 3*x + 2, x))
(Poly(x - 1, x, domain='ZZ'),
Poly(x + 1, x, domain='ZZ'),
Poly(x - 2, x, domain='ZZ'))
"""
_, per, F, G = f._unify(g)
if hasattr(f.rep, 'cofactors'):
h, cff, cfg = F.cofactors(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'cofactors')
return per(h), per(cff), per(cfg)
def gcd(f, g):
"""
Returns the polynomial GCD of ``f`` and ``g``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 - 1, x).gcd(Poly(x**2 - 3*x + 2, x))
Poly(x - 1, x, domain='ZZ')
"""
_, per, F, G = f._unify(g)
if hasattr(f.rep, 'gcd'):
result = F.gcd(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'gcd')
return per(result)
def lcm(f, g):
"""
Returns polynomial LCM of ``f`` and ``g``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 - 1, x).lcm(Poly(x**2 - 3*x + 2, x))
Poly(x**3 - 2*x**2 - x + 2, x, domain='ZZ')
"""
_, per, F, G = f._unify(g)
if hasattr(f.rep, 'lcm'):
result = F.lcm(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'lcm')
return per(result)
def trunc(f, p):
"""
Reduce ``f`` modulo a constant ``p``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(2*x**3 + 3*x**2 + 5*x + 7, x).trunc(3)
Poly(-x**3 - x + 1, x, domain='ZZ')
"""
p = f.rep.dom.convert(p)
if hasattr(f.rep, 'trunc'):
result = f.rep.trunc(p)
else: # pragma: no cover
raise OperationNotSupported(f, 'trunc')
return f.per(result)
def monic(self, auto=True):
"""
Divides all coefficients by ``LC(f)``.
Examples
========
>>> from sympy import Poly, ZZ
>>> from sympy.abc import x
>>> Poly(3*x**2 + 6*x + 9, x, domain=ZZ).monic()
Poly(x**2 + 2*x + 3, x, domain='QQ')
>>> Poly(3*x**2 + 4*x + 2, x, domain=ZZ).monic()
Poly(x**2 + 4/3*x + 2/3, x, domain='QQ')
"""
f = self
if auto and f.rep.dom.is_Ring:
f = f.to_field()
if hasattr(f.rep, 'monic'):
result = f.rep.monic()
else: # pragma: no cover
raise OperationNotSupported(f, 'monic')
return f.per(result)
def content(f):
"""
Returns the GCD of polynomial coefficients.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(6*x**2 + 8*x + 12, x).content()
2
"""
if hasattr(f.rep, 'content'):
result = f.rep.content()
else: # pragma: no cover
raise OperationNotSupported(f, 'content')
return f.rep.dom.to_sympy(result)
def primitive(f):
"""
Returns the content and a primitive form of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(2*x**2 + 8*x + 12, x).primitive()
(2, Poly(x**2 + 4*x + 6, x, domain='ZZ'))
"""
if hasattr(f.rep, 'primitive'):
cont, result = f.rep.primitive()
else: # pragma: no cover
raise OperationNotSupported(f, 'primitive')
return f.rep.dom.to_sympy(cont), f.per(result)
def compose(f, g):
"""
Computes the functional composition of ``f`` and ``g``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 + x, x).compose(Poly(x - 1, x))
Poly(x**2 - x, x, domain='ZZ')
"""
_, per, F, G = f._unify(g)
if hasattr(f.rep, 'compose'):
result = F.compose(G)
else: # pragma: no cover
raise OperationNotSupported(f, 'compose')
return per(result)
def decompose(f):
"""
Computes a functional decomposition of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**4 + 2*x**3 - x - 1, x, domain='ZZ').decompose()
[Poly(x**2 - x - 1, x, domain='ZZ'), Poly(x**2 + x, x, domain='ZZ')]
"""
if hasattr(f.rep, 'decompose'):
result = f.rep.decompose()
else: # pragma: no cover
raise OperationNotSupported(f, 'decompose')
return list(map(f.per, result))
def shift(f, a):
"""
Efficiently compute Taylor shift ``f(x + a)``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 - 2*x + 1, x).shift(2)
Poly(x**2 + 2*x + 1, x, domain='ZZ')
"""
if hasattr(f.rep, 'shift'):
result = f.rep.shift(a)
else: # pragma: no cover
raise OperationNotSupported(f, 'shift')
return f.per(result)
def transform(f, p, q):
"""
Efficiently evaluate the functional transformation ``q**n * f(p/q)``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 - 2*x + 1, x).transform(Poly(x + 1, x), Poly(x - 1, x))
Poly(4, x, domain='ZZ')
"""
P, Q = p.unify(q)
F, P = f.unify(P)
F, Q = F.unify(Q)
if hasattr(F.rep, 'transform'):
result = F.rep.transform(P.rep, Q.rep)
else: # pragma: no cover
raise OperationNotSupported(F, 'transform')
return F.per(result)
def sturm(self, auto=True):
"""
Computes the Sturm sequence of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**3 - 2*x**2 + x - 3, x).sturm()
[Poly(x**3 - 2*x**2 + x - 3, x, domain='QQ'),
Poly(3*x**2 - 4*x + 1, x, domain='QQ'),
Poly(2/9*x + 25/9, x, domain='QQ'),
Poly(-2079/4, x, domain='QQ')]
"""
f = self
if auto and f.rep.dom.is_Ring:
f = f.to_field()
if hasattr(f.rep, 'sturm'):
result = f.rep.sturm()
else: # pragma: no cover
raise OperationNotSupported(f, 'sturm')
return list(map(f.per, result))
def gff_list(f):
"""
Computes greatest factorial factorization of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> f = x**5 + 2*x**4 - x**3 - 2*x**2
>>> Poly(f).gff_list()
[(Poly(x, x, domain='ZZ'), 1), (Poly(x + 2, x, domain='ZZ'), 4)]
"""
if hasattr(f.rep, 'gff_list'):
result = f.rep.gff_list()
else: # pragma: no cover
raise OperationNotSupported(f, 'gff_list')
return [(f.per(g), k) for g, k in result]
def norm(f):
"""
Computes the product, ``Norm(f)``, of the conjugates of
a polynomial ``f`` defined over a number field ``K``.
Examples
========
>>> from sympy import Poly, sqrt
>>> from sympy.abc import x
>>> a, b = sqrt(2), sqrt(3)
A polynomial over a quadratic extension.
Two conjugates x - a and x + a.
>>> f = Poly(x - a, x, extension=a)
>>> f.norm()
Poly(x**2 - 2, x, domain='QQ')
A polynomial over a quartic extension.
Four conjugates x - a, x - a, x + a and x + a.
>>> f = Poly(x - a, x, extension=(a, b))
>>> f.norm()
Poly(x**4 - 4*x**2 + 4, x, domain='QQ')
"""
if hasattr(f.rep, 'norm'):
r = f.rep.norm()
else: # pragma: no cover
raise OperationNotSupported(f, 'norm')
return f.per(r)
def sqf_norm(f):
"""
Computes square-free norm of ``f``.
Returns ``s``, ``f``, ``r``, such that ``g(x) = f(x-sa)`` and
``r(x) = Norm(g(x))`` is a square-free polynomial over ``K``,
where ``a`` is the algebraic extension of the ground domain.
Examples
========
>>> from sympy import Poly, sqrt
>>> from sympy.abc import x
>>> s, f, r = Poly(x**2 + 1, x, extension=[sqrt(3)]).sqf_norm()
>>> s
1
>>> f
Poly(x**2 - 2*sqrt(3)*x + 4, x, domain='QQ<sqrt(3)>')
>>> r
Poly(x**4 - 4*x**2 + 16, x, domain='QQ')
"""
if hasattr(f.rep, 'sqf_norm'):
s, g, r = f.rep.sqf_norm()
else: # pragma: no cover
raise OperationNotSupported(f, 'sqf_norm')
return s, f.per(g), f.per(r)
def sqf_part(f):
"""
Computes square-free part of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**3 - 3*x - 2, x).sqf_part()
Poly(x**2 - x - 2, x, domain='ZZ')
"""
if hasattr(f.rep, 'sqf_part'):
result = f.rep.sqf_part()
else: # pragma: no cover
raise OperationNotSupported(f, 'sqf_part')
return f.per(result)
def sqf_list(f, all=False):
"""
Returns a list of square-free factors of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> f = 2*x**5 + 16*x**4 + 50*x**3 + 76*x**2 + 56*x + 16
>>> Poly(f).sqf_list()
(2, [(Poly(x + 1, x, domain='ZZ'), 2),
(Poly(x + 2, x, domain='ZZ'), 3)])
>>> Poly(f).sqf_list(all=True)
(2, [(Poly(1, x, domain='ZZ'), 1),
(Poly(x + 1, x, domain='ZZ'), 2),
(Poly(x + 2, x, domain='ZZ'), 3)])
"""
if hasattr(f.rep, 'sqf_list'):
coeff, factors = f.rep.sqf_list(all)
else: # pragma: no cover
raise OperationNotSupported(f, 'sqf_list')
return f.rep.dom.to_sympy(coeff), [(f.per(g), k) for g, k in factors]
def sqf_list_include(f, all=False):
"""
Returns a list of square-free factors of ``f``.
Examples
========
>>> from sympy import Poly, expand
>>> from sympy.abc import x
>>> f = expand(2*(x + 1)**3*x**4)
>>> f
2*x**7 + 6*x**6 + 6*x**5 + 2*x**4
>>> Poly(f).sqf_list_include()
[(Poly(2, x, domain='ZZ'), 1),
(Poly(x + 1, x, domain='ZZ'), 3),
(Poly(x, x, domain='ZZ'), 4)]
>>> Poly(f).sqf_list_include(all=True)
[(Poly(2, x, domain='ZZ'), 1),
(Poly(1, x, domain='ZZ'), 2),
(Poly(x + 1, x, domain='ZZ'), 3),
(Poly(x, x, domain='ZZ'), 4)]
"""
if hasattr(f.rep, 'sqf_list_include'):
factors = f.rep.sqf_list_include(all)
else: # pragma: no cover
raise OperationNotSupported(f, 'sqf_list_include')
return [(f.per(g), k) for g, k in factors]
def factor_list(f):
"""
Returns a list of irreducible factors of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> f = 2*x**5 + 2*x**4*y + 4*x**3 + 4*x**2*y + 2*x + 2*y
>>> Poly(f).factor_list()
(2, [(Poly(x + y, x, y, domain='ZZ'), 1),
(Poly(x**2 + 1, x, y, domain='ZZ'), 2)])
"""
if hasattr(f.rep, 'factor_list'):
try:
coeff, factors = f.rep.factor_list()
except DomainError:
return S.One, [(f, 1)]
else: # pragma: no cover
raise OperationNotSupported(f, 'factor_list')
return f.rep.dom.to_sympy(coeff), [(f.per(g), k) for g, k in factors]
def factor_list_include(f):
"""
Returns a list of irreducible factors of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> f = 2*x**5 + 2*x**4*y + 4*x**3 + 4*x**2*y + 2*x + 2*y
>>> Poly(f).factor_list_include()
[(Poly(2*x + 2*y, x, y, domain='ZZ'), 1),
(Poly(x**2 + 1, x, y, domain='ZZ'), 2)]
"""
if hasattr(f.rep, 'factor_list_include'):
try:
factors = f.rep.factor_list_include()
except DomainError:
return [(f, 1)]
else: # pragma: no cover
raise OperationNotSupported(f, 'factor_list_include')
return [(f.per(g), k) for g, k in factors]
def intervals(f, all=False, eps=None, inf=None, sup=None, fast=False, sqf=False):
"""
Compute isolating intervals for roots of ``f``.
For real roots the Vincent-Akritas-Strzebonski (VAS) continued fractions method is used.
References
==========
.. [#] Alkiviadis G. Akritas and Adam W. Strzebonski: A Comparative Study of Two Real Root
Isolation Methods . Nonlinear Analysis: Modelling and Control, Vol. 10, No. 4, 297-304, 2005.
.. [#] Alkiviadis G. Akritas, Adam W. Strzebonski and Panagiotis S. Vigklas: Improving the
Performance of the Continued Fractions Method Using new Bounds of Positive Roots. Nonlinear
Analysis: Modelling and Control, Vol. 13, No. 3, 265-279, 2008.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 - 3, x).intervals()
[((-2, -1), 1), ((1, 2), 1)]
>>> Poly(x**2 - 3, x).intervals(eps=1e-2)
[((-26/15, -19/11), 1), ((19/11, 26/15), 1)]
"""
if eps is not None:
eps = QQ.convert(eps)
if eps <= 0:
raise ValueError("'eps' must be a positive rational")
if inf is not None:
inf = QQ.convert(inf)
if sup is not None:
sup = QQ.convert(sup)
if hasattr(f.rep, 'intervals'):
result = f.rep.intervals(
all=all, eps=eps, inf=inf, sup=sup, fast=fast, sqf=sqf)
else: # pragma: no cover
raise OperationNotSupported(f, 'intervals')
if sqf:
def _real(interval):
s, t = interval
return (QQ.to_sympy(s), QQ.to_sympy(t))
if not all:
return list(map(_real, result))
def _complex(rectangle):
(u, v), (s, t) = rectangle
return (QQ.to_sympy(u) + I*QQ.to_sympy(v),
QQ.to_sympy(s) + I*QQ.to_sympy(t))
real_part, complex_part = result
return list(map(_real, real_part)), list(map(_complex, complex_part))
else:
def _real(interval):
(s, t), k = interval
return ((QQ.to_sympy(s), QQ.to_sympy(t)), k)
if not all:
return list(map(_real, result))
def _complex(rectangle):
((u, v), (s, t)), k = rectangle
return ((QQ.to_sympy(u) + I*QQ.to_sympy(v),
QQ.to_sympy(s) + I*QQ.to_sympy(t)), k)
real_part, complex_part = result
return list(map(_real, real_part)), list(map(_complex, complex_part))
def refine_root(f, s, t, eps=None, steps=None, fast=False, check_sqf=False):
"""
Refine an isolating interval of a root to the given precision.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 - 3, x).refine_root(1, 2, eps=1e-2)
(19/11, 26/15)
"""
if check_sqf and not f.is_sqf:
raise PolynomialError("only square-free polynomials supported")
s, t = QQ.convert(s), QQ.convert(t)
if eps is not None:
eps = QQ.convert(eps)
if eps <= 0:
raise ValueError("'eps' must be a positive rational")
if steps is not None:
steps = int(steps)
elif eps is None:
steps = 1
if hasattr(f.rep, 'refine_root'):
S, T = f.rep.refine_root(s, t, eps=eps, steps=steps, fast=fast)
else: # pragma: no cover
raise OperationNotSupported(f, 'refine_root')
return QQ.to_sympy(S), QQ.to_sympy(T)
def count_roots(f, inf=None, sup=None):
"""
Return the number of roots of ``f`` in ``[inf, sup]`` interval.
Examples
========
>>> from sympy import Poly, I
>>> from sympy.abc import x
>>> Poly(x**4 - 4, x).count_roots(-3, 3)
2
>>> Poly(x**4 - 4, x).count_roots(0, 1 + 3*I)
1
"""
inf_real, sup_real = True, True
if inf is not None:
inf = sympify(inf)
if inf is S.NegativeInfinity:
inf = None
else:
re, im = inf.as_real_imag()
if not im:
inf = QQ.convert(inf)
else:
inf, inf_real = list(map(QQ.convert, (re, im))), False
if sup is not None:
sup = sympify(sup)
if sup is S.Infinity:
sup = None
else:
re, im = sup.as_real_imag()
if not im:
sup = QQ.convert(sup)
else:
sup, sup_real = list(map(QQ.convert, (re, im))), False
if inf_real and sup_real:
if hasattr(f.rep, 'count_real_roots'):
count = f.rep.count_real_roots(inf=inf, sup=sup)
else: # pragma: no cover
raise OperationNotSupported(f, 'count_real_roots')
else:
if inf_real and inf is not None:
inf = (inf, QQ.zero)
if sup_real and sup is not None:
sup = (sup, QQ.zero)
if hasattr(f.rep, 'count_complex_roots'):
count = f.rep.count_complex_roots(inf=inf, sup=sup)
else: # pragma: no cover
raise OperationNotSupported(f, 'count_complex_roots')
return Integer(count)
def root(f, index, radicals=True):
"""
Get an indexed root of a polynomial.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> f = Poly(2*x**3 - 7*x**2 + 4*x + 4)
>>> f.root(0)
-1/2
>>> f.root(1)
2
>>> f.root(2)
2
>>> f.root(3)
Traceback (most recent call last):
...
IndexError: root index out of [-3, 2] range, got 3
>>> Poly(x**5 + x + 1).root(0)
CRootOf(x**3 - x**2 + 1, 0)
"""
return sympy.polys.rootoftools.rootof(f, index, radicals=radicals)
def real_roots(f, multiple=True, radicals=True):
"""
Return a list of real roots with multiplicities.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(2*x**3 - 7*x**2 + 4*x + 4).real_roots()
[-1/2, 2, 2]
>>> Poly(x**3 + x + 1).real_roots()
[CRootOf(x**3 + x + 1, 0)]
"""
reals = sympy.polys.rootoftools.CRootOf.real_roots(f, radicals=radicals)
if multiple:
return reals
else:
return group(reals, multiple=False)
def all_roots(f, multiple=True, radicals=True):
"""
Return a list of real and complex roots with multiplicities.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(2*x**3 - 7*x**2 + 4*x + 4).all_roots()
[-1/2, 2, 2]
>>> Poly(x**3 + x + 1).all_roots()
[CRootOf(x**3 + x + 1, 0),
CRootOf(x**3 + x + 1, 1),
CRootOf(x**3 + x + 1, 2)]
"""
roots = sympy.polys.rootoftools.CRootOf.all_roots(f, radicals=radicals)
if multiple:
return roots
else:
return group(roots, multiple=False)
def nroots(f, n=15, maxsteps=50, cleanup=True):
"""
Compute numerical approximations of roots of ``f``.
Parameters
==========
n ... the number of digits to calculate
maxsteps ... the maximum number of iterations to do
If the accuracy `n` cannot be reached in `maxsteps`, it will raise an
exception. You need to rerun with higher maxsteps.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 - 3).nroots(n=15)
[-1.73205080756888, 1.73205080756888]
>>> Poly(x**2 - 3).nroots(n=30)
[-1.73205080756887729352744634151, 1.73205080756887729352744634151]
"""
from sympy.functions.elementary.complexes import sign
if f.is_multivariate:
raise MultivariatePolynomialError(
"can't compute numerical roots of %s" % f)
if f.degree() <= 0:
return []
# For integer and rational coefficients, convert them to integers only
# (for accuracy). Otherwise just try to convert the coefficients to
# mpmath.mpc and raise an exception if the conversion fails.
if f.rep.dom is ZZ:
coeffs = [int(coeff) for coeff in f.all_coeffs()]
elif f.rep.dom is QQ:
denoms = [coeff.q for coeff in f.all_coeffs()]
from sympy.core.numbers import ilcm
fac = ilcm(*denoms)
coeffs = [int(coeff*fac) for coeff in f.all_coeffs()]
else:
coeffs = [coeff.evalf(n=n).as_real_imag()
for coeff in f.all_coeffs()]
try:
coeffs = [mpmath.mpc(*coeff) for coeff in coeffs]
except TypeError:
raise DomainError("Numerical domain expected, got %s" % \
f.rep.dom)
dps = mpmath.mp.dps
mpmath.mp.dps = n
try:
# We need to add extra precision to guard against losing accuracy.
# 10 times the degree of the polynomial seems to work well.
roots = mpmath.polyroots(coeffs, maxsteps=maxsteps,
cleanup=cleanup, error=False, extraprec=f.degree()*10)
# Mpmath puts real roots first, then complex ones (as does all_roots)
# so we make sure this convention holds here, too.
roots = list(map(sympify,
sorted(roots, key=lambda r: (1 if r.imag else 0, r.real, abs(r.imag), sign(r.imag)))))
except NoConvergence:
raise NoConvergence(
'convergence to root failed; try n < %s or maxsteps > %s' % (
n, maxsteps))
finally:
mpmath.mp.dps = dps
return roots
def ground_roots(f):
"""
Compute roots of ``f`` by factorization in the ground domain.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**6 - 4*x**4 + 4*x**3 - x**2).ground_roots()
{0: 2, 1: 2}
"""
if f.is_multivariate:
raise MultivariatePolynomialError(
"can't compute ground roots of %s" % f)
roots = {}
for factor, k in f.factor_list()[1]:
if factor.is_linear:
a, b = factor.all_coeffs()
roots[-b/a] = k
return roots
def nth_power_roots_poly(f, n):
"""
Construct a polynomial with n-th powers of roots of ``f``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> f = Poly(x**4 - x**2 + 1)
>>> f.nth_power_roots_poly(2)
Poly(x**4 - 2*x**3 + 3*x**2 - 2*x + 1, x, domain='ZZ')
>>> f.nth_power_roots_poly(3)
Poly(x**4 + 2*x**2 + 1, x, domain='ZZ')
>>> f.nth_power_roots_poly(4)
Poly(x**4 + 2*x**3 + 3*x**2 + 2*x + 1, x, domain='ZZ')
>>> f.nth_power_roots_poly(12)
Poly(x**4 - 4*x**3 + 6*x**2 - 4*x + 1, x, domain='ZZ')
"""
if f.is_multivariate:
raise MultivariatePolynomialError(
"must be a univariate polynomial")
N = sympify(n)
if N.is_Integer and N >= 1:
n = int(N)
else:
raise ValueError("'n' must an integer and n >= 1, got %s" % n)
x = f.gen
t = Dummy('t')
r = f.resultant(f.__class__.from_expr(x**n - t, x, t))
return r.replace(t, x)
def cancel(f, g, include=False):
"""
Cancel common factors in a rational function ``f/g``.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(2*x**2 - 2, x).cancel(Poly(x**2 - 2*x + 1, x))
(1, Poly(2*x + 2, x, domain='ZZ'), Poly(x - 1, x, domain='ZZ'))
>>> Poly(2*x**2 - 2, x).cancel(Poly(x**2 - 2*x + 1, x), include=True)
(Poly(2*x + 2, x, domain='ZZ'), Poly(x - 1, x, domain='ZZ'))
"""
dom, per, F, G = f._unify(g)
if hasattr(F, 'cancel'):
result = F.cancel(G, include=include)
else: # pragma: no cover
raise OperationNotSupported(f, 'cancel')
if not include:
if dom.has_assoc_Ring:
dom = dom.get_ring()
cp, cq, p, q = result
cp = dom.to_sympy(cp)
cq = dom.to_sympy(cq)
return cp/cq, per(p), per(q)
else:
return tuple(map(per, result))
@property
def is_zero(f):
"""
Returns ``True`` if ``f`` is a zero polynomial.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(0, x).is_zero
True
>>> Poly(1, x).is_zero
False
"""
return f.rep.is_zero
@property
def is_one(f):
"""
Returns ``True`` if ``f`` is a unit polynomial.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(0, x).is_one
False
>>> Poly(1, x).is_one
True
"""
return f.rep.is_one
@property
def is_sqf(f):
"""
Returns ``True`` if ``f`` is a square-free polynomial.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 - 2*x + 1, x).is_sqf
False
>>> Poly(x**2 - 1, x).is_sqf
True
"""
return f.rep.is_sqf
@property
def is_monic(f):
"""
Returns ``True`` if the leading coefficient of ``f`` is one.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x + 2, x).is_monic
True
>>> Poly(2*x + 2, x).is_monic
False
"""
return f.rep.is_monic
@property
def is_primitive(f):
"""
Returns ``True`` if GCD of the coefficients of ``f`` is one.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(2*x**2 + 6*x + 12, x).is_primitive
False
>>> Poly(x**2 + 3*x + 6, x).is_primitive
True
"""
return f.rep.is_primitive
@property
def is_ground(f):
"""
Returns ``True`` if ``f`` is an element of the ground domain.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x, x).is_ground
False
>>> Poly(2, x).is_ground
True
>>> Poly(y, x).is_ground
True
"""
return f.rep.is_ground
@property
def is_linear(f):
"""
Returns ``True`` if ``f`` is linear in all its variables.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x + y + 2, x, y).is_linear
True
>>> Poly(x*y + 2, x, y).is_linear
False
"""
return f.rep.is_linear
@property
def is_quadratic(f):
"""
Returns ``True`` if ``f`` is quadratic in all its variables.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x*y + 2, x, y).is_quadratic
True
>>> Poly(x*y**2 + 2, x, y).is_quadratic
False
"""
return f.rep.is_quadratic
@property
def is_monomial(f):
"""
Returns ``True`` if ``f`` is zero or has only one term.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(3*x**2, x).is_monomial
True
>>> Poly(3*x**2 + 1, x).is_monomial
False
"""
return f.rep.is_monomial
@property
def is_homogeneous(f):
"""
Returns ``True`` if ``f`` is a homogeneous polynomial.
A homogeneous polynomial is a polynomial whose all monomials with
non-zero coefficients have the same total degree. If you want not
only to check if a polynomial is homogeneous but also compute its
homogeneous order, then use :func:`Poly.homogeneous_order`.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x**2 + x*y, x, y).is_homogeneous
True
>>> Poly(x**3 + x*y, x, y).is_homogeneous
False
"""
return f.rep.is_homogeneous
@property
def is_irreducible(f):
"""
Returns ``True`` if ``f`` has no factors over its domain.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> Poly(x**2 + x + 1, x, modulus=2).is_irreducible
True
>>> Poly(x**2 + 1, x, modulus=2).is_irreducible
False
"""
return f.rep.is_irreducible
@property
def is_univariate(f):
"""
Returns ``True`` if ``f`` is a univariate polynomial.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x**2 + x + 1, x).is_univariate
True
>>> Poly(x*y**2 + x*y + 1, x, y).is_univariate
False
>>> Poly(x*y**2 + x*y + 1, x).is_univariate
True
>>> Poly(x**2 + x + 1, x, y).is_univariate
False
"""
return len(f.gens) == 1
@property
def is_multivariate(f):
"""
Returns ``True`` if ``f`` is a multivariate polynomial.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x, y
>>> Poly(x**2 + x + 1, x).is_multivariate
False
>>> Poly(x*y**2 + x*y + 1, x, y).is_multivariate
True
>>> Poly(x*y**2 + x*y + 1, x).is_multivariate
False
>>> Poly(x**2 + x + 1, x, y).is_multivariate
True
"""
return len(f.gens) != 1
@property
def is_cyclotomic(f):
"""
Returns ``True`` if ``f`` is a cyclotomic polnomial.
Examples
========
>>> from sympy import Poly
>>> from sympy.abc import x
>>> f = x**16 + x**14 - x**10 + x**8 - x**6 + x**2 + 1
>>> Poly(f).is_cyclotomic
False
>>> g = x**16 + x**14 - x**10 - x**8 - x**6 + x**2 + 1
>>> Poly(g).is_cyclotomic
True
"""
return f.rep.is_cyclotomic
def __abs__(f):
return f.abs()
def __neg__(f):
return f.neg()
@_polifyit
def __add__(f, g):
return f.add(g)
@_polifyit
def __radd__(f, g):
return g.add(f)
@_polifyit
def __sub__(f, g):
return f.sub(g)
@_polifyit
def __rsub__(f, g):
return g.sub(f)
@_polifyit
def __mul__(f, g):
return f.mul(g)
@_polifyit
def __rmul__(f, g):
return g.mul(f)
@_sympifyit('n', NotImplemented)
def __pow__(f, n):
if n.is_Integer and n >= 0:
return f.pow(n)
else:
return NotImplemented
@_polifyit
def __divmod__(f, g):
return f.div(g)
@_polifyit
def __rdivmod__(f, g):
return g.div(f)
@_polifyit
def __mod__(f, g):
return f.rem(g)
@_polifyit
def __rmod__(f, g):
return g.rem(f)
@_polifyit
def __floordiv__(f, g):
return f.quo(g)
@_polifyit
def __rfloordiv__(f, g):
return g.quo(f)
@_sympifyit('g', NotImplemented)
def __div__(f, g):
return f.as_expr()/g.as_expr()
@_sympifyit('g', NotImplemented)
def __rdiv__(f, g):
return g.as_expr()/f.as_expr()
__truediv__ = __div__
__rtruediv__ = __rdiv__
@_sympifyit('other', NotImplemented)
def __eq__(self, other):
f, g = self, other
if not g.is_Poly:
try:
g = f.__class__(g, f.gens, domain=f.get_domain())
except (PolynomialError, DomainError, CoercionFailed):
return False
if f.gens != g.gens:
return False
if f.rep.dom != g.rep.dom:
return False
return f.rep == g.rep
@_sympifyit('g', NotImplemented)
def __ne__(f, g):
return not f == g
def __nonzero__(f):
return not f.is_zero
__bool__ = __nonzero__
def eq(f, g, strict=False):
if not strict:
return f == g
else:
return f._strict_eq(sympify(g))
def ne(f, g, strict=False):
return not f.eq(g, strict=strict)
def _strict_eq(f, g):
return isinstance(g, f.__class__) and f.gens == g.gens and f.rep.eq(g.rep, strict=True)
@public
class PurePoly(Poly):
"""Class for representing pure polynomials. """
def _hashable_content(self):
"""Allow SymPy to hash Poly instances. """
return (self.rep,)
def __hash__(self):
return super(PurePoly, self).__hash__()
@property
def free_symbols(self):
"""
Free symbols of a polynomial.
Examples
========
>>> from sympy import PurePoly
>>> from sympy.abc import x, y
>>> PurePoly(x**2 + 1).free_symbols
set()
>>> PurePoly(x**2 + y).free_symbols
set()
>>> PurePoly(x**2 + y, x).free_symbols
{y}
"""
return self.free_symbols_in_domain
@_sympifyit('other', NotImplemented)
def __eq__(self, other):
f, g = self, other
if not g.is_Poly:
try:
g = f.__class__(g, f.gens, domain=f.get_domain())
except (PolynomialError, DomainError, CoercionFailed):
return False
if len(f.gens) != len(g.gens):
return False
if f.rep.dom != g.rep.dom:
try:
dom = f.rep.dom.unify(g.rep.dom, f.gens)
except UnificationFailed:
return False
f = f.set_domain(dom)
g = g.set_domain(dom)
return f.rep == g.rep
def _strict_eq(f, g):
return isinstance(g, f.__class__) and f.rep.eq(g.rep, strict=True)
def _unify(f, g):
g = sympify(g)
if not g.is_Poly:
try:
return f.rep.dom, f.per, f.rep, f.rep.per(f.rep.dom.from_sympy(g))
except CoercionFailed:
raise UnificationFailed("can't unify %s with %s" % (f, g))
if len(f.gens) != len(g.gens):
raise UnificationFailed("can't unify %s with %s" % (f, g))
if not (isinstance(f.rep, DMP) and isinstance(g.rep, DMP)):
raise UnificationFailed("can't unify %s with %s" % (f, g))
cls = f.__class__
gens = f.gens
dom = f.rep.dom.unify(g.rep.dom, gens)
F = f.rep.convert(dom)
G = g.rep.convert(dom)
def per(rep, dom=dom, gens=gens, remove=None):
if remove is not None:
gens = gens[:remove] + gens[remove + 1:]
if not gens:
return dom.to_sympy(rep)
return cls.new(rep, *gens)
return dom, per, F, G
@public
def poly_from_expr(expr, *gens, **args):
"""Construct a polynomial from an expression. """
opt = options.build_options(gens, args)
return _poly_from_expr(expr, opt)
def _poly_from_expr(expr, opt):
"""Construct a polynomial from an expression. """
orig, expr = expr, sympify(expr)
if not isinstance(expr, Basic):
raise PolificationFailed(opt, orig, expr)
elif expr.is_Poly:
poly = expr.__class__._from_poly(expr, opt)
opt.gens = poly.gens
opt.domain = poly.domain
if opt.polys is None:
opt.polys = True
return poly, opt
elif opt.expand:
expr = expr.expand()
rep, opt = _dict_from_expr(expr, opt)
if not opt.gens:
raise PolificationFailed(opt, orig, expr)
monoms, coeffs = list(zip(*list(rep.items())))
domain = opt.domain
if domain is None:
opt.domain, coeffs = construct_domain(coeffs, opt=opt)
else:
coeffs = list(map(domain.from_sympy, coeffs))
rep = dict(list(zip(monoms, coeffs)))
poly = Poly._from_dict(rep, opt)
if opt.polys is None:
opt.polys = False
return poly, opt
@public
def parallel_poly_from_expr(exprs, *gens, **args):
"""Construct polynomials from expressions. """
opt = options.build_options(gens, args)
return _parallel_poly_from_expr(exprs, opt)
def _parallel_poly_from_expr(exprs, opt):
"""Construct polynomials from expressions. """
from sympy.functions.elementary.piecewise import Piecewise
if len(exprs) == 2:
f, g = exprs
if isinstance(f, Poly) and isinstance(g, Poly):
f = f.__class__._from_poly(f, opt)
g = g.__class__._from_poly(g, opt)
f, g = f.unify(g)
opt.gens = f.gens
opt.domain = f.domain
if opt.polys is None:
opt.polys = True
return [f, g], opt
origs, exprs = list(exprs), []
_exprs, _polys = [], []
failed = False
for i, expr in enumerate(origs):
expr = sympify(expr)
if isinstance(expr, Basic):
if expr.is_Poly:
_polys.append(i)
else:
_exprs.append(i)
if opt.expand:
expr = expr.expand()
else:
failed = True
exprs.append(expr)
if failed:
raise PolificationFailed(opt, origs, exprs, True)
if _polys:
# XXX: this is a temporary solution
for i in _polys:
exprs[i] = exprs[i].as_expr()
reps, opt = _parallel_dict_from_expr(exprs, opt)
if not opt.gens:
raise PolificationFailed(opt, origs, exprs, True)
for k in opt.gens:
if isinstance(k, Piecewise):
raise PolynomialError("Piecewise generators do not make sense")
coeffs_list, lengths = [], []
all_monoms = []
all_coeffs = []
for rep in reps:
monoms, coeffs = list(zip(*list(rep.items())))
coeffs_list.extend(coeffs)
all_monoms.append(monoms)
lengths.append(len(coeffs))
domain = opt.domain
if domain is None:
opt.domain, coeffs_list = construct_domain(coeffs_list, opt=opt)
else:
coeffs_list = list(map(domain.from_sympy, coeffs_list))
for k in lengths:
all_coeffs.append(coeffs_list[:k])
coeffs_list = coeffs_list[k:]
polys = []
for monoms, coeffs in zip(all_monoms, all_coeffs):
rep = dict(list(zip(monoms, coeffs)))
poly = Poly._from_dict(rep, opt)
polys.append(poly)
if opt.polys is None:
opt.polys = bool(_polys)
return polys, opt
def _update_args(args, key, value):
"""Add a new ``(key, value)`` pair to arguments ``dict``. """
args = dict(args)
if key not in args:
args[key] = value
return args
@public
def degree(f, gen=0):
"""
Return the degree of ``f`` in the given variable.
The degree of 0 is negative infinity.
Examples
========
>>> from sympy import degree
>>> from sympy.abc import x, y
>>> degree(x**2 + y*x + 1, gen=x)
2
>>> degree(x**2 + y*x + 1, gen=y)
1
>>> degree(0, x)
-oo
See also
========
sympy.polys.polytools.Poly.total_degree
degree_list
"""
f = sympify(f, strict=True)
gen_is_Num = sympify(gen, strict=True).is_Number
if f.is_Poly:
p = f
isNum = p.as_expr().is_Number
else:
isNum = f.is_Number
if not isNum:
if gen_is_Num:
p, _ = poly_from_expr(f)
else:
p, _ = poly_from_expr(f, gen)
if isNum:
return S.Zero if f else S.NegativeInfinity
if not gen_is_Num:
if f.is_Poly and gen not in p.gens:
# try recast without explicit gens
p, _ = poly_from_expr(f.as_expr())
if gen not in p.gens:
return S.Zero
elif not f.is_Poly and len(f.free_symbols) > 1:
raise TypeError(filldedent('''
A symbolic generator of interest is required for a multivariate
expression like func = %s, e.g. degree(func, gen = %s) instead of
degree(func, gen = %s).
''' % (f, next(ordered(f.free_symbols)), gen)))
return Integer(p.degree(gen))
@public
def total_degree(f, *gens):
"""
Return the total_degree of ``f`` in the given variables.
Examples
========
>>> from sympy import total_degree, Poly
>>> from sympy.abc import x, y
>>> total_degree(1)
0
>>> total_degree(x + x*y)
2
>>> total_degree(x + x*y, x)
1
If the expression is a Poly and no variables are given
then the generators of the Poly will be used:
>>> p = Poly(x + x*y, y)
>>> total_degree(p)
1
To deal with the underlying expression of the Poly, convert
it to an Expr:
>>> total_degree(p.as_expr())
2
This is done automatically if any variables are given:
>>> total_degree(p, x)
1
See also
========
degree
"""
p = sympify(f)
if p.is_Poly:
p = p.as_expr()
if p.is_Number:
rv = 0
else:
if f.is_Poly:
gens = gens or f.gens
rv = Poly(p, gens).total_degree()
return Integer(rv)
@public
def degree_list(f, *gens, **args):
"""
Return a list of degrees of ``f`` in all variables.
Examples
========
>>> from sympy import degree_list
>>> from sympy.abc import x, y
>>> degree_list(x**2 + y*x + 1)
(2, 1)
"""
options.allowed_flags(args, ['polys'])
try:
F, opt = poly_from_expr(f, *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('degree_list', 1, exc)
degrees = F.degree_list()
return tuple(map(Integer, degrees))
@public
def LC(f, *gens, **args):
"""
Return the leading coefficient of ``f``.
Examples
========
>>> from sympy import LC
>>> from sympy.abc import x, y
>>> LC(4*x**2 + 2*x*y**2 + x*y + 3*y)
4
"""
options.allowed_flags(args, ['polys'])
try:
F, opt = poly_from_expr(f, *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('LC', 1, exc)
return F.LC(order=opt.order)
@public
def LM(f, *gens, **args):
"""
Return the leading monomial of ``f``.
Examples
========
>>> from sympy import LM
>>> from sympy.abc import x, y
>>> LM(4*x**2 + 2*x*y**2 + x*y + 3*y)
x**2
"""
options.allowed_flags(args, ['polys'])
try:
F, opt = poly_from_expr(f, *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('LM', 1, exc)
monom = F.LM(order=opt.order)
return monom.as_expr()
@public
def LT(f, *gens, **args):
"""
Return the leading term of ``f``.
Examples
========
>>> from sympy import LT
>>> from sympy.abc import x, y
>>> LT(4*x**2 + 2*x*y**2 + x*y + 3*y)
4*x**2
"""
options.allowed_flags(args, ['polys'])
try:
F, opt = poly_from_expr(f, *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('LT', 1, exc)
monom, coeff = F.LT(order=opt.order)
return coeff*monom.as_expr()
@public
def pdiv(f, g, *gens, **args):
"""
Compute polynomial pseudo-division of ``f`` and ``g``.
Examples
========
>>> from sympy import pdiv
>>> from sympy.abc import x
>>> pdiv(x**2 + 1, 2*x - 4)
(2*x + 4, 20)
"""
options.allowed_flags(args, ['polys'])
try:
(F, G), opt = parallel_poly_from_expr((f, g), *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('pdiv', 2, exc)
q, r = F.pdiv(G)
if not opt.polys:
return q.as_expr(), r.as_expr()
else:
return q, r
@public
def prem(f, g, *gens, **args):
"""
Compute polynomial pseudo-remainder of ``f`` and ``g``.
Examples
========
>>> from sympy import prem
>>> from sympy.abc import x
>>> prem(x**2 + 1, 2*x - 4)
20
"""
options.allowed_flags(args, ['polys'])
try:
(F, G), opt = parallel_poly_from_expr((f, g), *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('prem', 2, exc)
r = F.prem(G)
if not opt.polys:
return r.as_expr()
else:
return r
@public
def pquo(f, g, *gens, **args):
"""
Compute polynomial pseudo-quotient of ``f`` and ``g``.
Examples
========
>>> from sympy import pquo
>>> from sympy.abc import x
>>> pquo(x**2 + 1, 2*x - 4)
2*x + 4
>>> pquo(x**2 - 1, 2*x - 1)
2*x + 1
"""
options.allowed_flags(args, ['polys'])
try:
(F, G), opt = parallel_poly_from_expr((f, g), *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('pquo', 2, exc)
try:
q = F.pquo(G)
except ExactQuotientFailed:
raise ExactQuotientFailed(f, g)
if not opt.polys:
return q.as_expr()
else:
return q
@public
def pexquo(f, g, *gens, **args):
"""
Compute polynomial exact pseudo-quotient of ``f`` and ``g``.
Examples
========
>>> from sympy import pexquo
>>> from sympy.abc import x
>>> pexquo(x**2 - 1, 2*x - 2)
2*x + 2
>>> pexquo(x**2 + 1, 2*x - 4)
Traceback (most recent call last):
...
ExactQuotientFailed: 2*x - 4 does not divide x**2 + 1
"""
options.allowed_flags(args, ['polys'])
try:
(F, G), opt = parallel_poly_from_expr((f, g), *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('pexquo', 2, exc)
q = F.pexquo(G)
if not opt.polys:
return q.as_expr()
else:
return q
@public
def div(f, g, *gens, **args):
"""
Compute polynomial division of ``f`` and ``g``.
Examples
========
>>> from sympy import div, ZZ, QQ
>>> from sympy.abc import x
>>> div(x**2 + 1, 2*x - 4, domain=ZZ)
(0, x**2 + 1)
>>> div(x**2 + 1, 2*x - 4, domain=QQ)
(x/2 + 1, 5)
"""
options.allowed_flags(args, ['auto', 'polys'])
try:
(F, G), opt = parallel_poly_from_expr((f, g), *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('div', 2, exc)
q, r = F.div(G, auto=opt.auto)
if not opt.polys:
return q.as_expr(), r.as_expr()
else:
return q, r
@public
def rem(f, g, *gens, **args):
"""
Compute polynomial remainder of ``f`` and ``g``.
Examples
========
>>> from sympy import rem, ZZ, QQ
>>> from sympy.abc import x
>>> rem(x**2 + 1, 2*x - 4, domain=ZZ)
x**2 + 1
>>> rem(x**2 + 1, 2*x - 4, domain=QQ)
5
"""
options.allowed_flags(args, ['auto', 'polys'])
try:
(F, G), opt = parallel_poly_from_expr((f, g), *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('rem', 2, exc)
r = F.rem(G, auto=opt.auto)
if not opt.polys:
return r.as_expr()
else:
return r
@public
def quo(f, g, *gens, **args):
"""
Compute polynomial quotient of ``f`` and ``g``.
Examples
========
>>> from sympy import quo
>>> from sympy.abc import x
>>> quo(x**2 + 1, 2*x - 4)
x/2 + 1
>>> quo(x**2 - 1, x - 1)
x + 1
"""
options.allowed_flags(args, ['auto', 'polys'])
try:
(F, G), opt = parallel_poly_from_expr((f, g), *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('quo', 2, exc)
q = F.quo(G, auto=opt.auto)
if not opt.polys:
return q.as_expr()
else:
return q
@public
def exquo(f, g, *gens, **args):
"""
Compute polynomial exact quotient of ``f`` and ``g``.
Examples
========
>>> from sympy import exquo
>>> from sympy.abc import x
>>> exquo(x**2 - 1, x - 1)
x + 1
>>> exquo(x**2 + 1, 2*x - 4)
Traceback (most recent call last):
...
ExactQuotientFailed: 2*x - 4 does not divide x**2 + 1
"""
options.allowed_flags(args, ['auto', 'polys'])
try:
(F, G), opt = parallel_poly_from_expr((f, g), *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('exquo', 2, exc)
q = F.exquo(G, auto=opt.auto)
if not opt.polys:
return q.as_expr()
else:
return q
@public
def half_gcdex(f, g, *gens, **args):
"""
Half extended Euclidean algorithm of ``f`` and ``g``.
Returns ``(s, h)`` such that ``h = gcd(f, g)`` and ``s*f = h (mod g)``.
Examples
========
>>> from sympy import half_gcdex
>>> from sympy.abc import x
>>> half_gcdex(x**4 - 2*x**3 - 6*x**2 + 12*x + 15, x**3 + x**2 - 4*x - 4)
(3/5 - x/5, x + 1)
"""
options.allowed_flags(args, ['auto', 'polys'])
try:
(F, G), opt = parallel_poly_from_expr((f, g), *gens, **args)
except PolificationFailed as exc:
domain, (a, b) = construct_domain(exc.exprs)
try:
s, h = domain.half_gcdex(a, b)
except NotImplementedError:
raise ComputationFailed('half_gcdex', 2, exc)
else:
return domain.to_sympy(s), domain.to_sympy(h)
s, h = F.half_gcdex(G, auto=opt.auto)
if not opt.polys:
return s.as_expr(), h.as_expr()
else:
return s, h
@public
def gcdex(f, g, *gens, **args):
"""
Extended Euclidean algorithm of ``f`` and ``g``.
Returns ``(s, t, h)`` such that ``h = gcd(f, g)`` and ``s*f + t*g = h``.
Examples
========
>>> from sympy import gcdex
>>> from sympy.abc import x
>>> gcdex(x**4 - 2*x**3 - 6*x**2 + 12*x + 15, x**3 + x**2 - 4*x - 4)
(3/5 - x/5, x**2/5 - 6*x/5 + 2, x + 1)
"""
options.allowed_flags(args, ['auto', 'polys'])
try:
(F, G), opt = parallel_poly_from_expr((f, g), *gens, **args)
except PolificationFailed as exc:
domain, (a, b) = construct_domain(exc.exprs)
try:
s, t, h = domain.gcdex(a, b)
except NotImplementedError:
raise ComputationFailed('gcdex', 2, exc)
else:
return domain.to_sympy(s), domain.to_sympy(t), domain.to_sympy(h)
s, t, h = F.gcdex(G, auto=opt.auto)
if not opt.polys:
return s.as_expr(), t.as_expr(), h.as_expr()
else:
return s, t, h
@public
def invert(f, g, *gens, **args):
"""
Invert ``f`` modulo ``g`` when possible.
Examples
========
>>> from sympy import invert, S
>>> from sympy.core.numbers import mod_inverse
>>> from sympy.abc import x
>>> invert(x**2 - 1, 2*x - 1)
-4/3
>>> invert(x**2 - 1, x - 1)
Traceback (most recent call last):
...
NotInvertible: zero divisor
For more efficient inversion of Rationals,
use the :obj:`~.mod_inverse` function:
>>> mod_inverse(3, 5)
2
>>> (S(2)/5).invert(S(7)/3)
5/2
See Also
========
sympy.core.numbers.mod_inverse
"""
options.allowed_flags(args, ['auto', 'polys'])
try:
(F, G), opt = parallel_poly_from_expr((f, g), *gens, **args)
except PolificationFailed as exc:
domain, (a, b) = construct_domain(exc.exprs)
try:
return domain.to_sympy(domain.invert(a, b))
except NotImplementedError:
raise ComputationFailed('invert', 2, exc)
h = F.invert(G, auto=opt.auto)
if not opt.polys:
return h.as_expr()
else:
return h
@public
def subresultants(f, g, *gens, **args):
"""
Compute subresultant PRS of ``f`` and ``g``.
Examples
========
>>> from sympy import subresultants
>>> from sympy.abc import x
>>> subresultants(x**2 + 1, x**2 - 1)
[x**2 + 1, x**2 - 1, -2]
"""
options.allowed_flags(args, ['polys'])
try:
(F, G), opt = parallel_poly_from_expr((f, g), *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('subresultants', 2, exc)
result = F.subresultants(G)
if not opt.polys:
return [r.as_expr() for r in result]
else:
return result
@public
def resultant(f, g, *gens, **args):
"""
Compute resultant of ``f`` and ``g``.
Examples
========
>>> from sympy import resultant
>>> from sympy.abc import x
>>> resultant(x**2 + 1, x**2 - 1)
4
"""
includePRS = args.pop('includePRS', False)
options.allowed_flags(args, ['polys'])
try:
(F, G), opt = parallel_poly_from_expr((f, g), *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('resultant', 2, exc)
if includePRS:
result, R = F.resultant(G, includePRS=includePRS)
else:
result = F.resultant(G)
if not opt.polys:
if includePRS:
return result.as_expr(), [r.as_expr() for r in R]
return result.as_expr()
else:
if includePRS:
return result, R
return result
@public
def discriminant(f, *gens, **args):
"""
Compute discriminant of ``f``.
Examples
========
>>> from sympy import discriminant
>>> from sympy.abc import x
>>> discriminant(x**2 + 2*x + 3)
-8
"""
options.allowed_flags(args, ['polys'])
try:
F, opt = poly_from_expr(f, *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('discriminant', 1, exc)
result = F.discriminant()
if not opt.polys:
return result.as_expr()
else:
return result
@public
def cofactors(f, g, *gens, **args):
"""
Compute GCD and cofactors of ``f`` and ``g``.
Returns polynomials ``(h, cff, cfg)`` such that ``h = gcd(f, g)``, and
``cff = quo(f, h)`` and ``cfg = quo(g, h)`` are, so called, cofactors
of ``f`` and ``g``.
Examples
========
>>> from sympy import cofactors
>>> from sympy.abc import x
>>> cofactors(x**2 - 1, x**2 - 3*x + 2)
(x - 1, x + 1, x - 2)
"""
options.allowed_flags(args, ['polys'])
try:
(F, G), opt = parallel_poly_from_expr((f, g), *gens, **args)
except PolificationFailed as exc:
domain, (a, b) = construct_domain(exc.exprs)
try:
h, cff, cfg = domain.cofactors(a, b)
except NotImplementedError:
raise ComputationFailed('cofactors', 2, exc)
else:
return domain.to_sympy(h), domain.to_sympy(cff), domain.to_sympy(cfg)
h, cff, cfg = F.cofactors(G)
if not opt.polys:
return h.as_expr(), cff.as_expr(), cfg.as_expr()
else:
return h, cff, cfg
@public
def gcd_list(seq, *gens, **args):
"""
Compute GCD of a list of polynomials.
Examples
========
>>> from sympy import gcd_list
>>> from sympy.abc import x
>>> gcd_list([x**3 - 1, x**2 - 1, x**2 - 3*x + 2])
x - 1
"""
seq = sympify(seq)
def try_non_polynomial_gcd(seq):
if not gens and not args:
domain, numbers = construct_domain(seq)
if not numbers:
return domain.zero
elif domain.is_Numerical:
result, numbers = numbers[0], numbers[1:]
for number in numbers:
result = domain.gcd(result, number)
if domain.is_one(result):
break
return domain.to_sympy(result)
return None
result = try_non_polynomial_gcd(seq)
if result is not None:
return result
options.allowed_flags(args, ['polys'])
try:
polys, opt = parallel_poly_from_expr(seq, *gens, **args)
# gcd for domain Q[irrational] (purely algebraic irrational)
if len(seq) > 1 and all(elt.is_algebraic and elt.is_irrational for elt in seq):
a = seq[-1]
lst = [ (a/elt).ratsimp() for elt in seq[:-1] ]
if all(frc.is_rational for frc in lst):
lc = 1
for frc in lst:
lc = lcm(lc, frc.as_numer_denom()[0])
# abs ensures that the gcd is always non-negative
return abs(a/lc)
except PolificationFailed as exc:
result = try_non_polynomial_gcd(exc.exprs)
if result is not None:
return result
else:
raise ComputationFailed('gcd_list', len(seq), exc)
if not polys:
if not opt.polys:
return S.Zero
else:
return Poly(0, opt=opt)
result, polys = polys[0], polys[1:]
for poly in polys:
result = result.gcd(poly)
if result.is_one:
break
if not opt.polys:
return result.as_expr()
else:
return result
@public
def gcd(f, g=None, *gens, **args):
"""
Compute GCD of ``f`` and ``g``.
Examples
========
>>> from sympy import gcd
>>> from sympy.abc import x
>>> gcd(x**2 - 1, x**2 - 3*x + 2)
x - 1
"""
if hasattr(f, '__iter__'):
if g is not None:
gens = (g,) + gens
return gcd_list(f, *gens, **args)
elif g is None:
raise TypeError("gcd() takes 2 arguments or a sequence of arguments")
options.allowed_flags(args, ['polys'])
try:
(F, G), opt = parallel_poly_from_expr((f, g), *gens, **args)
# gcd for domain Q[irrational] (purely algebraic irrational)
a, b = map(sympify, (f, g))
if a.is_algebraic and a.is_irrational and b.is_algebraic and b.is_irrational:
frc = (a/b).ratsimp()
if frc.is_rational:
# abs ensures that the returned gcd is always non-negative
return abs(a/frc.as_numer_denom()[0])
except PolificationFailed as exc:
domain, (a, b) = construct_domain(exc.exprs)
try:
return domain.to_sympy(domain.gcd(a, b))
except NotImplementedError:
raise ComputationFailed('gcd', 2, exc)
result = F.gcd(G)
if not opt.polys:
return result.as_expr()
else:
return result
@public
def lcm_list(seq, *gens, **args):
"""
Compute LCM of a list of polynomials.
Examples
========
>>> from sympy import lcm_list
>>> from sympy.abc import x
>>> lcm_list([x**3 - 1, x**2 - 1, x**2 - 3*x + 2])
x**5 - x**4 - 2*x**3 - x**2 + x + 2
"""
seq = sympify(seq)
def try_non_polynomial_lcm(seq):
if not gens and not args:
domain, numbers = construct_domain(seq)
if not numbers:
return domain.one
elif domain.is_Numerical:
result, numbers = numbers[0], numbers[1:]
for number in numbers:
result = domain.lcm(result, number)
return domain.to_sympy(result)
return None
result = try_non_polynomial_lcm(seq)
if result is not None:
return result
options.allowed_flags(args, ['polys'])
try:
polys, opt = parallel_poly_from_expr(seq, *gens, **args)
# lcm for domain Q[irrational] (purely algebraic irrational)
if len(seq) > 1 and all(elt.is_algebraic and elt.is_irrational for elt in seq):
a = seq[-1]
lst = [ (a/elt).ratsimp() for elt in seq[:-1] ]
if all(frc.is_rational for frc in lst):
lc = 1
for frc in lst:
lc = lcm(lc, frc.as_numer_denom()[1])
return a*lc
except PolificationFailed as exc:
result = try_non_polynomial_lcm(exc.exprs)
if result is not None:
return result
else:
raise ComputationFailed('lcm_list', len(seq), exc)
if not polys:
if not opt.polys:
return S.One
else:
return Poly(1, opt=opt)
result, polys = polys[0], polys[1:]
for poly in polys:
result = result.lcm(poly)
if not opt.polys:
return result.as_expr()
else:
return result
@public
def lcm(f, g=None, *gens, **args):
"""
Compute LCM of ``f`` and ``g``.
Examples
========
>>> from sympy import lcm
>>> from sympy.abc import x
>>> lcm(x**2 - 1, x**2 - 3*x + 2)
x**3 - 2*x**2 - x + 2
"""
if hasattr(f, '__iter__'):
if g is not None:
gens = (g,) + gens
return lcm_list(f, *gens, **args)
elif g is None:
raise TypeError("lcm() takes 2 arguments or a sequence of arguments")
options.allowed_flags(args, ['polys'])
try:
(F, G), opt = parallel_poly_from_expr((f, g), *gens, **args)
# lcm for domain Q[irrational] (purely algebraic irrational)
a, b = map(sympify, (f, g))
if a.is_algebraic and a.is_irrational and b.is_algebraic and b.is_irrational:
frc = (a/b).ratsimp()
if frc.is_rational:
return a*frc.as_numer_denom()[1]
except PolificationFailed as exc:
domain, (a, b) = construct_domain(exc.exprs)
try:
return domain.to_sympy(domain.lcm(a, b))
except NotImplementedError:
raise ComputationFailed('lcm', 2, exc)
result = F.lcm(G)
if not opt.polys:
return result.as_expr()
else:
return result
@public
def terms_gcd(f, *gens, **args):
"""
Remove GCD of terms from ``f``.
If the ``deep`` flag is True, then the arguments of ``f`` will have
terms_gcd applied to them.
If a fraction is factored out of ``f`` and ``f`` is an Add, then
an unevaluated Mul will be returned so that automatic simplification
does not redistribute it. The hint ``clear``, when set to False, can be
used to prevent such factoring when all coefficients are not fractions.
Examples
========
>>> from sympy import terms_gcd, cos
>>> from sympy.abc import x, y
>>> terms_gcd(x**6*y**2 + x**3*y, x, y)
x**3*y*(x**3*y + 1)
The default action of polys routines is to expand the expression
given to them. terms_gcd follows this behavior:
>>> terms_gcd((3+3*x)*(x+x*y))
3*x*(x*y + x + y + 1)
If this is not desired then the hint ``expand`` can be set to False.
In this case the expression will be treated as though it were comprised
of one or more terms:
>>> terms_gcd((3+3*x)*(x+x*y), expand=False)
(3*x + 3)*(x*y + x)
In order to traverse factors of a Mul or the arguments of other
functions, the ``deep`` hint can be used:
>>> terms_gcd((3 + 3*x)*(x + x*y), expand=False, deep=True)
3*x*(x + 1)*(y + 1)
>>> terms_gcd(cos(x + x*y), deep=True)
cos(x*(y + 1))
Rationals are factored out by default:
>>> terms_gcd(x + y/2)
(2*x + y)/2
Only the y-term had a coefficient that was a fraction; if one
does not want to factor out the 1/2 in cases like this, the
flag ``clear`` can be set to False:
>>> terms_gcd(x + y/2, clear=False)
x + y/2
>>> terms_gcd(x*y/2 + y**2, clear=False)
y*(x/2 + y)
The ``clear`` flag is ignored if all coefficients are fractions:
>>> terms_gcd(x/3 + y/2, clear=False)
(2*x + 3*y)/6
See Also
========
sympy.core.exprtools.gcd_terms, sympy.core.exprtools.factor_terms
"""
from sympy.core.relational import Equality
orig = sympify(f)
if isinstance(f, Equality):
return Equality(*(terms_gcd(s, *gens, **args) for s in [f.lhs, f.rhs]))
elif isinstance(f, Relational):
raise TypeError("Inequalities can not be used with terms_gcd. Found: %s" %(f,))
if not isinstance(f, Expr) or f.is_Atom:
return orig
if args.get('deep', False):
new = f.func(*[terms_gcd(a, *gens, **args) for a in f.args])
args.pop('deep')
args['expand'] = False
return terms_gcd(new, *gens, **args)
clear = args.pop('clear', True)
options.allowed_flags(args, ['polys'])
try:
F, opt = poly_from_expr(f, *gens, **args)
except PolificationFailed as exc:
return exc.expr
J, f = F.terms_gcd()
if opt.domain.is_Ring:
if opt.domain.is_Field:
denom, f = f.clear_denoms(convert=True)
coeff, f = f.primitive()
if opt.domain.is_Field:
coeff /= denom
else:
coeff = S.One
term = Mul(*[x**j for x, j in zip(f.gens, J)])
if coeff == 1:
coeff = S.One
if term == 1:
return orig
if clear:
return _keep_coeff(coeff, term*f.as_expr())
# base the clearing on the form of the original expression, not
# the (perhaps) Mul that we have now
coeff, f = _keep_coeff(coeff, f.as_expr(), clear=False).as_coeff_Mul()
return _keep_coeff(coeff, term*f, clear=False)
@public
def trunc(f, p, *gens, **args):
"""
Reduce ``f`` modulo a constant ``p``.
Examples
========
>>> from sympy import trunc
>>> from sympy.abc import x
>>> trunc(2*x**3 + 3*x**2 + 5*x + 7, 3)
-x**3 - x + 1
"""
options.allowed_flags(args, ['auto', 'polys'])
try:
F, opt = poly_from_expr(f, *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('trunc', 1, exc)
result = F.trunc(sympify(p))
if not opt.polys:
return result.as_expr()
else:
return result
@public
def monic(f, *gens, **args):
"""
Divide all coefficients of ``f`` by ``LC(f)``.
Examples
========
>>> from sympy import monic
>>> from sympy.abc import x
>>> monic(3*x**2 + 4*x + 2)
x**2 + 4*x/3 + 2/3
"""
options.allowed_flags(args, ['auto', 'polys'])
try:
F, opt = poly_from_expr(f, *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('monic', 1, exc)
result = F.monic(auto=opt.auto)
if not opt.polys:
return result.as_expr()
else:
return result
@public
def content(f, *gens, **args):
"""
Compute GCD of coefficients of ``f``.
Examples
========
>>> from sympy import content
>>> from sympy.abc import x
>>> content(6*x**2 + 8*x + 12)
2
"""
options.allowed_flags(args, ['polys'])
try:
F, opt = poly_from_expr(f, *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('content', 1, exc)
return F.content()
@public
def primitive(f, *gens, **args):
"""
Compute content and the primitive form of ``f``.
Examples
========
>>> from sympy.polys.polytools import primitive
>>> from sympy.abc import x
>>> primitive(6*x**2 + 8*x + 12)
(2, 3*x**2 + 4*x + 6)
>>> eq = (2 + 2*x)*x + 2
Expansion is performed by default:
>>> primitive(eq)
(2, x**2 + x + 1)
Set ``expand`` to False to shut this off. Note that the
extraction will not be recursive; use the as_content_primitive method
for recursive, non-destructive Rational extraction.
>>> primitive(eq, expand=False)
(1, x*(2*x + 2) + 2)
>>> eq.as_content_primitive()
(2, x*(x + 1) + 1)
"""
options.allowed_flags(args, ['polys'])
try:
F, opt = poly_from_expr(f, *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('primitive', 1, exc)
cont, result = F.primitive()
if not opt.polys:
return cont, result.as_expr()
else:
return cont, result
@public
def compose(f, g, *gens, **args):
"""
Compute functional composition ``f(g)``.
Examples
========
>>> from sympy import compose
>>> from sympy.abc import x
>>> compose(x**2 + x, x - 1)
x**2 - x
"""
options.allowed_flags(args, ['polys'])
try:
(F, G), opt = parallel_poly_from_expr((f, g), *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('compose', 2, exc)
result = F.compose(G)
if not opt.polys:
return result.as_expr()
else:
return result
@public
def decompose(f, *gens, **args):
"""
Compute functional decomposition of ``f``.
Examples
========
>>> from sympy import decompose
>>> from sympy.abc import x
>>> decompose(x**4 + 2*x**3 - x - 1)
[x**2 - x - 1, x**2 + x]
"""
options.allowed_flags(args, ['polys'])
try:
F, opt = poly_from_expr(f, *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('decompose', 1, exc)
result = F.decompose()
if not opt.polys:
return [r.as_expr() for r in result]
else:
return result
@public
def sturm(f, *gens, **args):
"""
Compute Sturm sequence of ``f``.
Examples
========
>>> from sympy import sturm
>>> from sympy.abc import x
>>> sturm(x**3 - 2*x**2 + x - 3)
[x**3 - 2*x**2 + x - 3, 3*x**2 - 4*x + 1, 2*x/9 + 25/9, -2079/4]
"""
options.allowed_flags(args, ['auto', 'polys'])
try:
F, opt = poly_from_expr(f, *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('sturm', 1, exc)
result = F.sturm(auto=opt.auto)
if not opt.polys:
return [r.as_expr() for r in result]
else:
return result
@public
def gff_list(f, *gens, **args):
"""
Compute a list of greatest factorial factors of ``f``.
Note that the input to ff() and rf() should be Poly instances to use the
definitions here.
Examples
========
>>> from sympy import gff_list, ff, Poly
>>> from sympy.abc import x
>>> f = Poly(x**5 + 2*x**4 - x**3 - 2*x**2, x)
>>> gff_list(f)
[(Poly(x, x, domain='ZZ'), 1), (Poly(x + 2, x, domain='ZZ'), 4)]
>>> (ff(Poly(x), 1)*ff(Poly(x + 2), 4)) == f
True
>>> f = Poly(x**12 + 6*x**11 - 11*x**10 - 56*x**9 + 220*x**8 + 208*x**7 - \
1401*x**6 + 1090*x**5 + 2715*x**4 - 6720*x**3 - 1092*x**2 + 5040*x, x)
>>> gff_list(f)
[(Poly(x**3 + 7, x, domain='ZZ'), 2), (Poly(x**2 + 5*x, x, domain='ZZ'), 3)]
>>> ff(Poly(x**3 + 7, x), 2)*ff(Poly(x**2 + 5*x, x), 3) == f
True
"""
options.allowed_flags(args, ['polys'])
try:
F, opt = poly_from_expr(f, *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('gff_list', 1, exc)
factors = F.gff_list()
if not opt.polys:
return [(g.as_expr(), k) for g, k in factors]
else:
return factors
@public
def gff(f, *gens, **args):
"""Compute greatest factorial factorization of ``f``. """
raise NotImplementedError('symbolic falling factorial')
@public
def sqf_norm(f, *gens, **args):
"""
Compute square-free norm of ``f``.
Returns ``s``, ``f``, ``r``, such that ``g(x) = f(x-sa)`` and
``r(x) = Norm(g(x))`` is a square-free polynomial over ``K``,
where ``a`` is the algebraic extension of the ground domain.
Examples
========
>>> from sympy import sqf_norm, sqrt
>>> from sympy.abc import x
>>> sqf_norm(x**2 + 1, extension=[sqrt(3)])
(1, x**2 - 2*sqrt(3)*x + 4, x**4 - 4*x**2 + 16)
"""
options.allowed_flags(args, ['polys'])
try:
F, opt = poly_from_expr(f, *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('sqf_norm', 1, exc)
s, g, r = F.sqf_norm()
if not opt.polys:
return Integer(s), g.as_expr(), r.as_expr()
else:
return Integer(s), g, r
@public
def sqf_part(f, *gens, **args):
"""
Compute square-free part of ``f``.
Examples
========
>>> from sympy import sqf_part
>>> from sympy.abc import x
>>> sqf_part(x**3 - 3*x - 2)
x**2 - x - 2
"""
options.allowed_flags(args, ['polys'])
try:
F, opt = poly_from_expr(f, *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('sqf_part', 1, exc)
result = F.sqf_part()
if not opt.polys:
return result.as_expr()
else:
return result
def _sorted_factors(factors, method):
"""Sort a list of ``(expr, exp)`` pairs. """
if method == 'sqf':
def key(obj):
poly, exp = obj
rep = poly.rep.rep
return (exp, len(rep), len(poly.gens), rep)
else:
def key(obj):
poly, exp = obj
rep = poly.rep.rep
return (len(rep), len(poly.gens), exp, rep)
return sorted(factors, key=key)
def _factors_product(factors):
"""Multiply a list of ``(expr, exp)`` pairs. """
return Mul(*[f.as_expr()**k for f, k in factors])
def _symbolic_factor_list(expr, opt, method):
"""Helper function for :func:`_symbolic_factor`. """
coeff, factors = S.One, []
args = [i._eval_factor() if hasattr(i, '_eval_factor') else i
for i in Mul.make_args(expr)]
for arg in args:
if arg.is_Number or (isinstance(arg, Expr) and pure_complex(arg)):
coeff *= arg
continue
elif arg.is_Pow:
base, exp = arg.args
if base.is_Number and exp.is_Number:
coeff *= arg
continue
if base.is_Number:
factors.append((base, exp))
continue
else:
base, exp = arg, S.One
try:
poly, _ = _poly_from_expr(base, opt)
except PolificationFailed as exc:
factors.append((exc.expr, exp))
else:
func = getattr(poly, method + '_list')
_coeff, _factors = func()
if _coeff is not S.One:
if exp.is_Integer:
coeff *= _coeff**exp
elif _coeff.is_positive:
factors.append((_coeff, exp))
else:
_factors.append((_coeff, S.One))
if exp is S.One:
factors.extend(_factors)
elif exp.is_integer:
factors.extend([(f, k*exp) for f, k in _factors])
else:
other = []
for f, k in _factors:
if f.as_expr().is_positive:
factors.append((f, k*exp))
else:
other.append((f, k))
factors.append((_factors_product(other), exp))
if method == 'sqf':
factors = [(reduce(mul, (f for f, _ in factors if _ == k)), k)
for k in set(i for _, i in factors)]
return coeff, factors
def _symbolic_factor(expr, opt, method):
"""Helper function for :func:`_factor`. """
if isinstance(expr, Expr):
if hasattr(expr,'_eval_factor'):
return expr._eval_factor()
coeff, factors = _symbolic_factor_list(together(expr, fraction=opt['fraction']), opt, method)
return _keep_coeff(coeff, _factors_product(factors))
elif hasattr(expr, 'args'):
return expr.func(*[_symbolic_factor(arg, opt, method) for arg in expr.args])
elif hasattr(expr, '__iter__'):
return expr.__class__([_symbolic_factor(arg, opt, method) for arg in expr])
else:
return expr
def _generic_factor_list(expr, gens, args, method):
"""Helper function for :func:`sqf_list` and :func:`factor_list`. """
options.allowed_flags(args, ['frac', 'polys'])
opt = options.build_options(gens, args)
expr = sympify(expr)
if isinstance(expr, (Expr, Poly)):
if isinstance(expr, Poly):
numer, denom = expr, 1
else:
numer, denom = together(expr).as_numer_denom()
cp, fp = _symbolic_factor_list(numer, opt, method)
cq, fq = _symbolic_factor_list(denom, opt, method)
if fq and not opt.frac:
raise PolynomialError("a polynomial expected, got %s" % expr)
_opt = opt.clone(dict(expand=True))
for factors in (fp, fq):
for i, (f, k) in enumerate(factors):
if not f.is_Poly:
f, _ = _poly_from_expr(f, _opt)
factors[i] = (f, k)
fp = _sorted_factors(fp, method)
fq = _sorted_factors(fq, method)
if not opt.polys:
fp = [(f.as_expr(), k) for f, k in fp]
fq = [(f.as_expr(), k) for f, k in fq]
coeff = cp/cq
if not opt.frac:
return coeff, fp
else:
return coeff, fp, fq
else:
raise PolynomialError("a polynomial expected, got %s" % expr)
def _generic_factor(expr, gens, args, method):
"""Helper function for :func:`sqf` and :func:`factor`. """
fraction = args.pop('fraction', True)
options.allowed_flags(args, [])
opt = options.build_options(gens, args)
opt['fraction'] = fraction
return _symbolic_factor(sympify(expr), opt, method)
def to_rational_coeffs(f):
"""
try to transform a polynomial to have rational coefficients
try to find a transformation ``x = alpha*y``
``f(x) = lc*alpha**n * g(y)`` where ``g`` is a polynomial with
rational coefficients, ``lc`` the leading coefficient.
If this fails, try ``x = y + beta``
``f(x) = g(y)``
Returns ``None`` if ``g`` not found;
``(lc, alpha, None, g)`` in case of rescaling
``(None, None, beta, g)`` in case of translation
Notes
=====
Currently it transforms only polynomials without roots larger than 2.
Examples
========
>>> from sympy import sqrt, Poly, simplify
>>> from sympy.polys.polytools import to_rational_coeffs
>>> from sympy.abc import x
>>> p = Poly(((x**2-1)*(x-2)).subs({x:x*(1 + sqrt(2))}), x, domain='EX')
>>> lc, r, _, g = to_rational_coeffs(p)
>>> lc, r
(7 + 5*sqrt(2), 2 - 2*sqrt(2))
>>> g
Poly(x**3 + x**2 - 1/4*x - 1/4, x, domain='QQ')
>>> r1 = simplify(1/r)
>>> Poly(lc*r**3*(g.as_expr()).subs({x:x*r1}), x, domain='EX') == p
True
"""
from sympy.simplify.simplify import simplify
def _try_rescale(f, f1=None):
"""
try rescaling ``x -> alpha*x`` to convert f to a polynomial
with rational coefficients.
Returns ``alpha, f``; if the rescaling is successful,
``alpha`` is the rescaling factor, and ``f`` is the rescaled
polynomial; else ``alpha`` is ``None``.
"""
from sympy.core.add import Add
if not len(f.gens) == 1 or not (f.gens[0]).is_Atom:
return None, f
n = f.degree()
lc = f.LC()
f1 = f1 or f1.monic()
coeffs = f1.all_coeffs()[1:]
coeffs = [simplify(coeffx) for coeffx in coeffs]
if coeffs[-2]:
rescale1_x = simplify(coeffs[-2]/coeffs[-1])
coeffs1 = []
for i in range(len(coeffs)):
coeffx = simplify(coeffs[i]*rescale1_x**(i + 1))
if not coeffx.is_rational:
break
coeffs1.append(coeffx)
else:
rescale_x = simplify(1/rescale1_x)
x = f.gens[0]
v = [x**n]
for i in range(1, n + 1):
v.append(coeffs1[i - 1]*x**(n - i))
f = Add(*v)
f = Poly(f)
return lc, rescale_x, f
return None
def _try_translate(f, f1=None):
"""
try translating ``x -> x + alpha`` to convert f to a polynomial
with rational coefficients.
Returns ``alpha, f``; if the translating is successful,
``alpha`` is the translating factor, and ``f`` is the shifted
polynomial; else ``alpha`` is ``None``.
"""
from sympy.core.add import Add
if not len(f.gens) == 1 or not (f.gens[0]).is_Atom:
return None, f
n = f.degree()
f1 = f1 or f1.monic()
coeffs = f1.all_coeffs()[1:]
c = simplify(coeffs[0])
if c and not c.is_rational:
func = Add
if c.is_Add:
args = c.args
func = c.func
else:
args = [c]
c1, c2 = sift(args, lambda z: z.is_rational, binary=True)
alpha = -func(*c2)/n
f2 = f1.shift(alpha)
return alpha, f2
return None
def _has_square_roots(p):
"""
Return True if ``f`` is a sum with square roots but no other root
"""
from sympy.core.exprtools import Factors
coeffs = p.coeffs()
has_sq = False
for y in coeffs:
for x in Add.make_args(y):
f = Factors(x).factors
r = [wx.q for b, wx in f.items() if
b.is_number and wx.is_Rational and wx.q >= 2]
if not r:
continue
if min(r) == 2:
has_sq = True
if max(r) > 2:
return False
return has_sq
if f.get_domain().is_EX and _has_square_roots(f):
f1 = f.monic()
r = _try_rescale(f, f1)
if r:
return r[0], r[1], None, r[2]
else:
r = _try_translate(f, f1)
if r:
return None, None, r[0], r[1]
return None
def _torational_factor_list(p, x):
"""
helper function to factor polynomial using to_rational_coeffs
Examples
========
>>> from sympy.polys.polytools import _torational_factor_list
>>> from sympy.abc import x
>>> from sympy import sqrt, expand, Mul
>>> p = expand(((x**2-1)*(x-2)).subs({x:x*(1 + sqrt(2))}))
>>> factors = _torational_factor_list(p, x); factors
(-2, [(-x*(1 + sqrt(2))/2 + 1, 1), (-x*(1 + sqrt(2)) - 1, 1), (-x*(1 + sqrt(2)) + 1, 1)])
>>> expand(factors[0]*Mul(*[z[0] for z in factors[1]])) == p
True
>>> p = expand(((x**2-1)*(x-2)).subs({x:x + sqrt(2)}))
>>> factors = _torational_factor_list(p, x); factors
(1, [(x - 2 + sqrt(2), 1), (x - 1 + sqrt(2), 1), (x + 1 + sqrt(2), 1)])
>>> expand(factors[0]*Mul(*[z[0] for z in factors[1]])) == p
True
"""
from sympy.simplify.simplify import simplify
p1 = Poly(p, x, domain='EX')
n = p1.degree()
res = to_rational_coeffs(p1)
if not res:
return None
lc, r, t, g = res
factors = factor_list(g.as_expr())
if lc:
c = simplify(factors[0]*lc*r**n)
r1 = simplify(1/r)
a = []
for z in factors[1:][0]:
a.append((simplify(z[0].subs({x: x*r1})), z[1]))
else:
c = factors[0]
a = []
for z in factors[1:][0]:
a.append((z[0].subs({x: x - t}), z[1]))
return (c, a)
@public
def sqf_list(f, *gens, **args):
"""
Compute a list of square-free factors of ``f``.
Examples
========
>>> from sympy import sqf_list
>>> from sympy.abc import x
>>> sqf_list(2*x**5 + 16*x**4 + 50*x**3 + 76*x**2 + 56*x + 16)
(2, [(x + 1, 2), (x + 2, 3)])
"""
return _generic_factor_list(f, gens, args, method='sqf')
@public
def sqf(f, *gens, **args):
"""
Compute square-free factorization of ``f``.
Examples
========
>>> from sympy import sqf
>>> from sympy.abc import x
>>> sqf(2*x**5 + 16*x**4 + 50*x**3 + 76*x**2 + 56*x + 16)
2*(x + 1)**2*(x + 2)**3
"""
return _generic_factor(f, gens, args, method='sqf')
@public
def factor_list(f, *gens, **args):
"""
Compute a list of irreducible factors of ``f``.
Examples
========
>>> from sympy import factor_list
>>> from sympy.abc import x, y
>>> factor_list(2*x**5 + 2*x**4*y + 4*x**3 + 4*x**2*y + 2*x + 2*y)
(2, [(x + y, 1), (x**2 + 1, 2)])
"""
return _generic_factor_list(f, gens, args, method='factor')
@public
def factor(f, *gens, **args):
"""
Compute the factorization of expression, ``f``, into irreducibles. (To
factor an integer into primes, use ``factorint``.)
There two modes implemented: symbolic and formal. If ``f`` is not an
instance of :class:`Poly` and generators are not specified, then the
former mode is used. Otherwise, the formal mode is used.
In symbolic mode, :func:`factor` will traverse the expression tree and
factor its components without any prior expansion, unless an instance
of :class:`~.Add` is encountered (in this case formal factorization is
used). This way :func:`factor` can handle large or symbolic exponents.
By default, the factorization is computed over the rationals. To factor
over other domain, e.g. an algebraic or finite field, use appropriate
options: ``extension``, ``modulus`` or ``domain``.
Examples
========
>>> from sympy import factor, sqrt, exp
>>> from sympy.abc import x, y
>>> factor(2*x**5 + 2*x**4*y + 4*x**3 + 4*x**2*y + 2*x + 2*y)
2*(x + y)*(x**2 + 1)**2
>>> factor(x**2 + 1)
x**2 + 1
>>> factor(x**2 + 1, modulus=2)
(x + 1)**2
>>> factor(x**2 + 1, gaussian=True)
(x - I)*(x + I)
>>> factor(x**2 - 2, extension=sqrt(2))
(x - sqrt(2))*(x + sqrt(2))
>>> factor((x**2 - 1)/(x**2 + 4*x + 4))
(x - 1)*(x + 1)/(x + 2)**2
>>> factor((x**2 + 4*x + 4)**10000000*(x**2 + 1))
(x + 2)**20000000*(x**2 + 1)
By default, factor deals with an expression as a whole:
>>> eq = 2**(x**2 + 2*x + 1)
>>> factor(eq)
2**(x**2 + 2*x + 1)
If the ``deep`` flag is True then subexpressions will
be factored:
>>> factor(eq, deep=True)
2**((x + 1)**2)
If the ``fraction`` flag is False then rational expressions
won't be combined. By default it is True.
>>> factor(5*x + 3*exp(2 - 7*x), deep=True)
(5*x*exp(7*x) + 3*exp(2))*exp(-7*x)
>>> factor(5*x + 3*exp(2 - 7*x), deep=True, fraction=False)
5*x + 3*exp(2)*exp(-7*x)
See Also
========
sympy.ntheory.factor_.factorint
"""
f = sympify(f)
if args.pop('deep', False):
from sympy.simplify.simplify import bottom_up
def _try_factor(expr):
"""
Factor, but avoid changing the expression when unable to.
"""
fac = factor(expr, *gens, **args)
if fac.is_Mul or fac.is_Pow:
return fac
return expr
f = bottom_up(f, _try_factor)
# clean up any subexpressions that may have been expanded
# while factoring out a larger expression
partials = {}
muladd = f.atoms(Mul, Add)
for p in muladd:
fac = factor(p, *gens, **args)
if (fac.is_Mul or fac.is_Pow) and fac != p:
partials[p] = fac
return f.xreplace(partials)
try:
return _generic_factor(f, gens, args, method='factor')
except PolynomialError as msg:
if not f.is_commutative:
from sympy.core.exprtools import factor_nc
return factor_nc(f)
else:
raise PolynomialError(msg)
@public
def intervals(F, all=False, eps=None, inf=None, sup=None, strict=False, fast=False, sqf=False):
"""
Compute isolating intervals for roots of ``f``.
Examples
========
>>> from sympy import intervals
>>> from sympy.abc import x
>>> intervals(x**2 - 3)
[((-2, -1), 1), ((1, 2), 1)]
>>> intervals(x**2 - 3, eps=1e-2)
[((-26/15, -19/11), 1), ((19/11, 26/15), 1)]
"""
if not hasattr(F, '__iter__'):
try:
F = Poly(F)
except GeneratorsNeeded:
return []
return F.intervals(all=all, eps=eps, inf=inf, sup=sup, fast=fast, sqf=sqf)
else:
polys, opt = parallel_poly_from_expr(F, domain='QQ')
if len(opt.gens) > 1:
raise MultivariatePolynomialError
for i, poly in enumerate(polys):
polys[i] = poly.rep.rep
if eps is not None:
eps = opt.domain.convert(eps)
if eps <= 0:
raise ValueError("'eps' must be a positive rational")
if inf is not None:
inf = opt.domain.convert(inf)
if sup is not None:
sup = opt.domain.convert(sup)
intervals = dup_isolate_real_roots_list(polys, opt.domain,
eps=eps, inf=inf, sup=sup, strict=strict, fast=fast)
result = []
for (s, t), indices in intervals:
s, t = opt.domain.to_sympy(s), opt.domain.to_sympy(t)
result.append(((s, t), indices))
return result
@public
def refine_root(f, s, t, eps=None, steps=None, fast=False, check_sqf=False):
"""
Refine an isolating interval of a root to the given precision.
Examples
========
>>> from sympy import refine_root
>>> from sympy.abc import x
>>> refine_root(x**2 - 3, 1, 2, eps=1e-2)
(19/11, 26/15)
"""
try:
F = Poly(f)
if not isinstance(f, Poly) and not F.gen.is_Symbol:
# root of sin(x) + 1 is -1 but when someone
# passes an Expr instead of Poly they may not expect
# that the generator will be sin(x), not x
raise PolynomialError("generator must be a Symbol")
except GeneratorsNeeded:
raise PolynomialError(
"can't refine a root of %s, not a polynomial" % f)
return F.refine_root(s, t, eps=eps, steps=steps, fast=fast, check_sqf=check_sqf)
@public
def count_roots(f, inf=None, sup=None):
"""
Return the number of roots of ``f`` in ``[inf, sup]`` interval.
If one of ``inf`` or ``sup`` is complex, it will return the number of roots
in the complex rectangle with corners at ``inf`` and ``sup``.
Examples
========
>>> from sympy import count_roots, I
>>> from sympy.abc import x
>>> count_roots(x**4 - 4, -3, 3)
2
>>> count_roots(x**4 - 4, 0, 1 + 3*I)
1
"""
try:
F = Poly(f, greedy=False)
if not isinstance(f, Poly) and not F.gen.is_Symbol:
# root of sin(x) + 1 is -1 but when someone
# passes an Expr instead of Poly they may not expect
# that the generator will be sin(x), not x
raise PolynomialError("generator must be a Symbol")
except GeneratorsNeeded:
raise PolynomialError("can't count roots of %s, not a polynomial" % f)
return F.count_roots(inf=inf, sup=sup)
@public
def real_roots(f, multiple=True):
"""
Return a list of real roots with multiplicities of ``f``.
Examples
========
>>> from sympy import real_roots
>>> from sympy.abc import x
>>> real_roots(2*x**3 - 7*x**2 + 4*x + 4)
[-1/2, 2, 2]
"""
try:
F = Poly(f, greedy=False)
if not isinstance(f, Poly) and not F.gen.is_Symbol:
# root of sin(x) + 1 is -1 but when someone
# passes an Expr instead of Poly they may not expect
# that the generator will be sin(x), not x
raise PolynomialError("generator must be a Symbol")
except GeneratorsNeeded:
raise PolynomialError(
"can't compute real roots of %s, not a polynomial" % f)
return F.real_roots(multiple=multiple)
@public
def nroots(f, n=15, maxsteps=50, cleanup=True):
"""
Compute numerical approximations of roots of ``f``.
Examples
========
>>> from sympy import nroots
>>> from sympy.abc import x
>>> nroots(x**2 - 3, n=15)
[-1.73205080756888, 1.73205080756888]
>>> nroots(x**2 - 3, n=30)
[-1.73205080756887729352744634151, 1.73205080756887729352744634151]
"""
try:
F = Poly(f, greedy=False)
if not isinstance(f, Poly) and not F.gen.is_Symbol:
# root of sin(x) + 1 is -1 but when someone
# passes an Expr instead of Poly they may not expect
# that the generator will be sin(x), not x
raise PolynomialError("generator must be a Symbol")
except GeneratorsNeeded:
raise PolynomialError(
"can't compute numerical roots of %s, not a polynomial" % f)
return F.nroots(n=n, maxsteps=maxsteps, cleanup=cleanup)
@public
def ground_roots(f, *gens, **args):
"""
Compute roots of ``f`` by factorization in the ground domain.
Examples
========
>>> from sympy import ground_roots
>>> from sympy.abc import x
>>> ground_roots(x**6 - 4*x**4 + 4*x**3 - x**2)
{0: 2, 1: 2}
"""
options.allowed_flags(args, [])
try:
F, opt = poly_from_expr(f, *gens, **args)
if not isinstance(f, Poly) and not F.gen.is_Symbol:
# root of sin(x) + 1 is -1 but when someone
# passes an Expr instead of Poly they may not expect
# that the generator will be sin(x), not x
raise PolynomialError("generator must be a Symbol")
except PolificationFailed as exc:
raise ComputationFailed('ground_roots', 1, exc)
return F.ground_roots()
@public
def nth_power_roots_poly(f, n, *gens, **args):
"""
Construct a polynomial with n-th powers of roots of ``f``.
Examples
========
>>> from sympy import nth_power_roots_poly, factor, roots
>>> from sympy.abc import x
>>> f = x**4 - x**2 + 1
>>> g = factor(nth_power_roots_poly(f, 2))
>>> g
(x**2 - x + 1)**2
>>> R_f = [ (r**2).expand() for r in roots(f) ]
>>> R_g = roots(g).keys()
>>> set(R_f) == set(R_g)
True
"""
options.allowed_flags(args, [])
try:
F, opt = poly_from_expr(f, *gens, **args)
if not isinstance(f, Poly) and not F.gen.is_Symbol:
# root of sin(x) + 1 is -1 but when someone
# passes an Expr instead of Poly they may not expect
# that the generator will be sin(x), not x
raise PolynomialError("generator must be a Symbol")
except PolificationFailed as exc:
raise ComputationFailed('nth_power_roots_poly', 1, exc)
result = F.nth_power_roots_poly(n)
if not opt.polys:
return result.as_expr()
else:
return result
@public
def cancel(f, *gens, **args):
"""
Cancel common factors in a rational function ``f``.
Examples
========
>>> from sympy import cancel, sqrt, Symbol, together
>>> from sympy.abc import x
>>> A = Symbol('A', commutative=False)
>>> cancel((2*x**2 - 2)/(x**2 - 2*x + 1))
(2*x + 2)/(x - 1)
>>> cancel((sqrt(3) + sqrt(15)*A)/(sqrt(2) + sqrt(10)*A))
sqrt(6)/2
Note: due to automatic distribution of Rationals, a sum divided by an integer
will appear as a sum. To recover a rational form use `together` on the result:
>>> cancel(x/2 + 1)
x/2 + 1
>>> together(_)
(x + 2)/2
"""
from sympy.core.exprtools import factor_terms
from sympy.functions.elementary.piecewise import Piecewise
options.allowed_flags(args, ['polys'])
f = sympify(f)
if not isinstance(f, (tuple, Tuple)):
if f.is_Number or isinstance(f, Relational) or not isinstance(f, Expr):
return f
f = factor_terms(f, radical=True)
p, q = f.as_numer_denom()
elif len(f) == 2:
p, q = f
elif isinstance(f, Tuple):
return factor_terms(f)
else:
raise ValueError('unexpected argument: %s' % f)
try:
(F, G), opt = parallel_poly_from_expr((p, q), *gens, **args)
except PolificationFailed:
if not isinstance(f, (tuple, Tuple)):
return f.expand()
else:
return S.One, p, q
except PolynomialError as msg:
if f.is_commutative and not f.has(Piecewise):
raise PolynomialError(msg)
# Handling of noncommutative and/or piecewise expressions
if f.is_Add or f.is_Mul:
c, nc = sift(f.args, lambda x:
x.is_commutative is True and not x.has(Piecewise),
binary=True)
nc = [cancel(i) for i in nc]
return f.func(cancel(f.func(*c)), *nc)
else:
reps = []
pot = preorder_traversal(f)
next(pot)
for e in pot:
# XXX: This should really skip anything that's not Expr.
if isinstance(e, (tuple, Tuple, BooleanAtom)):
continue
try:
reps.append((e, cancel(e)))
pot.skip() # this was handled successfully
except NotImplementedError:
pass
return f.xreplace(dict(reps))
c, P, Q = F.cancel(G)
if not isinstance(f, (tuple, Tuple)):
return c*(P.as_expr()/Q.as_expr())
else:
if not opt.polys:
return c, P.as_expr(), Q.as_expr()
else:
return c, P, Q
@public
def reduced(f, G, *gens, **args):
"""
Reduces a polynomial ``f`` modulo a set of polynomials ``G``.
Given a polynomial ``f`` and a set of polynomials ``G = (g_1, ..., g_n)``,
computes a set of quotients ``q = (q_1, ..., q_n)`` and the remainder ``r``
such that ``f = q_1*g_1 + ... + q_n*g_n + r``, where ``r`` vanishes or ``r``
is a completely reduced polynomial with respect to ``G``.
Examples
========
>>> from sympy import reduced
>>> from sympy.abc import x, y
>>> reduced(2*x**4 + y**2 - x**2 + y**3, [x**3 - x, y**3 - y])
([2*x, 1], x**2 + y**2 + y)
"""
options.allowed_flags(args, ['polys', 'auto'])
try:
polys, opt = parallel_poly_from_expr([f] + list(G), *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('reduced', 0, exc)
domain = opt.domain
retract = False
if opt.auto and domain.is_Ring and not domain.is_Field:
opt = opt.clone(dict(domain=domain.get_field()))
retract = True
from sympy.polys.rings import xring
_ring, _ = xring(opt.gens, opt.domain, opt.order)
for i, poly in enumerate(polys):
poly = poly.set_domain(opt.domain).rep.to_dict()
polys[i] = _ring.from_dict(poly)
Q, r = polys[0].div(polys[1:])
Q = [Poly._from_dict(dict(q), opt) for q in Q]
r = Poly._from_dict(dict(r), opt)
if retract:
try:
_Q, _r = [q.to_ring() for q in Q], r.to_ring()
except CoercionFailed:
pass
else:
Q, r = _Q, _r
if not opt.polys:
return [q.as_expr() for q in Q], r.as_expr()
else:
return Q, r
@public
def groebner(F, *gens, **args):
"""
Computes the reduced Groebner basis for a set of polynomials.
Use the ``order`` argument to set the monomial ordering that will be
used to compute the basis. Allowed orders are ``lex``, ``grlex`` and
``grevlex``. If no order is specified, it defaults to ``lex``.
For more information on Groebner bases, see the references and the docstring
of :func:`~.solve_poly_system`.
Examples
========
Example taken from [1].
>>> from sympy import groebner
>>> from sympy.abc import x, y
>>> F = [x*y - 2*y, 2*y**2 - x**2]
>>> groebner(F, x, y, order='lex')
GroebnerBasis([x**2 - 2*y**2, x*y - 2*y, y**3 - 2*y], x, y,
domain='ZZ', order='lex')
>>> groebner(F, x, y, order='grlex')
GroebnerBasis([y**3 - 2*y, x**2 - 2*y**2, x*y - 2*y], x, y,
domain='ZZ', order='grlex')
>>> groebner(F, x, y, order='grevlex')
GroebnerBasis([y**3 - 2*y, x**2 - 2*y**2, x*y - 2*y], x, y,
domain='ZZ', order='grevlex')
By default, an improved implementation of the Buchberger algorithm is
used. Optionally, an implementation of the F5B algorithm can be used. The
algorithm can be set using the ``method`` flag or with the
:func:`sympy.polys.polyconfig.setup` function.
>>> F = [x**2 - x - 1, (2*x - 1) * y - (x**10 - (1 - x)**10)]
>>> groebner(F, x, y, method='buchberger')
GroebnerBasis([x**2 - x - 1, y - 55], x, y, domain='ZZ', order='lex')
>>> groebner(F, x, y, method='f5b')
GroebnerBasis([x**2 - x - 1, y - 55], x, y, domain='ZZ', order='lex')
References
==========
1. [Buchberger01]_
2. [Cox97]_
"""
return GroebnerBasis(F, *gens, **args)
@public
def is_zero_dimensional(F, *gens, **args):
"""
Checks if the ideal generated by a Groebner basis is zero-dimensional.
The algorithm checks if the set of monomials not divisible by the
leading monomial of any element of ``F`` is bounded.
References
==========
David A. Cox, John B. Little, Donal O'Shea. Ideals, Varieties and
Algorithms, 3rd edition, p. 230
"""
return GroebnerBasis(F, *gens, **args).is_zero_dimensional
@public
class GroebnerBasis(Basic):
"""Represents a reduced Groebner basis. """
def __new__(cls, F, *gens, **args):
"""Compute a reduced Groebner basis for a system of polynomials. """
options.allowed_flags(args, ['polys', 'method'])
try:
polys, opt = parallel_poly_from_expr(F, *gens, **args)
except PolificationFailed as exc:
raise ComputationFailed('groebner', len(F), exc)
from sympy.polys.rings import PolyRing
ring = PolyRing(opt.gens, opt.domain, opt.order)
polys = [ring.from_dict(poly.rep.to_dict()) for poly in polys if poly]
G = _groebner(polys, ring, method=opt.method)
G = [Poly._from_dict(g, opt) for g in G]
return cls._new(G, opt)
@classmethod
def _new(cls, basis, options):
obj = Basic.__new__(cls)
obj._basis = tuple(basis)
obj._options = options
return obj
@property
def args(self):
basis = (p.as_expr() for p in self._basis)
return (Tuple(*basis), Tuple(*self._options.gens))
@property
def exprs(self):
return [poly.as_expr() for poly in self._basis]
@property
def polys(self):
return list(self._basis)
@property
def gens(self):
return self._options.gens
@property
def domain(self):
return self._options.domain
@property
def order(self):
return self._options.order
def __len__(self):
return len(self._basis)
def __iter__(self):
if self._options.polys:
return iter(self.polys)
else:
return iter(self.exprs)
def __getitem__(self, item):
if self._options.polys:
basis = self.polys
else:
basis = self.exprs
return basis[item]
def __hash__(self):
return hash((self._basis, tuple(self._options.items())))
def __eq__(self, other):
if isinstance(other, self.__class__):
return self._basis == other._basis and self._options == other._options
elif iterable(other):
return self.polys == list(other) or self.exprs == list(other)
else:
return False
def __ne__(self, other):
return not self == other
@property
def is_zero_dimensional(self):
"""
Checks if the ideal generated by a Groebner basis is zero-dimensional.
The algorithm checks if the set of monomials not divisible by the
leading monomial of any element of ``F`` is bounded.
References
==========
David A. Cox, John B. Little, Donal O'Shea. Ideals, Varieties and
Algorithms, 3rd edition, p. 230
"""
def single_var(monomial):
return sum(map(bool, monomial)) == 1
exponents = Monomial([0]*len(self.gens))
order = self._options.order
for poly in self.polys:
monomial = poly.LM(order=order)
if single_var(monomial):
exponents *= monomial
# If any element of the exponents vector is zero, then there's
# a variable for which there's no degree bound and the ideal
# generated by this Groebner basis isn't zero-dimensional.
return all(exponents)
def fglm(self, order):
"""
Convert a Groebner basis from one ordering to another.
The FGLM algorithm converts reduced Groebner bases of zero-dimensional
ideals from one ordering to another. This method is often used when it
is infeasible to compute a Groebner basis with respect to a particular
ordering directly.
Examples
========
>>> from sympy.abc import x, y
>>> from sympy import groebner
>>> F = [x**2 - 3*y - x + 1, y**2 - 2*x + y - 1]
>>> G = groebner(F, x, y, order='grlex')
>>> list(G.fglm('lex'))
[2*x - y**2 - y + 1, y**4 + 2*y**3 - 3*y**2 - 16*y + 7]
>>> list(groebner(F, x, y, order='lex'))
[2*x - y**2 - y + 1, y**4 + 2*y**3 - 3*y**2 - 16*y + 7]
References
==========
.. [1] J.C. Faugere, P. Gianni, D. Lazard, T. Mora (1994). Efficient
Computation of Zero-dimensional Groebner Bases by Change of
Ordering
"""
opt = self._options
src_order = opt.order
dst_order = monomial_key(order)
if src_order == dst_order:
return self
if not self.is_zero_dimensional:
raise NotImplementedError("can't convert Groebner bases of ideals with positive dimension")
polys = list(self._basis)
domain = opt.domain
opt = opt.clone(dict(
domain=domain.get_field(),
order=dst_order,
))
from sympy.polys.rings import xring
_ring, _ = xring(opt.gens, opt.domain, src_order)
for i, poly in enumerate(polys):
poly = poly.set_domain(opt.domain).rep.to_dict()
polys[i] = _ring.from_dict(poly)
G = matrix_fglm(polys, _ring, dst_order)
G = [Poly._from_dict(dict(g), opt) for g in G]
if not domain.is_Field:
G = [g.clear_denoms(convert=True)[1] for g in G]
opt.domain = domain
return self._new(G, opt)
def reduce(self, expr, auto=True):
"""
Reduces a polynomial modulo a Groebner basis.
Given a polynomial ``f`` and a set of polynomials ``G = (g_1, ..., g_n)``,
computes a set of quotients ``q = (q_1, ..., q_n)`` and the remainder ``r``
such that ``f = q_1*f_1 + ... + q_n*f_n + r``, where ``r`` vanishes or ``r``
is a completely reduced polynomial with respect to ``G``.
Examples
========
>>> from sympy import groebner, expand
>>> from sympy.abc import x, y
>>> f = 2*x**4 - x**2 + y**3 + y**2
>>> G = groebner([x**3 - x, y**3 - y])
>>> G.reduce(f)
([2*x, 1], x**2 + y**2 + y)
>>> Q, r = _
>>> expand(sum(q*g for q, g in zip(Q, G)) + r)
2*x**4 - x**2 + y**3 + y**2
>>> _ == f
True
"""
poly = Poly._from_expr(expr, self._options)
polys = [poly] + list(self._basis)
opt = self._options
domain = opt.domain
retract = False
if auto and domain.is_Ring and not domain.is_Field:
opt = opt.clone(dict(domain=domain.get_field()))
retract = True
from sympy.polys.rings import xring
_ring, _ = xring(opt.gens, opt.domain, opt.order)
for i, poly in enumerate(polys):
poly = poly.set_domain(opt.domain).rep.to_dict()
polys[i] = _ring.from_dict(poly)
Q, r = polys[0].div(polys[1:])
Q = [Poly._from_dict(dict(q), opt) for q in Q]
r = Poly._from_dict(dict(r), opt)
if retract:
try:
_Q, _r = [q.to_ring() for q in Q], r.to_ring()
except CoercionFailed:
pass
else:
Q, r = _Q, _r
if not opt.polys:
return [q.as_expr() for q in Q], r.as_expr()
else:
return Q, r
def contains(self, poly):
"""
Check if ``poly`` belongs the ideal generated by ``self``.
Examples
========
>>> from sympy import groebner
>>> from sympy.abc import x, y
>>> f = 2*x**3 + y**3 + 3*y
>>> G = groebner([x**2 + y**2 - 1, x*y - 2])
>>> G.contains(f)
True
>>> G.contains(f + 1)
False
"""
return self.reduce(poly)[1] == 0
@public
def poly(expr, *gens, **args):
"""
Efficiently transform an expression into a polynomial.
Examples
========
>>> from sympy import poly
>>> from sympy.abc import x
>>> poly(x*(x**2 + x - 1)**2)
Poly(x**5 + 2*x**4 - x**3 - 2*x**2 + x, x, domain='ZZ')
"""
options.allowed_flags(args, [])
def _poly(expr, opt):
terms, poly_terms = [], []
for term in Add.make_args(expr):
factors, poly_factors = [], []
for factor in Mul.make_args(term):
if factor.is_Add:
poly_factors.append(_poly(factor, opt))
elif factor.is_Pow and factor.base.is_Add and \
factor.exp.is_Integer and factor.exp >= 0:
poly_factors.append(
_poly(factor.base, opt).pow(factor.exp))
else:
factors.append(factor)
if not poly_factors:
terms.append(term)
else:
product = poly_factors[0]
for factor in poly_factors[1:]:
product = product.mul(factor)
if factors:
factor = Mul(*factors)
if factor.is_Number:
product = product.mul(factor)
else:
product = product.mul(Poly._from_expr(factor, opt))
poly_terms.append(product)
if not poly_terms:
result = Poly._from_expr(expr, opt)
else:
result = poly_terms[0]
for term in poly_terms[1:]:
result = result.add(term)
if terms:
term = Add(*terms)
if term.is_Number:
result = result.add(term)
else:
result = result.add(Poly._from_expr(term, opt))
return result.reorder(*opt.get('gens', ()), **args)
expr = sympify(expr)
if expr.is_Poly:
return Poly(expr, *gens, **args)
if 'expand' not in args:
args['expand'] = False
opt = options.build_options(gens, args)
return _poly(expr, opt)
|
f867faf1d48b3375a08fba62d0ad62f809f2ee0caa589572f8d04eba645621dd
|
"""Algorithms for computing symbolic roots of polynomials. """
from __future__ import print_function, division
import math
from sympy.core import S, I, pi
from sympy.core.compatibility import ordered, reduce
from sympy.core.exprtools import factor_terms
from sympy.core.function import _mexpand
from sympy.core.logic import fuzzy_not
from sympy.core.mul import expand_2arg, Mul
from sympy.core.numbers import Rational, igcd, comp
from sympy.core.power import Pow
from sympy.core.relational import Eq
from sympy.core.symbol import Dummy, Symbol, symbols
from sympy.core.sympify import sympify
from sympy.functions import exp, sqrt, im, cos, acos, Piecewise
from sympy.functions.elementary.miscellaneous import root
from sympy.ntheory import divisors, isprime, nextprime
from sympy.polys.domains import EX
from sympy.polys.polyerrors import (PolynomialError, GeneratorsNeeded,
DomainError)
from sympy.polys.polyquinticconst import PolyQuintic
from sympy.polys.polytools import Poly, cancel, factor, gcd_list, discriminant
from sympy.polys.rationaltools import together
from sympy.polys.specialpolys import cyclotomic_poly
from sympy.simplify import simplify, powsimp
from sympy.utilities import public
def roots_linear(f):
"""Returns a list of roots of a linear polynomial."""
r = -f.nth(0)/f.nth(1)
dom = f.get_domain()
if not dom.is_Numerical:
if dom.is_Composite:
r = factor(r)
else:
r = simplify(r)
return [r]
def roots_quadratic(f):
"""Returns a list of roots of a quadratic polynomial. If the domain is ZZ
then the roots will be sorted with negatives coming before positives.
The ordering will be the same for any numerical coefficients as long as
the assumptions tested are correct, otherwise the ordering will not be
sorted (but will be canonical).
"""
a, b, c = f.all_coeffs()
dom = f.get_domain()
def _sqrt(d):
# remove squares from square root since both will be represented
# in the results; a similar thing is happening in roots() but
# must be duplicated here because not all quadratics are binomials
co = []
other = []
for di in Mul.make_args(d):
if di.is_Pow and di.exp.is_Integer and di.exp % 2 == 0:
co.append(Pow(di.base, di.exp//2))
else:
other.append(di)
if co:
d = Mul(*other)
co = Mul(*co)
return co*sqrt(d)
return sqrt(d)
def _simplify(expr):
if dom.is_Composite:
return factor(expr)
else:
return simplify(expr)
if c is S.Zero:
r0, r1 = S.Zero, -b/a
if not dom.is_Numerical:
r1 = _simplify(r1)
elif r1.is_negative:
r0, r1 = r1, r0
elif b is S.Zero:
r = -c/a
if not dom.is_Numerical:
r = _simplify(r)
R = _sqrt(r)
r0 = -R
r1 = R
else:
d = b**2 - 4*a*c
A = 2*a
B = -b/A
if not dom.is_Numerical:
d = _simplify(d)
B = _simplify(B)
D = factor_terms(_sqrt(d)/A)
r0 = B - D
r1 = B + D
if a.is_negative:
r0, r1 = r1, r0
elif not dom.is_Numerical:
r0, r1 = [expand_2arg(i) for i in (r0, r1)]
return [r0, r1]
def roots_cubic(f, trig=False):
"""Returns a list of roots of a cubic polynomial.
References
==========
[1] https://en.wikipedia.org/wiki/Cubic_function, General formula for roots,
(accessed November 17, 2014).
"""
if trig:
a, b, c, d = f.all_coeffs()
p = (3*a*c - b**2)/3/a**2
q = (2*b**3 - 9*a*b*c + 27*a**2*d)/(27*a**3)
D = 18*a*b*c*d - 4*b**3*d + b**2*c**2 - 4*a*c**3 - 27*a**2*d**2
if (D > 0) == True:
rv = []
for k in range(3):
rv.append(2*sqrt(-p/3)*cos(acos(q/p*sqrt(-3/p)*Rational(3, 2))/3 - k*pi*Rational(2, 3)))
return [i - b/3/a for i in rv]
_, a, b, c = f.monic().all_coeffs()
if c is S.Zero:
x1, x2 = roots([1, a, b], multiple=True)
return [x1, S.Zero, x2]
p = b - a**2/3
q = c - a*b/3 + 2*a**3/27
pon3 = p/3
aon3 = a/3
u1 = None
if p is S.Zero:
if q is S.Zero:
return [-aon3]*3
if q.is_real:
if q.is_positive:
u1 = -root(q, 3)
elif q.is_negative:
u1 = root(-q, 3)
elif q is S.Zero:
y1, y2 = roots([1, 0, p], multiple=True)
return [tmp - aon3 for tmp in [y1, S.Zero, y2]]
elif q.is_real and q.is_negative:
u1 = -root(-q/2 + sqrt(q**2/4 + pon3**3), 3)
coeff = I*sqrt(3)/2
if u1 is None:
u1 = S.One
u2 = Rational(-1, 2) + coeff
u3 = Rational(-1, 2) - coeff
a, b, c, d = S(1), a, b, c
D0 = b**2 - 3*a*c
D1 = 2*b**3 - 9*a*b*c + 27*a**2*d
C = root((D1 + sqrt(D1**2 - 4*D0**3))/2, 3)
return [-(b + uk*C + D0/C/uk)/3/a for uk in [u1, u2, u3]]
u2 = u1*(Rational(-1, 2) + coeff)
u3 = u1*(Rational(-1, 2) - coeff)
if p is S.Zero:
return [u1 - aon3, u2 - aon3, u3 - aon3]
soln = [
-u1 + pon3/u1 - aon3,
-u2 + pon3/u2 - aon3,
-u3 + pon3/u3 - aon3
]
return soln
def _roots_quartic_euler(p, q, r, a):
"""
Descartes-Euler solution of the quartic equation
Parameters
==========
p, q, r: coefficients of ``x**4 + p*x**2 + q*x + r``
a: shift of the roots
Notes
=====
This is a helper function for ``roots_quartic``.
Look for solutions of the form ::
``x1 = sqrt(R) - sqrt(A + B*sqrt(R))``
``x2 = -sqrt(R) - sqrt(A - B*sqrt(R))``
``x3 = -sqrt(R) + sqrt(A - B*sqrt(R))``
``x4 = sqrt(R) + sqrt(A + B*sqrt(R))``
To satisfy the quartic equation one must have
``p = -2*(R + A); q = -4*B*R; r = (R - A)**2 - B**2*R``
so that ``R`` must satisfy the Descartes-Euler resolvent equation
``64*R**3 + 32*p*R**2 + (4*p**2 - 16*r)*R - q**2 = 0``
If the resolvent does not have a rational solution, return None;
in that case it is likely that the Ferrari method gives a simpler
solution.
Examples
========
>>> from sympy import S
>>> from sympy.polys.polyroots import _roots_quartic_euler
>>> p, q, r = -S(64)/5, -S(512)/125, -S(1024)/3125
>>> _roots_quartic_euler(p, q, r, S(0))[0]
-sqrt(32*sqrt(5)/125 + 16/5) + 4*sqrt(5)/5
"""
# solve the resolvent equation
x = Dummy('x')
eq = 64*x**3 + 32*p*x**2 + (4*p**2 - 16*r)*x - q**2
xsols = list(roots(Poly(eq, x), cubics=False).keys())
xsols = [sol for sol in xsols if sol.is_rational and sol.is_nonzero]
if not xsols:
return None
R = max(xsols)
c1 = sqrt(R)
B = -q*c1/(4*R)
A = -R - p/2
c2 = sqrt(A + B)
c3 = sqrt(A - B)
return [c1 - c2 - a, -c1 - c3 - a, -c1 + c3 - a, c1 + c2 - a]
def roots_quartic(f):
r"""
Returns a list of roots of a quartic polynomial.
There are many references for solving quartic expressions available [1-5].
This reviewer has found that many of them require one to select from among
2 or more possible sets of solutions and that some solutions work when one
is searching for real roots but don't work when searching for complex roots
(though this is not always stated clearly). The following routine has been
tested and found to be correct for 0, 2 or 4 complex roots.
The quasisymmetric case solution [6] looks for quartics that have the form
`x**4 + A*x**3 + B*x**2 + C*x + D = 0` where `(C/A)**2 = D`.
Although no general solution that is always applicable for all
coefficients is known to this reviewer, certain conditions are tested
to determine the simplest 4 expressions that can be returned:
1) `f = c + a*(a**2/8 - b/2) == 0`
2) `g = d - a*(a*(3*a**2/256 - b/16) + c/4) = 0`
3) if `f != 0` and `g != 0` and `p = -d + a*c/4 - b**2/12` then
a) `p == 0`
b) `p != 0`
Examples
========
>>> from sympy import Poly
>>> from sympy.polys.polyroots import roots_quartic
>>> r = roots_quartic(Poly('x**4-6*x**3+17*x**2-26*x+20'))
>>> # 4 complex roots: 1+-I*sqrt(3), 2+-I
>>> sorted(str(tmp.evalf(n=2)) for tmp in r)
['1.0 + 1.7*I', '1.0 - 1.7*I', '2.0 + 1.0*I', '2.0 - 1.0*I']
References
==========
1. http://mathforum.org/dr.math/faq/faq.cubic.equations.html
2. https://en.wikipedia.org/wiki/Quartic_function#Summary_of_Ferrari.27s_method
3. http://planetmath.org/encyclopedia/GaloisTheoreticDerivationOfTheQuarticFormula.html
4. http://staff.bath.ac.uk/masjhd/JHD-CA.pdf
5. http://www.albmath.org/files/Math_5713.pdf
6. http://www.statemaster.com/encyclopedia/Quartic-equation
7. eqworld.ipmnet.ru/en/solutions/ae/ae0108.pdf
"""
_, a, b, c, d = f.monic().all_coeffs()
if not d:
return [S.Zero] + roots([1, a, b, c], multiple=True)
elif (c/a)**2 == d:
x, m = f.gen, c/a
g = Poly(x**2 + a*x + b - 2*m, x)
z1, z2 = roots_quadratic(g)
h1 = Poly(x**2 - z1*x + m, x)
h2 = Poly(x**2 - z2*x + m, x)
r1 = roots_quadratic(h1)
r2 = roots_quadratic(h2)
return r1 + r2
else:
a2 = a**2
e = b - 3*a2/8
f = _mexpand(c + a*(a2/8 - b/2))
g = _mexpand(d - a*(a*(3*a2/256 - b/16) + c/4))
aon4 = a/4
if f is S.Zero:
y1, y2 = [sqrt(tmp) for tmp in
roots([1, e, g], multiple=True)]
return [tmp - aon4 for tmp in [-y1, -y2, y1, y2]]
if g is S.Zero:
y = [S.Zero] + roots([1, 0, e, f], multiple=True)
return [tmp - aon4 for tmp in y]
else:
# Descartes-Euler method, see [7]
sols = _roots_quartic_euler(e, f, g, aon4)
if sols:
return sols
# Ferrari method, see [1, 2]
a2 = a**2
e = b - 3*a2/8
f = c + a*(a2/8 - b/2)
g = d - a*(a*(3*a2/256 - b/16) + c/4)
p = -e**2/12 - g
q = -e**3/108 + e*g/3 - f**2/8
TH = Rational(1, 3)
def _ans(y):
w = sqrt(e + 2*y)
arg1 = 3*e + 2*y
arg2 = 2*f/w
ans = []
for s in [-1, 1]:
root = sqrt(-(arg1 + s*arg2))
for t in [-1, 1]:
ans.append((s*w - t*root)/2 - aon4)
return ans
# p == 0 case
y1 = e*Rational(-5, 6) - q**TH
if p.is_zero:
return _ans(y1)
# if p != 0 then u below is not 0
root = sqrt(q**2/4 + p**3/27)
r = -q/2 + root # or -q/2 - root
u = r**TH # primary root of solve(x**3 - r, x)
y2 = e*Rational(-5, 6) + u - p/u/3
if fuzzy_not(p.is_zero):
return _ans(y2)
# sort it out once they know the values of the coefficients
return [Piecewise((a1, Eq(p, 0)), (a2, True))
for a1, a2 in zip(_ans(y1), _ans(y2))]
def roots_binomial(f):
"""Returns a list of roots of a binomial polynomial. If the domain is ZZ
then the roots will be sorted with negatives coming before positives.
The ordering will be the same for any numerical coefficients as long as
the assumptions tested are correct, otherwise the ordering will not be
sorted (but will be canonical).
"""
n = f.degree()
a, b = f.nth(n), f.nth(0)
base = -cancel(b/a)
alpha = root(base, n)
if alpha.is_number:
alpha = alpha.expand(complex=True)
# define some parameters that will allow us to order the roots.
# If the domain is ZZ this is guaranteed to return roots sorted
# with reals before non-real roots and non-real sorted according
# to real part and imaginary part, e.g. -1, 1, -1 + I, 2 - I
neg = base.is_negative
even = n % 2 == 0
if neg:
if even == True and (base + 1).is_positive:
big = True
else:
big = False
# get the indices in the right order so the computed
# roots will be sorted when the domain is ZZ
ks = []
imax = n//2
if even:
ks.append(imax)
imax -= 1
if not neg:
ks.append(0)
for i in range(imax, 0, -1):
if neg:
ks.extend([i, -i])
else:
ks.extend([-i, i])
if neg:
ks.append(0)
if big:
for i in range(0, len(ks), 2):
pair = ks[i: i + 2]
pair = list(reversed(pair))
# compute the roots
roots, d = [], 2*I*pi/n
for k in ks:
zeta = exp(k*d).expand(complex=True)
roots.append((alpha*zeta).expand(power_base=False))
return roots
def _inv_totient_estimate(m):
"""
Find ``(L, U)`` such that ``L <= phi^-1(m) <= U``.
Examples
========
>>> from sympy.polys.polyroots import _inv_totient_estimate
>>> _inv_totient_estimate(192)
(192, 840)
>>> _inv_totient_estimate(400)
(400, 1750)
"""
primes = [ d + 1 for d in divisors(m) if isprime(d + 1) ]
a, b = 1, 1
for p in primes:
a *= p
b *= p - 1
L = m
U = int(math.ceil(m*(float(a)/b)))
P = p = 2
primes = []
while P <= U:
p = nextprime(p)
primes.append(p)
P *= p
P //= p
b = 1
for p in primes[:-1]:
b *= p - 1
U = int(math.ceil(m*(float(P)/b)))
return L, U
def roots_cyclotomic(f, factor=False):
"""Compute roots of cyclotomic polynomials. """
L, U = _inv_totient_estimate(f.degree())
for n in range(L, U + 1):
g = cyclotomic_poly(n, f.gen, polys=True)
if f.expr == g.expr:
break
else: # pragma: no cover
raise RuntimeError("failed to find index of a cyclotomic polynomial")
roots = []
if not factor:
# get the indices in the right order so the computed
# roots will be sorted
h = n//2
ks = [i for i in range(1, n + 1) if igcd(i, n) == 1]
ks.sort(key=lambda x: (x, -1) if x <= h else (abs(x - n), 1))
d = 2*I*pi/n
for k in reversed(ks):
roots.append(exp(k*d).expand(complex=True))
else:
g = Poly(f, extension=root(-1, n))
for h, _ in ordered(g.factor_list()[1]):
roots.append(-h.TC())
return roots
def roots_quintic(f):
"""
Calculate exact roots of a solvable quintic
"""
result = []
coeff_5, coeff_4, p, q, r, s = f.all_coeffs()
# Eqn must be of the form x^5 + px^3 + qx^2 + rx + s
if coeff_4:
return result
if coeff_5 != 1:
l = [p/coeff_5, q/coeff_5, r/coeff_5, s/coeff_5]
if not all(coeff.is_Rational for coeff in l):
return result
f = Poly(f/coeff_5)
quintic = PolyQuintic(f)
# Eqn standardized. Algo for solving starts here
if not f.is_irreducible:
return result
f20 = quintic.f20
# Check if f20 has linear factors over domain Z
if f20.is_irreducible:
return result
# Now, we know that f is solvable
for _factor in f20.factor_list()[1]:
if _factor[0].is_linear:
theta = _factor[0].root(0)
break
d = discriminant(f)
delta = sqrt(d)
# zeta = a fifth root of unity
zeta1, zeta2, zeta3, zeta4 = quintic.zeta
T = quintic.T(theta, d)
tol = S(1e-10)
alpha = T[1] + T[2]*delta
alpha_bar = T[1] - T[2]*delta
beta = T[3] + T[4]*delta
beta_bar = T[3] - T[4]*delta
disc = alpha**2 - 4*beta
disc_bar = alpha_bar**2 - 4*beta_bar
l0 = quintic.l0(theta)
l1 = _quintic_simplify((-alpha + sqrt(disc)) / S(2))
l4 = _quintic_simplify((-alpha - sqrt(disc)) / S(2))
l2 = _quintic_simplify((-alpha_bar + sqrt(disc_bar)) / S(2))
l3 = _quintic_simplify((-alpha_bar - sqrt(disc_bar)) / S(2))
order = quintic.order(theta, d)
test = (order*delta.n()) - ( (l1.n() - l4.n())*(l2.n() - l3.n()) )
# Comparing floats
if not comp(test, 0, tol):
l2, l3 = l3, l2
# Now we have correct order of l's
R1 = l0 + l1*zeta1 + l2*zeta2 + l3*zeta3 + l4*zeta4
R2 = l0 + l3*zeta1 + l1*zeta2 + l4*zeta3 + l2*zeta4
R3 = l0 + l2*zeta1 + l4*zeta2 + l1*zeta3 + l3*zeta4
R4 = l0 + l4*zeta1 + l3*zeta2 + l2*zeta3 + l1*zeta4
Res = [None, [None]*5, [None]*5, [None]*5, [None]*5]
Res_n = [None, [None]*5, [None]*5, [None]*5, [None]*5]
sol = Symbol('sol')
# Simplifying improves performance a lot for exact expressions
R1 = _quintic_simplify(R1)
R2 = _quintic_simplify(R2)
R3 = _quintic_simplify(R3)
R4 = _quintic_simplify(R4)
# Solve imported here. Causing problems if imported as 'solve'
# and hence the changed name
from sympy.solvers.solvers import solve as _solve
a, b = symbols('a b', cls=Dummy)
_sol = _solve( sol**5 - a - I*b, sol)
for i in range(5):
_sol[i] = factor(_sol[i])
R1 = R1.as_real_imag()
R2 = R2.as_real_imag()
R3 = R3.as_real_imag()
R4 = R4.as_real_imag()
for i, currentroot in enumerate(_sol):
Res[1][i] = _quintic_simplify(currentroot.subs({ a: R1[0], b: R1[1] }))
Res[2][i] = _quintic_simplify(currentroot.subs({ a: R2[0], b: R2[1] }))
Res[3][i] = _quintic_simplify(currentroot.subs({ a: R3[0], b: R3[1] }))
Res[4][i] = _quintic_simplify(currentroot.subs({ a: R4[0], b: R4[1] }))
for i in range(1, 5):
for j in range(5):
Res_n[i][j] = Res[i][j].n()
Res[i][j] = _quintic_simplify(Res[i][j])
r1 = Res[1][0]
r1_n = Res_n[1][0]
for i in range(5):
if comp(im(r1_n*Res_n[4][i]), 0, tol):
r4 = Res[4][i]
break
# Now we have various Res values. Each will be a list of five
# values. We have to pick one r value from those five for each Res
u, v = quintic.uv(theta, d)
testplus = (u + v*delta*sqrt(5)).n()
testminus = (u - v*delta*sqrt(5)).n()
# Evaluated numbers suffixed with _n
# We will use evaluated numbers for calculation. Much faster.
r4_n = r4.n()
r2 = r3 = None
for i in range(5):
r2temp_n = Res_n[2][i]
for j in range(5):
# Again storing away the exact number and using
# evaluated numbers in computations
r3temp_n = Res_n[3][j]
if (comp((r1_n*r2temp_n**2 + r4_n*r3temp_n**2 - testplus).n(), 0, tol) and
comp((r3temp_n*r1_n**2 + r2temp_n*r4_n**2 - testminus).n(), 0, tol)):
r2 = Res[2][i]
r3 = Res[3][j]
break
if r2:
break
else:
return [] # fall back to normal solve
# Now, we have r's so we can get roots
x1 = (r1 + r2 + r3 + r4)/5
x2 = (r1*zeta4 + r2*zeta3 + r3*zeta2 + r4*zeta1)/5
x3 = (r1*zeta3 + r2*zeta1 + r3*zeta4 + r4*zeta2)/5
x4 = (r1*zeta2 + r2*zeta4 + r3*zeta1 + r4*zeta3)/5
x5 = (r1*zeta1 + r2*zeta2 + r3*zeta3 + r4*zeta4)/5
result = [x1, x2, x3, x4, x5]
# Now check if solutions are distinct
saw = set()
for r in result:
r = r.n(2)
if r in saw:
# Roots were identical. Abort, return []
# and fall back to usual solve
return []
saw.add(r)
return result
def _quintic_simplify(expr):
expr = powsimp(expr)
expr = cancel(expr)
return together(expr)
def _integer_basis(poly):
"""Compute coefficient basis for a polynomial over integers.
Returns the integer ``div`` such that substituting ``x = div*y``
``p(x) = m*q(y)`` where the coefficients of ``q`` are smaller
than those of ``p``.
For example ``x**5 + 512*x + 1024 = 0``
with ``div = 4`` becomes ``y**5 + 2*y + 1 = 0``
Returns the integer ``div`` or ``None`` if there is no possible scaling.
Examples
========
>>> from sympy.polys import Poly
>>> from sympy.abc import x
>>> from sympy.polys.polyroots import _integer_basis
>>> p = Poly(x**5 + 512*x + 1024, x, domain='ZZ')
>>> _integer_basis(p)
4
"""
monoms, coeffs = list(zip(*poly.terms()))
monoms, = list(zip(*monoms))
coeffs = list(map(abs, coeffs))
if coeffs[0] < coeffs[-1]:
coeffs = list(reversed(coeffs))
n = monoms[0]
monoms = [n - i for i in reversed(monoms)]
else:
return None
monoms = monoms[:-1]
coeffs = coeffs[:-1]
divs = reversed(divisors(gcd_list(coeffs))[1:])
try:
div = next(divs)
except StopIteration:
return None
while True:
for monom, coeff in zip(monoms, coeffs):
if coeff % div**monom != 0:
try:
div = next(divs)
except StopIteration:
return None
else:
break
else:
return div
def preprocess_roots(poly):
"""Try to get rid of symbolic coefficients from ``poly``. """
coeff = S.One
poly_func = poly.func
try:
_, poly = poly.clear_denoms(convert=True)
except DomainError:
return coeff, poly
poly = poly.primitive()[1]
poly = poly.retract()
# TODO: This is fragile. Figure out how to make this independent of construct_domain().
if poly.get_domain().is_Poly and all(c.is_term for c in poly.rep.coeffs()):
poly = poly.inject()
strips = list(zip(*poly.monoms()))
gens = list(poly.gens[1:])
base, strips = strips[0], strips[1:]
for gen, strip in zip(list(gens), strips):
reverse = False
if strip[0] < strip[-1]:
strip = reversed(strip)
reverse = True
ratio = None
for a, b in zip(base, strip):
if not a and not b:
continue
elif not a or not b:
break
elif b % a != 0:
break
else:
_ratio = b // a
if ratio is None:
ratio = _ratio
elif ratio != _ratio:
break
else:
if reverse:
ratio = -ratio
poly = poly.eval(gen, 1)
coeff *= gen**(-ratio)
gens.remove(gen)
if gens:
poly = poly.eject(*gens)
if poly.is_univariate and poly.get_domain().is_ZZ:
basis = _integer_basis(poly)
if basis is not None:
n = poly.degree()
def func(k, coeff):
return coeff//basis**(n - k[0])
poly = poly.termwise(func)
coeff *= basis
if not isinstance(poly, poly_func):
poly = poly_func(poly)
return coeff, poly
@public
def roots(f, *gens, **flags):
"""
Computes symbolic roots of a univariate polynomial.
Given a univariate polynomial f with symbolic coefficients (or
a list of the polynomial's coefficients), returns a dictionary
with its roots and their multiplicities.
Only roots expressible via radicals will be returned. To get
a complete set of roots use RootOf class or numerical methods
instead. By default cubic and quartic formulas are used in
the algorithm. To disable them because of unreadable output
set ``cubics=False`` or ``quartics=False`` respectively. If cubic
roots are real but are expressed in terms of complex numbers
(casus irreducibilis [1]) the ``trig`` flag can be set to True to
have the solutions returned in terms of cosine and inverse cosine
functions.
To get roots from a specific domain set the ``filter`` flag with
one of the following specifiers: Z, Q, R, I, C. By default all
roots are returned (this is equivalent to setting ``filter='C'``).
By default a dictionary is returned giving a compact result in
case of multiple roots. However to get a list containing all
those roots set the ``multiple`` flag to True; the list will
have identical roots appearing next to each other in the result.
(For a given Poly, the all_roots method will give the roots in
sorted numerical order.)
Examples
========
>>> from sympy import Poly, roots
>>> from sympy.abc import x, y
>>> roots(x**2 - 1, x)
{-1: 1, 1: 1}
>>> p = Poly(x**2-1, x)
>>> roots(p)
{-1: 1, 1: 1}
>>> p = Poly(x**2-y, x, y)
>>> roots(Poly(p, x))
{-sqrt(y): 1, sqrt(y): 1}
>>> roots(x**2 - y, x)
{-sqrt(y): 1, sqrt(y): 1}
>>> roots([1, 0, -1])
{-1: 1, 1: 1}
References
==========
.. [1] https://en.wikipedia.org/wiki/Cubic_function#Trigonometric_.28and_hyperbolic.29_method
"""
from sympy.polys.polytools import to_rational_coeffs
flags = dict(flags)
auto = flags.pop('auto', True)
cubics = flags.pop('cubics', True)
trig = flags.pop('trig', False)
quartics = flags.pop('quartics', True)
quintics = flags.pop('quintics', False)
multiple = flags.pop('multiple', False)
filter = flags.pop('filter', None)
predicate = flags.pop('predicate', None)
if isinstance(f, list):
if gens:
raise ValueError('redundant generators given')
x = Dummy('x')
poly, i = {}, len(f) - 1
for coeff in f:
poly[i], i = sympify(coeff), i - 1
f = Poly(poly, x, field=True)
else:
try:
F = Poly(f, *gens, **flags)
if not isinstance(f, Poly) and not F.gen.is_Symbol:
raise PolynomialError("generator must be a Symbol")
else:
f = F
if f.length == 2 and f.degree() != 1:
# check for foo**n factors in the constant
n = f.degree()
npow_bases = []
others = []
expr = f.as_expr()
con = expr.as_independent(*gens)[0]
for p in Mul.make_args(con):
if p.is_Pow and not p.exp % n:
npow_bases.append(p.base**(p.exp/n))
else:
others.append(p)
if npow_bases:
b = Mul(*npow_bases)
B = Dummy()
d = roots(Poly(expr - con + B**n*Mul(*others), *gens,
**flags), *gens, **flags)
rv = {}
for k, v in d.items():
rv[k.subs(B, b)] = v
return rv
except GeneratorsNeeded:
if multiple:
return []
else:
return {}
if f.is_multivariate:
raise PolynomialError('multivariate polynomials are not supported')
def _update_dict(result, currentroot, k):
if currentroot in result:
result[currentroot] += k
else:
result[currentroot] = k
def _try_decompose(f):
"""Find roots using functional decomposition. """
factors, roots = f.decompose(), []
for currentroot in _try_heuristics(factors[0]):
roots.append(currentroot)
for currentfactor in factors[1:]:
previous, roots = list(roots), []
for currentroot in previous:
g = currentfactor - Poly(currentroot, f.gen)
for currentroot in _try_heuristics(g):
roots.append(currentroot)
return roots
def _try_heuristics(f):
"""Find roots using formulas and some tricks. """
if f.is_ground:
return []
if f.is_monomial:
return [S.Zero]*f.degree()
if f.length() == 2:
if f.degree() == 1:
return list(map(cancel, roots_linear(f)))
else:
return roots_binomial(f)
result = []
for i in [-1, 1]:
if not f.eval(i):
f = f.quo(Poly(f.gen - i, f.gen))
result.append(i)
break
n = f.degree()
if n == 1:
result += list(map(cancel, roots_linear(f)))
elif n == 2:
result += list(map(cancel, roots_quadratic(f)))
elif f.is_cyclotomic:
result += roots_cyclotomic(f)
elif n == 3 and cubics:
result += roots_cubic(f, trig=trig)
elif n == 4 and quartics:
result += roots_quartic(f)
elif n == 5 and quintics:
result += roots_quintic(f)
return result
# Convert the generators to symbols
dumgens = symbols('x:%d' % len(f.gens), cls=Dummy)
f = f.per(f.rep, dumgens)
(k,), f = f.terms_gcd()
if not k:
zeros = {}
else:
zeros = {S.Zero: k}
coeff, f = preprocess_roots(f)
if auto and f.get_domain().is_Ring:
f = f.to_field()
# Use EX instead of ZZ_I or QQ_I
if f.get_domain().is_QQ_I:
f = f.per(f.rep.convert(EX))
rescale_x = None
translate_x = None
result = {}
if not f.is_ground:
dom = f.get_domain()
if not dom.is_Exact and dom.is_Numerical:
for r in f.nroots():
_update_dict(result, r, 1)
elif f.degree() == 1:
result[roots_linear(f)[0]] = 1
elif f.length() == 2:
roots_fun = roots_quadratic if f.degree() == 2 else roots_binomial
for r in roots_fun(f):
_update_dict(result, r, 1)
else:
_, factors = Poly(f.as_expr()).factor_list()
if len(factors) == 1 and f.degree() == 2:
for r in roots_quadratic(f):
_update_dict(result, r, 1)
else:
if len(factors) == 1 and factors[0][1] == 1:
if f.get_domain().is_EX:
res = to_rational_coeffs(f)
if res:
if res[0] is None:
translate_x, f = res[2:]
else:
rescale_x, f = res[1], res[-1]
result = roots(f)
if not result:
for currentroot in _try_decompose(f):
_update_dict(result, currentroot, 1)
else:
for r in _try_heuristics(f):
_update_dict(result, r, 1)
else:
for currentroot in _try_decompose(f):
_update_dict(result, currentroot, 1)
else:
for currentfactor, k in factors:
for r in _try_heuristics(Poly(currentfactor, f.gen, field=True)):
_update_dict(result, r, k)
if coeff is not S.One:
_result, result, = result, {}
for currentroot, k in _result.items():
result[coeff*currentroot] = k
if filter not in [None, 'C']:
handlers = {
'Z': lambda r: r.is_Integer,
'Q': lambda r: r.is_Rational,
'R': lambda r: all(a.is_real for a in r.as_numer_denom()),
'I': lambda r: r.is_imaginary,
}
try:
query = handlers[filter]
except KeyError:
raise ValueError("Invalid filter: %s" % filter)
for zero in dict(result).keys():
if not query(zero):
del result[zero]
if predicate is not None:
for zero in dict(result).keys():
if not predicate(zero):
del result[zero]
if rescale_x:
result1 = {}
for k, v in result.items():
result1[k*rescale_x] = v
result = result1
if translate_x:
result1 = {}
for k, v in result.items():
result1[k + translate_x] = v
result = result1
# adding zero roots after non-trivial roots have been translated
result.update(zeros)
if not multiple:
return result
else:
zeros = []
for zero in ordered(result):
zeros.extend([zero]*result[zero])
return zeros
def root_factors(f, *gens, **args):
"""
Returns all factors of a univariate polynomial.
Examples
========
>>> from sympy.abc import x, y
>>> from sympy.polys.polyroots import root_factors
>>> root_factors(x**2 - y, x)
[x - sqrt(y), x + sqrt(y)]
"""
args = dict(args)
filter = args.pop('filter', None)
F = Poly(f, *gens, **args)
if not F.is_Poly:
return [f]
if F.is_multivariate:
raise ValueError('multivariate polynomials are not supported')
x = F.gens[0]
zeros = roots(F, filter=filter)
if not zeros:
factors = [F]
else:
factors, N = [], 0
for r, n in ordered(zeros.items()):
factors, N = factors + [Poly(x - r, x)]*n, N + n
if N < F.degree():
G = reduce(lambda p, q: p*q, factors)
factors.append(F.quo(G))
if not isinstance(f, Poly):
factors = [ f.as_expr() for f in factors ]
return factors
|
c01e1718e61d34c388b322d0ccd695272d7f06a6cce0e8f0b45e0087e461f719
|
"""Polynomial manipulation algorithms and algebraic objects. """
__all__ = [
'Poly', 'PurePoly', 'poly_from_expr', 'parallel_poly_from_expr', 'degree',
'total_degree', 'degree_list', 'LC', 'LM', 'LT', 'pdiv', 'prem', 'pquo',
'pexquo', 'div', 'rem', 'quo', 'exquo', 'half_gcdex', 'gcdex', 'invert',
'subresultants', 'resultant', 'discriminant', 'cofactors', 'gcd_list',
'gcd', 'lcm_list', 'lcm', 'terms_gcd', 'trunc', 'monic', 'content',
'primitive', 'compose', 'decompose', 'sturm', 'gff_list', 'gff',
'sqf_norm', 'sqf_part', 'sqf_list', 'sqf', 'factor_list', 'factor',
'intervals', 'refine_root', 'count_roots', 'real_roots', 'nroots',
'ground_roots', 'nth_power_roots_poly', 'cancel', 'reduced', 'groebner',
'is_zero_dimensional', 'GroebnerBasis', 'poly',
'symmetrize', 'horner', 'interpolate', 'rational_interpolate', 'viete',
'together',
'BasePolynomialError', 'ExactQuotientFailed', 'PolynomialDivisionFailed',
'OperationNotSupported', 'HeuristicGCDFailed', 'HomomorphismFailed',
'IsomorphismFailed', 'ExtraneousFactors', 'EvaluationFailed',
'RefinementFailed', 'CoercionFailed', 'NotInvertible', 'NotReversible',
'NotAlgebraic', 'DomainError', 'PolynomialError', 'UnificationFailed',
'GeneratorsError', 'GeneratorsNeeded', 'ComputationFailed',
'UnivariatePolynomialError', 'MultivariatePolynomialError',
'PolificationFailed', 'OptionError', 'FlagError',
'minpoly', 'minimal_polynomial', 'primitive_element', 'field_isomorphism',
'to_number_field', 'isolate',
'itermonomials', 'Monomial',
'lex', 'grlex', 'grevlex', 'ilex', 'igrlex', 'igrevlex',
'CRootOf', 'rootof', 'RootOf', 'ComplexRootOf', 'RootSum',
'roots',
'Domain', 'FiniteField', 'IntegerRing', 'RationalField', 'RealField',
'ComplexField', 'PythonFiniteField', 'GMPYFiniteField',
'PythonIntegerRing', 'GMPYIntegerRing', 'PythonRational',
'GMPYRationalField', 'AlgebraicField', 'PolynomialRing', 'FractionField',
'ExpressionDomain', 'FF_python', 'FF_gmpy', 'ZZ_python', 'ZZ_gmpy',
'QQ_python', 'QQ_gmpy', 'GF', 'FF', 'ZZ', 'QQ', 'ZZ_I', 'QQ_I', 'RR',
'CC', 'EX',
'construct_domain',
'swinnerton_dyer_poly', 'cyclotomic_poly', 'symmetric_poly',
'random_poly', 'interpolating_poly',
'jacobi_poly', 'chebyshevt_poly', 'chebyshevu_poly', 'hermite_poly',
'legendre_poly', 'laguerre_poly',
'apart', 'apart_list', 'assemble_partfrac_list',
'Options',
'ring', 'xring', 'vring', 'sring',
'field', 'xfield', 'vfield', 'sfield'
]
from .polytools import (Poly, PurePoly, poly_from_expr,
parallel_poly_from_expr, degree, total_degree, degree_list, LC, LM,
LT, pdiv, prem, pquo, pexquo, div, rem, quo, exquo, half_gcdex, gcdex,
invert, subresultants, resultant, discriminant, cofactors, gcd_list,
gcd, lcm_list, lcm, terms_gcd, trunc, monic, content, primitive,
compose, decompose, sturm, gff_list, gff, sqf_norm, sqf_part,
sqf_list, sqf, factor_list, factor, intervals, refine_root,
count_roots, real_roots, nroots, ground_roots, nth_power_roots_poly,
cancel, reduced, groebner, is_zero_dimensional, GroebnerBasis, poly)
from .polyfuncs import (symmetrize, horner, interpolate,
rational_interpolate, viete)
from .rationaltools import together
from .polyerrors import (BasePolynomialError, ExactQuotientFailed,
PolynomialDivisionFailed, OperationNotSupported, HeuristicGCDFailed,
HomomorphismFailed, IsomorphismFailed, ExtraneousFactors,
EvaluationFailed, RefinementFailed, CoercionFailed, NotInvertible,
NotReversible, NotAlgebraic, DomainError, PolynomialError,
UnificationFailed, GeneratorsError, GeneratorsNeeded,
ComputationFailed, UnivariatePolynomialError,
MultivariatePolynomialError, PolificationFailed, OptionError,
FlagError)
from .numberfields import (minpoly, minimal_polynomial, primitive_element,
field_isomorphism, to_number_field, isolate)
from .monomials import itermonomials, Monomial
from .orderings import lex, grlex, grevlex, ilex, igrlex, igrevlex
from .rootoftools import CRootOf, rootof, RootOf, ComplexRootOf, RootSum
from .polyroots import roots
from .domains import (Domain, FiniteField, IntegerRing, RationalField,
RealField, ComplexField, PythonFiniteField, GMPYFiniteField,
PythonIntegerRing, GMPYIntegerRing, PythonRational, GMPYRationalField,
AlgebraicField, PolynomialRing, FractionField, ExpressionDomain,
FF_python, FF_gmpy, ZZ_python, ZZ_gmpy, QQ_python, QQ_gmpy, GF, FF,
ZZ, QQ, ZZ_I, QQ_I, RR, CC, EX)
from .constructor import construct_domain
from .specialpolys import (swinnerton_dyer_poly, cyclotomic_poly,
symmetric_poly, random_poly, interpolating_poly)
from .orthopolys import (jacobi_poly, chebyshevt_poly, chebyshevu_poly,
hermite_poly, legendre_poly, laguerre_poly)
from .partfrac import apart, apart_list, assemble_partfrac_list
from .polyoptions import Options
from .rings import ring, xring, vring, sring
from .fields import field, xfield, vfield, sfield
|
2b3590941dbaf07a6db9ce8042e825bb8a3a9687e6e689cc9dbf8ee82b2bcf58
|
"""Sparse polynomial rings. """
from __future__ import print_function, division
from typing import Any, Dict
from operator import add, mul, lt, le, gt, ge
from types import GeneratorType
from sympy.core.compatibility import is_sequence, reduce
from sympy.core.expr import Expr
from sympy.core.numbers import igcd, oo
from sympy.core.symbol import Symbol, symbols as _symbols
from sympy.core.sympify import CantSympify, sympify
from sympy.ntheory.multinomial import multinomial_coefficients
from sympy.polys.compatibility import IPolys
from sympy.polys.constructor import construct_domain
from sympy.polys.densebasic import dmp_to_dict, dmp_from_dict
from sympy.polys.domains.domainelement import DomainElement
from sympy.polys.domains.polynomialring import PolynomialRing
from sympy.polys.heuristicgcd import heugcd
from sympy.polys.monomials import MonomialOps
from sympy.polys.orderings import lex
from sympy.polys.polyerrors import (
CoercionFailed, GeneratorsError,
ExactQuotientFailed, MultivariatePolynomialError)
from sympy.polys.polyoptions import (Domain as DomainOpt,
Order as OrderOpt, build_options)
from sympy.polys.polyutils import (expr_from_dict, _dict_reorder,
_parallel_dict_from_expr)
from sympy.printing.defaults import DefaultPrinting
from sympy.utilities import public
from sympy.utilities.magic import pollute
@public
def ring(symbols, domain, order=lex):
"""Construct a polynomial ring returning ``(ring, x_1, ..., x_n)``.
Parameters
==========
symbols : str
Symbol/Expr or sequence of str, Symbol/Expr (non-empty)
domain : :class:`~.Domain` or coercible
order : :class:`~.MonomialOrder` or coercible, optional, defaults to ``lex``
Examples
========
>>> from sympy.polys.rings import ring
>>> from sympy.polys.domains import ZZ
>>> from sympy.polys.orderings import lex
>>> R, x, y, z = ring("x,y,z", ZZ, lex)
>>> R
Polynomial ring in x, y, z over ZZ with lex order
>>> x + y + z
x + y + z
>>> type(_)
<class 'sympy.polys.rings.PolyElement'>
"""
_ring = PolyRing(symbols, domain, order)
return (_ring,) + _ring.gens
@public
def xring(symbols, domain, order=lex):
"""Construct a polynomial ring returning ``(ring, (x_1, ..., x_n))``.
Parameters
==========
symbols : str
Symbol/Expr or sequence of str, Symbol/Expr (non-empty)
domain : :class:`~.Domain` or coercible
order : :class:`~.MonomialOrder` or coercible, optional, defaults to ``lex``
Examples
========
>>> from sympy.polys.rings import xring
>>> from sympy.polys.domains import ZZ
>>> from sympy.polys.orderings import lex
>>> R, (x, y, z) = xring("x,y,z", ZZ, lex)
>>> R
Polynomial ring in x, y, z over ZZ with lex order
>>> x + y + z
x + y + z
>>> type(_)
<class 'sympy.polys.rings.PolyElement'>
"""
_ring = PolyRing(symbols, domain, order)
return (_ring, _ring.gens)
@public
def vring(symbols, domain, order=lex):
"""Construct a polynomial ring and inject ``x_1, ..., x_n`` into the global namespace.
Parameters
==========
symbols : str
Symbol/Expr or sequence of str, Symbol/Expr (non-empty)
domain : :class:`~.Domain` or coercible
order : :class:`~.MonomialOrder` or coercible, optional, defaults to ``lex``
Examples
========
>>> from sympy.polys.rings import vring
>>> from sympy.polys.domains import ZZ
>>> from sympy.polys.orderings import lex
>>> vring("x,y,z", ZZ, lex)
Polynomial ring in x, y, z over ZZ with lex order
>>> x + y + z # noqa:
x + y + z
>>> type(_)
<class 'sympy.polys.rings.PolyElement'>
"""
_ring = PolyRing(symbols, domain, order)
pollute([ sym.name for sym in _ring.symbols ], _ring.gens)
return _ring
@public
def sring(exprs, *symbols, **options):
"""Construct a ring deriving generators and domain from options and input expressions.
Parameters
==========
exprs : :class:`~.Expr` or sequence of :class:`~.Expr` (sympifiable)
symbols : sequence of :class:`~.Symbol`/:class:`~.Expr`
options : keyword arguments understood by :class:`~.Options`
Examples
========
>>> from sympy.core import symbols
>>> from sympy.polys.rings import sring
>>> x, y, z = symbols("x,y,z")
>>> R, f = sring(x + 2*y + 3*z)
>>> R
Polynomial ring in x, y, z over ZZ with lex order
>>> f
x + 2*y + 3*z
>>> type(_)
<class 'sympy.polys.rings.PolyElement'>
"""
single = False
if not is_sequence(exprs):
exprs, single = [exprs], True
exprs = list(map(sympify, exprs))
opt = build_options(symbols, options)
# TODO: rewrite this so that it doesn't use expand() (see poly()).
reps, opt = _parallel_dict_from_expr(exprs, opt)
if opt.domain is None:
# NOTE: this is inefficient because construct_domain() automatically
# performs conversion to the target domain. It shouldn't do this.
coeffs = sum([ list(rep.values()) for rep in reps ], [])
opt.domain, _ = construct_domain(coeffs, opt=opt)
_ring = PolyRing(opt.gens, opt.domain, opt.order)
polys = list(map(_ring.from_dict, reps))
if single:
return (_ring, polys[0])
else:
return (_ring, polys)
def _parse_symbols(symbols):
if isinstance(symbols, str):
return _symbols(symbols, seq=True) if symbols else ()
elif isinstance(symbols, Expr):
return (symbols,)
elif is_sequence(symbols):
if all(isinstance(s, str) for s in symbols):
return _symbols(symbols)
elif all(isinstance(s, Expr) for s in symbols):
return symbols
raise GeneratorsError("expected a string, Symbol or expression or a non-empty sequence of strings, Symbols or expressions")
_ring_cache = {} # type: Dict[Any, Any]
class PolyRing(DefaultPrinting, IPolys):
"""Multivariate distributed polynomial ring. """
def __new__(cls, symbols, domain, order=lex):
symbols = tuple(_parse_symbols(symbols))
ngens = len(symbols)
domain = DomainOpt.preprocess(domain)
order = OrderOpt.preprocess(order)
_hash_tuple = (cls.__name__, symbols, ngens, domain, order)
obj = _ring_cache.get(_hash_tuple)
if obj is None:
if domain.is_Composite and set(symbols) & set(domain.symbols):
raise GeneratorsError("polynomial ring and it's ground domain share generators")
obj = object.__new__(cls)
obj._hash_tuple = _hash_tuple
obj._hash = hash(_hash_tuple)
obj.dtype = type("PolyElement", (PolyElement,), {"ring": obj})
obj.symbols = symbols
obj.ngens = ngens
obj.domain = domain
obj.order = order
obj.zero_monom = (0,)*ngens
obj.gens = obj._gens()
obj._gens_set = set(obj.gens)
obj._one = [(obj.zero_monom, domain.one)]
if ngens:
# These expect monomials in at least one variable
codegen = MonomialOps(ngens)
obj.monomial_mul = codegen.mul()
obj.monomial_pow = codegen.pow()
obj.monomial_mulpow = codegen.mulpow()
obj.monomial_ldiv = codegen.ldiv()
obj.monomial_div = codegen.div()
obj.monomial_lcm = codegen.lcm()
obj.monomial_gcd = codegen.gcd()
else:
monunit = lambda a, b: ()
obj.monomial_mul = monunit
obj.monomial_pow = monunit
obj.monomial_mulpow = lambda a, b, c: ()
obj.monomial_ldiv = monunit
obj.monomial_div = monunit
obj.monomial_lcm = monunit
obj.monomial_gcd = monunit
if order is lex:
obj.leading_expv = lambda f: max(f)
else:
obj.leading_expv = lambda f: max(f, key=order)
for symbol, generator in zip(obj.symbols, obj.gens):
if isinstance(symbol, Symbol):
name = symbol.name
if not hasattr(obj, name):
setattr(obj, name, generator)
_ring_cache[_hash_tuple] = obj
return obj
def _gens(self):
"""Return a list of polynomial generators. """
one = self.domain.one
_gens = []
for i in range(self.ngens):
expv = self.monomial_basis(i)
poly = self.zero
poly[expv] = one
_gens.append(poly)
return tuple(_gens)
def __getnewargs__(self):
return (self.symbols, self.domain, self.order)
def __getstate__(self):
state = self.__dict__.copy()
del state["leading_expv"]
for key, value in state.items():
if key.startswith("monomial_"):
del state[key]
return state
def __hash__(self):
return self._hash
def __eq__(self, other):
return isinstance(other, PolyRing) and \
(self.symbols, self.domain, self.ngens, self.order) == \
(other.symbols, other.domain, other.ngens, other.order)
def __ne__(self, other):
return not self == other
def clone(self, symbols=None, domain=None, order=None):
return self.__class__(symbols or self.symbols, domain or self.domain, order or self.order)
def monomial_basis(self, i):
"""Return the ith-basis element. """
basis = [0]*self.ngens
basis[i] = 1
return tuple(basis)
@property
def zero(self):
return self.dtype()
@property
def one(self):
return self.dtype(self._one)
def domain_new(self, element, orig_domain=None):
return self.domain.convert(element, orig_domain)
def ground_new(self, coeff):
return self.term_new(self.zero_monom, coeff)
def term_new(self, monom, coeff):
coeff = self.domain_new(coeff)
poly = self.zero
if coeff:
poly[monom] = coeff
return poly
def ring_new(self, element):
if isinstance(element, PolyElement):
if self == element.ring:
return element
elif isinstance(self.domain, PolynomialRing) and self.domain.ring == element.ring:
return self.ground_new(element)
else:
raise NotImplementedError("conversion")
elif isinstance(element, str):
raise NotImplementedError("parsing")
elif isinstance(element, dict):
return self.from_dict(element)
elif isinstance(element, list):
try:
return self.from_terms(element)
except ValueError:
return self.from_list(element)
elif isinstance(element, Expr):
return self.from_expr(element)
else:
return self.ground_new(element)
__call__ = ring_new
def from_dict(self, element):
domain_new = self.domain_new
poly = self.zero
for monom, coeff in element.items():
coeff = domain_new(coeff)
if coeff:
poly[monom] = coeff
return poly
def from_terms(self, element):
return self.from_dict(dict(element))
def from_list(self, element):
return self.from_dict(dmp_to_dict(element, self.ngens-1, self.domain))
def _rebuild_expr(self, expr, mapping):
domain = self.domain
def _rebuild(expr):
generator = mapping.get(expr)
if generator is not None:
return generator
elif expr.is_Add:
return reduce(add, list(map(_rebuild, expr.args)))
elif expr.is_Mul:
return reduce(mul, list(map(_rebuild, expr.args)))
elif expr.is_Pow and expr.exp.is_Integer and expr.exp >= 0:
return _rebuild(expr.base)**int(expr.exp)
else:
return domain.convert(expr)
return _rebuild(sympify(expr))
def from_expr(self, expr):
mapping = dict(list(zip(self.symbols, self.gens)))
try:
poly = self._rebuild_expr(expr, mapping)
except CoercionFailed:
raise ValueError("expected an expression convertible to a polynomial in %s, got %s" % (self, expr))
else:
return self.ring_new(poly)
def index(self, gen):
"""Compute index of ``gen`` in ``self.gens``. """
if gen is None:
if self.ngens:
i = 0
else:
i = -1 # indicate impossible choice
elif isinstance(gen, int):
i = gen
if 0 <= i and i < self.ngens:
pass
elif -self.ngens <= i and i <= -1:
i = -i - 1
else:
raise ValueError("invalid generator index: %s" % gen)
elif isinstance(gen, self.dtype):
try:
i = self.gens.index(gen)
except ValueError:
raise ValueError("invalid generator: %s" % gen)
elif isinstance(gen, str):
try:
i = self.symbols.index(gen)
except ValueError:
raise ValueError("invalid generator: %s" % gen)
else:
raise ValueError("expected a polynomial generator, an integer, a string or None, got %s" % gen)
return i
def drop(self, *gens):
"""Remove specified generators from this ring. """
indices = set(map(self.index, gens))
symbols = [ s for i, s in enumerate(self.symbols) if i not in indices ]
if not symbols:
return self.domain
else:
return self.clone(symbols=symbols)
def __getitem__(self, key):
symbols = self.symbols[key]
if not symbols:
return self.domain
else:
return self.clone(symbols=symbols)
def to_ground(self):
# TODO: should AlgebraicField be a Composite domain?
if self.domain.is_Composite or hasattr(self.domain, 'domain'):
return self.clone(domain=self.domain.domain)
else:
raise ValueError("%s is not a composite domain" % self.domain)
def to_domain(self):
return PolynomialRing(self)
def to_field(self):
from sympy.polys.fields import FracField
return FracField(self.symbols, self.domain, self.order)
@property
def is_univariate(self):
return len(self.gens) == 1
@property
def is_multivariate(self):
return len(self.gens) > 1
def add(self, *objs):
"""
Add a sequence of polynomials or containers of polynomials.
Examples
========
>>> from sympy.polys.rings import ring
>>> from sympy.polys.domains import ZZ
>>> R, x = ring("x", ZZ)
>>> R.add([ x**2 + 2*i + 3 for i in range(4) ])
4*x**2 + 24
>>> _.factor_list()
(4, [(x**2 + 6, 1)])
"""
p = self.zero
for obj in objs:
if is_sequence(obj, include=GeneratorType):
p += self.add(*obj)
else:
p += obj
return p
def mul(self, *objs):
"""
Multiply a sequence of polynomials or containers of polynomials.
Examples
========
>>> from sympy.polys.rings import ring
>>> from sympy.polys.domains import ZZ
>>> R, x = ring("x", ZZ)
>>> R.mul([ x**2 + 2*i + 3 for i in range(4) ])
x**8 + 24*x**6 + 206*x**4 + 744*x**2 + 945
>>> _.factor_list()
(1, [(x**2 + 3, 1), (x**2 + 5, 1), (x**2 + 7, 1), (x**2 + 9, 1)])
"""
p = self.one
for obj in objs:
if is_sequence(obj, include=GeneratorType):
p *= self.mul(*obj)
else:
p *= obj
return p
def drop_to_ground(self, *gens):
r"""
Remove specified generators from the ring and inject them into
its domain.
"""
indices = set(map(self.index, gens))
symbols = [s for i, s in enumerate(self.symbols) if i not in indices]
gens = [gen for i, gen in enumerate(self.gens) if i not in indices]
if not symbols:
return self
else:
return self.clone(symbols=symbols, domain=self.drop(*gens))
def compose(self, other):
"""Add the generators of ``other`` to ``self``"""
if self != other:
syms = set(self.symbols).union(set(other.symbols))
return self.clone(symbols=list(syms))
else:
return self
def add_gens(self, symbols):
"""Add the elements of ``symbols`` as generators to ``self``"""
syms = set(self.symbols).union(set(symbols))
return self.clone(symbols=list(syms))
class PolyElement(DomainElement, DefaultPrinting, CantSympify, dict):
"""Element of multivariate distributed polynomial ring. """
def new(self, init):
return self.__class__(init)
def parent(self):
return self.ring.to_domain()
def __getnewargs__(self):
return (self.ring, list(self.iterterms()))
_hash = None
def __hash__(self):
# XXX: This computes a hash of a dictionary, but currently we don't
# protect dictionary from being changed so any use site modifications
# will make hashing go wrong. Use this feature with caution until we
# figure out how to make a safe API without compromising speed of this
# low-level class.
_hash = self._hash
if _hash is None:
self._hash = _hash = hash((self.ring, frozenset(self.items())))
return _hash
def copy(self):
"""Return a copy of polynomial self.
Polynomials are mutable; if one is interested in preserving
a polynomial, and one plans to use inplace operations, one
can copy the polynomial. This method makes a shallow copy.
Examples
========
>>> from sympy.polys.domains import ZZ
>>> from sympy.polys.rings import ring
>>> R, x, y = ring('x, y', ZZ)
>>> p = (x + y)**2
>>> p1 = p.copy()
>>> p2 = p
>>> p[R.zero_monom] = 3
>>> p
x**2 + 2*x*y + y**2 + 3
>>> p1
x**2 + 2*x*y + y**2
>>> p2
x**2 + 2*x*y + y**2 + 3
"""
return self.new(self)
def set_ring(self, new_ring):
if self.ring == new_ring:
return self
elif self.ring.symbols != new_ring.symbols:
terms = list(zip(*_dict_reorder(self, self.ring.symbols, new_ring.symbols)))
return new_ring.from_terms(terms)
else:
return new_ring.from_dict(self)
def as_expr(self, *symbols):
if symbols and len(symbols) != self.ring.ngens:
raise ValueError("not enough symbols, expected %s got %s" % (self.ring.ngens, len(symbols)))
else:
symbols = self.ring.symbols
return expr_from_dict(self.as_expr_dict(), *symbols)
def as_expr_dict(self):
to_sympy = self.ring.domain.to_sympy
return {monom: to_sympy(coeff) for monom, coeff in self.iterterms()}
def clear_denoms(self):
domain = self.ring.domain
if not domain.is_Field or not domain.has_assoc_Ring:
return domain.one, self
ground_ring = domain.get_ring()
common = ground_ring.one
lcm = ground_ring.lcm
denom = domain.denom
for coeff in self.values():
common = lcm(common, denom(coeff))
poly = self.new([ (k, v*common) for k, v in self.items() ])
return common, poly
def strip_zero(self):
"""Eliminate monomials with zero coefficient. """
for k, v in list(self.items()):
if not v:
del self[k]
def __eq__(p1, p2):
"""Equality test for polynomials.
Examples
========
>>> from sympy.polys.domains import ZZ
>>> from sympy.polys.rings import ring
>>> _, x, y = ring('x, y', ZZ)
>>> p1 = (x + y)**2 + (x - y)**2
>>> p1 == 4*x*y
False
>>> p1 == 2*(x**2 + y**2)
True
"""
if not p2:
return not p1
elif isinstance(p2, PolyElement) and p2.ring == p1.ring:
return dict.__eq__(p1, p2)
elif len(p1) > 1:
return False
else:
return p1.get(p1.ring.zero_monom) == p2
def __ne__(p1, p2):
return not p1 == p2
def almosteq(p1, p2, tolerance=None):
"""Approximate equality test for polynomials. """
ring = p1.ring
if isinstance(p2, ring.dtype):
if set(p1.keys()) != set(p2.keys()):
return False
almosteq = ring.domain.almosteq
for k in p1.keys():
if not almosteq(p1[k], p2[k], tolerance):
return False
return True
elif len(p1) > 1:
return False
else:
try:
p2 = ring.domain.convert(p2)
except CoercionFailed:
return False
else:
return ring.domain.almosteq(p1.const(), p2, tolerance)
def sort_key(self):
return (len(self), self.terms())
def _cmp(p1, p2, op):
if isinstance(p2, p1.ring.dtype):
return op(p1.sort_key(), p2.sort_key())
else:
return NotImplemented
def __lt__(p1, p2):
return p1._cmp(p2, lt)
def __le__(p1, p2):
return p1._cmp(p2, le)
def __gt__(p1, p2):
return p1._cmp(p2, gt)
def __ge__(p1, p2):
return p1._cmp(p2, ge)
def _drop(self, gen):
ring = self.ring
i = ring.index(gen)
if ring.ngens == 1:
return i, ring.domain
else:
symbols = list(ring.symbols)
del symbols[i]
return i, ring.clone(symbols=symbols)
def drop(self, gen):
i, ring = self._drop(gen)
if self.ring.ngens == 1:
if self.is_ground:
return self.coeff(1)
else:
raise ValueError("can't drop %s" % gen)
else:
poly = ring.zero
for k, v in self.items():
if k[i] == 0:
K = list(k)
del K[i]
poly[tuple(K)] = v
else:
raise ValueError("can't drop %s" % gen)
return poly
def _drop_to_ground(self, gen):
ring = self.ring
i = ring.index(gen)
symbols = list(ring.symbols)
del symbols[i]
return i, ring.clone(symbols=symbols, domain=ring[i])
def drop_to_ground(self, gen):
if self.ring.ngens == 1:
raise ValueError("can't drop only generator to ground")
i, ring = self._drop_to_ground(gen)
poly = ring.zero
gen = ring.domain.gens[0]
for monom, coeff in self.iterterms():
mon = monom[:i] + monom[i+1:]
if not mon in poly:
poly[mon] = (gen**monom[i]).mul_ground(coeff)
else:
poly[mon] += (gen**monom[i]).mul_ground(coeff)
return poly
def to_dense(self):
return dmp_from_dict(self, self.ring.ngens-1, self.ring.domain)
def to_dict(self):
return dict(self)
def str(self, printer, precedence, exp_pattern, mul_symbol):
if not self:
return printer._print(self.ring.domain.zero)
prec_mul = precedence["Mul"]
prec_atom = precedence["Atom"]
ring = self.ring
symbols = ring.symbols
ngens = ring.ngens
zm = ring.zero_monom
sexpvs = []
for expv, coeff in self.terms():
negative = ring.domain.is_negative(coeff)
sign = " - " if negative else " + "
sexpvs.append(sign)
if expv == zm:
scoeff = printer._print(coeff)
if negative and scoeff.startswith("-"):
scoeff = scoeff[1:]
else:
if negative:
coeff = -coeff
if coeff != self.ring.one:
scoeff = printer.parenthesize(coeff, prec_mul, strict=True)
else:
scoeff = ''
sexpv = []
for i in range(ngens):
exp = expv[i]
if not exp:
continue
symbol = printer.parenthesize(symbols[i], prec_atom, strict=True)
if exp != 1:
if exp != int(exp) or exp < 0:
sexp = printer.parenthesize(exp, prec_atom, strict=False)
else:
sexp = exp
sexpv.append(exp_pattern % (symbol, sexp))
else:
sexpv.append('%s' % symbol)
if scoeff:
sexpv = [scoeff] + sexpv
sexpvs.append(mul_symbol.join(sexpv))
if sexpvs[0] in [" + ", " - "]:
head = sexpvs.pop(0)
if head == " - ":
sexpvs.insert(0, "-")
return "".join(sexpvs)
@property
def is_generator(self):
return self in self.ring._gens_set
@property
def is_ground(self):
return not self or (len(self) == 1 and self.ring.zero_monom in self)
@property
def is_monomial(self):
return not self or (len(self) == 1 and self.LC == 1)
@property
def is_term(self):
return len(self) <= 1
@property
def is_negative(self):
return self.ring.domain.is_negative(self.LC)
@property
def is_positive(self):
return self.ring.domain.is_positive(self.LC)
@property
def is_nonnegative(self):
return self.ring.domain.is_nonnegative(self.LC)
@property
def is_nonpositive(self):
return self.ring.domain.is_nonpositive(self.LC)
@property
def is_zero(f):
return not f
@property
def is_one(f):
return f == f.ring.one
@property
def is_monic(f):
return f.ring.domain.is_one(f.LC)
@property
def is_primitive(f):
return f.ring.domain.is_one(f.content())
@property
def is_linear(f):
return all(sum(monom) <= 1 for monom in f.itermonoms())
@property
def is_quadratic(f):
return all(sum(monom) <= 2 for monom in f.itermonoms())
@property
def is_squarefree(f):
if not f.ring.ngens:
return True
return f.ring.dmp_sqf_p(f)
@property
def is_irreducible(f):
if not f.ring.ngens:
return True
return f.ring.dmp_irreducible_p(f)
@property
def is_cyclotomic(f):
if f.ring.is_univariate:
return f.ring.dup_cyclotomic_p(f)
else:
raise MultivariatePolynomialError("cyclotomic polynomial")
def __neg__(self):
return self.new([ (monom, -coeff) for monom, coeff in self.iterterms() ])
def __pos__(self):
return self
def __add__(p1, p2):
"""Add two polynomials.
Examples
========
>>> from sympy.polys.domains import ZZ
>>> from sympy.polys.rings import ring
>>> _, x, y = ring('x, y', ZZ)
>>> (x + y)**2 + (x - y)**2
2*x**2 + 2*y**2
"""
if not p2:
return p1.copy()
ring = p1.ring
if isinstance(p2, ring.dtype):
p = p1.copy()
get = p.get
zero = ring.domain.zero
for k, v in p2.items():
v = get(k, zero) + v
if v:
p[k] = v
else:
del p[k]
return p
elif isinstance(p2, PolyElement):
if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring:
pass
elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring:
return p2.__radd__(p1)
else:
return NotImplemented
try:
cp2 = ring.domain_new(p2)
except CoercionFailed:
return NotImplemented
else:
p = p1.copy()
if not cp2:
return p
zm = ring.zero_monom
if zm not in p1.keys():
p[zm] = cp2
else:
if p2 == -p[zm]:
del p[zm]
else:
p[zm] += cp2
return p
def __radd__(p1, n):
p = p1.copy()
if not n:
return p
ring = p1.ring
try:
n = ring.domain_new(n)
except CoercionFailed:
return NotImplemented
else:
zm = ring.zero_monom
if zm not in p1.keys():
p[zm] = n
else:
if n == -p[zm]:
del p[zm]
else:
p[zm] += n
return p
def __sub__(p1, p2):
"""Subtract polynomial p2 from p1.
Examples
========
>>> from sympy.polys.domains import ZZ
>>> from sympy.polys.rings import ring
>>> _, x, y = ring('x, y', ZZ)
>>> p1 = x + y**2
>>> p2 = x*y + y**2
>>> p1 - p2
-x*y + x
"""
if not p2:
return p1.copy()
ring = p1.ring
if isinstance(p2, ring.dtype):
p = p1.copy()
get = p.get
zero = ring.domain.zero
for k, v in p2.items():
v = get(k, zero) - v
if v:
p[k] = v
else:
del p[k]
return p
elif isinstance(p2, PolyElement):
if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring:
pass
elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring:
return p2.__rsub__(p1)
else:
return NotImplemented
try:
p2 = ring.domain_new(p2)
except CoercionFailed:
return NotImplemented
else:
p = p1.copy()
zm = ring.zero_monom
if zm not in p1.keys():
p[zm] = -p2
else:
if p2 == p[zm]:
del p[zm]
else:
p[zm] -= p2
return p
def __rsub__(p1, n):
"""n - p1 with n convertible to the coefficient domain.
Examples
========
>>> from sympy.polys.domains import ZZ
>>> from sympy.polys.rings import ring
>>> _, x, y = ring('x, y', ZZ)
>>> p = x + y
>>> 4 - p
-x - y + 4
"""
ring = p1.ring
try:
n = ring.domain_new(n)
except CoercionFailed:
return NotImplemented
else:
p = ring.zero
for expv in p1:
p[expv] = -p1[expv]
p += n
return p
def __mul__(p1, p2):
"""Multiply two polynomials.
Examples
========
>>> from sympy.polys.domains import QQ
>>> from sympy.polys.rings import ring
>>> _, x, y = ring('x, y', QQ)
>>> p1 = x + y
>>> p2 = x - y
>>> p1*p2
x**2 - y**2
"""
ring = p1.ring
p = ring.zero
if not p1 or not p2:
return p
elif isinstance(p2, ring.dtype):
get = p.get
zero = ring.domain.zero
monomial_mul = ring.monomial_mul
p2it = list(p2.items())
for exp1, v1 in p1.items():
for exp2, v2 in p2it:
exp = monomial_mul(exp1, exp2)
p[exp] = get(exp, zero) + v1*v2
p.strip_zero()
return p
elif isinstance(p2, PolyElement):
if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring:
pass
elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring:
return p2.__rmul__(p1)
else:
return NotImplemented
try:
p2 = ring.domain_new(p2)
except CoercionFailed:
return NotImplemented
else:
for exp1, v1 in p1.items():
v = v1*p2
if v:
p[exp1] = v
return p
def __rmul__(p1, p2):
"""p2 * p1 with p2 in the coefficient domain of p1.
Examples
========
>>> from sympy.polys.domains import ZZ
>>> from sympy.polys.rings import ring
>>> _, x, y = ring('x, y', ZZ)
>>> p = x + y
>>> 4 * p
4*x + 4*y
"""
p = p1.ring.zero
if not p2:
return p
try:
p2 = p.ring.domain_new(p2)
except CoercionFailed:
return NotImplemented
else:
for exp1, v1 in p1.items():
v = p2*v1
if v:
p[exp1] = v
return p
def __pow__(self, n):
"""raise polynomial to power `n`
Examples
========
>>> from sympy.polys.domains import ZZ
>>> from sympy.polys.rings import ring
>>> _, x, y = ring('x, y', ZZ)
>>> p = x + y**2
>>> p**3
x**3 + 3*x**2*y**2 + 3*x*y**4 + y**6
"""
ring = self.ring
if not n:
if self:
return ring.one
else:
raise ValueError("0**0")
elif len(self) == 1:
monom, coeff = list(self.items())[0]
p = ring.zero
if coeff == 1:
p[ring.monomial_pow(monom, n)] = coeff
else:
p[ring.monomial_pow(monom, n)] = coeff**n
return p
# For ring series, we need negative and rational exponent support only
# with monomials.
n = int(n)
if n < 0:
raise ValueError("Negative exponent")
elif n == 1:
return self.copy()
elif n == 2:
return self.square()
elif n == 3:
return self*self.square()
elif len(self) <= 5: # TODO: use an actual density measure
return self._pow_multinomial(n)
else:
return self._pow_generic(n)
def _pow_generic(self, n):
p = self.ring.one
c = self
while True:
if n & 1:
p = p*c
n -= 1
if not n:
break
c = c.square()
n = n // 2
return p
def _pow_multinomial(self, n):
multinomials = list(multinomial_coefficients(len(self), n).items())
monomial_mulpow = self.ring.monomial_mulpow
zero_monom = self.ring.zero_monom
terms = list(self.iterterms())
zero = self.ring.domain.zero
poly = self.ring.zero
for multinomial, multinomial_coeff in multinomials:
product_monom = zero_monom
product_coeff = multinomial_coeff
for exp, (monom, coeff) in zip(multinomial, terms):
if exp:
product_monom = monomial_mulpow(product_monom, monom, exp)
product_coeff *= coeff**exp
monom = tuple(product_monom)
coeff = product_coeff
coeff = poly.get(monom, zero) + coeff
if coeff:
poly[monom] = coeff
else:
del poly[monom]
return poly
def square(self):
"""square of a polynomial
Examples
========
>>> from sympy.polys.rings import ring
>>> from sympy.polys.domains import ZZ
>>> _, x, y = ring('x, y', ZZ)
>>> p = x + y**2
>>> p.square()
x**2 + 2*x*y**2 + y**4
"""
ring = self.ring
p = ring.zero
get = p.get
keys = list(self.keys())
zero = ring.domain.zero
monomial_mul = ring.monomial_mul
for i in range(len(keys)):
k1 = keys[i]
pk = self[k1]
for j in range(i):
k2 = keys[j]
exp = monomial_mul(k1, k2)
p[exp] = get(exp, zero) + pk*self[k2]
p = p.imul_num(2)
get = p.get
for k, v in self.items():
k2 = monomial_mul(k, k)
p[k2] = get(k2, zero) + v**2
p.strip_zero()
return p
def __divmod__(p1, p2):
ring = p1.ring
if not p2:
raise ZeroDivisionError("polynomial division")
elif isinstance(p2, ring.dtype):
return p1.div(p2)
elif isinstance(p2, PolyElement):
if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring:
pass
elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring:
return p2.__rdivmod__(p1)
else:
return NotImplemented
try:
p2 = ring.domain_new(p2)
except CoercionFailed:
return NotImplemented
else:
return (p1.quo_ground(p2), p1.rem_ground(p2))
def __rdivmod__(p1, p2):
return NotImplemented
def __mod__(p1, p2):
ring = p1.ring
if not p2:
raise ZeroDivisionError("polynomial division")
elif isinstance(p2, ring.dtype):
return p1.rem(p2)
elif isinstance(p2, PolyElement):
if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring:
pass
elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring:
return p2.__rmod__(p1)
else:
return NotImplemented
try:
p2 = ring.domain_new(p2)
except CoercionFailed:
return NotImplemented
else:
return p1.rem_ground(p2)
def __rmod__(p1, p2):
return NotImplemented
def __truediv__(p1, p2):
ring = p1.ring
if not p2:
raise ZeroDivisionError("polynomial division")
elif isinstance(p2, ring.dtype):
if p2.is_monomial:
return p1*(p2**(-1))
else:
return p1.quo(p2)
elif isinstance(p2, PolyElement):
if isinstance(ring.domain, PolynomialRing) and ring.domain.ring == p2.ring:
pass
elif isinstance(p2.ring.domain, PolynomialRing) and p2.ring.domain.ring == ring:
return p2.__rtruediv__(p1)
else:
return NotImplemented
try:
p2 = ring.domain_new(p2)
except CoercionFailed:
return NotImplemented
else:
return p1.quo_ground(p2)
def __rtruediv__(p1, p2):
return NotImplemented
__floordiv__ = __div__ = __truediv__
__rfloordiv__ = __rdiv__ = __rtruediv__
# TODO: use // (__floordiv__) for exquo()?
def _term_div(self):
zm = self.ring.zero_monom
domain = self.ring.domain
domain_quo = domain.quo
monomial_div = self.ring.monomial_div
if domain.is_Field:
def term_div(a_lm_a_lc, b_lm_b_lc):
a_lm, a_lc = a_lm_a_lc
b_lm, b_lc = b_lm_b_lc
if b_lm == zm: # apparently this is a very common case
monom = a_lm
else:
monom = monomial_div(a_lm, b_lm)
if monom is not None:
return monom, domain_quo(a_lc, b_lc)
else:
return None
else:
def term_div(a_lm_a_lc, b_lm_b_lc):
a_lm, a_lc = a_lm_a_lc
b_lm, b_lc = b_lm_b_lc
if b_lm == zm: # apparently this is a very common case
monom = a_lm
else:
monom = monomial_div(a_lm, b_lm)
if not (monom is None or a_lc % b_lc):
return monom, domain_quo(a_lc, b_lc)
else:
return None
return term_div
def div(self, fv):
"""Division algorithm, see [CLO] p64.
fv array of polynomials
return qv, r such that
self = sum(fv[i]*qv[i]) + r
All polynomials are required not to be Laurent polynomials.
Examples
========
>>> from sympy.polys.rings import ring
>>> from sympy.polys.domains import ZZ
>>> _, x, y = ring('x, y', ZZ)
>>> f = x**3
>>> f0 = x - y**2
>>> f1 = x - y
>>> qv, r = f.div((f0, f1))
>>> qv[0]
x**2 + x*y**2 + y**4
>>> qv[1]
0
>>> r
y**6
"""
ring = self.ring
ret_single = False
if isinstance(fv, PolyElement):
ret_single = True
fv = [fv]
if any(not f for f in fv):
raise ZeroDivisionError("polynomial division")
if not self:
if ret_single:
return ring.zero, ring.zero
else:
return [], ring.zero
for f in fv:
if f.ring != ring:
raise ValueError('self and f must have the same ring')
s = len(fv)
qv = [ring.zero for i in range(s)]
p = self.copy()
r = ring.zero
term_div = self._term_div()
expvs = [fx.leading_expv() for fx in fv]
while p:
i = 0
divoccurred = 0
while i < s and divoccurred == 0:
expv = p.leading_expv()
term = term_div((expv, p[expv]), (expvs[i], fv[i][expvs[i]]))
if term is not None:
expv1, c = term
qv[i] = qv[i]._iadd_monom((expv1, c))
p = p._iadd_poly_monom(fv[i], (expv1, -c))
divoccurred = 1
else:
i += 1
if not divoccurred:
expv = p.leading_expv()
r = r._iadd_monom((expv, p[expv]))
del p[expv]
if expv == ring.zero_monom:
r += p
if ret_single:
if not qv:
return ring.zero, r
else:
return qv[0], r
else:
return qv, r
def rem(self, G):
f = self
if isinstance(G, PolyElement):
G = [G]
if any(not g for g in G):
raise ZeroDivisionError("polynomial division")
ring = f.ring
domain = ring.domain
zero = domain.zero
monomial_mul = ring.monomial_mul
r = ring.zero
term_div = f._term_div()
ltf = f.LT
f = f.copy()
get = f.get
while f:
for g in G:
tq = term_div(ltf, g.LT)
if tq is not None:
m, c = tq
for mg, cg in g.iterterms():
m1 = monomial_mul(mg, m)
c1 = get(m1, zero) - c*cg
if not c1:
del f[m1]
else:
f[m1] = c1
ltm = f.leading_expv()
if ltm is not None:
ltf = ltm, f[ltm]
break
else:
ltm, ltc = ltf
if ltm in r:
r[ltm] += ltc
else:
r[ltm] = ltc
del f[ltm]
ltm = f.leading_expv()
if ltm is not None:
ltf = ltm, f[ltm]
return r
def quo(f, G):
return f.div(G)[0]
def exquo(f, G):
q, r = f.div(G)
if not r:
return q
else:
raise ExactQuotientFailed(f, G)
def _iadd_monom(self, mc):
"""add to self the monomial coeff*x0**i0*x1**i1*...
unless self is a generator -- then just return the sum of the two.
mc is a tuple, (monom, coeff), where monomial is (i0, i1, ...)
Examples
========
>>> from sympy.polys.rings import ring
>>> from sympy.polys.domains import ZZ
>>> _, x, y = ring('x, y', ZZ)
>>> p = x**4 + 2*y
>>> m = (1, 2)
>>> p1 = p._iadd_monom((m, 5))
>>> p1
x**4 + 5*x*y**2 + 2*y
>>> p1 is p
True
>>> p = x
>>> p1 = p._iadd_monom((m, 5))
>>> p1
5*x*y**2 + x
>>> p1 is p
False
"""
if self in self.ring._gens_set:
cpself = self.copy()
else:
cpself = self
expv, coeff = mc
c = cpself.get(expv)
if c is None:
cpself[expv] = coeff
else:
c += coeff
if c:
cpself[expv] = c
else:
del cpself[expv]
return cpself
def _iadd_poly_monom(self, p2, mc):
"""add to self the product of (p)*(coeff*x0**i0*x1**i1*...)
unless self is a generator -- then just return the sum of the two.
mc is a tuple, (monom, coeff), where monomial is (i0, i1, ...)
Examples
========
>>> from sympy.polys.rings import ring
>>> from sympy.polys.domains import ZZ
>>> _, x, y, z = ring('x, y, z', ZZ)
>>> p1 = x**4 + 2*y
>>> p2 = y + z
>>> m = (1, 2, 3)
>>> p1 = p1._iadd_poly_monom(p2, (m, 3))
>>> p1
x**4 + 3*x*y**3*z**3 + 3*x*y**2*z**4 + 2*y
"""
p1 = self
if p1 in p1.ring._gens_set:
p1 = p1.copy()
(m, c) = mc
get = p1.get
zero = p1.ring.domain.zero
monomial_mul = p1.ring.monomial_mul
for k, v in p2.items():
ka = monomial_mul(k, m)
coeff = get(ka, zero) + v*c
if coeff:
p1[ka] = coeff
else:
del p1[ka]
return p1
def degree(f, x=None):
"""
The leading degree in ``x`` or the main variable.
Note that the degree of 0 is negative infinity (the SymPy object -oo).
"""
i = f.ring.index(x)
if not f:
return -oo
elif i < 0:
return 0
else:
return max([ monom[i] for monom in f.itermonoms() ])
def degrees(f):
"""
A tuple containing leading degrees in all variables.
Note that the degree of 0 is negative infinity (the SymPy object -oo)
"""
if not f:
return (-oo,)*f.ring.ngens
else:
return tuple(map(max, list(zip(*f.itermonoms()))))
def tail_degree(f, x=None):
"""
The tail degree in ``x`` or the main variable.
Note that the degree of 0 is negative infinity (the SymPy object -oo)
"""
i = f.ring.index(x)
if not f:
return -oo
elif i < 0:
return 0
else:
return min([ monom[i] for monom in f.itermonoms() ])
def tail_degrees(f):
"""
A tuple containing tail degrees in all variables.
Note that the degree of 0 is negative infinity (the SymPy object -oo)
"""
if not f:
return (-oo,)*f.ring.ngens
else:
return tuple(map(min, list(zip(*f.itermonoms()))))
def leading_expv(self):
"""Leading monomial tuple according to the monomial ordering.
Examples
========
>>> from sympy.polys.rings import ring
>>> from sympy.polys.domains import ZZ
>>> _, x, y, z = ring('x, y, z', ZZ)
>>> p = x**4 + x**3*y + x**2*z**2 + z**7
>>> p.leading_expv()
(4, 0, 0)
"""
if self:
return self.ring.leading_expv(self)
else:
return None
def _get_coeff(self, expv):
return self.get(expv, self.ring.domain.zero)
def coeff(self, element):
"""
Returns the coefficient that stands next to the given monomial.
Parameters
==========
element : PolyElement (with ``is_monomial = True``) or 1
Examples
========
>>> from sympy.polys.rings import ring
>>> from sympy.polys.domains import ZZ
>>> _, x, y, z = ring("x,y,z", ZZ)
>>> f = 3*x**2*y - x*y*z + 7*z**3 + 23
>>> f.coeff(x**2*y)
3
>>> f.coeff(x*y)
0
>>> f.coeff(1)
23
"""
if element == 1:
return self._get_coeff(self.ring.zero_monom)
elif isinstance(element, self.ring.dtype):
terms = list(element.iterterms())
if len(terms) == 1:
monom, coeff = terms[0]
if coeff == self.ring.domain.one:
return self._get_coeff(monom)
raise ValueError("expected a monomial, got %s" % element)
def const(self):
"""Returns the constant coeffcient. """
return self._get_coeff(self.ring.zero_monom)
@property
def LC(self):
return self._get_coeff(self.leading_expv())
@property
def LM(self):
expv = self.leading_expv()
if expv is None:
return self.ring.zero_monom
else:
return expv
def leading_monom(self):
"""
Leading monomial as a polynomial element.
Examples
========
>>> from sympy.polys.rings import ring
>>> from sympy.polys.domains import ZZ
>>> _, x, y = ring('x, y', ZZ)
>>> (3*x*y + y**2).leading_monom()
x*y
"""
p = self.ring.zero
expv = self.leading_expv()
if expv:
p[expv] = self.ring.domain.one
return p
@property
def LT(self):
expv = self.leading_expv()
if expv is None:
return (self.ring.zero_monom, self.ring.domain.zero)
else:
return (expv, self._get_coeff(expv))
def leading_term(self):
"""Leading term as a polynomial element.
Examples
========
>>> from sympy.polys.rings import ring
>>> from sympy.polys.domains import ZZ
>>> _, x, y = ring('x, y', ZZ)
>>> (3*x*y + y**2).leading_term()
3*x*y
"""
p = self.ring.zero
expv = self.leading_expv()
if expv is not None:
p[expv] = self[expv]
return p
def _sorted(self, seq, order):
if order is None:
order = self.ring.order
else:
order = OrderOpt.preprocess(order)
if order is lex:
return sorted(seq, key=lambda monom: monom[0], reverse=True)
else:
return sorted(seq, key=lambda monom: order(monom[0]), reverse=True)
def coeffs(self, order=None):
"""Ordered list of polynomial coefficients.
Parameters
==========
order : :class:`~.MonomialOrder` or coercible, optional
Examples
========
>>> from sympy.polys.rings import ring
>>> from sympy.polys.domains import ZZ
>>> from sympy.polys.orderings import lex, grlex
>>> _, x, y = ring("x, y", ZZ, lex)
>>> f = x*y**7 + 2*x**2*y**3
>>> f.coeffs()
[2, 1]
>>> f.coeffs(grlex)
[1, 2]
"""
return [ coeff for _, coeff in self.terms(order) ]
def monoms(self, order=None):
"""Ordered list of polynomial monomials.
Parameters
==========
order : :class:`~.MonomialOrder` or coercible, optional
Examples
========
>>> from sympy.polys.rings import ring
>>> from sympy.polys.domains import ZZ
>>> from sympy.polys.orderings import lex, grlex
>>> _, x, y = ring("x, y", ZZ, lex)
>>> f = x*y**7 + 2*x**2*y**3
>>> f.monoms()
[(2, 3), (1, 7)]
>>> f.monoms(grlex)
[(1, 7), (2, 3)]
"""
return [ monom for monom, _ in self.terms(order) ]
def terms(self, order=None):
"""Ordered list of polynomial terms.
Parameters
==========
order : :class:`~.MonomialOrder` or coercible, optional
Examples
========
>>> from sympy.polys.rings import ring
>>> from sympy.polys.domains import ZZ
>>> from sympy.polys.orderings import lex, grlex
>>> _, x, y = ring("x, y", ZZ, lex)
>>> f = x*y**7 + 2*x**2*y**3
>>> f.terms()
[((2, 3), 2), ((1, 7), 1)]
>>> f.terms(grlex)
[((1, 7), 1), ((2, 3), 2)]
"""
return self._sorted(list(self.items()), order)
def itercoeffs(self):
"""Iterator over coefficients of a polynomial. """
return iter(self.values())
def itermonoms(self):
"""Iterator over monomials of a polynomial. """
return iter(self.keys())
def iterterms(self):
"""Iterator over terms of a polynomial. """
return iter(self.items())
def listcoeffs(self):
"""Unordered list of polynomial coefficients. """
return list(self.values())
def listmonoms(self):
"""Unordered list of polynomial monomials. """
return list(self.keys())
def listterms(self):
"""Unordered list of polynomial terms. """
return list(self.items())
def imul_num(p, c):
"""multiply inplace the polynomial p by an element in the
coefficient ring, provided p is not one of the generators;
else multiply not inplace
Examples
========
>>> from sympy.polys.rings import ring
>>> from sympy.polys.domains import ZZ
>>> _, x, y = ring('x, y', ZZ)
>>> p = x + y**2
>>> p1 = p.imul_num(3)
>>> p1
3*x + 3*y**2
>>> p1 is p
True
>>> p = x
>>> p1 = p.imul_num(3)
>>> p1
3*x
>>> p1 is p
False
"""
if p in p.ring._gens_set:
return p*c
if not c:
p.clear()
return
for exp in p:
p[exp] *= c
return p
def content(f):
"""Returns GCD of polynomial's coefficients. """
domain = f.ring.domain
cont = domain.zero
gcd = domain.gcd
for coeff in f.itercoeffs():
cont = gcd(cont, coeff)
return cont
def primitive(f):
"""Returns content and a primitive polynomial. """
cont = f.content()
return cont, f.quo_ground(cont)
def monic(f):
"""Divides all coefficients by the leading coefficient. """
if not f:
return f
else:
return f.quo_ground(f.LC)
def mul_ground(f, x):
if not x:
return f.ring.zero
terms = [ (monom, coeff*x) for monom, coeff in f.iterterms() ]
return f.new(terms)
def mul_monom(f, monom):
monomial_mul = f.ring.monomial_mul
terms = [ (monomial_mul(f_monom, monom), f_coeff) for f_monom, f_coeff in f.items() ]
return f.new(terms)
def mul_term(f, term):
monom, coeff = term
if not f or not coeff:
return f.ring.zero
elif monom == f.ring.zero_monom:
return f.mul_ground(coeff)
monomial_mul = f.ring.monomial_mul
terms = [ (monomial_mul(f_monom, monom), f_coeff*coeff) for f_monom, f_coeff in f.items() ]
return f.new(terms)
def quo_ground(f, x):
domain = f.ring.domain
if not x:
raise ZeroDivisionError('polynomial division')
if not f or x == domain.one:
return f
if domain.is_Field:
quo = domain.quo
terms = [ (monom, quo(coeff, x)) for monom, coeff in f.iterterms() ]
else:
terms = [ (monom, coeff // x) for monom, coeff in f.iterterms() if not (coeff % x) ]
return f.new(terms)
def quo_term(f, term):
monom, coeff = term
if not coeff:
raise ZeroDivisionError("polynomial division")
elif not f:
return f.ring.zero
elif monom == f.ring.zero_monom:
return f.quo_ground(coeff)
term_div = f._term_div()
terms = [ term_div(t, term) for t in f.iterterms() ]
return f.new([ t for t in terms if t is not None ])
def trunc_ground(f, p):
if f.ring.domain.is_ZZ:
terms = []
for monom, coeff in f.iterterms():
coeff = coeff % p
if coeff > p // 2:
coeff = coeff - p
terms.append((monom, coeff))
else:
terms = [ (monom, coeff % p) for monom, coeff in f.iterterms() ]
poly = f.new(terms)
poly.strip_zero()
return poly
rem_ground = trunc_ground
def extract_ground(self, g):
f = self
fc = f.content()
gc = g.content()
gcd = f.ring.domain.gcd(fc, gc)
f = f.quo_ground(gcd)
g = g.quo_ground(gcd)
return gcd, f, g
def _norm(f, norm_func):
if not f:
return f.ring.domain.zero
else:
ground_abs = f.ring.domain.abs
return norm_func([ ground_abs(coeff) for coeff in f.itercoeffs() ])
def max_norm(f):
return f._norm(max)
def l1_norm(f):
return f._norm(sum)
def deflate(f, *G):
ring = f.ring
polys = [f] + list(G)
J = [0]*ring.ngens
for p in polys:
for monom in p.itermonoms():
for i, m in enumerate(monom):
J[i] = igcd(J[i], m)
for i, b in enumerate(J):
if not b:
J[i] = 1
J = tuple(J)
if all(b == 1 for b in J):
return J, polys
H = []
for p in polys:
h = ring.zero
for I, coeff in p.iterterms():
N = [ i // j for i, j in zip(I, J) ]
h[tuple(N)] = coeff
H.append(h)
return J, H
def inflate(f, J):
poly = f.ring.zero
for I, coeff in f.iterterms():
N = [ i*j for i, j in zip(I, J) ]
poly[tuple(N)] = coeff
return poly
def lcm(self, g):
f = self
domain = f.ring.domain
if not domain.is_Field:
fc, f = f.primitive()
gc, g = g.primitive()
c = domain.lcm(fc, gc)
h = (f*g).quo(f.gcd(g))
if not domain.is_Field:
return h.mul_ground(c)
else:
return h.monic()
def gcd(f, g):
return f.cofactors(g)[0]
def cofactors(f, g):
if not f and not g:
zero = f.ring.zero
return zero, zero, zero
elif not f:
h, cff, cfg = f._gcd_zero(g)
return h, cff, cfg
elif not g:
h, cfg, cff = g._gcd_zero(f)
return h, cff, cfg
elif len(f) == 1:
h, cff, cfg = f._gcd_monom(g)
return h, cff, cfg
elif len(g) == 1:
h, cfg, cff = g._gcd_monom(f)
return h, cff, cfg
J, (f, g) = f.deflate(g)
h, cff, cfg = f._gcd(g)
return (h.inflate(J), cff.inflate(J), cfg.inflate(J))
def _gcd_zero(f, g):
one, zero = f.ring.one, f.ring.zero
if g.is_nonnegative:
return g, zero, one
else:
return -g, zero, -one
def _gcd_monom(f, g):
ring = f.ring
ground_gcd = ring.domain.gcd
ground_quo = ring.domain.quo
monomial_gcd = ring.monomial_gcd
monomial_ldiv = ring.monomial_ldiv
mf, cf = list(f.iterterms())[0]
_mgcd, _cgcd = mf, cf
for mg, cg in g.iterterms():
_mgcd = monomial_gcd(_mgcd, mg)
_cgcd = ground_gcd(_cgcd, cg)
h = f.new([(_mgcd, _cgcd)])
cff = f.new([(monomial_ldiv(mf, _mgcd), ground_quo(cf, _cgcd))])
cfg = f.new([(monomial_ldiv(mg, _mgcd), ground_quo(cg, _cgcd)) for mg, cg in g.iterterms()])
return h, cff, cfg
def _gcd(f, g):
ring = f.ring
if ring.domain.is_QQ:
return f._gcd_QQ(g)
elif ring.domain.is_ZZ:
return f._gcd_ZZ(g)
else: # TODO: don't use dense representation (port PRS algorithms)
return ring.dmp_inner_gcd(f, g)
def _gcd_ZZ(f, g):
return heugcd(f, g)
def _gcd_QQ(self, g):
f = self
ring = f.ring
new_ring = ring.clone(domain=ring.domain.get_ring())
cf, f = f.clear_denoms()
cg, g = g.clear_denoms()
f = f.set_ring(new_ring)
g = g.set_ring(new_ring)
h, cff, cfg = f._gcd_ZZ(g)
h = h.set_ring(ring)
c, h = h.LC, h.monic()
cff = cff.set_ring(ring).mul_ground(ring.domain.quo(c, cf))
cfg = cfg.set_ring(ring).mul_ground(ring.domain.quo(c, cg))
return h, cff, cfg
def cancel(self, g):
"""
Cancel common factors in a rational function ``f/g``.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x,y = ring("x,y", ZZ)
>>> (2*x**2 - 2).cancel(x**2 - 2*x + 1)
(2*x + 2, x - 1)
"""
f = self
ring = f.ring
if not f:
return f, ring.one
domain = ring.domain
if not (domain.is_Field and domain.has_assoc_Ring):
_, p, q = f.cofactors(g)
if q.is_negative:
p, q = -p, -q
else:
new_ring = ring.clone(domain=domain.get_ring())
cq, f = f.clear_denoms()
cp, g = g.clear_denoms()
f = f.set_ring(new_ring)
g = g.set_ring(new_ring)
_, p, q = f.cofactors(g)
_, cp, cq = new_ring.domain.cofactors(cp, cq)
p = p.set_ring(ring)
q = q.set_ring(ring)
p_neg = p.is_negative
q_neg = q.is_negative
if p_neg and q_neg:
p, q = -p, -q
elif p_neg:
cp, p = -cp, -p
elif q_neg:
cp, q = -cp, -q
p = p.mul_ground(cp)
q = q.mul_ground(cq)
return p, q
def diff(f, x):
"""Computes partial derivative in ``x``.
Examples
========
>>> from sympy.polys.rings import ring
>>> from sympy.polys.domains import ZZ
>>> _, x, y = ring("x,y", ZZ)
>>> p = x + x**2*y**3
>>> p.diff(x)
2*x*y**3 + 1
"""
ring = f.ring
i = ring.index(x)
m = ring.monomial_basis(i)
g = ring.zero
for expv, coeff in f.iterterms():
if expv[i]:
e = ring.monomial_ldiv(expv, m)
g[e] = ring.domain_new(coeff*expv[i])
return g
def __call__(f, *values):
if 0 < len(values) <= f.ring.ngens:
return f.evaluate(list(zip(f.ring.gens, values)))
else:
raise ValueError("expected at least 1 and at most %s values, got %s" % (f.ring.ngens, len(values)))
def evaluate(self, x, a=None):
f = self
if isinstance(x, list) and a is None:
(X, a), x = x[0], x[1:]
f = f.evaluate(X, a)
if not x:
return f
else:
x = [ (Y.drop(X), a) for (Y, a) in x ]
return f.evaluate(x)
ring = f.ring
i = ring.index(x)
a = ring.domain.convert(a)
if ring.ngens == 1:
result = ring.domain.zero
for (n,), coeff in f.iterterms():
result += coeff*a**n
return result
else:
poly = ring.drop(x).zero
for monom, coeff in f.iterterms():
n, monom = monom[i], monom[:i] + monom[i+1:]
coeff = coeff*a**n
if monom in poly:
coeff = coeff + poly[monom]
if coeff:
poly[monom] = coeff
else:
del poly[monom]
else:
if coeff:
poly[monom] = coeff
return poly
def subs(self, x, a=None):
f = self
if isinstance(x, list) and a is None:
for X, a in x:
f = f.subs(X, a)
return f
ring = f.ring
i = ring.index(x)
a = ring.domain.convert(a)
if ring.ngens == 1:
result = ring.domain.zero
for (n,), coeff in f.iterterms():
result += coeff*a**n
return ring.ground_new(result)
else:
poly = ring.zero
for monom, coeff in f.iterterms():
n, monom = monom[i], monom[:i] + (0,) + monom[i+1:]
coeff = coeff*a**n
if monom in poly:
coeff = coeff + poly[monom]
if coeff:
poly[monom] = coeff
else:
del poly[monom]
else:
if coeff:
poly[monom] = coeff
return poly
def compose(f, x, a=None):
ring = f.ring
poly = ring.zero
gens_map = dict(list(zip(ring.gens, list(range(ring.ngens)))))
if a is not None:
replacements = [(x, a)]
else:
if isinstance(x, list):
replacements = list(x)
elif isinstance(x, dict):
replacements = sorted(list(x.items()), key=lambda k: gens_map[k[0]])
else:
raise ValueError("expected a generator, value pair a sequence of such pairs")
for k, (x, g) in enumerate(replacements):
replacements[k] = (gens_map[x], ring.ring_new(g))
for monom, coeff in f.iterterms():
monom = list(monom)
subpoly = ring.one
for i, g in replacements:
n, monom[i] = monom[i], 0
if n:
subpoly *= g**n
subpoly = subpoly.mul_term((tuple(monom), coeff))
poly += subpoly
return poly
# TODO: following methods should point to polynomial
# representation independent algorithm implementations.
def pdiv(f, g):
return f.ring.dmp_pdiv(f, g)
def prem(f, g):
return f.ring.dmp_prem(f, g)
def pquo(f, g):
return f.ring.dmp_quo(f, g)
def pexquo(f, g):
return f.ring.dmp_exquo(f, g)
def half_gcdex(f, g):
return f.ring.dmp_half_gcdex(f, g)
def gcdex(f, g):
return f.ring.dmp_gcdex(f, g)
def subresultants(f, g):
return f.ring.dmp_subresultants(f, g)
def resultant(f, g):
return f.ring.dmp_resultant(f, g)
def discriminant(f):
return f.ring.dmp_discriminant(f)
def decompose(f):
if f.ring.is_univariate:
return f.ring.dup_decompose(f)
else:
raise MultivariatePolynomialError("polynomial decomposition")
def shift(f, a):
if f.ring.is_univariate:
return f.ring.dup_shift(f, a)
else:
raise MultivariatePolynomialError("polynomial shift")
def sturm(f):
if f.ring.is_univariate:
return f.ring.dup_sturm(f)
else:
raise MultivariatePolynomialError("sturm sequence")
def gff_list(f):
return f.ring.dmp_gff_list(f)
def sqf_norm(f):
return f.ring.dmp_sqf_norm(f)
def sqf_part(f):
return f.ring.dmp_sqf_part(f)
def sqf_list(f, all=False):
return f.ring.dmp_sqf_list(f, all=all)
def factor_list(f):
return f.ring.dmp_factor_list(f)
|
dfd855df132dda448b598309d2a93061bb0f47f82bd67d70b3804fc99be234c8
|
"""Options manager for :class:`~.Poly` and public API functions. """
from __future__ import print_function, division
__all__ = ["Options"]
from typing import Dict, List, Optional, Type
from sympy.core import Basic, sympify
from sympy.polys.polyerrors import GeneratorsError, OptionError, FlagError
from sympy.utilities import numbered_symbols, topological_sort, public
from sympy.utilities.iterables import has_dups
import sympy.polys
import re
class Option(object):
"""Base class for all kinds of options. """
option = None # type: Optional[str]
is_Flag = False
requires = [] # type: List[str]
excludes = [] # type: List[str]
after = [] # type: List[str]
before = [] # type: List[str]
@classmethod
def default(cls):
return None
@classmethod
def preprocess(cls, option):
return None
@classmethod
def postprocess(cls, options):
pass
class Flag(Option):
"""Base class for all kinds of flags. """
is_Flag = True
class BooleanOption(Option):
"""An option that must have a boolean value or equivalent assigned. """
@classmethod
def preprocess(cls, value):
if value in [True, False]:
return bool(value)
else:
raise OptionError("'%s' must have a boolean value assigned, got %s" % (cls.option, value))
class OptionType(type):
"""Base type for all options that does registers options. """
def __init__(cls, *args, **kwargs):
@property
def getter(self):
try:
return self[cls.option]
except KeyError:
return cls.default()
setattr(Options, cls.option, getter)
Options.__options__[cls.option] = cls
@public
class Options(dict):
"""
Options manager for polynomial manipulation module.
Examples
========
>>> from sympy.polys.polyoptions import Options
>>> from sympy.polys.polyoptions import build_options
>>> from sympy.abc import x, y, z
>>> Options((x, y, z), {'domain': 'ZZ'})
{'auto': False, 'domain': ZZ, 'gens': (x, y, z)}
>>> build_options((x, y, z), {'domain': 'ZZ'})
{'auto': False, 'domain': ZZ, 'gens': (x, y, z)}
**Options**
* Expand --- boolean option
* Gens --- option
* Wrt --- option
* Sort --- option
* Order --- option
* Field --- boolean option
* Greedy --- boolean option
* Domain --- option
* Split --- boolean option
* Gaussian --- boolean option
* Extension --- option
* Modulus --- option
* Symmetric --- boolean option
* Strict --- boolean option
**Flags**
* Auto --- boolean flag
* Frac --- boolean flag
* Formal --- boolean flag
* Polys --- boolean flag
* Include --- boolean flag
* All --- boolean flag
* Gen --- flag
* Series --- boolean flag
"""
__order__ = None
__options__ = {} # type: Dict[str, Type[Option]]
def __init__(self, gens, args, flags=None, strict=False):
dict.__init__(self)
if gens and args.get('gens', ()):
raise OptionError(
"both '*gens' and keyword argument 'gens' supplied")
elif gens:
args = dict(args)
args['gens'] = gens
defaults = args.pop('defaults', {})
def preprocess_options(args):
for option, value in args.items():
try:
cls = self.__options__[option]
except KeyError:
raise OptionError("'%s' is not a valid option" % option)
if issubclass(cls, Flag):
if flags is None or option not in flags:
if strict:
raise OptionError("'%s' flag is not allowed in this context" % option)
if value is not None:
self[option] = cls.preprocess(value)
preprocess_options(args)
for key, value in dict(defaults).items():
if key in self:
del defaults[key]
else:
for option in self.keys():
cls = self.__options__[option]
if key in cls.excludes:
del defaults[key]
break
preprocess_options(defaults)
for option in self.keys():
cls = self.__options__[option]
for require_option in cls.requires:
if self.get(require_option) is None:
raise OptionError("'%s' option is only allowed together with '%s'" % (option, require_option))
for exclude_option in cls.excludes:
if self.get(exclude_option) is not None:
raise OptionError("'%s' option is not allowed together with '%s'" % (option, exclude_option))
for option in self.__order__:
self.__options__[option].postprocess(self)
@classmethod
def _init_dependencies_order(cls):
"""Resolve the order of options' processing. """
if cls.__order__ is None:
vertices, edges = [], set([])
for name, option in cls.__options__.items():
vertices.append(name)
for _name in option.after:
edges.add((_name, name))
for _name in option.before:
edges.add((name, _name))
try:
cls.__order__ = topological_sort((vertices, list(edges)))
except ValueError:
raise RuntimeError(
"cycle detected in sympy.polys options framework")
def clone(self, updates={}):
"""Clone ``self`` and update specified options. """
obj = dict.__new__(self.__class__)
for option, value in self.items():
obj[option] = value
for option, value in updates.items():
obj[option] = value
return obj
def __setattr__(self, attr, value):
if attr in self.__options__:
self[attr] = value
else:
super(Options, self).__setattr__(attr, value)
@property
def args(self):
args = {}
for option, value in self.items():
if value is not None and option != 'gens':
cls = self.__options__[option]
if not issubclass(cls, Flag):
args[option] = value
return args
@property
def options(self):
options = {}
for option, cls in self.__options__.items():
if not issubclass(cls, Flag):
options[option] = getattr(self, option)
return options
@property
def flags(self):
flags = {}
for option, cls in self.__options__.items():
if issubclass(cls, Flag):
flags[option] = getattr(self, option)
return flags
class Expand(BooleanOption, metaclass=OptionType):
"""``expand`` option to polynomial manipulation functions. """
option = 'expand'
requires = [] # type: List[str]
excludes = [] # type: List[str]
@classmethod
def default(cls):
return True
class Gens(Option, metaclass=OptionType):
"""``gens`` option to polynomial manipulation functions. """
option = 'gens'
requires = [] # type: List[str]
excludes = [] # type: List[str]
@classmethod
def default(cls):
return ()
@classmethod
def preprocess(cls, gens):
if isinstance(gens, Basic):
gens = (gens,)
elif len(gens) == 1 and hasattr(gens[0], '__iter__'):
gens = gens[0]
if gens == (None,):
gens = ()
elif has_dups(gens):
raise GeneratorsError("duplicated generators: %s" % str(gens))
elif any(gen.is_commutative is False for gen in gens):
raise GeneratorsError("non-commutative generators: %s" % str(gens))
return tuple(gens)
class Wrt(Option, metaclass=OptionType):
"""``wrt`` option to polynomial manipulation functions. """
option = 'wrt'
requires = [] # type: List[str]
excludes = [] # type: List[str]
_re_split = re.compile(r"\s*,\s*|\s+")
@classmethod
def preprocess(cls, wrt):
if isinstance(wrt, Basic):
return [str(wrt)]
elif isinstance(wrt, str):
wrt = wrt.strip()
if wrt.endswith(','):
raise OptionError('Bad input: missing parameter.')
if not wrt:
return []
return [ gen for gen in cls._re_split.split(wrt) ]
elif hasattr(wrt, '__getitem__'):
return list(map(str, wrt))
else:
raise OptionError("invalid argument for 'wrt' option")
class Sort(Option, metaclass=OptionType):
"""``sort`` option to polynomial manipulation functions. """
option = 'sort'
requires = [] # type: List[str]
excludes = [] # type: List[str]
@classmethod
def default(cls):
return []
@classmethod
def preprocess(cls, sort):
if isinstance(sort, str):
return [ gen.strip() for gen in sort.split('>') ]
elif hasattr(sort, '__getitem__'):
return list(map(str, sort))
else:
raise OptionError("invalid argument for 'sort' option")
class Order(Option, metaclass=OptionType):
"""``order`` option to polynomial manipulation functions. """
option = 'order'
requires = [] # type: List[str]
excludes = [] # type: List[str]
@classmethod
def default(cls):
return sympy.polys.orderings.lex
@classmethod
def preprocess(cls, order):
return sympy.polys.orderings.monomial_key(order)
class Field(BooleanOption, metaclass=OptionType):
"""``field`` option to polynomial manipulation functions. """
option = 'field'
requires = [] # type: List[str]
excludes = ['domain', 'split', 'gaussian']
class Greedy(BooleanOption, metaclass=OptionType):
"""``greedy`` option to polynomial manipulation functions. """
option = 'greedy'
requires = [] # type: List[str]
excludes = ['domain', 'split', 'gaussian', 'extension', 'modulus', 'symmetric']
class Composite(BooleanOption, metaclass=OptionType):
"""``composite`` option to polynomial manipulation functions. """
option = 'composite'
@classmethod
def default(cls):
return None
requires = [] # type: List[str]
excludes = ['domain', 'split', 'gaussian', 'extension', 'modulus', 'symmetric']
class Domain(Option, metaclass=OptionType):
"""``domain`` option to polynomial manipulation functions. """
option = 'domain'
requires = [] # type: List[str]
excludes = ['field', 'greedy', 'split', 'gaussian', 'extension']
after = ['gens']
_re_realfield = re.compile(r"^(R|RR)(_(\d+))?$")
_re_complexfield = re.compile(r"^(C|CC)(_(\d+))?$")
_re_finitefield = re.compile(r"^(FF|GF)\((\d+)\)$")
_re_polynomial = re.compile(r"^(Z|ZZ|Q|QQ|ZZ_I|QQ_I|R|RR|C|CC)\[(.+)\]$")
_re_fraction = re.compile(r"^(Z|ZZ|Q|QQ)\((.+)\)$")
_re_algebraic = re.compile(r"^(Q|QQ)\<(.+)\>$")
@classmethod
def preprocess(cls, domain):
if isinstance(domain, sympy.polys.domains.Domain):
return domain
elif hasattr(domain, 'to_domain'):
return domain.to_domain()
elif isinstance(domain, str):
if domain in ['Z', 'ZZ']:
return sympy.polys.domains.ZZ
if domain in ['Q', 'QQ']:
return sympy.polys.domains.QQ
if domain == 'ZZ_I':
return sympy.polys.domains.ZZ_I
if domain == 'QQ_I':
return sympy.polys.domains.QQ_I
if domain == 'EX':
return sympy.polys.domains.EX
r = cls._re_realfield.match(domain)
if r is not None:
_, _, prec = r.groups()
if prec is None:
return sympy.polys.domains.RR
else:
return sympy.polys.domains.RealField(int(prec))
r = cls._re_complexfield.match(domain)
if r is not None:
_, _, prec = r.groups()
if prec is None:
return sympy.polys.domains.CC
else:
return sympy.polys.domains.ComplexField(int(prec))
r = cls._re_finitefield.match(domain)
if r is not None:
return sympy.polys.domains.FF(int(r.groups()[1]))
r = cls._re_polynomial.match(domain)
if r is not None:
ground, gens = r.groups()
gens = list(map(sympify, gens.split(',')))
if ground in ['Z', 'ZZ']:
return sympy.polys.domains.ZZ.poly_ring(*gens)
elif ground in ['Q', 'QQ']:
return sympy.polys.domains.QQ.poly_ring(*gens)
elif ground in ['R', 'RR']:
return sympy.polys.domains.RR.poly_ring(*gens)
elif ground == 'ZZ_I':
return sympy.polys.domains.ZZ_I.poly_ring(*gens)
elif ground == 'QQ_I':
return sympy.polys.domains.QQ_I.poly_ring(*gens)
else:
return sympy.polys.domains.CC.poly_ring(*gens)
r = cls._re_fraction.match(domain)
if r is not None:
ground, gens = r.groups()
gens = list(map(sympify, gens.split(',')))
if ground in ['Z', 'ZZ']:
return sympy.polys.domains.ZZ.frac_field(*gens)
else:
return sympy.polys.domains.QQ.frac_field(*gens)
r = cls._re_algebraic.match(domain)
if r is not None:
gens = list(map(sympify, r.groups()[1].split(',')))
return sympy.polys.domains.QQ.algebraic_field(*gens)
raise OptionError('expected a valid domain specification, got %s' % domain)
@classmethod
def postprocess(cls, options):
if 'gens' in options and 'domain' in options and options['domain'].is_Composite and \
(set(options['domain'].symbols) & set(options['gens'])):
raise GeneratorsError(
"ground domain and generators interfere together")
elif ('gens' not in options or not options['gens']) and \
'domain' in options and options['domain'] == sympy.polys.domains.EX:
raise GeneratorsError("you have to provide generators because EX domain was requested")
class Split(BooleanOption, metaclass=OptionType):
"""``split`` option to polynomial manipulation functions. """
option = 'split'
requires = [] # type: List[str]
excludes = ['field', 'greedy', 'domain', 'gaussian', 'extension',
'modulus', 'symmetric']
@classmethod
def postprocess(cls, options):
if 'split' in options:
raise NotImplementedError("'split' option is not implemented yet")
class Gaussian(BooleanOption, metaclass=OptionType):
"""``gaussian`` option to polynomial manipulation functions. """
option = 'gaussian'
requires = [] # type: List[str]
excludes = ['field', 'greedy', 'domain', 'split', 'extension',
'modulus', 'symmetric']
@classmethod
def postprocess(cls, options):
if 'gaussian' in options and options['gaussian'] is True:
options['domain'] = sympy.polys.domains.QQ_I
Extension.postprocess(options)
class Extension(Option, metaclass=OptionType):
"""``extension`` option to polynomial manipulation functions. """
option = 'extension'
requires = [] # type: List[str]
excludes = ['greedy', 'domain', 'split', 'gaussian', 'modulus',
'symmetric']
@classmethod
def preprocess(cls, extension):
if extension == 1:
return bool(extension)
elif extension == 0:
raise OptionError("'False' is an invalid argument for 'extension'")
else:
if not hasattr(extension, '__iter__'):
extension = set([extension])
else:
if not extension:
extension = None
else:
extension = set(extension)
return extension
@classmethod
def postprocess(cls, options):
if 'extension' in options and options['extension'] is not True:
options['domain'] = sympy.polys.domains.QQ.algebraic_field(
*options['extension'])
class Modulus(Option, metaclass=OptionType):
"""``modulus`` option to polynomial manipulation functions. """
option = 'modulus'
requires = [] # type: List[str]
excludes = ['greedy', 'split', 'domain', 'gaussian', 'extension']
@classmethod
def preprocess(cls, modulus):
modulus = sympify(modulus)
if modulus.is_Integer and modulus > 0:
return int(modulus)
else:
raise OptionError(
"'modulus' must a positive integer, got %s" % modulus)
@classmethod
def postprocess(cls, options):
if 'modulus' in options:
modulus = options['modulus']
symmetric = options.get('symmetric', True)
options['domain'] = sympy.polys.domains.FF(modulus, symmetric)
class Symmetric(BooleanOption, metaclass=OptionType):
"""``symmetric`` option to polynomial manipulation functions. """
option = 'symmetric'
requires = ['modulus']
excludes = ['greedy', 'domain', 'split', 'gaussian', 'extension']
class Strict(BooleanOption, metaclass=OptionType):
"""``strict`` option to polynomial manipulation functions. """
option = 'strict'
@classmethod
def default(cls):
return True
class Auto(BooleanOption, Flag, metaclass=OptionType):
"""``auto`` flag to polynomial manipulation functions. """
option = 'auto'
after = ['field', 'domain', 'extension', 'gaussian']
@classmethod
def default(cls):
return True
@classmethod
def postprocess(cls, options):
if ('domain' in options or 'field' in options) and 'auto' not in options:
options['auto'] = False
class Frac(BooleanOption, Flag, metaclass=OptionType):
"""``auto`` option to polynomial manipulation functions. """
option = 'frac'
@classmethod
def default(cls):
return False
class Formal(BooleanOption, Flag, metaclass=OptionType):
"""``formal`` flag to polynomial manipulation functions. """
option = 'formal'
@classmethod
def default(cls):
return False
class Polys(BooleanOption, Flag, metaclass=OptionType):
"""``polys`` flag to polynomial manipulation functions. """
option = 'polys'
class Include(BooleanOption, Flag, metaclass=OptionType):
"""``include`` flag to polynomial manipulation functions. """
option = 'include'
@classmethod
def default(cls):
return False
class All(BooleanOption, Flag, metaclass=OptionType):
"""``all`` flag to polynomial manipulation functions. """
option = 'all'
@classmethod
def default(cls):
return False
class Gen(Flag, metaclass=OptionType):
"""``gen`` flag to polynomial manipulation functions. """
option = 'gen'
@classmethod
def default(cls):
return 0
@classmethod
def preprocess(cls, gen):
if isinstance(gen, (Basic, int)):
return gen
else:
raise OptionError("invalid argument for 'gen' option")
class Series(BooleanOption, Flag, metaclass=OptionType):
"""``series`` flag to polynomial manipulation functions. """
option = 'series'
@classmethod
def default(cls):
return False
class Symbols(Flag, metaclass=OptionType):
"""``symbols`` flag to polynomial manipulation functions. """
option = 'symbols'
@classmethod
def default(cls):
return numbered_symbols('s', start=1)
@classmethod
def preprocess(cls, symbols):
if hasattr(symbols, '__iter__'):
return iter(symbols)
else:
raise OptionError("expected an iterator or iterable container, got %s" % symbols)
class Method(Flag, metaclass=OptionType):
"""``method`` flag to polynomial manipulation functions. """
option = 'method'
@classmethod
def preprocess(cls, method):
if isinstance(method, str):
return method.lower()
else:
raise OptionError("expected a string, got %s" % method)
def build_options(gens, args=None):
"""Construct options from keyword arguments or ... options. """
if args is None:
gens, args = (), gens
if len(args) != 1 or 'opt' not in args or gens:
return Options(gens, args)
else:
return args['opt']
def allowed_flags(args, flags):
"""
Allow specified flags to be used in the given context.
Examples
========
>>> from sympy.polys.polyoptions import allowed_flags
>>> from sympy.polys.domains import ZZ
>>> allowed_flags({'domain': ZZ}, [])
>>> allowed_flags({'domain': ZZ, 'frac': True}, [])
Traceback (most recent call last):
...
FlagError: 'frac' flag is not allowed in this context
>>> allowed_flags({'domain': ZZ, 'frac': True}, ['frac'])
"""
flags = set(flags)
for arg in args.keys():
try:
if Options.__options__[arg].is_Flag and not arg in flags:
raise FlagError(
"'%s' flag is not allowed in this context" % arg)
except KeyError:
raise OptionError("'%s' is not a valid option" % arg)
def set_defaults(options, **defaults):
"""Update options with default values. """
if 'defaults' not in options:
options = dict(options)
options['defaults'] = defaults
return options
Options._init_dependencies_order()
|
7eb345339b9ddd00e6953565421639322e0e317b668ad11c93f125d3c2c1d6ee
|
"""Compatibility interface between dense and sparse polys. """
from __future__ import print_function, division
from sympy.polys.densearith import dup_add_term
from sympy.polys.densearith import dmp_add_term
from sympy.polys.densearith import dup_sub_term
from sympy.polys.densearith import dmp_sub_term
from sympy.polys.densearith import dup_mul_term
from sympy.polys.densearith import dmp_mul_term
from sympy.polys.densearith import dup_add_ground
from sympy.polys.densearith import dmp_add_ground
from sympy.polys.densearith import dup_sub_ground
from sympy.polys.densearith import dmp_sub_ground
from sympy.polys.densearith import dup_mul_ground
from sympy.polys.densearith import dmp_mul_ground
from sympy.polys.densearith import dup_quo_ground
from sympy.polys.densearith import dmp_quo_ground
from sympy.polys.densearith import dup_exquo_ground
from sympy.polys.densearith import dmp_exquo_ground
from sympy.polys.densearith import dup_lshift
from sympy.polys.densearith import dup_rshift
from sympy.polys.densearith import dup_abs
from sympy.polys.densearith import dmp_abs
from sympy.polys.densearith import dup_neg
from sympy.polys.densearith import dmp_neg
from sympy.polys.densearith import dup_add
from sympy.polys.densearith import dmp_add
from sympy.polys.densearith import dup_sub
from sympy.polys.densearith import dmp_sub
from sympy.polys.densearith import dup_add_mul
from sympy.polys.densearith import dmp_add_mul
from sympy.polys.densearith import dup_sub_mul
from sympy.polys.densearith import dmp_sub_mul
from sympy.polys.densearith import dup_mul
from sympy.polys.densearith import dmp_mul
from sympy.polys.densearith import dup_sqr
from sympy.polys.densearith import dmp_sqr
from sympy.polys.densearith import dup_pow
from sympy.polys.densearith import dmp_pow
from sympy.polys.densearith import dup_pdiv
from sympy.polys.densearith import dup_prem
from sympy.polys.densearith import dup_pquo
from sympy.polys.densearith import dup_pexquo
from sympy.polys.densearith import dmp_pdiv
from sympy.polys.densearith import dmp_prem
from sympy.polys.densearith import dmp_pquo
from sympy.polys.densearith import dmp_pexquo
from sympy.polys.densearith import dup_rr_div
from sympy.polys.densearith import dmp_rr_div
from sympy.polys.densearith import dup_ff_div
from sympy.polys.densearith import dmp_ff_div
from sympy.polys.densearith import dup_div
from sympy.polys.densearith import dup_rem
from sympy.polys.densearith import dup_quo
from sympy.polys.densearith import dup_exquo
from sympy.polys.densearith import dmp_div
from sympy.polys.densearith import dmp_rem
from sympy.polys.densearith import dmp_quo
from sympy.polys.densearith import dmp_exquo
from sympy.polys.densearith import dup_max_norm
from sympy.polys.densearith import dmp_max_norm
from sympy.polys.densearith import dup_l1_norm
from sympy.polys.densearith import dmp_l1_norm
from sympy.polys.densearith import dup_expand
from sympy.polys.densearith import dmp_expand
from sympy.polys.densebasic import dup_LC
from sympy.polys.densebasic import dmp_LC
from sympy.polys.densebasic import dup_TC
from sympy.polys.densebasic import dmp_TC
from sympy.polys.densebasic import dmp_ground_LC
from sympy.polys.densebasic import dmp_ground_TC
from sympy.polys.densebasic import dup_degree
from sympy.polys.densebasic import dmp_degree
from sympy.polys.densebasic import dmp_degree_in
from sympy.polys.densebasic import dmp_to_dict
from sympy.polys.densetools import dup_integrate
from sympy.polys.densetools import dmp_integrate
from sympy.polys.densetools import dmp_integrate_in
from sympy.polys.densetools import dup_diff
from sympy.polys.densetools import dmp_diff
from sympy.polys.densetools import dmp_diff_in
from sympy.polys.densetools import dup_eval
from sympy.polys.densetools import dmp_eval
from sympy.polys.densetools import dmp_eval_in
from sympy.polys.densetools import dmp_eval_tail
from sympy.polys.densetools import dmp_diff_eval_in
from sympy.polys.densetools import dup_trunc
from sympy.polys.densetools import dmp_trunc
from sympy.polys.densetools import dmp_ground_trunc
from sympy.polys.densetools import dup_monic
from sympy.polys.densetools import dmp_ground_monic
from sympy.polys.densetools import dup_content
from sympy.polys.densetools import dmp_ground_content
from sympy.polys.densetools import dup_primitive
from sympy.polys.densetools import dmp_ground_primitive
from sympy.polys.densetools import dup_extract
from sympy.polys.densetools import dmp_ground_extract
from sympy.polys.densetools import dup_real_imag
from sympy.polys.densetools import dup_mirror
from sympy.polys.densetools import dup_scale
from sympy.polys.densetools import dup_shift
from sympy.polys.densetools import dup_transform
from sympy.polys.densetools import dup_compose
from sympy.polys.densetools import dmp_compose
from sympy.polys.densetools import dup_decompose
from sympy.polys.densetools import dmp_lift
from sympy.polys.densetools import dup_sign_variations
from sympy.polys.densetools import dup_clear_denoms
from sympy.polys.densetools import dmp_clear_denoms
from sympy.polys.densetools import dup_revert
from sympy.polys.euclidtools import dup_half_gcdex
from sympy.polys.euclidtools import dmp_half_gcdex
from sympy.polys.euclidtools import dup_gcdex
from sympy.polys.euclidtools import dmp_gcdex
from sympy.polys.euclidtools import dup_invert
from sympy.polys.euclidtools import dmp_invert
from sympy.polys.euclidtools import dup_euclidean_prs
from sympy.polys.euclidtools import dmp_euclidean_prs
from sympy.polys.euclidtools import dup_primitive_prs
from sympy.polys.euclidtools import dmp_primitive_prs
from sympy.polys.euclidtools import dup_inner_subresultants
from sympy.polys.euclidtools import dup_subresultants
from sympy.polys.euclidtools import dup_prs_resultant
from sympy.polys.euclidtools import dup_resultant
from sympy.polys.euclidtools import dmp_inner_subresultants
from sympy.polys.euclidtools import dmp_subresultants
from sympy.polys.euclidtools import dmp_prs_resultant
from sympy.polys.euclidtools import dmp_zz_modular_resultant
from sympy.polys.euclidtools import dmp_zz_collins_resultant
from sympy.polys.euclidtools import dmp_qq_collins_resultant
from sympy.polys.euclidtools import dmp_resultant
from sympy.polys.euclidtools import dup_discriminant
from sympy.polys.euclidtools import dmp_discriminant
from sympy.polys.euclidtools import dup_rr_prs_gcd
from sympy.polys.euclidtools import dup_ff_prs_gcd
from sympy.polys.euclidtools import dmp_rr_prs_gcd
from sympy.polys.euclidtools import dmp_ff_prs_gcd
from sympy.polys.euclidtools import dup_zz_heu_gcd
from sympy.polys.euclidtools import dmp_zz_heu_gcd
from sympy.polys.euclidtools import dup_qq_heu_gcd
from sympy.polys.euclidtools import dmp_qq_heu_gcd
from sympy.polys.euclidtools import dup_inner_gcd
from sympy.polys.euclidtools import dmp_inner_gcd
from sympy.polys.euclidtools import dup_gcd
from sympy.polys.euclidtools import dmp_gcd
from sympy.polys.euclidtools import dup_rr_lcm
from sympy.polys.euclidtools import dup_ff_lcm
from sympy.polys.euclidtools import dup_lcm
from sympy.polys.euclidtools import dmp_rr_lcm
from sympy.polys.euclidtools import dmp_ff_lcm
from sympy.polys.euclidtools import dmp_lcm
from sympy.polys.euclidtools import dmp_content
from sympy.polys.euclidtools import dmp_primitive
from sympy.polys.euclidtools import dup_cancel
from sympy.polys.euclidtools import dmp_cancel
from sympy.polys.factortools import dup_trial_division
from sympy.polys.factortools import dmp_trial_division
from sympy.polys.factortools import dup_zz_mignotte_bound
from sympy.polys.factortools import dmp_zz_mignotte_bound
from sympy.polys.factortools import dup_zz_hensel_step
from sympy.polys.factortools import dup_zz_hensel_lift
from sympy.polys.factortools import dup_zz_zassenhaus
from sympy.polys.factortools import dup_zz_irreducible_p
from sympy.polys.factortools import dup_cyclotomic_p
from sympy.polys.factortools import dup_zz_cyclotomic_poly
from sympy.polys.factortools import dup_zz_cyclotomic_factor
from sympy.polys.factortools import dup_zz_factor_sqf
from sympy.polys.factortools import dup_zz_factor
from sympy.polys.factortools import dmp_zz_wang_non_divisors
from sympy.polys.factortools import dmp_zz_wang_lead_coeffs
from sympy.polys.factortools import dup_zz_diophantine
from sympy.polys.factortools import dmp_zz_diophantine
from sympy.polys.factortools import dmp_zz_wang_hensel_lifting
from sympy.polys.factortools import dmp_zz_wang
from sympy.polys.factortools import dmp_zz_factor
from sympy.polys.factortools import dup_qq_i_factor
from sympy.polys.factortools import dup_zz_i_factor
from sympy.polys.factortools import dmp_qq_i_factor
from sympy.polys.factortools import dmp_zz_i_factor
from sympy.polys.factortools import dup_ext_factor
from sympy.polys.factortools import dmp_ext_factor
from sympy.polys.factortools import dup_gf_factor
from sympy.polys.factortools import dmp_gf_factor
from sympy.polys.factortools import dup_factor_list
from sympy.polys.factortools import dup_factor_list_include
from sympy.polys.factortools import dmp_factor_list
from sympy.polys.factortools import dmp_factor_list_include
from sympy.polys.factortools import dup_irreducible_p
from sympy.polys.factortools import dmp_irreducible_p
from sympy.polys.rootisolation import dup_sturm
from sympy.polys.rootisolation import dup_root_upper_bound
from sympy.polys.rootisolation import dup_root_lower_bound
from sympy.polys.rootisolation import dup_step_refine_real_root
from sympy.polys.rootisolation import dup_inner_refine_real_root
from sympy.polys.rootisolation import dup_outer_refine_real_root
from sympy.polys.rootisolation import dup_refine_real_root
from sympy.polys.rootisolation import dup_inner_isolate_real_roots
from sympy.polys.rootisolation import dup_inner_isolate_positive_roots
from sympy.polys.rootisolation import dup_inner_isolate_negative_roots
from sympy.polys.rootisolation import dup_isolate_real_roots_sqf
from sympy.polys.rootisolation import dup_isolate_real_roots
from sympy.polys.rootisolation import dup_isolate_real_roots_list
from sympy.polys.rootisolation import dup_count_real_roots
from sympy.polys.rootisolation import dup_count_complex_roots
from sympy.polys.rootisolation import dup_isolate_complex_roots_sqf
from sympy.polys.rootisolation import dup_isolate_all_roots_sqf
from sympy.polys.rootisolation import dup_isolate_all_roots
from sympy.polys.sqfreetools import (
dup_sqf_p, dmp_sqf_p, dup_sqf_norm, dmp_sqf_norm, dup_gf_sqf_part, dmp_gf_sqf_part,
dup_sqf_part, dmp_sqf_part, dup_gf_sqf_list, dmp_gf_sqf_list, dup_sqf_list,
dup_sqf_list_include, dmp_sqf_list, dmp_sqf_list_include, dup_gff_list, dmp_gff_list)
from sympy.polys.galoistools import (
gf_degree, gf_LC, gf_TC, gf_strip, gf_from_dict,
gf_to_dict, gf_from_int_poly, gf_to_int_poly, gf_neg, gf_add_ground, gf_sub_ground,
gf_mul_ground, gf_quo_ground, gf_add, gf_sub, gf_mul, gf_sqr, gf_add_mul, gf_sub_mul,
gf_expand, gf_div, gf_rem, gf_quo, gf_exquo, gf_lshift, gf_rshift, gf_pow, gf_pow_mod,
gf_gcd, gf_lcm, gf_cofactors, gf_gcdex, gf_monic, gf_diff, gf_eval, gf_multi_eval,
gf_compose, gf_compose_mod, gf_trace_map, gf_random, gf_irreducible, gf_irred_p_ben_or,
gf_irred_p_rabin, gf_irreducible_p, gf_sqf_p, gf_sqf_part, gf_Qmatrix,
gf_berlekamp, gf_ddf_zassenhaus, gf_edf_zassenhaus, gf_ddf_shoup, gf_edf_shoup,
gf_zassenhaus, gf_shoup, gf_factor_sqf, gf_factor)
from sympy.utilities import public
@public
class IPolys(object):
symbols = None
ngens = None
domain = None
order = None
gens = None
def drop(self, gen):
pass
def clone(self, symbols=None, domain=None, order=None):
pass
def to_ground(self):
pass
def ground_new(self, element):
pass
def domain_new(self, element):
pass
def from_dict(self, d):
pass
def wrap(self, element):
from sympy.polys.rings import PolyElement
if isinstance(element, PolyElement):
if element.ring == self:
return element
else:
raise NotImplementedError("domain conversions")
else:
return self.ground_new(element)
def to_dense(self, element):
return self.wrap(element).to_dense()
def from_dense(self, element):
return self.from_dict(dmp_to_dict(element, self.ngens-1, self.domain))
def dup_add_term(self, f, c, i):
return self.from_dense(dup_add_term(self.to_dense(f), c, i, self.domain))
def dmp_add_term(self, f, c, i):
return self.from_dense(dmp_add_term(self.to_dense(f), self.wrap(c).drop(0).to_dense(), i, self.ngens-1, self.domain))
def dup_sub_term(self, f, c, i):
return self.from_dense(dup_sub_term(self.to_dense(f), c, i, self.domain))
def dmp_sub_term(self, f, c, i):
return self.from_dense(dmp_sub_term(self.to_dense(f), self.wrap(c).drop(0).to_dense(), i, self.ngens-1, self.domain))
def dup_mul_term(self, f, c, i):
return self.from_dense(dup_mul_term(self.to_dense(f), c, i, self.domain))
def dmp_mul_term(self, f, c, i):
return self.from_dense(dmp_mul_term(self.to_dense(f), self.wrap(c).drop(0).to_dense(), i, self.ngens-1, self.domain))
def dup_add_ground(self, f, c):
return self.from_dense(dup_add_ground(self.to_dense(f), c, self.domain))
def dmp_add_ground(self, f, c):
return self.from_dense(dmp_add_ground(self.to_dense(f), c, self.ngens-1, self.domain))
def dup_sub_ground(self, f, c):
return self.from_dense(dup_sub_ground(self.to_dense(f), c, self.domain))
def dmp_sub_ground(self, f, c):
return self.from_dense(dmp_sub_ground(self.to_dense(f), c, self.ngens-1, self.domain))
def dup_mul_ground(self, f, c):
return self.from_dense(dup_mul_ground(self.to_dense(f), c, self.domain))
def dmp_mul_ground(self, f, c):
return self.from_dense(dmp_mul_ground(self.to_dense(f), c, self.ngens-1, self.domain))
def dup_quo_ground(self, f, c):
return self.from_dense(dup_quo_ground(self.to_dense(f), c, self.domain))
def dmp_quo_ground(self, f, c):
return self.from_dense(dmp_quo_ground(self.to_dense(f), c, self.ngens-1, self.domain))
def dup_exquo_ground(self, f, c):
return self.from_dense(dup_exquo_ground(self.to_dense(f), c, self.domain))
def dmp_exquo_ground(self, f, c):
return self.from_dense(dmp_exquo_ground(self.to_dense(f), c, self.ngens-1, self.domain))
def dup_lshift(self, f, n):
return self.from_dense(dup_lshift(self.to_dense(f), n, self.domain))
def dup_rshift(self, f, n):
return self.from_dense(dup_rshift(self.to_dense(f), n, self.domain))
def dup_abs(self, f):
return self.from_dense(dup_abs(self.to_dense(f), self.domain))
def dmp_abs(self, f):
return self.from_dense(dmp_abs(self.to_dense(f), self.ngens-1, self.domain))
def dup_neg(self, f):
return self.from_dense(dup_neg(self.to_dense(f), self.domain))
def dmp_neg(self, f):
return self.from_dense(dmp_neg(self.to_dense(f), self.ngens-1, self.domain))
def dup_add(self, f, g):
return self.from_dense(dup_add(self.to_dense(f), self.to_dense(g), self.domain))
def dmp_add(self, f, g):
return self.from_dense(dmp_add(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain))
def dup_sub(self, f, g):
return self.from_dense(dup_sub(self.to_dense(f), self.to_dense(g), self.domain))
def dmp_sub(self, f, g):
return self.from_dense(dmp_sub(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain))
def dup_add_mul(self, f, g, h):
return self.from_dense(dup_add_mul(self.to_dense(f), self.to_dense(g), self.to_dense(h), self.domain))
def dmp_add_mul(self, f, g, h):
return self.from_dense(dmp_add_mul(self.to_dense(f), self.to_dense(g), self.to_dense(h), self.ngens-1, self.domain))
def dup_sub_mul(self, f, g, h):
return self.from_dense(dup_sub_mul(self.to_dense(f), self.to_dense(g), self.to_dense(h), self.domain))
def dmp_sub_mul(self, f, g, h):
return self.from_dense(dmp_sub_mul(self.to_dense(f), self.to_dense(g), self.to_dense(h), self.ngens-1, self.domain))
def dup_mul(self, f, g):
return self.from_dense(dup_mul(self.to_dense(f), self.to_dense(g), self.domain))
def dmp_mul(self, f, g):
return self.from_dense(dmp_mul(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain))
def dup_sqr(self, f):
return self.from_dense(dup_sqr(self.to_dense(f), self.domain))
def dmp_sqr(self, f):
return self.from_dense(dmp_sqr(self.to_dense(f), self.ngens-1, self.domain))
def dup_pow(self, f, n):
return self.from_dense(dup_pow(self.to_dense(f), n, self.domain))
def dmp_pow(self, f, n):
return self.from_dense(dmp_pow(self.to_dense(f), n, self.ngens-1, self.domain))
def dup_pdiv(self, f, g):
q, r = dup_pdiv(self.to_dense(f), self.to_dense(g), self.domain)
return (self.from_dense(q), self.from_dense(r))
def dup_prem(self, f, g):
return self.from_dense(dup_prem(self.to_dense(f), self.to_dense(g), self.domain))
def dup_pquo(self, f, g):
return self.from_dense(dup_pquo(self.to_dense(f), self.to_dense(g), self.domain))
def dup_pexquo(self, f, g):
return self.from_dense(dup_pexquo(self.to_dense(f), self.to_dense(g), self.domain))
def dmp_pdiv(self, f, g):
q, r = dmp_pdiv(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return (self.from_dense(q), self.from_dense(r))
def dmp_prem(self, f, g):
return self.from_dense(dmp_prem(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain))
def dmp_pquo(self, f, g):
return self.from_dense(dmp_pquo(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain))
def dmp_pexquo(self, f, g):
return self.from_dense(dmp_pexquo(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain))
def dup_rr_div(self, f, g):
q, r = dup_rr_div(self.to_dense(f), self.to_dense(g), self.domain)
return (self.from_dense(q), self.from_dense(r))
def dmp_rr_div(self, f, g):
q, r = dmp_rr_div(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return (self.from_dense(q), self.from_dense(r))
def dup_ff_div(self, f, g):
q, r = dup_ff_div(self.to_dense(f), self.to_dense(g), self.domain)
return (self.from_dense(q), self.from_dense(r))
def dmp_ff_div(self, f, g):
q, r = dmp_ff_div(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return (self.from_dense(q), self.from_dense(r))
def dup_div(self, f, g):
q, r = dup_div(self.to_dense(f), self.to_dense(g), self.domain)
return (self.from_dense(q), self.from_dense(r))
def dup_rem(self, f, g):
return self.from_dense(dup_rem(self.to_dense(f), self.to_dense(g), self.domain))
def dup_quo(self, f, g):
return self.from_dense(dup_quo(self.to_dense(f), self.to_dense(g), self.domain))
def dup_exquo(self, f, g):
return self.from_dense(dup_exquo(self.to_dense(f), self.to_dense(g), self.domain))
def dmp_div(self, f, g):
q, r = dmp_div(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return (self.from_dense(q), self.from_dense(r))
def dmp_rem(self, f, g):
return self.from_dense(dmp_rem(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain))
def dmp_quo(self, f, g):
return self.from_dense(dmp_quo(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain))
def dmp_exquo(self, f, g):
return self.from_dense(dmp_exquo(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain))
def dup_max_norm(self, f):
return dup_max_norm(self.to_dense(f), self.domain)
def dmp_max_norm(self, f):
return dmp_max_norm(self.to_dense(f), self.ngens-1, self.domain)
def dup_l1_norm(self, f):
return dup_l1_norm(self.to_dense(f), self.domain)
def dmp_l1_norm(self, f):
return dmp_l1_norm(self.to_dense(f), self.ngens-1, self.domain)
def dup_expand(self, polys):
return self.from_dense(dup_expand(list(map(self.to_dense, polys)), self.domain))
def dmp_expand(self, polys):
return self.from_dense(dmp_expand(list(map(self.to_dense, polys)), self.ngens-1, self.domain))
def dup_LC(self, f):
return dup_LC(self.to_dense(f), self.domain)
def dmp_LC(self, f):
LC = dmp_LC(self.to_dense(f), self.domain)
if isinstance(LC, list):
return self[1:].from_dense(LC)
else:
return LC
def dup_TC(self, f):
return dup_TC(self.to_dense(f), self.domain)
def dmp_TC(self, f):
TC = dmp_TC(self.to_dense(f), self.domain)
if isinstance(TC, list):
return self[1:].from_dense(TC)
else:
return TC
def dmp_ground_LC(self, f):
return dmp_ground_LC(self.to_dense(f), self.ngens-1, self.domain)
def dmp_ground_TC(self, f):
return dmp_ground_TC(self.to_dense(f), self.ngens-1, self.domain)
def dup_degree(self, f):
return dup_degree(self.to_dense(f))
def dmp_degree(self, f):
return dmp_degree(self.to_dense(f), self.ngens-1)
def dmp_degree_in(self, f, j):
return dmp_degree_in(self.to_dense(f), j, self.ngens-1)
def dup_integrate(self, f, m):
return self.from_dense(dup_integrate(self.to_dense(f), m, self.domain))
def dmp_integrate(self, f, m):
return self.from_dense(dmp_integrate(self.to_dense(f), m, self.ngens-1, self.domain))
def dup_diff(self, f, m):
return self.from_dense(dup_diff(self.to_dense(f), m, self.domain))
def dmp_diff(self, f, m):
return self.from_dense(dmp_diff(self.to_dense(f), m, self.ngens-1, self.domain))
def dmp_diff_in(self, f, m, j):
return self.from_dense(dmp_diff_in(self.to_dense(f), m, j, self.ngens-1, self.domain))
def dmp_integrate_in(self, f, m, j):
return self.from_dense(dmp_integrate_in(self.to_dense(f), m, j, self.ngens-1, self.domain))
def dup_eval(self, f, a):
return dup_eval(self.to_dense(f), a, self.domain)
def dmp_eval(self, f, a):
result = dmp_eval(self.to_dense(f), a, self.ngens-1, self.domain)
return self[1:].from_dense(result)
def dmp_eval_in(self, f, a, j):
result = dmp_eval_in(self.to_dense(f), a, j, self.ngens-1, self.domain)
return self.drop(j).from_dense(result)
def dmp_diff_eval_in(self, f, m, a, j):
result = dmp_diff_eval_in(self.to_dense(f), m, a, j, self.ngens-1, self.domain)
return self.drop(j).from_dense(result)
def dmp_eval_tail(self, f, A):
result = dmp_eval_tail(self.to_dense(f), A, self.ngens-1, self.domain)
if isinstance(result, list):
return self[:-len(A)].from_dense(result)
else:
return result
def dup_trunc(self, f, p):
return self.from_dense(dup_trunc(self.to_dense(f), p, self.domain))
def dmp_trunc(self, f, g):
return self.from_dense(dmp_trunc(self.to_dense(f), self[1:].to_dense(g), self.ngens-1, self.domain))
def dmp_ground_trunc(self, f, p):
return self.from_dense(dmp_ground_trunc(self.to_dense(f), p, self.ngens-1, self.domain))
def dup_monic(self, f):
return self.from_dense(dup_monic(self.to_dense(f), self.domain))
def dmp_ground_monic(self, f):
return self.from_dense(dmp_ground_monic(self.to_dense(f), self.ngens-1, self.domain))
def dup_extract(self, f, g):
c, F, G = dup_extract(self.to_dense(f), self.to_dense(g), self.domain)
return (c, self.from_dense(F), self.from_dense(G))
def dmp_ground_extract(self, f, g):
c, F, G = dmp_ground_extract(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return (c, self.from_dense(F), self.from_dense(G))
def dup_real_imag(self, f):
p, q = dup_real_imag(self.wrap(f).drop(1).to_dense(), self.domain)
return (self.from_dense(p), self.from_dense(q))
def dup_mirror(self, f):
return self.from_dense(dup_mirror(self.to_dense(f), self.domain))
def dup_scale(self, f, a):
return self.from_dense(dup_scale(self.to_dense(f), a, self.domain))
def dup_shift(self, f, a):
return self.from_dense(dup_shift(self.to_dense(f), a, self.domain))
def dup_transform(self, f, p, q):
return self.from_dense(dup_transform(self.to_dense(f), self.to_dense(p), self.to_dense(q), self.domain))
def dup_compose(self, f, g):
return self.from_dense(dup_compose(self.to_dense(f), self.to_dense(g), self.domain))
def dmp_compose(self, f, g):
return self.from_dense(dmp_compose(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain))
def dup_decompose(self, f):
components = dup_decompose(self.to_dense(f), self.domain)
return list(map(self.from_dense, components))
def dmp_lift(self, f):
result = dmp_lift(self.to_dense(f), self.ngens-1, self.domain)
return self.to_ground().from_dense(result)
def dup_sign_variations(self, f):
return dup_sign_variations(self.to_dense(f), self.domain)
def dup_clear_denoms(self, f, convert=False):
c, F = dup_clear_denoms(self.to_dense(f), self.domain, convert=convert)
if convert:
ring = self.clone(domain=self.domain.get_ring())
else:
ring = self
return (c, ring.from_dense(F))
def dmp_clear_denoms(self, f, convert=False):
c, F = dmp_clear_denoms(self.to_dense(f), self.ngens-1, self.domain, convert=convert)
if convert:
ring = self.clone(domain=self.domain.get_ring())
else:
ring = self
return (c, ring.from_dense(F))
def dup_revert(self, f, n):
return self.from_dense(dup_revert(self.to_dense(f), n, self.domain))
def dup_half_gcdex(self, f, g):
s, h = dup_half_gcdex(self.to_dense(f), self.to_dense(g), self.domain)
return (self.from_dense(s), self.from_dense(h))
def dmp_half_gcdex(self, f, g):
s, h = dmp_half_gcdex(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return (self.from_dense(s), self.from_dense(h))
def dup_gcdex(self, f, g):
s, t, h = dup_gcdex(self.to_dense(f), self.to_dense(g), self.domain)
return (self.from_dense(s), self.from_dense(t), self.from_dense(h))
def dmp_gcdex(self, f, g):
s, t, h = dmp_gcdex(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return (self.from_dense(s), self.from_dense(t), self.from_dense(h))
def dup_invert(self, f, g):
return self.from_dense(dup_invert(self.to_dense(f), self.to_dense(g), self.domain))
def dmp_invert(self, f, g):
return self.from_dense(dmp_invert(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain))
def dup_euclidean_prs(self, f, g):
prs = dup_euclidean_prs(self.to_dense(f), self.to_dense(g), self.domain)
return list(map(self.from_dense, prs))
def dmp_euclidean_prs(self, f, g):
prs = dmp_euclidean_prs(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return list(map(self.from_dense, prs))
def dup_primitive_prs(self, f, g):
prs = dup_primitive_prs(self.to_dense(f), self.to_dense(g), self.domain)
return list(map(self.from_dense, prs))
def dmp_primitive_prs(self, f, g):
prs = dmp_primitive_prs(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return list(map(self.from_dense, prs))
def dup_inner_subresultants(self, f, g):
prs, sres = dup_inner_subresultants(self.to_dense(f), self.to_dense(g), self.domain)
return (list(map(self.from_dense, prs)), sres)
def dmp_inner_subresultants(self, f, g):
prs, sres = dmp_inner_subresultants(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return (list(map(self.from_dense, prs)), sres)
def dup_subresultants(self, f, g):
prs = dup_subresultants(self.to_dense(f), self.to_dense(g), self.domain)
return list(map(self.from_dense, prs))
def dmp_subresultants(self, f, g):
prs = dmp_subresultants(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return list(map(self.from_dense, prs))
def dup_prs_resultant(self, f, g):
res, prs = dup_prs_resultant(self.to_dense(f), self.to_dense(g), self.domain)
return (res, list(map(self.from_dense, prs)))
def dmp_prs_resultant(self, f, g):
res, prs = dmp_prs_resultant(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return (self[1:].from_dense(res), list(map(self.from_dense, prs)))
def dmp_zz_modular_resultant(self, f, g, p):
res = dmp_zz_modular_resultant(self.to_dense(f), self.to_dense(g), self.domain_new(p), self.ngens-1, self.domain)
return self[1:].from_dense(res)
def dmp_zz_collins_resultant(self, f, g):
res = dmp_zz_collins_resultant(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return self[1:].from_dense(res)
def dmp_qq_collins_resultant(self, f, g):
res = dmp_qq_collins_resultant(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return self[1:].from_dense(res)
def dup_resultant(self, f, g): #, includePRS=False):
return dup_resultant(self.to_dense(f), self.to_dense(g), self.domain) #, includePRS=includePRS)
def dmp_resultant(self, f, g): #, includePRS=False):
res = dmp_resultant(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain) #, includePRS=includePRS)
if isinstance(res, list):
return self[1:].from_dense(res)
else:
return res
def dup_discriminant(self, f):
return dup_discriminant(self.to_dense(f), self.domain)
def dmp_discriminant(self, f):
disc = dmp_discriminant(self.to_dense(f), self.ngens-1, self.domain)
if isinstance(disc, list):
return self[1:].from_dense(disc)
else:
return disc
def dup_rr_prs_gcd(self, f, g):
H, F, G = dup_rr_prs_gcd(self.to_dense(f), self.to_dense(g), self.domain)
return (self.from_dense(H), self.from_dense(F), self.from_dense(G))
def dup_ff_prs_gcd(self, f, g):
H, F, G = dup_ff_prs_gcd(self.to_dense(f), self.to_dense(g), self.domain)
return (self.from_dense(H), self.from_dense(F), self.from_dense(G))
def dmp_rr_prs_gcd(self, f, g):
H, F, G = dmp_rr_prs_gcd(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return (self.from_dense(H), self.from_dense(F), self.from_dense(G))
def dmp_ff_prs_gcd(self, f, g):
H, F, G = dmp_ff_prs_gcd(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return (self.from_dense(H), self.from_dense(F), self.from_dense(G))
def dup_zz_heu_gcd(self, f, g):
H, F, G = dup_zz_heu_gcd(self.to_dense(f), self.to_dense(g), self.domain)
return (self.from_dense(H), self.from_dense(F), self.from_dense(G))
def dmp_zz_heu_gcd(self, f, g):
H, F, G = dmp_zz_heu_gcd(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return (self.from_dense(H), self.from_dense(F), self.from_dense(G))
def dup_qq_heu_gcd(self, f, g):
H, F, G = dup_qq_heu_gcd(self.to_dense(f), self.to_dense(g), self.domain)
return (self.from_dense(H), self.from_dense(F), self.from_dense(G))
def dmp_qq_heu_gcd(self, f, g):
H, F, G = dmp_qq_heu_gcd(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return (self.from_dense(H), self.from_dense(F), self.from_dense(G))
def dup_inner_gcd(self, f, g):
H, F, G = dup_inner_gcd(self.to_dense(f), self.to_dense(g), self.domain)
return (self.from_dense(H), self.from_dense(F), self.from_dense(G))
def dmp_inner_gcd(self, f, g):
H, F, G = dmp_inner_gcd(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return (self.from_dense(H), self.from_dense(F), self.from_dense(G))
def dup_gcd(self, f, g):
H = dup_gcd(self.to_dense(f), self.to_dense(g), self.domain)
return self.from_dense(H)
def dmp_gcd(self, f, g):
H = dmp_gcd(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return self.from_dense(H)
def dup_rr_lcm(self, f, g):
H = dup_rr_lcm(self.to_dense(f), self.to_dense(g), self.domain)
return self.from_dense(H)
def dup_ff_lcm(self, f, g):
H = dup_ff_lcm(self.to_dense(f), self.to_dense(g), self.domain)
return self.from_dense(H)
def dup_lcm(self, f, g):
H = dup_lcm(self.to_dense(f), self.to_dense(g), self.domain)
return self.from_dense(H)
def dmp_rr_lcm(self, f, g):
H = dmp_rr_lcm(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return self.from_dense(H)
def dmp_ff_lcm(self, f, g):
H = dmp_ff_lcm(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return self.from_dense(H)
def dmp_lcm(self, f, g):
H = dmp_lcm(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain)
return self.from_dense(H)
def dup_content(self, f):
cont = dup_content(self.to_dense(f), self.domain)
return cont
def dup_primitive(self, f):
cont, prim = dup_primitive(self.to_dense(f), self.domain)
return cont, self.from_dense(prim)
def dmp_content(self, f):
cont = dmp_content(self.to_dense(f), self.ngens-1, self.domain)
if isinstance(cont, list):
return self[1:].from_dense(cont)
else:
return cont
def dmp_primitive(self, f):
cont, prim = dmp_primitive(self.to_dense(f), self.ngens-1, self.domain)
if isinstance(cont, list):
return (self[1:].from_dense(cont), self.from_dense(prim))
else:
return (cont, self.from_dense(prim))
def dmp_ground_content(self, f):
cont = dmp_ground_content(self.to_dense(f), self.ngens-1, self.domain)
return cont
def dmp_ground_primitive(self, f):
cont, prim = dmp_ground_primitive(self.to_dense(f), self.ngens-1, self.domain)
return (cont, self.from_dense(prim))
def dup_cancel(self, f, g, include=True):
result = dup_cancel(self.to_dense(f), self.to_dense(g), self.domain, include=include)
if not include:
cf, cg, F, G = result
return (cf, cg, self.from_dense(F), self.from_dense(G))
else:
F, G = result
return (self.from_dense(F), self.from_dense(G))
def dmp_cancel(self, f, g, include=True):
result = dmp_cancel(self.to_dense(f), self.to_dense(g), self.ngens-1, self.domain, include=include)
if not include:
cf, cg, F, G = result
return (cf, cg, self.from_dense(F), self.from_dense(G))
else:
F, G = result
return (self.from_dense(F), self.from_dense(G))
def dup_trial_division(self, f, factors):
factors = dup_trial_division(self.to_dense(f), list(map(self.to_dense, factors)), self.domain)
return [ (self.from_dense(g), k) for g, k in factors ]
def dmp_trial_division(self, f, factors):
factors = dmp_trial_division(self.to_dense(f), list(map(self.to_dense, factors)), self.ngens-1, self.domain)
return [ (self.from_dense(g), k) for g, k in factors ]
def dup_zz_mignotte_bound(self, f):
return dup_zz_mignotte_bound(self.to_dense(f), self.domain)
def dmp_zz_mignotte_bound(self, f):
return dmp_zz_mignotte_bound(self.to_dense(f), self.ngens-1, self.domain)
def dup_zz_hensel_step(self, m, f, g, h, s, t):
D = self.to_dense
G, H, S, T = dup_zz_hensel_step(m, D(f), D(g), D(h), D(s), D(t), self.domain)
return (self.from_dense(G), self.from_dense(H), self.from_dense(S), self.from_dense(T))
def dup_zz_hensel_lift(self, p, f, f_list, l):
D = self.to_dense
polys = dup_zz_hensel_lift(p, D(f), list(map(D, f_list)), l, self.domain)
return list(map(self.from_dense, polys))
def dup_zz_zassenhaus(self, f):
factors = dup_zz_zassenhaus(self.to_dense(f), self.domain)
return [ (self.from_dense(g), k) for g, k in factors ]
def dup_zz_irreducible_p(self, f):
return dup_zz_irreducible_p(self.to_dense(f), self.domain)
def dup_cyclotomic_p(self, f, irreducible=False):
return dup_cyclotomic_p(self.to_dense(f), self.domain, irreducible=irreducible)
def dup_zz_cyclotomic_poly(self, n):
F = dup_zz_cyclotomic_poly(n, self.domain)
return self.from_dense(F)
def dup_zz_cyclotomic_factor(self, f):
result = dup_zz_cyclotomic_factor(self.to_dense(f), self.domain)
if result is None:
return result
else:
return list(map(self.from_dense, result))
# E: List[ZZ], cs: ZZ, ct: ZZ
def dmp_zz_wang_non_divisors(self, E, cs, ct):
return dmp_zz_wang_non_divisors(E, cs, ct, self.domain)
# f: Poly, T: List[(Poly, int)], ct: ZZ, A: List[ZZ]
#def dmp_zz_wang_test_points(f, T, ct, A):
# dmp_zz_wang_test_points(self.to_dense(f), T, ct, A, self.ngens-1, self.domain)
# f: Poly, T: List[(Poly, int)], cs: ZZ, E: List[ZZ], H: List[Poly], A: List[ZZ]
def dmp_zz_wang_lead_coeffs(self, f, T, cs, E, H, A):
mv = self[1:]
T = [ (mv.to_dense(t), k) for t, k in T ]
uv = self[:1]
H = list(map(uv.to_dense, H))
f, HH, CC = dmp_zz_wang_lead_coeffs(self.to_dense(f), T, cs, E, H, A, self.ngens-1, self.domain)
return self.from_dense(f), list(map(uv.from_dense, HH)), list(map(mv.from_dense, CC))
# f: List[Poly], m: int, p: ZZ
def dup_zz_diophantine(self, F, m, p):
result = dup_zz_diophantine(list(map(self.to_dense, F)), m, p, self.domain)
return list(map(self.from_dense, result))
# f: List[Poly], c: List[Poly], A: List[ZZ], d: int, p: ZZ
def dmp_zz_diophantine(self, F, c, A, d, p):
result = dmp_zz_diophantine(list(map(self.to_dense, F)), self.to_dense(c), A, d, p, self.ngens-1, self.domain)
return list(map(self.from_dense, result))
# f: Poly, H: List[Poly], LC: List[Poly], A: List[ZZ], p: ZZ
def dmp_zz_wang_hensel_lifting(self, f, H, LC, A, p):
uv = self[:1]
mv = self[1:]
H = list(map(uv.to_dense, H))
LC = list(map(mv.to_dense, LC))
result = dmp_zz_wang_hensel_lifting(self.to_dense(f), H, LC, A, p, self.ngens-1, self.domain)
return list(map(self.from_dense, result))
def dmp_zz_wang(self, f, mod=None, seed=None):
factors = dmp_zz_wang(self.to_dense(f), self.ngens-1, self.domain, mod=mod, seed=seed)
return [ self.from_dense(g) for g in factors ]
def dup_zz_factor_sqf(self, f):
coeff, factors = dup_zz_factor_sqf(self.to_dense(f), self.domain)
return (coeff, [ self.from_dense(g) for g in factors ])
def dup_zz_factor(self, f):
coeff, factors = dup_zz_factor(self.to_dense(f), self.domain)
return (coeff, [ (self.from_dense(g), k) for g, k in factors ])
def dmp_zz_factor(self, f):
coeff, factors = dmp_zz_factor(self.to_dense(f), self.ngens-1, self.domain)
return (coeff, [ (self.from_dense(g), k) for g, k in factors ])
def dup_qq_i_factor(self, f):
coeff, factors = dup_qq_i_factor(self.to_dense(f), self.domain)
return (coeff, [ (self.from_dense(g), k) for g, k in factors ])
def dmp_qq_i_factor(self, f):
coeff, factors = dmp_qq_i_factor(self.to_dense(f), self.ngens-1, self.domain)
return (coeff, [ (self.from_dense(g), k) for g, k in factors ])
def dup_zz_i_factor(self, f):
coeff, factors = dup_zz_i_factor(self.to_dense(f), self.domain)
return (coeff, [ (self.from_dense(g), k) for g, k in factors ])
def dmp_zz_i_factor(self, f):
coeff, factors = dmp_zz_i_factor(self.to_dense(f), self.ngens-1, self.domain)
return (coeff, [ (self.from_dense(g), k) for g, k in factors ])
def dup_ext_factor(self, f):
coeff, factors = dup_ext_factor(self.to_dense(f), self.domain)
return (coeff, [ (self.from_dense(g), k) for g, k in factors ])
def dmp_ext_factor(self, f):
coeff, factors = dmp_ext_factor(self.to_dense(f), self.ngens-1, self.domain)
return (coeff, [ (self.from_dense(g), k) for g, k in factors ])
def dup_gf_factor(self, f):
coeff, factors = dup_gf_factor(self.to_dense(f), self.domain)
return (coeff, [ (self.from_dense(g), k) for g, k in factors ])
def dmp_gf_factor(self, f):
coeff, factors = dmp_gf_factor(self.to_dense(f), self.ngens-1, self.domain)
return (coeff, [ (self.from_dense(g), k) for g, k in factors ])
def dup_factor_list(self, f):
coeff, factors = dup_factor_list(self.to_dense(f), self.domain)
return (coeff, [ (self.from_dense(g), k) for g, k in factors ])
def dup_factor_list_include(self, f):
factors = dup_factor_list_include(self.to_dense(f), self.domain)
return [ (self.from_dense(g), k) for g, k in factors ]
def dmp_factor_list(self, f):
coeff, factors = dmp_factor_list(self.to_dense(f), self.ngens-1, self.domain)
return (coeff, [ (self.from_dense(g), k) for g, k in factors ])
def dmp_factor_list_include(self, f):
factors = dmp_factor_list_include(self.to_dense(f), self.ngens-1, self.domain)
return [ (self.from_dense(g), k) for g, k in factors ]
def dup_irreducible_p(self, f):
return dup_irreducible_p(self.to_dense(f), self.domain)
def dmp_irreducible_p(self, f):
return dmp_irreducible_p(self.to_dense(f), self.ngens-1, self.domain)
def dup_sturm(self, f):
seq = dup_sturm(self.to_dense(f), self.domain)
return list(map(self.from_dense, seq))
def dup_sqf_p(self, f):
return dup_sqf_p(self.to_dense(f), self.domain)
def dmp_sqf_p(self, f):
return dmp_sqf_p(self.to_dense(f), self.ngens-1, self.domain)
def dup_sqf_norm(self, f):
s, F, R = dup_sqf_norm(self.to_dense(f), self.domain)
return (s, self.from_dense(F), self.to_ground().from_dense(R))
def dmp_sqf_norm(self, f):
s, F, R = dmp_sqf_norm(self.to_dense(f), self.ngens-1, self.domain)
return (s, self.from_dense(F), self.to_ground().from_dense(R))
def dup_gf_sqf_part(self, f):
return self.from_dense(dup_gf_sqf_part(self.to_dense(f), self.domain))
def dmp_gf_sqf_part(self, f):
return self.from_dense(dmp_gf_sqf_part(self.to_dense(f), self.domain))
def dup_sqf_part(self, f):
return self.from_dense(dup_sqf_part(self.to_dense(f), self.domain))
def dmp_sqf_part(self, f):
return self.from_dense(dmp_sqf_part(self.to_dense(f), self.ngens-1, self.domain))
def dup_gf_sqf_list(self, f, all=False):
coeff, factors = dup_gf_sqf_list(self.to_dense(f), self.domain, all=all)
return (coeff, [ (self.from_dense(g), k) for g, k in factors ])
def dmp_gf_sqf_list(self, f, all=False):
coeff, factors = dmp_gf_sqf_list(self.to_dense(f), self.ngens-1, self.domain, all=all)
return (coeff, [ (self.from_dense(g), k) for g, k in factors ])
def dup_sqf_list(self, f, all=False):
coeff, factors = dup_sqf_list(self.to_dense(f), self.domain, all=all)
return (coeff, [ (self.from_dense(g), k) for g, k in factors ])
def dup_sqf_list_include(self, f, all=False):
factors = dup_sqf_list_include(self.to_dense(f), self.domain, all=all)
return [ (self.from_dense(g), k) for g, k in factors ]
def dmp_sqf_list(self, f, all=False):
coeff, factors = dmp_sqf_list(self.to_dense(f), self.ngens-1, self.domain, all=all)
return (coeff, [ (self.from_dense(g), k) for g, k in factors ])
def dmp_sqf_list_include(self, f, all=False):
factors = dmp_sqf_list_include(self.to_dense(f), self.ngens-1, self.domain, all=all)
return [ (self.from_dense(g), k) for g, k in factors ]
def dup_gff_list(self, f):
factors = dup_gff_list(self.to_dense(f), self.domain)
return [ (self.from_dense(g), k) for g, k in factors ]
def dmp_gff_list(self, f):
factors = dmp_gff_list(self.to_dense(f), self.ngens-1, self.domain)
return [ (self.from_dense(g), k) for g, k in factors ]
def dup_root_upper_bound(self, f):
return dup_root_upper_bound(self.to_dense(f), self.domain)
def dup_root_lower_bound(self, f):
return dup_root_lower_bound(self.to_dense(f), self.domain)
def dup_step_refine_real_root(self, f, M, fast=False):
return dup_step_refine_real_root(self.to_dense(f), M, self.domain, fast=fast)
def dup_inner_refine_real_root(self, f, M, eps=None, steps=None, disjoint=None, fast=False, mobius=False):
return dup_inner_refine_real_root(self.to_dense(f), M, self.domain, eps=eps, steps=steps, disjoint=disjoint, fast=fast, mobius=mobius)
def dup_outer_refine_real_root(self, f, s, t, eps=None, steps=None, disjoint=None, fast=False):
return dup_outer_refine_real_root(self.to_dense(f), s, t, self.domain, eps=eps, steps=steps, disjoint=disjoint, fast=fast)
def dup_refine_real_root(self, f, s, t, eps=None, steps=None, disjoint=None, fast=False):
return dup_refine_real_root(self.to_dense(f), s, t, self.domain, eps=eps, steps=steps, disjoint=disjoint, fast=fast)
def dup_inner_isolate_real_roots(self, f, eps=None, fast=False):
return dup_inner_isolate_real_roots(self.to_dense(f), self.domain, eps=eps, fast=fast)
def dup_inner_isolate_positive_roots(self, f, eps=None, inf=None, sup=None, fast=False, mobius=False):
return dup_inner_isolate_positive_roots(self.to_dense(f), self.domain, eps=eps, inf=inf, sup=sup, fast=fast, mobius=mobius)
def dup_inner_isolate_negative_roots(self, f, inf=None, sup=None, eps=None, fast=False, mobius=False):
return dup_inner_isolate_negative_roots(self.to_dense(f), self.domain, inf=inf, sup=sup, eps=eps, fast=fast, mobius=mobius)
def dup_isolate_real_roots_sqf(self, f, eps=None, inf=None, sup=None, fast=False, blackbox=False):
return dup_isolate_real_roots_sqf(self.to_dense(f), self.domain, eps=eps, inf=inf, sup=sup, fast=fast, blackbox=blackbox)
def dup_isolate_real_roots(self, f, eps=None, inf=None, sup=None, basis=False, fast=False):
return dup_isolate_real_roots(self.to_dense(f), self.domain, eps=eps, inf=inf, sup=sup, basis=basis, fast=fast)
def dup_isolate_real_roots_list(self, polys, eps=None, inf=None, sup=None, strict=False, basis=False, fast=False):
return dup_isolate_real_roots_list(list(map(self.to_dense, polys)), self.domain, eps=eps, inf=inf, sup=sup, strict=strict, basis=basis, fast=fast)
def dup_count_real_roots(self, f, inf=None, sup=None):
return dup_count_real_roots(self.to_dense(f), self.domain, inf=inf, sup=sup)
def dup_count_complex_roots(self, f, inf=None, sup=None, exclude=None):
return dup_count_complex_roots(self.to_dense(f), self.domain, inf=inf, sup=sup, exclude=exclude)
def dup_isolate_complex_roots_sqf(self, f, eps=None, inf=None, sup=None, blackbox=False):
return dup_isolate_complex_roots_sqf(self.to_dense(f), self.domain, eps=eps, inf=inf, sup=sup, blackbox=blackbox)
def dup_isolate_all_roots_sqf(self, f, eps=None, inf=None, sup=None, fast=False, blackbox=False):
return dup_isolate_all_roots_sqf(self.to_dense(f), self.domain, eps=eps, inf=inf, sup=sup, fast=fast, blackbox=blackbox)
def dup_isolate_all_roots(self, f, eps=None, inf=None, sup=None, fast=False):
return dup_isolate_all_roots(self.to_dense(f), self.domain, eps=eps, inf=inf, sup=sup, fast=fast)
def fateman_poly_F_1(self):
from sympy.polys.specialpolys import dmp_fateman_poly_F_1
return tuple(map(self.from_dense, dmp_fateman_poly_F_1(self.ngens-1, self.domain)))
def fateman_poly_F_2(self):
from sympy.polys.specialpolys import dmp_fateman_poly_F_2
return tuple(map(self.from_dense, dmp_fateman_poly_F_2(self.ngens-1, self.domain)))
def fateman_poly_F_3(self):
from sympy.polys.specialpolys import dmp_fateman_poly_F_3
return tuple(map(self.from_dense, dmp_fateman_poly_F_3(self.ngens-1, self.domain)))
def to_gf_dense(self, element):
return gf_strip([ self.domain.dom.convert(c, self.domain) for c in self.wrap(element).to_dense() ])
def from_gf_dense(self, element):
return self.from_dict(dmp_to_dict(element, self.ngens-1, self.domain.dom))
def gf_degree(self, f):
return gf_degree(self.to_gf_dense(f))
def gf_LC(self, f):
return gf_LC(self.to_gf_dense(f), self.domain.dom)
def gf_TC(self, f):
return gf_TC(self.to_gf_dense(f), self.domain.dom)
def gf_strip(self, f):
return self.from_gf_dense(gf_strip(self.to_gf_dense(f)))
def gf_trunc(self, f):
return self.from_gf_dense(gf_strip(self.to_gf_dense(f), self.domain.mod))
def gf_normal(self, f):
return self.from_gf_dense(gf_strip(self.to_gf_dense(f), self.domain.mod, self.domain.dom))
def gf_from_dict(self, f):
return self.from_gf_dense(gf_from_dict(f, self.domain.mod, self.domain.dom))
def gf_to_dict(self, f, symmetric=True):
return gf_to_dict(self.to_gf_dense(f), self.domain.mod, symmetric=symmetric)
def gf_from_int_poly(self, f):
return self.from_gf_dense(gf_from_int_poly(f, self.domain.mod))
def gf_to_int_poly(self, f, symmetric=True):
return gf_to_int_poly(self.to_gf_dense(f), self.domain.mod, symmetric=symmetric)
def gf_neg(self, f):
return self.from_gf_dense(gf_neg(self.to_gf_dense(f), self.domain.mod, self.domain.dom))
def gf_add_ground(self, f, a):
return self.from_gf_dense(gf_add_ground(self.to_gf_dense(f), a, self.domain.mod, self.domain.dom))
def gf_sub_ground(self, f, a):
return self.from_gf_dense(gf_sub_ground(self.to_gf_dense(f), a, self.domain.mod, self.domain.dom))
def gf_mul_ground(self, f, a):
return self.from_gf_dense(gf_mul_ground(self.to_gf_dense(f), a, self.domain.mod, self.domain.dom))
def gf_quo_ground(self, f, a):
return self.from_gf_dense(gf_quo_ground(self.to_gf_dense(f), a, self.domain.mod, self.domain.dom))
def gf_add(self, f, g):
return self.from_gf_dense(gf_add(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom))
def gf_sub(self, f, g):
return self.from_gf_dense(gf_sub(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom))
def gf_mul(self, f, g):
return self.from_gf_dense(gf_mul(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom))
def gf_sqr(self, f):
return self.from_gf_dense(gf_sqr(self.to_gf_dense(f), self.domain.mod, self.domain.dom))
def gf_add_mul(self, f, g, h):
return self.from_gf_dense(gf_add_mul(self.to_gf_dense(f), self.to_gf_dense(g), self.to_gf_dense(h), self.domain.mod, self.domain.dom))
def gf_sub_mul(self, f, g, h):
return self.from_gf_dense(gf_sub_mul(self.to_gf_dense(f), self.to_gf_dense(g), self.to_gf_dense(h), self.domain.mod, self.domain.dom))
def gf_expand(self, F):
return self.from_gf_dense(gf_expand(list(map(self.to_gf_dense, F)), self.domain.mod, self.domain.dom))
def gf_div(self, f, g):
q, r = gf_div(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom)
return self.from_gf_dense(q), self.from_gf_dense(r)
def gf_rem(self, f, g):
return self.from_gf_dense(gf_rem(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom))
def gf_quo(self, f, g):
return self.from_gf_dense(gf_quo(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom))
def gf_exquo(self, f, g):
return self.from_gf_dense(gf_exquo(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom))
def gf_lshift(self, f, n):
return self.from_gf_dense(gf_lshift(self.to_gf_dense(f), n, self.domain.dom))
def gf_rshift(self, f, n):
return self.from_gf_dense(gf_rshift(self.to_gf_dense(f), n, self.domain.dom))
def gf_pow(self, f, n):
return self.from_gf_dense(gf_pow(self.to_gf_dense(f), n, self.domain.mod, self.domain.dom))
def gf_pow_mod(self, f, n, g):
return self.from_gf_dense(gf_pow_mod(self.to_gf_dense(f), n, self.to_gf_dense(g), self.domain.mod, self.domain.dom))
def gf_cofactors(self, f, g):
h, cff, cfg = gf_cofactors(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom)
return self.from_gf_dense(h), self.from_gf_dense(cff), self.from_gf_dense(cfg)
def gf_gcd(self, f, g):
return self.from_gf_dense(gf_gcd(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom))
def gf_lcm(self, f, g):
return self.from_gf_dense(gf_lcm(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom))
def gf_gcdex(self, f, g):
return self.from_gf_dense(gf_gcdex(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom))
def gf_monic(self, f):
return self.from_gf_dense(gf_monic(self.to_gf_dense(f), self.domain.mod, self.domain.dom))
def gf_diff(self, f):
return self.from_gf_dense(gf_diff(self.to_gf_dense(f), self.domain.mod, self.domain.dom))
def gf_eval(self, f, a):
return gf_eval(self.to_gf_dense(f), a, self.domain.mod, self.domain.dom)
def gf_multi_eval(self, f, A):
return gf_multi_eval(self.to_gf_dense(f), A, self.domain.mod, self.domain.dom)
def gf_compose(self, f, g):
return self.from_gf_dense(gf_compose(self.to_gf_dense(f), self.to_gf_dense(g), self.domain.mod, self.domain.dom))
def gf_compose_mod(self, g, h, f):
return self.from_gf_dense(gf_compose_mod(self.to_gf_dense(g), self.to_gf_dense(h), self.to_gf_dense(f), self.domain.mod, self.domain.dom))
def gf_trace_map(self, a, b, c, n, f):
a = self.to_gf_dense(a)
b = self.to_gf_dense(b)
c = self.to_gf_dense(c)
f = self.to_gf_dense(f)
U, V = gf_trace_map(a, b, c, n, f, self.domain.mod, self.domain.dom)
return self.from_gf_dense(U), self.from_gf_dense(V)
def gf_random(self, n):
return self.from_gf_dense(gf_random(n, self.domain.mod, self.domain.dom))
def gf_irreducible(self, n):
return self.from_gf_dense(gf_irreducible(n, self.domain.mod, self.domain.dom))
def gf_irred_p_ben_or(self, f):
return gf_irred_p_ben_or(self.to_gf_dense(f), self.domain.mod, self.domain.dom)
def gf_irred_p_rabin(self, f):
return gf_irred_p_rabin(self.to_gf_dense(f), self.domain.mod, self.domain.dom)
def gf_irreducible_p(self, f):
return gf_irreducible_p(self.to_gf_dense(f), self.domain.mod, self.domain.dom)
def gf_sqf_p(self, f):
return gf_sqf_p(self.to_gf_dense(f), self.domain.mod, self.domain.dom)
def gf_sqf_part(self, f):
return self.from_gf_dense(gf_sqf_part(self.to_gf_dense(f), self.domain.mod, self.domain.dom))
def gf_sqf_list(self, f, all=False):
coeff, factors = gf_sqf_part(self.to_gf_dense(f), self.domain.mod, self.domain.dom)
return coeff, [ (self.from_gf_dense(g), k) for g, k in factors ]
def gf_Qmatrix(self, f):
return gf_Qmatrix(self.to_gf_dense(f), self.domain.mod, self.domain.dom)
def gf_berlekamp(self, f):
factors = gf_berlekamp(self.to_gf_dense(f), self.domain.mod, self.domain.dom)
return [ self.from_gf_dense(g) for g in factors ]
def gf_ddf_zassenhaus(self, f):
factors = gf_ddf_zassenhaus(self.to_gf_dense(f), self.domain.mod, self.domain.dom)
return [ (self.from_gf_dense(g), k) for g, k in factors ]
def gf_edf_zassenhaus(self, f, n):
factors = gf_edf_zassenhaus(self.to_gf_dense(f), self.domain.mod, self.domain.dom)
return [ self.from_gf_dense(g) for g in factors ]
def gf_ddf_shoup(self, f):
factors = gf_ddf_shoup(self.to_gf_dense(f), self.domain.mod, self.domain.dom)
return [ (self.from_gf_dense(g), k) for g, k in factors ]
def gf_edf_shoup(self, f, n):
factors = gf_edf_shoup(self.to_gf_dense(f), self.domain.mod, self.domain.dom)
return [ self.from_gf_dense(g) for g in factors ]
def gf_zassenhaus(self, f):
factors = gf_zassenhaus(self.to_gf_dense(f), self.domain.mod, self.domain.dom)
return [ self.from_gf_dense(g) for g in factors ]
def gf_shoup(self, f):
factors = gf_shoup(self.to_gf_dense(f), self.domain.mod, self.domain.dom)
return [ self.from_gf_dense(g) for g in factors ]
def gf_factor_sqf(self, f, method=None):
coeff, factors = gf_factor_sqf(self.to_gf_dense(f), self.domain.mod, self.domain.dom, method=method)
return coeff, [ self.from_gf_dense(g) for g in factors ]
def gf_factor(self, f):
coeff, factors = gf_factor(self.to_gf_dense(f), self.domain.mod, self.domain.dom)
return coeff, [ (self.from_gf_dense(g), k) for g, k in factors ]
|
cc0bbafe9ee9d47dc1f23b2d9291b50d1fa4c6f31c5c4805705bb941220a9d5d
|
"""Useful utilities for higher level polynomial classes. """
from __future__ import print_function, division
from sympy.core import (S, Add, Mul, Pow, Eq, Expr,
expand_mul, expand_multinomial)
from sympy.core.exprtools import decompose_power, decompose_power_rat
from sympy.polys.polyerrors import PolynomialError, GeneratorsError
from sympy.polys.polyoptions import build_options
import re
_gens_order = {
'a': 301, 'b': 302, 'c': 303, 'd': 304,
'e': 305, 'f': 306, 'g': 307, 'h': 308,
'i': 309, 'j': 310, 'k': 311, 'l': 312,
'm': 313, 'n': 314, 'o': 315, 'p': 216,
'q': 217, 'r': 218, 's': 219, 't': 220,
'u': 221, 'v': 222, 'w': 223, 'x': 124,
'y': 125, 'z': 126,
}
_max_order = 1000
_re_gen = re.compile(r"^(.+?)(\d*)$")
def _nsort(roots, separated=False):
"""Sort the numerical roots putting the real roots first, then sorting
according to real and imaginary parts. If ``separated`` is True, then
the real and imaginary roots will be returned in two lists, respectively.
This routine tries to avoid issue 6137 by separating the roots into real
and imaginary parts before evaluation. In addition, the sorting will raise
an error if any computation cannot be done with precision.
"""
if not all(r.is_number for r in roots):
raise NotImplementedError
# see issue 6137:
# get the real part of the evaluated real and imaginary parts of each root
key = [[i.n(2).as_real_imag()[0] for i in r.as_real_imag()] for r in roots]
# make sure the parts were computed with precision
if len(roots) > 1 and any(i._prec == 1 for k in key for i in k):
raise NotImplementedError("could not compute root with precision")
# insert a key to indicate if the root has an imaginary part
key = [(1 if i else 0, r, i) for r, i in key]
key = sorted(zip(key, roots))
# return the real and imaginary roots separately if desired
if separated:
r = []
i = []
for (im, _, _), v in key:
if im:
i.append(v)
else:
r.append(v)
return r, i
_, roots = zip(*key)
return list(roots)
def _sort_gens(gens, **args):
"""Sort generators in a reasonably intelligent way. """
opt = build_options(args)
gens_order, wrt = {}, None
if opt is not None:
gens_order, wrt = {}, opt.wrt
for i, gen in enumerate(opt.sort):
gens_order[gen] = i + 1
def order_key(gen):
gen = str(gen)
if wrt is not None:
try:
return (-len(wrt) + wrt.index(gen), gen, 0)
except ValueError:
pass
name, index = _re_gen.match(gen).groups()
if index:
index = int(index)
else:
index = 0
try:
return ( gens_order[name], name, index)
except KeyError:
pass
try:
return (_gens_order[name], name, index)
except KeyError:
pass
return (_max_order, name, index)
try:
gens = sorted(gens, key=order_key)
except TypeError: # pragma: no cover
pass
return tuple(gens)
def _unify_gens(f_gens, g_gens):
"""Unify generators in a reasonably intelligent way. """
f_gens = list(f_gens)
g_gens = list(g_gens)
if f_gens == g_gens:
return tuple(f_gens)
gens, common, k = [], [], 0
for gen in f_gens:
if gen in g_gens:
common.append(gen)
for i, gen in enumerate(g_gens):
if gen in common:
g_gens[i], k = common[k], k + 1
for gen in common:
i = f_gens.index(gen)
gens.extend(f_gens[:i])
f_gens = f_gens[i + 1:]
i = g_gens.index(gen)
gens.extend(g_gens[:i])
g_gens = g_gens[i + 1:]
gens.append(gen)
gens.extend(f_gens)
gens.extend(g_gens)
return tuple(gens)
def _analyze_gens(gens):
"""Support for passing generators as `*gens` and `[gens]`. """
if len(gens) == 1 and hasattr(gens[0], '__iter__'):
return tuple(gens[0])
else:
return tuple(gens)
def _sort_factors(factors, **args):
"""Sort low-level factors in increasing 'complexity' order. """
def order_if_multiple_key(factor):
(f, n) = factor
return (len(f), n, f)
def order_no_multiple_key(f):
return (len(f), f)
if args.get('multiple', True):
return sorted(factors, key=order_if_multiple_key)
else:
return sorted(factors, key=order_no_multiple_key)
illegal = [S.NaN, S.Infinity, S.NegativeInfinity, S.ComplexInfinity]
finf = [float(i) for i in illegal[1:3]]
def _not_a_coeff(expr):
"""Do not treat NaN and infinities as valid polynomial coefficients. """
if expr in illegal or expr in finf:
return True
if type(expr) is float and float(expr) != expr:
return True # nan
return # could be
def _parallel_dict_from_expr_if_gens(exprs, opt):
"""Transform expressions into a multinomial form given generators. """
k, indices = len(opt.gens), {}
for i, g in enumerate(opt.gens):
indices[g] = i
polys = []
for expr in exprs:
poly = {}
if expr.is_Equality:
expr = expr.lhs - expr.rhs
for term in Add.make_args(expr):
coeff, monom = [], [0]*k
for factor in Mul.make_args(term):
if not _not_a_coeff(factor) and factor.is_Number:
coeff.append(factor)
else:
try:
if opt.series is False:
base, exp = decompose_power(factor)
if exp < 0:
exp, base = -exp, Pow(base, -S.One)
else:
base, exp = decompose_power_rat(factor)
monom[indices[base]] = exp
except KeyError:
if not factor.free_symbols.intersection(opt.gens):
coeff.append(factor)
else:
raise PolynomialError("%s contains an element of "
"the set of generators." % factor)
monom = tuple(monom)
if monom in poly:
poly[monom] += Mul(*coeff)
else:
poly[monom] = Mul(*coeff)
polys.append(poly)
return polys, opt.gens
def _parallel_dict_from_expr_no_gens(exprs, opt):
"""Transform expressions into a multinomial form and figure out generators. """
if opt.domain is not None:
def _is_coeff(factor):
return factor in opt.domain
elif opt.extension is True:
def _is_coeff(factor):
return factor.is_algebraic
elif opt.greedy is not False:
def _is_coeff(factor):
return factor is S.ImaginaryUnit
else:
def _is_coeff(factor):
return factor.is_number
gens, reprs = set([]), []
for expr in exprs:
terms = []
if expr.is_Equality:
expr = expr.lhs - expr.rhs
for term in Add.make_args(expr):
coeff, elements = [], {}
for factor in Mul.make_args(term):
if not _not_a_coeff(factor) and (factor.is_Number or _is_coeff(factor)):
coeff.append(factor)
else:
if opt.series is False:
base, exp = decompose_power(factor)
if exp < 0:
exp, base = -exp, Pow(base, -S.One)
else:
base, exp = decompose_power_rat(factor)
elements[base] = elements.setdefault(base, 0) + exp
gens.add(base)
terms.append((coeff, elements))
reprs.append(terms)
gens = _sort_gens(gens, opt=opt)
k, indices = len(gens), {}
for i, g in enumerate(gens):
indices[g] = i
polys = []
for terms in reprs:
poly = {}
for coeff, term in terms:
monom = [0]*k
for base, exp in term.items():
monom[indices[base]] = exp
monom = tuple(monom)
if monom in poly:
poly[monom] += Mul(*coeff)
else:
poly[monom] = Mul(*coeff)
polys.append(poly)
return polys, tuple(gens)
def _dict_from_expr_if_gens(expr, opt):
"""Transform an expression into a multinomial form given generators. """
(poly,), gens = _parallel_dict_from_expr_if_gens((expr,), opt)
return poly, gens
def _dict_from_expr_no_gens(expr, opt):
"""Transform an expression into a multinomial form and figure out generators. """
(poly,), gens = _parallel_dict_from_expr_no_gens((expr,), opt)
return poly, gens
def parallel_dict_from_expr(exprs, **args):
"""Transform expressions into a multinomial form. """
reps, opt = _parallel_dict_from_expr(exprs, build_options(args))
return reps, opt.gens
def _parallel_dict_from_expr(exprs, opt):
"""Transform expressions into a multinomial form. """
if opt.expand is not False:
exprs = [ expr.expand() for expr in exprs ]
if any(expr.is_commutative is False for expr in exprs):
raise PolynomialError('non-commutative expressions are not supported')
if opt.gens:
reps, gens = _parallel_dict_from_expr_if_gens(exprs, opt)
else:
reps, gens = _parallel_dict_from_expr_no_gens(exprs, opt)
return reps, opt.clone({'gens': gens})
def dict_from_expr(expr, **args):
"""Transform an expression into a multinomial form. """
rep, opt = _dict_from_expr(expr, build_options(args))
return rep, opt.gens
def _dict_from_expr(expr, opt):
"""Transform an expression into a multinomial form. """
if expr.is_commutative is False:
raise PolynomialError('non-commutative expressions are not supported')
def _is_expandable_pow(expr):
return (expr.is_Pow and expr.exp.is_positive and expr.exp.is_Integer
and expr.base.is_Add)
if opt.expand is not False:
if not isinstance(expr, (Expr, Eq)):
raise PolynomialError('expression must be of type Expr')
expr = expr.expand()
# TODO: Integrate this into expand() itself
while any(_is_expandable_pow(i) or i.is_Mul and
any(_is_expandable_pow(j) for j in i.args) for i in
Add.make_args(expr)):
expr = expand_multinomial(expr)
while any(i.is_Mul and any(j.is_Add for j in i.args) for i in Add.make_args(expr)):
expr = expand_mul(expr)
if opt.gens:
rep, gens = _dict_from_expr_if_gens(expr, opt)
else:
rep, gens = _dict_from_expr_no_gens(expr, opt)
return rep, opt.clone({'gens': gens})
def expr_from_dict(rep, *gens):
"""Convert a multinomial form into an expression. """
result = []
for monom, coeff in rep.items():
term = [coeff]
for g, m in zip(gens, monom):
if m:
term.append(Pow(g, m))
result.append(Mul(*term))
return Add(*result)
parallel_dict_from_basic = parallel_dict_from_expr
dict_from_basic = dict_from_expr
basic_from_dict = expr_from_dict
def _dict_reorder(rep, gens, new_gens):
"""Reorder levels using dict representation. """
gens = list(gens)
monoms = rep.keys()
coeffs = rep.values()
new_monoms = [ [] for _ in range(len(rep)) ]
used_indices = set()
for gen in new_gens:
try:
j = gens.index(gen)
used_indices.add(j)
for M, new_M in zip(monoms, new_monoms):
new_M.append(M[j])
except ValueError:
for new_M in new_monoms:
new_M.append(0)
for i, _ in enumerate(gens):
if i not in used_indices:
for monom in monoms:
if monom[i]:
raise GeneratorsError("unable to drop generators")
return map(tuple, new_monoms), coeffs
class PicklableWithSlots(object):
"""
Mixin class that allows to pickle objects with ``__slots__``.
Examples
========
First define a class that mixes :class:`PicklableWithSlots` in::
>>> from sympy.polys.polyutils import PicklableWithSlots
>>> class Some(PicklableWithSlots):
... __slots__ = ('foo', 'bar')
...
... def __init__(self, foo, bar):
... self.foo = foo
... self.bar = bar
To make :mod:`pickle` happy in doctest we have to use these hacks::
>>> from sympy.core.compatibility import builtins
>>> builtins.Some = Some
>>> from sympy.polys import polyutils
>>> polyutils.Some = Some
Next lets see if we can create an instance, pickle it and unpickle::
>>> some = Some('abc', 10)
>>> some.foo, some.bar
('abc', 10)
>>> from pickle import dumps, loads
>>> some2 = loads(dumps(some))
>>> some2.foo, some2.bar
('abc', 10)
"""
__slots__ = ()
def __getstate__(self, cls=None):
if cls is None:
# This is the case for the instance that gets pickled
cls = self.__class__
d = {}
# Get all data that should be stored from super classes
for c in cls.__bases__:
if hasattr(c, "__getstate__"):
d.update(c.__getstate__(self, c))
# Get all information that should be stored from cls and return the dict
for name in cls.__slots__:
if hasattr(self, name):
d[name] = getattr(self, name)
return d
def __setstate__(self, d):
# All values that were pickled are now assigned to a fresh instance
for name, value in d.items():
try:
setattr(self, name, value)
except AttributeError: # This is needed in cases like Rational :> Half
pass
|
acaeb945cdb84a0a40fc01da871d3a8ae0b8d3403d06b992f951974a14ef59c3
|
"""Tools for constructing domains for expressions. """
from __future__ import print_function, division
from sympy.core import sympify
from sympy.core.evalf import pure_complex
from sympy.polys.domains import ZZ, QQ, ZZ_I, QQ_I, EX
from sympy.polys.domains.realfield import RealField
from sympy.polys.polyoptions import build_options
from sympy.polys.polyutils import parallel_dict_from_basic
from sympy.utilities import public
def _construct_simple(coeffs, opt):
"""Handle simple domains, e.g.: ZZ, QQ, RR and algebraic domains. """
rationals = reals = gaussians = algebraics = False
if opt.extension is True:
is_algebraic = lambda coeff: coeff.is_number and coeff.is_algebraic
else:
is_algebraic = lambda coeff: False
for coeff in coeffs:
if coeff.is_Rational:
if not coeff.is_Integer:
rationals = True
elif coeff.is_Float:
if algebraics or gaussians:
# there are both reals and algebraics -> EX
return False
else:
reals = True
else:
is_complex = pure_complex(coeff)
if is_complex:
# there are both reals and algebraics -> EX
if reals:
return False
x, y = is_complex
if x.is_Rational and y.is_Rational:
gaussians = True
if not (x.is_Integer and y.is_Integer):
rationals = True
continue
if is_algebraic(coeff):
if not reals:
algebraics = True
else:
# there are both algebraics and reals -> EX
return False
else:
# this is a composite domain, e.g. ZZ[X], EX
return None
if algebraics:
domain, result = _construct_algebraic(coeffs, opt)
else:
if reals:
# Use the maximum precision of all coefficients for the RR's
# precision
max_prec = max([c._prec for c in coeffs])
domain = RealField(prec=max_prec)
else:
if opt.field or rationals:
domain = QQ_I if gaussians else QQ
else:
domain = ZZ_I if gaussians else ZZ
result = []
for coeff in coeffs:
result.append(domain.from_sympy(coeff))
return domain, result
def _construct_algebraic(coeffs, opt):
"""We know that coefficients are algebraic so construct the extension. """
from sympy.polys.numberfields import primitive_element
result, exts = [], set([])
for coeff in coeffs:
if coeff.is_Rational:
coeff = (None, 0, QQ.from_sympy(coeff))
else:
a = coeff.as_coeff_add()[0]
coeff -= a
b = coeff.as_coeff_mul()[0]
coeff /= b
exts.add(coeff)
a = QQ.from_sympy(a)
b = QQ.from_sympy(b)
coeff = (coeff, b, a)
result.append(coeff)
exts = list(exts)
g, span, H = primitive_element(exts, ex=True, polys=True)
root = sum([ s*ext for s, ext in zip(span, exts) ])
domain, g = QQ.algebraic_field((g, root)), g.rep.rep
for i, (coeff, a, b) in enumerate(result):
if coeff is not None:
coeff = a*domain.dtype.from_list(H[exts.index(coeff)], g, QQ) + b
else:
coeff = domain.dtype.from_list([b], g, QQ)
result[i] = coeff
return domain, result
def _construct_composite(coeffs, opt):
"""Handle composite domains, e.g.: ZZ[X], QQ[X], ZZ(X), QQ(X). """
numers, denoms = [], []
for coeff in coeffs:
numer, denom = coeff.as_numer_denom()
numers.append(numer)
denoms.append(denom)
polys, gens = parallel_dict_from_basic(numers + denoms) # XXX: sorting
if not gens:
return None
if opt.composite is None:
if any(gen.is_number and gen.is_algebraic for gen in gens):
return None # generators are number-like so lets better use EX
all_symbols = set([])
for gen in gens:
symbols = gen.free_symbols
if all_symbols & symbols:
return None # there could be algebraic relations between generators
else:
all_symbols |= symbols
n = len(gens)
k = len(polys)//2
numers = polys[:k]
denoms = polys[k:]
if opt.field:
fractions = True
else:
fractions, zeros = False, (0,)*n
for denom in denoms:
if len(denom) > 1 or zeros not in denom:
fractions = True
break
coeffs = set([])
if not fractions:
for numer, denom in zip(numers, denoms):
denom = denom[zeros]
for monom, coeff in numer.items():
coeff /= denom
coeffs.add(coeff)
numer[monom] = coeff
else:
for numer, denom in zip(numers, denoms):
coeffs.update(list(numer.values()))
coeffs.update(list(denom.values()))
rationals = reals = gaussians = False
for coeff in coeffs:
if coeff.is_Rational:
if not coeff.is_Integer:
rationals = True
elif coeff.is_Float:
reals = True
break
else:
is_complex = pure_complex(coeff)
if is_complex is not None:
x, y = is_complex
if x.is_Rational and y.is_Rational:
if not (x.is_Integer and y.is_Integer):
rationals = True
gaussians = True
else:
pass # XXX: CC?
if reals:
max_prec = max([c._prec for c in coeffs])
ground = RealField(prec=max_prec)
elif gaussians:
if rationals:
ground = QQ_I
else:
ground = ZZ_I
elif rationals:
ground = QQ
else:
ground = ZZ
result = []
if not fractions:
domain = ground.poly_ring(*gens)
for numer in numers:
for monom, coeff in numer.items():
numer[monom] = ground.from_sympy(coeff)
result.append(domain(numer))
else:
domain = ground.frac_field(*gens)
for numer, denom in zip(numers, denoms):
for monom, coeff in numer.items():
numer[monom] = ground.from_sympy(coeff)
for monom, coeff in denom.items():
denom[monom] = ground.from_sympy(coeff)
result.append(domain((numer, denom)))
return domain, result
def _construct_expression(coeffs, opt):
"""The last resort case, i.e. use the expression domain. """
domain, result = EX, []
for coeff in coeffs:
result.append(domain.from_sympy(coeff))
return domain, result
@public
def construct_domain(obj, **args):
"""Construct a minimal domain for the list of coefficients. """
opt = build_options(args)
if hasattr(obj, '__iter__'):
if isinstance(obj, dict):
if not obj:
monoms, coeffs = [], []
else:
monoms, coeffs = list(zip(*list(obj.items())))
else:
coeffs = obj
else:
coeffs = [obj]
coeffs = list(map(sympify, coeffs))
result = _construct_simple(coeffs, opt)
if result is not None:
if result is not False:
domain, coeffs = result
else:
domain, coeffs = _construct_expression(coeffs, opt)
else:
if opt.composite is False:
result = None
else:
result = _construct_composite(coeffs, opt)
if result is not None:
domain, coeffs = result
else:
domain, coeffs = _construct_expression(coeffs, opt)
if hasattr(obj, '__iter__'):
if isinstance(obj, dict):
return domain, dict(list(zip(monoms, coeffs)))
else:
return domain, coeffs
else:
return domain, coeffs[0]
|
df7bf8a16995c2a880be34e133f65428fc8f6fab5be28a8d5f7325df0f9205a1
|
"""Polynomial factorization routines in characteristic zero. """
from __future__ import print_function, division
from sympy.polys.galoistools import (
gf_from_int_poly, gf_to_int_poly,
gf_lshift, gf_add_mul, gf_mul,
gf_div, gf_rem,
gf_gcdex,
gf_sqf_p,
gf_factor_sqf, gf_factor)
from sympy.polys.densebasic import (
dup_LC, dmp_LC, dmp_ground_LC,
dup_TC,
dup_convert, dmp_convert,
dup_degree, dmp_degree,
dmp_degree_in, dmp_degree_list,
dmp_from_dict,
dmp_zero_p,
dmp_one,
dmp_nest, dmp_raise,
dup_strip,
dmp_ground,
dup_inflate,
dmp_exclude, dmp_include,
dmp_inject, dmp_eject,
dup_terms_gcd, dmp_terms_gcd)
from sympy.polys.densearith import (
dup_neg, dmp_neg,
dup_add, dmp_add,
dup_sub, dmp_sub,
dup_mul, dmp_mul,
dup_sqr,
dmp_pow,
dup_div, dmp_div,
dup_quo, dmp_quo,
dmp_expand,
dmp_add_mul,
dup_sub_mul, dmp_sub_mul,
dup_lshift,
dup_max_norm, dmp_max_norm,
dup_l1_norm,
dup_mul_ground, dmp_mul_ground,
dup_quo_ground, dmp_quo_ground)
from sympy.polys.densetools import (
dup_clear_denoms, dmp_clear_denoms,
dup_trunc, dmp_ground_trunc,
dup_content,
dup_monic, dmp_ground_monic,
dup_primitive, dmp_ground_primitive,
dmp_eval_tail,
dmp_eval_in, dmp_diff_eval_in,
dmp_compose,
dup_shift, dup_mirror)
from sympy.polys.euclidtools import (
dmp_primitive,
dup_inner_gcd, dmp_inner_gcd)
from sympy.polys.sqfreetools import (
dup_sqf_p,
dup_sqf_norm, dmp_sqf_norm,
dup_sqf_part, dmp_sqf_part)
from sympy.polys.polyutils import _sort_factors
from sympy.polys.polyconfig import query
from sympy.polys.polyerrors import (
ExtraneousFactors, DomainError, CoercionFailed, EvaluationFailed)
from sympy.ntheory import nextprime, isprime, factorint
from sympy.utilities import subsets
from math import ceil as _ceil, log as _log
def dup_trial_division(f, factors, K):
"""
Determine multiplicities of factors for a univariate polynomial
using trial division.
"""
result = []
for factor in factors:
k = 0
while True:
q, r = dup_div(f, factor, K)
if not r:
f, k = q, k + 1
else:
break
result.append((factor, k))
return _sort_factors(result)
def dmp_trial_division(f, factors, u, K):
"""
Determine multiplicities of factors for a multivariate polynomial
using trial division.
"""
result = []
for factor in factors:
k = 0
while True:
q, r = dmp_div(f, factor, u, K)
if dmp_zero_p(r, u):
f, k = q, k + 1
else:
break
result.append((factor, k))
return _sort_factors(result)
def dup_zz_mignotte_bound(f, K):
"""
The Knuth-Cohen variant of Mignotte bound for
univariate polynomials in `K[x]`.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x = ring("x", ZZ)
>>> f = x**3 + 14*x**2 + 56*x + 64
>>> R.dup_zz_mignotte_bound(f)
152
By checking `factor(f)` we can see that max coeff is 8
Also consider a case that `f` is irreducible for example `f = 2*x**2 + 3*x + 4`
To avoid a bug for these cases, we return the bound plus the max coefficient of `f`
>>> f = 2*x**2 + 3*x + 4
>>> R.dup_zz_mignotte_bound(f)
6
Lastly,To see the difference between the new and the old Mignotte bound
consider the irreducible polynomial::
>>> f = 87*x**7 + 4*x**6 + 80*x**5 + 17*x**4 + 9*x**3 + 12*x**2 + 49*x + 26
>>> R.dup_zz_mignotte_bound(f)
744
The new Mignotte bound is 744 whereas the old one (SymPy 1.5.1) is 1937664.
References
==========
..[1] [Abbott2013]_
"""
from sympy import binomial
d = dup_degree(f)
delta = _ceil(d / 2)
delta2 = _ceil(delta / 2)
# euclidean-norm
eucl_norm = K.sqrt( sum( [cf**2 for cf in f] ) )
# biggest values of binomial coefficients (p. 538 of reference)
t1 = binomial(delta - 1, delta2)
t2 = binomial(delta - 1, delta2 - 1)
lc = K.abs(dup_LC(f, K)) # leading coefficient
bound = t1 * eucl_norm + t2 * lc # (p. 538 of reference)
bound += dup_max_norm(f, K) # add max coeff for irreducible polys
bound = _ceil(bound / 2) * 2 # round up to even integer
return bound
def dmp_zz_mignotte_bound(f, u, K):
"""Mignotte bound for multivariate polynomials in `K[X]`. """
a = dmp_max_norm(f, u, K)
b = abs(dmp_ground_LC(f, u, K))
n = sum(dmp_degree_list(f, u))
return K.sqrt(K(n + 1))*2**n*a*b
def dup_zz_hensel_step(m, f, g, h, s, t, K):
"""
One step in Hensel lifting in `Z[x]`.
Given positive integer `m` and `Z[x]` polynomials `f`, `g`, `h`, `s`
and `t` such that::
f = g*h (mod m)
s*g + t*h = 1 (mod m)
lc(f) is not a zero divisor (mod m)
lc(h) = 1
deg(f) = deg(g) + deg(h)
deg(s) < deg(h)
deg(t) < deg(g)
returns polynomials `G`, `H`, `S` and `T`, such that::
f = G*H (mod m**2)
S*G + T*H = 1 (mod m**2)
References
==========
.. [1] [Gathen99]_
"""
M = m**2
e = dup_sub_mul(f, g, h, K)
e = dup_trunc(e, M, K)
q, r = dup_div(dup_mul(s, e, K), h, K)
q = dup_trunc(q, M, K)
r = dup_trunc(r, M, K)
u = dup_add(dup_mul(t, e, K), dup_mul(q, g, K), K)
G = dup_trunc(dup_add(g, u, K), M, K)
H = dup_trunc(dup_add(h, r, K), M, K)
u = dup_add(dup_mul(s, G, K), dup_mul(t, H, K), K)
b = dup_trunc(dup_sub(u, [K.one], K), M, K)
c, d = dup_div(dup_mul(s, b, K), H, K)
c = dup_trunc(c, M, K)
d = dup_trunc(d, M, K)
u = dup_add(dup_mul(t, b, K), dup_mul(c, G, K), K)
S = dup_trunc(dup_sub(s, d, K), M, K)
T = dup_trunc(dup_sub(t, u, K), M, K)
return G, H, S, T
def dup_zz_hensel_lift(p, f, f_list, l, K):
"""
Multifactor Hensel lifting in `Z[x]`.
Given a prime `p`, polynomial `f` over `Z[x]` such that `lc(f)`
is a unit modulo `p`, monic pair-wise coprime polynomials `f_i`
over `Z[x]` satisfying::
f = lc(f) f_1 ... f_r (mod p)
and a positive integer `l`, returns a list of monic polynomials
`F_1`, `F_2`, ..., `F_r` satisfying::
f = lc(f) F_1 ... F_r (mod p**l)
F_i = f_i (mod p), i = 1..r
References
==========
.. [1] [Gathen99]_
"""
r = len(f_list)
lc = dup_LC(f, K)
if r == 1:
F = dup_mul_ground(f, K.gcdex(lc, p**l)[0], K)
return [ dup_trunc(F, p**l, K) ]
m = p
k = r // 2
d = int(_ceil(_log(l, 2)))
g = gf_from_int_poly([lc], p)
for f_i in f_list[:k]:
g = gf_mul(g, gf_from_int_poly(f_i, p), p, K)
h = gf_from_int_poly(f_list[k], p)
for f_i in f_list[k + 1:]:
h = gf_mul(h, gf_from_int_poly(f_i, p), p, K)
s, t, _ = gf_gcdex(g, h, p, K)
g = gf_to_int_poly(g, p)
h = gf_to_int_poly(h, p)
s = gf_to_int_poly(s, p)
t = gf_to_int_poly(t, p)
for _ in range(1, d + 1):
(g, h, s, t), m = dup_zz_hensel_step(m, f, g, h, s, t, K), m**2
return dup_zz_hensel_lift(p, g, f_list[:k], l, K) \
+ dup_zz_hensel_lift(p, h, f_list[k:], l, K)
def _test_pl(fc, q, pl):
if q > pl // 2:
q = q - pl
if not q:
return True
return fc % q == 0
def dup_zz_zassenhaus(f, K):
"""Factor primitive square-free polynomials in `Z[x]`. """
n = dup_degree(f)
if n == 1:
return [f]
fc = f[-1]
A = dup_max_norm(f, K)
b = dup_LC(f, K)
B = int(abs(K.sqrt(K(n + 1))*2**n*A*b))
C = int((n + 1)**(2*n)*A**(2*n - 1))
gamma = int(_ceil(2*_log(C, 2)))
bound = int(2*gamma*_log(gamma))
a = []
# choose a prime number `p` such that `f` be square free in Z_p
# if there are many factors in Z_p, choose among a few different `p`
# the one with fewer factors
for px in range(3, bound + 1):
if not isprime(px) or b % px == 0:
continue
px = K.convert(px)
F = gf_from_int_poly(f, px)
if not gf_sqf_p(F, px, K):
continue
fsqfx = gf_factor_sqf(F, px, K)[1]
a.append((px, fsqfx))
if len(fsqfx) < 15 or len(a) > 4:
break
p, fsqf = min(a, key=lambda x: len(x[1]))
l = int(_ceil(_log(2*B + 1, p)))
modular = [gf_to_int_poly(ff, p) for ff in fsqf]
g = dup_zz_hensel_lift(p, f, modular, l, K)
sorted_T = range(len(g))
T = set(sorted_T)
factors, s = [], 1
pl = p**l
while 2*s <= len(T):
for S in subsets(sorted_T, s):
# lift the constant coefficient of the product `G` of the factors
# in the subset `S`; if it is does not divide `fc`, `G` does
# not divide the input polynomial
if b == 1:
q = 1
for i in S:
q = q*g[i][-1]
q = q % pl
if not _test_pl(fc, q, pl):
continue
else:
G = [b]
for i in S:
G = dup_mul(G, g[i], K)
G = dup_trunc(G, pl, K)
G = dup_primitive(G, K)[1]
q = G[-1]
if q and fc % q != 0:
continue
H = [b]
S = set(S)
T_S = T - S
if b == 1:
G = [b]
for i in S:
G = dup_mul(G, g[i], K)
G = dup_trunc(G, pl, K)
for i in T_S:
H = dup_mul(H, g[i], K)
H = dup_trunc(H, pl, K)
G_norm = dup_l1_norm(G, K)
H_norm = dup_l1_norm(H, K)
if G_norm*H_norm <= B:
T = T_S
sorted_T = [i for i in sorted_T if i not in S]
G = dup_primitive(G, K)[1]
f = dup_primitive(H, K)[1]
factors.append(G)
b = dup_LC(f, K)
break
else:
s += 1
return factors + [f]
def dup_zz_irreducible_p(f, K):
"""Test irreducibility using Eisenstein's criterion. """
lc = dup_LC(f, K)
tc = dup_TC(f, K)
e_fc = dup_content(f[1:], K)
if e_fc:
e_ff = factorint(int(e_fc))
for p in e_ff.keys():
if (lc % p) and (tc % p**2):
return True
def dup_cyclotomic_p(f, K, irreducible=False):
"""
Efficiently test if ``f`` is a cyclotomic polynomial.
Examples
========
>>> from sympy.polys import ring, ZZ
>>> R, x = ring("x", ZZ)
>>> f = x**16 + x**14 - x**10 + x**8 - x**6 + x**2 + 1
>>> R.dup_cyclotomic_p(f)
False
>>> g = x**16 + x**14 - x**10 - x**8 - x**6 + x**2 + 1
>>> R.dup_cyclotomic_p(g)
True
"""
if K.is_QQ:
try:
K0, K = K, K.get_ring()
f = dup_convert(f, K0, K)
except CoercionFailed:
return False
elif not K.is_ZZ:
return False
lc = dup_LC(f, K)
tc = dup_TC(f, K)
if lc != 1 or (tc != -1 and tc != 1):
return False
if not irreducible:
coeff, factors = dup_factor_list(f, K)
if coeff != K.one or factors != [(f, 1)]:
return False
n = dup_degree(f)
g, h = [], []
for i in range(n, -1, -2):
g.insert(0, f[i])
for i in range(n - 1, -1, -2):
h.insert(0, f[i])
g = dup_sqr(dup_strip(g), K)
h = dup_sqr(dup_strip(h), K)
F = dup_sub(g, dup_lshift(h, 1, K), K)
if K.is_negative(dup_LC(F, K)):
F = dup_neg(F, K)
if F == f:
return True
g = dup_mirror(f, K)
if K.is_negative(dup_LC(g, K)):
g = dup_neg(g, K)
if F == g and dup_cyclotomic_p(g, K):
return True
G = dup_sqf_part(F, K)
if dup_sqr(G, K) == F and dup_cyclotomic_p(G, K):
return True
return False
def dup_zz_cyclotomic_poly(n, K):
"""Efficiently generate n-th cyclotomic polynomial. """
h = [K.one, -K.one]
for p, k in factorint(n).items():
h = dup_quo(dup_inflate(h, p, K), h, K)
h = dup_inflate(h, p**(k - 1), K)
return h
def _dup_cyclotomic_decompose(n, K):
H = [[K.one, -K.one]]
for p, k in factorint(n).items():
Q = [ dup_quo(dup_inflate(h, p, K), h, K) for h in H ]
H.extend(Q)
for i in range(1, k):
Q = [ dup_inflate(q, p, K) for q in Q ]
H.extend(Q)
return H
def dup_zz_cyclotomic_factor(f, K):
"""
Efficiently factor polynomials `x**n - 1` and `x**n + 1` in `Z[x]`.
Given a univariate polynomial `f` in `Z[x]` returns a list of factors
of `f`, provided that `f` is in the form `x**n - 1` or `x**n + 1` for
`n >= 1`. Otherwise returns None.
Factorization is performed using cyclotomic decomposition of `f`,
which makes this method much faster that any other direct factorization
approach (e.g. Zassenhaus's).
References
==========
.. [1] [Weisstein09]_
"""
lc_f, tc_f = dup_LC(f, K), dup_TC(f, K)
if dup_degree(f) <= 0:
return None
if lc_f != 1 or tc_f not in [-1, 1]:
return None
if any(bool(cf) for cf in f[1:-1]):
return None
n = dup_degree(f)
F = _dup_cyclotomic_decompose(n, K)
if not K.is_one(tc_f):
return F
else:
H = []
for h in _dup_cyclotomic_decompose(2*n, K):
if h not in F:
H.append(h)
return H
def dup_zz_factor_sqf(f, K):
"""Factor square-free (non-primitive) polynomials in `Z[x]`. """
cont, g = dup_primitive(f, K)
n = dup_degree(g)
if dup_LC(g, K) < 0:
cont, g = -cont, dup_neg(g, K)
if n <= 0:
return cont, []
elif n == 1:
return cont, [g]
if query('USE_IRREDUCIBLE_IN_FACTOR'):
if dup_zz_irreducible_p(g, K):
return cont, [g]
factors = None
if query('USE_CYCLOTOMIC_FACTOR'):
factors = dup_zz_cyclotomic_factor(g, K)
if factors is None:
factors = dup_zz_zassenhaus(g, K)
return cont, _sort_factors(factors, multiple=False)
def dup_zz_factor(f, K):
"""
Factor (non square-free) polynomials in `Z[x]`.
Given a univariate polynomial `f` in `Z[x]` computes its complete
factorization `f_1, ..., f_n` into irreducibles over integers::
f = content(f) f_1**k_1 ... f_n**k_n
The factorization is computed by reducing the input polynomial
into a primitive square-free polynomial and factoring it using
Zassenhaus algorithm. Trial division is used to recover the
multiplicities of factors.
The result is returned as a tuple consisting of::
(content(f), [(f_1, k_1), ..., (f_n, k_n))
Examples
========
Consider the polynomial `f = 2*x**4 - 2`::
>>> from sympy.polys import ring, ZZ
>>> R, x = ring("x", ZZ)
>>> R.dup_zz_factor(2*x**4 - 2)
(2, [(x - 1, 1), (x + 1, 1), (x**2 + 1, 1)])
In result we got the following factorization::
f = 2 (x - 1) (x + 1) (x**2 + 1)
Note that this is a complete factorization over integers,
however over Gaussian integers we can factor the last term.
By default, polynomials `x**n - 1` and `x**n + 1` are factored
using cyclotomic decomposition to speedup computations. To
disable this behaviour set cyclotomic=False.
References
==========
.. [1] [Gathen99]_
"""
cont, g = dup_primitive(f, K)
n = dup_degree(g)
if dup_LC(g, K) < 0:
cont, g = -cont, dup_neg(g, K)
if n <= 0:
return cont, []
elif n == 1:
return cont, [(g, 1)]
if query('USE_IRREDUCIBLE_IN_FACTOR'):
if dup_zz_irreducible_p(g, K):
return cont, [(g, 1)]
g = dup_sqf_part(g, K)
H = None
if query('USE_CYCLOTOMIC_FACTOR'):
H = dup_zz_cyclotomic_factor(g, K)
if H is None:
H = dup_zz_zassenhaus(g, K)
factors = dup_trial_division(f, H, K)
return cont, factors
def dmp_zz_wang_non_divisors(E, cs, ct, K):
"""Wang/EEZ: Compute a set of valid divisors. """
result = [ cs*ct ]
for q in E:
q = abs(q)
for r in reversed(result):
while r != 1:
r = K.gcd(r, q)
q = q // r
if K.is_one(q):
return None
result.append(q)
return result[1:]
def dmp_zz_wang_test_points(f, T, ct, A, u, K):
"""Wang/EEZ: Test evaluation points for suitability. """
if not dmp_eval_tail(dmp_LC(f, K), A, u - 1, K):
raise EvaluationFailed('no luck')
g = dmp_eval_tail(f, A, u, K)
if not dup_sqf_p(g, K):
raise EvaluationFailed('no luck')
c, h = dup_primitive(g, K)
if K.is_negative(dup_LC(h, K)):
c, h = -c, dup_neg(h, K)
v = u - 1
E = [ dmp_eval_tail(t, A, v, K) for t, _ in T ]
D = dmp_zz_wang_non_divisors(E, c, ct, K)
if D is not None:
return c, h, E
else:
raise EvaluationFailed('no luck')
def dmp_zz_wang_lead_coeffs(f, T, cs, E, H, A, u, K):
"""Wang/EEZ: Compute correct leading coefficients. """
C, J, v = [], [0]*len(E), u - 1
for h in H:
c = dmp_one(v, K)
d = dup_LC(h, K)*cs
for i in reversed(range(len(E))):
k, e, (t, _) = 0, E[i], T[i]
while not (d % e):
d, k = d//e, k + 1
if k != 0:
c, J[i] = dmp_mul(c, dmp_pow(t, k, v, K), v, K), 1
C.append(c)
if any(not j for j in J):
raise ExtraneousFactors # pragma: no cover
CC, HH = [], []
for c, h in zip(C, H):
d = dmp_eval_tail(c, A, v, K)
lc = dup_LC(h, K)
if K.is_one(cs):
cc = lc//d
else:
g = K.gcd(lc, d)
d, cc = d//g, lc//g
h, cs = dup_mul_ground(h, d, K), cs//d
c = dmp_mul_ground(c, cc, v, K)
CC.append(c)
HH.append(h)
if K.is_one(cs):
return f, HH, CC
CCC, HHH = [], []
for c, h in zip(CC, HH):
CCC.append(dmp_mul_ground(c, cs, v, K))
HHH.append(dmp_mul_ground(h, cs, 0, K))
f = dmp_mul_ground(f, cs**(len(H) - 1), u, K)
return f, HHH, CCC
def dup_zz_diophantine(F, m, p, K):
"""Wang/EEZ: Solve univariate Diophantine equations. """
if len(F) == 2:
a, b = F
f = gf_from_int_poly(a, p)
g = gf_from_int_poly(b, p)
s, t, G = gf_gcdex(g, f, p, K)
s = gf_lshift(s, m, K)
t = gf_lshift(t, m, K)
q, s = gf_div(s, f, p, K)
t = gf_add_mul(t, q, g, p, K)
s = gf_to_int_poly(s, p)
t = gf_to_int_poly(t, p)
result = [s, t]
else:
G = [F[-1]]
for f in reversed(F[1:-1]):
G.insert(0, dup_mul(f, G[0], K))
S, T = [], [[1]]
for f, g in zip(F, G):
t, s = dmp_zz_diophantine([g, f], T[-1], [], 0, p, 1, K)
T.append(t)
S.append(s)
result, S = [], S + [T[-1]]
for s, f in zip(S, F):
s = gf_from_int_poly(s, p)
f = gf_from_int_poly(f, p)
r = gf_rem(gf_lshift(s, m, K), f, p, K)
s = gf_to_int_poly(r, p)
result.append(s)
return result
def dmp_zz_diophantine(F, c, A, d, p, u, K):
"""Wang/EEZ: Solve multivariate Diophantine equations. """
if not A:
S = [ [] for _ in F ]
n = dup_degree(c)
for i, coeff in enumerate(c):
if not coeff:
continue
T = dup_zz_diophantine(F, n - i, p, K)
for j, (s, t) in enumerate(zip(S, T)):
t = dup_mul_ground(t, coeff, K)
S[j] = dup_trunc(dup_add(s, t, K), p, K)
else:
n = len(A)
e = dmp_expand(F, u, K)
a, A = A[-1], A[:-1]
B, G = [], []
for f in F:
B.append(dmp_quo(e, f, u, K))
G.append(dmp_eval_in(f, a, n, u, K))
C = dmp_eval_in(c, a, n, u, K)
v = u - 1
S = dmp_zz_diophantine(G, C, A, d, p, v, K)
S = [ dmp_raise(s, 1, v, K) for s in S ]
for s, b in zip(S, B):
c = dmp_sub_mul(c, s, b, u, K)
c = dmp_ground_trunc(c, p, u, K)
m = dmp_nest([K.one, -a], n, K)
M = dmp_one(n, K)
for k in K.map(range(0, d)):
if dmp_zero_p(c, u):
break
M = dmp_mul(M, m, u, K)
C = dmp_diff_eval_in(c, k + 1, a, n, u, K)
if not dmp_zero_p(C, v):
C = dmp_quo_ground(C, K.factorial(k + 1), v, K)
T = dmp_zz_diophantine(G, C, A, d, p, v, K)
for i, t in enumerate(T):
T[i] = dmp_mul(dmp_raise(t, 1, v, K), M, u, K)
for i, (s, t) in enumerate(zip(S, T)):
S[i] = dmp_add(s, t, u, K)
for t, b in zip(T, B):
c = dmp_sub_mul(c, t, b, u, K)
c = dmp_ground_trunc(c, p, u, K)
S = [ dmp_ground_trunc(s, p, u, K) for s in S ]
return S
def dmp_zz_wang_hensel_lifting(f, H, LC, A, p, u, K):
"""Wang/EEZ: Parallel Hensel lifting algorithm. """
S, n, v = [f], len(A), u - 1
H = list(H)
for i, a in enumerate(reversed(A[1:])):
s = dmp_eval_in(S[0], a, n - i, u - i, K)
S.insert(0, dmp_ground_trunc(s, p, v - i, K))
d = max(dmp_degree_list(f, u)[1:])
for j, s, a in zip(range(2, n + 2), S, A):
G, w = list(H), j - 1
I, J = A[:j - 2], A[j - 1:]
for i, (h, lc) in enumerate(zip(H, LC)):
lc = dmp_ground_trunc(dmp_eval_tail(lc, J, v, K), p, w - 1, K)
H[i] = [lc] + dmp_raise(h[1:], 1, w - 1, K)
m = dmp_nest([K.one, -a], w, K)
M = dmp_one(w, K)
c = dmp_sub(s, dmp_expand(H, w, K), w, K)
dj = dmp_degree_in(s, w, w)
for k in K.map(range(0, dj)):
if dmp_zero_p(c, w):
break
M = dmp_mul(M, m, w, K)
C = dmp_diff_eval_in(c, k + 1, a, w, w, K)
if not dmp_zero_p(C, w - 1):
C = dmp_quo_ground(C, K.factorial(k + 1), w - 1, K)
T = dmp_zz_diophantine(G, C, I, d, p, w - 1, K)
for i, (h, t) in enumerate(zip(H, T)):
h = dmp_add_mul(h, dmp_raise(t, 1, w - 1, K), M, w, K)
H[i] = dmp_ground_trunc(h, p, w, K)
h = dmp_sub(s, dmp_expand(H, w, K), w, K)
c = dmp_ground_trunc(h, p, w, K)
if dmp_expand(H, u, K) != f:
raise ExtraneousFactors # pragma: no cover
else:
return H
def dmp_zz_wang(f, u, K, mod=None, seed=None):
"""
Factor primitive square-free polynomials in `Z[X]`.
Given a multivariate polynomial `f` in `Z[x_1,...,x_n]`, which is
primitive and square-free in `x_1`, computes factorization of `f` into
irreducibles over integers.
The procedure is based on Wang's Enhanced Extended Zassenhaus
algorithm. The algorithm works by viewing `f` as a univariate polynomial
in `Z[x_2,...,x_n][x_1]`, for which an evaluation mapping is computed::
x_2 -> a_2, ..., x_n -> a_n
where `a_i`, for `i = 2, ..., n`, are carefully chosen integers. The
mapping is used to transform `f` into a univariate polynomial in `Z[x_1]`,
which can be factored efficiently using Zassenhaus algorithm. The last
step is to lift univariate factors to obtain true multivariate
factors. For this purpose a parallel Hensel lifting procedure is used.
The parameter ``seed`` is passed to _randint and can be used to seed randint
(when an integer) or (for testing purposes) can be a sequence of numbers.
References
==========
.. [1] [Wang78]_
.. [2] [Geddes92]_
"""
from sympy.testing.randtest import _randint
randint = _randint(seed)
ct, T = dmp_zz_factor(dmp_LC(f, K), u - 1, K)
b = dmp_zz_mignotte_bound(f, u, K)
p = K(nextprime(b))
if mod is None:
if u == 1:
mod = 2
else:
mod = 1
history, configs, A, r = set([]), [], [K.zero]*u, None
try:
cs, s, E = dmp_zz_wang_test_points(f, T, ct, A, u, K)
_, H = dup_zz_factor_sqf(s, K)
r = len(H)
if r == 1:
return [f]
configs = [(s, cs, E, H, A)]
except EvaluationFailed:
pass
eez_num_configs = query('EEZ_NUMBER_OF_CONFIGS')
eez_num_tries = query('EEZ_NUMBER_OF_TRIES')
eez_mod_step = query('EEZ_MODULUS_STEP')
while len(configs) < eez_num_configs:
for _ in range(eez_num_tries):
A = [ K(randint(-mod, mod)) for _ in range(u) ]
if tuple(A) not in history:
history.add(tuple(A))
else:
continue
try:
cs, s, E = dmp_zz_wang_test_points(f, T, ct, A, u, K)
except EvaluationFailed:
continue
_, H = dup_zz_factor_sqf(s, K)
rr = len(H)
if r is not None:
if rr != r: # pragma: no cover
if rr < r:
configs, r = [], rr
else:
continue
else:
r = rr
if r == 1:
return [f]
configs.append((s, cs, E, H, A))
if len(configs) == eez_num_configs:
break
else:
mod += eez_mod_step
s_norm, s_arg, i = None, 0, 0
for s, _, _, _, _ in configs:
_s_norm = dup_max_norm(s, K)
if s_norm is not None:
if _s_norm < s_norm:
s_norm = _s_norm
s_arg = i
else:
s_norm = _s_norm
i += 1
_, cs, E, H, A = configs[s_arg]
orig_f = f
try:
f, H, LC = dmp_zz_wang_lead_coeffs(f, T, cs, E, H, A, u, K)
factors = dmp_zz_wang_hensel_lifting(f, H, LC, A, p, u, K)
except ExtraneousFactors: # pragma: no cover
if query('EEZ_RESTART_IF_NEEDED'):
return dmp_zz_wang(orig_f, u, K, mod + 1)
else:
raise ExtraneousFactors(
"we need to restart algorithm with better parameters")
result = []
for f in factors:
_, f = dmp_ground_primitive(f, u, K)
if K.is_negative(dmp_ground_LC(f, u, K)):
f = dmp_neg(f, u, K)
result.append(f)
return result
def dmp_zz_factor(f, u, K):
"""
Factor (non square-free) polynomials in `Z[X]`.
Given a multivariate polynomial `f` in `Z[x]` computes its complete
factorization `f_1, ..., f_n` into irreducibles over integers::
f = content(f) f_1**k_1 ... f_n**k_n
The factorization is computed by reducing the input polynomial
into a primitive square-free polynomial and factoring it using
Enhanced Extended Zassenhaus (EEZ) algorithm. Trial division
is used to recover the multiplicities of factors.
The result is returned as a tuple consisting of::
(content(f), [(f_1, k_1), ..., (f_n, k_n))
Consider polynomial `f = 2*(x**2 - y**2)`::
>>> from sympy.polys import ring, ZZ
>>> R, x,y = ring("x,y", ZZ)
>>> R.dmp_zz_factor(2*x**2 - 2*y**2)
(2, [(x - y, 1), (x + y, 1)])
In result we got the following factorization::
f = 2 (x - y) (x + y)
References
==========
.. [1] [Gathen99]_
"""
if not u:
return dup_zz_factor(f, K)
if dmp_zero_p(f, u):
return K.zero, []
cont, g = dmp_ground_primitive(f, u, K)
if dmp_ground_LC(g, u, K) < 0:
cont, g = -cont, dmp_neg(g, u, K)
if all(d <= 0 for d in dmp_degree_list(g, u)):
return cont, []
G, g = dmp_primitive(g, u, K)
factors = []
if dmp_degree(g, u) > 0:
g = dmp_sqf_part(g, u, K)
H = dmp_zz_wang(g, u, K)
factors = dmp_trial_division(f, H, u, K)
for g, k in dmp_zz_factor(G, u - 1, K)[1]:
factors.insert(0, ([g], k))
return cont, _sort_factors(factors)
def dup_qq_i_factor(f, K0):
"""Factor univariate polynomials into irreducibles in `QQ_I[x]`. """
# Factor in QQ<I>
K1 = K0.as_AlgebraicField()
f = dup_convert(f, K0, K1)
coeff, factors = dup_factor_list(f, K1)
factors = [(dup_convert(fac, K1, K0), i) for fac, i in factors]
coeff = K0.convert(coeff, K1)
return coeff, factors
def dup_zz_i_factor(f, K0):
"""Factor univariate polynomials into irreducibles in `ZZ_I[x]`. """
# First factor in QQ_I
K1 = K0.get_field()
f = dup_convert(f, K0, K1)
coeff, factors = dup_qq_i_factor(f, K1)
new_factors = []
for fac, i in factors:
# Extract content
fac_denom, fac_num = dup_clear_denoms(fac, K1)
fac_num_ZZ_I = dup_convert(fac_num, K1, K0)
content, fac_prim = dmp_ground_primitive(fac_num_ZZ_I, 0, K1)
coeff = (coeff * content ** i) // fac_denom ** i
new_factors.append((fac_prim, i))
factors = new_factors
coeff = K0.convert(coeff, K1)
return coeff, factors
def dmp_qq_i_factor(f, u, K0):
"""Factor multivariate polynomials into irreducibles in `QQ_I[X]`. """
# Factor in QQ<I>
K1 = K0.as_AlgebraicField()
f = dmp_convert(f, u, K0, K1)
coeff, factors = dmp_factor_list(f, u, K1)
factors = [(dmp_convert(fac, u, K1, K0), i) for fac, i in factors]
coeff = K0.convert(coeff, K1)
return coeff, factors
def dmp_zz_i_factor(f, u, K0):
"""Factor multivariate polynomials into irreducibles in `ZZ_I[X]`. """
# First factor in QQ_I
K1 = K0.get_field()
f = dmp_convert(f, u, K0, K1)
coeff, factors = dmp_qq_i_factor(f, u, K1)
new_factors = []
for fac, i in factors:
# Extract content
fac_denom, fac_num = dmp_clear_denoms(fac, u, K1)
fac_num_ZZ_I = dmp_convert(fac_num, u, K1, K0)
content, fac_prim = dmp_ground_primitive(fac_num_ZZ_I, u, K1)
coeff = (coeff * content ** i) // fac_denom ** i
new_factors.append((fac_prim, i))
factors = new_factors
coeff = K0.convert(coeff, K1)
return coeff, factors
def dup_ext_factor(f, K):
"""Factor univariate polynomials over algebraic number fields. """
n, lc = dup_degree(f), dup_LC(f, K)
f = dup_monic(f, K)
if n <= 0:
return lc, []
if n == 1:
return lc, [(f, 1)]
f, F = dup_sqf_part(f, K), f
s, g, r = dup_sqf_norm(f, K)
factors = dup_factor_list_include(r, K.dom)
if len(factors) == 1:
return lc, [(f, n//dup_degree(f))]
H = s*K.unit
for i, (factor, _) in enumerate(factors):
h = dup_convert(factor, K.dom, K)
h, _, g = dup_inner_gcd(h, g, K)
h = dup_shift(h, H, K)
factors[i] = h
factors = dup_trial_division(F, factors, K)
return lc, factors
def dmp_ext_factor(f, u, K):
"""Factor multivariate polynomials over algebraic number fields. """
if not u:
return dup_ext_factor(f, K)
lc = dmp_ground_LC(f, u, K)
f = dmp_ground_monic(f, u, K)
if all(d <= 0 for d in dmp_degree_list(f, u)):
return lc, []
f, F = dmp_sqf_part(f, u, K), f
s, g, r = dmp_sqf_norm(f, u, K)
factors = dmp_factor_list_include(r, u, K.dom)
if len(factors) == 1:
factors = [f]
else:
H = dmp_raise([K.one, s*K.unit], u, 0, K)
for i, (factor, _) in enumerate(factors):
h = dmp_convert(factor, u, K.dom, K)
h, _, g = dmp_inner_gcd(h, g, u, K)
h = dmp_compose(h, H, u, K)
factors[i] = h
return lc, dmp_trial_division(F, factors, u, K)
def dup_gf_factor(f, K):
"""Factor univariate polynomials over finite fields. """
f = dup_convert(f, K, K.dom)
coeff, factors = gf_factor(f, K.mod, K.dom)
for i, (f, k) in enumerate(factors):
factors[i] = (dup_convert(f, K.dom, K), k)
return K.convert(coeff, K.dom), factors
def dmp_gf_factor(f, u, K):
"""Factor multivariate polynomials over finite fields. """
raise NotImplementedError('multivariate polynomials over finite fields')
def dup_factor_list(f, K0):
"""Factor univariate polynomials into irreducibles in `K[x]`. """
j, f = dup_terms_gcd(f, K0)
cont, f = dup_primitive(f, K0)
if K0.is_FiniteField:
coeff, factors = dup_gf_factor(f, K0)
elif K0.is_Algebraic:
coeff, factors = dup_ext_factor(f, K0)
elif K0.is_GaussianRing:
coeff, factors = dup_zz_i_factor(f, K0)
elif K0.is_GaussianField:
coeff, factors = dup_qq_i_factor(f, K0)
else:
if not K0.is_Exact:
K0_inexact, K0 = K0, K0.get_exact()
f = dup_convert(f, K0_inexact, K0)
else:
K0_inexact = None
if K0.is_Field:
K = K0.get_ring()
denom, f = dup_clear_denoms(f, K0, K)
f = dup_convert(f, K0, K)
else:
K = K0
if K.is_ZZ:
coeff, factors = dup_zz_factor(f, K)
elif K.is_Poly:
f, u = dmp_inject(f, 0, K)
coeff, factors = dmp_factor_list(f, u, K.dom)
for i, (f, k) in enumerate(factors):
factors[i] = (dmp_eject(f, u, K), k)
coeff = K.convert(coeff, K.dom)
else: # pragma: no cover
raise DomainError('factorization not supported over %s' % K0)
if K0.is_Field:
for i, (f, k) in enumerate(factors):
factors[i] = (dup_convert(f, K, K0), k)
coeff = K0.convert(coeff, K)
coeff = K0.quo(coeff, denom)
if K0_inexact:
for i, (f, k) in enumerate(factors):
max_norm = dup_max_norm(f, K0)
f = dup_quo_ground(f, max_norm, K0)
f = dup_convert(f, K0, K0_inexact)
factors[i] = (f, k)
coeff = K0.mul(coeff, K0.pow(max_norm, k))
coeff = K0_inexact.convert(coeff, K0)
K0 = K0_inexact
if j:
factors.insert(0, ([K0.one, K0.zero], j))
return coeff*cont, _sort_factors(factors)
def dup_factor_list_include(f, K):
"""Factor univariate polynomials into irreducibles in `K[x]`. """
coeff, factors = dup_factor_list(f, K)
if not factors:
return [(dup_strip([coeff]), 1)]
else:
g = dup_mul_ground(factors[0][0], coeff, K)
return [(g, factors[0][1])] + factors[1:]
def dmp_factor_list(f, u, K0):
"""Factor multivariate polynomials into irreducibles in `K[X]`. """
if not u:
return dup_factor_list(f, K0)
J, f = dmp_terms_gcd(f, u, K0)
cont, f = dmp_ground_primitive(f, u, K0)
if K0.is_FiniteField: # pragma: no cover
coeff, factors = dmp_gf_factor(f, u, K0)
elif K0.is_Algebraic:
coeff, factors = dmp_ext_factor(f, u, K0)
elif K0.is_GaussianRing:
coeff, factors = dmp_zz_i_factor(f, u, K0)
elif K0.is_GaussianField:
coeff, factors = dmp_qq_i_factor(f, u, K0)
else:
if not K0.is_Exact:
K0_inexact, K0 = K0, K0.get_exact()
f = dmp_convert(f, u, K0_inexact, K0)
else:
K0_inexact = None
if K0.is_Field:
K = K0.get_ring()
denom, f = dmp_clear_denoms(f, u, K0, K)
f = dmp_convert(f, u, K0, K)
else:
K = K0
if K.is_ZZ:
levels, f, v = dmp_exclude(f, u, K)
coeff, factors = dmp_zz_factor(f, v, K)
for i, (f, k) in enumerate(factors):
factors[i] = (dmp_include(f, levels, v, K), k)
elif K.is_Poly:
f, v = dmp_inject(f, u, K)
coeff, factors = dmp_factor_list(f, v, K.dom)
for i, (f, k) in enumerate(factors):
factors[i] = (dmp_eject(f, v, K), k)
coeff = K.convert(coeff, K.dom)
else: # pragma: no cover
raise DomainError('factorization not supported over %s' % K0)
if K0.is_Field:
for i, (f, k) in enumerate(factors):
factors[i] = (dmp_convert(f, u, K, K0), k)
coeff = K0.convert(coeff, K)
coeff = K0.quo(coeff, denom)
if K0_inexact:
for i, (f, k) in enumerate(factors):
max_norm = dmp_max_norm(f, u, K0)
f = dmp_quo_ground(f, max_norm, u, K0)
f = dmp_convert(f, u, K0, K0_inexact)
factors[i] = (f, k)
coeff = K0.mul(coeff, K0.pow(max_norm, k))
coeff = K0_inexact.convert(coeff, K0)
K0 = K0_inexact
for i, j in enumerate(reversed(J)):
if not j:
continue
term = {(0,)*(u - i) + (1,) + (0,)*i: K0.one}
factors.insert(0, (dmp_from_dict(term, u, K0), j))
return coeff*cont, _sort_factors(factors)
def dmp_factor_list_include(f, u, K):
"""Factor multivariate polynomials into irreducibles in `K[X]`. """
if not u:
return dup_factor_list_include(f, K)
coeff, factors = dmp_factor_list(f, u, K)
if not factors:
return [(dmp_ground(coeff, u), 1)]
else:
g = dmp_mul_ground(factors[0][0], coeff, u, K)
return [(g, factors[0][1])] + factors[1:]
def dup_irreducible_p(f, K):
"""
Returns ``True`` if a univariate polynomial ``f`` has no factors
over its domain.
"""
return dmp_irreducible_p(f, 0, K)
def dmp_irreducible_p(f, u, K):
"""
Returns ``True`` if a multivariate polynomial ``f`` has no factors
over its domain.
"""
_, factors = dmp_factor_list(f, u, K)
if not factors:
return True
elif len(factors) > 1:
return False
else:
_, k = factors[0]
return k == 1
|
1d7df0f54f14bf904db0089f2f06b69af5f86c786fdc1e79d3af695110058124
|
"""
This is our testing framework.
Goals:
* it should be compatible with py.test and operate very similarly
(or identically)
* doesn't require any external dependencies
* preferably all the functionality should be in this file only
* no magic, just import the test file and execute the test functions, that's it
* portable
"""
from __future__ import print_function, division
import os
import sys
import platform
import inspect
import traceback
import pdb
import re
import linecache
import time
from fnmatch import fnmatch
from timeit import default_timer as clock
import doctest as pdoctest # avoid clashing with our doctest() function
from doctest import DocTestFinder, DocTestRunner
import random
import subprocess
import signal
import stat
import tempfile
import warnings
from contextlib import contextmanager
from sympy.core.cache import clear_cache
from sympy.core.compatibility import (exec_, PY3, unwrap,
unicode)
from sympy.utilities.misc import find_executable
from sympy.external import import_module
IS_WINDOWS = (os.name == 'nt')
ON_TRAVIS = os.getenv('TRAVIS_BUILD_NUMBER', None)
# emperically generated list of the proportion of time spent running
# an even split of tests. This should periodically be regenerated.
# A list of [.6, .1, .3] would mean that if the tests are evenly split
# into '1/3', '2/3', '3/3', the first split would take 60% of the time,
# the second 10% and the third 30%. These lists are normalized to sum
# to 1, so [60, 10, 30] has the same behavior as [6, 1, 3] or [.6, .1, .3].
#
# This list can be generated with the code:
# from time import time
# import sympy
# import os
# os.environ["TRAVIS_BUILD_NUMBER"] = '2' # Mock travis to get more correct densities
# delays, num_splits = [], 30
# for i in range(1, num_splits + 1):
# tic = time()
# sympy.test(split='{}/{}'.format(i, num_splits), time_balance=False) # Add slow=True for slow tests
# delays.append(time() - tic)
# tot = sum(delays)
# print([round(x / tot, 4) for x in delays])
SPLIT_DENSITY = [
0.0059, 0.0027, 0.0068, 0.0011, 0.0006,
0.0058, 0.0047, 0.0046, 0.004, 0.0257,
0.0017, 0.0026, 0.004, 0.0032, 0.0016,
0.0015, 0.0004, 0.0011, 0.0016, 0.0014,
0.0077, 0.0137, 0.0217, 0.0074, 0.0043,
0.0067, 0.0236, 0.0004, 0.1189, 0.0142,
0.0234, 0.0003, 0.0003, 0.0047, 0.0006,
0.0013, 0.0004, 0.0008, 0.0007, 0.0006,
0.0139, 0.0013, 0.0007, 0.0051, 0.002,
0.0004, 0.0005, 0.0213, 0.0048, 0.0016,
0.0012, 0.0014, 0.0024, 0.0015, 0.0004,
0.0005, 0.0007, 0.011, 0.0062, 0.0015,
0.0021, 0.0049, 0.0006, 0.0006, 0.0011,
0.0006, 0.0019, 0.003, 0.0044, 0.0054,
0.0057, 0.0049, 0.0016, 0.0006, 0.0009,
0.0006, 0.0012, 0.0006, 0.0149, 0.0532,
0.0076, 0.0041, 0.0024, 0.0135, 0.0081,
0.2209, 0.0459, 0.0438, 0.0488, 0.0137,
0.002, 0.0003, 0.0008, 0.0039, 0.0024,
0.0005, 0.0004, 0.003, 0.056, 0.0026]
SPLIT_DENSITY_SLOW = [0.0086, 0.0004, 0.0568, 0.0003, 0.0032, 0.0005, 0.0004, 0.0013, 0.0016, 0.0648, 0.0198, 0.1285, 0.098, 0.0005, 0.0064, 0.0003, 0.0004, 0.0026, 0.0007, 0.0051, 0.0089, 0.0024, 0.0033, 0.0057, 0.0005, 0.0003, 0.001, 0.0045, 0.0091, 0.0006, 0.0005, 0.0321, 0.0059, 0.1105, 0.216, 0.1489, 0.0004, 0.0003, 0.0006, 0.0483]
class Skipped(Exception):
pass
class TimeOutError(Exception):
pass
class DependencyError(Exception):
pass
# add more flags ??
future_flags = division.compiler_flag
def _indent(s, indent=4):
"""
Add the given number of space characters to the beginning of
every non-blank line in ``s``, and return the result.
If the string ``s`` is Unicode, it is encoded using the stdout
encoding and the ``backslashreplace`` error handler.
"""
# After a 2to3 run the below code is bogus, so wrap it with a version check
if not PY3:
if isinstance(s, unicode):
s = s.encode(pdoctest._encoding, 'backslashreplace')
# This regexp matches the start of non-blank lines:
return re.sub('(?m)^(?!$)', indent*' ', s)
pdoctest._indent = _indent # type: ignore
# override reporter to maintain windows and python3
def _report_failure(self, out, test, example, got):
"""
Report that the given example failed.
"""
s = self._checker.output_difference(example, got, self.optionflags)
s = s.encode('raw_unicode_escape').decode('utf8', 'ignore')
out(self._failure_header(test, example) + s)
if PY3 and IS_WINDOWS:
DocTestRunner.report_failure = _report_failure # type: ignore
def convert_to_native_paths(lst):
"""
Converts a list of '/' separated paths into a list of
native (os.sep separated) paths and converts to lowercase
if the system is case insensitive.
"""
newlst = []
for i, rv in enumerate(lst):
rv = os.path.join(*rv.split("/"))
# on windows the slash after the colon is dropped
if sys.platform == "win32":
pos = rv.find(':')
if pos != -1:
if rv[pos + 1] != '\\':
rv = rv[:pos + 1] + '\\' + rv[pos + 1:]
newlst.append(os.path.normcase(rv))
return newlst
def get_sympy_dir():
"""
Returns the root sympy directory and set the global value
indicating whether the system is case sensitive or not.
"""
this_file = os.path.abspath(__file__)
sympy_dir = os.path.join(os.path.dirname(this_file), "..", "..")
sympy_dir = os.path.normpath(sympy_dir)
return os.path.normcase(sympy_dir)
def setup_pprint():
from sympy import pprint_use_unicode, init_printing
import sympy.interactive.printing as interactive_printing
# force pprint to be in ascii mode in doctests
use_unicode_prev = pprint_use_unicode(False)
# hook our nice, hash-stable strprinter
init_printing(pretty_print=False)
# Prevent init_printing() in doctests from affecting other doctests
interactive_printing.NO_GLOBAL = True
return use_unicode_prev
@contextmanager
def raise_on_deprecated():
"""Context manager to make DeprecationWarning raise an error
This is to catch SymPyDeprecationWarning from library code while running
tests and doctests. It is important to use this context manager around
each individual test/doctest in case some tests modify the warning
filters.
"""
with warnings.catch_warnings():
warnings.filterwarnings('error', '.*', DeprecationWarning, module='sympy.*')
yield
def run_in_subprocess_with_hash_randomization(
function, function_args=(),
function_kwargs=None, command=sys.executable,
module='sympy.testing.runtests', force=False):
"""
Run a function in a Python subprocess with hash randomization enabled.
If hash randomization is not supported by the version of Python given, it
returns False. Otherwise, it returns the exit value of the command. The
function is passed to sys.exit(), so the return value of the function will
be the return value.
The environment variable PYTHONHASHSEED is used to seed Python's hash
randomization. If it is set, this function will return False, because
starting a new subprocess is unnecessary in that case. If it is not set,
one is set at random, and the tests are run. Note that if this
environment variable is set when Python starts, hash randomization is
automatically enabled. To force a subprocess to be created even if
PYTHONHASHSEED is set, pass ``force=True``. This flag will not force a
subprocess in Python versions that do not support hash randomization (see
below), because those versions of Python do not support the ``-R`` flag.
``function`` should be a string name of a function that is importable from
the module ``module``, like "_test". The default for ``module`` is
"sympy.testing.runtests". ``function_args`` and ``function_kwargs``
should be a repr-able tuple and dict, respectively. The default Python
command is sys.executable, which is the currently running Python command.
This function is necessary because the seed for hash randomization must be
set by the environment variable before Python starts. Hence, in order to
use a predetermined seed for tests, we must start Python in a separate
subprocess.
Hash randomization was added in the minor Python versions 2.6.8, 2.7.3,
3.1.5, and 3.2.3, and is enabled by default in all Python versions after
and including 3.3.0.
Examples
========
>>> from sympy.testing.runtests import (
... run_in_subprocess_with_hash_randomization)
>>> # run the core tests in verbose mode
>>> run_in_subprocess_with_hash_randomization("_test",
... function_args=("core",),
... function_kwargs={'verbose': True}) # doctest: +SKIP
# Will return 0 if sys.executable supports hash randomization and tests
# pass, 1 if they fail, and False if it does not support hash
# randomization.
"""
cwd = get_sympy_dir()
# Note, we must return False everywhere, not None, as subprocess.call will
# sometimes return None.
# First check if the Python version supports hash randomization
# If it doesn't have this support, it won't recognize the -R flag
p = subprocess.Popen([command, "-RV"], stdout=subprocess.PIPE,
stderr=subprocess.STDOUT, cwd=cwd)
p.communicate()
if p.returncode != 0:
return False
hash_seed = os.getenv("PYTHONHASHSEED")
if not hash_seed:
os.environ["PYTHONHASHSEED"] = str(random.randrange(2**32))
else:
if not force:
return False
function_kwargs = function_kwargs or {}
# Now run the command
commandstring = ("import sys; from %s import %s;sys.exit(%s(*%s, **%s))" %
(module, function, function, repr(function_args),
repr(function_kwargs)))
try:
p = subprocess.Popen([command, "-R", "-c", commandstring], cwd=cwd)
p.communicate()
except KeyboardInterrupt:
p.wait()
finally:
# Put the environment variable back, so that it reads correctly for
# the current Python process.
if hash_seed is None:
del os.environ["PYTHONHASHSEED"]
else:
os.environ["PYTHONHASHSEED"] = hash_seed
return p.returncode
def run_all_tests(test_args=(), test_kwargs=None,
doctest_args=(), doctest_kwargs=None,
examples_args=(), examples_kwargs=None):
"""
Run all tests.
Right now, this runs the regular tests (bin/test), the doctests
(bin/doctest), the examples (examples/all.py), and the sage tests (see
sympy/external/tests/test_sage.py).
This is what ``setup.py test`` uses.
You can pass arguments and keyword arguments to the test functions that
support them (for now, test, doctest, and the examples). See the
docstrings of those functions for a description of the available options.
For example, to run the solvers tests with colors turned off:
>>> from sympy.testing.runtests import run_all_tests
>>> run_all_tests(test_args=("solvers",),
... test_kwargs={"colors:False"}) # doctest: +SKIP
"""
cwd = get_sympy_dir()
tests_successful = True
test_kwargs = test_kwargs or {}
doctest_kwargs = doctest_kwargs or {}
examples_kwargs = examples_kwargs or {'quiet': True}
try:
# Regular tests
if not test(*test_args, **test_kwargs):
# some regular test fails, so set the tests_successful
# flag to false and continue running the doctests
tests_successful = False
# Doctests
print()
if not doctest(*doctest_args, **doctest_kwargs):
tests_successful = False
# Examples
print()
sys.path.append("examples") # examples/all.py
from all import run_examples # type: ignore
if not run_examples(*examples_args, **examples_kwargs):
tests_successful = False
# Sage tests
if sys.platform != "win32" and not PY3 and os.path.exists("bin/test"):
# run Sage tests; Sage currently doesn't support Windows or Python 3
# Only run Sage tests if 'bin/test' is present (it is missing from
# our release because everything in the 'bin' directory gets
# installed).
dev_null = open(os.devnull, 'w')
if subprocess.call("sage -v", shell=True, stdout=dev_null,
stderr=dev_null) == 0:
if subprocess.call("sage -python bin/test "
"sympy/external/tests/test_sage.py",
shell=True, cwd=cwd) != 0:
tests_successful = False
if tests_successful:
return
else:
# Return nonzero exit code
sys.exit(1)
except KeyboardInterrupt:
print()
print("DO *NOT* COMMIT!")
sys.exit(1)
def test(*paths, **kwargs):
"""
Run tests in the specified test_*.py files.
Tests in a particular test_*.py file are run if any of the given strings
in ``paths`` matches a part of the test file's path. If ``paths=[]``,
tests in all test_*.py files are run.
Notes:
- If sort=False, tests are run in random order (not default).
- Paths can be entered in native system format or in unix,
forward-slash format.
- Files that are on the blacklist can be tested by providing
their path; they are only excluded if no paths are given.
**Explanation of test results**
====== ===============================================================
Output Meaning
====== ===============================================================
. passed
F failed
X XPassed (expected to fail but passed)
f XFAILed (expected to fail and indeed failed)
s skipped
w slow
T timeout (e.g., when ``--timeout`` is used)
K KeyboardInterrupt (when running the slow tests with ``--slow``,
you can interrupt one of them without killing the test runner)
====== ===============================================================
Colors have no additional meaning and are used just to facilitate
interpreting the output.
Examples
========
>>> import sympy
Run all tests:
>>> sympy.test() # doctest: +SKIP
Run one file:
>>> sympy.test("sympy/core/tests/test_basic.py") # doctest: +SKIP
>>> sympy.test("_basic") # doctest: +SKIP
Run all tests in sympy/functions/ and some particular file:
>>> sympy.test("sympy/core/tests/test_basic.py",
... "sympy/functions") # doctest: +SKIP
Run all tests in sympy/core and sympy/utilities:
>>> sympy.test("/core", "/util") # doctest: +SKIP
Run specific test from a file:
>>> sympy.test("sympy/core/tests/test_basic.py",
... kw="test_equality") # doctest: +SKIP
Run specific test from any file:
>>> sympy.test(kw="subs") # doctest: +SKIP
Run the tests with verbose mode on:
>>> sympy.test(verbose=True) # doctest: +SKIP
Don't sort the test output:
>>> sympy.test(sort=False) # doctest: +SKIP
Turn on post-mortem pdb:
>>> sympy.test(pdb=True) # doctest: +SKIP
Turn off colors:
>>> sympy.test(colors=False) # doctest: +SKIP
Force colors, even when the output is not to a terminal (this is useful,
e.g., if you are piping to ``less -r`` and you still want colors)
>>> sympy.test(force_colors=False) # doctest: +SKIP
The traceback verboseness can be set to "short" or "no" (default is
"short")
>>> sympy.test(tb='no') # doctest: +SKIP
The ``split`` option can be passed to split the test run into parts. The
split currently only splits the test files, though this may change in the
future. ``split`` should be a string of the form 'a/b', which will run
part ``a`` of ``b``. For instance, to run the first half of the test suite:
>>> sympy.test(split='1/2') # doctest: +SKIP
The ``time_balance`` option can be passed in conjunction with ``split``.
If ``time_balance=True`` (the default for ``sympy.test``), sympy will attempt
to split the tests such that each split takes equal time. This heuristic
for balancing is based on pre-recorded test data.
>>> sympy.test(split='1/2', time_balance=True) # doctest: +SKIP
You can disable running the tests in a separate subprocess using
``subprocess=False``. This is done to support seeding hash randomization,
which is enabled by default in the Python versions where it is supported.
If subprocess=False, hash randomization is enabled/disabled according to
whether it has been enabled or not in the calling Python process.
However, even if it is enabled, the seed cannot be printed unless it is
called from a new Python process.
Hash randomization was added in the minor Python versions 2.6.8, 2.7.3,
3.1.5, and 3.2.3, and is enabled by default in all Python versions after
and including 3.3.0.
If hash randomization is not supported ``subprocess=False`` is used
automatically.
>>> sympy.test(subprocess=False) # doctest: +SKIP
To set the hash randomization seed, set the environment variable
``PYTHONHASHSEED`` before running the tests. This can be done from within
Python using
>>> import os
>>> os.environ['PYTHONHASHSEED'] = '42' # doctest: +SKIP
Or from the command line using
$ PYTHONHASHSEED=42 ./bin/test
If the seed is not set, a random seed will be chosen.
Note that to reproduce the same hash values, you must use both the same seed
as well as the same architecture (32-bit vs. 64-bit).
"""
subprocess = kwargs.pop("subprocess", True)
rerun = kwargs.pop("rerun", 0)
# count up from 0, do not print 0
print_counter = lambda i : (print("rerun %d" % (rerun-i))
if rerun-i else None)
if subprocess:
# loop backwards so last i is 0
for i in range(rerun, -1, -1):
print_counter(i)
ret = run_in_subprocess_with_hash_randomization("_test",
function_args=paths, function_kwargs=kwargs)
if ret is False:
break
val = not bool(ret)
# exit on the first failure or if done
if not val or i == 0:
return val
# rerun even if hash randomization is not supported
for i in range(rerun, -1, -1):
print_counter(i)
val = not bool(_test(*paths, **kwargs))
if not val or i == 0:
return val
def _test(*paths, **kwargs):
"""
Internal function that actually runs the tests.
All keyword arguments from ``test()`` are passed to this function except for
``subprocess``.
Returns 0 if tests passed and 1 if they failed. See the docstring of
``test()`` for more information.
"""
verbose = kwargs.get("verbose", False)
tb = kwargs.get("tb", "short")
kw = kwargs.get("kw", None) or ()
# ensure that kw is a tuple
if isinstance(kw, str):
kw = (kw, )
post_mortem = kwargs.get("pdb", False)
colors = kwargs.get("colors", True)
force_colors = kwargs.get("force_colors", False)
sort = kwargs.get("sort", True)
seed = kwargs.get("seed", None)
if seed is None:
seed = random.randrange(100000000)
timeout = kwargs.get("timeout", False)
fail_on_timeout = kwargs.get("fail_on_timeout", False)
if ON_TRAVIS and timeout is False:
# Travis times out if no activity is seen for 10 minutes.
timeout = 595
fail_on_timeout = True
slow = kwargs.get("slow", False)
enhance_asserts = kwargs.get("enhance_asserts", False)
split = kwargs.get('split', None)
time_balance = kwargs.get('time_balance', True)
blacklist = kwargs.get('blacklist', ['sympy/integrals/rubi/rubi_tests/tests'])
if ON_TRAVIS:
# pyglet does not work on Travis
blacklist.extend(['sympy/plotting/pygletplot/tests'])
blacklist = convert_to_native_paths(blacklist)
fast_threshold = kwargs.get('fast_threshold', None)
slow_threshold = kwargs.get('slow_threshold', None)
r = PyTestReporter(verbose=verbose, tb=tb, colors=colors,
force_colors=force_colors, split=split)
t = SymPyTests(r, kw, post_mortem, seed,
fast_threshold=fast_threshold,
slow_threshold=slow_threshold)
test_files = t.get_test_files('sympy')
not_blacklisted = [f for f in test_files
if not any(b in f for b in blacklist)]
if len(paths) == 0:
matched = not_blacklisted
else:
paths = convert_to_native_paths(paths)
matched = []
for f in not_blacklisted:
basename = os.path.basename(f)
for p in paths:
if p in f or fnmatch(basename, p):
matched.append(f)
break
density = None
if time_balance:
if slow:
density = SPLIT_DENSITY_SLOW
else:
density = SPLIT_DENSITY
if split:
matched = split_list(matched, split, density=density)
t._testfiles.extend(matched)
return int(not t.test(sort=sort, timeout=timeout, slow=slow,
enhance_asserts=enhance_asserts, fail_on_timeout=fail_on_timeout))
def doctest(*paths, **kwargs):
r"""
Runs doctests in all \*.py files in the sympy directory which match
any of the given strings in ``paths`` or all tests if paths=[].
Notes:
- Paths can be entered in native system format or in unix,
forward-slash format.
- Files that are on the blacklist can be tested by providing
their path; they are only excluded if no paths are given.
Examples
========
>>> import sympy
Run all tests:
>>> sympy.doctest() # doctest: +SKIP
Run one file:
>>> sympy.doctest("sympy/core/basic.py") # doctest: +SKIP
>>> sympy.doctest("polynomial.rst") # doctest: +SKIP
Run all tests in sympy/functions/ and some particular file:
>>> sympy.doctest("/functions", "basic.py") # doctest: +SKIP
Run any file having polynomial in its name, doc/src/modules/polynomial.rst,
sympy/functions/special/polynomials.py, and sympy/polys/polynomial.py:
>>> sympy.doctest("polynomial") # doctest: +SKIP
The ``split`` option can be passed to split the test run into parts. The
split currently only splits the test files, though this may change in the
future. ``split`` should be a string of the form 'a/b', which will run
part ``a`` of ``b``. Note that the regular doctests and the Sphinx
doctests are split independently. For instance, to run the first half of
the test suite:
>>> sympy.doctest(split='1/2') # doctest: +SKIP
The ``subprocess`` and ``verbose`` options are the same as with the function
``test()``. See the docstring of that function for more information.
"""
subprocess = kwargs.pop("subprocess", True)
rerun = kwargs.pop("rerun", 0)
# count up from 0, do not print 0
print_counter = lambda i : (print("rerun %d" % (rerun-i))
if rerun-i else None)
if subprocess:
# loop backwards so last i is 0
for i in range(rerun, -1, -1):
print_counter(i)
ret = run_in_subprocess_with_hash_randomization("_doctest",
function_args=paths, function_kwargs=kwargs)
if ret is False:
break
val = not bool(ret)
# exit on the first failure or if done
if not val or i == 0:
return val
# rerun even if hash randomization is not supported
for i in range(rerun, -1, -1):
print_counter(i)
val = not bool(_doctest(*paths, **kwargs))
if not val or i == 0:
return val
def _get_doctest_blacklist():
'''Get the default blacklist for the doctests'''
blacklist = []
blacklist.extend([
"doc/src/modules/plotting.rst", # generates live plots
"doc/src/modules/physics/mechanics/autolev_parser.rst",
"sympy/galgebra.py", # no longer part of SymPy
"sympy/this.py", # prints text
"sympy/physics/gaussopt.py", # raises deprecation warning
"sympy/matrices/densearith.py", # raises deprecation warning
"sympy/matrices/densesolve.py", # raises deprecation warning
"sympy/matrices/densetools.py", # raises deprecation warning
"sympy/parsing/autolev/_antlr/autolevlexer.py", # generated code
"sympy/parsing/autolev/_antlr/autolevparser.py", # generated code
"sympy/parsing/autolev/_antlr/autolevlistener.py", # generated code
"sympy/parsing/latex/_antlr/latexlexer.py", # generated code
"sympy/parsing/latex/_antlr/latexparser.py", # generated code
"sympy/integrals/rubi/rubi.py",
"sympy/plotting/pygletplot/__init__.py", # crashes on some systems
"sympy/plotting/pygletplot/plot.py", # crashes on some systems
])
# autolev parser tests
num = 12
for i in range (1, num+1):
blacklist.append("sympy/parsing/autolev/test-examples/ruletest" + str(i) + ".py")
blacklist.extend(["sympy/parsing/autolev/test-examples/pydy-example-repo/mass_spring_damper.py",
"sympy/parsing/autolev/test-examples/pydy-example-repo/chaos_pendulum.py",
"sympy/parsing/autolev/test-examples/pydy-example-repo/double_pendulum.py",
"sympy/parsing/autolev/test-examples/pydy-example-repo/non_min_pendulum.py"])
if import_module('numpy') is None:
blacklist.extend([
"sympy/plotting/experimental_lambdify.py",
"sympy/plotting/plot_implicit.py",
"examples/advanced/autowrap_integrators.py",
"examples/advanced/autowrap_ufuncify.py",
"examples/intermediate/sample.py",
"examples/intermediate/mplot2d.py",
"examples/intermediate/mplot3d.py",
"doc/src/modules/numeric-computation.rst"
])
else:
if import_module('matplotlib') is None:
blacklist.extend([
"examples/intermediate/mplot2d.py",
"examples/intermediate/mplot3d.py"
])
else:
# Use a non-windowed backend, so that the tests work on Travis
import matplotlib
matplotlib.use('Agg')
if ON_TRAVIS or import_module('pyglet') is None:
blacklist.extend(["sympy/plotting/pygletplot"])
if import_module('theano') is None:
blacklist.extend([
"sympy/printing/theanocode.py",
"doc/src/modules/numeric-computation.rst",
])
if import_module('antlr4') is None:
blacklist.extend([
"sympy/parsing/autolev/__init__.py",
"sympy/parsing/latex/_parse_latex_antlr.py",
])
if import_module('lfortran') is None:
#throws ImportError when lfortran not installed
blacklist.extend([
"sympy/parsing/sym_expr.py",
])
# disabled because of doctest failures in asmeurer's bot
blacklist.extend([
"sympy/utilities/autowrap.py",
"examples/advanced/autowrap_integrators.py",
"examples/advanced/autowrap_ufuncify.py"
])
# blacklist these modules until issue 4840 is resolved
blacklist.extend([
"sympy/conftest.py", # Python 2.7 issues
"sympy/testing/benchmarking.py",
])
# These are deprecated stubs to be removed:
blacklist.extend([
"sympy/utilities/benchmarking.py",
"sympy/utilities/tmpfiles.py",
"sympy/utilities/pytest.py",
"sympy/utilities/runtests.py",
"sympy/utilities/quality_unicode.py",
"sympy/utilities/randtest.py",
])
blacklist = convert_to_native_paths(blacklist)
return blacklist
def _doctest(*paths, **kwargs):
"""
Internal function that actually runs the doctests.
All keyword arguments from ``doctest()`` are passed to this function
except for ``subprocess``.
Returns 0 if tests passed and 1 if they failed. See the docstrings of
``doctest()`` and ``test()`` for more information.
"""
from sympy import pprint_use_unicode
normal = kwargs.get("normal", False)
verbose = kwargs.get("verbose", False)
colors = kwargs.get("colors", True)
force_colors = kwargs.get("force_colors", False)
blacklist = kwargs.get("blacklist", [])
split = kwargs.get('split', None)
blacklist.extend(_get_doctest_blacklist())
# Use a non-windowed backend, so that the tests work on Travis
if import_module('matplotlib') is not None:
import matplotlib
matplotlib.use('Agg')
# Disable warnings for external modules
import sympy.external
sympy.external.importtools.WARN_OLD_VERSION = False
sympy.external.importtools.WARN_NOT_INSTALLED = False
# Disable showing up of plots
from sympy.plotting.plot import unset_show
unset_show()
r = PyTestReporter(verbose, split=split, colors=colors,\
force_colors=force_colors)
t = SymPyDocTests(r, normal)
test_files = t.get_test_files('sympy')
test_files.extend(t.get_test_files('examples', init_only=False))
not_blacklisted = [f for f in test_files
if not any(b in f for b in blacklist)]
if len(paths) == 0:
matched = not_blacklisted
else:
# take only what was requested...but not blacklisted items
# and allow for partial match anywhere or fnmatch of name
paths = convert_to_native_paths(paths)
matched = []
for f in not_blacklisted:
basename = os.path.basename(f)
for p in paths:
if p in f or fnmatch(basename, p):
matched.append(f)
break
if split:
matched = split_list(matched, split)
t._testfiles.extend(matched)
# run the tests and record the result for this *py portion of the tests
if t._testfiles:
failed = not t.test()
else:
failed = False
# N.B.
# --------------------------------------------------------------------
# Here we test *.rst files at or below doc/src. Code from these must
# be self supporting in terms of imports since there is no importing
# of necessary modules by doctest.testfile. If you try to pass *.py
# files through this they might fail because they will lack the needed
# imports and smarter parsing that can be done with source code.
#
test_files = t.get_test_files('doc/src', '*.rst', init_only=False)
test_files.sort()
not_blacklisted = [f for f in test_files
if not any(b in f for b in blacklist)]
if len(paths) == 0:
matched = not_blacklisted
else:
# Take only what was requested as long as it's not on the blacklist.
# Paths were already made native in *py tests so don't repeat here.
# There's no chance of having a *py file slip through since we
# only have *rst files in test_files.
matched = []
for f in not_blacklisted:
basename = os.path.basename(f)
for p in paths:
if p in f or fnmatch(basename, p):
matched.append(f)
break
if split:
matched = split_list(matched, split)
first_report = True
for rst_file in matched:
if not os.path.isfile(rst_file):
continue
old_displayhook = sys.displayhook
try:
use_unicode_prev = setup_pprint()
out = sympytestfile(
rst_file, module_relative=False, encoding='utf-8',
optionflags=pdoctest.ELLIPSIS | pdoctest.NORMALIZE_WHITESPACE |
pdoctest.IGNORE_EXCEPTION_DETAIL)
finally:
# make sure we return to the original displayhook in case some
# doctest has changed that
sys.displayhook = old_displayhook
# The NO_GLOBAL flag overrides the no_global flag to init_printing
# if True
import sympy.interactive.printing as interactive_printing
interactive_printing.NO_GLOBAL = False
pprint_use_unicode(use_unicode_prev)
rstfailed, tested = out
if tested:
failed = rstfailed or failed
if first_report:
first_report = False
msg = 'rst doctests start'
if not t._testfiles:
r.start(msg=msg)
else:
r.write_center(msg)
print()
# use as the id, everything past the first 'sympy'
file_id = rst_file[rst_file.find('sympy') + len('sympy') + 1:]
print(file_id, end=" ")
# get at least the name out so it is know who is being tested
wid = r.terminal_width - len(file_id) - 1 # update width
test_file = '[%s]' % (tested)
report = '[%s]' % (rstfailed or 'OK')
print(''.join(
[test_file, ' '*(wid - len(test_file) - len(report)), report])
)
# the doctests for *py will have printed this message already if there was
# a failure, so now only print it if there was intervening reporting by
# testing the *rst as evidenced by first_report no longer being True.
if not first_report and failed:
print()
print("DO *NOT* COMMIT!")
return int(failed)
sp = re.compile(r'([0-9]+)/([1-9][0-9]*)')
def split_list(l, split, density=None):
"""
Splits a list into part a of b
split should be a string of the form 'a/b'. For instance, '1/3' would give
the split one of three.
If the length of the list is not divisible by the number of splits, the
last split will have more items.
`density` may be specified as a list. If specified,
tests will be balanced so that each split has as equal-as-possible
amount of mass according to `density`.
>>> from sympy.testing.runtests import split_list
>>> a = list(range(10))
>>> split_list(a, '1/3')
[0, 1, 2]
>>> split_list(a, '2/3')
[3, 4, 5]
>>> split_list(a, '3/3')
[6, 7, 8, 9]
"""
m = sp.match(split)
if not m:
raise ValueError("split must be a string of the form a/b where a and b are ints")
i, t = map(int, m.groups())
if not density:
return l[(i - 1)*len(l)//t : i*len(l)//t]
# normalize density
tot = sum(density)
density = [x / tot for x in density]
def density_inv(x):
"""Interpolate the inverse to the cumulative
distribution function given by density"""
if x <= 0:
return 0
if x >= sum(density):
return 1
# find the first time the cumulative sum surpasses x
# and linearly interpolate
cumm = 0
for i, d in enumerate(density):
cumm += d
if cumm >= x:
break
frac = (d - (cumm - x)) / d
return (i + frac) / len(density)
lower_frac = density_inv((i - 1) / t)
higher_frac = density_inv(i / t)
return l[int(lower_frac*len(l)) : int(higher_frac*len(l))]
from collections import namedtuple
SymPyTestResults = namedtuple('SymPyTestResults', 'failed attempted')
def sympytestfile(filename, module_relative=True, name=None, package=None,
globs=None, verbose=None, report=True, optionflags=0,
extraglobs=None, raise_on_error=False,
parser=pdoctest.DocTestParser(), encoding=None):
"""
Test examples in the given file. Return (#failures, #tests).
Optional keyword arg ``module_relative`` specifies how filenames
should be interpreted:
- If ``module_relative`` is True (the default), then ``filename``
specifies a module-relative path. By default, this path is
relative to the calling module's directory; but if the
``package`` argument is specified, then it is relative to that
package. To ensure os-independence, ``filename`` should use
"/" characters to separate path segments, and should not
be an absolute path (i.e., it may not begin with "/").
- If ``module_relative`` is False, then ``filename`` specifies an
os-specific path. The path may be absolute or relative (to
the current working directory).
Optional keyword arg ``name`` gives the name of the test; by default
use the file's basename.
Optional keyword argument ``package`` is a Python package or the
name of a Python package whose directory should be used as the
base directory for a module relative filename. If no package is
specified, then the calling module's directory is used as the base
directory for module relative filenames. It is an error to
specify ``package`` if ``module_relative`` is False.
Optional keyword arg ``globs`` gives a dict to be used as the globals
when executing examples; by default, use {}. A copy of this dict
is actually used for each docstring, so that each docstring's
examples start with a clean slate.
Optional keyword arg ``extraglobs`` gives a dictionary that should be
merged into the globals that are used to execute examples. By
default, no extra globals are used.
Optional keyword arg ``verbose`` prints lots of stuff if true, prints
only failures if false; by default, it's true iff "-v" is in sys.argv.
Optional keyword arg ``report`` prints a summary at the end when true,
else prints nothing at the end. In verbose mode, the summary is
detailed, else very brief (in fact, empty if all tests passed).
Optional keyword arg ``optionflags`` or's together module constants,
and defaults to 0. Possible values (see the docs for details):
- DONT_ACCEPT_TRUE_FOR_1
- DONT_ACCEPT_BLANKLINE
- NORMALIZE_WHITESPACE
- ELLIPSIS
- SKIP
- IGNORE_EXCEPTION_DETAIL
- REPORT_UDIFF
- REPORT_CDIFF
- REPORT_NDIFF
- REPORT_ONLY_FIRST_FAILURE
Optional keyword arg ``raise_on_error`` raises an exception on the
first unexpected exception or failure. This allows failures to be
post-mortem debugged.
Optional keyword arg ``parser`` specifies a DocTestParser (or
subclass) that should be used to extract tests from the files.
Optional keyword arg ``encoding`` specifies an encoding that should
be used to convert the file to unicode.
Advanced tomfoolery: testmod runs methods of a local instance of
class doctest.Tester, then merges the results into (or creates)
global Tester instance doctest.master. Methods of doctest.master
can be called directly too, if you want to do something unusual.
Passing report=0 to testmod is especially useful then, to delay
displaying a summary. Invoke doctest.master.summarize(verbose)
when you're done fiddling.
"""
if package and not module_relative:
raise ValueError("Package may only be specified for module-"
"relative paths.")
# Relativize the path
if not PY3:
text, filename = pdoctest._load_testfile(
filename, package, module_relative)
if encoding is not None:
text = text.decode(encoding)
else:
text, filename = pdoctest._load_testfile(
filename, package, module_relative, encoding)
# If no name was given, then use the file's name.
if name is None:
name = os.path.basename(filename)
# Assemble the globals.
if globs is None:
globs = {}
else:
globs = globs.copy()
if extraglobs is not None:
globs.update(extraglobs)
if '__name__' not in globs:
globs['__name__'] = '__main__'
if raise_on_error:
runner = pdoctest.DebugRunner(verbose=verbose, optionflags=optionflags)
else:
runner = SymPyDocTestRunner(verbose=verbose, optionflags=optionflags)
runner._checker = SymPyOutputChecker()
# Read the file, convert it to a test, and run it.
test = parser.get_doctest(text, globs, name, filename, 0)
runner.run(test, compileflags=future_flags)
if report:
runner.summarize()
if pdoctest.master is None:
pdoctest.master = runner
else:
pdoctest.master.merge(runner)
return SymPyTestResults(runner.failures, runner.tries)
class SymPyTests(object):
def __init__(self, reporter, kw="", post_mortem=False,
seed=None, fast_threshold=None, slow_threshold=None):
self._post_mortem = post_mortem
self._kw = kw
self._count = 0
self._root_dir = get_sympy_dir()
self._reporter = reporter
self._reporter.root_dir(self._root_dir)
self._testfiles = []
self._seed = seed if seed is not None else random.random()
# Defaults in seconds, from human / UX design limits
# http://www.nngroup.com/articles/response-times-3-important-limits/
#
# These defaults are *NOT* set in stone as we are measuring different
# things, so others feel free to come up with a better yardstick :)
if fast_threshold:
self._fast_threshold = float(fast_threshold)
else:
self._fast_threshold = 8
if slow_threshold:
self._slow_threshold = float(slow_threshold)
else:
self._slow_threshold = 10
def test(self, sort=False, timeout=False, slow=False,
enhance_asserts=False, fail_on_timeout=False):
"""
Runs the tests returning True if all tests pass, otherwise False.
If sort=False run tests in random order.
"""
if sort:
self._testfiles.sort()
elif slow:
pass
else:
random.seed(self._seed)
random.shuffle(self._testfiles)
self._reporter.start(self._seed)
for f in self._testfiles:
try:
self.test_file(f, sort, timeout, slow,
enhance_asserts, fail_on_timeout)
except KeyboardInterrupt:
print(" interrupted by user")
self._reporter.finish()
raise
return self._reporter.finish()
def _enhance_asserts(self, source):
from ast import (NodeTransformer, Compare, Name, Store, Load, Tuple,
Assign, BinOp, Str, Mod, Assert, parse, fix_missing_locations)
ops = {"Eq": '==', "NotEq": '!=', "Lt": '<', "LtE": '<=',
"Gt": '>', "GtE": '>=', "Is": 'is', "IsNot": 'is not',
"In": 'in', "NotIn": 'not in'}
class Transform(NodeTransformer):
def visit_Assert(self, stmt):
if isinstance(stmt.test, Compare):
compare = stmt.test
values = [compare.left] + compare.comparators
names = [ "_%s" % i for i, _ in enumerate(values) ]
names_store = [ Name(n, Store()) for n in names ]
names_load = [ Name(n, Load()) for n in names ]
target = Tuple(names_store, Store())
value = Tuple(values, Load())
assign = Assign([target], value)
new_compare = Compare(names_load[0], compare.ops, names_load[1:])
msg_format = "\n%s " + "\n%s ".join([ ops[op.__class__.__name__] for op in compare.ops ]) + "\n%s"
msg = BinOp(Str(msg_format), Mod(), Tuple(names_load, Load()))
test = Assert(new_compare, msg, lineno=stmt.lineno, col_offset=stmt.col_offset)
return [assign, test]
else:
return stmt
tree = parse(source)
new_tree = Transform().visit(tree)
return fix_missing_locations(new_tree)
def test_file(self, filename, sort=True, timeout=False, slow=False,
enhance_asserts=False, fail_on_timeout=False):
reporter = self._reporter
funcs = []
try:
gl = {'__file__': filename}
try:
if PY3:
open_file = lambda: open(filename, encoding="utf8")
else:
open_file = lambda: open(filename)
with open_file() as f:
source = f.read()
if self._kw:
for l in source.splitlines():
if l.lstrip().startswith('def '):
if any(l.find(k) != -1 for k in self._kw):
break
else:
return
if enhance_asserts:
try:
source = self._enhance_asserts(source)
except ImportError:
pass
code = compile(source, filename, "exec", flags=0, dont_inherit=True)
exec_(code, gl)
except (SystemExit, KeyboardInterrupt):
raise
except ImportError:
reporter.import_error(filename, sys.exc_info())
return
except Exception:
reporter.test_exception(sys.exc_info())
clear_cache()
self._count += 1
random.seed(self._seed)
disabled = gl.get("disabled", False)
if not disabled:
# we need to filter only those functions that begin with 'test_'
# We have to be careful about decorated functions. As long as
# the decorator uses functools.wraps, we can detect it.
funcs = []
for f in gl:
if (f.startswith("test_") and (inspect.isfunction(gl[f])
or inspect.ismethod(gl[f]))):
func = gl[f]
# Handle multiple decorators
while hasattr(func, '__wrapped__'):
func = func.__wrapped__
if inspect.getsourcefile(func) == filename:
funcs.append(gl[f])
if slow:
funcs = [f for f in funcs if getattr(f, '_slow', False)]
# Sorting of XFAILed functions isn't fixed yet :-(
funcs.sort(key=lambda x: inspect.getsourcelines(x)[1])
i = 0
while i < len(funcs):
if inspect.isgeneratorfunction(funcs[i]):
# some tests can be generators, that return the actual
# test functions. We unpack it below:
f = funcs.pop(i)
for fg in f():
func = fg[0]
args = fg[1:]
fgw = lambda: func(*args)
funcs.insert(i, fgw)
i += 1
else:
i += 1
# drop functions that are not selected with the keyword expression:
funcs = [x for x in funcs if self.matches(x)]
if not funcs:
return
except Exception:
reporter.entering_filename(filename, len(funcs))
raise
reporter.entering_filename(filename, len(funcs))
if not sort:
random.shuffle(funcs)
for f in funcs:
start = time.time()
reporter.entering_test(f)
try:
if getattr(f, '_slow', False) and not slow:
raise Skipped("Slow")
with raise_on_deprecated():
if timeout:
self._timeout(f, timeout, fail_on_timeout)
else:
random.seed(self._seed)
f()
except KeyboardInterrupt:
if getattr(f, '_slow', False):
reporter.test_skip("KeyboardInterrupt")
else:
raise
except Exception:
if timeout:
signal.alarm(0) # Disable the alarm. It could not be handled before.
t, v, tr = sys.exc_info()
if t is AssertionError:
reporter.test_fail((t, v, tr))
if self._post_mortem:
pdb.post_mortem(tr)
elif t.__name__ == "Skipped":
reporter.test_skip(v)
elif t.__name__ == "XFail":
reporter.test_xfail()
elif t.__name__ == "XPass":
reporter.test_xpass(v)
else:
reporter.test_exception((t, v, tr))
if self._post_mortem:
pdb.post_mortem(tr)
else:
reporter.test_pass()
taken = time.time() - start
if taken > self._slow_threshold:
filename = os.path.relpath(filename, reporter._root_dir)
reporter.slow_test_functions.append(
(filename + "::" + f.__name__, taken))
if getattr(f, '_slow', False) and slow:
if taken < self._fast_threshold:
filename = os.path.relpath(filename, reporter._root_dir)
reporter.fast_test_functions.append(
(filename + "::" + f.__name__, taken))
reporter.leaving_filename()
def _timeout(self, function, timeout, fail_on_timeout):
def callback(x, y):
signal.alarm(0)
if fail_on_timeout:
raise TimeOutError("Timed out after %d seconds" % timeout)
else:
raise Skipped("Timeout")
signal.signal(signal.SIGALRM, callback)
signal.alarm(timeout) # Set an alarm with a given timeout
function()
signal.alarm(0) # Disable the alarm
def matches(self, x):
"""
Does the keyword expression self._kw match "x"? Returns True/False.
Always returns True if self._kw is "".
"""
if not self._kw:
return True
for kw in self._kw:
if x.__name__.find(kw) != -1:
return True
return False
def get_test_files(self, dir, pat='test_*.py'):
"""
Returns the list of test_*.py (default) files at or below directory
``dir`` relative to the sympy home directory.
"""
dir = os.path.join(self._root_dir, convert_to_native_paths([dir])[0])
g = []
for path, folders, files in os.walk(dir):
g.extend([os.path.join(path, f) for f in files if fnmatch(f, pat)])
return sorted([os.path.normcase(gi) for gi in g])
class SymPyDocTests(object):
def __init__(self, reporter, normal):
self._count = 0
self._root_dir = get_sympy_dir()
self._reporter = reporter
self._reporter.root_dir(self._root_dir)
self._normal = normal
self._testfiles = []
def test(self):
"""
Runs the tests and returns True if all tests pass, otherwise False.
"""
self._reporter.start()
for f in self._testfiles:
try:
self.test_file(f)
except KeyboardInterrupt:
print(" interrupted by user")
self._reporter.finish()
raise
return self._reporter.finish()
def test_file(self, filename):
clear_cache()
from sympy.core.compatibility import StringIO
import sympy.interactive.printing as interactive_printing
from sympy import pprint_use_unicode
rel_name = filename[len(self._root_dir) + 1:]
dirname, file = os.path.split(filename)
module = rel_name.replace(os.sep, '.')[:-3]
if rel_name.startswith("examples"):
# Examples files do not have __init__.py files,
# So we have to temporarily extend sys.path to import them
sys.path.insert(0, dirname)
module = file[:-3] # remove ".py"
try:
module = pdoctest._normalize_module(module)
tests = SymPyDocTestFinder().find(module)
except (SystemExit, KeyboardInterrupt):
raise
except ImportError:
self._reporter.import_error(filename, sys.exc_info())
return
finally:
if rel_name.startswith("examples"):
del sys.path[0]
tests = [test for test in tests if len(test.examples) > 0]
# By default tests are sorted by alphabetical order by function name.
# We sort by line number so one can edit the file sequentially from
# bottom to top. However, if there are decorated functions, their line
# numbers will be too large and for now one must just search for these
# by text and function name.
tests.sort(key=lambda x: -x.lineno)
if not tests:
return
self._reporter.entering_filename(filename, len(tests))
for test in tests:
assert len(test.examples) != 0
if self._reporter._verbose:
self._reporter.write("\n{} ".format(test.name))
# check if there are external dependencies which need to be met
if '_doctest_depends_on' in test.globs:
try:
self._check_dependencies(**test.globs['_doctest_depends_on'])
except DependencyError as e:
self._reporter.test_skip(v=str(e))
continue
runner = SymPyDocTestRunner(optionflags=pdoctest.ELLIPSIS |
pdoctest.NORMALIZE_WHITESPACE |
pdoctest.IGNORE_EXCEPTION_DETAIL)
runner._checker = SymPyOutputChecker()
old = sys.stdout
new = StringIO()
sys.stdout = new
# If the testing is normal, the doctests get importing magic to
# provide the global namespace. If not normal (the default) then
# then must run on their own; all imports must be explicit within
# a function's docstring. Once imported that import will be
# available to the rest of the tests in a given function's
# docstring (unless clear_globs=True below).
if not self._normal:
test.globs = {}
# if this is uncommented then all the test would get is what
# comes by default with a "from sympy import *"
#exec('from sympy import *') in test.globs
test.globs['print_function'] = print_function
old_displayhook = sys.displayhook
use_unicode_prev = setup_pprint()
try:
f, t = runner.run(test, compileflags=future_flags,
out=new.write, clear_globs=False)
except KeyboardInterrupt:
raise
finally:
sys.stdout = old
if f > 0:
self._reporter.doctest_fail(test.name, new.getvalue())
else:
self._reporter.test_pass()
sys.displayhook = old_displayhook
interactive_printing.NO_GLOBAL = False
pprint_use_unicode(use_unicode_prev)
self._reporter.leaving_filename()
def get_test_files(self, dir, pat='*.py', init_only=True):
r"""
Returns the list of \*.py files (default) from which docstrings
will be tested which are at or below directory ``dir``. By default,
only those that have an __init__.py in their parent directory
and do not start with ``test_`` will be included.
"""
def importable(x):
"""
Checks if given pathname x is an importable module by checking for
__init__.py file.
Returns True/False.
Currently we only test if the __init__.py file exists in the
directory with the file "x" (in theory we should also test all the
parent dirs).
"""
init_py = os.path.join(os.path.dirname(x), "__init__.py")
return os.path.exists(init_py)
dir = os.path.join(self._root_dir, convert_to_native_paths([dir])[0])
g = []
for path, folders, files in os.walk(dir):
g.extend([os.path.join(path, f) for f in files
if not f.startswith('test_') and fnmatch(f, pat)])
if init_only:
# skip files that are not importable (i.e. missing __init__.py)
g = [x for x in g if importable(x)]
return [os.path.normcase(gi) for gi in g]
def _check_dependencies(self,
executables=(),
modules=(),
disable_viewers=(),
python_version=(3, 5)):
"""
Checks if the dependencies for the test are installed.
Raises ``DependencyError`` it at least one dependency is not installed.
"""
for executable in executables:
if not find_executable(executable):
raise DependencyError("Could not find %s" % executable)
for module in modules:
if module == 'matplotlib':
matplotlib = import_module(
'matplotlib',
import_kwargs={'fromlist':
['pyplot', 'cm', 'collections']},
min_module_version='1.0.0', catch=(RuntimeError,))
if matplotlib is None:
raise DependencyError("Could not import matplotlib")
else:
if not import_module(module):
raise DependencyError("Could not import %s" % module)
if disable_viewers:
tempdir = tempfile.mkdtemp()
os.environ['PATH'] = '%s:%s' % (tempdir, os.environ['PATH'])
vw = ('#!/usr/bin/env {}\n'
'import sys\n'
'if len(sys.argv) <= 1:\n'
' exit("wrong number of args")\n').format(
'python3' if PY3 else 'python')
for viewer in disable_viewers:
with open(os.path.join(tempdir, viewer), 'w') as fh:
fh.write(vw)
# make the file executable
os.chmod(os.path.join(tempdir, viewer),
stat.S_IREAD | stat.S_IWRITE | stat.S_IXUSR)
if python_version:
if sys.version_info < python_version:
raise DependencyError("Requires Python >= " + '.'.join(map(str, python_version)))
if 'pyglet' in modules:
# monkey-patch pyglet s.t. it does not open a window during
# doctesting
import pyglet
class DummyWindow(object):
def __init__(self, *args, **kwargs):
self.has_exit = True
self.width = 600
self.height = 400
def set_vsync(self, x):
pass
def switch_to(self):
pass
def push_handlers(self, x):
pass
def close(self):
pass
pyglet.window.Window = DummyWindow
class SymPyDocTestFinder(DocTestFinder):
"""
A class used to extract the DocTests that are relevant to a given
object, from its docstring and the docstrings of its contained
objects. Doctests can currently be extracted from the following
object types: modules, functions, classes, methods, staticmethods,
classmethods, and properties.
Modified from doctest's version to look harder for code that
appears comes from a different module. For example, the @vectorize
decorator makes it look like functions come from multidimensional.py
even though their code exists elsewhere.
"""
def _find(self, tests, obj, name, module, source_lines, globs, seen):
"""
Find tests for the given object and any contained objects, and
add them to ``tests``.
"""
if self._verbose:
print('Finding tests in %s' % name)
# If we've already processed this object, then ignore it.
if id(obj) in seen:
return
seen[id(obj)] = 1
# Make sure we don't run doctests for classes outside of sympy, such
# as in numpy or scipy.
if inspect.isclass(obj):
if obj.__module__.split('.')[0] != 'sympy':
return
# Find a test for this object, and add it to the list of tests.
test = self._get_test(obj, name, module, globs, source_lines)
if test is not None:
tests.append(test)
if not self._recurse:
return
# Look for tests in a module's contained objects.
if inspect.ismodule(obj):
for rawname, val in obj.__dict__.items():
# Recurse to functions & classes.
if inspect.isfunction(val) or inspect.isclass(val):
# Make sure we don't run doctests functions or classes
# from different modules
if val.__module__ != module.__name__:
continue
assert self._from_module(module, val), \
"%s is not in module %s (rawname %s)" % (val, module, rawname)
try:
valname = '%s.%s' % (name, rawname)
self._find(tests, val, valname, module,
source_lines, globs, seen)
except KeyboardInterrupt:
raise
# Look for tests in a module's __test__ dictionary.
for valname, val in getattr(obj, '__test__', {}).items():
if not isinstance(valname, str):
raise ValueError("SymPyDocTestFinder.find: __test__ keys "
"must be strings: %r" %
(type(valname),))
if not (inspect.isfunction(val) or inspect.isclass(val) or
inspect.ismethod(val) or inspect.ismodule(val) or
isinstance(val, str)):
raise ValueError("SymPyDocTestFinder.find: __test__ values "
"must be strings, functions, methods, "
"classes, or modules: %r" %
(type(val),))
valname = '%s.__test__.%s' % (name, valname)
self._find(tests, val, valname, module, source_lines,
globs, seen)
# Look for tests in a class's contained objects.
if inspect.isclass(obj):
for valname, val in obj.__dict__.items():
# Special handling for staticmethod/classmethod.
if isinstance(val, staticmethod):
val = getattr(obj, valname)
if isinstance(val, classmethod):
val = getattr(obj, valname).__func__
# Recurse to methods, properties, and nested classes.
if ((inspect.isfunction(unwrap(val)) or
inspect.isclass(val) or
isinstance(val, property)) and
self._from_module(module, val)):
# Make sure we don't run doctests functions or classes
# from different modules
if isinstance(val, property):
if hasattr(val.fget, '__module__'):
if val.fget.__module__ != module.__name__:
continue
else:
if val.__module__ != module.__name__:
continue
assert self._from_module(module, val), \
"%s is not in module %s (valname %s)" % (
val, module, valname)
valname = '%s.%s' % (name, valname)
self._find(tests, val, valname, module, source_lines,
globs, seen)
def _get_test(self, obj, name, module, globs, source_lines):
"""
Return a DocTest for the given object, if it defines a docstring;
otherwise, return None.
"""
lineno = None
# Extract the object's docstring. If it doesn't have one,
# then return None (no test for this object).
if isinstance(obj, str):
# obj is a string in the case for objects in the polys package.
# Note that source_lines is a binary string (compiled polys
# modules), which can't be handled by _find_lineno so determine
# the line number here.
docstring = obj
matches = re.findall(r"line \d+", name)
assert len(matches) == 1, \
"string '%s' does not contain lineno " % name
# NOTE: this is not the exact linenumber but its better than no
# lineno ;)
lineno = int(matches[0][5:])
else:
try:
if obj.__doc__ is None:
docstring = ''
else:
docstring = obj.__doc__
if not isinstance(docstring, str):
docstring = str(docstring)
except (TypeError, AttributeError):
docstring = ''
# Don't bother if the docstring is empty.
if self._exclude_empty and not docstring:
return None
# check that properties have a docstring because _find_lineno
# assumes it
if isinstance(obj, property):
if obj.fget.__doc__ is None:
return None
# Find the docstring's location in the file.
if lineno is None:
obj = unwrap(obj)
# handling of properties is not implemented in _find_lineno so do
# it here
if hasattr(obj, 'func_closure') and obj.func_closure is not None:
tobj = obj.func_closure[0].cell_contents
elif isinstance(obj, property):
tobj = obj.fget
else:
tobj = obj
lineno = self._find_lineno(tobj, source_lines)
if lineno is None:
return None
# Return a DocTest for this object.
if module is None:
filename = None
else:
filename = getattr(module, '__file__', module.__name__)
if filename[-4:] in (".pyc", ".pyo"):
filename = filename[:-1]
globs['_doctest_depends_on'] = getattr(obj, '_doctest_depends_on', {})
return self._parser.get_doctest(docstring, globs, name,
filename, lineno)
class SymPyDocTestRunner(DocTestRunner):
"""
A class used to run DocTest test cases, and accumulate statistics.
The ``run`` method is used to process a single DocTest case. It
returns a tuple ``(f, t)``, where ``t`` is the number of test cases
tried, and ``f`` is the number of test cases that failed.
Modified from the doctest version to not reset the sys.displayhook (see
issue 5140).
See the docstring of the original DocTestRunner for more information.
"""
def run(self, test, compileflags=None, out=None, clear_globs=True):
"""
Run the examples in ``test``, and display the results using the
writer function ``out``.
The examples are run in the namespace ``test.globs``. If
``clear_globs`` is true (the default), then this namespace will
be cleared after the test runs, to help with garbage
collection. If you would like to examine the namespace after
the test completes, then use ``clear_globs=False``.
``compileflags`` gives the set of flags that should be used by
the Python compiler when running the examples. If not
specified, then it will default to the set of future-import
flags that apply to ``globs``.
The output of each example is checked using
``SymPyDocTestRunner.check_output``, and the results are
formatted by the ``SymPyDocTestRunner.report_*`` methods.
"""
self.test = test
if compileflags is None:
compileflags = pdoctest._extract_future_flags(test.globs)
save_stdout = sys.stdout
if out is None:
out = save_stdout.write
sys.stdout = self._fakeout
# Patch pdb.set_trace to restore sys.stdout during interactive
# debugging (so it's not still redirected to self._fakeout).
# Note that the interactive output will go to *our*
# save_stdout, even if that's not the real sys.stdout; this
# allows us to write test cases for the set_trace behavior.
save_set_trace = pdb.set_trace
self.debugger = pdoctest._OutputRedirectingPdb(save_stdout)
self.debugger.reset()
pdb.set_trace = self.debugger.set_trace
# Patch linecache.getlines, so we can see the example's source
# when we're inside the debugger.
self.save_linecache_getlines = pdoctest.linecache.getlines
linecache.getlines = self.__patched_linecache_getlines
# Fail for deprecation warnings
with raise_on_deprecated():
try:
test.globs['print_function'] = print_function
return self.__run(test, compileflags, out)
finally:
sys.stdout = save_stdout
pdb.set_trace = save_set_trace
linecache.getlines = self.save_linecache_getlines
if clear_globs:
test.globs.clear()
# We have to override the name mangled methods.
monkeypatched_methods = [
'patched_linecache_getlines',
'run',
'record_outcome'
]
for method in monkeypatched_methods:
oldname = '_DocTestRunner__' + method
newname = '_SymPyDocTestRunner__' + method
setattr(SymPyDocTestRunner, newname, getattr(DocTestRunner, oldname))
class SymPyOutputChecker(pdoctest.OutputChecker):
"""
Compared to the OutputChecker from the stdlib our OutputChecker class
supports numerical comparison of floats occurring in the output of the
doctest examples
"""
def __init__(self):
# NOTE OutputChecker is an old-style class with no __init__ method,
# so we can't call the base class version of __init__ here
got_floats = r'(\d+\.\d*|\.\d+)'
# floats in the 'want' string may contain ellipses
want_floats = got_floats + r'(\.{3})?'
front_sep = r'\s|\+|\-|\*|,'
back_sep = front_sep + r'|j|e'
fbeg = r'^%s(?=%s|$)' % (got_floats, back_sep)
fmidend = r'(?<=%s)%s(?=%s|$)' % (front_sep, got_floats, back_sep)
self.num_got_rgx = re.compile(r'(%s|%s)' %(fbeg, fmidend))
fbeg = r'^%s(?=%s|$)' % (want_floats, back_sep)
fmidend = r'(?<=%s)%s(?=%s|$)' % (front_sep, want_floats, back_sep)
self.num_want_rgx = re.compile(r'(%s|%s)' %(fbeg, fmidend))
def check_output(self, want, got, optionflags):
"""
Return True iff the actual output from an example (`got`)
matches the expected output (`want`). These strings are
always considered to match if they are identical; but
depending on what option flags the test runner is using,
several non-exact match types are also possible. See the
documentation for `TestRunner` for more information about
option flags.
"""
# Handle the common case first, for efficiency:
# if they're string-identical, always return true.
if got == want:
return True
# TODO parse integers as well ?
# Parse floats and compare them. If some of the parsed floats contain
# ellipses, skip the comparison.
matches = self.num_got_rgx.finditer(got)
numbers_got = [match.group(1) for match in matches] # list of strs
matches = self.num_want_rgx.finditer(want)
numbers_want = [match.group(1) for match in matches] # list of strs
if len(numbers_got) != len(numbers_want):
return False
if len(numbers_got) > 0:
nw_ = []
for ng, nw in zip(numbers_got, numbers_want):
if '...' in nw:
nw_.append(ng)
continue
else:
nw_.append(nw)
if abs(float(ng)-float(nw)) > 1e-5:
return False
got = self.num_got_rgx.sub(r'%s', got)
got = got % tuple(nw_)
# <BLANKLINE> can be used as a special sequence to signify a
# blank line, unless the DONT_ACCEPT_BLANKLINE flag is used.
if not (optionflags & pdoctest.DONT_ACCEPT_BLANKLINE):
# Replace <BLANKLINE> in want with a blank line.
want = re.sub(r'(?m)^%s\s*?$' % re.escape(pdoctest.BLANKLINE_MARKER),
'', want)
# If a line in got contains only spaces, then remove the
# spaces.
got = re.sub(r'(?m)^\s*?$', '', got)
if got == want:
return True
# This flag causes doctest to ignore any differences in the
# contents of whitespace strings. Note that this can be used
# in conjunction with the ELLIPSIS flag.
if optionflags & pdoctest.NORMALIZE_WHITESPACE:
got = ' '.join(got.split())
want = ' '.join(want.split())
if got == want:
return True
# The ELLIPSIS flag says to let the sequence "..." in `want`
# match any substring in `got`.
if optionflags & pdoctest.ELLIPSIS:
if pdoctest._ellipsis_match(want, got):
return True
# We didn't find any match; return false.
return False
class Reporter(object):
"""
Parent class for all reporters.
"""
pass
class PyTestReporter(Reporter):
"""
Py.test like reporter. Should produce output identical to py.test.
"""
def __init__(self, verbose=False, tb="short", colors=True,
force_colors=False, split=None):
self._verbose = verbose
self._tb_style = tb
self._colors = colors
self._force_colors = force_colors
self._xfailed = 0
self._xpassed = []
self._failed = []
self._failed_doctest = []
self._passed = 0
self._skipped = 0
self._exceptions = []
self._terminal_width = None
self._default_width = 80
self._split = split
self._active_file = ''
self._active_f = None
# TODO: Should these be protected?
self.slow_test_functions = []
self.fast_test_functions = []
# this tracks the x-position of the cursor (useful for positioning
# things on the screen), without the need for any readline library:
self._write_pos = 0
self._line_wrap = False
def root_dir(self, dir):
self._root_dir = dir
@property
def terminal_width(self):
if self._terminal_width is not None:
return self._terminal_width
def findout_terminal_width():
if sys.platform == "win32":
# Windows support is based on:
#
# http://code.activestate.com/recipes/
# 440694-determine-size-of-console-window-on-windows/
from ctypes import windll, create_string_buffer
h = windll.kernel32.GetStdHandle(-12)
csbi = create_string_buffer(22)
res = windll.kernel32.GetConsoleScreenBufferInfo(h, csbi)
if res:
import struct
(_, _, _, _, _, left, _, right, _, _, _) = \
struct.unpack("hhhhHhhhhhh", csbi.raw)
return right - left
else:
return self._default_width
if hasattr(sys.stdout, 'isatty') and not sys.stdout.isatty():
return self._default_width # leave PIPEs alone
try:
process = subprocess.Popen(['stty', '-a'],
stdout=subprocess.PIPE,
stderr=subprocess.PIPE)
stdout = process.stdout.read()
if PY3:
stdout = stdout.decode("utf-8")
except (OSError, IOError):
pass
else:
# We support the following output formats from stty:
#
# 1) Linux -> columns 80
# 2) OS X -> 80 columns
# 3) Solaris -> columns = 80
re_linux = r"columns\s+(?P<columns>\d+);"
re_osx = r"(?P<columns>\d+)\s*columns;"
re_solaris = r"columns\s+=\s+(?P<columns>\d+);"
for regex in (re_linux, re_osx, re_solaris):
match = re.search(regex, stdout)
if match is not None:
columns = match.group('columns')
try:
width = int(columns)
except ValueError:
pass
if width != 0:
return width
return self._default_width
width = findout_terminal_width()
self._terminal_width = width
return width
def write(self, text, color="", align="left", width=None,
force_colors=False):
"""
Prints a text on the screen.
It uses sys.stdout.write(), so no readline library is necessary.
Parameters
==========
color : choose from the colors below, "" means default color
align : "left"/"right", "left" is a normal print, "right" is aligned on
the right-hand side of the screen, filled with spaces if
necessary
width : the screen width
"""
color_templates = (
("Black", "0;30"),
("Red", "0;31"),
("Green", "0;32"),
("Brown", "0;33"),
("Blue", "0;34"),
("Purple", "0;35"),
("Cyan", "0;36"),
("LightGray", "0;37"),
("DarkGray", "1;30"),
("LightRed", "1;31"),
("LightGreen", "1;32"),
("Yellow", "1;33"),
("LightBlue", "1;34"),
("LightPurple", "1;35"),
("LightCyan", "1;36"),
("White", "1;37"),
)
colors = {}
for name, value in color_templates:
colors[name] = value
c_normal = '\033[0m'
c_color = '\033[%sm'
if width is None:
width = self.terminal_width
if align == "right":
if self._write_pos + len(text) > width:
# we don't fit on the current line, create a new line
self.write("\n")
self.write(" "*(width - self._write_pos - len(text)))
if not self._force_colors and hasattr(sys.stdout, 'isatty') and not \
sys.stdout.isatty():
# the stdout is not a terminal, this for example happens if the
# output is piped to less, e.g. "bin/test | less". In this case,
# the terminal control sequences would be printed verbatim, so
# don't use any colors.
color = ""
elif sys.platform == "win32":
# Windows consoles don't support ANSI escape sequences
color = ""
elif not self._colors:
color = ""
if self._line_wrap:
if text[0] != "\n":
sys.stdout.write("\n")
# Avoid UnicodeEncodeError when printing out test failures
if PY3 and IS_WINDOWS:
text = text.encode('raw_unicode_escape').decode('utf8', 'ignore')
elif PY3 and not sys.stdout.encoding.lower().startswith('utf'):
text = text.encode(sys.stdout.encoding, 'backslashreplace'
).decode(sys.stdout.encoding)
if color == "":
sys.stdout.write(text)
else:
sys.stdout.write("%s%s%s" %
(c_color % colors[color], text, c_normal))
sys.stdout.flush()
l = text.rfind("\n")
if l == -1:
self._write_pos += len(text)
else:
self._write_pos = len(text) - l - 1
self._line_wrap = self._write_pos >= width
self._write_pos %= width
def write_center(self, text, delim="="):
width = self.terminal_width
if text != "":
text = " %s " % text
idx = (width - len(text)) // 2
t = delim*idx + text + delim*(width - idx - len(text))
self.write(t + "\n")
def write_exception(self, e, val, tb):
# remove the first item, as that is always runtests.py
tb = tb.tb_next
t = traceback.format_exception(e, val, tb)
self.write("".join(t))
def start(self, seed=None, msg="test process starts"):
self.write_center(msg)
executable = sys.executable
v = tuple(sys.version_info)
python_version = "%s.%s.%s-%s-%s" % v
implementation = platform.python_implementation()
if implementation == 'PyPy':
implementation += " %s.%s.%s-%s-%s" % sys.pypy_version_info
self.write("executable: %s (%s) [%s]\n" %
(executable, python_version, implementation))
from sympy.utilities.misc import ARCH
self.write("architecture: %s\n" % ARCH)
from sympy.core.cache import USE_CACHE
self.write("cache: %s\n" % USE_CACHE)
from sympy.core.compatibility import GROUND_TYPES, HAS_GMPY
version = ''
if GROUND_TYPES =='gmpy':
if HAS_GMPY == 1:
import gmpy
elif HAS_GMPY == 2:
import gmpy2 as gmpy
version = gmpy.version()
self.write("ground types: %s %s\n" % (GROUND_TYPES, version))
numpy = import_module('numpy')
self.write("numpy: %s\n" % (None if not numpy else numpy.__version__))
if seed is not None:
self.write("random seed: %d\n" % seed)
from sympy.utilities.misc import HASH_RANDOMIZATION
self.write("hash randomization: ")
hash_seed = os.getenv("PYTHONHASHSEED") or '0'
if HASH_RANDOMIZATION and (hash_seed == "random" or int(hash_seed)):
self.write("on (PYTHONHASHSEED=%s)\n" % hash_seed)
else:
self.write("off\n")
if self._split:
self.write("split: %s\n" % self._split)
self.write('\n')
self._t_start = clock()
def finish(self):
self._t_end = clock()
self.write("\n")
global text, linelen
text = "tests finished: %d passed, " % self._passed
linelen = len(text)
def add_text(mytext):
global text, linelen
"""Break new text if too long."""
if linelen + len(mytext) > self.terminal_width:
text += '\n'
linelen = 0
text += mytext
linelen += len(mytext)
if len(self._failed) > 0:
add_text("%d failed, " % len(self._failed))
if len(self._failed_doctest) > 0:
add_text("%d failed, " % len(self._failed_doctest))
if self._skipped > 0:
add_text("%d skipped, " % self._skipped)
if self._xfailed > 0:
add_text("%d expected to fail, " % self._xfailed)
if len(self._xpassed) > 0:
add_text("%d expected to fail but passed, " % len(self._xpassed))
if len(self._exceptions) > 0:
add_text("%d exceptions, " % len(self._exceptions))
add_text("in %.2f seconds" % (self._t_end - self._t_start))
if self.slow_test_functions:
self.write_center('slowest tests', '_')
sorted_slow = sorted(self.slow_test_functions, key=lambda r: r[1])
for slow_func_name, taken in sorted_slow:
print('%s - Took %.3f seconds' % (slow_func_name, taken))
if self.fast_test_functions:
self.write_center('unexpectedly fast tests', '_')
sorted_fast = sorted(self.fast_test_functions,
key=lambda r: r[1])
for fast_func_name, taken in sorted_fast:
print('%s - Took %.3f seconds' % (fast_func_name, taken))
if len(self._xpassed) > 0:
self.write_center("xpassed tests", "_")
for e in self._xpassed:
self.write("%s: %s\n" % (e[0], e[1]))
self.write("\n")
if self._tb_style != "no" and len(self._exceptions) > 0:
for e in self._exceptions:
filename, f, (t, val, tb) = e
self.write_center("", "_")
if f is None:
s = "%s" % filename
else:
s = "%s:%s" % (filename, f.__name__)
self.write_center(s, "_")
self.write_exception(t, val, tb)
self.write("\n")
if self._tb_style != "no" and len(self._failed) > 0:
for e in self._failed:
filename, f, (t, val, tb) = e
self.write_center("", "_")
self.write_center("%s:%s" % (filename, f.__name__), "_")
self.write_exception(t, val, tb)
self.write("\n")
if self._tb_style != "no" and len(self._failed_doctest) > 0:
for e in self._failed_doctest:
filename, msg = e
self.write_center("", "_")
self.write_center("%s" % filename, "_")
self.write(msg)
self.write("\n")
self.write_center(text)
ok = len(self._failed) == 0 and len(self._exceptions) == 0 and \
len(self._failed_doctest) == 0
if not ok:
self.write("DO *NOT* COMMIT!\n")
return ok
def entering_filename(self, filename, n):
rel_name = filename[len(self._root_dir) + 1:]
self._active_file = rel_name
self._active_file_error = False
self.write(rel_name)
self.write("[%d] " % n)
def leaving_filename(self):
self.write(" ")
if self._active_file_error:
self.write("[FAIL]", "Red", align="right")
else:
self.write("[OK]", "Green", align="right")
self.write("\n")
if self._verbose:
self.write("\n")
def entering_test(self, f):
self._active_f = f
if self._verbose:
self.write("\n" + f.__name__ + " ")
def test_xfail(self):
self._xfailed += 1
self.write("f", "Green")
def test_xpass(self, v):
message = str(v)
self._xpassed.append((self._active_file, message))
self.write("X", "Green")
def test_fail(self, exc_info):
self._failed.append((self._active_file, self._active_f, exc_info))
self.write("F", "Red")
self._active_file_error = True
def doctest_fail(self, name, error_msg):
# the first line contains "******", remove it:
error_msg = "\n".join(error_msg.split("\n")[1:])
self._failed_doctest.append((name, error_msg))
self.write("F", "Red")
self._active_file_error = True
def test_pass(self, char="."):
self._passed += 1
if self._verbose:
self.write("ok", "Green")
else:
self.write(char, "Green")
def test_skip(self, v=None):
char = "s"
self._skipped += 1
if v is not None:
message = str(v)
if message == "KeyboardInterrupt":
char = "K"
elif message == "Timeout":
char = "T"
elif message == "Slow":
char = "w"
if self._verbose:
if v is not None:
self.write(message + ' ', "Blue")
else:
self.write(" - ", "Blue")
self.write(char, "Blue")
def test_exception(self, exc_info):
self._exceptions.append((self._active_file, self._active_f, exc_info))
if exc_info[0] is TimeOutError:
self.write("T", "Red")
else:
self.write("E", "Red")
self._active_file_error = True
def import_error(self, filename, exc_info):
self._exceptions.append((filename, None, exc_info))
rel_name = filename[len(self._root_dir) + 1:]
self.write(rel_name)
self.write("[?] Failed to import", "Red")
self.write(" ")
self.write("[FAIL]", "Red", align="right")
self.write("\n")
|
5c27a0b9754ed41e4048d5ea84d53374710f9e20ed90afdc9c090bd1abdd6d33
|
from sympy.vector.coordsysrect import CoordSys3D, CoordSysCartesian
from sympy.vector.vector import (Vector, VectorAdd, VectorMul,
BaseVector, VectorZero, Cross, Dot, cross, dot)
from sympy.vector.dyadic import (Dyadic, DyadicAdd, DyadicMul,
BaseDyadic, DyadicZero)
from sympy.vector.scalar import BaseScalar
from sympy.vector.deloperator import Del
from sympy.vector.functions import (express, matrix_to_vector,
laplacian, is_conservative,
is_solenoidal, scalar_potential,
directional_derivative,
scalar_potential_difference)
from sympy.vector.point import Point
from sympy.vector.orienters import (AxisOrienter, BodyOrienter,
SpaceOrienter, QuaternionOrienter)
from sympy.vector.operators import Gradient, Divergence, Curl, Laplacian, gradient, curl, divergence
from sympy.vector.parametricregion import ParametricRegion
__all__ = [
'Vector', 'VectorAdd', 'VectorMul', 'BaseVector', 'VectorZero', 'Cross',
'Dot', 'cross', 'dot',
'Dyadic', 'DyadicAdd', 'DyadicMul', 'BaseDyadic', 'DyadicZero',
'BaseScalar',
'Del',
'CoordSys3D', 'CoordSysCartesian',
'express', 'matrix_to_vector', 'laplacian', 'is_conservative',
'is_solenoidal', 'scalar_potential', 'directional_derivative',
'scalar_potential_difference',
'Point',
'AxisOrienter', 'BodyOrienter', 'SpaceOrienter', 'QuaternionOrienter',
'Gradient', 'Divergence', 'Curl', 'Laplacian', 'gradient', 'curl',
'divergence',
'ParametricRegion',
]
|
1c00bc0a8d8861f54b447b358e046c14c0c4352e04314df35648f05c77658267
|
from sympy.core.basic import Basic
from sympy.core.containers import Tuple
class ParametricRegion(Basic):
"""
Represents a parametric region in space.
Examples
========
>>> from sympy import cos, sin, pi
>>> from sympy.abc import r, theta, t, a, b, x, y
>>> from sympy.vector import ParametricRegion
>>> ParametricRegion((t, t**2), (t, -1, 2))
ParametricRegion((t, t**2), (t, -1, 2))
>>> ParametricRegion((x, y), (x, 3, 4), (y, 5, 6))
ParametricRegion((x, y), (x, 3, 4), (y, 5, 6))
>>> ParametricRegion((r*cos(theta), r*sin(theta)), (r, -2, 2), (theta, 0, pi))
ParametricRegion((r*cos(theta), r*sin(theta)), (r, -2, 2), (theta, 0, pi))
>>> ParametricRegion((a*cos(t), b*sin(t)), t)
ParametricRegion((a*cos(t), b*sin(t)), t)
>>> circle = ParametricRegion((r*cos(theta), r*sin(theta)), r, (theta, 0, pi))
>>> circle.parameters
(r, theta)
>>> circle.definition
(r*cos(theta), r*sin(theta))
>>> circle.limits
{theta: (0, pi)}
Dimension of a parametric region determines whether a region is a curve, surface
or volume region. It does not represent its dimensions in space.
>>> circle.dimensions
1
Parameters
==========
definition : tuple to define base scalars in terms of parameters.
bounds : Parameter or a tuple of length 3 to define parameter and
corresponding lower and upper bound
"""
def __new__(cls, definition, *bounds):
parameters = ()
limits = {}
if not isinstance(bounds, Tuple):
bounds = Tuple(*bounds)
for bound in bounds:
if isinstance(bound, tuple) or isinstance(bound, Tuple):
if len(bound) != 3:
raise ValueError("Tuple should be in the form (parameter, lowerbound, upperbound)")
parameters += (bound[0],)
limits[bound[0]] = (bound[1], bound[2])
else:
parameters += (bound,)
if not (isinstance(definition, tuple) or isinstance(definition, Tuple)):
definition = (definition,)
obj = super().__new__(cls, Tuple(*definition), *bounds)
obj._parameters = parameters
obj._limits = limits
return obj
@property
def definition(self):
return self.args[0]
@property
def limits(self):
return self._limits
@property
def parameters(self):
return self._parameters
@property
def dimensions(self):
return len(self.limits)
|
ee4f8506a0a716e51b4987a9b9ba3dc100e2114a27f3c401ee6f35f31340e4a8
|
from __future__ import division, print_function
from contextlib import contextmanager
from threading import local
from sympy.core.function import expand_mul
from sympy.simplify.simplify import dotprodsimp as _dotprodsimp
_dotprodsimp_state = local()
_dotprodsimp_state.state = False
@contextmanager
def dotprodsimp(x):
old = _dotprodsimp_state.state
try:
_dotprodsimp_state.state = x
yield
finally:
_dotprodsimp_state.state = old
def _get_intermediate_simp(deffunc=lambda x: x, offfunc=lambda x: x,
onfunc=_dotprodsimp, dotprodsimp=None):
"""Support function for controlling intermediate simplification. Returns a
simplification function according to the global setting of dotprodsimp
operation.
``deffunc`` - Function to be used by default.
``offfunc`` - Function to be used if dotprodsimp has been turned off.
``onfunc`` - Function to be used if dotprodsimp has been turned on.
``dotprodsimp`` - True, False or None. Will be overriden by global
_dotprodsimp_state.state if that is not None.
"""
if dotprodsimp is False or _dotprodsimp_state.state is False:
return offfunc
if dotprodsimp is True or _dotprodsimp_state.state is True:
return onfunc
return deffunc # None, None
def _get_intermediate_simp_bool(default=False, dotprodsimp=None):
"""Same as ``_get_intermediate_simp`` but returns bools instead of functions
by default."""
return _get_intermediate_simp(default, False, True, dotprodsimp)
def _iszero(x):
"""Returns True if x is zero."""
return getattr(x, 'is_zero', None)
def _is_zero_after_expand_mul(x):
"""Tests by expand_mul only, suitable for polynomials and rational
functions."""
return expand_mul(x) == 0
|
4338e10a03cfa7bc5e6fae29125d20519f19677d10fe9188f4d8a8595cb9f15c
|
from types import FunctionType
from sympy.core.numbers import Float, Integer
from sympy.core.singleton import S
from sympy.core.symbol import uniquely_named_symbol
from sympy.polys import PurePoly, cancel
from sympy.simplify.simplify import (simplify as _simplify,
dotprodsimp as _dotprodsimp)
from .common import MatrixError, NonSquareMatrixError
from .utilities import (
_get_intermediate_simp, _get_intermediate_simp_bool,
_iszero, _is_zero_after_expand_mul)
def _find_reasonable_pivot(col, iszerofunc=_iszero, simpfunc=_simplify):
""" Find the lowest index of an item in ``col`` that is
suitable for a pivot. If ``col`` consists only of
Floats, the pivot with the largest norm is returned.
Otherwise, the first element where ``iszerofunc`` returns
False is used. If ``iszerofunc`` doesn't return false,
items are simplified and retested until a suitable
pivot is found.
Returns a 4-tuple
(pivot_offset, pivot_val, assumed_nonzero, newly_determined)
where pivot_offset is the index of the pivot, pivot_val is
the (possibly simplified) value of the pivot, assumed_nonzero
is True if an assumption that the pivot was non-zero
was made without being proved, and newly_determined are
elements that were simplified during the process of pivot
finding."""
newly_determined = []
col = list(col)
# a column that contains a mix of floats and integers
# but at least one float is considered a numerical
# column, and so we do partial pivoting
if all(isinstance(x, (Float, Integer)) for x in col) and any(
isinstance(x, Float) for x in col):
col_abs = [abs(x) for x in col]
max_value = max(col_abs)
if iszerofunc(max_value):
# just because iszerofunc returned True, doesn't
# mean the value is numerically zero. Make sure
# to replace all entries with numerical zeros
if max_value != 0:
newly_determined = [(i, 0) for i, x in enumerate(col) if x != 0]
return (None, None, False, newly_determined)
index = col_abs.index(max_value)
return (index, col[index], False, newly_determined)
# PASS 1 (iszerofunc directly)
possible_zeros = []
for i, x in enumerate(col):
is_zero = iszerofunc(x)
# is someone wrote a custom iszerofunc, it may return
# BooleanFalse or BooleanTrue instead of True or False,
# so use == for comparison instead of `is`
if is_zero == False:
# we found something that is definitely not zero
return (i, x, False, newly_determined)
possible_zeros.append(is_zero)
# by this point, we've found no certain non-zeros
if all(possible_zeros):
# if everything is definitely zero, we have
# no pivot
return (None, None, False, newly_determined)
# PASS 2 (iszerofunc after simplify)
# we haven't found any for-sure non-zeros, so
# go through the elements iszerofunc couldn't
# make a determination about and opportunistically
# simplify to see if we find something
for i, x in enumerate(col):
if possible_zeros[i] is not None:
continue
simped = simpfunc(x)
is_zero = iszerofunc(simped)
if is_zero == True or is_zero == False:
newly_determined.append((i, simped))
if is_zero == False:
return (i, simped, False, newly_determined)
possible_zeros[i] = is_zero
# after simplifying, some things that were recognized
# as zeros might be zeros
if all(possible_zeros):
# if everything is definitely zero, we have
# no pivot
return (None, None, False, newly_determined)
# PASS 3 (.equals(0))
# some expressions fail to simplify to zero, but
# ``.equals(0)`` evaluates to True. As a last-ditch
# attempt, apply ``.equals`` to these expressions
for i, x in enumerate(col):
if possible_zeros[i] is not None:
continue
if x.equals(S.Zero):
# ``.iszero`` may return False with
# an implicit assumption (e.g., ``x.equals(0)``
# when ``x`` is a symbol), so only treat it
# as proved when ``.equals(0)`` returns True
possible_zeros[i] = True
newly_determined.append((i, S.Zero))
if all(possible_zeros):
return (None, None, False, newly_determined)
# at this point there is nothing that could definitely
# be a pivot. To maintain compatibility with existing
# behavior, we'll assume that an illdetermined thing is
# non-zero. We should probably raise a warning in this case
i = possible_zeros.index(None)
return (i, col[i], True, newly_determined)
def _find_reasonable_pivot_naive(col, iszerofunc=_iszero, simpfunc=None):
"""
Helper that computes the pivot value and location from a
sequence of contiguous matrix column elements. As a side effect
of the pivot search, this function may simplify some of the elements
of the input column. A list of these simplified entries and their
indices are also returned.
This function mimics the behavior of _find_reasonable_pivot(),
but does less work trying to determine if an indeterminate candidate
pivot simplifies to zero. This more naive approach can be much faster,
with the trade-off that it may erroneously return a pivot that is zero.
``col`` is a sequence of contiguous column entries to be searched for
a suitable pivot.
``iszerofunc`` is a callable that returns a Boolean that indicates
if its input is zero, or None if no such determination can be made.
``simpfunc`` is a callable that simplifies its input. It must return
its input if it does not simplify its input. Passing in
``simpfunc=None`` indicates that the pivot search should not attempt
to simplify any candidate pivots.
Returns a 4-tuple:
(pivot_offset, pivot_val, assumed_nonzero, newly_determined)
``pivot_offset`` is the sequence index of the pivot.
``pivot_val`` is the value of the pivot.
pivot_val and col[pivot_index] are equivalent, but will be different
when col[pivot_index] was simplified during the pivot search.
``assumed_nonzero`` is a boolean indicating if the pivot cannot be
guaranteed to be zero. If assumed_nonzero is true, then the pivot
may or may not be non-zero. If assumed_nonzero is false, then
the pivot is non-zero.
``newly_determined`` is a list of index-value pairs of pivot candidates
that were simplified during the pivot search.
"""
# indeterminates holds the index-value pairs of each pivot candidate
# that is neither zero or non-zero, as determined by iszerofunc().
# If iszerofunc() indicates that a candidate pivot is guaranteed
# non-zero, or that every candidate pivot is zero then the contents
# of indeterminates are unused.
# Otherwise, the only viable candidate pivots are symbolic.
# In this case, indeterminates will have at least one entry,
# and all but the first entry are ignored when simpfunc is None.
indeterminates = []
for i, col_val in enumerate(col):
col_val_is_zero = iszerofunc(col_val)
if col_val_is_zero == False:
# This pivot candidate is non-zero.
return i, col_val, False, []
elif col_val_is_zero is None:
# The candidate pivot's comparison with zero
# is indeterminate.
indeterminates.append((i, col_val))
if len(indeterminates) == 0:
# All candidate pivots are guaranteed to be zero, i.e. there is
# no pivot.
return None, None, False, []
if simpfunc is None:
# Caller did not pass in a simplification function that might
# determine if an indeterminate pivot candidate is guaranteed
# to be nonzero, so assume the first indeterminate candidate
# is non-zero.
return indeterminates[0][0], indeterminates[0][1], True, []
# newly_determined holds index-value pairs of candidate pivots
# that were simplified during the search for a non-zero pivot.
newly_determined = []
for i, col_val in indeterminates:
tmp_col_val = simpfunc(col_val)
if id(col_val) != id(tmp_col_val):
# simpfunc() simplified this candidate pivot.
newly_determined.append((i, tmp_col_val))
if iszerofunc(tmp_col_val) == False:
# Candidate pivot simplified to a guaranteed non-zero value.
return i, tmp_col_val, False, newly_determined
return indeterminates[0][0], indeterminates[0][1], True, newly_determined
# This functions is a candidate for caching if it gets implemented for matrices.
def _berkowitz_toeplitz_matrix(M):
"""Return (A,T) where T the Toeplitz matrix used in the Berkowitz algorithm
corresponding to ``M`` and A is the first principal submatrix.
"""
# the 0 x 0 case is trivial
if M.rows == 0 and M.cols == 0:
return M._new(1,1, [M.one])
#
# Partition M = [ a_11 R ]
# [ C A ]
#
a, R = M[0,0], M[0, 1:]
C, A = M[1:, 0], M[1:,1:]
#
# The Toeplitz matrix looks like
#
# [ 1 ]
# [ -a 1 ]
# [ -RC -a 1 ]
# [ -RAC -RC -a 1 ]
# [ -RA**2C -RAC -RC -a 1 ]
# etc.
# Compute the diagonal entries.
# Because multiplying matrix times vector is so much
# more efficient than matrix times matrix, recursively
# compute -R * A**n * C.
diags = [C]
for i in range(M.rows - 2):
diags.append(A.multiply(diags[i], dotprodsimp=None))
diags = [(-R).multiply(d, dotprodsimp=None)[0, 0] for d in diags]
diags = [M.one, -a] + diags
def entry(i,j):
if j > i:
return M.zero
return diags[i - j]
toeplitz = M._new(M.cols + 1, M.rows, entry)
return (A, toeplitz)
# This functions is a candidate for caching if it gets implemented for matrices.
def _berkowitz_vector(M):
""" Run the Berkowitz algorithm and return a vector whose entries
are the coefficients of the characteristic polynomial of ``M``.
Given N x N matrix, efficiently compute
coefficients of characteristic polynomials of ``M``
without division in the ground domain.
This method is particularly useful for computing determinant,
principal minors and characteristic polynomial when ``M``
has complicated coefficients e.g. polynomials. Semi-direct
usage of this algorithm is also important in computing
efficiently sub-resultant PRS.
Assuming that M is a square matrix of dimension N x N and
I is N x N identity matrix, then the Berkowitz vector is
an N x 1 vector whose entries are coefficients of the
polynomial
charpoly(M) = det(t*I - M)
As a consequence, all polynomials generated by Berkowitz
algorithm are monic.
For more information on the implemented algorithm refer to:
[1] S.J. Berkowitz, On computing the determinant in small
parallel time using a small number of processors, ACM,
Information Processing Letters 18, 1984, pp. 147-150
[2] M. Keber, Division-Free computation of sub-resultants
using Bezout matrices, Tech. Report MPI-I-2006-1-006,
Saarbrucken, 2006
"""
# handle the trivial cases
if M.rows == 0 and M.cols == 0:
return M._new(1, 1, [M.one])
elif M.rows == 1 and M.cols == 1:
return M._new(2, 1, [M.one, -M[0,0]])
submat, toeplitz = _berkowitz_toeplitz_matrix(M)
return toeplitz.multiply(_berkowitz_vector(submat), dotprodsimp=None)
def _adjugate(M, method="berkowitz"):
"""Returns the adjugate, or classical adjoint, of
a matrix. That is, the transpose of the matrix of cofactors.
https://en.wikipedia.org/wiki/Adjugate
Parameters
==========
method : string, optional
Method to use to find the cofactors, can be "bareiss", "berkowitz" or
"lu".
Examples
========
>>> from sympy import Matrix
>>> M = Matrix([[1, 2], [3, 4]])
>>> M.adjugate()
Matrix([
[ 4, -2],
[-3, 1]])
See Also
========
cofactor_matrix
sympy.matrices.common.MatrixCommon.transpose
"""
return M.cofactor_matrix(method=method).transpose()
# This functions is a candidate for caching if it gets implemented for matrices.
def _charpoly(M, x='lambda', simplify=_simplify):
"""Computes characteristic polynomial det(x*I - M) where I is
the identity matrix.
A PurePoly is returned, so using different variables for ``x`` does
not affect the comparison or the polynomials:
Parameters
==========
x : string, optional
Name for the "lambda" variable, defaults to "lambda".
simplify : function, optional
Simplification function to use on the characteristic polynomial
calculated. Defaults to ``simplify``.
Examples
========
>>> from sympy import Matrix
>>> from sympy.abc import x, y
>>> M = Matrix([[1, 3], [2, 0]])
>>> M.charpoly()
PurePoly(lambda**2 - lambda - 6, lambda, domain='ZZ')
>>> M.charpoly(x) == M.charpoly(y)
True
>>> M.charpoly(x) == M.charpoly(y)
True
Specifying ``x`` is optional; a symbol named ``lambda`` is used by
default (which looks good when pretty-printed in unicode):
>>> M.charpoly().as_expr()
lambda**2 - lambda - 6
And if ``x`` clashes with an existing symbol, underscores will
be prepended to the name to make it unique:
>>> M = Matrix([[1, 2], [x, 0]])
>>> M.charpoly(x).as_expr()
_x**2 - _x - 2*x
Whether you pass a symbol or not, the generator can be obtained
with the gen attribute since it may not be the same as the symbol
that was passed:
>>> M.charpoly(x).gen
_x
>>> M.charpoly(x).gen == x
False
Notes
=====
The Samuelson-Berkowitz algorithm is used to compute
the characteristic polynomial efficiently and without any
division operations. Thus the characteristic polynomial over any
commutative ring without zero divisors can be computed.
If the determinant det(x*I - M) can be found out easily as
in the case of an upper or a lower triangular matrix, then
instead of Samuelson-Berkowitz algorithm, eigenvalues are computed
and the characteristic polynomial with their help.
See Also
========
det
"""
if not M.is_square:
raise NonSquareMatrixError()
if M.is_lower or M.is_upper:
diagonal_elements = M.diagonal()
x = uniquely_named_symbol(x, diagonal_elements, modify=lambda s: '_' + s)
m = 1
for i in diagonal_elements:
m = m * (x - simplify(i))
return PurePoly(m, x)
berk_vector = _berkowitz_vector(M)
x = uniquely_named_symbol(x, berk_vector, modify=lambda s: '_' + s)
return PurePoly([simplify(a) for a in berk_vector], x)
def _cofactor(M, i, j, method="berkowitz"):
"""Calculate the cofactor of an element.
Parameters
==========
method : string, optional
Method to use to find the cofactors, can be "bareiss", "berkowitz" or
"lu".
Examples
========
>>> from sympy import Matrix
>>> M = Matrix([[1, 2], [3, 4]])
>>> M.cofactor(0, 1)
-3
See Also
========
cofactor_matrix
minor
minor_submatrix
"""
if not M.is_square or M.rows < 1:
raise NonSquareMatrixError()
return (-1)**((i + j) % 2) * M.minor(i, j, method)
def _cofactor_matrix(M, method="berkowitz"):
"""Return a matrix containing the cofactor of each element.
Parameters
==========
method : string, optional
Method to use to find the cofactors, can be "bareiss", "berkowitz" or
"lu".
Examples
========
>>> from sympy import Matrix
>>> M = Matrix([[1, 2], [3, 4]])
>>> M.cofactor_matrix()
Matrix([
[ 4, -3],
[-2, 1]])
See Also
========
cofactor
minor
minor_submatrix
"""
if not M.is_square or M.rows < 1:
raise NonSquareMatrixError()
return M._new(M.rows, M.cols,
lambda i, j: M.cofactor(i, j, method))
# This functions is a candidate for caching if it gets implemented for matrices.
def _det(M, method="bareiss", iszerofunc=None):
"""Computes the determinant of a matrix if ``M`` is a concrete matrix object
otherwise return an expressions ``Determinant(M)`` if ``M`` is a
``MatrixSymbol`` or other expression.
Parameters
==========
method : string, optional
Specifies the algorithm used for computing the matrix determinant.
If the matrix is at most 3x3, a hard-coded formula is used and the
specified method is ignored. Otherwise, it defaults to
``'bareiss'``.
Also, if the matrix is an upper or a lower triangular matrix, determinant
is computed by simple multiplication of diagonal elements, and the
specified method is ignored.
If it is set to ``'bareiss'``, Bareiss' fraction-free algorithm will
be used.
If it is set to ``'berkowitz'``, Berkowitz' algorithm will be used.
Otherwise, if it is set to ``'lu'``, LU decomposition will be used.
.. note::
For backward compatibility, legacy keys like "bareis" and
"det_lu" can still be used to indicate the corresponding
methods.
And the keys are also case-insensitive for now. However, it is
suggested to use the precise keys for specifying the method.
iszerofunc : FunctionType or None, optional
If it is set to ``None``, it will be defaulted to ``_iszero`` if the
method is set to ``'bareiss'``, and ``_is_zero_after_expand_mul`` if
the method is set to ``'lu'``.
It can also accept any user-specified zero testing function, if it
is formatted as a function which accepts a single symbolic argument
and returns ``True`` if it is tested as zero and ``False`` if it
tested as non-zero, and also ``None`` if it is undecidable.
Returns
=======
det : Basic
Result of determinant.
Raises
======
ValueError
If unrecognized keys are given for ``method`` or ``iszerofunc``.
NonSquareMatrixError
If attempted to calculate determinant from a non-square matrix.
Examples
========
>>> from sympy import Matrix, eye, det
>>> I3 = eye(3)
>>> det(I3)
1
>>> M = Matrix([[1, 2], [3, 4]])
>>> det(M)
-2
>>> det(M) == M.det()
True
"""
# sanitize `method`
method = method.lower()
if method == "bareis":
method = "bareiss"
elif method == "det_lu":
method = "lu"
if method not in ("bareiss", "berkowitz", "lu"):
raise ValueError("Determinant method '%s' unrecognized" % method)
if iszerofunc is None:
if method == "bareiss":
iszerofunc = _is_zero_after_expand_mul
elif method == "lu":
iszerofunc = _iszero
elif not isinstance(iszerofunc, FunctionType):
raise ValueError("Zero testing method '%s' unrecognized" % iszerofunc)
n = M.rows
if n == M.cols: # square check is done in individual method functions
if M.is_upper or M.is_lower:
m = 1
for i in range(n):
m = m * M[i, i]
return _get_intermediate_simp(_dotprodsimp)(m)
elif n == 0:
return M.one
elif n == 1:
return M[0,0]
elif n == 2:
m = M[0, 0] * M[1, 1] - M[0, 1] * M[1, 0]
return _get_intermediate_simp(_dotprodsimp)(m)
elif n == 3:
m = (M[0, 0] * M[1, 1] * M[2, 2]
+ M[0, 1] * M[1, 2] * M[2, 0]
+ M[0, 2] * M[1, 0] * M[2, 1]
- M[0, 2] * M[1, 1] * M[2, 0]
- M[0, 0] * M[1, 2] * M[2, 1]
- M[0, 1] * M[1, 0] * M[2, 2])
return _get_intermediate_simp(_dotprodsimp)(m)
if method == "bareiss":
return M._eval_det_bareiss(iszerofunc=iszerofunc)
elif method == "berkowitz":
return M._eval_det_berkowitz()
elif method == "lu":
return M._eval_det_lu(iszerofunc=iszerofunc)
else:
raise MatrixError('unknown method for calculating determinant')
# This functions is a candidate for caching if it gets implemented for matrices.
def _det_bareiss(M, iszerofunc=_is_zero_after_expand_mul):
"""Compute matrix determinant using Bareiss' fraction-free
algorithm which is an extension of the well known Gaussian
elimination method. This approach is best suited for dense
symbolic matrices and will result in a determinant with
minimal number of fractions. It means that less term
rewriting is needed on resulting formulae.
Parameters
==========
iszerofunc : function, optional
The function to use to determine zeros when doing an LU decomposition.
Defaults to ``lambda x: x.is_zero``.
TODO: Implement algorithm for sparse matrices (SFF),
http://www.eecis.udel.edu/~saunders/papers/sffge/it5.ps.
"""
# Recursively implemented Bareiss' algorithm as per Deanna Richelle Leggett's
# thesis http://www.math.usm.edu/perry/Research/Thesis_DRL.pdf
def bareiss(mat, cumm=1):
if mat.rows == 0:
return mat.one
elif mat.rows == 1:
return mat[0, 0]
# find a pivot and extract the remaining matrix
# With the default iszerofunc, _find_reasonable_pivot slows down
# the computation by the factor of 2.5 in one test.
# Relevant issues: #10279 and #13877.
pivot_pos, pivot_val, _, _ = _find_reasonable_pivot(mat[:, 0], iszerofunc=iszerofunc)
if pivot_pos is None:
return mat.zero
# if we have a valid pivot, we'll do a "row swap", so keep the
# sign of the det
sign = (-1) ** (pivot_pos % 2)
# we want every row but the pivot row and every column
rows = list(i for i in range(mat.rows) if i != pivot_pos)
cols = list(range(mat.cols))
tmp_mat = mat.extract(rows, cols)
def entry(i, j):
ret = (pivot_val*tmp_mat[i, j + 1] - mat[pivot_pos, j + 1]*tmp_mat[i, 0]) / cumm
if _get_intermediate_simp_bool(True):
return _dotprodsimp(ret)
elif not ret.is_Atom:
return cancel(ret)
return ret
return sign*bareiss(M._new(mat.rows - 1, mat.cols - 1, entry), pivot_val)
if not M.is_square:
raise NonSquareMatrixError()
if M.rows == 0:
return M.one
# sympy/matrices/tests/test_matrices.py contains a test that
# suggests that the determinant of a 0 x 0 matrix is one, by
# convention.
return bareiss(M)
def _det_berkowitz(M):
""" Use the Berkowitz algorithm to compute the determinant."""
if not M.is_square:
raise NonSquareMatrixError()
if M.rows == 0:
return M.one
# sympy/matrices/tests/test_matrices.py contains a test that
# suggests that the determinant of a 0 x 0 matrix is one, by
# convention.
berk_vector = _berkowitz_vector(M)
return (-1)**(len(berk_vector) - 1) * berk_vector[-1]
# This functions is a candidate for caching if it gets implemented for matrices.
def _det_LU(M, iszerofunc=_iszero, simpfunc=None):
""" Computes the determinant of a matrix from its LU decomposition.
This function uses the LU decomposition computed by
LUDecomposition_Simple().
The keyword arguments iszerofunc and simpfunc are passed to
LUDecomposition_Simple().
iszerofunc is a callable that returns a boolean indicating if its
input is zero, or None if it cannot make the determination.
simpfunc is a callable that simplifies its input.
The default is simpfunc=None, which indicate that the pivot search
algorithm should not attempt to simplify any candidate pivots.
If simpfunc fails to simplify its input, then it must return its input
instead of a copy.
Parameters
==========
iszerofunc : function, optional
The function to use to determine zeros when doing an LU decomposition.
Defaults to ``lambda x: x.is_zero``.
simpfunc : function, optional
The simplification function to use when looking for zeros for pivots.
"""
if not M.is_square:
raise NonSquareMatrixError()
if M.rows == 0:
return M.one
# sympy/matrices/tests/test_matrices.py contains a test that
# suggests that the determinant of a 0 x 0 matrix is one, by
# convention.
lu, row_swaps = M.LUdecomposition_Simple(iszerofunc=iszerofunc,
simpfunc=simpfunc)
# P*A = L*U => det(A) = det(L)*det(U)/det(P) = det(P)*det(U).
# Lower triangular factor L encoded in lu has unit diagonal => det(L) = 1.
# P is a permutation matrix => det(P) in {-1, 1} => 1/det(P) = det(P).
# LUdecomposition_Simple() returns a list of row exchange index pairs, rather
# than a permutation matrix, but det(P) = (-1)**len(row_swaps).
# Avoid forming the potentially time consuming product of U's diagonal entries
# if the product is zero.
# Bottom right entry of U is 0 => det(A) = 0.
# It may be impossible to determine if this entry of U is zero when it is symbolic.
if iszerofunc(lu[lu.rows-1, lu.rows-1]):
return M.zero
# Compute det(P)
det = -M.one if len(row_swaps)%2 else M.one
# Compute det(U) by calculating the product of U's diagonal entries.
# The upper triangular portion of lu is the upper triangular portion of the
# U factor in the LU decomposition.
for k in range(lu.rows):
det *= lu[k, k]
# return det(P)*det(U)
return det
def _minor(M, i, j, method="berkowitz"):
"""Return the (i,j) minor of ``M``. That is,
return the determinant of the matrix obtained by deleting
the `i`th row and `j`th column from ``M``.
Parameters
==========
i, j : int
The row and column to exclude to obtain the submatrix.
method : string, optional
Method to use to find the determinant of the submatrix, can be
"bareiss", "berkowitz" or "lu".
Examples
========
>>> from sympy import Matrix
>>> M = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]])
>>> M.minor(1, 1)
-12
See Also
========
minor_submatrix
cofactor
det
"""
if not M.is_square:
raise NonSquareMatrixError()
return M.minor_submatrix(i, j).det(method=method)
def _minor_submatrix(M, i, j):
"""Return the submatrix obtained by removing the `i`th row
and `j`th column from ``M`` (works with Pythonic negative indices).
Parameters
==========
i, j : int
The row and column to exclude to obtain the submatrix.
Examples
========
>>> from sympy import Matrix
>>> M = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]])
>>> M.minor_submatrix(1, 1)
Matrix([
[1, 3],
[7, 9]])
See Also
========
minor
cofactor
"""
if i < 0:
i += M.rows
if j < 0:
j += M.cols
if not 0 <= i < M.rows or not 0 <= j < M.cols:
raise ValueError("`i` and `j` must satisfy 0 <= i < ``M.rows`` "
"(%d)" % M.rows + "and 0 <= j < ``M.cols`` (%d)." % M.cols)
rows = [a for a in range(M.rows) if a != i]
cols = [a for a in range(M.cols) if a != j]
return M.extract(rows, cols)
|
cacc7bd971027e3b25ba14af22951fe7ae22de29070e559e7929636ba40c1d6b
|
"""A module that handles matrices.
Includes functions for fast creating matrices like zero, one/eye, random
matrix, etc.
"""
from .common import ShapeError, NonSquareMatrixError
from .dense import (
GramSchmidt, casoratian, diag, eye, hessian, jordan_cell,
list2numpy, matrix2numpy, matrix_multiply_elementwise, ones,
randMatrix, rot_axis1, rot_axis2, rot_axis3, symarray, wronskian,
zeros)
from .dense import MutableDenseMatrix
from .matrices import DeferredVector, MatrixBase
Matrix = MutableMatrix = MutableDenseMatrix
from .sparse import MutableSparseMatrix
from .sparsetools import banded
from .immutable import ImmutableDenseMatrix, ImmutableSparseMatrix
ImmutableMatrix = ImmutableDenseMatrix
SparseMatrix = MutableSparseMatrix
from .expressions import (
MatrixSlice, BlockDiagMatrix, BlockMatrix, FunctionMatrix, Identity,
Inverse, MatAdd, MatMul, MatPow, MatrixExpr, MatrixSymbol, Trace,
Transpose, ZeroMatrix, OneMatrix, blockcut, block_collapse, matrix_symbols, Adjoint,
hadamard_product, HadamardProduct, HadamardPower, Determinant, det,
diagonalize_vector, DiagMatrix, DiagonalMatrix, DiagonalOf, trace,
DotProduct, kronecker_product, KroneckerProduct,
PermutationMatrix, MatrixPermute)
from .utilities import dotprodsimp
__all__ = [
'ShapeError', 'NonSquareMatrixError',
'GramSchmidt', 'casoratian', 'diag', 'eye', 'hessian', 'jordan_cell',
'list2numpy', 'matrix2numpy', 'matrix_multiply_elementwise', 'ones',
'randMatrix', 'rot_axis1', 'rot_axis2', 'rot_axis3', 'symarray',
'wronskian', 'zeros',
'MutableDenseMatrix',
'DeferredVector', 'MatrixBase',
'Matrix', 'MutableMatrix',
'MutableSparseMatrix',
'banded',
'ImmutableDenseMatrix', 'ImmutableSparseMatrix',
'ImmutableMatrix', 'SparseMatrix',
'MatrixSlice', 'BlockDiagMatrix', 'BlockMatrix', 'FunctionMatrix',
'Identity', 'Inverse', 'MatAdd', 'MatMul', 'MatPow', 'MatrixExpr',
'MatrixSymbol', 'Trace', 'Transpose', 'ZeroMatrix', 'OneMatrix',
'blockcut', 'block_collapse', 'matrix_symbols', 'Adjoint',
'hadamard_product', 'HadamardProduct', 'HadamardPower', 'Determinant',
'det', 'diagonalize_vector', 'DiagMatrix', 'DiagonalMatrix',
'DiagonalOf', 'trace', 'DotProduct', 'kronecker_product',
'KroneckerProduct', 'PermutationMatrix', 'MatrixPermute',
'dotprodsimp',
]
|
e87fd9e3100a0c7c9d93109258ce69ea1b0e4158f13218e481f319d83104a4ff
|
"""
Basic methods common to all matrices to be used
when creating more advanced matrices (e.g., matrices over rings,
etc.).
"""
from sympy.core.logic import FuzzyBool
from collections import defaultdict
from inspect import isfunction
from sympy.assumptions.refine import refine
from sympy.core import SympifyError, Add
from sympy.core.basic import Atom
from sympy.core.compatibility import (
Iterable, as_int, is_sequence, reduce)
from sympy.core.decorators import call_highest_priority
from sympy.core.logic import fuzzy_and
from sympy.core.singleton import S
from sympy.core.symbol import Symbol
from sympy.core.sympify import sympify
from sympy.functions import Abs
from sympy.polys.polytools import Poly
from sympy.simplify import simplify as _simplify
from sympy.simplify.simplify import dotprodsimp as _dotprodsimp
from sympy.utilities.exceptions import SymPyDeprecationWarning
from sympy.utilities.iterables import flatten
from sympy.utilities.misc import filldedent
from .utilities import _get_intermediate_simp_bool
class MatrixError(Exception):
pass
class ShapeError(ValueError, MatrixError):
"""Wrong matrix shape"""
pass
class NonSquareMatrixError(ShapeError):
pass
class NonInvertibleMatrixError(ValueError, MatrixError):
"""The matrix in not invertible (division by multidimensional zero error)."""
pass
class NonPositiveDefiniteMatrixError(ValueError, MatrixError):
"""The matrix is not a positive-definite matrix."""
pass
class MatrixRequired:
"""All subclasses of matrix objects must implement the
required matrix properties listed here."""
rows = None # type: int
cols = None # type: int
_simplify = None
@classmethod
def _new(cls, *args, **kwargs):
"""`_new` must, at minimum, be callable as
`_new(rows, cols, mat) where mat is a flat list of the
elements of the matrix."""
raise NotImplementedError("Subclasses must implement this.")
def __eq__(self, other):
raise NotImplementedError("Subclasses must implement this.")
def __getitem__(self, key):
"""Implementations of __getitem__ should accept ints, in which
case the matrix is indexed as a flat list, tuples (i,j) in which
case the (i,j) entry is returned, slices, or mixed tuples (a,b)
where a and b are any combintion of slices and integers."""
raise NotImplementedError("Subclasses must implement this.")
def __len__(self):
"""The total number of entries in the matrix."""
raise NotImplementedError("Subclasses must implement this.")
@property
def shape(self):
raise NotImplementedError("Subclasses must implement this.")
class MatrixShaping(MatrixRequired):
"""Provides basic matrix shaping and extracting of submatrices"""
def _eval_col_del(self, col):
def entry(i, j):
return self[i, j] if j < col else self[i, j + 1]
return self._new(self.rows, self.cols - 1, entry)
def _eval_col_insert(self, pos, other):
def entry(i, j):
if j < pos:
return self[i, j]
elif pos <= j < pos + other.cols:
return other[i, j - pos]
return self[i, j - other.cols]
return self._new(self.rows, self.cols + other.cols,
lambda i, j: entry(i, j))
def _eval_col_join(self, other):
rows = self.rows
def entry(i, j):
if i < rows:
return self[i, j]
return other[i - rows, j]
return classof(self, other)._new(self.rows + other.rows, self.cols,
lambda i, j: entry(i, j))
def _eval_extract(self, rowsList, colsList):
mat = list(self)
cols = self.cols
indices = (i * cols + j for i in rowsList for j in colsList)
return self._new(len(rowsList), len(colsList),
list(mat[i] for i in indices))
def _eval_get_diag_blocks(self):
sub_blocks = []
def recurse_sub_blocks(M):
i = 1
while i <= M.shape[0]:
if i == 1:
to_the_right = M[0, i:]
to_the_bottom = M[i:, 0]
else:
to_the_right = M[:i, i:]
to_the_bottom = M[i:, :i]
if any(to_the_right) or any(to_the_bottom):
i += 1
continue
else:
sub_blocks.append(M[:i, :i])
if M.shape == M[:i, :i].shape:
return
else:
recurse_sub_blocks(M[i:, i:])
return
recurse_sub_blocks(self)
return sub_blocks
def _eval_row_del(self, row):
def entry(i, j):
return self[i, j] if i < row else self[i + 1, j]
return self._new(self.rows - 1, self.cols, entry)
def _eval_row_insert(self, pos, other):
entries = list(self)
insert_pos = pos * self.cols
entries[insert_pos:insert_pos] = list(other)
return self._new(self.rows + other.rows, self.cols, entries)
def _eval_row_join(self, other):
cols = self.cols
def entry(i, j):
if j < cols:
return self[i, j]
return other[i, j - cols]
return classof(self, other)._new(self.rows, self.cols + other.cols,
lambda i, j: entry(i, j))
def _eval_tolist(self):
return [list(self[i,:]) for i in range(self.rows)]
def _eval_todok(self):
dok = {}
rows, cols = self.shape
for i in range(rows):
for j in range(cols):
val = self[i, j]
if val != self.zero:
dok[i, j] = val
return dok
def _eval_vec(self):
rows = self.rows
def entry(n, _):
# we want to read off the columns first
j = n // rows
i = n - j * rows
return self[i, j]
return self._new(len(self), 1, entry)
def _eval_vech(self, diagonal):
c = self.cols
v = []
if diagonal:
for j in range(c):
for i in range(j, c):
v.append(self[i, j])
else:
for j in range(c):
for i in range(j + 1, c):
v.append(self[i, j])
return self._new(len(v), 1, v)
def col_del(self, col):
"""Delete the specified column."""
if col < 0:
col += self.cols
if not 0 <= col < self.cols:
raise IndexError("Column {} is out of range.".format(col))
return self._eval_col_del(col)
def col_insert(self, pos, other):
"""Insert one or more columns at the given column position.
Examples
========
>>> from sympy import zeros, ones
>>> M = zeros(3)
>>> V = ones(3, 1)
>>> M.col_insert(1, V)
Matrix([
[0, 1, 0, 0],
[0, 1, 0, 0],
[0, 1, 0, 0]])
See Also
========
col
row_insert
"""
# Allows you to build a matrix even if it is null matrix
if not self:
return type(self)(other)
pos = as_int(pos)
if pos < 0:
pos = self.cols + pos
if pos < 0:
pos = 0
elif pos > self.cols:
pos = self.cols
if self.rows != other.rows:
raise ShapeError(
"`self` and `other` must have the same number of rows.")
return self._eval_col_insert(pos, other)
def col_join(self, other):
"""Concatenates two matrices along self's last and other's first row.
Examples
========
>>> from sympy import zeros, ones
>>> M = zeros(3)
>>> V = ones(1, 3)
>>> M.col_join(V)
Matrix([
[0, 0, 0],
[0, 0, 0],
[0, 0, 0],
[1, 1, 1]])
See Also
========
col
row_join
"""
# A null matrix can always be stacked (see #10770)
if self.rows == 0 and self.cols != other.cols:
return self._new(0, other.cols, []).col_join(other)
if self.cols != other.cols:
raise ShapeError(
"`self` and `other` must have the same number of columns.")
return self._eval_col_join(other)
def col(self, j):
"""Elementary column selector.
Examples
========
>>> from sympy import eye
>>> eye(2).col(0)
Matrix([
[1],
[0]])
See Also
========
row
sympy.matrices.dense.MutableDenseMatrix.col_op
sympy.matrices.dense.MutableDenseMatrix.col_swap
col_del
col_join
col_insert
"""
return self[:, j]
def extract(self, rowsList, colsList):
"""Return a submatrix by specifying a list of rows and columns.
Negative indices can be given. All indices must be in the range
-n <= i < n where n is the number of rows or columns.
Examples
========
>>> from sympy import Matrix
>>> m = Matrix(4, 3, range(12))
>>> m
Matrix([
[0, 1, 2],
[3, 4, 5],
[6, 7, 8],
[9, 10, 11]])
>>> m.extract([0, 1, 3], [0, 1])
Matrix([
[0, 1],
[3, 4],
[9, 10]])
Rows or columns can be repeated:
>>> m.extract([0, 0, 1], [-1])
Matrix([
[2],
[2],
[5]])
Every other row can be taken by using range to provide the indices:
>>> m.extract(range(0, m.rows, 2), [-1])
Matrix([
[2],
[8]])
RowsList or colsList can also be a list of booleans, in which case
the rows or columns corresponding to the True values will be selected:
>>> m.extract([0, 1, 2, 3], [True, False, True])
Matrix([
[0, 2],
[3, 5],
[6, 8],
[9, 11]])
"""
if not is_sequence(rowsList) or not is_sequence(colsList):
raise TypeError("rowsList and colsList must be iterable")
# ensure rowsList and colsList are lists of integers
if rowsList and all(isinstance(i, bool) for i in rowsList):
rowsList = [index for index, item in enumerate(rowsList) if item]
if colsList and all(isinstance(i, bool) for i in colsList):
colsList = [index for index, item in enumerate(colsList) if item]
# ensure everything is in range
rowsList = [a2idx(k, self.rows) for k in rowsList]
colsList = [a2idx(k, self.cols) for k in colsList]
return self._eval_extract(rowsList, colsList)
def get_diag_blocks(self):
"""Obtains the square sub-matrices on the main diagonal of a square matrix.
Useful for inverting symbolic matrices or solving systems of
linear equations which may be decoupled by having a block diagonal
structure.
Examples
========
>>> from sympy import Matrix
>>> from sympy.abc import x, y, z
>>> A = Matrix([[1, 3, 0, 0], [y, z*z, 0, 0], [0, 0, x, 0], [0, 0, 0, 0]])
>>> a1, a2, a3 = A.get_diag_blocks()
>>> a1
Matrix([
[1, 3],
[y, z**2]])
>>> a2
Matrix([[x]])
>>> a3
Matrix([[0]])
"""
return self._eval_get_diag_blocks()
@classmethod
def hstack(cls, *args):
"""Return a matrix formed by joining args horizontally (i.e.
by repeated application of row_join).
Examples
========
>>> from sympy.matrices import Matrix, eye
>>> Matrix.hstack(eye(2), 2*eye(2))
Matrix([
[1, 0, 2, 0],
[0, 1, 0, 2]])
"""
if len(args) == 0:
return cls._new()
kls = type(args[0])
return reduce(kls.row_join, args)
def reshape(self, rows, cols):
"""Reshape the matrix. Total number of elements must remain the same.
Examples
========
>>> from sympy import Matrix
>>> m = Matrix(2, 3, lambda i, j: 1)
>>> m
Matrix([
[1, 1, 1],
[1, 1, 1]])
>>> m.reshape(1, 6)
Matrix([[1, 1, 1, 1, 1, 1]])
>>> m.reshape(3, 2)
Matrix([
[1, 1],
[1, 1],
[1, 1]])
"""
if self.rows * self.cols != rows * cols:
raise ValueError("Invalid reshape parameters %d %d" % (rows, cols))
return self._new(rows, cols, lambda i, j: self[i * cols + j])
def row_del(self, row):
"""Delete the specified row."""
if row < 0:
row += self.rows
if not 0 <= row < self.rows:
raise IndexError("Row {} is out of range.".format(row))
return self._eval_row_del(row)
def row_insert(self, pos, other):
"""Insert one or more rows at the given row position.
Examples
========
>>> from sympy import zeros, ones
>>> M = zeros(3)
>>> V = ones(1, 3)
>>> M.row_insert(1, V)
Matrix([
[0, 0, 0],
[1, 1, 1],
[0, 0, 0],
[0, 0, 0]])
See Also
========
row
col_insert
"""
# Allows you to build a matrix even if it is null matrix
if not self:
return self._new(other)
pos = as_int(pos)
if pos < 0:
pos = self.rows + pos
if pos < 0:
pos = 0
elif pos > self.rows:
pos = self.rows
if self.cols != other.cols:
raise ShapeError(
"`self` and `other` must have the same number of columns.")
return self._eval_row_insert(pos, other)
def row_join(self, other):
"""Concatenates two matrices along self's last and rhs's first column
Examples
========
>>> from sympy import zeros, ones
>>> M = zeros(3)
>>> V = ones(3, 1)
>>> M.row_join(V)
Matrix([
[0, 0, 0, 1],
[0, 0, 0, 1],
[0, 0, 0, 1]])
See Also
========
row
col_join
"""
# A null matrix can always be stacked (see #10770)
if self.cols == 0 and self.rows != other.rows:
return self._new(other.rows, 0, []).row_join(other)
if self.rows != other.rows:
raise ShapeError(
"`self` and `rhs` must have the same number of rows.")
return self._eval_row_join(other)
def diagonal(self, k=0):
"""Returns the kth diagonal of self. The main diagonal
corresponds to `k=0`; diagonals above and below correspond to
`k > 0` and `k < 0`, respectively. The values of `self[i, j]`
for which `j - i = k`, are returned in order of increasing
`i + j`, starting with `i + j = |k|`.
Examples
========
>>> from sympy import Matrix
>>> m = Matrix(3, 3, lambda i, j: j - i); m
Matrix([
[ 0, 1, 2],
[-1, 0, 1],
[-2, -1, 0]])
>>> _.diagonal()
Matrix([[0, 0, 0]])
>>> m.diagonal(1)
Matrix([[1, 1]])
>>> m.diagonal(-2)
Matrix([[-2]])
Even though the diagonal is returned as a Matrix, the element
retrieval can be done with a single index:
>>> Matrix.diag(1, 2, 3).diagonal()[1] # instead of [0, 1]
2
See Also
========
diag - to create a diagonal matrix
"""
rv = []
k = as_int(k)
r = 0 if k > 0 else -k
c = 0 if r else k
while True:
if r == self.rows or c == self.cols:
break
rv.append(self[r, c])
r += 1
c += 1
if not rv:
raise ValueError(filldedent('''
The %s diagonal is out of range [%s, %s]''' % (
k, 1 - self.rows, self.cols - 1)))
return self._new(1, len(rv), rv)
def row(self, i):
"""Elementary row selector.
Examples
========
>>> from sympy import eye
>>> eye(2).row(0)
Matrix([[1, 0]])
See Also
========
col
sympy.matrices.dense.MutableDenseMatrix.row_op
sympy.matrices.dense.MutableDenseMatrix.row_swap
row_del
row_join
row_insert
"""
return self[i, :]
@property
def shape(self):
"""The shape (dimensions) of the matrix as the 2-tuple (rows, cols).
Examples
========
>>> from sympy.matrices import zeros
>>> M = zeros(2, 3)
>>> M.shape
(2, 3)
>>> M.rows
2
>>> M.cols
3
"""
return (self.rows, self.cols)
def todok(self):
"""Return the matrix as dictionary of keys.
Examples
========
>>> from sympy import Matrix
>>> M = Matrix.eye(3)
>>> M.todok()
{(0, 0): 1, (1, 1): 1, (2, 2): 1}
"""
return self._eval_todok()
def tolist(self):
"""Return the Matrix as a nested Python list.
Examples
========
>>> from sympy import Matrix, ones
>>> m = Matrix(3, 3, range(9))
>>> m
Matrix([
[0, 1, 2],
[3, 4, 5],
[6, 7, 8]])
>>> m.tolist()
[[0, 1, 2], [3, 4, 5], [6, 7, 8]]
>>> ones(3, 0).tolist()
[[], [], []]
When there are no rows then it will not be possible to tell how
many columns were in the original matrix:
>>> ones(0, 3).tolist()
[]
"""
if not self.rows:
return []
if not self.cols:
return [[] for i in range(self.rows)]
return self._eval_tolist()
def vec(self):
"""Return the Matrix converted into a one column matrix by stacking columns
Examples
========
>>> from sympy import Matrix
>>> m=Matrix([[1, 3], [2, 4]])
>>> m
Matrix([
[1, 3],
[2, 4]])
>>> m.vec()
Matrix([
[1],
[2],
[3],
[4]])
See Also
========
vech
"""
return self._eval_vec()
def vech(self, diagonal=True, check_symmetry=True):
"""Reshapes the matrix into a column vector by stacking the
elements in the lower triangle.
Parameters
==========
diagonal : bool, optional
If ``True``, it includes the diagonal elements.
check_symmetry : bool, optional
If ``True``, it checks whether the matrix is symmetric.
Examples
========
>>> from sympy import Matrix
>>> m=Matrix([[1, 2], [2, 3]])
>>> m
Matrix([
[1, 2],
[2, 3]])
>>> m.vech()
Matrix([
[1],
[2],
[3]])
>>> m.vech(diagonal=False)
Matrix([[2]])
Notes
=====
This should work for symmetric matrices and ``vech`` can
represent symmetric matrices in vector form with less size than
``vec``.
See Also
========
vec
"""
if not self.is_square:
raise NonSquareMatrixError
if check_symmetry and not self.is_symmetric():
raise ValueError("The matrix is not symmetric.")
return self._eval_vech(diagonal)
@classmethod
def vstack(cls, *args):
"""Return a matrix formed by joining args vertically (i.e.
by repeated application of col_join).
Examples
========
>>> from sympy.matrices import Matrix, eye
>>> Matrix.vstack(eye(2), 2*eye(2))
Matrix([
[1, 0],
[0, 1],
[2, 0],
[0, 2]])
"""
if len(args) == 0:
return cls._new()
kls = type(args[0])
return reduce(kls.col_join, args)
class MatrixSpecial(MatrixRequired):
"""Construction of special matrices"""
@classmethod
def _eval_diag(cls, rows, cols, diag_dict):
"""diag_dict is a defaultdict containing
all the entries of the diagonal matrix."""
def entry(i, j):
return diag_dict[(i, j)]
return cls._new(rows, cols, entry)
@classmethod
def _eval_eye(cls, rows, cols):
def entry(i, j):
return cls.one if i == j else cls.zero
return cls._new(rows, cols, entry)
@classmethod
def _eval_jordan_block(cls, rows, cols, eigenvalue, band='upper'):
if band == 'lower':
def entry(i, j):
if i == j:
return eigenvalue
elif j + 1 == i:
return cls.one
return cls.zero
else:
def entry(i, j):
if i == j:
return eigenvalue
elif i + 1 == j:
return cls.one
return cls.zero
return cls._new(rows, cols, entry)
@classmethod
def _eval_ones(cls, rows, cols):
def entry(i, j):
return cls.one
return cls._new(rows, cols, entry)
@classmethod
def _eval_zeros(cls, rows, cols):
def entry(i, j):
return cls.zero
return cls._new(rows, cols, entry)
@classmethod
def diag(kls, *args, **kwargs):
"""Returns a matrix with the specified diagonal.
If matrices are passed, a block-diagonal matrix
is created (i.e. the "direct sum" of the matrices).
kwargs
======
rows : rows of the resulting matrix; computed if
not given.
cols : columns of the resulting matrix; computed if
not given.
cls : class for the resulting matrix
unpack : bool which, when True (default), unpacks a single
sequence rather than interpreting it as a Matrix.
strict : bool which, when False (default), allows Matrices to
have variable-length rows.
Examples
========
>>> from sympy.matrices import Matrix
>>> Matrix.diag(1, 2, 3)
Matrix([
[1, 0, 0],
[0, 2, 0],
[0, 0, 3]])
The current default is to unpack a single sequence. If this is
not desired, set `unpack=False` and it will be interpreted as
a matrix.
>>> Matrix.diag([1, 2, 3]) == Matrix.diag(1, 2, 3)
True
When more than one element is passed, each is interpreted as
something to put on the diagonal. Lists are converted to
matrices. Filling of the diagonal always continues from
the bottom right hand corner of the previous item: this
will create a block-diagonal matrix whether the matrices
are square or not.
>>> col = [1, 2, 3]
>>> row = [[4, 5]]
>>> Matrix.diag(col, row)
Matrix([
[1, 0, 0],
[2, 0, 0],
[3, 0, 0],
[0, 4, 5]])
When `unpack` is False, elements within a list need not all be
of the same length. Setting `strict` to True would raise a
ValueError for the following:
>>> Matrix.diag([[1, 2, 3], [4, 5], [6]], unpack=False)
Matrix([
[1, 2, 3],
[4, 5, 0],
[6, 0, 0]])
The type of the returned matrix can be set with the ``cls``
keyword.
>>> from sympy.matrices import ImmutableMatrix
>>> from sympy.utilities.misc import func_name
>>> func_name(Matrix.diag(1, cls=ImmutableMatrix))
'ImmutableDenseMatrix'
A zero dimension matrix can be used to position the start of
the filling at the start of an arbitrary row or column:
>>> from sympy import ones
>>> r2 = ones(0, 2)
>>> Matrix.diag(r2, 1, 2)
Matrix([
[0, 0, 1, 0],
[0, 0, 0, 2]])
See Also
========
eye
diagonal - to extract a diagonal
.dense.diag
.expressions.blockmatrix.BlockMatrix
.sparsetools.banded - to create multi-diagonal matrices
"""
from sympy.matrices.matrices import MatrixBase
from sympy.matrices.dense import Matrix
from sympy.matrices.sparse import SparseMatrix
klass = kwargs.get('cls', kls)
strict = kwargs.get('strict', False) # lists -> Matrices
unpack = kwargs.get('unpack', True) # unpack single sequence
if unpack and len(args) == 1 and is_sequence(args[0]) and \
not isinstance(args[0], MatrixBase):
args = args[0]
# fill a default dict with the diagonal entries
diag_entries = defaultdict(int)
rmax = cmax = 0 # keep track of the biggest index seen
for m in args:
if isinstance(m, list):
if strict:
# if malformed, Matrix will raise an error
_ = Matrix(m)
r, c = _.shape
m = _.tolist()
else:
m = SparseMatrix(m)
for (i, j), _ in m._smat.items():
diag_entries[(i + rmax, j + cmax)] = _
r, c = m.shape
m = [] # to skip process below
elif hasattr(m, 'shape'): # a Matrix
# convert to list of lists
r, c = m.shape
m = m.tolist()
else: # in this case, we're a single value
diag_entries[(rmax, cmax)] = m
rmax += 1
cmax += 1
continue
# process list of lists
for i in range(len(m)):
for j, _ in enumerate(m[i]):
diag_entries[(i + rmax, j + cmax)] = _
rmax += r
cmax += c
rows = kwargs.get('rows', None)
cols = kwargs.get('cols', None)
if rows is None:
rows, cols = cols, rows
if rows is None:
rows, cols = rmax, cmax
else:
cols = rows if cols is None else cols
if rows < rmax or cols < cmax:
raise ValueError(filldedent('''
The constructed matrix is {} x {} but a size of {} x {}
was specified.'''.format(rmax, cmax, rows, cols)))
return klass._eval_diag(rows, cols, diag_entries)
@classmethod
def eye(kls, rows, cols=None, **kwargs):
"""Returns an identity matrix.
Args
====
rows : rows of the matrix
cols : cols of the matrix (if None, cols=rows)
kwargs
======
cls : class of the returned matrix
"""
if cols is None:
cols = rows
klass = kwargs.get('cls', kls)
rows, cols = as_int(rows), as_int(cols)
return klass._eval_eye(rows, cols)
@classmethod
def jordan_block(kls, size=None, eigenvalue=None, **kwargs):
"""Returns a Jordan block
Parameters
==========
size : Integer, optional
Specifies the shape of the Jordan block matrix.
eigenvalue : Number or Symbol
Specifies the value for the main diagonal of the matrix.
.. note::
The keyword ``eigenval`` is also specified as an alias
of this keyword, but it is not recommended to use.
We may deprecate the alias in later release.
band : 'upper' or 'lower', optional
Specifies the position of the off-diagonal to put `1` s on.
cls : Matrix, optional
Specifies the matrix class of the output form.
If it is not specified, the class type where the method is
being executed on will be returned.
rows, cols : Integer, optional
Specifies the shape of the Jordan block matrix. See Notes
section for the details of how these key works.
.. note::
This feature will be deprecated in the future.
Returns
=======
Matrix
A Jordan block matrix.
Raises
======
ValueError
If insufficient arguments are given for matrix size
specification, or no eigenvalue is given.
Examples
========
Creating a default Jordan block:
>>> from sympy import Matrix
>>> from sympy.abc import x
>>> Matrix.jordan_block(4, x)
Matrix([
[x, 1, 0, 0],
[0, x, 1, 0],
[0, 0, x, 1],
[0, 0, 0, x]])
Creating an alternative Jordan block matrix where `1` is on
lower off-diagonal:
>>> Matrix.jordan_block(4, x, band='lower')
Matrix([
[x, 0, 0, 0],
[1, x, 0, 0],
[0, 1, x, 0],
[0, 0, 1, x]])
Creating a Jordan block with keyword arguments
>>> Matrix.jordan_block(size=4, eigenvalue=x)
Matrix([
[x, 1, 0, 0],
[0, x, 1, 0],
[0, 0, x, 1],
[0, 0, 0, x]])
Notes
=====
.. note::
This feature will be deprecated in the future.
The keyword arguments ``size``, ``rows``, ``cols`` relates to
the Jordan block size specifications.
If you want to create a square Jordan block, specify either
one of the three arguments.
If you want to create a rectangular Jordan block, specify
``rows`` and ``cols`` individually.
+--------------------------------+---------------------+
| Arguments Given | Matrix Shape |
+----------+----------+----------+----------+----------+
| size | rows | cols | rows | cols |
+==========+==========+==========+==========+==========+
| size | Any | size | size |
+----------+----------+----------+----------+----------+
| | None | ValueError |
| +----------+----------+----------+----------+
| None | rows | None | rows | rows |
| +----------+----------+----------+----------+
| | None | cols | cols | cols |
+ +----------+----------+----------+----------+
| | rows | cols | rows | cols |
+----------+----------+----------+----------+----------+
References
==========
.. [1] https://en.wikipedia.org/wiki/Jordan_matrix
"""
if 'rows' in kwargs or 'cols' in kwargs:
SymPyDeprecationWarning(
feature="Keyword arguments 'rows' or 'cols'",
issue=16102,
useinstead="a more generic banded matrix constructor",
deprecated_since_version="1.4"
).warn()
klass = kwargs.pop('cls', kls)
band = kwargs.pop('band', 'upper')
rows = kwargs.pop('rows', None)
cols = kwargs.pop('cols', None)
eigenval = kwargs.get('eigenval', None)
if eigenvalue is None and eigenval is None:
raise ValueError("Must supply an eigenvalue")
elif eigenvalue != eigenval and None not in (eigenval, eigenvalue):
raise ValueError(
"Inconsistent values are given: 'eigenval'={}, "
"'eigenvalue'={}".format(eigenval, eigenvalue))
else:
if eigenval is not None:
eigenvalue = eigenval
if (size, rows, cols) == (None, None, None):
raise ValueError("Must supply a matrix size")
if size is not None:
rows, cols = size, size
elif rows is not None and cols is None:
cols = rows
elif cols is not None and rows is None:
rows = cols
rows, cols = as_int(rows), as_int(cols)
return klass._eval_jordan_block(rows, cols, eigenvalue, band)
@classmethod
def ones(kls, rows, cols=None, **kwargs):
"""Returns a matrix of ones.
Args
====
rows : rows of the matrix
cols : cols of the matrix (if None, cols=rows)
kwargs
======
cls : class of the returned matrix
"""
if cols is None:
cols = rows
klass = kwargs.get('cls', kls)
rows, cols = as_int(rows), as_int(cols)
return klass._eval_ones(rows, cols)
@classmethod
def zeros(kls, rows, cols=None, **kwargs):
"""Returns a matrix of zeros.
Args
====
rows : rows of the matrix
cols : cols of the matrix (if None, cols=rows)
kwargs
======
cls : class of the returned matrix
"""
if cols is None:
cols = rows
klass = kwargs.get('cls', kls)
rows, cols = as_int(rows), as_int(cols)
return klass._eval_zeros(rows, cols)
@classmethod
def companion(kls, poly):
"""Returns a companion matrix of a polynomial.
Examples
========
>>> from sympy import Matrix, Poly, Symbol, symbols
>>> x = Symbol('x')
>>> c0, c1, c2, c3, c4 = symbols('c0:5')
>>> p = Poly(c0 + c1*x + c2*x**2 + c3*x**3 + c4*x**4 + x**5, x)
>>> Matrix.companion(p)
Matrix([
[0, 0, 0, 0, -c0],
[1, 0, 0, 0, -c1],
[0, 1, 0, 0, -c2],
[0, 0, 1, 0, -c3],
[0, 0, 0, 1, -c4]])
"""
poly = kls._sympify(poly)
if not isinstance(poly, Poly):
raise ValueError("{} must be a Poly instance.".format(poly))
if not poly.is_monic:
raise ValueError("{} must be a monic polynomial.".format(poly))
if not poly.is_univariate:
raise ValueError(
"{} must be a univariate polynomial.".format(poly))
size = poly.degree()
if not size >= 1:
raise ValueError(
"{} must have degree not less than 1.".format(poly))
coeffs = poly.all_coeffs()
def entry(i, j):
if j == size - 1:
return -coeffs[-1 - i]
elif i == j + 1:
return kls.one
return kls.zero
return kls._new(size, size, entry)
class MatrixProperties(MatrixRequired):
"""Provides basic properties of a matrix."""
def _eval_atoms(self, *types):
result = set()
for i in self:
result.update(i.atoms(*types))
return result
def _eval_free_symbols(self):
return set().union(*(i.free_symbols for i in self))
def _eval_has(self, *patterns):
return any(a.has(*patterns) for a in self)
def _eval_is_anti_symmetric(self, simpfunc):
if not all(simpfunc(self[i, j] + self[j, i]).is_zero for i in range(self.rows) for j in range(self.cols)):
return False
return True
def _eval_is_diagonal(self):
for i in range(self.rows):
for j in range(self.cols):
if i != j and self[i, j]:
return False
return True
# _eval_is_hermitian is called by some general sympy
# routines and has a different *args signature. Make
# sure the names don't clash by adding `_matrix_` in name.
def _eval_is_matrix_hermitian(self, simpfunc):
mat = self._new(self.rows, self.cols, lambda i, j: simpfunc(self[i, j] - self[j, i].conjugate()))
return mat.is_zero_matrix
def _eval_is_Identity(self) -> FuzzyBool:
def dirac(i, j):
if i == j:
return 1
return 0
return all(self[i, j] == dirac(i, j)
for i in range(self.rows)
for j in range(self.cols))
def _eval_is_lower_hessenberg(self):
return all(self[i, j].is_zero
for i in range(self.rows)
for j in range(i + 2, self.cols))
def _eval_is_lower(self):
return all(self[i, j].is_zero
for i in range(self.rows)
for j in range(i + 1, self.cols))
def _eval_is_symbolic(self):
return self.has(Symbol)
def _eval_is_symmetric(self, simpfunc):
mat = self._new(self.rows, self.cols, lambda i, j: simpfunc(self[i, j] - self[j, i]))
return mat.is_zero_matrix
def _eval_is_zero_matrix(self):
if any(i.is_zero == False for i in self):
return False
if any(i.is_zero is None for i in self):
return None
return True
def _eval_is_upper_hessenberg(self):
return all(self[i, j].is_zero
for i in range(2, self.rows)
for j in range(min(self.cols, (i - 1))))
def _eval_values(self):
return [i for i in self if not i.is_zero]
def _has_positive_diagonals(self):
diagonal_entries = (self[i, i] for i in range(self.rows))
return fuzzy_and((x.is_positive for x in diagonal_entries))
def _has_nonnegative_diagonals(self):
diagonal_entries = (self[i, i] for i in range(self.rows))
return fuzzy_and((x.is_nonnegative for x in diagonal_entries))
def atoms(self, *types):
"""Returns the atoms that form the current object.
Examples
========
>>> from sympy.abc import x, y
>>> from sympy.matrices import Matrix
>>> Matrix([[x]])
Matrix([[x]])
>>> _.atoms()
{x}
>>> Matrix([[x, y], [y, x]])
Matrix([
[x, y],
[y, x]])
>>> _.atoms()
{x, y}
"""
types = tuple(t if isinstance(t, type) else type(t) for t in types)
if not types:
types = (Atom,)
return self._eval_atoms(*types)
@property
def free_symbols(self):
"""Returns the free symbols within the matrix.
Examples
========
>>> from sympy.abc import x
>>> from sympy.matrices import Matrix
>>> Matrix([[x], [1]]).free_symbols
{x}
"""
return self._eval_free_symbols()
def has(self, *patterns):
"""Test whether any subexpression matches any of the patterns.
Examples
========
>>> from sympy import Matrix, SparseMatrix, Float
>>> from sympy.abc import x, y
>>> A = Matrix(((1, x), (0.2, 3)))
>>> B = SparseMatrix(((1, x), (0.2, 3)))
>>> A.has(x)
True
>>> A.has(y)
False
>>> A.has(Float)
True
>>> B.has(x)
True
>>> B.has(y)
False
>>> B.has(Float)
True
"""
return self._eval_has(*patterns)
def is_anti_symmetric(self, simplify=True):
"""Check if matrix M is an antisymmetric matrix,
that is, M is a square matrix with all M[i, j] == -M[j, i].
When ``simplify=True`` (default), the sum M[i, j] + M[j, i] is
simplified before testing to see if it is zero. By default,
the SymPy simplify function is used. To use a custom function
set simplify to a function that accepts a single argument which
returns a simplified expression. To skip simplification, set
simplify to False but note that although this will be faster,
it may induce false negatives.
Examples
========
>>> from sympy import Matrix, symbols
>>> m = Matrix(2, 2, [0, 1, -1, 0])
>>> m
Matrix([
[ 0, 1],
[-1, 0]])
>>> m.is_anti_symmetric()
True
>>> x, y = symbols('x y')
>>> m = Matrix(2, 3, [0, 0, x, -y, 0, 0])
>>> m
Matrix([
[ 0, 0, x],
[-y, 0, 0]])
>>> m.is_anti_symmetric()
False
>>> from sympy.abc import x, y
>>> m = Matrix(3, 3, [0, x**2 + 2*x + 1, y,
... -(x + 1)**2 , 0, x*y,
... -y, -x*y, 0])
Simplification of matrix elements is done by default so even
though two elements which should be equal and opposite wouldn't
pass an equality test, the matrix is still reported as
anti-symmetric:
>>> m[0, 1] == -m[1, 0]
False
>>> m.is_anti_symmetric()
True
If 'simplify=False' is used for the case when a Matrix is already
simplified, this will speed things up. Here, we see that without
simplification the matrix does not appear anti-symmetric:
>>> m.is_anti_symmetric(simplify=False)
False
But if the matrix were already expanded, then it would appear
anti-symmetric and simplification in the is_anti_symmetric routine
is not needed:
>>> m = m.expand()
>>> m.is_anti_symmetric(simplify=False)
True
"""
# accept custom simplification
simpfunc = simplify
if not isfunction(simplify):
simpfunc = _simplify if simplify else lambda x: x
if not self.is_square:
return False
return self._eval_is_anti_symmetric(simpfunc)
def is_diagonal(self):
"""Check if matrix is diagonal,
that is matrix in which the entries outside the main diagonal are all zero.
Examples
========
>>> from sympy import Matrix, diag
>>> m = Matrix(2, 2, [1, 0, 0, 2])
>>> m
Matrix([
[1, 0],
[0, 2]])
>>> m.is_diagonal()
True
>>> m = Matrix(2, 2, [1, 1, 0, 2])
>>> m
Matrix([
[1, 1],
[0, 2]])
>>> m.is_diagonal()
False
>>> m = diag(1, 2, 3)
>>> m
Matrix([
[1, 0, 0],
[0, 2, 0],
[0, 0, 3]])
>>> m.is_diagonal()
True
See Also
========
is_lower
is_upper
sympy.matrices.matrices.MatrixEigen.is_diagonalizable
diagonalize
"""
return self._eval_is_diagonal()
@property
def is_weakly_diagonally_dominant(self):
r"""Tests if the matrix is row weakly diagonally dominant.
Explanation
===========
A $n, n$ matrix $A$ is row weakly diagonally dominant if
.. math::
\left|A_{i, i}\right| \ge \sum_{j = 0, j \neq i}^{n-1}
\left|A_{i, j}\right| \quad {\text{for all }}
i \in \{ 0, ..., n-1 \}
Examples
========
>>> from sympy.matrices import Matrix
>>> A = Matrix([[3, -2, 1], [1, -3, 2], [-1, 2, 4]])
>>> A.is_weakly_diagonally_dominant
True
>>> A = Matrix([[-2, 2, 1], [1, 3, 2], [1, -2, 0]])
>>> A.is_weakly_diagonally_dominant
False
>>> A = Matrix([[-4, 2, 1], [1, 6, 2], [1, -2, 5]])
>>> A.is_weakly_diagonally_dominant
True
Notes
=====
If you want to test whether a matrix is column diagonally
dominant, you can apply the test after transposing the matrix.
"""
if not self.is_square:
return False
rows, cols = self.shape
def test_row(i):
summation = self.zero
for j in range(cols):
if i != j:
summation += Abs(self[i, j])
return (Abs(self[i, i]) - summation).is_nonnegative
return fuzzy_and((test_row(i) for i in range(rows)))
@property
def is_strongly_diagonally_dominant(self):
r"""Tests if the matrix is row strongly diagonally dominant.
Explanation
===========
A $n, n$ matrix $A$ is row strongly diagonally dominant if
.. math::
\left|A_{i, i}\right| > \sum_{j = 0, j \neq i}^{n-1}
\left|A_{i, j}\right| \quad {\text{for all }}
i \in \{ 0, ..., n-1 \}
Examples
========
>>> from sympy.matrices import Matrix
>>> A = Matrix([[3, -2, 1], [1, -3, 2], [-1, 2, 4]])
>>> A.is_strongly_diagonally_dominant
False
>>> A = Matrix([[-2, 2, 1], [1, 3, 2], [1, -2, 0]])
>>> A.is_strongly_diagonally_dominant
False
>>> A = Matrix([[-4, 2, 1], [1, 6, 2], [1, -2, 5]])
>>> A.is_strongly_diagonally_dominant
True
Notes
=====
If you want to test whether a matrix is column diagonally
dominant, you can apply the test after transposing the matrix.
"""
if not self.is_square:
return False
rows, cols = self.shape
def test_row(i):
summation = self.zero
for j in range(cols):
if i != j:
summation += Abs(self[i, j])
return (Abs(self[i, i]) - summation).is_positive
return fuzzy_and((test_row(i) for i in range(rows)))
@property
def is_hermitian(self):
"""Checks if the matrix is Hermitian.
In a Hermitian matrix element i,j is the complex conjugate of
element j,i.
Examples
========
>>> from sympy.matrices import Matrix
>>> from sympy import I
>>> from sympy.abc import x
>>> a = Matrix([[1, I], [-I, 1]])
>>> a
Matrix([
[ 1, I],
[-I, 1]])
>>> a.is_hermitian
True
>>> a[0, 0] = 2*I
>>> a.is_hermitian
False
>>> a[0, 0] = x
>>> a.is_hermitian
>>> a[0, 1] = a[1, 0]*I
>>> a.is_hermitian
False
"""
if not self.is_square:
return False
return self._eval_is_matrix_hermitian(_simplify)
@property
def is_Identity(self) -> FuzzyBool:
if not self.is_square:
return False
return self._eval_is_Identity()
@property
def is_lower_hessenberg(self):
r"""Checks if the matrix is in the lower-Hessenberg form.
The lower hessenberg matrix has zero entries
above the first superdiagonal.
Examples
========
>>> from sympy.matrices import Matrix
>>> a = Matrix([[1, 2, 0, 0], [5, 2, 3, 0], [3, 4, 3, 7], [5, 6, 1, 1]])
>>> a
Matrix([
[1, 2, 0, 0],
[5, 2, 3, 0],
[3, 4, 3, 7],
[5, 6, 1, 1]])
>>> a.is_lower_hessenberg
True
See Also
========
is_upper_hessenberg
is_lower
"""
return self._eval_is_lower_hessenberg()
@property
def is_lower(self):
"""Check if matrix is a lower triangular matrix. True can be returned
even if the matrix is not square.
Examples
========
>>> from sympy import Matrix
>>> m = Matrix(2, 2, [1, 0, 0, 1])
>>> m
Matrix([
[1, 0],
[0, 1]])
>>> m.is_lower
True
>>> m = Matrix(4, 3, [0, 0, 0, 2, 0, 0, 1, 4 , 0, 6, 6, 5])
>>> m
Matrix([
[0, 0, 0],
[2, 0, 0],
[1, 4, 0],
[6, 6, 5]])
>>> m.is_lower
True
>>> from sympy.abc import x, y
>>> m = Matrix(2, 2, [x**2 + y, y**2 + x, 0, x + y])
>>> m
Matrix([
[x**2 + y, x + y**2],
[ 0, x + y]])
>>> m.is_lower
False
See Also
========
is_upper
is_diagonal
is_lower_hessenberg
"""
return self._eval_is_lower()
@property
def is_square(self):
"""Checks if a matrix is square.
A matrix is square if the number of rows equals the number of columns.
The empty matrix is square by definition, since the number of rows and
the number of columns are both zero.
Examples
========
>>> from sympy import Matrix
>>> a = Matrix([[1, 2, 3], [4, 5, 6]])
>>> b = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]])
>>> c = Matrix([])
>>> a.is_square
False
>>> b.is_square
True
>>> c.is_square
True
"""
return self.rows == self.cols
def is_symbolic(self):
"""Checks if any elements contain Symbols.
Examples
========
>>> from sympy.matrices import Matrix
>>> from sympy.abc import x, y
>>> M = Matrix([[x, y], [1, 0]])
>>> M.is_symbolic()
True
"""
return self._eval_is_symbolic()
def is_symmetric(self, simplify=True):
"""Check if matrix is symmetric matrix,
that is square matrix and is equal to its transpose.
By default, simplifications occur before testing symmetry.
They can be skipped using 'simplify=False'; while speeding things a bit,
this may however induce false negatives.
Examples
========
>>> from sympy import Matrix
>>> m = Matrix(2, 2, [0, 1, 1, 2])
>>> m
Matrix([
[0, 1],
[1, 2]])
>>> m.is_symmetric()
True
>>> m = Matrix(2, 2, [0, 1, 2, 0])
>>> m
Matrix([
[0, 1],
[2, 0]])
>>> m.is_symmetric()
False
>>> m = Matrix(2, 3, [0, 0, 0, 0, 0, 0])
>>> m
Matrix([
[0, 0, 0],
[0, 0, 0]])
>>> m.is_symmetric()
False
>>> from sympy.abc import x, y
>>> m = Matrix(3, 3, [1, x**2 + 2*x + 1, y, (x + 1)**2 , 2, 0, y, 0, 3])
>>> m
Matrix([
[ 1, x**2 + 2*x + 1, y],
[(x + 1)**2, 2, 0],
[ y, 0, 3]])
>>> m.is_symmetric()
True
If the matrix is already simplified, you may speed-up is_symmetric()
test by using 'simplify=False'.
>>> bool(m.is_symmetric(simplify=False))
False
>>> m1 = m.expand()
>>> m1.is_symmetric(simplify=False)
True
"""
simpfunc = simplify
if not isfunction(simplify):
simpfunc = _simplify if simplify else lambda x: x
if not self.is_square:
return False
return self._eval_is_symmetric(simpfunc)
@property
def is_upper_hessenberg(self):
"""Checks if the matrix is the upper-Hessenberg form.
The upper hessenberg matrix has zero entries
below the first subdiagonal.
Examples
========
>>> from sympy.matrices import Matrix
>>> a = Matrix([[1, 4, 2, 3], [3, 4, 1, 7], [0, 2, 3, 4], [0, 0, 1, 3]])
>>> a
Matrix([
[1, 4, 2, 3],
[3, 4, 1, 7],
[0, 2, 3, 4],
[0, 0, 1, 3]])
>>> a.is_upper_hessenberg
True
See Also
========
is_lower_hessenberg
is_upper
"""
return self._eval_is_upper_hessenberg()
@property
def is_upper(self):
"""Check if matrix is an upper triangular matrix. True can be returned
even if the matrix is not square.
Examples
========
>>> from sympy import Matrix
>>> m = Matrix(2, 2, [1, 0, 0, 1])
>>> m
Matrix([
[1, 0],
[0, 1]])
>>> m.is_upper
True
>>> m = Matrix(4, 3, [5, 1, 9, 0, 4 , 6, 0, 0, 5, 0, 0, 0])
>>> m
Matrix([
[5, 1, 9],
[0, 4, 6],
[0, 0, 5],
[0, 0, 0]])
>>> m.is_upper
True
>>> m = Matrix(2, 3, [4, 2, 5, 6, 1, 1])
>>> m
Matrix([
[4, 2, 5],
[6, 1, 1]])
>>> m.is_upper
False
See Also
========
is_lower
is_diagonal
is_upper_hessenberg
"""
return all(self[i, j].is_zero
for i in range(1, self.rows)
for j in range(min(i, self.cols)))
@property
def is_zero_matrix(self):
"""Checks if a matrix is a zero matrix.
A matrix is zero if every element is zero. A matrix need not be square
to be considered zero. The empty matrix is zero by the principle of
vacuous truth. For a matrix that may or may not be zero (e.g.
contains a symbol), this will be None
Examples
========
>>> from sympy import Matrix, zeros
>>> from sympy.abc import x
>>> a = Matrix([[0, 0], [0, 0]])
>>> b = zeros(3, 4)
>>> c = Matrix([[0, 1], [0, 0]])
>>> d = Matrix([])
>>> e = Matrix([[x, 0], [0, 0]])
>>> a.is_zero_matrix
True
>>> b.is_zero_matrix
True
>>> c.is_zero_matrix
False
>>> d.is_zero_matrix
True
>>> e.is_zero_matrix
"""
return self._eval_is_zero_matrix()
def values(self):
"""Return non-zero values of self."""
return self._eval_values()
class MatrixOperations(MatrixRequired):
"""Provides basic matrix shape and elementwise
operations. Should not be instantiated directly."""
def _eval_adjoint(self):
return self.transpose().conjugate()
def _eval_applyfunc(self, f):
out = self._new(self.rows, self.cols, [f(x) for x in self])
return out
def _eval_as_real_imag(self): # type: ignore
from sympy.functions.elementary.complexes import re, im
return (self.applyfunc(re), self.applyfunc(im))
def _eval_conjugate(self):
return self.applyfunc(lambda x: x.conjugate())
def _eval_permute_cols(self, perm):
# apply the permutation to a list
mapping = list(perm)
def entry(i, j):
return self[i, mapping[j]]
return self._new(self.rows, self.cols, entry)
def _eval_permute_rows(self, perm):
# apply the permutation to a list
mapping = list(perm)
def entry(i, j):
return self[mapping[i], j]
return self._new(self.rows, self.cols, entry)
def _eval_trace(self):
return sum(self[i, i] for i in range(self.rows))
def _eval_transpose(self):
return self._new(self.cols, self.rows, lambda i, j: self[j, i])
def adjoint(self):
"""Conjugate transpose or Hermitian conjugation."""
return self._eval_adjoint()
def applyfunc(self, f):
"""Apply a function to each element of the matrix.
Examples
========
>>> from sympy import Matrix
>>> m = Matrix(2, 2, lambda i, j: i*2+j)
>>> m
Matrix([
[0, 1],
[2, 3]])
>>> m.applyfunc(lambda i: 2*i)
Matrix([
[0, 2],
[4, 6]])
"""
if not callable(f):
raise TypeError("`f` must be callable.")
return self._eval_applyfunc(f)
def as_real_imag(self, deep=True, **hints):
"""Returns a tuple containing the (real, imaginary) part of matrix."""
# XXX: Ignoring deep and hints...
return self._eval_as_real_imag()
def conjugate(self):
"""Return the by-element conjugation.
Examples
========
>>> from sympy.matrices import SparseMatrix
>>> from sympy import I
>>> a = SparseMatrix(((1, 2 + I), (3, 4), (I, -I)))
>>> a
Matrix([
[1, 2 + I],
[3, 4],
[I, -I]])
>>> a.C
Matrix([
[ 1, 2 - I],
[ 3, 4],
[-I, I]])
See Also
========
transpose: Matrix transposition
H: Hermite conjugation
sympy.matrices.matrices.MatrixBase.D: Dirac conjugation
"""
return self._eval_conjugate()
def doit(self, **kwargs):
return self.applyfunc(lambda x: x.doit())
def evalf(self, n=15, subs=None, maxn=100, chop=False, strict=False, quad=None, verbose=False):
"""Apply evalf() to each element of self."""
options = {'subs':subs, 'maxn':maxn, 'chop':chop, 'strict':strict,
'quad':quad, 'verbose':verbose}
return self.applyfunc(lambda i: i.evalf(n, **options))
def expand(self, deep=True, modulus=None, power_base=True, power_exp=True,
mul=True, log=True, multinomial=True, basic=True, **hints):
"""Apply core.function.expand to each entry of the matrix.
Examples
========
>>> from sympy.abc import x
>>> from sympy.matrices import Matrix
>>> Matrix(1, 1, [x*(x+1)])
Matrix([[x*(x + 1)]])
>>> _.expand()
Matrix([[x**2 + x]])
"""
return self.applyfunc(lambda x: x.expand(
deep, modulus, power_base, power_exp, mul, log, multinomial, basic,
**hints))
@property
def H(self):
"""Return Hermite conjugate.
Examples
========
>>> from sympy import Matrix, I
>>> m = Matrix((0, 1 + I, 2, 3))
>>> m
Matrix([
[ 0],
[1 + I],
[ 2],
[ 3]])
>>> m.H
Matrix([[0, 1 - I, 2, 3]])
See Also
========
conjugate: By-element conjugation
sympy.matrices.matrices.MatrixBase.D: Dirac conjugation
"""
return self.T.C
def permute(self, perm, orientation='rows', direction='forward'):
r"""Permute the rows or columns of a matrix by the given list of
swaps.
Parameters
==========
perm : Permutation, list, or list of lists
A representation for the permutation.
If it is ``Permutation``, it is used directly with some
resizing with respect to the matrix size.
If it is specified as list of lists,
(e.g., ``[[0, 1], [0, 2]]``), then the permutation is formed
from applying the product of cycles. The direction how the
cyclic product is applied is described in below.
If it is specified as a list, the list should represent
an array form of a permutation. (e.g., ``[1, 2, 0]``) which
would would form the swapping function
`0 \mapsto 1, 1 \mapsto 2, 2\mapsto 0`.
orientation : 'rows', 'cols'
A flag to control whether to permute the rows or the columns
direction : 'forward', 'backward'
A flag to control whether to apply the permutations from
the start of the list first, or from the back of the list
first.
For example, if the permutation specification is
``[[0, 1], [0, 2]]``,
If the flag is set to ``'forward'``, the cycle would be
formed as `0 \mapsto 2, 2 \mapsto 1, 1 \mapsto 0`.
If the flag is set to ``'backward'``, the cycle would be
formed as `0 \mapsto 1, 1 \mapsto 2, 2 \mapsto 0`.
If the argument ``perm`` is not in a form of list of lists,
this flag takes no effect.
Examples
========
>>> from sympy.matrices import eye
>>> M = eye(3)
>>> M.permute([[0, 1], [0, 2]], orientation='rows', direction='forward')
Matrix([
[0, 0, 1],
[1, 0, 0],
[0, 1, 0]])
>>> from sympy.matrices import eye
>>> M = eye(3)
>>> M.permute([[0, 1], [0, 2]], orientation='rows', direction='backward')
Matrix([
[0, 1, 0],
[0, 0, 1],
[1, 0, 0]])
Notes
=====
If a bijective function
`\sigma : \mathbb{N}_0 \rightarrow \mathbb{N}_0` denotes the
permutation.
If the matrix `A` is the matrix to permute, represented as
a horizontal or a vertical stack of vectors:
.. math::
A =
\begin{bmatrix}
a_0 \\ a_1 \\ \vdots \\ a_{n-1}
\end{bmatrix} =
\begin{bmatrix}
\alpha_0 & \alpha_1 & \cdots & \alpha_{n-1}
\end{bmatrix}
If the matrix `B` is the result, the permutation of matrix rows
is defined as:
.. math::
B := \begin{bmatrix}
a_{\sigma(0)} \\ a_{\sigma(1)} \\ \vdots \\ a_{\sigma(n-1)}
\end{bmatrix}
And the permutation of matrix columns is defined as:
.. math::
B := \begin{bmatrix}
\alpha_{\sigma(0)} & \alpha_{\sigma(1)} &
\cdots & \alpha_{\sigma(n-1)}
\end{bmatrix}
"""
from sympy.combinatorics import Permutation
# allow british variants and `columns`
if direction == 'forwards':
direction = 'forward'
if direction == 'backwards':
direction = 'backward'
if orientation == 'columns':
orientation = 'cols'
if direction not in ('forward', 'backward'):
raise TypeError("direction='{}' is an invalid kwarg. "
"Try 'forward' or 'backward'".format(direction))
if orientation not in ('rows', 'cols'):
raise TypeError("orientation='{}' is an invalid kwarg. "
"Try 'rows' or 'cols'".format(orientation))
if not isinstance(perm, (Permutation, Iterable)):
raise ValueError(
"{} must be a list, a list of lists, "
"or a SymPy permutation object.".format(perm))
# ensure all swaps are in range
max_index = self.rows if orientation == 'rows' else self.cols
if not all(0 <= t <= max_index for t in flatten(list(perm))):
raise IndexError("`swap` indices out of range.")
if perm and not isinstance(perm, Permutation) and \
isinstance(perm[0], Iterable):
if direction == 'forward':
perm = list(reversed(perm))
perm = Permutation(perm, size=max_index+1)
else:
perm = Permutation(perm, size=max_index+1)
if orientation == 'rows':
return self._eval_permute_rows(perm)
if orientation == 'cols':
return self._eval_permute_cols(perm)
def permute_cols(self, swaps, direction='forward'):
"""Alias for
``self.permute(swaps, orientation='cols', direction=direction)``
See Also
========
permute
"""
return self.permute(swaps, orientation='cols', direction=direction)
def permute_rows(self, swaps, direction='forward'):
"""Alias for
``self.permute(swaps, orientation='rows', direction=direction)``
See Also
========
permute
"""
return self.permute(swaps, orientation='rows', direction=direction)
def refine(self, assumptions=True):
"""Apply refine to each element of the matrix.
Examples
========
>>> from sympy import Symbol, Matrix, Abs, sqrt, Q
>>> x = Symbol('x')
>>> Matrix([[Abs(x)**2, sqrt(x**2)],[sqrt(x**2), Abs(x)**2]])
Matrix([
[ Abs(x)**2, sqrt(x**2)],
[sqrt(x**2), Abs(x)**2]])
>>> _.refine(Q.real(x))
Matrix([
[ x**2, Abs(x)],
[Abs(x), x**2]])
"""
return self.applyfunc(lambda x: refine(x, assumptions))
def replace(self, F, G, map=False, simultaneous=True, exact=None):
"""Replaces Function F in Matrix entries with Function G.
Examples
========
>>> from sympy import symbols, Function, Matrix
>>> F, G = symbols('F, G', cls=Function)
>>> M = Matrix(2, 2, lambda i, j: F(i+j)) ; M
Matrix([
[F(0), F(1)],
[F(1), F(2)]])
>>> N = M.replace(F,G)
>>> N
Matrix([
[G(0), G(1)],
[G(1), G(2)]])
"""
return self.applyfunc(
lambda x: x.replace(F, G, map=map, simultaneous=simultaneous, exact=exact))
def rot90(self, k=1):
"""Rotates Matrix by 90 degrees
Parameters
==========
k : int
Specifies how many times the matrix is rotated by 90 degrees
(clockwise when positive, counter-clockwise when negative).
Examples
========
>>> from sympy import Matrix, symbols
>>> A = Matrix(2, 2, symbols('a:d'))
>>> A
Matrix([
[a, b],
[c, d]])
Rotating the matrix clockwise one time:
>>> A.rot90(1)
Matrix([
[c, a],
[d, b]])
Rotating the matrix anticlockwise two times:
>>> A.rot90(-2)
Matrix([
[d, c],
[b, a]])
"""
mod = k%4
if mod == 0:
return self
if mod == 1:
return self[::-1, ::].T
if mod == 2:
return self[::-1, ::-1]
if mod == 3:
return self[::, ::-1].T
def simplify(self, **kwargs):
"""Apply simplify to each element of the matrix.
Examples
========
>>> from sympy.abc import x, y
>>> from sympy import sin, cos
>>> from sympy.matrices import SparseMatrix
>>> SparseMatrix(1, 1, [x*sin(y)**2 + x*cos(y)**2])
Matrix([[x*sin(y)**2 + x*cos(y)**2]])
>>> _.simplify()
Matrix([[x]])
"""
return self.applyfunc(lambda x: x.simplify(**kwargs))
def subs(self, *args, **kwargs): # should mirror core.basic.subs
"""Return a new matrix with subs applied to each entry.
Examples
========
>>> from sympy.abc import x, y
>>> from sympy.matrices import SparseMatrix, Matrix
>>> SparseMatrix(1, 1, [x])
Matrix([[x]])
>>> _.subs(x, y)
Matrix([[y]])
>>> Matrix(_).subs(y, x)
Matrix([[x]])
"""
return self.applyfunc(lambda x: x.subs(*args, **kwargs))
def trace(self):
"""
Returns the trace of a square matrix i.e. the sum of the
diagonal elements.
Examples
========
>>> from sympy import Matrix
>>> A = Matrix(2, 2, [1, 2, 3, 4])
>>> A.trace()
5
"""
if self.rows != self.cols:
raise NonSquareMatrixError()
return self._eval_trace()
def transpose(self):
"""
Returns the transpose of the matrix.
Examples
========
>>> from sympy import Matrix
>>> A = Matrix(2, 2, [1, 2, 3, 4])
>>> A.transpose()
Matrix([
[1, 3],
[2, 4]])
>>> from sympy import Matrix, I
>>> m=Matrix(((1, 2+I), (3, 4)))
>>> m
Matrix([
[1, 2 + I],
[3, 4]])
>>> m.transpose()
Matrix([
[ 1, 3],
[2 + I, 4]])
>>> m.T == m.transpose()
True
See Also
========
conjugate: By-element conjugation
"""
return self._eval_transpose()
@property
def T(self):
'''Matrix transposition'''
return self.transpose()
@property
def C(self):
'''By-element conjugation'''
return self.conjugate()
def n(self, *args, **kwargs):
"""Apply evalf() to each element of self."""
return self.evalf(*args, **kwargs)
def xreplace(self, rule): # should mirror core.basic.xreplace
"""Return a new matrix with xreplace applied to each entry.
Examples
========
>>> from sympy.abc import x, y
>>> from sympy.matrices import SparseMatrix, Matrix
>>> SparseMatrix(1, 1, [x])
Matrix([[x]])
>>> _.xreplace({x: y})
Matrix([[y]])
>>> Matrix(_).xreplace({y: x})
Matrix([[x]])
"""
return self.applyfunc(lambda x: x.xreplace(rule))
def _eval_simplify(self, **kwargs):
# XXX: We can't use self.simplify here as mutable subclasses will
# override simplify and have it return None
return MatrixOperations.simplify(self, **kwargs)
def _eval_trigsimp(self, **opts):
from sympy.simplify import trigsimp
return self.applyfunc(lambda x: trigsimp(x, **opts))
class MatrixArithmetic(MatrixRequired):
"""Provides basic matrix arithmetic operations.
Should not be instantiated directly."""
_op_priority = 10.01
def _eval_Abs(self):
return self._new(self.rows, self.cols, lambda i, j: Abs(self[i, j]))
def _eval_add(self, other):
return self._new(self.rows, self.cols,
lambda i, j: self[i, j] + other[i, j])
def _eval_matrix_mul(self, other):
def entry(i, j):
vec = [self[i,k]*other[k,j] for k in range(self.cols)]
try:
return Add(*vec)
except (TypeError, SympifyError):
# Some matrices don't work with `sum` or `Add`
# They don't work with `sum` because `sum` tries to add `0`
# Fall back to a safe way to multiply if the `Add` fails.
return reduce(lambda a, b: a + b, vec)
return self._new(self.rows, other.cols, entry)
def _eval_matrix_mul_elementwise(self, other):
return self._new(self.rows, self.cols, lambda i, j: self[i,j]*other[i,j])
def _eval_matrix_rmul(self, other):
def entry(i, j):
return sum(other[i,k]*self[k,j] for k in range(other.cols))
return self._new(other.rows, self.cols, entry)
def _eval_pow_by_recursion(self, num):
if num == 1:
return self
if num % 2 == 1:
a, b = self, self._eval_pow_by_recursion(num - 1)
else:
a = b = self._eval_pow_by_recursion(num // 2)
return a.multiply(b)
def _eval_pow_by_cayley(self, exp):
from sympy.discrete.recurrences import linrec_coeffs
row = self.shape[0]
p = self.charpoly()
coeffs = (-p).all_coeffs()[1:]
coeffs = linrec_coeffs(coeffs, exp)
new_mat = self.eye(row)
ans = self.zeros(row)
for i in range(row):
ans += coeffs[i]*new_mat
new_mat *= self
return ans
def _eval_pow_by_recursion_dotprodsimp(self, num, prevsimp=None):
if prevsimp is None:
prevsimp = [True]*len(self)
if num == 1:
return self
if num % 2 == 1:
a, b = self, self._eval_pow_by_recursion_dotprodsimp(num - 1,
prevsimp=prevsimp)
else:
a = b = self._eval_pow_by_recursion_dotprodsimp(num // 2,
prevsimp=prevsimp)
m = a.multiply(b, dotprodsimp=False)
lenm = len(m)
elems = [None]*lenm
for i in range(lenm):
if prevsimp[i]:
elems[i], prevsimp[i] = _dotprodsimp(m[i], withsimp=True)
else:
elems[i] = m[i]
return m._new(m.rows, m.cols, elems)
def _eval_scalar_mul(self, other):
return self._new(self.rows, self.cols, lambda i, j: self[i,j]*other)
def _eval_scalar_rmul(self, other):
return self._new(self.rows, self.cols, lambda i, j: other*self[i,j])
def _eval_Mod(self, other):
from sympy import Mod
return self._new(self.rows, self.cols, lambda i, j: Mod(self[i, j], other))
# python arithmetic functions
def __abs__(self):
"""Returns a new matrix with entry-wise absolute values."""
return self._eval_Abs()
@call_highest_priority('__radd__')
def __add__(self, other):
"""Return self + other, raising ShapeError if shapes don't match."""
other = _matrixify(other)
# matrix-like objects can have shapes. This is
# our first sanity check.
if hasattr(other, 'shape'):
if self.shape != other.shape:
raise ShapeError("Matrix size mismatch: %s + %s" % (
self.shape, other.shape))
# honest sympy matrices defer to their class's routine
if getattr(other, 'is_Matrix', False):
# call the highest-priority class's _eval_add
a, b = self, other
if a.__class__ != classof(a, b):
b, a = a, b
return a._eval_add(b)
# Matrix-like objects can be passed to CommonMatrix routines directly.
if getattr(other, 'is_MatrixLike', False):
return MatrixArithmetic._eval_add(self, other)
raise TypeError('cannot add %s and %s' % (type(self), type(other)))
@call_highest_priority('__rdiv__')
def __div__(self, other):
return self * (self.one / other)
@call_highest_priority('__rmatmul__')
def __matmul__(self, other):
other = _matrixify(other)
if not getattr(other, 'is_Matrix', False) and not getattr(other, 'is_MatrixLike', False):
return NotImplemented
return self.__mul__(other)
def __mod__(self, other):
return self.applyfunc(lambda x: x % other)
@call_highest_priority('__rmul__')
def __mul__(self, other):
"""Return self*other where other is either a scalar or a matrix
of compatible dimensions.
Examples
========
>>> from sympy.matrices import Matrix
>>> A = Matrix([[1, 2, 3], [4, 5, 6]])
>>> 2*A == A*2 == Matrix([[2, 4, 6], [8, 10, 12]])
True
>>> B = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]])
>>> A*B
Matrix([
[30, 36, 42],
[66, 81, 96]])
>>> B*A
Traceback (most recent call last):
...
ShapeError: Matrices size mismatch.
>>>
See Also
========
matrix_multiply_elementwise
"""
return self.multiply(other)
def multiply(self, other, dotprodsimp=None):
"""Same as __mul__() but with optional simplification.
Parameters
==========
dotprodsimp : bool, optional
Specifies whether intermediate term algebraic simplification is used
during matrix multiplications to control expression blowup and thus
speed up calculation. Default is off.
"""
isimpbool = _get_intermediate_simp_bool(False, dotprodsimp)
other = _matrixify(other)
# matrix-like objects can have shapes. This is
# our first sanity check. Double check other is not explicitly not a Matrix.
if (hasattr(other, 'shape') and len(other.shape) == 2 and
(getattr(other, 'is_Matrix', True) or
getattr(other, 'is_MatrixLike', True))):
if self.shape[1] != other.shape[0]:
raise ShapeError("Matrix size mismatch: %s * %s." % (
self.shape, other.shape))
# honest sympy matrices defer to their class's routine
if getattr(other, 'is_Matrix', False):
m = self._eval_matrix_mul(other)
if isimpbool:
return m._new(m.rows, m.cols, [_dotprodsimp(e) for e in m])
return m
# Matrix-like objects can be passed to CommonMatrix routines directly.
if getattr(other, 'is_MatrixLike', False):
return MatrixArithmetic._eval_matrix_mul(self, other)
# if 'other' is not iterable then scalar multiplication.
if not isinstance(other, Iterable):
try:
return self._eval_scalar_mul(other)
except TypeError:
pass
return NotImplemented
def multiply_elementwise(self, other):
"""Return the Hadamard product (elementwise product) of A and B
Examples
========
>>> from sympy.matrices import Matrix
>>> A = Matrix([[0, 1, 2], [3, 4, 5]])
>>> B = Matrix([[1, 10, 100], [100, 10, 1]])
>>> A.multiply_elementwise(B)
Matrix([
[ 0, 10, 200],
[300, 40, 5]])
See Also
========
sympy.matrices.matrices.MatrixBase.cross
sympy.matrices.matrices.MatrixBase.dot
multiply
"""
if self.shape != other.shape:
raise ShapeError("Matrix shapes must agree {} != {}".format(self.shape, other.shape))
return self._eval_matrix_mul_elementwise(other)
def __neg__(self):
return self._eval_scalar_mul(-1)
@call_highest_priority('__rpow__')
def __pow__(self, exp):
"""Return self**exp a scalar or symbol."""
return self.pow(exp)
def pow(self, exp, method=None):
r"""Return self**exp a scalar or symbol.
Parameters
==========
method : multiply, mulsimp, jordan, cayley
If multiply then it returns exponentiation using recursion.
If jordan then Jordan form exponentiation will be used.
If cayley then the exponentiation is done using Cayley-Hamilton
theorem.
If mulsimp then the exponentiation is done using recursion
with dotprodsimp. This specifies whether intermediate term
algebraic simplification is used during naive matrix power to
control expression blowup and thus speed up calculation.
If None, then it heuristically decides which method to use.
"""
if method is not None and method not in ['multiply', 'mulsimp', 'jordan', 'cayley']:
raise TypeError('No such method')
if self.rows != self.cols:
raise NonSquareMatrixError()
a = self
jordan_pow = getattr(a, '_matrix_pow_by_jordan_blocks', None)
exp = sympify(exp)
if exp.is_zero:
return a._new(a.rows, a.cols, lambda i, j: int(i == j))
if exp == 1:
return a
diagonal = getattr(a, 'is_diagonal', None)
if diagonal is not None and diagonal():
return a._new(a.rows, a.cols, lambda i, j: a[i,j]**exp if i == j else 0)
if exp.is_Number and exp % 1 == 0:
if a.rows == 1:
return a._new([[a[0]**exp]])
if exp < 0:
exp = -exp
a = a.inv()
# When certain conditions are met,
# Jordan block algorithm is faster than
# computation by recursion.
if method == 'jordan':
try:
return jordan_pow(exp)
except MatrixError:
if method == 'jordan':
raise
elif method == 'cayley':
if not exp.is_Number or exp % 1 != 0:
raise ValueError("cayley method is only valid for integer powers")
return a._eval_pow_by_cayley(exp)
elif method == "mulsimp":
if not exp.is_Number or exp % 1 != 0:
raise ValueError("mulsimp method is only valid for integer powers")
return a._eval_pow_by_recursion_dotprodsimp(exp)
elif method == "multiply":
if not exp.is_Number or exp % 1 != 0:
raise ValueError("multiply method is only valid for integer powers")
return a._eval_pow_by_recursion(exp)
elif method is None and exp.is_Number and exp % 1 == 0:
# Decide heuristically which method to apply
if a.rows == 2 and exp > 100000:
return jordan_pow(exp)
elif _get_intermediate_simp_bool(True, None):
return a._eval_pow_by_recursion_dotprodsimp(exp)
elif exp > 10000:
return a._eval_pow_by_cayley(exp)
else:
return a._eval_pow_by_recursion(exp)
if jordan_pow:
try:
return jordan_pow(exp)
except NonInvertibleMatrixError:
# Raised by jordan_pow on zero determinant matrix unless exp is
# definitely known to be a non-negative integer.
# Here we raise if n is definitely not a non-negative integer
# but otherwise we can leave this as an unevaluated MatPow.
if exp.is_integer is False or exp.is_nonnegative is False:
raise
from sympy.matrices.expressions import MatPow
return MatPow(a, exp)
@call_highest_priority('__add__')
def __radd__(self, other):
return self + other
@call_highest_priority('__matmul__')
def __rmatmul__(self, other):
other = _matrixify(other)
if not getattr(other, 'is_Matrix', False) and not getattr(other, 'is_MatrixLike', False):
return NotImplemented
return self.__rmul__(other)
@call_highest_priority('__mul__')
def __rmul__(self, other):
other = _matrixify(other)
# matrix-like objects can have shapes. This is
# our first sanity check. Double check other is not explicitly not a Matrix.
if (hasattr(other, 'shape') and len(other.shape) == 2 and
(getattr(other, 'is_Matrix', True) or
getattr(other, 'is_MatrixLike', True))):
if self.shape[0] != other.shape[1]:
raise ShapeError("Matrix size mismatch.")
# honest sympy matrices defer to their class's routine
if getattr(other, 'is_Matrix', False):
return other._new(other.as_mutable() * self)
# Matrix-like objects can be passed to CommonMatrix routines directly.
if getattr(other, 'is_MatrixLike', False):
return MatrixArithmetic._eval_matrix_rmul(self, other)
# if 'other' is not iterable then scalar multiplication.
if not isinstance(other, Iterable):
try:
return self._eval_scalar_rmul(other)
except TypeError:
pass
return NotImplemented
@call_highest_priority('__sub__')
def __rsub__(self, a):
return (-self) + a
@call_highest_priority('__rsub__')
def __sub__(self, a):
return self + (-a)
@call_highest_priority('__rtruediv__')
def __truediv__(self, other):
return self.__div__(other)
class MatrixCommon(MatrixArithmetic, MatrixOperations, MatrixProperties,
MatrixSpecial, MatrixShaping):
"""All common matrix operations including basic arithmetic, shaping,
and special matrices like `zeros`, and `eye`."""
_diff_wrt = True # type: bool
class _MinimalMatrix:
"""Class providing the minimum functionality
for a matrix-like object and implementing every method
required for a `MatrixRequired`. This class does not have everything
needed to become a full-fledged SymPy object, but it will satisfy the
requirements of anything inheriting from `MatrixRequired`. If you wish
to make a specialized matrix type, make sure to implement these
methods and properties with the exception of `__init__` and `__repr__`
which are included for convenience."""
is_MatrixLike = True
_sympify = staticmethod(sympify)
_class_priority = 3
zero = S.Zero
one = S.One
is_Matrix = True
is_MatrixExpr = False
@classmethod
def _new(cls, *args, **kwargs):
return cls(*args, **kwargs)
def __init__(self, rows, cols=None, mat=None):
if isfunction(mat):
# if we passed in a function, use that to populate the indices
mat = list(mat(i, j) for i in range(rows) for j in range(cols))
if cols is None and mat is None:
mat = rows
rows, cols = getattr(mat, 'shape', (rows, cols))
try:
# if we passed in a list of lists, flatten it and set the size
if cols is None and mat is None:
mat = rows
cols = len(mat[0])
rows = len(mat)
mat = [x for l in mat for x in l]
except (IndexError, TypeError):
pass
self.mat = tuple(self._sympify(x) for x in mat)
self.rows, self.cols = rows, cols
if self.rows is None or self.cols is None:
raise NotImplementedError("Cannot initialize matrix with given parameters")
def __getitem__(self, key):
def _normalize_slices(row_slice, col_slice):
"""Ensure that row_slice and col_slice don't have
`None` in their arguments. Any integers are converted
to slices of length 1"""
if not isinstance(row_slice, slice):
row_slice = slice(row_slice, row_slice + 1, None)
row_slice = slice(*row_slice.indices(self.rows))
if not isinstance(col_slice, slice):
col_slice = slice(col_slice, col_slice + 1, None)
col_slice = slice(*col_slice.indices(self.cols))
return (row_slice, col_slice)
def _coord_to_index(i, j):
"""Return the index in _mat corresponding
to the (i,j) position in the matrix. """
return i * self.cols + j
if isinstance(key, tuple):
i, j = key
if isinstance(i, slice) or isinstance(j, slice):
# if the coordinates are not slices, make them so
# and expand the slices so they don't contain `None`
i, j = _normalize_slices(i, j)
rowsList, colsList = list(range(self.rows))[i], \
list(range(self.cols))[j]
indices = (i * self.cols + j for i in rowsList for j in
colsList)
return self._new(len(rowsList), len(colsList),
list(self.mat[i] for i in indices))
# if the key is a tuple of ints, change
# it to an array index
key = _coord_to_index(i, j)
return self.mat[key]
def __eq__(self, other):
try:
classof(self, other)
except TypeError:
return False
return (
self.shape == other.shape and list(self) == list(other))
def __len__(self):
return self.rows*self.cols
def __repr__(self):
return "_MinimalMatrix({}, {}, {})".format(self.rows, self.cols,
self.mat)
@property
def shape(self):
return (self.rows, self.cols)
class _CastableMatrix: # this is needed here ONLY FOR TESTS.
def as_mutable(self):
return self
def as_immutable(self):
return self
class _MatrixWrapper:
"""Wrapper class providing the minimum functionality for a matrix-like
object: .rows, .cols, .shape, indexability, and iterability. CommonMatrix
math operations should work on matrix-like objects. This one is intended for
matrix-like objects which use the same indexing format as SymPy with respect
to returning matrix elements instead of rows for non-tuple indexes.
"""
is_Matrix = False # needs to be here because of __getattr__
is_MatrixLike = True
def __init__(self, mat, shape):
self.mat = mat
self.shape = shape
self.rows, self.cols = shape
def __getitem__(self, key):
if isinstance(key, tuple):
return sympify(self.mat.__getitem__(key))
return sympify(self.mat.__getitem__((key // self.rows, key % self.cols)))
def __iter__(self): # supports numpy.matrix and numpy.array
mat = self.mat
cols = self.cols
return iter(sympify(mat[r, c]) for r in range(self.rows) for c in range(cols))
def _matrixify(mat):
"""If `mat` is a Matrix or is matrix-like,
return a Matrix or MatrixWrapper object. Otherwise
`mat` is passed through without modification."""
if getattr(mat, 'is_Matrix', False) or getattr(mat, 'is_MatrixLike', False):
return mat
if not(getattr(mat, 'is_Matrix', True) or getattr(mat, 'is_MatrixLike', True)):
return mat
shape = None
if hasattr(mat, 'shape'): # numpy, scipy.sparse
if len(mat.shape) == 2:
shape = mat.shape
elif hasattr(mat, 'rows') and hasattr(mat, 'cols'): # mpmath
shape = (mat.rows, mat.cols)
if shape:
return _MatrixWrapper(mat, shape)
return mat
def a2idx(j, n=None):
"""Return integer after making positive and validating against n."""
if type(j) is not int:
jindex = getattr(j, '__index__', None)
if jindex is not None:
j = jindex()
else:
raise IndexError("Invalid index a[%r]" % (j,))
if n is not None:
if j < 0:
j += n
if not (j >= 0 and j < n):
raise IndexError("Index out of range: a[%s]" % (j,))
return int(j)
def classof(A, B):
"""
Get the type of the result when combining matrices of different types.
Currently the strategy is that immutability is contagious.
Examples
========
>>> from sympy import Matrix, ImmutableMatrix
>>> from sympy.matrices.common import classof
>>> M = Matrix([[1, 2], [3, 4]]) # a Mutable Matrix
>>> IM = ImmutableMatrix([[1, 2], [3, 4]])
>>> classof(M, IM)
<class 'sympy.matrices.immutable.ImmutableDenseMatrix'>
"""
priority_A = getattr(A, '_class_priority', None)
priority_B = getattr(B, '_class_priority', None)
if None not in (priority_A, priority_B):
if A._class_priority > B._class_priority:
return A.__class__
else:
return B.__class__
try:
import numpy
except ImportError:
pass
else:
if isinstance(A, numpy.ndarray):
return B.__class__
if isinstance(B, numpy.ndarray):
return A.__class__
raise TypeError("Incompatible classes %s, %s" % (A.__class__, B.__class__))
|
78c628d7635bbdbd74f5fbdd0b0dc50d8dd9b91d2582cf7f093134c63b00805f
|
import random
from sympy.core import SympifyError, Add
from sympy.core.basic import Basic
from sympy.core.compatibility import is_sequence, reduce
from sympy.core.expr import Expr
from sympy.core.singleton import S
from sympy.core.symbol import Symbol
from sympy.core.sympify import sympify
from sympy.functions.elementary.trigonometric import cos, sin
from sympy.matrices.common import \
a2idx, classof, ShapeError
from sympy.matrices.matrices import MatrixBase
from sympy.simplify.simplify import simplify as _simplify
from sympy.utilities.decorator import doctest_depends_on
from sympy.utilities.misc import filldedent
from .decompositions import _cholesky, _LDLdecomposition
from .solvers import _lower_triangular_solve, _upper_triangular_solve
def _iszero(x):
"""Returns True if x is zero."""
return x.is_zero
def _compare_sequence(a, b):
"""Compares the elements of a list/tuple `a`
and a list/tuple `b`. `_compare_sequence((1,2), [1, 2])`
is True, whereas `(1,2) == [1, 2]` is False"""
if type(a) is type(b):
# if they are the same type, compare directly
return a == b
# there is no overhead for calling `tuple` on a
# tuple
return tuple(a) == tuple(b)
class DenseMatrix(MatrixBase):
is_MatrixExpr = False # type: bool
_op_priority = 10.01
_class_priority = 4
def __eq__(self, other):
other = sympify(other)
self_shape = getattr(self, 'shape', None)
other_shape = getattr(other, 'shape', None)
if None in (self_shape, other_shape):
return False
if self_shape != other_shape:
return False
if isinstance(other, Matrix):
return _compare_sequence(self._mat, other._mat)
elif isinstance(other, MatrixBase):
return _compare_sequence(self._mat, Matrix(other)._mat)
def __getitem__(self, key):
"""Return portion of self defined by key. If the key involves a slice
then a list will be returned (if key is a single slice) or a matrix
(if key was a tuple involving a slice).
Examples
========
>>> from sympy import Matrix, I
>>> m = Matrix([
... [1, 2 + I],
... [3, 4 ]])
If the key is a tuple that doesn't involve a slice then that element
is returned:
>>> m[1, 0]
3
When a tuple key involves a slice, a matrix is returned. Here, the
first column is selected (all rows, column 0):
>>> m[:, 0]
Matrix([
[1],
[3]])
If the slice is not a tuple then it selects from the underlying
list of elements that are arranged in row order and a list is
returned if a slice is involved:
>>> m[0]
1
>>> m[::2]
[1, 3]
"""
if isinstance(key, tuple):
i, j = key
try:
i, j = self.key2ij(key)
return self._mat[i*self.cols + j]
except (TypeError, IndexError):
if (isinstance(i, Expr) and not i.is_number) or (isinstance(j, Expr) and not j.is_number):
if ((j < 0) is True) or ((j >= self.shape[1]) is True) or\
((i < 0) is True) or ((i >= self.shape[0]) is True):
raise ValueError("index out of boundary")
from sympy.matrices.expressions.matexpr import MatrixElement
return MatrixElement(self, i, j)
if isinstance(i, slice):
i = range(self.rows)[i]
elif is_sequence(i):
pass
else:
i = [i]
if isinstance(j, slice):
j = range(self.cols)[j]
elif is_sequence(j):
pass
else:
j = [j]
return self.extract(i, j)
else:
# row-wise decomposition of matrix
if isinstance(key, slice):
return self._mat[key]
return self._mat[a2idx(key)]
def __setitem__(self, key, value):
raise NotImplementedError()
def _eval_add(self, other):
# we assume both arguments are dense matrices since
# sparse matrices have a higher priority
mat = [a + b for a,b in zip(self._mat, other._mat)]
return classof(self, other)._new(self.rows, self.cols, mat, copy=False)
def _eval_extract(self, rowsList, colsList):
mat = self._mat
cols = self.cols
indices = (i * cols + j for i in rowsList for j in colsList)
return self._new(len(rowsList), len(colsList),
list(mat[i] for i in indices), copy=False)
def _eval_matrix_mul(self, other):
other_len = other.rows*other.cols
new_len = self.rows*other.cols
new_mat = [self.zero]*new_len
# if we multiply an n x 0 with a 0 x m, the
# expected behavior is to produce an n x m matrix of zeros
if self.cols != 0 and other.rows != 0:
self_cols = self.cols
mat = self._mat
other_mat = other._mat
for i in range(new_len):
row, col = i // other.cols, i % other.cols
row_indices = range(self_cols*row, self_cols*(row+1))
col_indices = range(col, other_len, other.cols)
vec = [mat[a]*other_mat[b] for a, b in zip(row_indices, col_indices)]
try:
new_mat[i] = Add(*vec)
except (TypeError, SympifyError):
# Some matrices don't work with `sum` or `Add`
# They don't work with `sum` because `sum` tries to add `0`
# Fall back to a safe way to multiply if the `Add` fails.
new_mat[i] = reduce(lambda a, b: a + b, vec)
return classof(self, other)._new(self.rows, other.cols, new_mat, copy=False)
def _eval_matrix_mul_elementwise(self, other):
mat = [a*b for a,b in zip(self._mat, other._mat)]
return classof(self, other)._new(self.rows, self.cols, mat, copy=False)
def _eval_inverse(self, **kwargs):
return self.inv(method=kwargs.get('method', 'GE'),
iszerofunc=kwargs.get('iszerofunc', _iszero),
try_block_diag=kwargs.get('try_block_diag', False))
def _eval_scalar_mul(self, other):
mat = [other*a for a in self._mat]
return self._new(self.rows, self.cols, mat, copy=False)
def _eval_scalar_rmul(self, other):
mat = [a*other for a in self._mat]
return self._new(self.rows, self.cols, mat, copy=False)
def _eval_tolist(self):
mat = list(self._mat)
cols = self.cols
return [mat[i*cols:(i + 1)*cols] for i in range(self.rows)]
def as_immutable(self):
"""Returns an Immutable version of this Matrix
"""
from .immutable import ImmutableDenseMatrix as cls
if self.rows and self.cols:
return cls._new(self.tolist())
return cls._new(self.rows, self.cols, [])
def as_mutable(self):
"""Returns a mutable version of this matrix
Examples
========
>>> from sympy import ImmutableMatrix
>>> X = ImmutableMatrix([[1, 2], [3, 4]])
>>> Y = X.as_mutable()
>>> Y[1, 1] = 5 # Can set values in Y
>>> Y
Matrix([
[1, 2],
[3, 5]])
"""
return Matrix(self)
def equals(self, other, failing_expression=False):
"""Applies ``equals`` to corresponding elements of the matrices,
trying to prove that the elements are equivalent, returning True
if they are, False if any pair is not, and None (or the first
failing expression if failing_expression is True) if it cannot
be decided if the expressions are equivalent or not. This is, in
general, an expensive operation.
Examples
========
>>> from sympy.matrices import Matrix
>>> from sympy.abc import x
>>> A = Matrix([x*(x - 1), 0])
>>> B = Matrix([x**2 - x, 0])
>>> A == B
False
>>> A.simplify() == B.simplify()
True
>>> A.equals(B)
True
>>> A.equals(2)
False
See Also
========
sympy.core.expr.Expr.equals
"""
self_shape = getattr(self, 'shape', None)
other_shape = getattr(other, 'shape', None)
if None in (self_shape, other_shape):
return False
if self_shape != other_shape:
return False
rv = True
for i in range(self.rows):
for j in range(self.cols):
ans = self[i, j].equals(other[i, j], failing_expression)
if ans is False:
return False
elif ans is not True and rv is True:
rv = ans
return rv
def cholesky(self, hermitian=True):
return _cholesky(self, hermitian=hermitian)
def LDLdecomposition(self, hermitian=True):
return _LDLdecomposition(self, hermitian=hermitian)
def lower_triangular_solve(self, rhs):
return _lower_triangular_solve(self, rhs)
def upper_triangular_solve(self, rhs):
return _upper_triangular_solve(self, rhs)
cholesky.__doc__ = _cholesky.__doc__
LDLdecomposition.__doc__ = _LDLdecomposition.__doc__
lower_triangular_solve.__doc__ = _lower_triangular_solve.__doc__
upper_triangular_solve.__doc__ = _upper_triangular_solve.__doc__
def _force_mutable(x):
"""Return a matrix as a Matrix, otherwise return x."""
if getattr(x, 'is_Matrix', False):
return x.as_mutable()
elif isinstance(x, Basic):
return x
elif hasattr(x, '__array__'):
a = x.__array__()
if len(a.shape) == 0:
return sympify(a)
return Matrix(x)
return x
class MutableDenseMatrix(DenseMatrix, MatrixBase):
__hash__ = None
def __new__(cls, *args, **kwargs):
return cls._new(*args, **kwargs)
@classmethod
def _new(cls, *args, **kwargs):
# if the `copy` flag is set to False, the input
# was rows, cols, [list]. It should be used directly
# without creating a copy.
if kwargs.get('copy', True) is False:
if len(args) != 3:
raise TypeError("'copy=False' requires a matrix be initialized as rows,cols,[list]")
rows, cols, flat_list = args
else:
rows, cols, flat_list = cls._handle_creation_inputs(*args, **kwargs)
flat_list = list(flat_list) # create a shallow copy
self = object.__new__(cls)
self.rows = rows
self.cols = cols
self._mat = flat_list
return self
def __setitem__(self, key, value):
"""
Examples
========
>>> from sympy import Matrix, I, zeros, ones
>>> m = Matrix(((1, 2+I), (3, 4)))
>>> m
Matrix([
[1, 2 + I],
[3, 4]])
>>> m[1, 0] = 9
>>> m
Matrix([
[1, 2 + I],
[9, 4]])
>>> m[1, 0] = [[0, 1]]
To replace row r you assign to position r*m where m
is the number of columns:
>>> M = zeros(4)
>>> m = M.cols
>>> M[3*m] = ones(1, m)*2; M
Matrix([
[0, 0, 0, 0],
[0, 0, 0, 0],
[0, 0, 0, 0],
[2, 2, 2, 2]])
And to replace column c you can assign to position c:
>>> M[2] = ones(m, 1)*4; M
Matrix([
[0, 0, 4, 0],
[0, 0, 4, 0],
[0, 0, 4, 0],
[2, 2, 4, 2]])
"""
rv = self._setitem(key, value)
if rv is not None:
i, j, value = rv
self._mat[i*self.cols + j] = value
def as_mutable(self):
return self.copy()
def _eval_col_del(self, col):
for j in range(self.rows-1, -1, -1):
del self._mat[col + j*self.cols]
self.cols -= 1
def _eval_row_del(self, row):
del self._mat[row*self.cols: (row+1)*self.cols]
self.rows -= 1
def col_op(self, j, f):
"""In-place operation on col j using two-arg functor whose args are
interpreted as (self[i, j], i).
Examples
========
>>> from sympy.matrices import eye
>>> M = eye(3)
>>> M.col_op(1, lambda v, i: v + 2*M[i, 0]); M
Matrix([
[1, 2, 0],
[0, 1, 0],
[0, 0, 1]])
See Also
========
col
row_op
"""
self._mat[j::self.cols] = [f(*t) for t in list(zip(self._mat[j::self.cols], list(range(self.rows))))]
def col_swap(self, i, j):
"""Swap the two given columns of the matrix in-place.
Examples
========
>>> from sympy.matrices import Matrix
>>> M = Matrix([[1, 0], [1, 0]])
>>> M
Matrix([
[1, 0],
[1, 0]])
>>> M.col_swap(0, 1)
>>> M
Matrix([
[0, 1],
[0, 1]])
See Also
========
col
row_swap
"""
for k in range(0, self.rows):
self[k, i], self[k, j] = self[k, j], self[k, i]
def copyin_list(self, key, value):
"""Copy in elements from a list.
Parameters
==========
key : slice
The section of this matrix to replace.
value : iterable
The iterable to copy values from.
Examples
========
>>> from sympy.matrices import eye
>>> I = eye(3)
>>> I[:2, 0] = [1, 2] # col
>>> I
Matrix([
[1, 0, 0],
[2, 1, 0],
[0, 0, 1]])
>>> I[1, :2] = [[3, 4]]
>>> I
Matrix([
[1, 0, 0],
[3, 4, 0],
[0, 0, 1]])
See Also
========
copyin_matrix
"""
if not is_sequence(value):
raise TypeError("`value` must be an ordered iterable, not %s." % type(value))
return self.copyin_matrix(key, Matrix(value))
def copyin_matrix(self, key, value):
"""Copy in values from a matrix into the given bounds.
Parameters
==========
key : slice
The section of this matrix to replace.
value : Matrix
The matrix to copy values from.
Examples
========
>>> from sympy.matrices import Matrix, eye
>>> M = Matrix([[0, 1], [2, 3], [4, 5]])
>>> I = eye(3)
>>> I[:3, :2] = M
>>> I
Matrix([
[0, 1, 0],
[2, 3, 0],
[4, 5, 1]])
>>> I[0, 1] = M
>>> I
Matrix([
[0, 0, 1],
[2, 2, 3],
[4, 4, 5]])
See Also
========
copyin_list
"""
rlo, rhi, clo, chi = self.key2bounds(key)
shape = value.shape
dr, dc = rhi - rlo, chi - clo
if shape != (dr, dc):
raise ShapeError(filldedent("The Matrix `value` doesn't have the "
"same dimensions "
"as the in sub-Matrix given by `key`."))
for i in range(value.rows):
for j in range(value.cols):
self[i + rlo, j + clo] = value[i, j]
def fill(self, value):
"""Fill the matrix with the scalar value.
See Also
========
zeros
ones
"""
self._mat = [value]*len(self)
def row_op(self, i, f):
"""In-place operation on row ``i`` using two-arg functor whose args are
interpreted as ``(self[i, j], j)``.
Examples
========
>>> from sympy.matrices import eye
>>> M = eye(3)
>>> M.row_op(1, lambda v, j: v + 2*M[0, j]); M
Matrix([
[1, 0, 0],
[2, 1, 0],
[0, 0, 1]])
See Also
========
row
zip_row_op
col_op
"""
i0 = i*self.cols
ri = self._mat[i0: i0 + self.cols]
self._mat[i0: i0 + self.cols] = [f(x, j) for x, j in zip(ri, list(range(self.cols)))]
def row_swap(self, i, j):
"""Swap the two given rows of the matrix in-place.
Examples
========
>>> from sympy.matrices import Matrix
>>> M = Matrix([[0, 1], [1, 0]])
>>> M
Matrix([
[0, 1],
[1, 0]])
>>> M.row_swap(0, 1)
>>> M
Matrix([
[1, 0],
[0, 1]])
See Also
========
row
col_swap
"""
for k in range(0, self.cols):
self[i, k], self[j, k] = self[j, k], self[i, k]
def simplify(self, **kwargs):
"""Applies simplify to the elements of a matrix in place.
This is a shortcut for M.applyfunc(lambda x: simplify(x, ratio, measure))
See Also
========
sympy.simplify.simplify.simplify
"""
for i in range(len(self._mat)):
self._mat[i] = _simplify(self._mat[i], **kwargs)
def zip_row_op(self, i, k, f):
"""In-place operation on row ``i`` using two-arg functor whose args are
interpreted as ``(self[i, j], self[k, j])``.
Examples
========
>>> from sympy.matrices import eye
>>> M = eye(3)
>>> M.zip_row_op(1, 0, lambda v, u: v + 2*u); M
Matrix([
[1, 0, 0],
[2, 1, 0],
[0, 0, 1]])
See Also
========
row
row_op
col_op
"""
i0 = i*self.cols
k0 = k*self.cols
ri = self._mat[i0: i0 + self.cols]
rk = self._mat[k0: k0 + self.cols]
self._mat[i0: i0 + self.cols] = [f(x, y) for x, y in zip(ri, rk)]
is_zero = False
MutableMatrix = Matrix = MutableDenseMatrix
###########
# Numpy Utility Functions:
# list2numpy, matrix2numpy, symmarray, rot_axis[123]
###########
def list2numpy(l, dtype=object): # pragma: no cover
"""Converts python list of SymPy expressions to a NumPy array.
See Also
========
matrix2numpy
"""
from numpy import empty
a = empty(len(l), dtype)
for i, s in enumerate(l):
a[i] = s
return a
def matrix2numpy(m, dtype=object): # pragma: no cover
"""Converts SymPy's matrix to a NumPy array.
See Also
========
list2numpy
"""
from numpy import empty
a = empty(m.shape, dtype)
for i in range(m.rows):
for j in range(m.cols):
a[i, j] = m[i, j]
return a
def rot_axis3(theta):
"""Returns a rotation matrix for a rotation of theta (in radians) about
the 3-axis.
Examples
========
>>> from sympy import pi
>>> from sympy.matrices import rot_axis3
A rotation of pi/3 (60 degrees):
>>> theta = pi/3
>>> rot_axis3(theta)
Matrix([
[ 1/2, sqrt(3)/2, 0],
[-sqrt(3)/2, 1/2, 0],
[ 0, 0, 1]])
If we rotate by pi/2 (90 degrees):
>>> rot_axis3(pi/2)
Matrix([
[ 0, 1, 0],
[-1, 0, 0],
[ 0, 0, 1]])
See Also
========
rot_axis1: Returns a rotation matrix for a rotation of theta (in radians)
about the 1-axis
rot_axis2: Returns a rotation matrix for a rotation of theta (in radians)
about the 2-axis
"""
ct = cos(theta)
st = sin(theta)
lil = ((ct, st, 0),
(-st, ct, 0),
(0, 0, 1))
return Matrix(lil)
def rot_axis2(theta):
"""Returns a rotation matrix for a rotation of theta (in radians) about
the 2-axis.
Examples
========
>>> from sympy import pi
>>> from sympy.matrices import rot_axis2
A rotation of pi/3 (60 degrees):
>>> theta = pi/3
>>> rot_axis2(theta)
Matrix([
[ 1/2, 0, -sqrt(3)/2],
[ 0, 1, 0],
[sqrt(3)/2, 0, 1/2]])
If we rotate by pi/2 (90 degrees):
>>> rot_axis2(pi/2)
Matrix([
[0, 0, -1],
[0, 1, 0],
[1, 0, 0]])
See Also
========
rot_axis1: Returns a rotation matrix for a rotation of theta (in radians)
about the 1-axis
rot_axis3: Returns a rotation matrix for a rotation of theta (in radians)
about the 3-axis
"""
ct = cos(theta)
st = sin(theta)
lil = ((ct, 0, -st),
(0, 1, 0),
(st, 0, ct))
return Matrix(lil)
def rot_axis1(theta):
"""Returns a rotation matrix for a rotation of theta (in radians) about
the 1-axis.
Examples
========
>>> from sympy import pi
>>> from sympy.matrices import rot_axis1
A rotation of pi/3 (60 degrees):
>>> theta = pi/3
>>> rot_axis1(theta)
Matrix([
[1, 0, 0],
[0, 1/2, sqrt(3)/2],
[0, -sqrt(3)/2, 1/2]])
If we rotate by pi/2 (90 degrees):
>>> rot_axis1(pi/2)
Matrix([
[1, 0, 0],
[0, 0, 1],
[0, -1, 0]])
See Also
========
rot_axis2: Returns a rotation matrix for a rotation of theta (in radians)
about the 2-axis
rot_axis3: Returns a rotation matrix for a rotation of theta (in radians)
about the 3-axis
"""
ct = cos(theta)
st = sin(theta)
lil = ((1, 0, 0),
(0, ct, st),
(0, -st, ct))
return Matrix(lil)
@doctest_depends_on(modules=('numpy',))
def symarray(prefix, shape, **kwargs): # pragma: no cover
r"""Create a numpy ndarray of symbols (as an object array).
The created symbols are named ``prefix_i1_i2_``... You should thus provide a
non-empty prefix if you want your symbols to be unique for different output
arrays, as SymPy symbols with identical names are the same object.
Parameters
----------
prefix : string
A prefix prepended to the name of every symbol.
shape : int or tuple
Shape of the created array. If an int, the array is one-dimensional; for
more than one dimension the shape must be a tuple.
\*\*kwargs : dict
keyword arguments passed on to Symbol
Examples
========
These doctests require numpy.
>>> from sympy import symarray
>>> symarray('', 3)
[_0 _1 _2]
If you want multiple symarrays to contain distinct symbols, you *must*
provide unique prefixes:
>>> a = symarray('', 3)
>>> b = symarray('', 3)
>>> a[0] == b[0]
True
>>> a = symarray('a', 3)
>>> b = symarray('b', 3)
>>> a[0] == b[0]
False
Creating symarrays with a prefix:
>>> symarray('a', 3)
[a_0 a_1 a_2]
For more than one dimension, the shape must be given as a tuple:
>>> symarray('a', (2, 3))
[[a_0_0 a_0_1 a_0_2]
[a_1_0 a_1_1 a_1_2]]
>>> symarray('a', (2, 3, 2))
[[[a_0_0_0 a_0_0_1]
[a_0_1_0 a_0_1_1]
[a_0_2_0 a_0_2_1]]
<BLANKLINE>
[[a_1_0_0 a_1_0_1]
[a_1_1_0 a_1_1_1]
[a_1_2_0 a_1_2_1]]]
For setting assumptions of the underlying Symbols:
>>> [s.is_real for s in symarray('a', 2, real=True)]
[True, True]
"""
from numpy import empty, ndindex
arr = empty(shape, dtype=object)
for index in ndindex(shape):
arr[index] = Symbol('%s_%s' % (prefix, '_'.join(map(str, index))),
**kwargs)
return arr
###############
# Functions
###############
def casoratian(seqs, n, zero=True):
"""Given linear difference operator L of order 'k' and homogeneous
equation Ly = 0 we want to compute kernel of L, which is a set
of 'k' sequences: a(n), b(n), ... z(n).
Solutions of L are linearly independent iff their Casoratian,
denoted as C(a, b, ..., z), do not vanish for n = 0.
Casoratian is defined by k x k determinant::
+ a(n) b(n) . . . z(n) +
| a(n+1) b(n+1) . . . z(n+1) |
| . . . . |
| . . . . |
| . . . . |
+ a(n+k-1) b(n+k-1) . . . z(n+k-1) +
It proves very useful in rsolve_hyper() where it is applied
to a generating set of a recurrence to factor out linearly
dependent solutions and return a basis:
>>> from sympy import Symbol, casoratian, factorial
>>> n = Symbol('n', integer=True)
Exponential and factorial are linearly independent:
>>> casoratian([2**n, factorial(n)], n) != 0
True
"""
seqs = list(map(sympify, seqs))
if not zero:
f = lambda i, j: seqs[j].subs(n, n + i)
else:
f = lambda i, j: seqs[j].subs(n, i)
k = len(seqs)
return Matrix(k, k, f).det()
def eye(*args, **kwargs):
"""Create square identity matrix n x n
See Also
========
diag
zeros
ones
"""
return Matrix.eye(*args, **kwargs)
def diag(*values, **kwargs):
"""Returns a matrix with the provided values placed on the
diagonal. If non-square matrices are included, they will
produce a block-diagonal matrix.
Examples
========
This version of diag is a thin wrapper to Matrix.diag that differs
in that it treats all lists like matrices -- even when a single list
is given. If this is not desired, either put a `*` before the list or
set `unpack=True`.
>>> from sympy import diag
>>> diag([1, 2, 3], unpack=True) # = diag(1,2,3) or diag(*[1,2,3])
Matrix([
[1, 0, 0],
[0, 2, 0],
[0, 0, 3]])
>>> diag([1, 2, 3]) # a column vector
Matrix([
[1],
[2],
[3]])
See Also
========
.common.MatrixCommon.eye
.common.MatrixCommon.diagonal - to extract a diagonal
.common.MatrixCommon.diag
.expressions.blockmatrix.BlockMatrix
"""
# Extract any setting so we don't duplicate keywords sent
# as named parameters:
kw = kwargs.copy()
strict = kw.pop('strict', True) # lists will be converted to Matrices
unpack = kw.pop('unpack', False)
return Matrix.diag(*values, strict=strict, unpack=unpack, **kw)
def GramSchmidt(vlist, orthonormal=False):
"""Apply the Gram-Schmidt process to a set of vectors.
Parameters
==========
vlist : List of Matrix
Vectors to be orthogonalized for.
orthonormal : Bool, optional
If true, return an orthonormal basis.
Returns
=======
vlist : List of Matrix
Orthogonalized vectors
Notes
=====
This routine is mostly duplicate from ``Matrix.orthogonalize``,
except for some difference that this always raises error when
linearly dependent vectors are found, and the keyword ``normalize``
has been named as ``orthonormal`` in this function.
See Also
========
.matrices.MatrixSubspaces.orthogonalize
References
==========
.. [1] https://en.wikipedia.org/wiki/Gram%E2%80%93Schmidt_process
"""
return MutableDenseMatrix.orthogonalize(
*vlist, normalize=orthonormal, rankcheck=True
)
def hessian(f, varlist, constraints=[]):
"""Compute Hessian matrix for a function f wrt parameters in varlist
which may be given as a sequence or a row/column vector. A list of
constraints may optionally be given.
Examples
========
>>> from sympy import Function, hessian, pprint
>>> from sympy.abc import x, y
>>> f = Function('f')(x, y)
>>> g1 = Function('g')(x, y)
>>> g2 = x**2 + 3*y
>>> pprint(hessian(f, (x, y), [g1, g2]))
[ d d ]
[ 0 0 --(g(x, y)) --(g(x, y)) ]
[ dx dy ]
[ ]
[ 0 0 2*x 3 ]
[ ]
[ 2 2 ]
[d d d ]
[--(g(x, y)) 2*x ---(f(x, y)) -----(f(x, y))]
[dx 2 dy dx ]
[ dx ]
[ ]
[ 2 2 ]
[d d d ]
[--(g(x, y)) 3 -----(f(x, y)) ---(f(x, y)) ]
[dy dy dx 2 ]
[ dy ]
References
==========
https://en.wikipedia.org/wiki/Hessian_matrix
See Also
========
sympy.matrices.matrices.MatrixCalculus.jacobian
wronskian
"""
# f is the expression representing a function f, return regular matrix
if isinstance(varlist, MatrixBase):
if 1 not in varlist.shape:
raise ShapeError("`varlist` must be a column or row vector.")
if varlist.cols == 1:
varlist = varlist.T
varlist = varlist.tolist()[0]
if is_sequence(varlist):
n = len(varlist)
if not n:
raise ShapeError("`len(varlist)` must not be zero.")
else:
raise ValueError("Improper variable list in hessian function")
if not getattr(f, 'diff'):
# check differentiability
raise ValueError("Function `f` (%s) is not differentiable" % f)
m = len(constraints)
N = m + n
out = zeros(N)
for k, g in enumerate(constraints):
if not getattr(g, 'diff'):
# check differentiability
raise ValueError("Function `f` (%s) is not differentiable" % f)
for i in range(n):
out[k, i + m] = g.diff(varlist[i])
for i in range(n):
for j in range(i, n):
out[i + m, j + m] = f.diff(varlist[i]).diff(varlist[j])
for i in range(N):
for j in range(i + 1, N):
out[j, i] = out[i, j]
return out
def jordan_cell(eigenval, n):
"""
Create a Jordan block:
Examples
========
>>> from sympy.matrices import jordan_cell
>>> from sympy.abc import x
>>> jordan_cell(x, 4)
Matrix([
[x, 1, 0, 0],
[0, x, 1, 0],
[0, 0, x, 1],
[0, 0, 0, x]])
"""
return Matrix.jordan_block(size=n, eigenvalue=eigenval)
def matrix_multiply_elementwise(A, B):
"""Return the Hadamard product (elementwise product) of A and B
>>> from sympy.matrices import matrix_multiply_elementwise
>>> from sympy.matrices import Matrix
>>> A = Matrix([[0, 1, 2], [3, 4, 5]])
>>> B = Matrix([[1, 10, 100], [100, 10, 1]])
>>> matrix_multiply_elementwise(A, B)
Matrix([
[ 0, 10, 200],
[300, 40, 5]])
See Also
========
sympy.matrices.common.MatrixCommon.__mul__
"""
return A.multiply_elementwise(B)
def ones(*args, **kwargs):
"""Returns a matrix of ones with ``rows`` rows and ``cols`` columns;
if ``cols`` is omitted a square matrix will be returned.
See Also
========
zeros
eye
diag
"""
if 'c' in kwargs:
kwargs['cols'] = kwargs.pop('c')
return Matrix.ones(*args, **kwargs)
def randMatrix(r, c=None, min=0, max=99, seed=None, symmetric=False,
percent=100, prng=None):
"""Create random matrix with dimensions ``r`` x ``c``. If ``c`` is omitted
the matrix will be square. If ``symmetric`` is True the matrix must be
square. If ``percent`` is less than 100 then only approximately the given
percentage of elements will be non-zero.
The pseudo-random number generator used to generate matrix is chosen in the
following way.
* If ``prng`` is supplied, it will be used as random number generator.
It should be an instance of ``random.Random``, or at least have
``randint`` and ``shuffle`` methods with same signatures.
* if ``prng`` is not supplied but ``seed`` is supplied, then new
``random.Random`` with given ``seed`` will be created;
* otherwise, a new ``random.Random`` with default seed will be used.
Examples
========
>>> from sympy.matrices import randMatrix
>>> randMatrix(3) # doctest:+SKIP
[25, 45, 27]
[44, 54, 9]
[23, 96, 46]
>>> randMatrix(3, 2) # doctest:+SKIP
[87, 29]
[23, 37]
[90, 26]
>>> randMatrix(3, 3, 0, 2) # doctest:+SKIP
[0, 2, 0]
[2, 0, 1]
[0, 0, 1]
>>> randMatrix(3, symmetric=True) # doctest:+SKIP
[85, 26, 29]
[26, 71, 43]
[29, 43, 57]
>>> A = randMatrix(3, seed=1)
>>> B = randMatrix(3, seed=2)
>>> A == B
False
>>> A == randMatrix(3, seed=1)
True
>>> randMatrix(3, symmetric=True, percent=50) # doctest:+SKIP
[77, 70, 0],
[70, 0, 0],
[ 0, 0, 88]
"""
if c is None:
c = r
# Note that ``Random()`` is equivalent to ``Random(None)``
prng = prng or random.Random(seed)
if not symmetric:
m = Matrix._new(r, c, lambda i, j: prng.randint(min, max))
if percent == 100:
return m
z = int(r*c*(100 - percent) // 100)
m._mat[:z] = [S.Zero]*z
prng.shuffle(m._mat)
return m
# Symmetric case
if r != c:
raise ValueError('For symmetric matrices, r must equal c, but %i != %i' % (r, c))
m = zeros(r)
ij = [(i, j) for i in range(r) for j in range(i, r)]
if percent != 100:
ij = prng.sample(ij, int(len(ij)*percent // 100))
for i, j in ij:
value = prng.randint(min, max)
m[i, j] = m[j, i] = value
return m
def wronskian(functions, var, method='bareiss'):
"""
Compute Wronskian for [] of functions
::
| f1 f2 ... fn |
| f1' f2' ... fn' |
| . . . . |
W(f1, ..., fn) = | . . . . |
| . . . . |
| (n) (n) (n) |
| D (f1) D (f2) ... D (fn) |
see: https://en.wikipedia.org/wiki/Wronskian
See Also
========
sympy.matrices.matrices.MatrixCalculus.jacobian
hessian
"""
for index in range(0, len(functions)):
functions[index] = sympify(functions[index])
n = len(functions)
if n == 0:
return 1
W = Matrix(n, n, lambda i, j: functions[i].diff(var, j))
return W.det(method)
def zeros(*args, **kwargs):
"""Returns a matrix of zeros with ``rows`` rows and ``cols`` columns;
if ``cols`` is omitted a square matrix will be returned.
See Also
========
ones
eye
diag
"""
if 'c' in kwargs:
kwargs['cols'] = kwargs.pop('c')
return Matrix.zeros(*args, **kwargs)
|
55ac2f26e167c3e2f0dc89640cd518e7d7b3dc17ef1b47486f3acf84a7517b6e
|
from collections import defaultdict
from sympy.core import SympifyError, Add
from sympy.core.compatibility import Callable, as_int, is_sequence, reduce
from sympy.core.containers import Dict
from sympy.core.expr import Expr
from sympy.core.singleton import S
from sympy.functions import Abs
from sympy.utilities.iterables import uniq
from sympy.utilities.misc import filldedent
from .common import a2idx
from .dense import Matrix
from .matrices import MatrixBase, ShapeError
from .utilities import _iszero
from .decompositions import (
_liupc, _row_structure_symbolic_cholesky, _cholesky_sparse,
_LDLdecomposition_sparse)
from .solvers import (
_lower_triangular_solve_sparse, _upper_triangular_solve_sparse)
class SparseMatrix(MatrixBase):
"""
A sparse matrix (a matrix with a large number of zero elements).
Examples
========
>>> from sympy.matrices import SparseMatrix, ones
>>> SparseMatrix(2, 2, range(4))
Matrix([
[0, 1],
[2, 3]])
>>> SparseMatrix(2, 2, {(1, 1): 2})
Matrix([
[0, 0],
[0, 2]])
A SparseMatrix can be instantiated from a ragged list of lists:
>>> SparseMatrix([[1, 2, 3], [1, 2], [1]])
Matrix([
[1, 2, 3],
[1, 2, 0],
[1, 0, 0]])
For safety, one may include the expected size and then an error
will be raised if the indices of any element are out of range or
(for a flat list) if the total number of elements does not match
the expected shape:
>>> SparseMatrix(2, 2, [1, 2])
Traceback (most recent call last):
...
ValueError: List length (2) != rows*columns (4)
Here, an error is not raised because the list is not flat and no
element is out of range:
>>> SparseMatrix(2, 2, [[1, 2]])
Matrix([
[1, 2],
[0, 0]])
But adding another element to the first (and only) row will cause
an error to be raised:
>>> SparseMatrix(2, 2, [[1, 2, 3]])
Traceback (most recent call last):
...
ValueError: The location (0, 2) is out of designated range: (1, 1)
To autosize the matrix, pass None for rows:
>>> SparseMatrix(None, [[1, 2, 3]])
Matrix([[1, 2, 3]])
>>> SparseMatrix(None, {(1, 1): 1, (3, 3): 3})
Matrix([
[0, 0, 0, 0],
[0, 1, 0, 0],
[0, 0, 0, 0],
[0, 0, 0, 3]])
Values that are themselves a Matrix are automatically expanded:
>>> SparseMatrix(4, 4, {(1, 1): ones(2)})
Matrix([
[0, 0, 0, 0],
[0, 1, 1, 0],
[0, 1, 1, 0],
[0, 0, 0, 0]])
A ValueError is raised if the expanding matrix tries to overwrite
a different element already present:
>>> SparseMatrix(3, 3, {(0, 0): ones(2), (1, 1): 2})
Traceback (most recent call last):
...
ValueError: collision at (1, 1)
See Also
========
DenseMatrix
MutableSparseMatrix
ImmutableSparseMatrix
"""
def __new__(cls, *args, **kwargs):
self = object.__new__(cls)
if len(args) == 1 and isinstance(args[0], SparseMatrix):
self.rows = args[0].rows
self.cols = args[0].cols
self._smat = dict(args[0]._smat)
return self
self._smat = {}
# autosizing
if len(args) == 2 and args[0] is None:
args = (None,) + args
if len(args) == 3:
r, c = args[:2]
if r is c is None:
self.rows = self.cols = None
elif None in (r, c):
raise ValueError(
'Pass rows=None and no cols for autosizing.')
else:
self.rows, self.cols = map(as_int, args[:2])
if isinstance(args[2], Callable):
op = args[2]
for i in range(self.rows):
for j in range(self.cols):
value = self._sympify(
op(self._sympify(i), self._sympify(j)))
if value:
self._smat[i, j] = value
elif isinstance(args[2], (dict, Dict)):
def update(i, j, v):
# update self._smat and make sure there are
# no collisions
if v:
if (i, j) in self._smat and v != self._smat[i, j]:
raise ValueError('collision at %s' % ((i, j),))
self._smat[i, j] = v
# manual copy, copy.deepcopy() doesn't work
for key, v in args[2].items():
r, c = key
if isinstance(v, SparseMatrix):
for (i, j), vij in v._smat.items():
update(r + i, c + j, vij)
else:
if isinstance(v, (Matrix, list, tuple)):
v = SparseMatrix(v)
for i, j in v._smat:
update(r + i, c + j, v[i, j])
else:
v = self._sympify(v)
update(r, c, self._sympify(v))
elif is_sequence(args[2]):
flat = not any(is_sequence(i) for i in args[2])
if not flat:
s = SparseMatrix(args[2])
self._smat = s._smat
else:
if len(args[2]) != self.rows*self.cols:
raise ValueError(
'Flat list length (%s) != rows*columns (%s)' %
(len(args[2]), self.rows*self.cols))
flat_list = args[2]
for i in range(self.rows):
for j in range(self.cols):
value = self._sympify(flat_list[i*self.cols + j])
if value:
self._smat[i, j] = value
if self.rows is None: # autosizing
k = self._smat.keys()
self.rows = max([i[0] for i in k]) + 1 if k else 0
self.cols = max([i[1] for i in k]) + 1 if k else 0
else:
for i, j in self._smat.keys():
if i and i >= self.rows or j and j >= self.cols:
r, c = self.shape
raise ValueError(filldedent('''
The location %s is out of designated
range: %s''' % ((i, j), (r - 1, c - 1))))
else:
if (len(args) == 1 and isinstance(args[0], (list, tuple))):
# list of values or lists
v = args[0]
c = 0
for i, row in enumerate(v):
if not isinstance(row, (list, tuple)):
row = [row]
for j, vij in enumerate(row):
if vij:
self._smat[i, j] = self._sympify(vij)
c = max(c, len(row))
self.rows = len(v) if c else 0
self.cols = c
else:
# handle full matrix forms with _handle_creation_inputs
r, c, _list = Matrix._handle_creation_inputs(*args)
self.rows = r
self.cols = c
for i in range(self.rows):
for j in range(self.cols):
value = _list[self.cols*i + j]
if value:
self._smat[i, j] = value
return self
def __eq__(self, other):
self_shape = getattr(self, 'shape', None)
other_shape = getattr(other, 'shape', None)
if None in (self_shape, other_shape):
return False
if self_shape != other_shape:
return False
if isinstance(other, SparseMatrix):
return self._smat == other._smat
elif isinstance(other, MatrixBase):
return self._smat == MutableSparseMatrix(other)._smat
def __getitem__(self, key):
if isinstance(key, tuple):
i, j = key
try:
i, j = self.key2ij(key)
return self._smat.get((i, j), S.Zero)
except (TypeError, IndexError):
if isinstance(i, slice):
i = range(self.rows)[i]
elif is_sequence(i):
pass
elif isinstance(i, Expr) and not i.is_number:
from sympy.matrices.expressions.matexpr import MatrixElement
return MatrixElement(self, i, j)
else:
if i >= self.rows:
raise IndexError('Row index out of bounds')
i = [i]
if isinstance(j, slice):
j = range(self.cols)[j]
elif is_sequence(j):
pass
elif isinstance(j, Expr) and not j.is_number:
from sympy.matrices.expressions.matexpr import MatrixElement
return MatrixElement(self, i, j)
else:
if j >= self.cols:
raise IndexError('Col index out of bounds')
j = [j]
return self.extract(i, j)
# check for single arg, like M[:] or M[3]
if isinstance(key, slice):
lo, hi = key.indices(len(self))[:2]
L = []
for i in range(lo, hi):
m, n = divmod(i, self.cols)
L.append(self._smat.get((m, n), S.Zero))
return L
i, j = divmod(a2idx(key, len(self)), self.cols)
return self._smat.get((i, j), S.Zero)
def __setitem__(self, key, value):
raise NotImplementedError()
def _eval_inverse(self, **kwargs):
return self.inv(method=kwargs.get('method', 'LDL'),
iszerofunc=kwargs.get('iszerofunc', _iszero),
try_block_diag=kwargs.get('try_block_diag', False))
def _eval_Abs(self):
return self.applyfunc(lambda x: Abs(x))
def _eval_add(self, other):
"""If `other` is a SparseMatrix, add efficiently. Otherwise,
do standard addition."""
if not isinstance(other, SparseMatrix):
return self + self._new(other)
smat = {}
zero = self._sympify(0)
for key in set().union(self._smat.keys(), other._smat.keys()):
sum = self._smat.get(key, zero) + other._smat.get(key, zero)
if sum != 0:
smat[key] = sum
return self._new(self.rows, self.cols, smat)
def _eval_col_insert(self, icol, other):
if not isinstance(other, SparseMatrix):
other = SparseMatrix(other)
new_smat = {}
# make room for the new rows
for key, val in self._smat.items():
row, col = key
if col >= icol:
col += other.cols
new_smat[row, col] = val
# add other's keys
for key, val in other._smat.items():
row, col = key
new_smat[row, col + icol] = val
return self._new(self.rows, self.cols + other.cols, new_smat)
def _eval_conjugate(self):
smat = {key: val.conjugate() for key,val in self._smat.items()}
return self._new(self.rows, self.cols, smat)
def _eval_extract(self, rowsList, colsList):
urow = list(uniq(rowsList))
ucol = list(uniq(colsList))
smat = {}
if len(urow)*len(ucol) < len(self._smat):
# there are fewer elements requested than there are elements in the matrix
for i, r in enumerate(urow):
for j, c in enumerate(ucol):
smat[i, j] = self._smat.get((r, c), 0)
else:
# most of the request will be zeros so check all of self's entries,
# keeping only the ones that are desired
for rk, ck in self._smat:
if rk in urow and ck in ucol:
smat[urow.index(rk), ucol.index(ck)] = self._smat[rk, ck]
rv = self._new(len(urow), len(ucol), smat)
# rv is nominally correct but there might be rows/cols
# which require duplication
if len(rowsList) != len(urow):
for i, r in enumerate(rowsList):
i_previous = rowsList.index(r)
if i_previous != i:
rv = rv.row_insert(i, rv.row(i_previous))
if len(colsList) != len(ucol):
for i, c in enumerate(colsList):
i_previous = colsList.index(c)
if i_previous != i:
rv = rv.col_insert(i, rv.col(i_previous))
return rv
@classmethod
def _eval_eye(cls, rows, cols):
entries = {(i,i): S.One for i in range(min(rows, cols))}
return cls._new(rows, cols, entries)
def _eval_has(self, *patterns):
# if the matrix has any zeros, see if S.Zero
# has the pattern. If _smat is full length,
# the matrix has no zeros.
zhas = S.Zero.has(*patterns)
if len(self._smat) == self.rows*self.cols:
zhas = False
return any(self[key].has(*patterns) for key in self._smat) or zhas
def _eval_is_Identity(self):
if not all(self[i, i] == 1 for i in range(self.rows)):
return False
return len(self._smat) == self.rows
def _eval_is_symmetric(self, simpfunc):
diff = (self - self.T).applyfunc(simpfunc)
return len(diff.values()) == 0
def _eval_matrix_mul(self, other):
"""Fast multiplication exploiting the sparsity of the matrix."""
if not isinstance(other, SparseMatrix):
other = self._new(other)
# if we made it here, we're both sparse matrices
# create quick lookups for rows and cols
row_lookup = defaultdict(dict)
for (i,j), val in self._smat.items():
row_lookup[i][j] = val
col_lookup = defaultdict(dict)
for (i,j), val in other._smat.items():
col_lookup[j][i] = val
smat = {}
for row in row_lookup.keys():
for col in col_lookup.keys():
# find the common indices of non-zero entries.
# these are the only things that need to be multiplied.
indices = set(col_lookup[col].keys()) & set(row_lookup[row].keys())
if indices:
vec = [row_lookup[row][k]*col_lookup[col][k] for k in indices]
try:
smat[row, col] = Add(*vec)
except (TypeError, SympifyError):
# Some matrices don't work with `sum` or `Add`
# They don't work with `sum` because `sum` tries to add `0`
# Fall back to a safe way to multiply if the `Add` fails.
smat[row, col] = reduce(lambda a, b: a + b, vec)
return self._new(self.rows, other.cols, smat)
def _eval_row_insert(self, irow, other):
if not isinstance(other, SparseMatrix):
other = SparseMatrix(other)
new_smat = {}
# make room for the new rows
for key, val in self._smat.items():
row, col = key
if row >= irow:
row += other.rows
new_smat[row, col] = val
# add other's keys
for key, val in other._smat.items():
row, col = key
new_smat[row + irow, col] = val
return self._new(self.rows + other.rows, self.cols, new_smat)
def _eval_scalar_mul(self, other):
return self.applyfunc(lambda x: x*other)
def _eval_scalar_rmul(self, other):
return self.applyfunc(lambda x: other*x)
def _eval_todok(self):
return self._smat.copy()
def _eval_transpose(self):
"""Returns the transposed SparseMatrix of this SparseMatrix.
Examples
========
>>> from sympy.matrices import SparseMatrix
>>> a = SparseMatrix(((1, 2), (3, 4)))
>>> a
Matrix([
[1, 2],
[3, 4]])
>>> a.T
Matrix([
[1, 3],
[2, 4]])
"""
smat = {(j,i): val for (i,j),val in self._smat.items()}
return self._new(self.cols, self.rows, smat)
def _eval_values(self):
return [v for k,v in self._smat.items() if not v.is_zero]
@classmethod
def _eval_zeros(cls, rows, cols):
return cls._new(rows, cols, {})
@property
def _mat(self):
"""Return a list of matrix elements. Some routines
in DenseMatrix use `_mat` directly to speed up operations."""
return list(self)
def applyfunc(self, f):
"""Apply a function to each element of the matrix.
Examples
========
>>> from sympy.matrices import SparseMatrix
>>> m = SparseMatrix(2, 2, lambda i, j: i*2+j)
>>> m
Matrix([
[0, 1],
[2, 3]])
>>> m.applyfunc(lambda i: 2*i)
Matrix([
[0, 2],
[4, 6]])
"""
if not callable(f):
raise TypeError("`f` must be callable.")
out = self.copy()
for k, v in self._smat.items():
fv = f(v)
if fv:
out._smat[k] = fv
else:
out._smat.pop(k, None)
return out
def as_immutable(self):
"""Returns an Immutable version of this Matrix."""
from .immutable import ImmutableSparseMatrix
return ImmutableSparseMatrix(self)
def as_mutable(self):
"""Returns a mutable version of this matrix.
Examples
========
>>> from sympy import ImmutableMatrix
>>> X = ImmutableMatrix([[1, 2], [3, 4]])
>>> Y = X.as_mutable()
>>> Y[1, 1] = 5 # Can set values in Y
>>> Y
Matrix([
[1, 2],
[3, 5]])
"""
return MutableSparseMatrix(self)
def col_list(self):
"""Returns a column-sorted list of non-zero elements of the matrix.
Examples
========
>>> from sympy.matrices import SparseMatrix
>>> a=SparseMatrix(((1, 2), (3, 4)))
>>> a
Matrix([
[1, 2],
[3, 4]])
>>> a.CL
[(0, 0, 1), (1, 0, 3), (0, 1, 2), (1, 1, 4)]
See Also
========
sympy.matrices.sparse.MutableSparseMatrix.col_op
sympy.matrices.sparse.SparseMatrix.row_list
"""
return [tuple(k + (self[k],)) for k in sorted(list(self._smat.keys()), key=lambda k: list(reversed(k)))]
def copy(self):
return self._new(self.rows, self.cols, self._smat)
def nnz(self):
"""Returns the number of non-zero elements in Matrix."""
return len(self._smat)
def row_list(self):
"""Returns a row-sorted list of non-zero elements of the matrix.
Examples
========
>>> from sympy.matrices import SparseMatrix
>>> a = SparseMatrix(((1, 2), (3, 4)))
>>> a
Matrix([
[1, 2],
[3, 4]])
>>> a.RL
[(0, 0, 1), (0, 1, 2), (1, 0, 3), (1, 1, 4)]
See Also
========
sympy.matrices.sparse.MutableSparseMatrix.row_op
sympy.matrices.sparse.SparseMatrix.col_list
"""
return [tuple(k + (self[k],)) for k in
sorted(list(self._smat.keys()), key=lambda k: list(k))]
def scalar_multiply(self, scalar):
"Scalar element-wise multiplication"
M = self.zeros(*self.shape)
if scalar:
for i in self._smat:
v = scalar*self._smat[i]
if v:
M._smat[i] = v
else:
M._smat.pop(i, None)
return M
def solve_least_squares(self, rhs, method='LDL'):
"""Return the least-square fit to the data.
By default the cholesky_solve routine is used (method='CH'); other
methods of matrix inversion can be used. To find out which are
available, see the docstring of the .inv() method.
Examples
========
>>> from sympy.matrices import SparseMatrix, Matrix, ones
>>> A = Matrix([1, 2, 3])
>>> B = Matrix([2, 3, 4])
>>> S = SparseMatrix(A.row_join(B))
>>> S
Matrix([
[1, 2],
[2, 3],
[3, 4]])
If each line of S represent coefficients of Ax + By
and x and y are [2, 3] then S*xy is:
>>> r = S*Matrix([2, 3]); r
Matrix([
[ 8],
[13],
[18]])
But let's add 1 to the middle value and then solve for the
least-squares value of xy:
>>> xy = S.solve_least_squares(Matrix([8, 14, 18])); xy
Matrix([
[ 5/3],
[10/3]])
The error is given by S*xy - r:
>>> S*xy - r
Matrix([
[1/3],
[1/3],
[1/3]])
>>> _.norm().n(2)
0.58
If a different xy is used, the norm will be higher:
>>> xy += ones(2, 1)/10
>>> (S*xy - r).norm().n(2)
1.5
"""
t = self.T
return (t*self).inv(method=method)*t*rhs
def solve(self, rhs, method='LDL'):
"""Return solution to self*soln = rhs using given inversion method.
For a list of possible inversion methods, see the .inv() docstring.
"""
if not self.is_square:
if self.rows < self.cols:
raise ValueError('Under-determined system.')
elif self.rows > self.cols:
raise ValueError('For over-determined system, M, having '
'more rows than columns, try M.solve_least_squares(rhs).')
else:
return self.inv(method=method).multiply(rhs)
RL = property(row_list, None, None, "Alternate faster representation")
CL = property(col_list, None, None, "Alternate faster representation")
def liupc(self):
return _liupc(self)
def row_structure_symbolic_cholesky(self):
return _row_structure_symbolic_cholesky(self)
def cholesky(self, hermitian=True):
return _cholesky_sparse(self, hermitian=hermitian)
def LDLdecomposition(self, hermitian=True):
return _LDLdecomposition_sparse(self, hermitian=hermitian)
def lower_triangular_solve(self, rhs):
return _lower_triangular_solve_sparse(self, rhs)
def upper_triangular_solve(self, rhs):
return _upper_triangular_solve_sparse(self, rhs)
liupc.__doc__ = _liupc.__doc__
row_structure_symbolic_cholesky.__doc__ = _row_structure_symbolic_cholesky.__doc__
cholesky.__doc__ = _cholesky_sparse.__doc__
LDLdecomposition.__doc__ = _LDLdecomposition_sparse.__doc__
lower_triangular_solve.__doc__ = lower_triangular_solve.__doc__
upper_triangular_solve.__doc__ = upper_triangular_solve.__doc__
class MutableSparseMatrix(SparseMatrix, MatrixBase):
@classmethod
def _new(cls, *args, **kwargs):
return cls(*args)
def __setitem__(self, key, value):
"""Assign value to position designated by key.
Examples
========
>>> from sympy.matrices import SparseMatrix, ones
>>> M = SparseMatrix(2, 2, {})
>>> M[1] = 1; M
Matrix([
[0, 1],
[0, 0]])
>>> M[1, 1] = 2; M
Matrix([
[0, 1],
[0, 2]])
>>> M = SparseMatrix(2, 2, {})
>>> M[:, 1] = [1, 1]; M
Matrix([
[0, 1],
[0, 1]])
>>> M = SparseMatrix(2, 2, {})
>>> M[1, :] = [[1, 1]]; M
Matrix([
[0, 0],
[1, 1]])
To replace row r you assign to position r*m where m
is the number of columns:
>>> M = SparseMatrix(4, 4, {})
>>> m = M.cols
>>> M[3*m] = ones(1, m)*2; M
Matrix([
[0, 0, 0, 0],
[0, 0, 0, 0],
[0, 0, 0, 0],
[2, 2, 2, 2]])
And to replace column c you can assign to position c:
>>> M[2] = ones(m, 1)*4; M
Matrix([
[0, 0, 4, 0],
[0, 0, 4, 0],
[0, 0, 4, 0],
[2, 2, 4, 2]])
"""
rv = self._setitem(key, value)
if rv is not None:
i, j, value = rv
if value:
self._smat[i, j] = value
elif (i, j) in self._smat:
del self._smat[i, j]
def as_mutable(self):
return self.copy()
__hash__ = None # type: ignore
def _eval_col_del(self, k):
newD = {}
for i, j in self._smat:
if j == k:
pass
elif j > k:
newD[i, j - 1] = self._smat[i, j]
else:
newD[i, j] = self._smat[i, j]
self._smat = newD
self.cols -= 1
def _eval_row_del(self, k):
newD = {}
for i, j in self._smat:
if i == k:
pass
elif i > k:
newD[i - 1, j] = self._smat[i, j]
else:
newD[i, j] = self._smat[i, j]
self._smat = newD
self.rows -= 1
def col_join(self, other):
"""Returns B augmented beneath A (row-wise joining)::
[A]
[B]
Examples
========
>>> from sympy import SparseMatrix, Matrix, ones
>>> A = SparseMatrix(ones(3))
>>> A
Matrix([
[1, 1, 1],
[1, 1, 1],
[1, 1, 1]])
>>> B = SparseMatrix.eye(3)
>>> B
Matrix([
[1, 0, 0],
[0, 1, 0],
[0, 0, 1]])
>>> C = A.col_join(B); C
Matrix([
[1, 1, 1],
[1, 1, 1],
[1, 1, 1],
[1, 0, 0],
[0, 1, 0],
[0, 0, 1]])
>>> C == A.col_join(Matrix(B))
True
Joining along columns is the same as appending rows at the end
of the matrix:
>>> C == A.row_insert(A.rows, Matrix(B))
True
"""
# A null matrix can always be stacked (see #10770)
if self.rows == 0 and self.cols != other.cols:
return self._new(0, other.cols, []).col_join(other)
A, B = self, other
if not A.cols == B.cols:
raise ShapeError()
A = A.copy()
if not isinstance(B, SparseMatrix):
k = 0
b = B._mat
for i in range(B.rows):
for j in range(B.cols):
v = b[k]
if v:
A._smat[i + A.rows, j] = v
k += 1
else:
for (i, j), v in B._smat.items():
A._smat[i + A.rows, j] = v
A.rows += B.rows
return A
def col_op(self, j, f):
"""In-place operation on col j using two-arg functor whose args are
interpreted as (self[i, j], i) for i in range(self.rows).
Examples
========
>>> from sympy.matrices import SparseMatrix
>>> M = SparseMatrix.eye(3)*2
>>> M[1, 0] = -1
>>> M.col_op(1, lambda v, i: v + 2*M[i, 0]); M
Matrix([
[ 2, 4, 0],
[-1, 0, 0],
[ 0, 0, 2]])
"""
for i in range(self.rows):
v = self._smat.get((i, j), S.Zero)
fv = f(v, i)
if fv:
self._smat[i, j] = fv
elif v:
self._smat.pop((i, j))
def col_swap(self, i, j):
"""Swap, in place, columns i and j.
Examples
========
>>> from sympy.matrices import SparseMatrix
>>> S = SparseMatrix.eye(3); S[2, 1] = 2
>>> S.col_swap(1, 0); S
Matrix([
[0, 1, 0],
[1, 0, 0],
[2, 0, 1]])
"""
if i > j:
i, j = j, i
rows = self.col_list()
temp = []
for ii, jj, v in rows:
if jj == i:
self._smat.pop((ii, jj))
temp.append((ii, v))
elif jj == j:
self._smat.pop((ii, jj))
self._smat[ii, i] = v
elif jj > j:
break
for k, v in temp:
self._smat[k, j] = v
def copyin_list(self, key, value):
if not is_sequence(value):
raise TypeError("`value` must be of type list or tuple.")
self.copyin_matrix(key, Matrix(value))
def copyin_matrix(self, key, value):
# include this here because it's not part of BaseMatrix
rlo, rhi, clo, chi = self.key2bounds(key)
shape = value.shape
dr, dc = rhi - rlo, chi - clo
if shape != (dr, dc):
raise ShapeError(
"The Matrix `value` doesn't have the same dimensions "
"as the in sub-Matrix given by `key`.")
if not isinstance(value, SparseMatrix):
for i in range(value.rows):
for j in range(value.cols):
self[i + rlo, j + clo] = value[i, j]
else:
if (rhi - rlo)*(chi - clo) < len(self):
for i in range(rlo, rhi):
for j in range(clo, chi):
self._smat.pop((i, j), None)
else:
for i, j, v in self.row_list():
if rlo <= i < rhi and clo <= j < chi:
self._smat.pop((i, j), None)
for k, v in value._smat.items():
i, j = k
self[i + rlo, j + clo] = value[i, j]
def fill(self, value):
"""Fill self with the given value.
Notes
=====
Unless many values are going to be deleted (i.e. set to zero)
this will create a matrix that is slower than a dense matrix in
operations.
Examples
========
>>> from sympy.matrices import SparseMatrix
>>> M = SparseMatrix.zeros(3); M
Matrix([
[0, 0, 0],
[0, 0, 0],
[0, 0, 0]])
>>> M.fill(1); M
Matrix([
[1, 1, 1],
[1, 1, 1],
[1, 1, 1]])
"""
if not value:
self._smat = {}
else:
v = self._sympify(value)
self._smat = {(i, j): v
for i in range(self.rows) for j in range(self.cols)}
def row_join(self, other):
"""Returns B appended after A (column-wise augmenting)::
[A B]
Examples
========
>>> from sympy import SparseMatrix, Matrix
>>> A = SparseMatrix(((1, 0, 1), (0, 1, 0), (1, 1, 0)))
>>> A
Matrix([
[1, 0, 1],
[0, 1, 0],
[1, 1, 0]])
>>> B = SparseMatrix(((1, 0, 0), (0, 1, 0), (0, 0, 1)))
>>> B
Matrix([
[1, 0, 0],
[0, 1, 0],
[0, 0, 1]])
>>> C = A.row_join(B); C
Matrix([
[1, 0, 1, 1, 0, 0],
[0, 1, 0, 0, 1, 0],
[1, 1, 0, 0, 0, 1]])
>>> C == A.row_join(Matrix(B))
True
Joining at row ends is the same as appending columns at the end
of the matrix:
>>> C == A.col_insert(A.cols, B)
True
"""
# A null matrix can always be stacked (see #10770)
if self.cols == 0 and self.rows != other.rows:
return self._new(other.rows, 0, []).row_join(other)
A, B = self, other
if not A.rows == B.rows:
raise ShapeError()
A = A.copy()
if not isinstance(B, SparseMatrix):
k = 0
b = B._mat
for i in range(B.rows):
for j in range(B.cols):
v = b[k]
if v:
A._smat[i, j + A.cols] = v
k += 1
else:
for (i, j), v in B._smat.items():
A._smat[i, j + A.cols] = v
A.cols += B.cols
return A
def row_op(self, i, f):
"""In-place operation on row ``i`` using two-arg functor whose args are
interpreted as ``(self[i, j], j)``.
Examples
========
>>> from sympy.matrices import SparseMatrix
>>> M = SparseMatrix.eye(3)*2
>>> M[0, 1] = -1
>>> M.row_op(1, lambda v, j: v + 2*M[0, j]); M
Matrix([
[2, -1, 0],
[4, 0, 0],
[0, 0, 2]])
See Also
========
row
zip_row_op
col_op
"""
for j in range(self.cols):
v = self._smat.get((i, j), S.Zero)
fv = f(v, j)
if fv:
self._smat[i, j] = fv
elif v:
self._smat.pop((i, j))
def row_swap(self, i, j):
"""Swap, in place, columns i and j.
Examples
========
>>> from sympy.matrices import SparseMatrix
>>> S = SparseMatrix.eye(3); S[2, 1] = 2
>>> S.row_swap(1, 0); S
Matrix([
[0, 1, 0],
[1, 0, 0],
[0, 2, 1]])
"""
if i > j:
i, j = j, i
rows = self.row_list()
temp = []
for ii, jj, v in rows:
if ii == i:
self._smat.pop((ii, jj))
temp.append((jj, v))
elif ii == j:
self._smat.pop((ii, jj))
self._smat[i, jj] = v
elif ii > j:
break
for k, v in temp:
self._smat[j, k] = v
def zip_row_op(self, i, k, f):
"""In-place operation on row ``i`` using two-arg functor whose args are
interpreted as ``(self[i, j], self[k, j])``.
Examples
========
>>> from sympy.matrices import SparseMatrix
>>> M = SparseMatrix.eye(3)*2
>>> M[0, 1] = -1
>>> M.zip_row_op(1, 0, lambda v, u: v + 2*u); M
Matrix([
[2, -1, 0],
[4, 0, 0],
[0, 0, 2]])
See Also
========
row
row_op
col_op
"""
self.row_op(i, lambda v, j: f(v, self[k, j]))
is_zero = False
|
a9c775d464b0086a0c1c658ebebde644627926c6ea871e5de79128a4ece47386
|
import mpmath as mp
from sympy.core.add import Add
from sympy.core.basic import Basic
from sympy.core.compatibility import (
Callable, NotIterable, as_int, is_sequence)
from sympy.core.decorators import deprecated
from sympy.core.expr import Expr
from sympy.core.power import Pow
from sympy.core.singleton import S
from sympy.core.symbol import Dummy, Symbol, uniquely_named_symbol
from sympy.core.sympify import sympify
from sympy.functions import exp, factorial, log
from sympy.functions.elementary.miscellaneous import Max, Min, sqrt
from sympy.functions.special.tensor_functions import KroneckerDelta
from sympy.polys import cancel
from sympy.printing import sstr
from sympy.printing.defaults import Printable
from sympy.simplify import simplify as _simplify
from sympy.utilities.exceptions import SymPyDeprecationWarning
from sympy.utilities.iterables import flatten
from sympy.utilities.misc import filldedent
from .common import (
MatrixCommon, MatrixError, NonSquareMatrixError, NonInvertibleMatrixError,
ShapeError)
from .utilities import _iszero, _is_zero_after_expand_mul
from .determinant import (
_find_reasonable_pivot, _find_reasonable_pivot_naive,
_adjugate, _charpoly, _cofactor, _cofactor_matrix,
_det, _det_bareiss, _det_berkowitz, _det_LU, _minor, _minor_submatrix)
from .reductions import _is_echelon, _echelon_form, _rank, _rref
from .subspaces import _columnspace, _nullspace, _rowspace, _orthogonalize
from .eigen import (
_eigenvals, _eigenvects,
_bidiagonalize, _bidiagonal_decomposition,
_is_diagonalizable, _diagonalize,
_is_positive_definite, _is_positive_semidefinite,
_is_negative_definite, _is_negative_semidefinite, _is_indefinite,
_jordan_form, _left_eigenvects, _singular_values)
from .decompositions import (
_rank_decomposition, _cholesky, _LDLdecomposition,
_LUdecomposition, _LUdecomposition_Simple, _LUdecompositionFF,
_QRdecomposition)
from .graph import _connected_components, _connected_components_decomposition
from .solvers import (
_diagonal_solve, _lower_triangular_solve, _upper_triangular_solve,
_cholesky_solve, _LDLsolve, _LUsolve, _QRsolve, _gauss_jordan_solve,
_pinv_solve, _solve, _solve_least_squares)
from .inverse import (
_pinv, _inv_mod, _inv_ADJ, _inv_GE, _inv_LU, _inv_CH, _inv_LDL, _inv_QR,
_inv, _inv_block)
class DeferredVector(Symbol, NotIterable):
"""A vector whose components are deferred (e.g. for use with lambdify)
Examples
========
>>> from sympy import DeferredVector, lambdify
>>> X = DeferredVector( 'X' )
>>> X
X
>>> expr = (X[0] + 2, X[2] + 3)
>>> func = lambdify( X, expr)
>>> func( [1, 2, 3] )
(3, 6)
"""
def __getitem__(self, i):
if i == -0:
i = 0
if i < 0:
raise IndexError('DeferredVector index out of range')
component_name = '%s[%d]' % (self.name, i)
return Symbol(component_name)
def __str__(self):
return sstr(self)
def __repr__(self):
return "DeferredVector('%s')" % self.name
class MatrixDeterminant(MatrixCommon):
"""Provides basic matrix determinant operations. Should not be instantiated
directly. See ``determinant.py`` for their implementations."""
def _eval_det_bareiss(self, iszerofunc=_is_zero_after_expand_mul):
return _det_bareiss(self, iszerofunc=iszerofunc)
def _eval_det_berkowitz(self):
return _det_berkowitz(self)
def _eval_det_lu(self, iszerofunc=_iszero, simpfunc=None):
return _det_LU(self, iszerofunc=iszerofunc, simpfunc=simpfunc)
def _eval_determinant(self): # for expressions.determinant.Determinant
return _det(self)
def adjugate(self, method="berkowitz"):
return _adjugate(self, method=method)
def charpoly(self, x='lambda', simplify=_simplify):
return _charpoly(self, x=x, simplify=simplify)
def cofactor(self, i, j, method="berkowitz"):
return _cofactor(self, i, j, method=method)
def cofactor_matrix(self, method="berkowitz"):
return _cofactor_matrix(self, method=method)
def det(self, method="bareiss", iszerofunc=None):
return _det(self, method=method, iszerofunc=iszerofunc)
def minor(self, i, j, method="berkowitz"):
return _minor(self, i, j, method=method)
def minor_submatrix(self, i, j):
return _minor_submatrix(self, i, j)
_find_reasonable_pivot.__doc__ = _find_reasonable_pivot.__doc__
_find_reasonable_pivot_naive.__doc__ = _find_reasonable_pivot_naive.__doc__
_eval_det_bareiss.__doc__ = _det_bareiss.__doc__
_eval_det_berkowitz.__doc__ = _det_berkowitz.__doc__
_eval_det_lu.__doc__ = _det_LU.__doc__
_eval_determinant.__doc__ = _det.__doc__
adjugate.__doc__ = _adjugate.__doc__
charpoly.__doc__ = _charpoly.__doc__
cofactor.__doc__ = _cofactor.__doc__
cofactor_matrix.__doc__ = _cofactor_matrix.__doc__
det.__doc__ = _det.__doc__
minor.__doc__ = _minor.__doc__
minor_submatrix.__doc__ = _minor_submatrix.__doc__
class MatrixReductions(MatrixDeterminant):
"""Provides basic matrix row/column operations. Should not be instantiated
directly. See ``reductions.py`` for some of their implementations."""
def echelon_form(self, iszerofunc=_iszero, simplify=False, with_pivots=False):
return _echelon_form(self, iszerofunc=iszerofunc, simplify=simplify,
with_pivots=with_pivots)
@property
def is_echelon(self):
return _is_echelon(self)
def rank(self, iszerofunc=_iszero, simplify=False):
return _rank(self, iszerofunc=iszerofunc, simplify=simplify)
def rref(self, iszerofunc=_iszero, simplify=False, pivots=True,
normalize_last=True):
return _rref(self, iszerofunc=iszerofunc, simplify=simplify,
pivots=pivots, normalize_last=normalize_last)
echelon_form.__doc__ = _echelon_form.__doc__
is_echelon.__doc__ = _is_echelon.__doc__
rank.__doc__ = _rank.__doc__
rref.__doc__ = _rref.__doc__
def _normalize_op_args(self, op, col, k, col1, col2, error_str="col"):
"""Validate the arguments for a row/column operation. ``error_str``
can be one of "row" or "col" depending on the arguments being parsed."""
if op not in ["n->kn", "n<->m", "n->n+km"]:
raise ValueError("Unknown {} operation '{}'. Valid col operations "
"are 'n->kn', 'n<->m', 'n->n+km'".format(error_str, op))
# define self_col according to error_str
self_cols = self.cols if error_str == 'col' else self.rows
# normalize and validate the arguments
if op == "n->kn":
col = col if col is not None else col1
if col is None or k is None:
raise ValueError("For a {0} operation 'n->kn' you must provide the "
"kwargs `{0}` and `k`".format(error_str))
if not 0 <= col < self_cols:
raise ValueError("This matrix doesn't have a {} '{}'".format(error_str, col))
elif op == "n<->m":
# we need two cols to swap. It doesn't matter
# how they were specified, so gather them together and
# remove `None`
cols = {col, k, col1, col2}.difference([None])
if len(cols) > 2:
# maybe the user left `k` by mistake?
cols = {col, col1, col2}.difference([None])
if len(cols) != 2:
raise ValueError("For a {0} operation 'n<->m' you must provide the "
"kwargs `{0}1` and `{0}2`".format(error_str))
col1, col2 = cols
if not 0 <= col1 < self_cols:
raise ValueError("This matrix doesn't have a {} '{}'".format(error_str, col1))
if not 0 <= col2 < self_cols:
raise ValueError("This matrix doesn't have a {} '{}'".format(error_str, col2))
elif op == "n->n+km":
col = col1 if col is None else col
col2 = col1 if col2 is None else col2
if col is None or col2 is None or k is None:
raise ValueError("For a {0} operation 'n->n+km' you must provide the "
"kwargs `{0}`, `k`, and `{0}2`".format(error_str))
if col == col2:
raise ValueError("For a {0} operation 'n->n+km' `{0}` and `{0}2` must "
"be different.".format(error_str))
if not 0 <= col < self_cols:
raise ValueError("This matrix doesn't have a {} '{}'".format(error_str, col))
if not 0 <= col2 < self_cols:
raise ValueError("This matrix doesn't have a {} '{}'".format(error_str, col2))
else:
raise ValueError('invalid operation %s' % repr(op))
return op, col, k, col1, col2
def _eval_col_op_multiply_col_by_const(self, col, k):
def entry(i, j):
if j == col:
return k * self[i, j]
return self[i, j]
return self._new(self.rows, self.cols, entry)
def _eval_col_op_swap(self, col1, col2):
def entry(i, j):
if j == col1:
return self[i, col2]
elif j == col2:
return self[i, col1]
return self[i, j]
return self._new(self.rows, self.cols, entry)
def _eval_col_op_add_multiple_to_other_col(self, col, k, col2):
def entry(i, j):
if j == col:
return self[i, j] + k * self[i, col2]
return self[i, j]
return self._new(self.rows, self.cols, entry)
def _eval_row_op_swap(self, row1, row2):
def entry(i, j):
if i == row1:
return self[row2, j]
elif i == row2:
return self[row1, j]
return self[i, j]
return self._new(self.rows, self.cols, entry)
def _eval_row_op_multiply_row_by_const(self, row, k):
def entry(i, j):
if i == row:
return k * self[i, j]
return self[i, j]
return self._new(self.rows, self.cols, entry)
def _eval_row_op_add_multiple_to_other_row(self, row, k, row2):
def entry(i, j):
if i == row:
return self[i, j] + k * self[row2, j]
return self[i, j]
return self._new(self.rows, self.cols, entry)
def elementary_col_op(self, op="n->kn", col=None, k=None, col1=None, col2=None):
"""Performs the elementary column operation `op`.
`op` may be one of
* "n->kn" (column n goes to k*n)
* "n<->m" (swap column n and column m)
* "n->n+km" (column n goes to column n + k*column m)
Parameters
==========
op : string; the elementary row operation
col : the column to apply the column operation
k : the multiple to apply in the column operation
col1 : one column of a column swap
col2 : second column of a column swap or column "m" in the column operation
"n->n+km"
"""
op, col, k, col1, col2 = self._normalize_op_args(op, col, k, col1, col2, "col")
# now that we've validated, we're all good to dispatch
if op == "n->kn":
return self._eval_col_op_multiply_col_by_const(col, k)
if op == "n<->m":
return self._eval_col_op_swap(col1, col2)
if op == "n->n+km":
return self._eval_col_op_add_multiple_to_other_col(col, k, col2)
def elementary_row_op(self, op="n->kn", row=None, k=None, row1=None, row2=None):
"""Performs the elementary row operation `op`.
`op` may be one of
* "n->kn" (row n goes to k*n)
* "n<->m" (swap row n and row m)
* "n->n+km" (row n goes to row n + k*row m)
Parameters
==========
op : string; the elementary row operation
row : the row to apply the row operation
k : the multiple to apply in the row operation
row1 : one row of a row swap
row2 : second row of a row swap or row "m" in the row operation
"n->n+km"
"""
op, row, k, row1, row2 = self._normalize_op_args(op, row, k, row1, row2, "row")
# now that we've validated, we're all good to dispatch
if op == "n->kn":
return self._eval_row_op_multiply_row_by_const(row, k)
if op == "n<->m":
return self._eval_row_op_swap(row1, row2)
if op == "n->n+km":
return self._eval_row_op_add_multiple_to_other_row(row, k, row2)
class MatrixSubspaces(MatrixReductions):
"""Provides methods relating to the fundamental subspaces of a matrix.
Should not be instantiated directly. See ``subspaces.py`` for their
implementations."""
def columnspace(self, simplify=False):
return _columnspace(self, simplify=simplify)
def nullspace(self, simplify=False, iszerofunc=_iszero):
return _nullspace(self, simplify=simplify, iszerofunc=iszerofunc)
def rowspace(self, simplify=False):
return _rowspace(self, simplify=simplify)
# This is a classmethod but is converted to such later in order to allow
# assignment of __doc__ since that does not work for already wrapped
# classmethods in Python 3.6.
def orthogonalize(cls, *vecs, **kwargs):
return _orthogonalize(cls, *vecs, **kwargs)
columnspace.__doc__ = _columnspace.__doc__
nullspace.__doc__ = _nullspace.__doc__
rowspace.__doc__ = _rowspace.__doc__
orthogonalize.__doc__ = _orthogonalize.__doc__
orthogonalize = classmethod(orthogonalize)
class MatrixEigen(MatrixSubspaces):
"""Provides basic matrix eigenvalue/vector operations.
Should not be instantiated directly. See ``eigen.py`` for their
implementations."""
def eigenvals(self, error_when_incomplete=True, **flags):
return _eigenvals(self, error_when_incomplete=error_when_incomplete, **flags)
def eigenvects(self, error_when_incomplete=True, iszerofunc=_iszero, **flags):
return _eigenvects(self, error_when_incomplete=error_when_incomplete,
iszerofunc=iszerofunc, **flags)
def is_diagonalizable(self, reals_only=False, **kwargs):
return _is_diagonalizable(self, reals_only=reals_only, **kwargs)
def diagonalize(self, reals_only=False, sort=False, normalize=False):
return _diagonalize(self, reals_only=reals_only, sort=sort,
normalize=normalize)
def bidiagonalize(self, upper=True):
return _bidiagonalize(self, upper=upper)
def bidiagonal_decomposition(self, upper=True):
return _bidiagonal_decomposition(self, upper=upper)
@property
def is_positive_definite(self):
return _is_positive_definite(self)
@property
def is_positive_semidefinite(self):
return _is_positive_semidefinite(self)
@property
def is_negative_definite(self):
return _is_negative_definite(self)
@property
def is_negative_semidefinite(self):
return _is_negative_semidefinite(self)
@property
def is_indefinite(self):
return _is_indefinite(self)
def jordan_form(self, calc_transform=True, **kwargs):
return _jordan_form(self, calc_transform=calc_transform, **kwargs)
def left_eigenvects(self, **flags):
return _left_eigenvects(self, **flags)
def singular_values(self):
return _singular_values(self)
eigenvals.__doc__ = _eigenvals.__doc__
eigenvects.__doc__ = _eigenvects.__doc__
is_diagonalizable.__doc__ = _is_diagonalizable.__doc__
diagonalize.__doc__ = _diagonalize.__doc__
is_positive_definite.__doc__ = _is_positive_definite.__doc__
is_positive_semidefinite.__doc__ = _is_positive_semidefinite.__doc__
is_negative_definite.__doc__ = _is_negative_definite.__doc__
is_negative_semidefinite.__doc__ = _is_negative_semidefinite.__doc__
is_indefinite.__doc__ = _is_indefinite.__doc__
jordan_form.__doc__ = _jordan_form.__doc__
left_eigenvects.__doc__ = _left_eigenvects.__doc__
singular_values.__doc__ = _singular_values.__doc__
bidiagonalize.__doc__ = _bidiagonalize.__doc__
bidiagonal_decomposition.__doc__ = _bidiagonal_decomposition.__doc__
class MatrixCalculus(MatrixCommon):
"""Provides calculus-related matrix operations."""
def diff(self, *args, **kwargs):
"""Calculate the derivative of each element in the matrix.
``args`` will be passed to the ``integrate`` function.
Examples
========
>>> from sympy.matrices import Matrix
>>> from sympy.abc import x, y
>>> M = Matrix([[x, y], [1, 0]])
>>> M.diff(x)
Matrix([
[1, 0],
[0, 0]])
See Also
========
integrate
limit
"""
# XXX this should be handled here rather than in Derivative
from sympy import Derivative
kwargs.setdefault('evaluate', True)
deriv = Derivative(self, *args, evaluate=True)
if not isinstance(self, Basic):
return deriv.as_mutable()
else:
return deriv
def _eval_derivative(self, arg):
return self.applyfunc(lambda x: x.diff(arg))
def _accept_eval_derivative(self, s):
return s._visit_eval_derivative_array(self)
def _visit_eval_derivative_scalar(self, base):
# Types are (base: scalar, self: matrix)
return self.applyfunc(lambda x: base.diff(x))
def _visit_eval_derivative_array(self, base):
# Types are (base: array/matrix, self: matrix)
from sympy import derive_by_array
return derive_by_array(base, self)
def integrate(self, *args, **kwargs):
"""Integrate each element of the matrix. ``args`` will
be passed to the ``integrate`` function.
Examples
========
>>> from sympy.matrices import Matrix
>>> from sympy.abc import x, y
>>> M = Matrix([[x, y], [1, 0]])
>>> M.integrate((x, ))
Matrix([
[x**2/2, x*y],
[ x, 0]])
>>> M.integrate((x, 0, 2))
Matrix([
[2, 2*y],
[2, 0]])
See Also
========
limit
diff
"""
return self.applyfunc(lambda x: x.integrate(*args, **kwargs))
def jacobian(self, X):
"""Calculates the Jacobian matrix (derivative of a vector-valued function).
Parameters
==========
``self`` : vector of expressions representing functions f_i(x_1, ..., x_n).
X : set of x_i's in order, it can be a list or a Matrix
Both ``self`` and X can be a row or a column matrix in any order
(i.e., jacobian() should always work).
Examples
========
>>> from sympy import sin, cos, Matrix
>>> from sympy.abc import rho, phi
>>> X = Matrix([rho*cos(phi), rho*sin(phi), rho**2])
>>> Y = Matrix([rho, phi])
>>> X.jacobian(Y)
Matrix([
[cos(phi), -rho*sin(phi)],
[sin(phi), rho*cos(phi)],
[ 2*rho, 0]])
>>> X = Matrix([rho*cos(phi), rho*sin(phi)])
>>> X.jacobian(Y)
Matrix([
[cos(phi), -rho*sin(phi)],
[sin(phi), rho*cos(phi)]])
See Also
========
hessian
wronskian
"""
if not isinstance(X, MatrixBase):
X = self._new(X)
# Both X and ``self`` can be a row or a column matrix, so we need to make
# sure all valid combinations work, but everything else fails:
if self.shape[0] == 1:
m = self.shape[1]
elif self.shape[1] == 1:
m = self.shape[0]
else:
raise TypeError("``self`` must be a row or a column matrix")
if X.shape[0] == 1:
n = X.shape[1]
elif X.shape[1] == 1:
n = X.shape[0]
else:
raise TypeError("X must be a row or a column matrix")
# m is the number of functions and n is the number of variables
# computing the Jacobian is now easy:
return self._new(m, n, lambda j, i: self[j].diff(X[i]))
def limit(self, *args):
"""Calculate the limit of each element in the matrix.
``args`` will be passed to the ``limit`` function.
Examples
========
>>> from sympy.matrices import Matrix
>>> from sympy.abc import x, y
>>> M = Matrix([[x, y], [1, 0]])
>>> M.limit(x, 2)
Matrix([
[2, y],
[1, 0]])
See Also
========
integrate
diff
"""
return self.applyfunc(lambda x: x.limit(*args))
# https://github.com/sympy/sympy/pull/12854
class MatrixDeprecated(MatrixCommon):
"""A class to house deprecated matrix methods."""
def _legacy_array_dot(self, b):
"""Compatibility function for deprecated behavior of ``matrix.dot(vector)``
"""
from .dense import Matrix
if not isinstance(b, MatrixBase):
if is_sequence(b):
if len(b) != self.cols and len(b) != self.rows:
raise ShapeError(
"Dimensions incorrect for dot product: %s, %s" % (
self.shape, len(b)))
return self.dot(Matrix(b))
else:
raise TypeError(
"`b` must be an ordered iterable or Matrix, not %s." %
type(b))
mat = self
if mat.cols == b.rows:
if b.cols != 1:
mat = mat.T
b = b.T
prod = flatten((mat * b).tolist())
return prod
if mat.cols == b.cols:
return mat.dot(b.T)
elif mat.rows == b.rows:
return mat.T.dot(b)
else:
raise ShapeError("Dimensions incorrect for dot product: %s, %s" % (
self.shape, b.shape))
def berkowitz_charpoly(self, x=Dummy('lambda'), simplify=_simplify):
return self.charpoly(x=x)
def berkowitz_det(self):
"""Computes determinant using Berkowitz method.
See Also
========
det
berkowitz
"""
return self.det(method='berkowitz')
def berkowitz_eigenvals(self, **flags):
"""Computes eigenvalues of a Matrix using Berkowitz method.
See Also
========
berkowitz
"""
return self.eigenvals(**flags)
def berkowitz_minors(self):
"""Computes principal minors using Berkowitz method.
See Also
========
berkowitz
"""
sign, minors = self.one, []
for poly in self.berkowitz():
minors.append(sign * poly[-1])
sign = -sign
return tuple(minors)
def berkowitz(self):
from sympy.matrices import zeros
berk = ((1,),)
if not self:
return berk
if not self.is_square:
raise NonSquareMatrixError()
A, N = self, self.rows
transforms = [0] * (N - 1)
for n in range(N, 1, -1):
T, k = zeros(n + 1, n), n - 1
R, C = -A[k, :k], A[:k, k]
A, a = A[:k, :k], -A[k, k]
items = [C]
for i in range(0, n - 2):
items.append(A * items[i])
for i, B in enumerate(items):
items[i] = (R * B)[0, 0]
items = [self.one, a] + items
for i in range(n):
T[i:, i] = items[:n - i + 1]
transforms[k - 1] = T
polys = [self._new([self.one, -A[0, 0]])]
for i, T in enumerate(transforms):
polys.append(T * polys[i])
return berk + tuple(map(tuple, polys))
def cofactorMatrix(self, method="berkowitz"):
return self.cofactor_matrix(method=method)
def det_bareis(self):
return _det_bareiss(self)
def det_LU_decomposition(self):
"""Compute matrix determinant using LU decomposition
Note that this method fails if the LU decomposition itself
fails. In particular, if the matrix has no inverse this method
will fail.
TODO: Implement algorithm for sparse matrices (SFF),
http://www.eecis.udel.edu/~saunders/papers/sffge/it5.ps.
See Also
========
det
det_bareiss
berkowitz_det
"""
return self.det(method='lu')
def jordan_cell(self, eigenval, n):
return self.jordan_block(size=n, eigenvalue=eigenval)
def jordan_cells(self, calc_transformation=True):
P, J = self.jordan_form()
return P, J.get_diag_blocks()
def minorEntry(self, i, j, method="berkowitz"):
return self.minor(i, j, method=method)
def minorMatrix(self, i, j):
return self.minor_submatrix(i, j)
def permuteBkwd(self, perm):
"""Permute the rows of the matrix with the given permutation in reverse."""
return self.permute_rows(perm, direction='backward')
def permuteFwd(self, perm):
"""Permute the rows of the matrix with the given permutation."""
return self.permute_rows(perm, direction='forward')
class MatrixBase(MatrixDeprecated,
MatrixCalculus,
MatrixEigen,
MatrixCommon,
Printable):
"""Base class for matrix objects."""
# Added just for numpy compatibility
__array_priority__ = 11
is_Matrix = True
_class_priority = 3
_sympify = staticmethod(sympify)
zero = S.Zero
one = S.One
def __array__(self, dtype=object):
from .dense import matrix2numpy
return matrix2numpy(self, dtype=dtype)
def __len__(self):
"""Return the number of elements of ``self``.
Implemented mainly so bool(Matrix()) == False.
"""
return self.rows * self.cols
def __mathml__(self):
mml = ""
for i in range(self.rows):
mml += "<matrixrow>"
for j in range(self.cols):
mml += self[i, j].__mathml__()
mml += "</matrixrow>"
return "<matrix>" + mml + "</matrix>"
def _matrix_pow_by_jordan_blocks(self, num):
from sympy.matrices import diag, MutableMatrix
from sympy import binomial
def jordan_cell_power(jc, n):
N = jc.shape[0]
l = jc[0,0]
if l.is_zero:
if N == 1 and n.is_nonnegative:
jc[0,0] = l**n
elif not (n.is_integer and n.is_nonnegative):
raise NonInvertibleMatrixError("Non-invertible matrix can only be raised to a nonnegative integer")
else:
for i in range(N):
jc[0,i] = KroneckerDelta(i, n)
else:
for i in range(N):
bn = binomial(n, i)
if isinstance(bn, binomial):
bn = bn._eval_expand_func()
jc[0,i] = l**(n-i)*bn
for i in range(N):
for j in range(1, N-i):
jc[j,i+j] = jc [j-1,i+j-1]
P, J = self.jordan_form()
jordan_cells = J.get_diag_blocks()
# Make sure jordan_cells matrices are mutable:
jordan_cells = [MutableMatrix(j) for j in jordan_cells]
for j in jordan_cells:
jordan_cell_power(j, num)
return self._new(P.multiply(diag(*jordan_cells))
.multiply(P.inv()))
def __repr__(self):
return sstr(self)
def __str__(self):
if self.rows == 0 or self.cols == 0:
return 'Matrix(%s, %s, [])' % (self.rows, self.cols)
return "Matrix(%s)" % str(self.tolist())
def _format_str(self, printer=None):
if not printer:
from sympy.printing.str import StrPrinter
printer = StrPrinter()
# Handle zero dimensions:
if self.rows == 0 or self.cols == 0:
return 'Matrix(%s, %s, [])' % (self.rows, self.cols)
if self.rows == 1:
return "Matrix([%s])" % self.table(printer, rowsep=',\n')
return "Matrix([\n%s])" % self.table(printer, rowsep=',\n')
@classmethod
def irregular(cls, ntop, *matrices, **kwargs):
"""Return a matrix filled by the given matrices which
are listed in order of appearance from left to right, top to
bottom as they first appear in the matrix. They must fill the
matrix completely.
Examples
========
>>> from sympy import ones, Matrix
>>> Matrix.irregular(3, ones(2,1), ones(3,3)*2, ones(2,2)*3,
... ones(1,1)*4, ones(2,2)*5, ones(1,2)*6, ones(1,2)*7)
Matrix([
[1, 2, 2, 2, 3, 3],
[1, 2, 2, 2, 3, 3],
[4, 2, 2, 2, 5, 5],
[6, 6, 7, 7, 5, 5]])
"""
from sympy.core.compatibility import as_int
ntop = as_int(ntop)
# make sure we are working with explicit matrices
b = [i.as_explicit() if hasattr(i, 'as_explicit') else i
for i in matrices]
q = list(range(len(b)))
dat = [i.rows for i in b]
active = [q.pop(0) for _ in range(ntop)]
cols = sum([b[i].cols for i in active])
rows = []
while any(dat):
r = []
for a, j in enumerate(active):
r.extend(b[j][-dat[j], :])
dat[j] -= 1
if dat[j] == 0 and q:
active[a] = q.pop(0)
if len(r) != cols:
raise ValueError(filldedent('''
Matrices provided do not appear to fill
the space completely.'''))
rows.append(r)
return cls._new(rows)
@classmethod
def _handle_ndarray(cls, arg):
# NumPy array or matrix or some other object that implements
# __array__. So let's first use this method to get a
# numpy.array() and then make a python list out of it.
arr = arg.__array__()
if len(arr.shape) == 2:
rows, cols = arr.shape[0], arr.shape[1]
flat_list = [cls._sympify(i) for i in arr.ravel()]
return rows, cols, flat_list
elif len(arr.shape) == 1:
flat_list = [cls._sympify(i) for i in arr]
return arr.shape[0], 1, flat_list
else:
raise NotImplementedError(
"SymPy supports just 1D and 2D matrices")
@classmethod
def _handle_creation_inputs(cls, *args, **kwargs):
"""Return the number of rows, cols and flat matrix elements.
Examples
========
>>> from sympy import Matrix, I
Matrix can be constructed as follows:
* from a nested list of iterables
>>> Matrix( ((1, 2+I), (3, 4)) )
Matrix([
[1, 2 + I],
[3, 4]])
* from un-nested iterable (interpreted as a column)
>>> Matrix( [1, 2] )
Matrix([
[1],
[2]])
* from un-nested iterable with dimensions
>>> Matrix(1, 2, [1, 2] )
Matrix([[1, 2]])
* from no arguments (a 0 x 0 matrix)
>>> Matrix()
Matrix(0, 0, [])
* from a rule
>>> Matrix(2, 2, lambda i, j: i/(j + 1) )
Matrix([
[0, 0],
[1, 1/2]])
See Also
========
irregular - filling a matrix with irregular blocks
"""
from sympy.matrices.sparse import SparseMatrix
from sympy.matrices.expressions.matexpr import MatrixSymbol
from sympy.matrices.expressions.blockmatrix import BlockMatrix
from sympy.utilities.iterables import reshape
flat_list = None
if len(args) == 1:
# Matrix(SparseMatrix(...))
if isinstance(args[0], SparseMatrix):
return args[0].rows, args[0].cols, flatten(args[0].tolist())
# Matrix(Matrix(...))
elif isinstance(args[0], MatrixBase):
return args[0].rows, args[0].cols, args[0]._mat
# Matrix(MatrixSymbol('X', 2, 2))
elif isinstance(args[0], Basic) and args[0].is_Matrix:
return args[0].rows, args[0].cols, args[0].as_explicit()._mat
elif isinstance(args[0], mp.matrix):
M = args[0]
flat_list = [cls._sympify(x) for x in M]
return M.rows, M.cols, flat_list
# Matrix(numpy.ones((2, 2)))
elif hasattr(args[0], "__array__"):
return cls._handle_ndarray(args[0])
# Matrix([1, 2, 3]) or Matrix([[1, 2], [3, 4]])
elif is_sequence(args[0]) \
and not isinstance(args[0], DeferredVector):
dat = list(args[0])
ismat = lambda i: isinstance(i, MatrixBase) and (
evaluate or
isinstance(i, BlockMatrix) or
isinstance(i, MatrixSymbol))
raw = lambda i: is_sequence(i) and not ismat(i)
evaluate = kwargs.get('evaluate', True)
if evaluate:
def do(x):
# make Block and Symbol explicit
if isinstance(x, (list, tuple)):
return type(x)([do(i) for i in x])
if isinstance(x, BlockMatrix) or \
isinstance(x, MatrixSymbol) and \
all(_.is_Integer for _ in x.shape):
return x.as_explicit()
return x
dat = do(dat)
if dat == [] or dat == [[]]:
rows = cols = 0
flat_list = []
elif not any(raw(i) or ismat(i) for i in dat):
# a column as a list of values
flat_list = [cls._sympify(i) for i in dat]
rows = len(flat_list)
cols = 1 if rows else 0
elif evaluate and all(ismat(i) for i in dat):
# a column as a list of matrices
ncol = {i.cols for i in dat if any(i.shape)}
if ncol:
if len(ncol) != 1:
raise ValueError('mismatched dimensions')
flat_list = [_ for i in dat for r in i.tolist() for _ in r]
cols = ncol.pop()
rows = len(flat_list)//cols
else:
rows = cols = 0
flat_list = []
elif evaluate and any(ismat(i) for i in dat):
ncol = set()
flat_list = []
for i in dat:
if ismat(i):
flat_list.extend(
[k for j in i.tolist() for k in j])
if any(i.shape):
ncol.add(i.cols)
elif raw(i):
if i:
ncol.add(len(i))
flat_list.extend(i)
else:
ncol.add(1)
flat_list.append(i)
if len(ncol) > 1:
raise ValueError('mismatched dimensions')
cols = ncol.pop()
rows = len(flat_list)//cols
else:
# list of lists; each sublist is a logical row
# which might consist of many rows if the values in
# the row are matrices
flat_list = []
ncol = set()
rows = cols = 0
for row in dat:
if not is_sequence(row) and \
not getattr(row, 'is_Matrix', False):
raise ValueError('expecting list of lists')
if hasattr(row, '__array__'):
if 0 in row.shape:
continue
elif not row:
continue
if evaluate and all(ismat(i) for i in row):
r, c, flatT = cls._handle_creation_inputs(
[i.T for i in row])
T = reshape(flatT, [c])
flat = \
[T[i][j] for j in range(c) for i in range(r)]
r, c = c, r
else:
r = 1
if getattr(row, 'is_Matrix', False):
c = 1
flat = [row]
else:
c = len(row)
flat = [cls._sympify(i) for i in row]
ncol.add(c)
if len(ncol) > 1:
raise ValueError('mismatched dimensions')
flat_list.extend(flat)
rows += r
cols = ncol.pop() if ncol else 0
elif len(args) == 3:
rows = as_int(args[0])
cols = as_int(args[1])
if rows < 0 or cols < 0:
raise ValueError("Cannot create a {} x {} matrix. "
"Both dimensions must be positive".format(rows, cols))
# Matrix(2, 2, lambda i, j: i+j)
if len(args) == 3 and isinstance(args[2], Callable):
op = args[2]
flat_list = []
for i in range(rows):
flat_list.extend(
[cls._sympify(op(cls._sympify(i), cls._sympify(j)))
for j in range(cols)])
# Matrix(2, 2, [1, 2, 3, 4])
elif len(args) == 3 and is_sequence(args[2]):
flat_list = args[2]
if len(flat_list) != rows * cols:
raise ValueError(
'List length should be equal to rows*columns')
flat_list = [cls._sympify(i) for i in flat_list]
# Matrix()
elif len(args) == 0:
# Empty Matrix
rows = cols = 0
flat_list = []
if flat_list is None:
raise TypeError(filldedent('''
Data type not understood; expecting list of lists
or lists of values.'''))
return rows, cols, flat_list
def _setitem(self, key, value):
"""Helper to set value at location given by key.
Examples
========
>>> from sympy import Matrix, I, zeros, ones
>>> m = Matrix(((1, 2+I), (3, 4)))
>>> m
Matrix([
[1, 2 + I],
[3, 4]])
>>> m[1, 0] = 9
>>> m
Matrix([
[1, 2 + I],
[9, 4]])
>>> m[1, 0] = [[0, 1]]
To replace row r you assign to position r*m where m
is the number of columns:
>>> M = zeros(4)
>>> m = M.cols
>>> M[3*m] = ones(1, m)*2; M
Matrix([
[0, 0, 0, 0],
[0, 0, 0, 0],
[0, 0, 0, 0],
[2, 2, 2, 2]])
And to replace column c you can assign to position c:
>>> M[2] = ones(m, 1)*4; M
Matrix([
[0, 0, 4, 0],
[0, 0, 4, 0],
[0, 0, 4, 0],
[2, 2, 4, 2]])
"""
from .dense import Matrix
is_slice = isinstance(key, slice)
i, j = key = self.key2ij(key)
is_mat = isinstance(value, MatrixBase)
if type(i) is slice or type(j) is slice:
if is_mat:
self.copyin_matrix(key, value)
return
if not isinstance(value, Expr) and is_sequence(value):
self.copyin_list(key, value)
return
raise ValueError('unexpected value: %s' % value)
else:
if (not is_mat and
not isinstance(value, Basic) and is_sequence(value)):
value = Matrix(value)
is_mat = True
if is_mat:
if is_slice:
key = (slice(*divmod(i, self.cols)),
slice(*divmod(j, self.cols)))
else:
key = (slice(i, i + value.rows),
slice(j, j + value.cols))
self.copyin_matrix(key, value)
else:
return i, j, self._sympify(value)
return
def add(self, b):
"""Return self + b """
return self + b
def condition_number(self):
"""Returns the condition number of a matrix.
This is the maximum singular value divided by the minimum singular value
Examples
========
>>> from sympy import Matrix, S
>>> A = Matrix([[1, 0, 0], [0, 10, 0], [0, 0, S.One/10]])
>>> A.condition_number()
100
See Also
========
singular_values
"""
if not self:
return self.zero
singularvalues = self.singular_values()
return Max(*singularvalues) / Min(*singularvalues)
def copy(self):
"""
Returns the copy of a matrix.
Examples
========
>>> from sympy import Matrix
>>> A = Matrix(2, 2, [1, 2, 3, 4])
>>> A.copy()
Matrix([
[1, 2],
[3, 4]])
"""
return self._new(self.rows, self.cols, self._mat)
def cross(self, b):
r"""
Return the cross product of ``self`` and ``b`` relaxing the condition
of compatible dimensions: if each has 3 elements, a matrix of the
same type and shape as ``self`` will be returned. If ``b`` has the same
shape as ``self`` then common identities for the cross product (like
`a \times b = - b \times a`) will hold.
Parameters
==========
b : 3x1 or 1x3 Matrix
See Also
========
dot
multiply
multiply_elementwise
"""
from sympy.matrices.expressions.matexpr import MatrixExpr
if not isinstance(b, MatrixBase) and not isinstance(b, MatrixExpr):
raise TypeError(
"{} must be a Matrix, not {}.".format(b, type(b)))
if not (self.rows * self.cols == b.rows * b.cols == 3):
raise ShapeError("Dimensions incorrect for cross product: %s x %s" %
((self.rows, self.cols), (b.rows, b.cols)))
else:
return self._new(self.rows, self.cols, (
(self[1] * b[2] - self[2] * b[1]),
(self[2] * b[0] - self[0] * b[2]),
(self[0] * b[1] - self[1] * b[0])))
@property
def D(self):
"""Return Dirac conjugate (if ``self.rows == 4``).
Examples
========
>>> from sympy import Matrix, I, eye
>>> m = Matrix((0, 1 + I, 2, 3))
>>> m.D
Matrix([[0, 1 - I, -2, -3]])
>>> m = (eye(4) + I*eye(4))
>>> m[0, 3] = 2
>>> m.D
Matrix([
[1 - I, 0, 0, 0],
[ 0, 1 - I, 0, 0],
[ 0, 0, -1 + I, 0],
[ 2, 0, 0, -1 + I]])
If the matrix does not have 4 rows an AttributeError will be raised
because this property is only defined for matrices with 4 rows.
>>> Matrix(eye(2)).D
Traceback (most recent call last):
...
AttributeError: Matrix has no attribute D.
See Also
========
sympy.matrices.common.MatrixCommon.conjugate: By-element conjugation
sympy.matrices.common.MatrixCommon.H: Hermite conjugation
"""
from sympy.physics.matrices import mgamma
if self.rows != 4:
# In Python 3.2, properties can only return an AttributeError
# so we can't raise a ShapeError -- see commit which added the
# first line of this inline comment. Also, there is no need
# for a message since MatrixBase will raise the AttributeError
raise AttributeError
return self.H * mgamma(0)
def dot(self, b, hermitian=None, conjugate_convention=None):
"""Return the dot or inner product of two vectors of equal length.
Here ``self`` must be a ``Matrix`` of size 1 x n or n x 1, and ``b``
must be either a matrix of size 1 x n, n x 1, or a list/tuple of length n.
A scalar is returned.
By default, ``dot`` does not conjugate ``self`` or ``b``, even if there are
complex entries. Set ``hermitian=True`` (and optionally a ``conjugate_convention``)
to compute the hermitian inner product.
Possible kwargs are ``hermitian`` and ``conjugate_convention``.
If ``conjugate_convention`` is ``"left"``, ``"math"`` or ``"maths"``,
the conjugate of the first vector (``self``) is used. If ``"right"``
or ``"physics"`` is specified, the conjugate of the second vector ``b`` is used.
Examples
========
>>> from sympy import Matrix
>>> M = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]])
>>> v = Matrix([1, 1, 1])
>>> M.row(0).dot(v)
6
>>> M.col(0).dot(v)
12
>>> v = [3, 2, 1]
>>> M.row(0).dot(v)
10
>>> from sympy import I
>>> q = Matrix([1*I, 1*I, 1*I])
>>> q.dot(q, hermitian=False)
-3
>>> q.dot(q, hermitian=True)
3
>>> q1 = Matrix([1, 1, 1*I])
>>> q.dot(q1, hermitian=True, conjugate_convention="maths")
1 - 2*I
>>> q.dot(q1, hermitian=True, conjugate_convention="physics")
1 + 2*I
See Also
========
cross
multiply
multiply_elementwise
"""
from .dense import Matrix
if not isinstance(b, MatrixBase):
if is_sequence(b):
if len(b) != self.cols and len(b) != self.rows:
raise ShapeError(
"Dimensions incorrect for dot product: %s, %s" % (
self.shape, len(b)))
return self.dot(Matrix(b))
else:
raise TypeError(
"`b` must be an ordered iterable or Matrix, not %s." %
type(b))
mat = self
if (1 not in mat.shape) or (1 not in b.shape) :
SymPyDeprecationWarning(
feature="Dot product of non row/column vectors",
issue=13815,
deprecated_since_version="1.2",
useinstead="* to take matrix products").warn()
return mat._legacy_array_dot(b)
if len(mat) != len(b):
raise ShapeError("Dimensions incorrect for dot product: %s, %s" % (self.shape, b.shape))
n = len(mat)
if mat.shape != (1, n):
mat = mat.reshape(1, n)
if b.shape != (n, 1):
b = b.reshape(n, 1)
# Now ``mat`` is a row vector and ``b`` is a column vector.
# If it so happens that only conjugate_convention is passed
# then automatically set hermitian to True. If only hermitian
# is true but no conjugate_convention is not passed then
# automatically set it to ``"maths"``
if conjugate_convention is not None and hermitian is None:
hermitian = True
if hermitian and conjugate_convention is None:
conjugate_convention = "maths"
if hermitian == True:
if conjugate_convention in ("maths", "left", "math"):
mat = mat.conjugate()
elif conjugate_convention in ("physics", "right"):
b = b.conjugate()
else:
raise ValueError("Unknown conjugate_convention was entered."
" conjugate_convention must be one of the"
" following: math, maths, left, physics or right.")
return (mat * b)[0]
def dual(self):
"""Returns the dual of a matrix, which is:
``(1/2)*levicivita(i, j, k, l)*M(k, l)`` summed over indices `k` and `l`
Since the levicivita method is anti_symmetric for any pairwise
exchange of indices, the dual of a symmetric matrix is the zero
matrix. Strictly speaking the dual defined here assumes that the
'matrix' `M` is a contravariant anti_symmetric second rank tensor,
so that the dual is a covariant second rank tensor.
"""
from sympy import LeviCivita
from sympy.matrices import zeros
M, n = self[:, :], self.rows
work = zeros(n)
if self.is_symmetric():
return work
for i in range(1, n):
for j in range(1, n):
acum = 0
for k in range(1, n):
acum += LeviCivita(i, j, 0, k) * M[0, k]
work[i, j] = acum
work[j, i] = -acum
for l in range(1, n):
acum = 0
for a in range(1, n):
for b in range(1, n):
acum += LeviCivita(0, l, a, b) * M[a, b]
acum /= 2
work[0, l] = -acum
work[l, 0] = acum
return work
def _eval_matrix_exp_jblock(self):
"""A helper function to compute an exponential of a Jordan block
matrix
Examples
========
>>> from sympy import Symbol, Matrix
>>> l = Symbol('lamda')
A trivial example of 1*1 Jordan block:
>>> m = Matrix.jordan_block(1, l)
>>> m._eval_matrix_exp_jblock()
Matrix([[exp(lamda)]])
An example of 3*3 Jordan block:
>>> m = Matrix.jordan_block(3, l)
>>> m._eval_matrix_exp_jblock()
Matrix([
[exp(lamda), exp(lamda), exp(lamda)/2],
[ 0, exp(lamda), exp(lamda)],
[ 0, 0, exp(lamda)]])
References
==========
.. [1] https://en.wikipedia.org/wiki/Matrix_function#Jordan_decomposition
"""
size = self.rows
l = self[0, 0]
exp_l = exp(l)
bands = {i: exp_l / factorial(i) for i in range(size)}
from .sparsetools import banded
return self.__class__(banded(size, bands))
def analytic_func(self, f, x):
"""
Computes f(A) where A is a Square Matrix
and f is an analytic function.
Examples
========
>>> from sympy import Symbol, Matrix, S, log
>>> x = Symbol('x')
>>> m = Matrix([[S(5)/4, S(3)/4], [S(3)/4, S(5)/4]])
>>> f = log(x)
>>> m.analytic_func(f, x)
Matrix([
[ 0, log(2)],
[log(2), 0]])
Parameters
==========
f : Expr
Analytic Function
x : Symbol
parameter of f
"""
from sympy import diff
if not self.is_square:
raise NonSquareMatrixError(
"Valid only for square matrices")
if not x.is_symbol:
raise ValueError("The parameter for f should be a symbol")
if x not in f.free_symbols:
raise ValueError("x should be a parameter in Function")
if x in self.free_symbols:
raise ValueError("x should be a parameter in Matrix")
eigen = self.eigenvals()
max_mul = max(eigen.values())
derivative = {}
dd = f
for i in range(max_mul - 1):
dd = diff(dd, x)
derivative[i + 1] = dd
n = self.shape[0]
r = self.zeros(n)
f_val = self.zeros(n, 1)
row = 0
for i in eigen:
mul = eigen[i]
f_val[row] = f.subs(x, i)
if not f.subs(x, i).free_symbols and not f.subs(x, i).is_complex:
raise ValueError("Cannot Evaluate the function is not"
" analytic at some eigen value")
val = 1
for a in range(n):
r[row, a] = val
val *= i
if mul > 1:
coe = [1 for ii in range(n)]
deri = 1
while mul > 1:
row = row + 1
mul -= 1
d_i = derivative[deri].subs(x, i)
if not d_i.free_symbols and not d_i.is_complex:
raise ValueError("Cannot Evaluate the function is not"
" analytic at some eigen value")
f_val[row] = d_i
for a in range(n):
if a - deri + 1 <= 0:
r[row, a] = 0
coe[a] = 0
continue
coe[a] = coe[a]*(a - deri + 1)
r[row, a] = coe[a]*pow(i, a - deri)
deri += 1
row += 1
c = r.solve(f_val)
ans = self.zeros(n)
pre = self.eye(n)
for i in range(n):
ans = ans + c[i]*pre
pre *= self
return ans
def exp(self):
"""Return the exponential of a square matrix
Examples
========
>>> from sympy import Symbol, Matrix
>>> t = Symbol('t')
>>> m = Matrix([[0, 1], [-1, 0]]) * t
>>> m.exp()
Matrix([
[ exp(I*t)/2 + exp(-I*t)/2, -I*exp(I*t)/2 + I*exp(-I*t)/2],
[I*exp(I*t)/2 - I*exp(-I*t)/2, exp(I*t)/2 + exp(-I*t)/2]])
"""
if not self.is_square:
raise NonSquareMatrixError(
"Exponentiation is valid only for square matrices")
try:
P, J = self.jordan_form()
cells = J.get_diag_blocks()
except MatrixError:
raise NotImplementedError(
"Exponentiation is implemented only for matrices for which the Jordan normal form can be computed")
blocks = [cell._eval_matrix_exp_jblock() for cell in cells]
from sympy.matrices import diag
from sympy import re
eJ = diag(*blocks)
# n = self.rows
ret = P.multiply(eJ, dotprodsimp=None).multiply(P.inv(), dotprodsimp=None)
if all(value.is_real for value in self.values()):
return type(self)(re(ret))
else:
return type(self)(ret)
def _eval_matrix_log_jblock(self):
"""Helper function to compute logarithm of a jordan block.
Examples
========
>>> from sympy import Symbol, Matrix
>>> l = Symbol('lamda')
A trivial example of 1*1 Jordan block:
>>> m = Matrix.jordan_block(1, l)
>>> m._eval_matrix_log_jblock()
Matrix([[log(lamda)]])
An example of 3*3 Jordan block:
>>> m = Matrix.jordan_block(3, l)
>>> m._eval_matrix_log_jblock()
Matrix([
[log(lamda), 1/lamda, -1/(2*lamda**2)],
[ 0, log(lamda), 1/lamda],
[ 0, 0, log(lamda)]])
"""
size = self.rows
l = self[0, 0]
if l.is_zero:
raise MatrixError(
'Could not take logarithm or reciprocal for the given '
'eigenvalue {}'.format(l))
bands = {0: log(l)}
for i in range(1, size):
bands[i] = -((-l) ** -i) / i
from .sparsetools import banded
return self.__class__(banded(size, bands))
def log(self, simplify=cancel):
"""Return the logarithm of a square matrix
Parameters
==========
simplify : function, bool
The function to simplify the result with.
Default is ``cancel``, which is effective to reduce the
expression growing for taking reciprocals and inverses for
symbolic matrices.
Examples
========
>>> from sympy import S, Matrix
Examples for positive-definite matrices:
>>> m = Matrix([[1, 1], [0, 1]])
>>> m.log()
Matrix([
[0, 1],
[0, 0]])
>>> m = Matrix([[S(5)/4, S(3)/4], [S(3)/4, S(5)/4]])
>>> m.log()
Matrix([
[ 0, log(2)],
[log(2), 0]])
Examples for non positive-definite matrices:
>>> m = Matrix([[S(3)/4, S(5)/4], [S(5)/4, S(3)/4]])
>>> m.log()
Matrix([
[ I*pi/2, log(2) - I*pi/2],
[log(2) - I*pi/2, I*pi/2]])
>>> m = Matrix(
... [[0, 0, 0, 1],
... [0, 0, 1, 0],
... [0, 1, 0, 0],
... [1, 0, 0, 0]])
>>> m.log()
Matrix([
[ I*pi/2, 0, 0, -I*pi/2],
[ 0, I*pi/2, -I*pi/2, 0],
[ 0, -I*pi/2, I*pi/2, 0],
[-I*pi/2, 0, 0, I*pi/2]])
"""
if not self.is_square:
raise NonSquareMatrixError(
"Logarithm is valid only for square matrices")
try:
if simplify:
P, J = simplify(self).jordan_form()
else:
P, J = self.jordan_form()
cells = J.get_diag_blocks()
except MatrixError:
raise NotImplementedError(
"Logarithm is implemented only for matrices for which "
"the Jordan normal form can be computed")
blocks = [
cell._eval_matrix_log_jblock()
for cell in cells]
from sympy.matrices import diag
eJ = diag(*blocks)
if simplify:
ret = simplify(P * eJ * simplify(P.inv()))
ret = self.__class__(ret)
else:
ret = P * eJ * P.inv()
return ret
def is_nilpotent(self):
"""Checks if a matrix is nilpotent.
A matrix B is nilpotent if for some integer k, B**k is
a zero matrix.
Examples
========
>>> from sympy import Matrix
>>> a = Matrix([[0, 0, 0], [1, 0, 0], [1, 1, 0]])
>>> a.is_nilpotent()
True
>>> a = Matrix([[1, 0, 1], [1, 0, 0], [1, 1, 0]])
>>> a.is_nilpotent()
False
"""
if not self:
return True
if not self.is_square:
raise NonSquareMatrixError(
"Nilpotency is valid only for square matrices")
x = uniquely_named_symbol('x', self, modify=lambda s: '_' + s)
p = self.charpoly(x)
if p.args[0] == x ** self.rows:
return True
return False
def key2bounds(self, keys):
"""Converts a key with potentially mixed types of keys (integer and slice)
into a tuple of ranges and raises an error if any index is out of ``self``'s
range.
See Also
========
key2ij
"""
from sympy.matrices.common import a2idx as a2idx_ # Remove this line after deprecation of a2idx from matrices.py
islice, jslice = [isinstance(k, slice) for k in keys]
if islice:
if not self.rows:
rlo = rhi = 0
else:
rlo, rhi = keys[0].indices(self.rows)[:2]
else:
rlo = a2idx_(keys[0], self.rows)
rhi = rlo + 1
if jslice:
if not self.cols:
clo = chi = 0
else:
clo, chi = keys[1].indices(self.cols)[:2]
else:
clo = a2idx_(keys[1], self.cols)
chi = clo + 1
return rlo, rhi, clo, chi
def key2ij(self, key):
"""Converts key into canonical form, converting integers or indexable
items into valid integers for ``self``'s range or returning slices
unchanged.
See Also
========
key2bounds
"""
from sympy.matrices.common import a2idx as a2idx_ # Remove this line after deprecation of a2idx from matrices.py
if is_sequence(key):
if not len(key) == 2:
raise TypeError('key must be a sequence of length 2')
return [a2idx_(i, n) if not isinstance(i, slice) else i
for i, n in zip(key, self.shape)]
elif isinstance(key, slice):
return key.indices(len(self))[:2]
else:
return divmod(a2idx_(key, len(self)), self.cols)
def normalized(self, iszerofunc=_iszero):
"""Return the normalized version of ``self``.
Parameters
==========
iszerofunc : Function, optional
A function to determine whether ``self`` is a zero vector.
The default ``_iszero`` tests to see if each element is
exactly zero.
Returns
=======
Matrix
Normalized vector form of ``self``.
It has the same length as a unit vector. However, a zero vector
will be returned for a vector with norm 0.
Raises
======
ShapeError
If the matrix is not in a vector form.
See Also
========
norm
"""
if self.rows != 1 and self.cols != 1:
raise ShapeError("A Matrix must be a vector to normalize.")
norm = self.norm()
if iszerofunc(norm):
out = self.zeros(self.rows, self.cols)
else:
out = self.applyfunc(lambda i: i / norm)
return out
def norm(self, ord=None):
"""Return the Norm of a Matrix or Vector.
In the simplest case this is the geometric size of the vector
Other norms can be specified by the ord parameter
===== ============================ ==========================
ord norm for matrices norm for vectors
===== ============================ ==========================
None Frobenius norm 2-norm
'fro' Frobenius norm - does not exist
inf maximum row sum max(abs(x))
-inf -- min(abs(x))
1 maximum column sum as below
-1 -- as below
2 2-norm (largest sing. value) as below
-2 smallest singular value as below
other - does not exist sum(abs(x)**ord)**(1./ord)
===== ============================ ==========================
Examples
========
>>> from sympy import Matrix, Symbol, trigsimp, cos, sin, oo
>>> x = Symbol('x', real=True)
>>> v = Matrix([cos(x), sin(x)])
>>> trigsimp( v.norm() )
1
>>> v.norm(10)
(sin(x)**10 + cos(x)**10)**(1/10)
>>> A = Matrix([[1, 1], [1, 1]])
>>> A.norm(1) # maximum sum of absolute values of A is 2
2
>>> A.norm(2) # Spectral norm (max of |Ax|/|x| under 2-vector-norm)
2
>>> A.norm(-2) # Inverse spectral norm (smallest singular value)
0
>>> A.norm() # Frobenius Norm
2
>>> A.norm(oo) # Infinity Norm
2
>>> Matrix([1, -2]).norm(oo)
2
>>> Matrix([-1, 2]).norm(-oo)
1
See Also
========
normalized
"""
# Row or Column Vector Norms
vals = list(self.values()) or [0]
if self.rows == 1 or self.cols == 1:
if ord == 2 or ord is None: # Common case sqrt(<x, x>)
return sqrt(Add(*(abs(i) ** 2 for i in vals)))
elif ord == 1: # sum(abs(x))
return Add(*(abs(i) for i in vals))
elif ord is S.Infinity: # max(abs(x))
return Max(*[abs(i) for i in vals])
elif ord is S.NegativeInfinity: # min(abs(x))
return Min(*[abs(i) for i in vals])
# Otherwise generalize the 2-norm, Sum(x_i**ord)**(1/ord)
# Note that while useful this is not mathematically a norm
try:
return Pow(Add(*(abs(i) ** ord for i in vals)), S.One / ord)
except (NotImplementedError, TypeError):
raise ValueError("Expected order to be Number, Symbol, oo")
# Matrix Norms
else:
if ord == 1: # Maximum column sum
m = self.applyfunc(abs)
return Max(*[sum(m.col(i)) for i in range(m.cols)])
elif ord == 2: # Spectral Norm
# Maximum singular value
return Max(*self.singular_values())
elif ord == -2:
# Minimum singular value
return Min(*self.singular_values())
elif ord is S.Infinity: # Infinity Norm - Maximum row sum
m = self.applyfunc(abs)
return Max(*[sum(m.row(i)) for i in range(m.rows)])
elif (ord is None or isinstance(ord,
str) and ord.lower() in
['f', 'fro', 'frobenius', 'vector']):
# Reshape as vector and send back to norm function
return self.vec().norm(ord=2)
else:
raise NotImplementedError("Matrix Norms under development")
def print_nonzero(self, symb="X"):
"""Shows location of non-zero entries for fast shape lookup.
Examples
========
>>> from sympy.matrices import Matrix, eye
>>> m = Matrix(2, 3, lambda i, j: i*3+j)
>>> m
Matrix([
[0, 1, 2],
[3, 4, 5]])
>>> m.print_nonzero()
[ XX]
[XXX]
>>> m = eye(4)
>>> m.print_nonzero("x")
[x ]
[ x ]
[ x ]
[ x]
"""
s = []
for i in range(self.rows):
line = []
for j in range(self.cols):
if self[i, j] == 0:
line.append(" ")
else:
line.append(str(symb))
s.append("[%s]" % ''.join(line))
print('\n'.join(s))
def project(self, v):
"""Return the projection of ``self`` onto the line containing ``v``.
Examples
========
>>> from sympy import Matrix, S, sqrt
>>> V = Matrix([sqrt(3)/2, S.Half])
>>> x = Matrix([[1, 0]])
>>> V.project(x)
Matrix([[sqrt(3)/2, 0]])
>>> V.project(-x)
Matrix([[sqrt(3)/2, 0]])
"""
return v * (self.dot(v) / v.dot(v))
def table(self, printer, rowstart='[', rowend=']', rowsep='\n',
colsep=', ', align='right'):
r"""
String form of Matrix as a table.
``printer`` is the printer to use for on the elements (generally
something like StrPrinter())
``rowstart`` is the string used to start each row (by default '[').
``rowend`` is the string used to end each row (by default ']').
``rowsep`` is the string used to separate rows (by default a newline).
``colsep`` is the string used to separate columns (by default ', ').
``align`` defines how the elements are aligned. Must be one of 'left',
'right', or 'center'. You can also use '<', '>', and '^' to mean the
same thing, respectively.
This is used by the string printer for Matrix.
Examples
========
>>> from sympy import Matrix
>>> from sympy.printing.str import StrPrinter
>>> M = Matrix([[1, 2], [-33, 4]])
>>> printer = StrPrinter()
>>> M.table(printer)
'[ 1, 2]\n[-33, 4]'
>>> print(M.table(printer))
[ 1, 2]
[-33, 4]
>>> print(M.table(printer, rowsep=',\n'))
[ 1, 2],
[-33, 4]
>>> print('[%s]' % M.table(printer, rowsep=',\n'))
[[ 1, 2],
[-33, 4]]
>>> print(M.table(printer, colsep=' '))
[ 1 2]
[-33 4]
>>> print(M.table(printer, align='center'))
[ 1 , 2]
[-33, 4]
>>> print(M.table(printer, rowstart='{', rowend='}'))
{ 1, 2}
{-33, 4}
"""
# Handle zero dimensions:
if self.rows == 0 or self.cols == 0:
return '[]'
# Build table of string representations of the elements
res = []
# Track per-column max lengths for pretty alignment
maxlen = [0] * self.cols
for i in range(self.rows):
res.append([])
for j in range(self.cols):
s = printer._print(self[i, j])
res[-1].append(s)
maxlen[j] = max(len(s), maxlen[j])
# Patch strings together
align = {
'left': 'ljust',
'right': 'rjust',
'center': 'center',
'<': 'ljust',
'>': 'rjust',
'^': 'center',
}[align]
for i, row in enumerate(res):
for j, elem in enumerate(row):
row[j] = getattr(elem, align)(maxlen[j])
res[i] = rowstart + colsep.join(row) + rowend
return rowsep.join(res)
def rank_decomposition(self, iszerofunc=_iszero, simplify=False):
return _rank_decomposition(self, iszerofunc=iszerofunc,
simplify=simplify)
def cholesky(self, hermitian=True):
raise NotImplementedError('This function is implemented in DenseMatrix or SparseMatrix')
def LDLdecomposition(self, hermitian=True):
raise NotImplementedError('This function is implemented in DenseMatrix or SparseMatrix')
def LUdecomposition(self, iszerofunc=_iszero, simpfunc=None,
rankcheck=False):
return _LUdecomposition(self, iszerofunc=iszerofunc, simpfunc=simpfunc,
rankcheck=rankcheck)
def LUdecomposition_Simple(self, iszerofunc=_iszero, simpfunc=None,
rankcheck=False):
return _LUdecomposition_Simple(self, iszerofunc=iszerofunc,
simpfunc=simpfunc, rankcheck=rankcheck)
def LUdecompositionFF(self):
return _LUdecompositionFF(self)
def QRdecomposition(self):
return _QRdecomposition(self)
def diagonal_solve(self, rhs):
return _diagonal_solve(self, rhs)
def lower_triangular_solve(self, rhs):
raise NotImplementedError('This function is implemented in DenseMatrix or SparseMatrix')
def upper_triangular_solve(self, rhs):
raise NotImplementedError('This function is implemented in DenseMatrix or SparseMatrix')
def cholesky_solve(self, rhs):
return _cholesky_solve(self, rhs)
def LDLsolve(self, rhs):
return _LDLsolve(self, rhs)
def LUsolve(self, rhs, iszerofunc=_iszero):
return _LUsolve(self, rhs, iszerofunc=iszerofunc)
def QRsolve(self, b):
return _QRsolve(self, b)
def gauss_jordan_solve(self, B, freevar=False):
return _gauss_jordan_solve(self, B, freevar=freevar)
def pinv_solve(self, B, arbitrary_matrix=None):
return _pinv_solve(self, B, arbitrary_matrix=arbitrary_matrix)
def solve(self, rhs, method='GJ'):
return _solve(self, rhs, method=method)
def solve_least_squares(self, rhs, method='CH'):
return _solve_least_squares(self, rhs, method=method)
def pinv(self, method='RD'):
return _pinv(self, method=method)
def inv_mod(self, m):
return _inv_mod(self, m)
def inverse_ADJ(self, iszerofunc=_iszero):
return _inv_ADJ(self, iszerofunc=iszerofunc)
def inverse_BLOCK(self, iszerofunc=_iszero):
return _inv_block(self, iszerofunc=iszerofunc)
def inverse_GE(self, iszerofunc=_iszero):
return _inv_GE(self, iszerofunc=iszerofunc)
def inverse_LU(self, iszerofunc=_iszero):
return _inv_LU(self, iszerofunc=iszerofunc)
def inverse_CH(self, iszerofunc=_iszero):
return _inv_CH(self, iszerofunc=iszerofunc)
def inverse_LDL(self, iszerofunc=_iszero):
return _inv_LDL(self, iszerofunc=iszerofunc)
def inverse_QR(self, iszerofunc=_iszero):
return _inv_QR(self, iszerofunc=iszerofunc)
def inv(self, method=None, iszerofunc=_iszero, try_block_diag=False):
return _inv(self, method=method, iszerofunc=iszerofunc,
try_block_diag=try_block_diag)
def connected_components(self):
return _connected_components(self)
def connected_components_decomposition(self):
return _connected_components_decomposition(self)
rank_decomposition.__doc__ = _rank_decomposition.__doc__
cholesky.__doc__ = _cholesky.__doc__
LDLdecomposition.__doc__ = _LDLdecomposition.__doc__
LUdecomposition.__doc__ = _LUdecomposition.__doc__
LUdecomposition_Simple.__doc__ = _LUdecomposition_Simple.__doc__
LUdecompositionFF.__doc__ = _LUdecompositionFF.__doc__
QRdecomposition.__doc__ = _QRdecomposition.__doc__
diagonal_solve.__doc__ = _diagonal_solve.__doc__
lower_triangular_solve.__doc__ = _lower_triangular_solve.__doc__
upper_triangular_solve.__doc__ = _upper_triangular_solve.__doc__
cholesky_solve.__doc__ = _cholesky_solve.__doc__
LDLsolve.__doc__ = _LDLsolve.__doc__
LUsolve.__doc__ = _LUsolve.__doc__
QRsolve.__doc__ = _QRsolve.__doc__
gauss_jordan_solve.__doc__ = _gauss_jordan_solve.__doc__
pinv_solve.__doc__ = _pinv_solve.__doc__
solve.__doc__ = _solve.__doc__
solve_least_squares.__doc__ = _solve_least_squares.__doc__
pinv.__doc__ = _pinv.__doc__
inv_mod.__doc__ = _inv_mod.__doc__
inverse_ADJ.__doc__ = _inv_ADJ.__doc__
inverse_GE.__doc__ = _inv_GE.__doc__
inverse_LU.__doc__ = _inv_LU.__doc__
inverse_CH.__doc__ = _inv_CH.__doc__
inverse_LDL.__doc__ = _inv_LDL.__doc__
inverse_QR.__doc__ = _inv_QR.__doc__
inverse_BLOCK.__doc__ = _inv_block.__doc__
inv.__doc__ = _inv.__doc__
connected_components.__doc__ = _connected_components.__doc__
connected_components_decomposition.__doc__ = \
_connected_components_decomposition.__doc__
@deprecated(
issue=15109,
useinstead="from sympy.matrices.common import classof",
deprecated_since_version="1.3")
def classof(A, B):
from sympy.matrices.common import classof as classof_
return classof_(A, B)
@deprecated(
issue=15109,
deprecated_since_version="1.3",
useinstead="from sympy.matrices.common import a2idx")
def a2idx(j, n=None):
from sympy.matrices.common import a2idx as a2idx_
return a2idx_(j, n)
|
e67cb2ef6ac17ba75445214d22bcd87a38673e197fb3625abf6171ce39928fc7
|
from types import FunctionType
from collections import Counter
from mpmath import mp, workprec
from mpmath.libmp.libmpf import prec_to_dps
from sympy.core.compatibility import default_sort_key
from sympy.core.evalf import DEFAULT_MAXPREC, PrecisionExhausted
from sympy.core.logic import fuzzy_and, fuzzy_or
from sympy.core.numbers import Float
from sympy.core.sympify import _sympify
from sympy.functions.elementary.miscellaneous import sqrt
from sympy.polys import roots
from sympy.simplify import nsimplify, simplify as _simplify
from sympy.utilities.exceptions import SymPyDeprecationWarning
from .common import MatrixError, NonSquareMatrixError
from .utilities import _iszero
def _eigenvals_triangular(M, multiple=False):
"""A fast decision for eigenvalues of an upper or a lower triangular
matrix.
"""
diagonal_entries = [M[i, i] for i in range(M.rows)]
if multiple:
return diagonal_entries
return dict(Counter(diagonal_entries))
def _eigenvals_eigenvects_mpmath(M):
norm2 = lambda v: mp.sqrt(sum(i**2 for i in v))
v1 = None
prec = max([x._prec for x in M.atoms(Float)])
eps = 2**-prec
while prec < DEFAULT_MAXPREC:
with workprec(prec):
A = mp.matrix(M.evalf(n=prec_to_dps(prec)))
E, ER = mp.eig(A)
v2 = norm2([i for e in E for i in (mp.re(e), mp.im(e))])
if v1 is not None and mp.fabs(v1 - v2) < eps:
return E, ER
v1 = v2
prec *= 2
# we get here because the next step would have taken us
# past MAXPREC or because we never took a step; in case
# of the latter, we refuse to send back a solution since
# it would not have been verified; we also resist taking
# a small step to arrive exactly at MAXPREC since then
# the two calculations might be artificially close.
raise PrecisionExhausted
def _eigenvals_mpmath(M, multiple=False):
"""Compute eigenvalues using mpmath"""
E, _ = _eigenvals_eigenvects_mpmath(M)
result = [_sympify(x) for x in E]
if multiple:
return result
return dict(Counter(result))
def _eigenvects_mpmath(M):
E, ER = _eigenvals_eigenvects_mpmath(M)
result = []
for i in range(M.rows):
eigenval = _sympify(E[i])
eigenvect = _sympify(ER[:, i])
result.append((eigenval, 1, [eigenvect]))
return result
# This functions is a candidate for caching if it gets implemented for matrices.
def _eigenvals(
M, error_when_incomplete=True, *, simplify=False, multiple=False,
rational=False, **flags):
r"""Return eigenvalues using the Berkowitz agorithm to compute
the characteristic polynomial.
Parameters
==========
error_when_incomplete : bool, optional
If it is set to ``True``, it will raise an error if not all
eigenvalues are computed. This is caused by ``roots`` not returning
a full list of eigenvalues.
simplify : bool or function, optional
If it is set to ``True``, it attempts to return the most
simplified form of expressions returned by applying default
simplification method in every routine.
If it is set to ``False``, it will skip simplification in this
particular routine to save computation resources.
If a function is passed to, it will attempt to apply
the particular function as simplification method.
rational : bool, optional
If it is set to ``True``, every floating point numbers would be
replaced with rationals before computation. It can solve some
issues of ``roots`` routine not working well with floats.
multiple : bool, optional
If it is set to ``True``, the result will be in the form of a
list.
If it is set to ``False``, the result will be in the form of a
dictionary.
Returns
=======
eigs : list or dict
Eigenvalues of a matrix. The return format would be specified by
the key ``multiple``.
Raises
======
MatrixError
If not enough roots had got computed.
NonSquareMatrixError
If attempted to compute eigenvalues from a non-square matrix.
Examples
========
>>> from sympy.matrices import Matrix
>>> M = Matrix(3, 3, [0, 1, 1, 1, 0, 0, 1, 1, 1])
>>> M.eigenvals()
{-1: 1, 0: 1, 2: 1}
See Also
========
MatrixDeterminant.charpoly
eigenvects
Notes
=====
Eigenvalues of a matrix `A` can be computed by solving a matrix
equation `\det(A - \lambda I) = 0`
"""
if not M:
if multiple:
return []
return {}
if not M.is_square:
raise NonSquareMatrixError("{} must be a square matrix.".format(M))
if M.is_upper or M.is_lower:
return _eigenvals_triangular(M, multiple=multiple)
if all(x.is_number for x in M) and M.has(Float):
return _eigenvals_mpmath(M, multiple=multiple)
if rational:
M = M.applyfunc(
lambda x: nsimplify(x, rational=True) if x.has(Float) else x)
if multiple:
return _eigenvals_list(
M, error_when_incomplete=error_when_incomplete, simplify=simplify,
**flags)
return _eigenvals_dict(
M, error_when_incomplete=error_when_incomplete, simplify=simplify,
**flags)
def _eigenvals_list(
M, error_when_incomplete=True, simplify=False, **flags):
iblocks = M.connected_components()
all_eigs = []
for b in iblocks:
block = M[b, b]
if isinstance(simplify, FunctionType):
charpoly = block.charpoly(simplify=simplify)
else:
charpoly = block.charpoly()
eigs = roots(charpoly, multiple=True, **flags)
if error_when_incomplete:
if len(eigs) != block.rows:
raise MatrixError(
"Could not compute eigenvalues for {}. if you see this "
"error, please report to SymPy issue tracker."
.format(block))
all_eigs += eigs
if not simplify:
return all_eigs
if not isinstance(simplify, FunctionType):
simplify = _simplify
return [simplify(value) for value in all_eigs]
def _eigenvals_dict(
M, error_when_incomplete=True, simplify=False, **flags):
iblocks = M.connected_components()
all_eigs = {}
for b in iblocks:
block = M[b, b]
if isinstance(simplify, FunctionType):
charpoly = block.charpoly(simplify=simplify)
else:
charpoly = block.charpoly()
eigs = roots(charpoly, multiple=False, **flags)
if error_when_incomplete:
if sum(eigs.values()) != block.rows:
raise MatrixError(
"Could not compute eigenvalues for {}. if you see this "
"error, please report to SymPy issue tracker."
.format(block))
for k, v in eigs.items():
if k in all_eigs:
all_eigs[k] += v
else:
all_eigs[k] = v
if not simplify:
return all_eigs
if not isinstance(simplify, FunctionType):
simplify = _simplify
return {simplify(key): value for key, value in all_eigs.items()}
def _eigenspace(M, eigenval, iszerofunc=_iszero, simplify=False):
"""Get a basis for the eigenspace for a particular eigenvalue"""
m = M - M.eye(M.rows) * eigenval
ret = m.nullspace(iszerofunc=iszerofunc)
# The nullspace for a real eigenvalue should be non-trivial.
# If we didn't find an eigenvector, try once more a little harder
if len(ret) == 0 and simplify:
ret = m.nullspace(iszerofunc=iszerofunc, simplify=True)
if len(ret) == 0:
raise NotImplementedError(
"Can't evaluate eigenvector for eigenvalue {}".format(eigenval))
return ret
# This functions is a candidate for caching if it gets implemented for matrices.
def _eigenvects(M, error_when_incomplete=True, iszerofunc=_iszero, **flags):
"""Return list of triples (eigenval, multiplicity, eigenspace).
Parameters
==========
error_when_incomplete : bool, optional
Raise an error when not all eigenvalues are computed. This is
caused by ``roots`` not returning a full list of eigenvalues.
iszerofunc : function, optional
Specifies a zero testing function to be used in ``rref``.
Default value is ``_iszero``, which uses SymPy's naive and fast
default assumption handler.
It can also accept any user-specified zero testing function, if it
is formatted as a function which accepts a single symbolic argument
and returns ``True`` if it is tested as zero and ``False`` if it
is tested as non-zero, and ``None`` if it is undecidable.
simplify : bool or function, optional
If ``True``, ``as_content_primitive()`` will be used to tidy up
normalization artifacts.
It will also be used by the ``nullspace`` routine.
chop : bool or positive number, optional
If the matrix contains any Floats, they will be changed to Rationals
for computation purposes, but the answers will be returned after
being evaluated with evalf. The ``chop`` flag is passed to ``evalf``.
When ``chop=True`` a default precision will be used; a number will
be interpreted as the desired level of precision.
Returns
=======
ret : [(eigenval, multiplicity, eigenspace), ...]
A ragged list containing tuples of data obtained by ``eigenvals``
and ``nullspace``.
``eigenspace`` is a list containing the ``eigenvector`` for each
eigenvalue.
``eigenvector`` is a vector in the form of a ``Matrix``. e.g.
a vector of length 3 is returned as ``Matrix([a_1, a_2, a_3])``.
Raises
======
NotImplementedError
If failed to compute nullspace.
Examples
========
>>> from sympy.matrices import Matrix
>>> M = Matrix(3, 3, [0, 1, 1, 1, 0, 0, 1, 1, 1])
>>> M.eigenvects()
[(-1, 1, [Matrix([
[-1],
[ 1],
[ 0]])]), (0, 1, [Matrix([
[ 0],
[-1],
[ 1]])]), (2, 1, [Matrix([
[2/3],
[1/3],
[ 1]])])]
See Also
========
eigenvals
MatrixSubspaces.nullspace
"""
simplify = flags.get('simplify', True)
primitive = flags.get('simplify', False)
chop = flags.pop('chop', False)
flags.pop('multiple', None) # remove this if it's there
if not isinstance(simplify, FunctionType):
simpfunc = _simplify if simplify else lambda x: x
has_floats = M.has(Float)
if has_floats:
if all(x.is_number for x in M):
return _eigenvects_mpmath(M)
M = M.applyfunc(lambda x: nsimplify(x, rational=True))
eigenvals = M.eigenvals(
rational=False, error_when_incomplete=error_when_incomplete,
**flags)
eigenvals = sorted(eigenvals.items(), key=default_sort_key)
ret = []
for val, mult in eigenvals:
vects = _eigenspace(M, val, iszerofunc=iszerofunc, simplify=simplify)
ret.append((val, mult, vects))
if primitive:
# if the primitive flag is set, get rid of any common
# integer denominators
def denom_clean(l):
from sympy import gcd
return [(v / gcd(list(v))).applyfunc(simpfunc) for v in l]
ret = [(val, mult, denom_clean(es)) for val, mult, es in ret]
if has_floats:
# if we had floats to start with, turn the eigenvectors to floats
ret = [(val.evalf(chop=chop), mult, [v.evalf(chop=chop) for v in es])
for val, mult, es in ret]
return ret
def _is_diagonalizable_with_eigen(M, reals_only=False):
"""See _is_diagonalizable. This function returns the bool along with the
eigenvectors to avoid calculating them again in functions like
``diagonalize``."""
if not M.is_square:
return False, []
eigenvecs = M.eigenvects(simplify=True)
for val, mult, basis in eigenvecs:
if reals_only and not val.is_real: # if we have a complex eigenvalue
return False, eigenvecs
if mult != len(basis): # if the geometric multiplicity doesn't equal the algebraic
return False, eigenvecs
return True, eigenvecs
def _is_diagonalizable(M, reals_only=False, **kwargs):
"""Returns ``True`` if a matrix is diagonalizable.
Parameters
==========
reals_only : bool, optional
If ``True``, it tests whether the matrix can be diagonalized
to contain only real numbers on the diagonal.
If ``False``, it tests whether the matrix can be diagonalized
at all, even with numbers that may not be real.
Examples
========
Example of a diagonalizable matrix:
>>> from sympy import Matrix
>>> M = Matrix([[1, 2, 0], [0, 3, 0], [2, -4, 2]])
>>> M.is_diagonalizable()
True
Example of a non-diagonalizable matrix:
>>> M = Matrix([[0, 1], [0, 0]])
>>> M.is_diagonalizable()
False
Example of a matrix that is diagonalized in terms of non-real entries:
>>> M = Matrix([[0, 1], [-1, 0]])
>>> M.is_diagonalizable(reals_only=False)
True
>>> M.is_diagonalizable(reals_only=True)
False
See Also
========
is_diagonal
diagonalize
"""
if 'clear_cache' in kwargs:
SymPyDeprecationWarning(
feature='clear_cache',
deprecated_since_version=1.4,
issue=15887
).warn()
if 'clear_subproducts' in kwargs:
SymPyDeprecationWarning(
feature='clear_subproducts',
deprecated_since_version=1.4,
issue=15887
).warn()
if not M.is_square:
return False
if all(e.is_real for e in M) and M.is_symmetric():
return True
if all(e.is_complex for e in M) and M.is_hermitian:
return True
return _is_diagonalizable_with_eigen(M, reals_only=reals_only)[0]
#G&VL, Matrix Computations, Algo 5.4.2
def _householder_vector(x):
if not x.cols == 1:
raise ValueError("Input must be a column matrix")
v = x.copy()
v_plus = x.copy()
v_minus = x.copy()
q = x[0, 0] / abs(x[0, 0])
norm_x = x.norm()
v_plus[0, 0] = x[0, 0] + q * norm_x
v_minus[0, 0] = x[0, 0] - q * norm_x
if x[1:, 0].norm() == 0:
bet = 0
v[0, 0] = 1
else:
if v_plus.norm() <= v_minus.norm():
v = v_plus
else:
v = v_minus
v = v / v[0]
bet = 2 / (v.norm() ** 2)
return v, bet
def _bidiagonal_decmp_hholder(M):
m = M.rows
n = M.cols
A = M.as_mutable()
U, V = A.eye(m), A.eye(n)
for i in range(min(m, n)):
v, bet = _householder_vector(A[i:, i])
hh_mat = A.eye(m - i) - bet * v * v.H
A[i:, i:] = hh_mat * A[i:, i:]
temp = A.eye(m)
temp[i:, i:] = hh_mat
U = U * temp
if i + 1 <= n - 2:
v, bet = _householder_vector(A[i, i+1:].T)
hh_mat = A.eye(n - i - 1) - bet * v * v.H
A[i:, i+1:] = A[i:, i+1:] * hh_mat
temp = A.eye(n)
temp[i+1:, i+1:] = hh_mat
V = temp * V
return U, A, V
def _eval_bidiag_hholder(M):
m = M.rows
n = M.cols
A = M.as_mutable()
for i in range(min(m, n)):
v, bet = _householder_vector(A[i:, i])
hh_mat = A.eye(m-i) - bet * v * v.H
A[i:, i:] = hh_mat * A[i:, i:]
if i + 1 <= n - 2:
v, bet = _householder_vector(A[i, i+1:].T)
hh_mat = A.eye(n - i - 1) - bet * v * v.H
A[i:, i+1:] = A[i:, i+1:] * hh_mat
return A
def _bidiagonal_decomposition(M, upper=True):
"""
Returns (U,B,V.H)
`A = UBV^{H}`
where A is the input matrix, and B is its Bidiagonalized form
Note: Bidiagonal Computation can hang for symbolic matrices.
Parameters
==========
upper : bool. Whether to do upper bidiagnalization or lower.
True for upper and False for lower.
References
==========
1. Algorith 5.4.2, Matrix computations by Golub and Van Loan, 4th edition
2. Complex Matrix Bidiagonalization : https://github.com/vslobody/Householder-Bidiagonalization
"""
if type(upper) is not bool:
raise ValueError("upper must be a boolean")
if not upper:
X = _bidiagonal_decmp_hholder(M.H)
return X[2].H, X[1].H, X[0].H
return _bidiagonal_decmp_hholder(M)
def _bidiagonalize(M, upper=True):
"""
Returns `B`
where B is the Bidiagonalized form of the input matrix.
Note: Bidiagonal Computation can hang for symbolic matrices.
Parameters
==========
upper : bool. Whether to do upper bidiagnalization or lower.
True for upper and False for lower.
References
==========
1. Algorith 5.4.2, Matrix computations by Golub and Van Loan, 4th edition
2. Complex Matrix Bidiagonalization : https://github.com/vslobody/Householder-Bidiagonalization
"""
if type(upper) is not bool:
raise ValueError("upper must be a boolean")
if not upper:
return _eval_bidiag_hholder(M.H).H
return _eval_bidiag_hholder(M)
def _diagonalize(M, reals_only=False, sort=False, normalize=False):
"""
Return (P, D), where D is diagonal and
D = P^-1 * M * P
where M is current matrix.
Parameters
==========
reals_only : bool. Whether to throw an error if complex numbers are need
to diagonalize. (Default: False)
sort : bool. Sort the eigenvalues along the diagonal. (Default: False)
normalize : bool. If True, normalize the columns of P. (Default: False)
Examples
========
>>> from sympy.matrices import Matrix
>>> M = Matrix(3, 3, [1, 2, 0, 0, 3, 0, 2, -4, 2])
>>> M
Matrix([
[1, 2, 0],
[0, 3, 0],
[2, -4, 2]])
>>> (P, D) = M.diagonalize()
>>> D
Matrix([
[1, 0, 0],
[0, 2, 0],
[0, 0, 3]])
>>> P
Matrix([
[-1, 0, -1],
[ 0, 0, -1],
[ 2, 1, 2]])
>>> P.inv() * M * P
Matrix([
[1, 0, 0],
[0, 2, 0],
[0, 0, 3]])
See Also
========
is_diagonal
is_diagonalizable
"""
if not M.is_square:
raise NonSquareMatrixError()
is_diagonalizable, eigenvecs = _is_diagonalizable_with_eigen(M,
reals_only=reals_only)
if not is_diagonalizable:
raise MatrixError("Matrix is not diagonalizable")
if sort:
eigenvecs = sorted(eigenvecs, key=default_sort_key)
p_cols, diag = [], []
for val, mult, basis in eigenvecs:
diag += [val] * mult
p_cols += basis
if normalize:
p_cols = [v / v.norm() for v in p_cols]
return M.hstack(*p_cols), M.diag(*diag)
def _fuzzy_positive_definite(M):
positive_diagonals = M._has_positive_diagonals()
if positive_diagonals is False:
return False
if positive_diagonals and M.is_strongly_diagonally_dominant:
return True
return None
def _is_positive_definite(M):
if not M.is_hermitian:
if not M.is_square:
return False
M = M + M.H
fuzzy = _fuzzy_positive_definite(M)
if fuzzy is not None:
return fuzzy
return _is_positive_definite_GE(M)
def _is_positive_semidefinite(M):
if not M.is_hermitian:
if not M.is_square:
return False
M = M + M.H
nonnegative_diagonals = M._has_nonnegative_diagonals()
if nonnegative_diagonals is False:
return False
if nonnegative_diagonals and M.is_weakly_diagonally_dominant:
return True
# uses Cholesky factorization with complete pivoting
# see http://eprints.ma.man.ac.uk/1199/1/covered/MIMS_ep2008_116.pdf
M = M.copy()
for k in range(M.rows):
pivot = max(range(k, M.rows), key=lambda i: M[i, i])
if pivot > k:
M.col_swap(k, pivot)
M.row_swap(k, pivot)
if M[k, k].is_negative:
return False
M[k, k] = sqrt(M[k, k])
M[k, (k+1):] /= M[k, k]
for j in range(k+1, M.rows):
M[(k+1):(j+1), j] -= M[k, (k+1):(j+1)].T * M[k, j]
return M[-1, -1].is_nonnegative
def _is_negative_definite(M):
return _is_positive_definite(-M)
def _is_negative_semidefinite(M):
return _is_positive_semidefinite(-M)
def _is_indefinite(M):
if M.is_hermitian:
eigen = M.eigenvals()
args1 = [x.is_positive for x in eigen.keys()]
any_positive = fuzzy_or(args1)
args2 = [x.is_negative for x in eigen.keys()]
any_negative = fuzzy_or(args2)
return fuzzy_and([any_positive, any_negative])
elif M.is_square:
return (M + M.H).is_indefinite
return False
def _is_positive_definite_GE(M):
"""A division-free gaussian elimination method for testing
positive-definiteness."""
M = M.as_mutable()
size = M.rows
for i in range(size):
is_positive = M[i, i].is_positive
if is_positive is not True:
return is_positive
for j in range(i+1, size):
M[j, i+1:] = M[i, i] * M[j, i+1:] - M[j, i] * M[i, i+1:]
return True
_doc_positive_definite = \
r"""Finds out the definiteness of a matrix.
Explanation
===========
A square real matrix $A$ is:
- A positive definite matrix if $x^T A x > 0$
for all non-zero real vectors $x$.
- A positive semidefinite matrix if $x^T A x \geq 0$
for all non-zero real vectors $x$.
- A negative definite matrix if $x^T A x < 0$
for all non-zero real vectors $x$.
- A negative semidefinite matrix if $x^T A x \leq 0$
for all non-zero real vectors $x$.
- An indefinite matrix if there exists non-zero real vectors
$x, y$ with $x^T A x > 0 > y^T A y$.
A square complex matrix $A$ is:
- A positive definite matrix if $\text{re}(x^H A x) > 0$
for all non-zero complex vectors $x$.
- A positive semidefinite matrix if $\text{re}(x^H A x) \geq 0$
for all non-zero complex vectors $x$.
- A negative definite matrix if $\text{re}(x^H A x) < 0$
for all non-zero complex vectors $x$.
- A negative semidefinite matrix if $\text{re}(x^H A x) \leq 0$
for all non-zero complex vectors $x$.
- An indefinite matrix if there exists non-zero complex vectors
$x, y$ with $\text{re}(x^H A x) > 0 > \text{re}(y^H A y)$.
A matrix need not be symmetric or hermitian to be positive definite.
- A real non-symmetric matrix is positive definite if and only if
$\frac{A + A^T}{2}$ is positive definite.
- A complex non-hermitian matrix is positive definite if and only if
$\frac{A + A^H}{2}$ is positive definite.
And this extension can apply for all the definitions above.
However, for complex cases, you can restrict the definition of
$\text{re}(x^H A x) > 0$ to $x^H A x > 0$ and require the matrix
to be hermitian.
But we do not present this restriction for computation because you
can check ``M.is_hermitian`` independently with this and use
the same procedure.
Examples
========
An example of symmetric positive definite matrix:
.. plot::
:context: reset
:format: doctest
:include-source: True
>>> from sympy import Matrix, symbols
>>> from sympy.plotting import plot3d
>>> a, b = symbols('a b')
>>> x = Matrix([a, b])
>>> A = Matrix([[1, 0], [0, 1]])
>>> A.is_positive_definite
True
>>> A.is_positive_semidefinite
True
>>> p = plot3d((x.T*A*x)[0, 0], (a, -1, 1), (b, -1, 1))
An example of symmetric positive semidefinite matrix:
.. plot::
:context: close-figs
:format: doctest
:include-source: True
>>> A = Matrix([[1, -1], [-1, 1]])
>>> A.is_positive_definite
False
>>> A.is_positive_semidefinite
True
>>> p = plot3d((x.T*A*x)[0, 0], (a, -1, 1), (b, -1, 1))
An example of symmetric negative definite matrix:
.. plot::
:context: close-figs
:format: doctest
:include-source: True
>>> A = Matrix([[-1, 0], [0, -1]])
>>> A.is_negative_definite
True
>>> A.is_negative_semidefinite
True
>>> A.is_indefinite
False
>>> p = plot3d((x.T*A*x)[0, 0], (a, -1, 1), (b, -1, 1))
An example of symmetric indefinite matrix:
.. plot::
:context: close-figs
:format: doctest
:include-source: True
>>> A = Matrix([[1, 2], [2, -1]])
>>> A.is_indefinite
True
>>> p = plot3d((x.T*A*x)[0, 0], (a, -1, 1), (b, -1, 1))
An example of non-symmetric positive definite matrix.
.. plot::
:context: close-figs
:format: doctest
:include-source: True
>>> A = Matrix([[1, 2], [-2, 1]])
>>> A.is_positive_definite
True
>>> A.is_positive_semidefinite
True
>>> p = plot3d((x.T*A*x)[0, 0], (a, -1, 1), (b, -1, 1))
Notes
=====
Although some people trivialize the definition of positive definite
matrices only for symmetric or hermitian matrices, this restriction
is not correct because it does not classify all instances of
positive definite matrices from the definition $x^T A x > 0$ or
$\text{re}(x^H A x) > 0$.
For instance, ``Matrix([[1, 2], [-2, 1]])`` presented in
the example above is an example of real positive definite matrix
that is not symmetric.
However, since the following formula holds true;
.. math::
\text{re}(x^H A x) > 0 \iff
\text{re}(x^H \frac{A + A^H}{2} x) > 0
We can classify all positive definite matrices that may or may not
be symmetric or hermitian by transforming the matrix to
$\frac{A + A^T}{2}$ or $\frac{A + A^H}{2}$
(which is guaranteed to be always real symmetric or complex
hermitian) and we can defer most of the studies to symmetric or
hermitian positive definite matrices.
But it is a different problem for the existance of Cholesky
decomposition. Because even though a non symmetric or a non
hermitian matrix can be positive definite, Cholesky or LDL
decomposition does not exist because the decompositions require the
matrix to be symmetric or hermitian.
References
==========
.. [1] https://en.wikipedia.org/wiki/Definiteness_of_a_matrix#Eigenvalues
.. [2] http://mathworld.wolfram.com/PositiveDefiniteMatrix.html
.. [3] Johnson, C. R. "Positive Definite Matrices." Amer.
Math. Monthly 77, 259-264 1970.
"""
_is_positive_definite.__doc__ = _doc_positive_definite
_is_positive_semidefinite.__doc__ = _doc_positive_definite
_is_negative_definite.__doc__ = _doc_positive_definite
_is_negative_semidefinite.__doc__ = _doc_positive_definite
_is_indefinite.__doc__ = _doc_positive_definite
def _jordan_form(M, calc_transform=True, **kwargs):
"""Return ``(P, J)`` where `J` is a Jordan block
matrix and `P` is a matrix such that
``M == P*J*P**-1``
Parameters
==========
calc_transform : bool
If ``False``, then only `J` is returned.
chop : bool
All matrices are converted to exact types when computing
eigenvalues and eigenvectors. As a result, there may be
approximation errors. If ``chop==True``, these errors
will be truncated.
Examples
========
>>> from sympy.matrices import Matrix
>>> M = Matrix([[ 6, 5, -2, -3], [-3, -1, 3, 3], [ 2, 1, -2, -3], [-1, 1, 5, 5]])
>>> P, J = M.jordan_form()
>>> J
Matrix([
[2, 1, 0, 0],
[0, 2, 0, 0],
[0, 0, 2, 1],
[0, 0, 0, 2]])
See Also
========
jordan_block
"""
if not M.is_square:
raise NonSquareMatrixError("Only square matrices have Jordan forms")
chop = kwargs.pop('chop', False)
mat = M
has_floats = M.has(Float)
if has_floats:
try:
max_prec = max(term._prec for term in M._mat if isinstance(term, Float))
except ValueError:
# if no term in the matrix is explicitly a Float calling max()
# will throw a error so setting max_prec to default value of 53
max_prec = 53
# setting minimum max_dps to 15 to prevent loss of precision in
# matrix containing non evaluated expressions
max_dps = max(prec_to_dps(max_prec), 15)
def restore_floats(*args):
"""If ``has_floats`` is `True`, cast all ``args`` as
matrices of floats."""
if has_floats:
args = [m.evalf(n=max_dps, chop=chop) for m in args]
if len(args) == 1:
return args[0]
return args
# cache calculations for some speedup
mat_cache = {}
def eig_mat(val, pow):
"""Cache computations of ``(M - val*I)**pow`` for quick
retrieval"""
if (val, pow) in mat_cache:
return mat_cache[(val, pow)]
if (val, pow - 1) in mat_cache:
mat_cache[(val, pow)] = mat_cache[(val, pow - 1)].multiply(
mat_cache[(val, 1)], dotprodsimp=None)
else:
mat_cache[(val, pow)] = (mat - val*M.eye(M.rows)).pow(pow)
return mat_cache[(val, pow)]
# helper functions
def nullity_chain(val, algebraic_multiplicity):
"""Calculate the sequence [0, nullity(E), nullity(E**2), ...]
until it is constant where ``E = M - val*I``"""
# mat.rank() is faster than computing the null space,
# so use the rank-nullity theorem
cols = M.cols
ret = [0]
nullity = cols - eig_mat(val, 1).rank()
i = 2
while nullity != ret[-1]:
ret.append(nullity)
if nullity == algebraic_multiplicity:
break
nullity = cols - eig_mat(val, i).rank()
i += 1
# Due to issues like #7146 and #15872, SymPy sometimes
# gives the wrong rank. In this case, raise an error
# instead of returning an incorrect matrix
if nullity < ret[-1] or nullity > algebraic_multiplicity:
raise MatrixError(
"SymPy had encountered an inconsistent "
"result while computing Jordan block: "
"{}".format(M))
return ret
def blocks_from_nullity_chain(d):
"""Return a list of the size of each Jordan block.
If d_n is the nullity of E**n, then the number
of Jordan blocks of size n is
2*d_n - d_(n-1) - d_(n+1)"""
# d[0] is always the number of columns, so skip past it
mid = [2*d[n] - d[n - 1] - d[n + 1] for n in range(1, len(d) - 1)]
# d is assumed to plateau with "d[ len(d) ] == d[-1]", so
# 2*d_n - d_(n-1) - d_(n+1) == d_n - d_(n-1)
end = [d[-1] - d[-2]] if len(d) > 1 else [d[0]]
return mid + end
def pick_vec(small_basis, big_basis):
"""Picks a vector from big_basis that isn't in
the subspace spanned by small_basis"""
if len(small_basis) == 0:
return big_basis[0]
for v in big_basis:
_, pivots = M.hstack(*(small_basis + [v])).echelon_form(
with_pivots=True)
if pivots[-1] == len(small_basis):
return v
# roots doesn't like Floats, so replace them with Rationals
if has_floats:
mat = mat.applyfunc(lambda x: nsimplify(x, rational=True))
# first calculate the jordan block structure
eigs = mat.eigenvals()
# make sure that we found all the roots by counting
# the algebraic multiplicity
if sum(m for m in eigs.values()) != mat.cols:
raise MatrixError("Could not compute eigenvalues for {}".format(mat))
# most matrices have distinct eigenvalues
# and so are diagonalizable. In this case, don't
# do extra work!
if len(eigs.keys()) == mat.cols:
blocks = list(sorted(eigs.keys(), key=default_sort_key))
jordan_mat = mat.diag(*blocks)
if not calc_transform:
return restore_floats(jordan_mat)
jordan_basis = [eig_mat(eig, 1).nullspace()[0]
for eig in blocks]
basis_mat = mat.hstack(*jordan_basis)
return restore_floats(basis_mat, jordan_mat)
block_structure = []
for eig in sorted(eigs.keys(), key=default_sort_key):
algebraic_multiplicity = eigs[eig]
chain = nullity_chain(eig, algebraic_multiplicity)
block_sizes = blocks_from_nullity_chain(chain)
# if block_sizes = = [a, b, c, ...], then the number of
# Jordan blocks of size 1 is a, of size 2 is b, etc.
# create an array that has (eig, block_size) with one
# entry for each block
size_nums = [(i+1, num) for i, num in enumerate(block_sizes)]
# we expect larger Jordan blocks to come earlier
size_nums.reverse()
block_structure.extend(
(eig, size) for size, num in size_nums for _ in range(num))
jordan_form_size = sum(size for eig, size in block_structure)
if jordan_form_size != M.rows:
raise MatrixError(
"SymPy had encountered an inconsistent result while "
"computing Jordan block. : {}".format(M))
blocks = (mat.jordan_block(size=size, eigenvalue=eig) for eig, size in block_structure)
jordan_mat = mat.diag(*blocks)
if not calc_transform:
return restore_floats(jordan_mat)
# For each generalized eigenspace, calculate a basis.
# We start by looking for a vector in null( (A - eig*I)**n )
# which isn't in null( (A - eig*I)**(n-1) ) where n is
# the size of the Jordan block
#
# Ideally we'd just loop through block_structure and
# compute each generalized eigenspace. However, this
# causes a lot of unneeded computation. Instead, we
# go through the eigenvalues separately, since we know
# their generalized eigenspaces must have bases that
# are linearly independent.
jordan_basis = []
for eig in sorted(eigs.keys(), key=default_sort_key):
eig_basis = []
for block_eig, size in block_structure:
if block_eig != eig:
continue
null_big = (eig_mat(eig, size)).nullspace()
null_small = (eig_mat(eig, size - 1)).nullspace()
# we want to pick something that is in the big basis
# and not the small, but also something that is independent
# of any other generalized eigenvectors from a different
# generalized eigenspace sharing the same eigenvalue.
vec = pick_vec(null_small + eig_basis, null_big)
new_vecs = [eig_mat(eig, i).multiply(vec, dotprodsimp=None)
for i in range(size)]
eig_basis.extend(new_vecs)
jordan_basis.extend(reversed(new_vecs))
basis_mat = mat.hstack(*jordan_basis)
return restore_floats(basis_mat, jordan_mat)
def _left_eigenvects(M, **flags):
"""Returns left eigenvectors and eigenvalues.
This function returns the list of triples (eigenval, multiplicity,
basis) for the left eigenvectors. Options are the same as for
eigenvects(), i.e. the ``**flags`` arguments gets passed directly to
eigenvects().
Examples
========
>>> from sympy.matrices import Matrix
>>> M = Matrix([[0, 1, 1], [1, 0, 0], [1, 1, 1]])
>>> M.eigenvects()
[(-1, 1, [Matrix([
[-1],
[ 1],
[ 0]])]), (0, 1, [Matrix([
[ 0],
[-1],
[ 1]])]), (2, 1, [Matrix([
[2/3],
[1/3],
[ 1]])])]
>>> M.left_eigenvects()
[(-1, 1, [Matrix([[-2, 1, 1]])]), (0, 1, [Matrix([[-1, -1, 1]])]), (2,
1, [Matrix([[1, 1, 1]])])]
"""
eigs = M.transpose().eigenvects(**flags)
return [(val, mult, [l.transpose() for l in basis]) for val, mult, basis in eigs]
def _singular_values(M):
"""Compute the singular values of a Matrix
Examples
========
>>> from sympy import Matrix, Symbol
>>> x = Symbol('x', real=True)
>>> M = Matrix([[0, 1, 0], [0, x, 0], [-1, 0, 0]])
>>> M.singular_values()
[sqrt(x**2 + 1), 1, 0]
See Also
========
condition_number
"""
if M.rows >= M.cols:
valmultpairs = M.H.multiply(M).eigenvals()
else:
valmultpairs = M.multiply(M.H).eigenvals()
# Expands result from eigenvals into a simple list
vals = []
for k, v in valmultpairs.items():
vals += [sqrt(k)] * v # dangerous! same k in several spots!
# Pad with zeros if singular values are computed in reverse way,
# to give consistent format.
if len(vals) < M.cols:
vals += [M.zero] * (M.cols - len(vals))
# sort them in descending order
vals.sort(reverse=True, key=default_sort_key)
return vals
|
dcc2f1217b8fea3ffafd0972cf5021362a162227f858314bd6ecd7d08aa01b3c
|
from __future__ import print_function, division
from typing import Optional
from collections import defaultdict
import inspect
from sympy.core.basic import Basic
from sympy.core.compatibility import iterable, ordered, reduce
from sympy.core.containers import Tuple
from sympy.core.decorators import (deprecated, sympify_method_args,
sympify_return)
from sympy.core.evalf import EvalfMixin
from sympy.core.parameters import global_parameters
from sympy.core.expr import Expr
from sympy.core.logic import (FuzzyBool, fuzzy_bool, fuzzy_or, fuzzy_and,
fuzzy_not)
from sympy.core.numbers import Float
from sympy.core.operations import LatticeOp
from sympy.core.relational import Eq, Ne
from sympy.core.singleton import Singleton, S
from sympy.core.symbol import Symbol, Dummy, uniquely_named_symbol
from sympy.core.sympify import _sympify, sympify, converter
from sympy.logic.boolalg import And, Or, Not, Xor, true, false
from sympy.sets.contains import Contains
from sympy.utilities import subsets
from sympy.utilities.exceptions import SymPyDeprecationWarning
from sympy.utilities.iterables import iproduct, sift, roundrobin
from sympy.utilities.misc import func_name, filldedent
from mpmath import mpi, mpf
tfn = defaultdict(lambda: None, {
True: S.true,
S.true: S.true,
False: S.false,
S.false: S.false})
@sympify_method_args
class Set(Basic):
"""
The base class for any kind of set.
This is not meant to be used directly as a container of items. It does not
behave like the builtin ``set``; see :class:`FiniteSet` for that.
Real intervals are represented by the :class:`Interval` class and unions of
sets by the :class:`Union` class. The empty set is represented by the
:class:`EmptySet` class and available as a singleton as ``S.EmptySet``.
"""
is_number = False
is_iterable = False
is_interval = False
is_FiniteSet = False
is_Interval = False
is_ProductSet = False
is_Union = False
is_Intersection = None # type: Optional[bool]
is_UniversalSet = None # type: Optional[bool]
is_Complement = None # type: Optional[bool]
is_ComplexRegion = False
is_empty = None # type: FuzzyBool
is_finite_set = None # type: FuzzyBool
@property # type: ignore
@deprecated(useinstead="is S.EmptySet or is_empty",
issue=16946, deprecated_since_version="1.5")
def is_EmptySet(self):
return None
@staticmethod
def _infimum_key(expr):
"""
Return infimum (if possible) else S.Infinity.
"""
try:
infimum = expr.inf
assert infimum.is_comparable
infimum = infimum.evalf() # issue #18505
except (NotImplementedError,
AttributeError, AssertionError, ValueError):
infimum = S.Infinity
return infimum
def union(self, other):
"""
Returns the union of 'self' and 'other'.
Examples
========
As a shortcut it is possible to use the '+' operator:
>>> from sympy import Interval, FiniteSet
>>> Interval(0, 1).union(Interval(2, 3))
Union(Interval(0, 1), Interval(2, 3))
>>> Interval(0, 1) + Interval(2, 3)
Union(Interval(0, 1), Interval(2, 3))
>>> Interval(1, 2, True, True) + FiniteSet(2, 3)
Union(FiniteSet(3), Interval.Lopen(1, 2))
Similarly it is possible to use the '-' operator for set differences:
>>> Interval(0, 2) - Interval(0, 1)
Interval.Lopen(1, 2)
>>> Interval(1, 3) - FiniteSet(2)
Union(Interval.Ropen(1, 2), Interval.Lopen(2, 3))
"""
return Union(self, other)
def intersect(self, other):
"""
Returns the intersection of 'self' and 'other'.
>>> from sympy import Interval
>>> Interval(1, 3).intersect(Interval(1, 2))
Interval(1, 2)
>>> from sympy import imageset, Lambda, symbols, S
>>> n, m = symbols('n m')
>>> a = imageset(Lambda(n, 2*n), S.Integers)
>>> a.intersect(imageset(Lambda(m, 2*m + 1), S.Integers))
EmptySet
"""
return Intersection(self, other)
def intersection(self, other):
"""
Alias for :meth:`intersect()`
"""
return self.intersect(other)
def is_disjoint(self, other):
"""
Returns True if 'self' and 'other' are disjoint
Examples
========
>>> from sympy import Interval
>>> Interval(0, 2).is_disjoint(Interval(1, 2))
False
>>> Interval(0, 2).is_disjoint(Interval(3, 4))
True
References
==========
.. [1] https://en.wikipedia.org/wiki/Disjoint_sets
"""
return self.intersect(other) == S.EmptySet
def isdisjoint(self, other):
"""
Alias for :meth:`is_disjoint()`
"""
return self.is_disjoint(other)
def complement(self, universe):
r"""
The complement of 'self' w.r.t the given universe.
Examples
========
>>> from sympy import Interval, S
>>> Interval(0, 1).complement(S.Reals)
Union(Interval.open(-oo, 0), Interval.open(1, oo))
>>> Interval(0, 1).complement(S.UniversalSet)
Complement(UniversalSet, Interval(0, 1))
"""
return Complement(universe, self)
def _complement(self, other):
# this behaves as other - self
if isinstance(self, ProductSet) and isinstance(other, ProductSet):
# If self and other are disjoint then other - self == self
if len(self.sets) != len(other.sets):
return other
# There can be other ways to represent this but this gives:
# (A x B) - (C x D) = ((A - C) x B) U (A x (B - D))
overlaps = []
pairs = list(zip(self.sets, other.sets))
for n in range(len(pairs)):
sets = (o if i != n else o-s for i, (s, o) in enumerate(pairs))
overlaps.append(ProductSet(*sets))
return Union(*overlaps)
elif isinstance(other, Interval):
if isinstance(self, Interval) or isinstance(self, FiniteSet):
return Intersection(other, self.complement(S.Reals))
elif isinstance(other, Union):
return Union(*(o - self for o in other.args))
elif isinstance(other, Complement):
return Complement(other.args[0], Union(other.args[1], self), evaluate=False)
elif isinstance(other, EmptySet):
return S.EmptySet
elif isinstance(other, FiniteSet):
from sympy.utilities.iterables import sift
sifted = sift(other, lambda x: fuzzy_bool(self.contains(x)))
# ignore those that are contained in self
return Union(FiniteSet(*(sifted[False])),
Complement(FiniteSet(*(sifted[None])), self, evaluate=False)
if sifted[None] else S.EmptySet)
def symmetric_difference(self, other):
"""
Returns symmetric difference of `self` and `other`.
Examples
========
>>> from sympy import Interval, S
>>> Interval(1, 3).symmetric_difference(S.Reals)
Union(Interval.open(-oo, 1), Interval.open(3, oo))
>>> Interval(1, 10).symmetric_difference(S.Reals)
Union(Interval.open(-oo, 1), Interval.open(10, oo))
>>> from sympy import S, EmptySet
>>> S.Reals.symmetric_difference(EmptySet)
Reals
References
==========
.. [1] https://en.wikipedia.org/wiki/Symmetric_difference
"""
return SymmetricDifference(self, other)
def _symmetric_difference(self, other):
return Union(Complement(self, other), Complement(other, self))
@property
def inf(self):
"""
The infimum of 'self'
Examples
========
>>> from sympy import Interval, Union
>>> Interval(0, 1).inf
0
>>> Union(Interval(0, 1), Interval(2, 3)).inf
0
"""
return self._inf
@property
def _inf(self):
raise NotImplementedError("(%s)._inf" % self)
@property
def sup(self):
"""
The supremum of 'self'
Examples
========
>>> from sympy import Interval, Union
>>> Interval(0, 1).sup
1
>>> Union(Interval(0, 1), Interval(2, 3)).sup
3
"""
return self._sup
@property
def _sup(self):
raise NotImplementedError("(%s)._sup" % self)
def contains(self, other):
"""
Returns a SymPy value indicating whether ``other`` is contained
in ``self``: ``true`` if it is, ``false`` if it isn't, else
an unevaluated ``Contains`` expression (or, as in the case of
ConditionSet and a union of FiniteSet/Intervals, an expression
indicating the conditions for containment).
Examples
========
>>> from sympy import Interval, S
>>> from sympy.abc import x
>>> Interval(0, 1).contains(0.5)
True
As a shortcut it is possible to use the 'in' operator, but that
will raise an error unless an affirmative true or false is not
obtained.
>>> Interval(0, 1).contains(x)
(0 <= x) & (x <= 1)
>>> x in Interval(0, 1)
Traceback (most recent call last):
...
TypeError: did not evaluate to a bool: None
The result of 'in' is a bool, not a SymPy value
>>> 1 in Interval(0, 2)
True
>>> _ is S.true
False
"""
other = sympify(other, strict=True)
c = self._contains(other)
if isinstance(c, Contains):
return c
if c is None:
return Contains(other, self, evaluate=False)
b = tfn[c]
if b is None:
return c
return b
def _contains(self, other):
raise NotImplementedError(filldedent('''
(%s)._contains(%s) is not defined. This method, when
defined, will receive a sympified object. The method
should return True, False, None or something that
expresses what must be true for the containment of that
object in self to be evaluated. If None is returned
then a generic Contains object will be returned
by the ``contains`` method.''' % (self, other)))
def is_subset(self, other):
"""
Returns True if 'self' is a subset of 'other'.
Examples
========
>>> from sympy import Interval
>>> Interval(0, 0.5).is_subset(Interval(0, 1))
True
>>> Interval(0, 1).is_subset(Interval(0, 1, left_open=True))
False
"""
if not isinstance(other, Set):
raise ValueError("Unknown argument '%s'" % other)
# Handle the trivial cases
if self == other:
return True
is_empty = self.is_empty
if is_empty is True:
return True
elif fuzzy_not(is_empty) and other.is_empty:
return False
if self.is_finite_set is False and other.is_finite_set:
return False
# Dispatch on subclass rules
ret = self._eval_is_subset(other)
if ret is not None:
return ret
ret = other._eval_is_superset(self)
if ret is not None:
return ret
# Use pairwise rules from multiple dispatch
from sympy.sets.handlers.issubset import is_subset_sets
ret = is_subset_sets(self, other)
if ret is not None:
return ret
# Fall back on computing the intersection
# XXX: We shouldn't do this. A query like this should be handled
# without evaluating new Set objects. It should be the other way round
# so that the intersect method uses is_subset for evaluation.
if self.intersect(other) == self:
return True
def _eval_is_subset(self, other):
'''Returns a fuzzy bool for whether self is a subset of other.'''
return None
def _eval_is_superset(self, other):
'''Returns a fuzzy bool for whether self is a subset of other.'''
return None
# This should be deprecated:
def issubset(self, other):
"""
Alias for :meth:`is_subset()`
"""
return self.is_subset(other)
def is_proper_subset(self, other):
"""
Returns True if 'self' is a proper subset of 'other'.
Examples
========
>>> from sympy import Interval
>>> Interval(0, 0.5).is_proper_subset(Interval(0, 1))
True
>>> Interval(0, 1).is_proper_subset(Interval(0, 1))
False
"""
if isinstance(other, Set):
return self != other and self.is_subset(other)
else:
raise ValueError("Unknown argument '%s'" % other)
def is_superset(self, other):
"""
Returns True if 'self' is a superset of 'other'.
Examples
========
>>> from sympy import Interval
>>> Interval(0, 0.5).is_superset(Interval(0, 1))
False
>>> Interval(0, 1).is_superset(Interval(0, 1, left_open=True))
True
"""
if isinstance(other, Set):
return other.is_subset(self)
else:
raise ValueError("Unknown argument '%s'" % other)
# This should be deprecated:
def issuperset(self, other):
"""
Alias for :meth:`is_superset()`
"""
return self.is_superset(other)
def is_proper_superset(self, other):
"""
Returns True if 'self' is a proper superset of 'other'.
Examples
========
>>> from sympy import Interval
>>> Interval(0, 1).is_proper_superset(Interval(0, 0.5))
True
>>> Interval(0, 1).is_proper_superset(Interval(0, 1))
False
"""
if isinstance(other, Set):
return self != other and self.is_superset(other)
else:
raise ValueError("Unknown argument '%s'" % other)
def _eval_powerset(self):
from .powerset import PowerSet
return PowerSet(self)
def powerset(self):
"""
Find the Power set of 'self'.
Examples
========
>>> from sympy import EmptySet, FiniteSet, Interval
A power set of an empty set:
>>> A = EmptySet
>>> A.powerset()
FiniteSet(EmptySet)
A power set of a finite set:
>>> A = FiniteSet(1, 2)
>>> a, b, c = FiniteSet(1), FiniteSet(2), FiniteSet(1, 2)
>>> A.powerset() == FiniteSet(a, b, c, EmptySet)
True
A power set of an interval:
>>> Interval(1, 2).powerset()
PowerSet(Interval(1, 2))
References
==========
.. [1] https://en.wikipedia.org/wiki/Power_set
"""
return self._eval_powerset()
@property
def measure(self):
"""
The (Lebesgue) measure of 'self'
Examples
========
>>> from sympy import Interval, Union
>>> Interval(0, 1).measure
1
>>> Union(Interval(0, 1), Interval(2, 3)).measure
2
"""
return self._measure
@property
def boundary(self):
"""
The boundary or frontier of a set
A point x is on the boundary of a set S if
1. x is in the closure of S.
I.e. Every neighborhood of x contains a point in S.
2. x is not in the interior of S.
I.e. There does not exist an open set centered on x contained
entirely within S.
There are the points on the outer rim of S. If S is open then these
points need not actually be contained within S.
For example, the boundary of an interval is its start and end points.
This is true regardless of whether or not the interval is open.
Examples
========
>>> from sympy import Interval
>>> Interval(0, 1).boundary
FiniteSet(0, 1)
>>> Interval(0, 1, True, False).boundary
FiniteSet(0, 1)
"""
return self._boundary
@property
def is_open(self):
"""
Property method to check whether a set is open.
A set is open if and only if it has an empty intersection with its
boundary. In particular, a subset A of the reals is open if and only
if each one of its points is contained in an open interval that is a
subset of A.
Examples
========
>>> from sympy import S
>>> S.Reals.is_open
True
>>> S.Rationals.is_open
False
"""
return Intersection(self, self.boundary).is_empty
@property
def is_closed(self):
"""
A property method to check whether a set is closed.
A set is closed if its complement is an open set. The closedness of a
subset of the reals is determined with respect to R and its standard
topology.
Examples
========
>>> from sympy import Interval
>>> Interval(0, 1).is_closed
True
"""
return self.boundary.is_subset(self)
@property
def closure(self):
"""
Property method which returns the closure of a set.
The closure is defined as the union of the set itself and its
boundary.
Examples
========
>>> from sympy import S, Interval
>>> S.Reals.closure
Reals
>>> Interval(0, 1).closure
Interval(0, 1)
"""
return self + self.boundary
@property
def interior(self):
"""
Property method which returns the interior of a set.
The interior of a set S consists all points of S that do not
belong to the boundary of S.
Examples
========
>>> from sympy import Interval
>>> Interval(0, 1).interior
Interval.open(0, 1)
>>> Interval(0, 1).boundary.interior
EmptySet
"""
return self - self.boundary
@property
def _boundary(self):
raise NotImplementedError()
@property
def _measure(self):
raise NotImplementedError("(%s)._measure" % self)
@sympify_return([('other', 'Set')], NotImplemented)
def __add__(self, other):
return self.union(other)
@sympify_return([('other', 'Set')], NotImplemented)
def __or__(self, other):
return self.union(other)
@sympify_return([('other', 'Set')], NotImplemented)
def __and__(self, other):
return self.intersect(other)
@sympify_return([('other', 'Set')], NotImplemented)
def __mul__(self, other):
return ProductSet(self, other)
@sympify_return([('other', 'Set')], NotImplemented)
def __xor__(self, other):
return SymmetricDifference(self, other)
@sympify_return([('exp', Expr)], NotImplemented)
def __pow__(self, exp):
if not (exp.is_Integer and exp >= 0):
raise ValueError("%s: Exponent must be a positive Integer" % exp)
return ProductSet(*[self]*exp)
@sympify_return([('other', 'Set')], NotImplemented)
def __sub__(self, other):
return Complement(self, other)
def __contains__(self, other):
other = _sympify(other)
c = self._contains(other)
b = tfn[c]
if b is None:
# x in y must evaluate to T or F; to entertain a None
# result with Set use y.contains(x)
raise TypeError('did not evaluate to a bool: %r' % c)
return b
class ProductSet(Set):
"""
Represents a Cartesian Product of Sets.
Returns a Cartesian product given several sets as either an iterable
or individual arguments.
Can use '*' operator on any sets for convenient shorthand.
Examples
========
>>> from sympy import Interval, FiniteSet, ProductSet
>>> I = Interval(0, 5); S = FiniteSet(1, 2, 3)
>>> ProductSet(I, S)
ProductSet(Interval(0, 5), FiniteSet(1, 2, 3))
>>> (2, 2) in ProductSet(I, S)
True
>>> Interval(0, 1) * Interval(0, 1) # The unit square
ProductSet(Interval(0, 1), Interval(0, 1))
>>> coin = FiniteSet('H', 'T')
>>> set(coin**2)
{(H, H), (H, T), (T, H), (T, T)}
The Cartesian product is not commutative or associative e.g.:
>>> I*S == S*I
False
>>> (I*I)*I == I*(I*I)
False
Notes
=====
- Passes most operations down to the argument sets
References
==========
.. [1] https://en.wikipedia.org/wiki/Cartesian_product
"""
is_ProductSet = True
def __new__(cls, *sets, **assumptions):
if len(sets) == 1 and iterable(sets[0]) and not isinstance(sets[0], (Set, set)):
SymPyDeprecationWarning(
feature="ProductSet(iterable)",
useinstead="ProductSet(*iterable)",
issue=17557,
deprecated_since_version="1.5"
).warn()
sets = tuple(sets[0])
sets = [sympify(s) for s in sets]
if not all(isinstance(s, Set) for s in sets):
raise TypeError("Arguments to ProductSet should be of type Set")
# Nullary product of sets is *not* the empty set
if len(sets) == 0:
return FiniteSet(())
if S.EmptySet in sets:
return S.EmptySet
return Basic.__new__(cls, *sets, **assumptions)
@property
def sets(self):
return self.args
def flatten(self):
def _flatten(sets):
for s in sets:
if s.is_ProductSet:
for s2 in _flatten(s.sets):
yield s2
else:
yield s
return ProductSet(*_flatten(self.sets))
def _eval_Eq(self, other):
if not other.is_ProductSet:
return
if len(self.sets) != len(other.sets):
return false
eqs = (Eq(x, y) for x, y in zip(self.sets, other.sets))
return tfn[fuzzy_and(map(fuzzy_bool, eqs))]
def _contains(self, element):
"""
'in' operator for ProductSets
Examples
========
>>> from sympy import Interval
>>> (2, 3) in Interval(0, 5) * Interval(0, 5)
True
>>> (10, 10) in Interval(0, 5) * Interval(0, 5)
False
Passes operation on to constituent sets
"""
if element.is_Symbol:
return None
if not isinstance(element, Tuple) or len(element) != len(self.sets):
return False
return fuzzy_and(s._contains(e) for s, e in zip(self.sets, element))
def as_relational(self, *symbols):
symbols = [_sympify(s) for s in symbols]
if len(symbols) != len(self.sets) or not all(
i.is_Symbol for i in symbols):
raise ValueError(
'number of symbols must match the number of sets')
return And(*[s.as_relational(i) for s, i in zip(self.sets, symbols)])
@property
def _boundary(self):
return Union(*(ProductSet(*(b + b.boundary if i != j else b.boundary
for j, b in enumerate(self.sets)))
for i, a in enumerate(self.sets)))
@property
def is_iterable(self):
"""
A property method which tests whether a set is iterable or not.
Returns True if set is iterable, otherwise returns False.
Examples
========
>>> from sympy import FiniteSet, Interval
>>> I = Interval(0, 1)
>>> A = FiniteSet(1, 2, 3, 4, 5)
>>> I.is_iterable
False
>>> A.is_iterable
True
"""
return all(set.is_iterable for set in self.sets)
def __iter__(self):
"""
A method which implements is_iterable property method.
If self.is_iterable returns True (both constituent sets are iterable),
then return the Cartesian Product. Otherwise, raise TypeError.
"""
return iproduct(*self.sets)
@property
def is_empty(self):
return fuzzy_or(s.is_empty for s in self.sets)
@property
def is_finite_set(self):
all_finite = fuzzy_and(s.is_finite_set for s in self.sets)
return fuzzy_or([self.is_empty, all_finite])
@property
def _measure(self):
measure = 1
for s in self.sets:
measure *= s.measure
return measure
def __len__(self):
return reduce(lambda a, b: a*b, (len(s) for s in self.args))
def __bool__(self):
return all([bool(s) for s in self.sets])
__nonzero__ = __bool__
class Interval(Set, EvalfMixin):
"""
Represents a real interval as a Set.
Usage:
Returns an interval with end points "start" and "end".
For left_open=True (default left_open is False) the interval
will be open on the left. Similarly, for right_open=True the interval
will be open on the right.
Examples
========
>>> from sympy import Symbol, Interval
>>> Interval(0, 1)
Interval(0, 1)
>>> Interval.Ropen(0, 1)
Interval.Ropen(0, 1)
>>> Interval.Ropen(0, 1)
Interval.Ropen(0, 1)
>>> Interval.Lopen(0, 1)
Interval.Lopen(0, 1)
>>> Interval.open(0, 1)
Interval.open(0, 1)
>>> a = Symbol('a', real=True)
>>> Interval(0, a)
Interval(0, a)
Notes
=====
- Only real end points are supported
- Interval(a, b) with a > b will return the empty set
- Use the evalf() method to turn an Interval into an mpmath
'mpi' interval instance
References
==========
.. [1] https://en.wikipedia.org/wiki/Interval_%28mathematics%29
"""
is_Interval = True
def __new__(cls, start, end, left_open=False, right_open=False):
start = _sympify(start)
end = _sympify(end)
left_open = _sympify(left_open)
right_open = _sympify(right_open)
if not all(isinstance(a, (type(true), type(false)))
for a in [left_open, right_open]):
raise NotImplementedError(
"left_open and right_open can have only true/false values, "
"got %s and %s" % (left_open, right_open))
# Only allow real intervals
if fuzzy_not(fuzzy_and(i.is_extended_real for i in (start, end, end-start))):
raise ValueError("Non-real intervals are not supported")
# evaluate if possible
if (end < start) == True:
return S.EmptySet
elif (end - start).is_negative:
return S.EmptySet
if end == start and (left_open or right_open):
return S.EmptySet
if end == start and not (left_open or right_open):
if start is S.Infinity or start is S.NegativeInfinity:
return S.EmptySet
return FiniteSet(end)
# Make sure infinite interval end points are open.
if start is S.NegativeInfinity:
left_open = true
if end is S.Infinity:
right_open = true
if start == S.Infinity or end == S.NegativeInfinity:
return S.EmptySet
return Basic.__new__(cls, start, end, left_open, right_open)
@property
def start(self):
"""
The left end point of 'self'.
This property takes the same value as the 'inf' property.
Examples
========
>>> from sympy import Interval
>>> Interval(0, 1).start
0
"""
return self._args[0]
_inf = left = start
@classmethod
def open(cls, a, b):
"""Return an interval including neither boundary."""
return cls(a, b, True, True)
@classmethod
def Lopen(cls, a, b):
"""Return an interval not including the left boundary."""
return cls(a, b, True, False)
@classmethod
def Ropen(cls, a, b):
"""Return an interval not including the right boundary."""
return cls(a, b, False, True)
@property
def end(self):
"""
The right end point of 'self'.
This property takes the same value as the 'sup' property.
Examples
========
>>> from sympy import Interval
>>> Interval(0, 1).end
1
"""
return self._args[1]
_sup = right = end
@property
def left_open(self):
"""
True if 'self' is left-open.
Examples
========
>>> from sympy import Interval
>>> Interval(0, 1, left_open=True).left_open
True
>>> Interval(0, 1, left_open=False).left_open
False
"""
return self._args[2]
@property
def right_open(self):
"""
True if 'self' is right-open.
Examples
========
>>> from sympy import Interval
>>> Interval(0, 1, right_open=True).right_open
True
>>> Interval(0, 1, right_open=False).right_open
False
"""
return self._args[3]
@property
def is_empty(self):
if self.left_open or self.right_open:
cond = self.start >= self.end # One/both bounds open
else:
cond = self.start > self.end # Both bounds closed
return fuzzy_bool(cond)
@property
def is_finite_set(self):
return self.measure.is_zero
def _complement(self, other):
if other == S.Reals:
a = Interval(S.NegativeInfinity, self.start,
True, not self.left_open)
b = Interval(self.end, S.Infinity, not self.right_open, True)
return Union(a, b)
if isinstance(other, FiniteSet):
nums = [m for m in other.args if m.is_number]
if nums == []:
return None
return Set._complement(self, other)
@property
def _boundary(self):
finite_points = [p for p in (self.start, self.end)
if abs(p) != S.Infinity]
return FiniteSet(*finite_points)
def _contains(self, other):
if (not isinstance(other, Expr) or other is S.NaN
or other.is_real is False):
return false
if self.start is S.NegativeInfinity and self.end is S.Infinity:
if other.is_real is not None:
return other.is_real
d = Dummy()
return self.as_relational(d).subs(d, other)
def as_relational(self, x):
"""Rewrite an interval in terms of inequalities and logic operators."""
x = sympify(x)
if self.right_open:
right = x < self.end
else:
right = x <= self.end
if self.left_open:
left = self.start < x
else:
left = self.start <= x
return And(left, right)
@property
def _measure(self):
return self.end - self.start
def to_mpi(self, prec=53):
return mpi(mpf(self.start._eval_evalf(prec)),
mpf(self.end._eval_evalf(prec)))
def _eval_evalf(self, prec):
return Interval(self.left._evalf(prec), self.right._evalf(prec),
left_open=self.left_open, right_open=self.right_open)
def _is_comparable(self, other):
is_comparable = self.start.is_comparable
is_comparable &= self.end.is_comparable
is_comparable &= other.start.is_comparable
is_comparable &= other.end.is_comparable
return is_comparable
@property
def is_left_unbounded(self):
"""Return ``True`` if the left endpoint is negative infinity. """
return self.left is S.NegativeInfinity or self.left == Float("-inf")
@property
def is_right_unbounded(self):
"""Return ``True`` if the right endpoint is positive infinity. """
return self.right is S.Infinity or self.right == Float("+inf")
def _eval_Eq(self, other):
if not isinstance(other, Interval):
if isinstance(other, FiniteSet):
return false
elif isinstance(other, Set):
return None
return false
return And(Eq(self.left, other.left),
Eq(self.right, other.right),
self.left_open == other.left_open,
self.right_open == other.right_open)
class Union(Set, LatticeOp, EvalfMixin):
"""
Represents a union of sets as a :class:`Set`.
Examples
========
>>> from sympy import Union, Interval
>>> Union(Interval(1, 2), Interval(3, 4))
Union(Interval(1, 2), Interval(3, 4))
The Union constructor will always try to merge overlapping intervals,
if possible. For example:
>>> Union(Interval(1, 2), Interval(2, 3))
Interval(1, 3)
See Also
========
Intersection
References
==========
.. [1] https://en.wikipedia.org/wiki/Union_%28set_theory%29
"""
is_Union = True
@property
def identity(self):
return S.EmptySet
@property
def zero(self):
return S.UniversalSet
def __new__(cls, *args, **kwargs):
evaluate = kwargs.get('evaluate', global_parameters.evaluate)
# flatten inputs to merge intersections and iterables
args = _sympify(args)
# Reduce sets using known rules
if evaluate:
args = list(cls._new_args_filter(args))
return simplify_union(args)
args = list(ordered(args, Set._infimum_key))
obj = Basic.__new__(cls, *args)
obj._argset = frozenset(args)
return obj
@property
def args(self):
return self._args
def _complement(self, universe):
# DeMorgan's Law
return Intersection(s.complement(universe) for s in self.args)
@property
def _inf(self):
# We use Min so that sup is meaningful in combination with symbolic
# interval end points.
from sympy.functions.elementary.miscellaneous import Min
return Min(*[set.inf for set in self.args])
@property
def _sup(self):
# We use Max so that sup is meaningful in combination with symbolic
# end points.
from sympy.functions.elementary.miscellaneous import Max
return Max(*[set.sup for set in self.args])
@property
def is_empty(self):
return fuzzy_and(set.is_empty for set in self.args)
@property
def is_finite_set(self):
return fuzzy_and(set.is_finite_set for set in self.args)
@property
def _measure(self):
# Measure of a union is the sum of the measures of the sets minus
# the sum of their pairwise intersections plus the sum of their
# triple-wise intersections minus ... etc...
# Sets is a collection of intersections and a set of elementary
# sets which made up those intersections (called "sos" for set of sets)
# An example element might of this list might be:
# ( {A,B,C}, A.intersect(B).intersect(C) )
# Start with just elementary sets ( ({A}, A), ({B}, B), ... )
# Then get and subtract ( ({A,B}, (A int B), ... ) while non-zero
sets = [(FiniteSet(s), s) for s in self.args]
measure = 0
parity = 1
while sets:
# Add up the measure of these sets and add or subtract it to total
measure += parity * sum(inter.measure for sos, inter in sets)
# For each intersection in sets, compute the intersection with every
# other set not already part of the intersection.
sets = ((sos + FiniteSet(newset), newset.intersect(intersection))
for sos, intersection in sets for newset in self.args
if newset not in sos)
# Clear out sets with no measure
sets = [(sos, inter) for sos, inter in sets if inter.measure != 0]
# Clear out duplicates
sos_list = []
sets_list = []
for set in sets:
if set[0] in sos_list:
continue
else:
sos_list.append(set[0])
sets_list.append(set)
sets = sets_list
# Flip Parity - next time subtract/add if we added/subtracted here
parity *= -1
return measure
@property
def _boundary(self):
def boundary_of_set(i):
""" The boundary of set i minus interior of all other sets """
b = self.args[i].boundary
for j, a in enumerate(self.args):
if j != i:
b = b - a.interior
return b
return Union(*map(boundary_of_set, range(len(self.args))))
def _contains(self, other):
return Or(*[s.contains(other) for s in self.args])
def is_subset(self, other):
return fuzzy_and(s.is_subset(other) for s in self.args)
def as_relational(self, symbol):
"""Rewrite a Union in terms of equalities and logic operators. """
if all(isinstance(i, (FiniteSet, Interval)) for i in self.args):
if len(self.args) == 2:
a, b = self.args
if (a.sup == b.inf and a.inf is S.NegativeInfinity
and b.sup is S.Infinity):
return And(Ne(symbol, a.sup), symbol < b.sup, symbol > a.inf)
return Or(*[set.as_relational(symbol) for set in self.args])
raise NotImplementedError('relational of Union with non-Intervals')
@property
def is_iterable(self):
return all(arg.is_iterable for arg in self.args)
def _eval_evalf(self, prec):
try:
return Union(*(set._eval_evalf(prec) for set in self.args))
except (TypeError, ValueError, NotImplementedError):
import sys
raise (TypeError("Not all sets are evalf-able"),
None,
sys.exc_info()[2])
def __iter__(self):
return roundrobin(*(iter(arg) for arg in self.args))
class Intersection(Set, LatticeOp):
"""
Represents an intersection of sets as a :class:`Set`.
Examples
========
>>> from sympy import Intersection, Interval
>>> Intersection(Interval(1, 3), Interval(2, 4))
Interval(2, 3)
We often use the .intersect method
>>> Interval(1,3).intersect(Interval(2,4))
Interval(2, 3)
See Also
========
Union
References
==========
.. [1] https://en.wikipedia.org/wiki/Intersection_%28set_theory%29
"""
is_Intersection = True
@property
def identity(self):
return S.UniversalSet
@property
def zero(self):
return S.EmptySet
def __new__(cls, *args, **kwargs):
evaluate = kwargs.get('evaluate', global_parameters.evaluate)
# flatten inputs to merge intersections and iterables
args = list(ordered(set(_sympify(args))))
# Reduce sets using known rules
if evaluate:
args = list(cls._new_args_filter(args))
return simplify_intersection(args)
args = list(ordered(args, Set._infimum_key))
obj = Basic.__new__(cls, *args)
obj._argset = frozenset(args)
return obj
@property
def args(self):
return self._args
@property
def is_iterable(self):
return any(arg.is_iterable for arg in self.args)
@property
def is_finite_set(self):
if fuzzy_or(arg.is_finite_set for arg in self.args):
return True
@property
def _inf(self):
raise NotImplementedError()
@property
def _sup(self):
raise NotImplementedError()
def _contains(self, other):
return And(*[set.contains(other) for set in self.args])
def __iter__(self):
sets_sift = sift(self.args, lambda x: x.is_iterable)
completed = False
candidates = sets_sift[True] + sets_sift[None]
finite_candidates, others = [], []
for candidate in candidates:
length = None
try:
length = len(candidate)
except TypeError:
others.append(candidate)
if length is not None:
finite_candidates.append(candidate)
finite_candidates.sort(key=len)
for s in finite_candidates + others:
other_sets = set(self.args) - set((s,))
other = Intersection(*other_sets, evaluate=False)
completed = True
for x in s:
try:
if x in other:
yield x
except TypeError:
completed = False
if completed:
return
if not completed:
if not candidates:
raise TypeError("None of the constituent sets are iterable")
raise TypeError(
"The computation had not completed because of the "
"undecidable set membership is found in every candidates.")
@staticmethod
def _handle_finite_sets(args):
'''Simplify intersection of one or more FiniteSets and other sets'''
# First separate the FiniteSets from the others
fs_args, others = sift(args, lambda x: x.is_FiniteSet, binary=True)
# Let the caller handle intersection of non-FiniteSets
if not fs_args:
return
# Convert to Python sets and build the set of all elements
fs_sets = [set(fs) for fs in fs_args]
all_elements = reduce(lambda a, b: a | b, fs_sets, set())
# Extract elements that are definitely in or definitely not in the
# intersection. Here we check contains for all of args.
definite = set()
for e in all_elements:
inall = fuzzy_and(s.contains(e) for s in args)
if inall is True:
definite.add(e)
if inall is not None:
for s in fs_sets:
s.discard(e)
# At this point all elements in all of fs_sets are possibly in the
# intersection. In some cases this is because they are definitely in
# the intersection of the finite sets but it's not clear if they are
# members of others. We might have {m, n}, {m}, and Reals where we
# don't know if m or n is real. We want to remove n here but it is
# possibly in because it might be equal to m. So what we do now is
# extract the elements that are definitely in the remaining finite
# sets iteratively until we end up with {n}, {}. At that point if we
# get any empty set all remaining elements are discarded.
fs_elements = reduce(lambda a, b: a | b, fs_sets, set())
# Need fuzzy containment testing
fs_symsets = [FiniteSet(*s) for s in fs_sets]
while fs_elements:
for e in fs_elements:
infs = fuzzy_and(s.contains(e) for s in fs_symsets)
if infs is True:
definite.add(e)
if infs is not None:
for n, s in enumerate(fs_sets):
# Update Python set and FiniteSet
if e in s:
s.remove(e)
fs_symsets[n] = FiniteSet(*s)
fs_elements.remove(e)
break
# If we completed the for loop without removing anything we are
# done so quit the outer while loop
else:
break
# If any of the sets of remainder elements is empty then we discard
# all of them for the intersection.
if not all(fs_sets):
fs_sets = [set()]
# Here we fold back the definitely included elements into each fs.
# Since they are definitely included they must have been members of
# each FiniteSet to begin with. We could instead fold these in with a
# Union at the end to get e.g. {3}|({x}&{y}) rather than {3,x}&{3,y}.
if definite:
fs_sets = [fs | definite for fs in fs_sets]
if fs_sets == [set()]:
return S.EmptySet
sets = [FiniteSet(*s) for s in fs_sets]
# Any set in others is redundant if it contains all the elements that
# are in the finite sets so we don't need it in the Intersection
all_elements = reduce(lambda a, b: a | b, fs_sets, set())
is_redundant = lambda o: all(fuzzy_bool(o.contains(e)) for e in all_elements)
others = [o for o in others if not is_redundant(o)]
if others:
rest = Intersection(*others)
# XXX: Maybe this shortcut should be at the beginning. For large
# FiniteSets it could much more efficient to process the other
# sets first...
if rest is S.EmptySet:
return S.EmptySet
# Flatten the Intersection
if rest.is_Intersection:
sets.extend(rest.args)
else:
sets.append(rest)
if len(sets) == 1:
return sets[0]
else:
return Intersection(*sets, evaluate=False)
def as_relational(self, symbol):
"""Rewrite an Intersection in terms of equalities and logic operators"""
return And(*[set.as_relational(symbol) for set in self.args])
class Complement(Set, EvalfMixin):
r"""Represents the set difference or relative complement of a set with
another set.
`A - B = \{x \in A \mid x \notin B\}`
Examples
========
>>> from sympy import Complement, FiniteSet
>>> Complement(FiniteSet(0, 1, 2), FiniteSet(1))
FiniteSet(0, 2)
See Also
=========
Intersection, Union
References
==========
.. [1] http://mathworld.wolfram.com/ComplementSet.html
"""
is_Complement = True
def __new__(cls, a, b, evaluate=True):
if evaluate:
return Complement.reduce(a, b)
return Basic.__new__(cls, a, b)
@staticmethod
def reduce(A, B):
"""
Simplify a :class:`Complement`.
"""
if B == S.UniversalSet or A.is_subset(B):
return S.EmptySet
if isinstance(B, Union):
return Intersection(*(s.complement(A) for s in B.args))
result = B._complement(A)
if result is not None:
return result
else:
return Complement(A, B, evaluate=False)
def _contains(self, other):
A = self.args[0]
B = self.args[1]
return And(A.contains(other), Not(B.contains(other)))
def as_relational(self, symbol):
"""Rewrite a complement in terms of equalities and logic
operators"""
A, B = self.args
A_rel = A.as_relational(symbol)
B_rel = Not(B.as_relational(symbol))
return And(A_rel, B_rel)
@property
def is_iterable(self):
if self.args[0].is_iterable:
return True
@property
def is_finite_set(self):
A, B = self.args
a_finite = A.is_finite_set
if a_finite is True:
return True
elif a_finite is False and B.is_finite_set:
return False
def __iter__(self):
A, B = self.args
for a in A:
if a not in B:
yield a
else:
continue
class EmptySet(Set, metaclass=Singleton):
"""
Represents the empty set. The empty set is available as a singleton
as S.EmptySet.
Examples
========
>>> from sympy import S, Interval
>>> S.EmptySet
EmptySet
>>> Interval(1, 2).intersect(S.EmptySet)
EmptySet
See Also
========
UniversalSet
References
==========
.. [1] https://en.wikipedia.org/wiki/Empty_set
"""
is_empty = True
is_finite_set = True
is_FiniteSet = True
@property # type: ignore
@deprecated(useinstead="is S.EmptySet or is_empty",
issue=16946, deprecated_since_version="1.5")
def is_EmptySet(self):
return True
@property
def _measure(self):
return 0
def _contains(self, other):
return false
def as_relational(self, symbol):
return false
def __len__(self):
return 0
def __iter__(self):
return iter([])
def _eval_powerset(self):
return FiniteSet(self)
@property
def _boundary(self):
return self
def _complement(self, other):
return other
def _symmetric_difference(self, other):
return other
class UniversalSet(Set, metaclass=Singleton):
"""
Represents the set of all things.
The universal set is available as a singleton as S.UniversalSet
Examples
========
>>> from sympy import S, Interval
>>> S.UniversalSet
UniversalSet
>>> Interval(1, 2).intersect(S.UniversalSet)
Interval(1, 2)
See Also
========
EmptySet
References
==========
.. [1] https://en.wikipedia.org/wiki/Universal_set
"""
is_UniversalSet = True
is_empty = False
is_finite_set = False
def _complement(self, other):
return S.EmptySet
def _symmetric_difference(self, other):
return other
@property
def _measure(self):
return S.Infinity
def _contains(self, other):
return true
def as_relational(self, symbol):
return true
@property
def _boundary(self):
return S.EmptySet
class FiniteSet(Set, EvalfMixin):
"""
Represents a finite set of discrete numbers
Examples
========
>>> from sympy import FiniteSet
>>> FiniteSet(1, 2, 3, 4)
FiniteSet(1, 2, 3, 4)
>>> 3 in FiniteSet(1, 2, 3, 4)
True
>>> members = [1, 2, 3, 4]
>>> f = FiniteSet(*members)
>>> f
FiniteSet(1, 2, 3, 4)
>>> f - FiniteSet(2)
FiniteSet(1, 3, 4)
>>> f + FiniteSet(2, 5)
FiniteSet(1, 2, 3, 4, 5)
References
==========
.. [1] https://en.wikipedia.org/wiki/Finite_set
"""
is_FiniteSet = True
is_iterable = True
is_empty = False
is_finite_set = True
def __new__(cls, *args, **kwargs):
evaluate = kwargs.get('evaluate', global_parameters.evaluate)
if evaluate:
args = list(map(sympify, args))
if len(args) == 0:
return S.EmptySet
else:
args = list(map(sympify, args))
# keep the form of the first canonical arg
dargs = {}
for i in reversed(list(ordered(args))):
if i.is_Symbol:
dargs[i] = i
else:
try:
dargs[i.as_dummy()] = i
except TypeError:
# e.g. i = class without args like `Interval`
dargs[i] = i
_args_set = set(dargs.values())
args = list(ordered(_args_set, Set._infimum_key))
obj = Basic.__new__(cls, *args)
obj._args_set = _args_set
return obj
def _eval_Eq(self, other):
if not isinstance(other, FiniteSet):
# XXX: If Interval(x, x, evaluate=False) worked then the line
# below would mean that
# FiniteSet(x) & Interval(x, x, evaluate=False) -> false
if isinstance(other, Interval):
return false
elif isinstance(other, Set):
return None
return false
def all_in_both():
s_set = set(self.args)
o_set = set(other.args)
yield fuzzy_and(self._contains(e) for e in o_set - s_set)
yield fuzzy_and(other._contains(e) for e in s_set - o_set)
return tfn[fuzzy_and(all_in_both())]
def __iter__(self):
return iter(self.args)
def _complement(self, other):
if isinstance(other, Interval):
# Splitting in sub-intervals is only done for S.Reals;
# other cases that need splitting will first pass through
# Set._complement().
nums, syms = [], []
for m in self.args:
if m.is_number and m.is_real:
nums.append(m)
elif m.is_real == False:
pass # drop non-reals
else:
syms.append(m) # various symbolic expressions
if other == S.Reals and nums != []:
nums.sort()
intervals = [] # Build up a list of intervals between the elements
intervals += [Interval(S.NegativeInfinity, nums[0], True, True)]
for a, b in zip(nums[:-1], nums[1:]):
intervals.append(Interval(a, b, True, True)) # both open
intervals.append(Interval(nums[-1], S.Infinity, True, True))
if syms != []:
return Complement(Union(*intervals, evaluate=False),
FiniteSet(*syms), evaluate=False)
else:
return Union(*intervals, evaluate=False)
elif nums == []: # no splitting necessary or possible:
if syms:
return Complement(other, FiniteSet(*syms), evaluate=False)
else:
return other
elif isinstance(other, FiniteSet):
unk = []
for i in self:
c = sympify(other.contains(i))
if c is not S.true and c is not S.false:
unk.append(i)
unk = FiniteSet(*unk)
if unk == self:
return
not_true = []
for i in other:
c = sympify(self.contains(i))
if c is not S.true:
not_true.append(i)
return Complement(FiniteSet(*not_true), unk)
return Set._complement(self, other)
def _contains(self, other):
"""
Tests whether an element, other, is in the set.
The actual test is for mathematical equality (as opposed to
syntactical equality). In the worst case all elements of the
set must be checked.
Examples
========
>>> from sympy import FiniteSet
>>> 1 in FiniteSet(1, 2)
True
>>> 5 in FiniteSet(1, 2)
False
"""
if other in self._args_set:
return True
else:
# evaluate=True is needed to override evaluate=False context;
# we need Eq to do the evaluation
return fuzzy_or(fuzzy_bool(Eq(e, other, evaluate=True))
for e in self.args)
def _eval_is_subset(self, other):
return fuzzy_and(other._contains(e) for e in self.args)
@property
def _boundary(self):
return self
@property
def _inf(self):
from sympy.functions.elementary.miscellaneous import Min
return Min(*self)
@property
def _sup(self):
from sympy.functions.elementary.miscellaneous import Max
return Max(*self)
@property
def measure(self):
return 0
def __len__(self):
return len(self.args)
def as_relational(self, symbol):
"""Rewrite a FiniteSet in terms of equalities and logic operators. """
from sympy.core.relational import Eq
return Or(*[Eq(symbol, elem) for elem in self])
def compare(self, other):
return (hash(self) - hash(other))
def _eval_evalf(self, prec):
return FiniteSet(*[elem._evalf(prec) for elem in self])
@property
def _sorted_args(self):
return self.args
def _eval_powerset(self):
return self.func(*[self.func(*s) for s in subsets(self.args)])
def _eval_rewrite_as_PowerSet(self, *args, **kwargs):
"""Rewriting method for a finite set to a power set."""
from .powerset import PowerSet
is2pow = lambda n: bool(n and not n & (n - 1))
if not is2pow(len(self)):
return None
fs_test = lambda arg: isinstance(arg, Set) and arg.is_FiniteSet
if not all((fs_test(arg) for arg in args)):
return None
biggest = max(args, key=len)
for arg in subsets(biggest.args):
arg_set = FiniteSet(*arg)
if arg_set not in args:
return None
return PowerSet(biggest)
def __ge__(self, other):
if not isinstance(other, Set):
raise TypeError("Invalid comparison of set with %s" % func_name(other))
return other.is_subset(self)
def __gt__(self, other):
if not isinstance(other, Set):
raise TypeError("Invalid comparison of set with %s" % func_name(other))
return self.is_proper_superset(other)
def __le__(self, other):
if not isinstance(other, Set):
raise TypeError("Invalid comparison of set with %s" % func_name(other))
return self.is_subset(other)
def __lt__(self, other):
if not isinstance(other, Set):
raise TypeError("Invalid comparison of set with %s" % func_name(other))
return self.is_proper_subset(other)
converter[set] = lambda x: FiniteSet(*x)
converter[frozenset] = lambda x: FiniteSet(*x)
class SymmetricDifference(Set):
"""Represents the set of elements which are in either of the
sets and not in their intersection.
Examples
========
>>> from sympy import SymmetricDifference, FiniteSet
>>> SymmetricDifference(FiniteSet(1, 2, 3), FiniteSet(3, 4, 5))
FiniteSet(1, 2, 4, 5)
See Also
========
Complement, Union
References
==========
.. [1] https://en.wikipedia.org/wiki/Symmetric_difference
"""
is_SymmetricDifference = True
def __new__(cls, a, b, evaluate=True):
if evaluate:
return SymmetricDifference.reduce(a, b)
return Basic.__new__(cls, a, b)
@staticmethod
def reduce(A, B):
result = B._symmetric_difference(A)
if result is not None:
return result
else:
return SymmetricDifference(A, B, evaluate=False)
def as_relational(self, symbol):
"""Rewrite a symmetric_difference in terms of equalities and
logic operators"""
A, B = self.args
A_rel = A.as_relational(symbol)
B_rel = B.as_relational(symbol)
return Xor(A_rel, B_rel)
@property
def is_iterable(self):
if all(arg.is_iterable for arg in self.args):
return True
def __iter__(self):
args = self.args
union = roundrobin(*(iter(arg) for arg in args))
for item in union:
count = 0
for s in args:
if item in s:
count += 1
if count % 2 == 1:
yield item
class DisjointUnion(Set):
""" Represents the disjoint union (also known as the external disjoint union)
of a finite number of sets.
Examples
========
>>> from sympy import DisjointUnion, FiniteSet, Interval, Union, Symbol
>>> A = FiniteSet(1, 2, 3)
>>> B = Interval(0, 5)
>>> DisjointUnion(A, B)
DisjointUnion(FiniteSet(1, 2, 3), Interval(0, 5))
>>> DisjointUnion(A, B).rewrite(Union)
Union(ProductSet(FiniteSet(1, 2, 3), FiniteSet(0)), ProductSet(Interval(0, 5), FiniteSet(1)))
>>> C = FiniteSet(Symbol('x'), Symbol('y'), Symbol('z'))
>>> DisjointUnion(C, C)
DisjointUnion(FiniteSet(x, y, z), FiniteSet(x, y, z))
>>> DisjointUnion(C, C).rewrite(Union)
ProductSet(FiniteSet(x, y, z), FiniteSet(0, 1))
References
==========
https://en.wikipedia.org/wiki/Disjoint_union
"""
def __new__(cls, *sets):
dj_collection = []
for set_i in sets:
if isinstance(set_i, Set):
dj_collection.append(set_i)
else:
raise TypeError("Invalid input: '%s', input args \
to DisjointUnion must be Sets" % set_i)
obj = Basic.__new__(cls, *dj_collection)
return obj
@property
def sets(self):
return self.args
@property
def is_empty(self):
return fuzzy_and(s.is_empty for s in self.sets)
@property
def is_finite_set(self):
all_finite = fuzzy_and(s.is_finite_set for s in self.sets)
return fuzzy_or([self.is_empty, all_finite])
@property
def is_iterable(self):
if self.is_empty:
return False
iter_flag = True
for set_i in self.sets:
if not set_i.is_empty:
iter_flag = iter_flag and set_i.is_iterable
return iter_flag
def _eval_rewrite_as_Union(self, *sets):
"""
Rewrites the disjoint union as the union of (``set`` x {``i``})
where ``set`` is the element in ``sets`` at index = ``i``
"""
dj_union = EmptySet()
index = 0
for set_i in sets:
if isinstance(set_i, Set):
cross = ProductSet(set_i, FiniteSet(index))
dj_union = Union(dj_union, cross)
index = index + 1
return dj_union
def _contains(self, element):
"""
'in' operator for DisjointUnion
Examples
========
>>> from sympy import Interval, DisjointUnion
>>> D = DisjointUnion(Interval(0, 1), Interval(0, 2))
>>> (0.5, 0) in D
True
>>> (0.5, 1) in D
True
>>> (1.5, 0) in D
False
>>> (1.5, 1) in D
True
Passes operation on to constituent sets
"""
if not isinstance(element, Tuple) or len(element) != 2:
return False
if not element[1].is_Integer:
return False
if element[1] >= len(self.sets) or element[1] < 0:
return False
return element[0] in self.sets[element[1]]
def __iter__(self):
if self.is_iterable:
from sympy.core.numbers import Integer
iters = []
for i, s in enumerate(self.sets):
iters.append(iproduct(s, {Integer(i)}))
return iter(roundrobin(*iters))
else:
raise ValueError("'%s' is not iterable." % self)
def __len__(self):
"""
Returns the length of the disjoint union, i.e., the number of elements in the set.
Examples
========
>>> from sympy import FiniteSet, DisjointUnion, EmptySet
>>> D1 = DisjointUnion(FiniteSet(1, 2, 3, 4), EmptySet, FiniteSet(3, 4, 5))
>>> len(D1)
7
>>> D2 = DisjointUnion(FiniteSet(3, 5, 7), EmptySet, FiniteSet(3, 5, 7))
>>> len(D2)
6
>>> D3 = DisjointUnion(EmptySet, EmptySet)
>>> len(D3)
0
Adds up the lengths of the constituent sets.
"""
if self.is_finite_set:
size = 0
for set in self.sets:
size += len(set)
return size
else:
raise ValueError("'%s' is not a finite set." % self)
def imageset(*args):
r"""
Return an image of the set under transformation ``f``.
If this function can't compute the image, it returns an
unevaluated ImageSet object.
.. math::
\{ f(x) \mid x \in \mathrm{self} \}
Examples
========
>>> from sympy import S, Interval, imageset, sin, Lambda
>>> from sympy.abc import x
>>> imageset(x, 2*x, Interval(0, 2))
Interval(0, 4)
>>> imageset(lambda x: 2*x, Interval(0, 2))
Interval(0, 4)
>>> imageset(Lambda(x, sin(x)), Interval(-2, 1))
ImageSet(Lambda(x, sin(x)), Interval(-2, 1))
>>> imageset(sin, Interval(-2, 1))
ImageSet(Lambda(x, sin(x)), Interval(-2, 1))
>>> imageset(lambda y: x + y, Interval(-2, 1))
ImageSet(Lambda(y, x + y), Interval(-2, 1))
Expressions applied to the set of Integers are simplified
to show as few negatives as possible and linear expressions
are converted to a canonical form. If this is not desirable
then the unevaluated ImageSet should be used.
>>> imageset(x, -2*x + 5, S.Integers)
ImageSet(Lambda(x, 2*x + 1), Integers)
See Also
========
sympy.sets.fancysets.ImageSet
"""
from sympy.core import Lambda
from sympy.sets.fancysets import ImageSet
from sympy.sets.setexpr import set_function
if len(args) < 2:
raise ValueError('imageset expects at least 2 args, got: %s' % len(args))
if isinstance(args[0], (Symbol, tuple)) and len(args) > 2:
f = Lambda(args[0], args[1])
set_list = args[2:]
else:
f = args[0]
set_list = args[1:]
if isinstance(f, Lambda):
pass
elif callable(f):
nargs = getattr(f, 'nargs', {})
if nargs:
if len(nargs) != 1:
raise NotImplementedError(filldedent('''
This function can take more than 1 arg
but the potentially complicated set input
has not been analyzed at this point to
know its dimensions. TODO
'''))
N = nargs.args[0]
if N == 1:
s = 'x'
else:
s = [Symbol('x%i' % i) for i in range(1, N + 1)]
else:
s = inspect.signature(f).parameters
dexpr = _sympify(f(*[Dummy() for i in s]))
var = tuple(uniquely_named_symbol(
Symbol(i), dexpr) for i in s)
f = Lambda(var, f(*var))
else:
raise TypeError(filldedent('''
expecting lambda, Lambda, or FunctionClass,
not \'%s\'.''' % func_name(f)))
if any(not isinstance(s, Set) for s in set_list):
name = [func_name(s) for s in set_list]
raise ValueError(
'arguments after mapping should be sets, not %s' % name)
if len(set_list) == 1:
set = set_list[0]
try:
# TypeError if arg count != set dimensions
r = set_function(f, set)
if r is None:
raise TypeError
if not r:
return r
except TypeError:
r = ImageSet(f, set)
if isinstance(r, ImageSet):
f, set = r.args
if f.variables[0] == f.expr:
return set
if isinstance(set, ImageSet):
# XXX: Maybe this should just be:
# f2 = set.lambda
# fun = Lambda(f2.signature, f(*f2.expr))
# return imageset(fun, *set.base_sets)
if len(set.lamda.variables) == 1 and len(f.variables) == 1:
x = set.lamda.variables[0]
y = f.variables[0]
return imageset(
Lambda(x, f.expr.subs(y, set.lamda.expr)), *set.base_sets)
if r is not None:
return r
return ImageSet(f, *set_list)
def is_function_invertible_in_set(func, setv):
"""
Checks whether function ``func`` is invertible when the domain is
restricted to set ``setv``.
"""
from sympy import exp, log
# Functions known to always be invertible:
if func in (exp, log):
return True
u = Dummy("u")
fdiff = func(u).diff(u)
# monotonous functions:
# TODO: check subsets (`func` in `setv`)
if (fdiff > 0) == True or (fdiff < 0) == True:
return True
# TODO: support more
return None
def simplify_union(args):
"""
Simplify a :class:`Union` using known rules
We first start with global rules like 'Merge all FiniteSets'
Then we iterate through all pairs and ask the constituent sets if they
can simplify themselves with any other constituent. This process depends
on ``union_sets(a, b)`` functions.
"""
from sympy.sets.handlers.union import union_sets
# ===== Global Rules =====
if not args:
return S.EmptySet
for arg in args:
if not isinstance(arg, Set):
raise TypeError("Input args to Union must be Sets")
# Merge all finite sets
finite_sets = [x for x in args if x.is_FiniteSet]
if len(finite_sets) > 1:
a = (x for set in finite_sets for x in set)
finite_set = FiniteSet(*a)
args = [finite_set] + [x for x in args if not x.is_FiniteSet]
# ===== Pair-wise Rules =====
# Here we depend on rules built into the constituent sets
args = set(args)
new_args = True
while new_args:
for s in args:
new_args = False
for t in args - set((s,)):
new_set = union_sets(s, t)
# This returns None if s does not know how to intersect
# with t. Returns the newly intersected set otherwise
if new_set is not None:
if not isinstance(new_set, set):
new_set = set((new_set, ))
new_args = (args - set((s, t))).union(new_set)
break
if new_args:
args = new_args
break
if len(args) == 1:
return args.pop()
else:
return Union(*args, evaluate=False)
def simplify_intersection(args):
"""
Simplify an intersection using known rules
We first start with global rules like
'if any empty sets return empty set' and 'distribute any unions'
Then we iterate through all pairs and ask the constituent sets if they
can simplify themselves with any other constituent
"""
# ===== Global Rules =====
if not args:
return S.UniversalSet
for arg in args:
if not isinstance(arg, Set):
raise TypeError("Input args to Union must be Sets")
# If any EmptySets return EmptySet
if S.EmptySet in args:
return S.EmptySet
# Handle Finite sets
rv = Intersection._handle_finite_sets(args)
if rv is not None:
return rv
# If any of the sets are unions, return a Union of Intersections
for s in args:
if s.is_Union:
other_sets = set(args) - set((s,))
if len(other_sets) > 0:
other = Intersection(*other_sets)
return Union(*(Intersection(arg, other) for arg in s.args))
else:
return Union(*[arg for arg in s.args])
for s in args:
if s.is_Complement:
args.remove(s)
other_sets = args + [s.args[0]]
return Complement(Intersection(*other_sets), s.args[1])
from sympy.sets.handlers.intersection import intersection_sets
# At this stage we are guaranteed not to have any
# EmptySets, FiniteSets, or Unions in the intersection
# ===== Pair-wise Rules =====
# Here we depend on rules built into the constituent sets
args = set(args)
new_args = True
while new_args:
for s in args:
new_args = False
for t in args - set((s,)):
new_set = intersection_sets(s, t)
# This returns None if s does not know how to intersect
# with t. Returns the newly intersected set otherwise
if new_set is not None:
new_args = (args - set((s, t))).union(set((new_set, )))
break
if new_args:
args = new_args
break
if len(args) == 1:
return args.pop()
else:
return Intersection(*args, evaluate=False)
def _handle_finite_sets(op, x, y, commutative):
# Handle finite sets:
fs_args, other = sift([x, y], lambda x: isinstance(x, FiniteSet), binary=True)
if len(fs_args) == 2:
return FiniteSet(*[op(i, j) for i in fs_args[0] for j in fs_args[1]])
elif len(fs_args) == 1:
sets = [_apply_operation(op, other[0], i, commutative) for i in fs_args[0]]
return Union(*sets)
else:
return None
def _apply_operation(op, x, y, commutative):
from sympy.sets import ImageSet
from sympy import symbols,Lambda
d = Dummy('d')
out = _handle_finite_sets(op, x, y, commutative)
if out is None:
out = op(x, y)
if out is None and commutative:
out = op(y, x)
if out is None:
_x, _y = symbols("x y")
if isinstance(x, Set) and not isinstance(y, Set):
out = ImageSet(Lambda(d, op(d, y)), x).doit()
elif not isinstance(x, Set) and isinstance(y, Set):
out = ImageSet(Lambda(d, op(x, d)), y).doit()
else:
out = ImageSet(Lambda((_x, _y), op(_x, _y)), x, y)
return out
def set_add(x, y):
from sympy.sets.handlers.add import _set_add
return _apply_operation(_set_add, x, y, commutative=True)
def set_sub(x, y):
from sympy.sets.handlers.add import _set_sub
return _apply_operation(_set_sub, x, y, commutative=False)
def set_mul(x, y):
from sympy.sets.handlers.mul import _set_mul
return _apply_operation(_set_mul, x, y, commutative=True)
def set_div(x, y):
from sympy.sets.handlers.mul import _set_div
return _apply_operation(_set_div, x, y, commutative=False)
def set_pow(x, y):
from sympy.sets.handlers.power import _set_pow
return _apply_operation(_set_pow, x, y, commutative=False)
def set_function(f, x):
from sympy.sets.handlers.functions import _set_function
return _set_function(f, x)
|
f62131685f8ad8509f49a8b258aa0d33784c54266649f32b2b6cb73ee6c9aa06
|
from __future__ import print_function, division
from sympy import S
from sympy.core.basic import Basic
from sympy.core.containers import Tuple
from sympy.core.function import Lambda
from sympy.core.logic import fuzzy_bool
from sympy.core.relational import Eq
from sympy.core.symbol import Dummy
from sympy.core.sympify import _sympify
from sympy.logic.boolalg import And, as_Boolean
from sympy.utilities.iterables import sift
from sympy.utilities.exceptions import SymPyDeprecationWarning
from .contains import Contains
from .sets import Set, EmptySet, Union, FiniteSet
adummy = Dummy('conditionset')
class ConditionSet(Set):
"""
Set of elements which satisfies a given condition.
{x | condition(x) is True for x in S}
Examples
========
>>> from sympy import Symbol, S, ConditionSet, pi, Eq, sin, Interval
>>> from sympy.abc import x, y, z
>>> sin_sols = ConditionSet(x, Eq(sin(x), 0), Interval(0, 2*pi))
>>> 2*pi in sin_sols
True
>>> pi/2 in sin_sols
False
>>> 3*pi in sin_sols
False
>>> 5 in ConditionSet(x, x**2 > 4, S.Reals)
True
If the value is not in the base set, the result is false:
>>> 5 in ConditionSet(x, x**2 > 4, Interval(2, 4))
False
Notes
=====
Symbols with assumptions should be avoided or else the
condition may evaluate without consideration of the set:
>>> n = Symbol('n', negative=True)
>>> cond = (n > 0); cond
False
>>> ConditionSet(n, cond, S.Integers)
EmptySet
Only free symbols can be changed by using `subs`:
>>> c = ConditionSet(x, x < 1, {x, z})
>>> c.subs(x, y)
ConditionSet(x, x < 1, FiniteSet(y, z))
To check if ``pi`` is in ``c`` use:
>>> pi in c
False
If no base set is specified, the universal set is implied:
>>> ConditionSet(x, x < 1).base_set
UniversalSet
Only symbols or symbol-like expressions can be used:
>>> ConditionSet(x + 1, x + 1 < 1, S.Integers)
Traceback (most recent call last):
...
ValueError: non-symbol dummy not recognized in condition
When the base set is a ConditionSet, the symbols will be
unified if possible with preference for the outermost symbols:
>>> ConditionSet(x, x < y, ConditionSet(z, z + y < 2, S.Integers))
ConditionSet(x, (x < y) & (x + y < 2), Integers)
"""
def __new__(cls, sym, condition, base_set=S.UniversalSet):
from sympy.core.function import BadSignatureError
from sympy.utilities.iterables import flatten, has_dups
sym = _sympify(sym)
flat = flatten([sym])
if has_dups(flat):
raise BadSignatureError("Duplicate symbols detected")
base_set = _sympify(base_set)
if not isinstance(base_set, Set):
raise TypeError(
'base set should be a Set object, not %s' % base_set)
condition = _sympify(condition)
if isinstance(condition, FiniteSet):
condition_orig = condition
temp = (Eq(lhs, 0) for lhs in condition)
condition = And(*temp)
SymPyDeprecationWarning(
feature="Using {} for condition".format(condition_orig),
issue=17651,
deprecated_since_version='1.5',
useinstead="{} for condition".format(condition)
).warn()
condition = as_Boolean(condition)
if condition is S.true:
return base_set
if condition is S.false:
return S.EmptySet
if isinstance(base_set, EmptySet):
return base_set
# no simple answers, so now check syms
for i in flat:
if not getattr(i, '_diff_wrt', False):
raise ValueError('`%s` is not symbol-like' % i)
if base_set.contains(sym) is S.false:
raise TypeError('sym `%s` is not in base_set `%s`' % (sym, base_set))
know = None
if isinstance(base_set, FiniteSet):
sifted = sift(
base_set, lambda _: fuzzy_bool(condition.subs(sym, _)))
if sifted[None]:
know = FiniteSet(*sifted[True])
base_set = FiniteSet(*sifted[None])
else:
return FiniteSet(*sifted[True])
if isinstance(base_set, cls):
s, c, b = base_set.args
def sig(s):
return cls(s, Eq(adummy, 0)).as_dummy().sym
sa, sb = map(sig, (sym, s))
if sa != sb:
raise BadSignatureError('sym does not match sym of base set')
reps = dict(zip(flatten([sym]), flatten([s])))
if s == sym:
condition = And(condition, c)
base_set = b
elif not c.free_symbols & sym.free_symbols:
reps = {v: k for k, v in reps.items()}
condition = And(condition, c.xreplace(reps))
base_set = b
elif not condition.free_symbols & s.free_symbols:
sym = sym.xreplace(reps)
condition = And(condition.xreplace(reps), c)
base_set = b
rv = Basic.__new__(cls, sym, condition, base_set)
return rv if know is None else Union(know, rv)
sym = property(lambda self: self.args[0])
condition = property(lambda self: self.args[1])
base_set = property(lambda self: self.args[2])
@property
def free_symbols(self):
cond_syms = self.condition.free_symbols - self.sym.free_symbols
return cond_syms | self.base_set.free_symbols
@property
def bound_symbols(self):
from sympy.utilities.iterables import flatten
return flatten([self.sym])
def _contains(self, other):
def ok_sig(a, b):
tuples = [isinstance(i, Tuple) for i in (a, b)]
c = tuples.count(True)
if c == 1:
return False
if c == 0:
return True
return len(a) == len(b) and all(
ok_sig(i, j) for i, j in zip(a, b))
if not ok_sig(self.sym, other):
return S.false
try:
return And(
Contains(other, self.base_set),
Lambda((self.sym,), self.condition)(other))
except TypeError:
return Contains(other, self, evaluate=False)
def as_relational(self, other):
f = Lambda(self.sym, self.condition)
if isinstance(self.sym, Tuple):
f = f(*other)
else:
f = f(other)
return And(f, self.base_set.contains(other))
def _eval_subs(self, old, new):
sym, cond, base = self.args
dsym = sym.subs(old, adummy)
insym = dsym.has(adummy)
# prioritize changing a symbol in the base
newbase = base.subs(old, new)
if newbase != base:
if not insym:
cond = cond.subs(old, new)
return self.func(sym, cond, newbase)
if insym:
pass # no change of bound symbols via subs
elif getattr(new, '_diff_wrt', False):
cond = cond.subs(old, new)
else:
pass # let error about the symbol raise from __new__
return self.func(sym, cond, base)
|
54ef5b90fe5be45ecceb662859e22542ba5ae902acfe1ac857bae3c44e181631
|
from __future__ import unicode_literals
from sympy import (S, Symbol, Interval, exp, Or,
symbols, Eq, cos, And, Tuple, integrate, oo, sin, Sum, Basic, Indexed,
DiracDelta, Lambda, log, pi, FallingFactorial, Rational, Matrix)
from sympy.stats import (Die, Normal, Exponential, FiniteRV, P, E, H, variance,
density, given, independent, dependent, where, pspace, GaussianUnitaryEnsemble,
random_symbols, sample, Geometric, factorial_moment, Binomial, Hypergeometric,
DiscreteUniform, Poisson, characteristic_function, moment_generating_function,
BernoulliProcess, Variance, Expectation, Probability, Covariance, covariance)
from sympy.stats.rv import (IndependentProductPSpace, rs_swap, Density, NamedArgsMixin,
RandomSymbol, sample_iter, PSpace, is_random, RandomIndexedSymbol, RandomMatrixSymbol)
from sympy.testing.pytest import raises, skip, XFAIL, ignore_warnings
from sympy.external import import_module
from sympy.core.numbers import comp
from sympy.stats.frv_types import BernoulliDistribution
def test_where():
X, Y = Die('X'), Die('Y')
Z = Normal('Z', 0, 1)
assert where(Z**2 <= 1).set == Interval(-1, 1)
assert where(Z**2 <= 1).as_boolean() == Interval(-1, 1).as_relational(Z.symbol)
assert where(And(X > Y, Y > 4)).as_boolean() == And(
Eq(X.symbol, 6), Eq(Y.symbol, 5))
assert len(where(X < 3).set) == 2
assert 1 in where(X < 3).set
X, Y = Normal('X', 0, 1), Normal('Y', 0, 1)
assert where(And(X**2 <= 1, X >= 0)).set == Interval(0, 1)
XX = given(X, And(X**2 <= 1, X >= 0))
assert XX.pspace.domain.set == Interval(0, 1)
assert XX.pspace.domain.as_boolean() == \
And(0 <= X.symbol, X.symbol**2 <= 1, -oo < X.symbol, X.symbol < oo)
with raises(TypeError):
XX = given(X, X + 3)
def test_random_symbols():
X, Y = Normal('X', 0, 1), Normal('Y', 0, 1)
assert set(random_symbols(2*X + 1)) == set((X,))
assert set(random_symbols(2*X + Y)) == set((X, Y))
assert set(random_symbols(2*X + Y.symbol)) == set((X,))
assert set(random_symbols(2)) == set()
def test_characteristic_function():
# Imports I from sympy
from sympy import I
X = Normal('X',0,1)
Y = DiscreteUniform('Y', [1,2,7])
Z = Poisson('Z', 2)
t = symbols('_t')
P = Lambda(t, exp(-t**2/2))
Q = Lambda(t, exp(7*t*I)/3 + exp(2*t*I)/3 + exp(t*I)/3)
R = Lambda(t, exp(2 * exp(t*I) - 2))
assert characteristic_function(X).dummy_eq(P)
assert characteristic_function(Y).dummy_eq(Q)
assert characteristic_function(Z).dummy_eq(R)
def test_moment_generating_function():
X = Normal('X',0,1)
Y = DiscreteUniform('Y', [1,2,7])
Z = Poisson('Z', 2)
t = symbols('_t')
P = Lambda(t, exp(t**2/2))
Q = Lambda(t, (exp(7*t)/3 + exp(2*t)/3 + exp(t)/3))
R = Lambda(t, exp(2 * exp(t) - 2))
assert moment_generating_function(X).dummy_eq(P)
assert moment_generating_function(Y).dummy_eq(Q)
assert moment_generating_function(Z).dummy_eq(R)
def test_sample_iter():
X = Normal('X',0,1)
Y = DiscreteUniform('Y', [1, 2, 7])
Z = Poisson('Z', 2)
scipy = import_module('scipy')
if not scipy:
skip('Scipy is not installed. Abort tests')
expr = X**2 + 3
iterator = sample_iter(expr)
expr2 = Y**2 + 5*Y + 4
iterator2 = sample_iter(expr2)
expr3 = Z**3 + 4
iterator3 = sample_iter(expr3)
def is_iterator(obj):
if (
hasattr(obj, '__iter__') and
(hasattr(obj, 'next') or
hasattr(obj, '__next__')) and
callable(obj.__iter__) and
obj.__iter__() is obj
):
return True
else:
return False
assert is_iterator(iterator)
assert is_iterator(iterator2)
assert is_iterator(iterator3)
def test_pspace():
X, Y = Normal('X', 0, 1), Normal('Y', 0, 1)
x = Symbol('x')
raises(ValueError, lambda: pspace(5 + 3))
raises(ValueError, lambda: pspace(x < 1))
assert pspace(X) == X.pspace
assert pspace(2*X + 1) == X.pspace
assert pspace(2*X + Y) == IndependentProductPSpace(Y.pspace, X.pspace)
def test_rs_swap():
X = Normal('x', 0, 1)
Y = Exponential('y', 1)
XX = Normal('x', 0, 2)
YY = Normal('y', 0, 3)
expr = 2*X + Y
assert expr.subs(rs_swap((X, Y), (YY, XX))) == 2*XX + YY
def test_RandomSymbol():
X = Normal('x', 0, 1)
Y = Normal('x', 0, 2)
assert X.symbol == Y.symbol
assert X != Y
assert X.name == X.symbol.name
X = Normal('lambda', 0, 1) # make sure we can use protected terms
X = Normal('Lambda', 0, 1) # make sure we can use SymPy terms
def test_RandomSymbol_diff():
X = Normal('x', 0, 1)
assert (2*X).diff(X)
def test_random_symbol_no_pspace():
x = RandomSymbol(Symbol('x'))
assert x.pspace == PSpace()
def test_overlap():
X = Normal('x', 0, 1)
Y = Normal('x', 0, 2)
raises(ValueError, lambda: P(X > Y))
def test_IndependentProductPSpace():
X = Normal('X', 0, 1)
Y = Normal('Y', 0, 1)
px = X.pspace
py = Y.pspace
assert pspace(X + Y) == IndependentProductPSpace(px, py)
assert pspace(X + Y) == IndependentProductPSpace(py, px)
def test_E():
assert E(5) == 5
def test_H():
X = Normal('X', 0, 1)
D = Die('D', sides = 4)
G = Geometric('G', 0.5)
assert H(X, X > 0) == -log(2)/2 + S.Half + log(pi)/2
assert H(D, D > 2) == log(2)
assert comp(H(G).evalf().round(2), 1.39)
def test_Sample():
X = Die('X', 6)
Y = Normal('Y', 0, 1)
z = Symbol('z', integer=True)
scipy = import_module('scipy')
if not scipy:
skip('Scipy is not installed. Abort tests')
with ignore_warnings(UserWarning):
assert next(sample(X)) in [1, 2, 3, 4, 5, 6]
assert isinstance(next(sample(X + Y)), float)
assert P(X + Y > 0, Y < 0, numsamples=10).is_number
assert E(X + Y, numsamples=10).is_number
assert E(X**2 + Y, numsamples=10).is_number
assert E((X + Y)**2, numsamples=10).is_number
assert variance(X + Y, numsamples=10).is_number
raises(TypeError, lambda: P(Y > z, numsamples=5))
assert P(sin(Y) <= 1, numsamples=10) == 1
assert P(sin(Y) <= 1, cos(Y) < 1, numsamples=10) == 1
assert all(i in range(1, 7) for i in density(X, numsamples=10))
assert all(i in range(4, 7) for i in density(X, X>3, numsamples=10))
@XFAIL
def test_samplingE():
scipy = import_module('scipy')
if not scipy:
skip('Scipy is not installed. Abort tests')
Y = Normal('Y', 0, 1)
z = Symbol('z', integer=True)
assert E(Sum(1/z**Y, (z, 1, oo)), Y > 2, numsamples=3).is_number
def test_given():
X = Normal('X', 0, 1)
Y = Normal('Y', 0, 1)
A = given(X, True)
B = given(X, Y > 2)
assert X == A == B
def test_factorial_moment():
X = Poisson('X', 2)
Y = Binomial('Y', 2, S.Half)
Z = Hypergeometric('Z', 4, 2, 2)
assert factorial_moment(X, 2) == 4
assert factorial_moment(Y, 2) == S.Half
assert factorial_moment(Z, 2) == Rational(1, 3)
x, y, z, l = symbols('x y z l')
Y = Binomial('Y', 2, y)
Z = Hypergeometric('Z', 10, 2, 3)
assert factorial_moment(Y, l) == y**2*FallingFactorial(
2, l) + 2*y*(1 - y)*FallingFactorial(1, l) + (1 - y)**2*\
FallingFactorial(0, l)
assert factorial_moment(Z, l) == 7*FallingFactorial(0, l)/\
15 + 7*FallingFactorial(1, l)/15 + FallingFactorial(2, l)/15
def test_dependence():
X, Y = Die('X'), Die('Y')
assert independent(X, 2*Y)
assert not dependent(X, 2*Y)
X, Y = Normal('X', 0, 1), Normal('Y', 0, 1)
assert independent(X, Y)
assert dependent(X, 2*X)
# Create a dependency
XX, YY = given(Tuple(X, Y), Eq(X + Y, 3))
assert dependent(XX, YY)
def test_dependent_finite():
X, Y = Die('X'), Die('Y')
# Dependence testing requires symbolic conditions which currently break
# finite random variables
assert dependent(X, Y + X)
XX, YY = given(Tuple(X, Y), X + Y > 5) # Create a dependency
assert dependent(XX, YY)
def test_normality():
X, Y = Normal('X', 0, 1), Normal('Y', 0, 1)
x = Symbol('x', real=True, finite=True)
z = Symbol('z', real=True, finite=True)
dens = density(X - Y, Eq(X + Y, z))
assert integrate(dens(x), (x, -oo, oo)) == 1
def test_Density():
X = Die('X', 6)
d = Density(X)
assert d.doit() == density(X)
def test_NamedArgsMixin():
class Foo(Basic, NamedArgsMixin):
_argnames = 'foo', 'bar'
a = Foo(1, 2)
assert a.foo == 1
assert a.bar == 2
raises(AttributeError, lambda: a.baz)
class Bar(Basic, NamedArgsMixin):
pass
raises(AttributeError, lambda: Bar(1, 2).foo)
def test_density_constant():
assert density(3)(2) == 0
assert density(3)(3) == DiracDelta(0)
def test_real():
x = Normal('x', 0, 1)
assert x.is_real
def test_issue_10052():
X = Exponential('X', 3)
assert P(X < oo) == 1
assert P(X > oo) == 0
assert P(X < 2, X > oo) == 0
assert P(X < oo, X > oo) == 0
assert P(X < oo, X > 2) == 1
assert P(X < 3, X == 2) == 0
raises(ValueError, lambda: P(1))
raises(ValueError, lambda: P(X < 1, 2))
def test_issue_11934():
density = {0: .5, 1: .5}
X = FiniteRV('X', density)
assert E(X) == 0.5
assert P( X>= 2) == 0
def test_issue_8129():
X = Exponential('X', 4)
assert P(X >= X) == 1
assert P(X > X) == 0
assert P(X > X+1) == 0
def test_issue_12237():
X = Normal('X', 0, 1)
Y = Normal('Y', 0, 1)
U = P(X > 0, X)
V = P(Y < 0, X)
W = P(X + Y > 0, X)
assert W == P(X + Y > 0, X)
assert U == BernoulliDistribution(S.Half, S.Zero, S.One)
assert V == S.Half
def test_is_random():
X = Normal('X', 0, 1)
Y = Normal('Y', 0, 1)
a, b = symbols('a, b')
G = GaussianUnitaryEnsemble('U', 2)
B = BernoulliProcess('B', 0.9)
assert not is_random(a)
assert not is_random(a + b)
assert not is_random(a * b)
assert not is_random(Matrix([a**2, b**2]))
assert is_random(X)
assert is_random(X**2 + Y)
assert is_random(Y + b**2)
assert is_random(Y > 5)
assert is_random(B[3] < 1)
assert is_random(G)
assert is_random(X * Y * B[1])
assert is_random(Matrix([[X, B[2]], [G, Y]]))
assert is_random(Eq(X, 4))
def test_issue_12283():
x = symbols('x')
X = RandomSymbol(x)
Y = RandomSymbol('Y')
Z = RandomMatrixSymbol('Z', 2, 1)
W = RandomMatrixSymbol('W', 2, 1)
RI = RandomIndexedSymbol(Indexed('RI', 3))
assert pspace(Z) == PSpace()
assert pspace(RI) == PSpace()
assert pspace(X) == PSpace()
assert E(X) == Expectation(X)
assert P(Y > 3) == Probability(Y > 3)
assert variance(X) == Variance(X)
assert variance(RI) == Variance(RI)
assert covariance(X, Y) == Covariance(X, Y)
assert covariance(W, Z) == Covariance(W, Z)
def test_issue_6810():
X = Die('X', 6)
Y = Normal('Y', 0, 1)
assert P(Eq(X, 2)) == S(1)/6
assert P(Eq(Y, 0)) == 0
assert P(Or(X > 2, X < 3)) == 1
assert P(And(X > 3, X > 2)) == S(1)/2
|
8812dd70c87225bd5b95dcd63cb7c74d1d8bf5ef932cd5097115529077ab4f95
|
from sympy.stats import Expectation, Normal, Variance, Covariance
from sympy.testing.pytest import raises
from sympy import symbols, MatrixSymbol, Matrix, ZeroMatrix, ShapeError
from sympy.stats.rv import RandomMatrixSymbol
from sympy.stats.symbolic_multivariate_probability import (ExpectationMatrix,
VarianceMatrix, CrossCovarianceMatrix)
j, k = symbols("j,k")
A = MatrixSymbol("A", k, k)
B = MatrixSymbol("B", k, k)
C = MatrixSymbol("C", k, k)
D = MatrixSymbol("D", k, k)
a = MatrixSymbol("a", k, 1)
b = MatrixSymbol("b", k, 1)
A2 = MatrixSymbol("A2", 2, 2)
B2 = MatrixSymbol("B2", 2, 2)
X = RandomMatrixSymbol("X", k, 1)
Y = RandomMatrixSymbol("Y", k, 1)
Z = RandomMatrixSymbol("Z", k, 1)
W = RandomMatrixSymbol("W", k, 1)
R = RandomMatrixSymbol("R", k, k)
X2 = RandomMatrixSymbol("X2", 2, 1)
normal = Normal("normal", 0, 1)
m1 = Matrix([
[1, j*Normal("normal2", 2, 1)],
[normal, 0]
])
def test_multivariate_expectation():
expr = Expectation(a)
assert expr == Expectation(a) == ExpectationMatrix(a)
assert expr.expand() == a
expr = Expectation(X)
assert expr == Expectation(X) == ExpectationMatrix(X)
assert expr.shape == (k, 1)
assert expr.rows == k
assert expr.cols == 1
assert isinstance(expr, ExpectationMatrix)
expr = Expectation(A*X + b)
assert expr == ExpectationMatrix(A*X + b)
assert expr.expand() == A*ExpectationMatrix(X) + b
assert isinstance(expr, ExpectationMatrix)
assert expr.shape == (k, 1)
expr = Expectation(m1*X2)
assert expr.expand() == expr
expr = Expectation(A2*m1*B2*X2)
assert expr.args[0].args == (A2, m1, B2, X2)
assert expr.expand() == A2*ExpectationMatrix(m1*B2*X2)
expr = Expectation((X + Y)*(X - Y).T)
assert expr.expand() == ExpectationMatrix(X*X.T) - ExpectationMatrix(X*Y.T) +\
ExpectationMatrix(Y*X.T) - ExpectationMatrix(Y*Y.T)
expr = Expectation(A*X + B*Y)
assert expr.expand() == A*ExpectationMatrix(X) + B*ExpectationMatrix(Y)
assert Expectation(m1).doit() == Matrix([[1, 2*j], [0, 0]])
x1 = Matrix([
[Normal('N11', 11, 1), Normal('N12', 12, 1)],
[Normal('N21', 21, 1), Normal('N22', 22, 1)]
])
x2 = Matrix([
[Normal('M11', 1, 1), Normal('M12', 2, 1)],
[Normal('M21', 3, 1), Normal('M22', 4, 1)]
])
assert Expectation(Expectation(x1 + x2)).doit(deep=False) == ExpectationMatrix(x1 + x2)
assert Expectation(Expectation(x1 + x2)).doit() == Matrix([[12, 14], [24, 26]])
def test_multivariate_variance():
raises(ShapeError, lambda: Variance(A))
expr = Variance(a) # type: VarianceMatrix
assert expr == Variance(a) == VarianceMatrix(a)
assert expr.expand() == ZeroMatrix(k, k)
expr = Variance(a.T)
assert expr == Variance(a.T) == VarianceMatrix(a.T)
assert expr.expand() == ZeroMatrix(k, k)
expr = Variance(X)
assert expr == Variance(X) == VarianceMatrix(X)
assert expr.shape == (k, k)
assert expr.rows == k
assert expr.cols == k
assert isinstance(expr, VarianceMatrix)
expr = Variance(A*X)
assert expr == VarianceMatrix(A*X)
assert expr.expand() == A*VarianceMatrix(X)*A.T
assert isinstance(expr, VarianceMatrix)
assert expr.shape == (k, k)
expr = Variance(A*B*X)
assert expr.expand() == A*B*VarianceMatrix(X)*B.T*A.T
expr = Variance(m1*X2)
assert expr.expand() == expr
expr = Variance(A2*m1*B2*X2)
assert expr.args[0].args == (A2, m1, B2, X2)
assert expr.expand() == expr
expr = Variance(A*X + B*Y)
assert expr.expand() == 2*A*CrossCovarianceMatrix(X, Y)*B.T +\
A*VarianceMatrix(X)*A.T + B*VarianceMatrix(Y)*B.T
def test_multivariate_crosscovariance():
raises(ShapeError, lambda: Covariance(X, Y.T))
raises(ShapeError, lambda: Covariance(X, A))
expr = Covariance(a.T, b.T)
assert expr.shape == (1, 1)
assert expr.expand() == ZeroMatrix(1, 1)
expr = Covariance(a, b)
assert expr == Covariance(a, b) == CrossCovarianceMatrix(a, b)
assert expr.expand() == ZeroMatrix(k, k)
assert expr.shape == (k, k)
assert expr.rows == k
assert expr.cols == k
assert isinstance(expr, CrossCovarianceMatrix)
expr = Covariance(A*X + a, b)
assert expr.expand() == ZeroMatrix(k, k)
expr = Covariance(X, Y)
assert isinstance(expr, CrossCovarianceMatrix)
assert expr.expand() == expr
expr = Covariance(X, X)
assert isinstance(expr, CrossCovarianceMatrix)
assert expr.expand() == VarianceMatrix(X)
expr = Covariance(X + Y, Z)
assert isinstance(expr, CrossCovarianceMatrix)
assert expr.expand() == CrossCovarianceMatrix(X, Z) + CrossCovarianceMatrix(Y, Z)
expr = Covariance(A*X , Y)
assert isinstance(expr, CrossCovarianceMatrix)
assert expr.expand() == A*CrossCovarianceMatrix(X, Y)
expr = Covariance(X , B*Y)
assert isinstance(expr, CrossCovarianceMatrix)
assert expr.expand() == CrossCovarianceMatrix(X, Y)*B.T
expr = Covariance(A*X + a, B.T*Y + b)
assert isinstance(expr, CrossCovarianceMatrix)
assert expr.expand() == A*CrossCovarianceMatrix(X, Y)*B
expr = Covariance(A*X + B*Y + a, C.T*Z + D.T*W + b)
assert isinstance(expr, CrossCovarianceMatrix)
assert expr.expand() == A*CrossCovarianceMatrix(X, W)*D + A*CrossCovarianceMatrix(X, Z)*C \
+ B*CrossCovarianceMatrix(Y, W)*D + B*CrossCovarianceMatrix(Y, Z)*C
|
de906b23fbc49d8fcae813fff3af7ad5171bfed28e00e625565b1696df85947b
|
from sympy import (S, symbols, FiniteSet, Eq, Matrix, MatrixSymbol, Float, And,
ImmutableMatrix, Ne, Lt, Gt, exp, Not, Rational, Lambda, Sum,
Piecewise)
from sympy.stats import (DiscreteMarkovChain, P, TransitionMatrixOf, E,
StochasticStateSpaceOf, variance, ContinuousMarkovChain,
BernoulliProcess, sample_stochastic_process)
from sympy.stats.joint_rv import JointDistribution, JointDistributionHandmade
from sympy.stats.rv import RandomIndexedSymbol
from sympy.stats.symbolic_probability import Probability, Expectation
from sympy.testing.pytest import raises, skip
from sympy.external import import_module
from sympy.stats.frv_types import BernoulliDistribution
def test_DiscreteMarkovChain():
# pass only the name
X = DiscreteMarkovChain("X")
assert X.state_space == S.Reals
assert X.index_set == S.Naturals0
assert X.transition_probabilities == None
t = symbols('t', positive=True, integer=True)
assert isinstance(X[t], RandomIndexedSymbol)
assert E(X[0]) == Expectation(X[0])
raises(TypeError, lambda: DiscreteMarkovChain(1))
raises(NotImplementedError, lambda: X(t))
raises(ValueError, lambda: sample_stochastic_process(t))
raises(ValueError, lambda: next(sample_stochastic_process(X)))
# pass name and state_space
Y = DiscreteMarkovChain("Y", [1, 2, 3])
assert Y.transition_probabilities == None
assert Y.state_space == FiniteSet(1, 2, 3)
assert P(Eq(Y[2], 1), Eq(Y[0], 2)) == Probability(Eq(Y[2], 1), Eq(Y[0], 2))
assert E(X[0]) == Expectation(X[0])
raises(TypeError, lambda: DiscreteMarkovChain("Y", dict((1, 1))))
raises(ValueError, lambda: next(sample_stochastic_process(Y)))
# pass name, state_space and transition_probabilities
T = Matrix([[0.5, 0.2, 0.3],[0.2, 0.5, 0.3],[0.2, 0.3, 0.5]])
TS = MatrixSymbol('T', 3, 3)
Y = DiscreteMarkovChain("Y", [0, 1, 2], T)
YS = DiscreteMarkovChain("Y", [0, 1, 2], TS)
assert YS._transient2transient() == None
assert YS._transient2absorbing() == None
assert Y.joint_distribution(1, Y[2], 3) == JointDistribution(Y[1], Y[2], Y[3])
raises(ValueError, lambda: Y.joint_distribution(Y[1].symbol, Y[2].symbol))
assert P(Eq(Y[3], 2), Eq(Y[1], 1)).round(2) == Float(0.36, 2)
assert str(P(Eq(YS[3], 2), Eq(YS[1], 1))) == \
"T[0, 2]*T[1, 0] + T[1, 1]*T[1, 2] + T[1, 2]*T[2, 2]"
assert P(Eq(YS[1], 1), Eq(YS[2], 2)) == Probability(Eq(YS[1], 1))
assert P(Eq(YS[3], 3), Eq(YS[1], 1)) is S.Zero
TO = Matrix([[0.25, 0.75, 0],[0, 0.25, 0.75],[0.75, 0, 0.25]])
assert P(Eq(Y[3], 2), Eq(Y[1], 1) & TransitionMatrixOf(Y, TO)).round(3) == Float(0.375, 3)
assert E(Y[3], evaluate=False) == Expectation(Y[3])
assert E(Y[3], Eq(Y[2], 1)).round(2) == Float(1.1, 3)
TSO = MatrixSymbol('T', 4, 4)
raises(ValueError, lambda: str(P(Eq(YS[3], 2), Eq(YS[1], 1) & TransitionMatrixOf(YS, TSO))))
raises(TypeError, lambda: DiscreteMarkovChain("Z", [0, 1, 2], symbols('M')))
raises(ValueError, lambda: DiscreteMarkovChain("Z", [0, 1, 2], MatrixSymbol('T', 3, 4)))
raises(ValueError, lambda: E(Y[3], Eq(Y[2], 6)))
raises(ValueError, lambda: E(Y[2], Eq(Y[3], 1)))
# extended tests for probability queries
TO1 = Matrix([[Rational(1, 4), Rational(3, 4), 0],[Rational(1, 3), Rational(1, 3), Rational(1, 3)],[0, Rational(1, 4), Rational(3, 4)]])
assert P(And(Eq(Y[2], 1), Eq(Y[1], 1), Eq(Y[0], 0)),
Eq(Probability(Eq(Y[0], 0)), Rational(1, 4)) & TransitionMatrixOf(Y, TO1)) == Rational(1, 16)
assert P(And(Eq(Y[2], 1), Eq(Y[1], 1), Eq(Y[0], 0)), TransitionMatrixOf(Y, TO1)) == \
Probability(Eq(Y[0], 0))/4
assert P(Lt(X[1], 2) & Gt(X[1], 0), Eq(X[0], 2) &
StochasticStateSpaceOf(X, [0, 1, 2]) & TransitionMatrixOf(X, TO1)) == Rational(1, 4)
assert P(Ne(X[1], 2) & Ne(X[1], 1), Eq(X[0], 2) &
StochasticStateSpaceOf(X, [0, 1, 2]) & TransitionMatrixOf(X, TO1)) is S.Zero
assert P(And(Eq(Y[2], 1), Eq(Y[1], 1), Eq(Y[0], 0)), Eq(Y[1], 1)) == 0.1*Probability(Eq(Y[0], 0))
# testing properties of Markov chain
TO2 = Matrix([[S.One, 0, 0],[Rational(1, 3), Rational(1, 3), Rational(1, 3)],[0, Rational(1, 4), Rational(3, 4)]])
TO3 = Matrix([[Rational(1, 4), Rational(3, 4), 0],[Rational(1, 3), Rational(1, 3), Rational(1, 3)],[0, Rational(1, 4), Rational(3, 4)]])
Y2 = DiscreteMarkovChain('Y', trans_probs=TO2)
Y3 = DiscreteMarkovChain('Y', trans_probs=TO3)
assert Y3._transient2absorbing() == None
raises (ValueError, lambda: Y3.fundamental_matrix())
assert Y2.is_absorbing_chain() == True
assert Y3.is_absorbing_chain() == False
TO4 = Matrix([[Rational(1, 5), Rational(2, 5), Rational(2, 5)], [Rational(1, 10), S.Half, Rational(2, 5)], [Rational(3, 5), Rational(3, 10), Rational(1, 10)]])
Y4 = DiscreteMarkovChain('Y', trans_probs=TO4)
w = ImmutableMatrix([[Rational(11, 39), Rational(16, 39), Rational(4, 13)]])
assert Y4.limiting_distribution == w
assert Y4.is_regular() == True
TS1 = MatrixSymbol('T', 3, 3)
Y5 = DiscreteMarkovChain('Y', trans_probs=TS1)
assert Y5.limiting_distribution(w, TO4).doit() == True
TO6 = Matrix([[S.One, 0, 0, 0, 0],[S.Half, 0, S.Half, 0, 0],[0, S.Half, 0, S.Half, 0], [0, 0, S.Half, 0, S.Half], [0, 0, 0, 0, 1]])
Y6 = DiscreteMarkovChain('Y', trans_probs=TO6)
assert Y6._transient2absorbing() == ImmutableMatrix([[S.Half, 0], [0, 0], [0, S.Half]])
assert Y6._transient2transient() == ImmutableMatrix([[0, S.Half, 0], [S.Half, 0, S.Half], [0, S.Half, 0]])
assert Y6.fundamental_matrix() == ImmutableMatrix([[Rational(3, 2), S.One, S.Half], [S.One, S(2), S.One], [S.Half, S.One, Rational(3, 2)]])
assert Y6.absorbing_probabilites() == ImmutableMatrix([[Rational(3, 4), Rational(1, 4)], [S.Half, S.Half], [Rational(1, 4), Rational(3, 4)]])
# testing miscellaneous queries
T = Matrix([[S.Half, Rational(1, 4), Rational(1, 4)],
[Rational(1, 3), 0, Rational(2, 3)],
[S.Half, S.Half, 0]])
X = DiscreteMarkovChain('X', [0, 1, 2], T)
assert P(Eq(X[1], 2) & Eq(X[2], 1) & Eq(X[3], 0),
Eq(P(Eq(X[1], 0)), Rational(1, 4)) & Eq(P(Eq(X[1], 1)), Rational(1, 4))) == Rational(1, 12)
assert P(Eq(X[2], 1) | Eq(X[2], 2), Eq(X[1], 1)) == Rational(2, 3)
assert P(Eq(X[2], 1) & Eq(X[2], 2), Eq(X[1], 1)) is S.Zero
assert P(Ne(X[2], 2), Eq(X[1], 1)) == Rational(1, 3)
assert E(X[1]**2, Eq(X[0], 1)) == Rational(8, 3)
assert variance(X[1], Eq(X[0], 1)) == Rational(8, 9)
raises(ValueError, lambda: E(X[1], Eq(X[2], 1)))
def test_sample_stochastic_process():
if not import_module('scipy'):
skip('SciPy Not installed. Skip sampling tests')
import random
random.seed(0)
numpy = import_module('numpy')
if numpy:
numpy.random.seed(0) # scipy uses numpy to sample so to set its seed
T = Matrix([[0.5, 0.2, 0.3],[0.2, 0.5, 0.3],[0.2, 0.3, 0.5]])
Y = DiscreteMarkovChain("Y", [0, 1, 2], T)
for samps in range(10):
assert next(sample_stochastic_process(Y)) in Y.state_space
T = Matrix([[S.Half, Rational(1, 4), Rational(1, 4)],
[Rational(1, 3), 0, Rational(2, 3)],
[S.Half, S.Half, 0]])
X = DiscreteMarkovChain('X', [0, 1, 2], T)
for samps in range(10):
assert next(sample_stochastic_process(X)) in X.state_space
def test_ContinuousMarkovChain():
T1 = Matrix([[S(-2), S(2), S.Zero],
[S.Zero, S.NegativeOne, S.One],
[Rational(3, 2), Rational(3, 2), S(-3)]])
C1 = ContinuousMarkovChain('C', [0, 1, 2], T1)
assert C1.limiting_distribution() == ImmutableMatrix([[Rational(3, 19), Rational(12, 19), Rational(4, 19)]])
T2 = Matrix([[-S.One, S.One, S.Zero], [S.One, -S.One, S.Zero], [S.Zero, S.One, -S.One]])
C2 = ContinuousMarkovChain('C', [0, 1, 2], T2)
A, t = C2.generator_matrix, symbols('t', positive=True)
assert C2.transition_probabilities(A)(t) == Matrix([[S.Half + exp(-2*t)/2, S.Half - exp(-2*t)/2, 0],
[S.Half - exp(-2*t)/2, S.Half + exp(-2*t)/2, 0],
[S.Half - exp(-t) + exp(-2*t)/2, S.Half - exp(-2*t)/2, exp(-t)]])
assert P(Eq(C2(1), 1), Eq(C2(0), 1), evaluate=False) == Probability(Eq(C2(1), 1))
assert P(Eq(C2(1), 1), Eq(C2(0), 1)) == exp(-2)/2 + S.Half
assert P(Eq(C2(1), 0) & Eq(C2(2), 1) & Eq(C2(3), 1),
Eq(P(Eq(C2(1), 0)), S.Half)) == (Rational(1, 4) - exp(-2)/4)*(exp(-2)/2 + S.Half)
assert P(Not(Eq(C2(1), 0) & Eq(C2(2), 1) & Eq(C2(3), 2)) |
(Eq(C2(1), 0) & Eq(C2(2), 1) & Eq(C2(3), 2)),
Eq(P(Eq(C2(1), 0)), Rational(1, 4)) & Eq(P(Eq(C2(1), 1)), Rational(1, 4))) is S.One
assert E(C2(Rational(3, 2)), Eq(C2(0), 2)) == -exp(-3)/2 + 2*exp(Rational(-3, 2)) + S.Half
assert variance(C2(Rational(3, 2)), Eq(C2(0), 1)) == ((S.Half - exp(-3)/2)**2*(exp(-3)/2 + S.Half)
+ (Rational(-1, 2) - exp(-3)/2)**2*(S.Half - exp(-3)/2))
raises(KeyError, lambda: P(Eq(C2(1), 0), Eq(P(Eq(C2(1), 1)), S.Half)))
assert P(Eq(C2(1), 0), Eq(P(Eq(C2(5), 1)), S.Half)) == Probability(Eq(C2(1), 0))
TS1 = MatrixSymbol('G', 3, 3)
CS1 = ContinuousMarkovChain('C', [0, 1, 2], TS1)
A = CS1.generator_matrix
assert CS1.transition_probabilities(A)(t) == exp(t*A)
def test_BernoulliProcess():
B = BernoulliProcess("B", p=0.6, success=1, failure=0)
assert B.state_space == FiniteSet(0, 1)
assert B.index_set == S.Naturals0
assert B.success == 1
assert B.failure == 0
X = BernoulliProcess("X", p=Rational(1,3), success='H', failure='T')
assert X.state_space == FiniteSet('H', 'T')
H, T = symbols("H,T")
assert E(X[1]+X[2]*X[3]) == H**2/9 + 4*H*T/9 + H/3 + 4*T**2/9 + 2*T/3
t, x = symbols('t, x', positive=True, integer=True)
assert isinstance(B[t], RandomIndexedSymbol)
raises(ValueError, lambda: BernoulliProcess("X", p=1.1, success=1, failure=0))
raises(NotImplementedError, lambda: B(t))
raises(IndexError, lambda: B[-3])
assert B.joint_distribution(B[3], B[9]) == JointDistributionHandmade(Lambda((B[3], B[9]),
Piecewise((0.6, Eq(B[3], 1)), (0.4, Eq(B[3], 0)), (0, True))
*Piecewise((0.6, Eq(B[9], 1)), (0.4, Eq(B[9], 0)), (0, True))))
assert B.joint_distribution(2, B[4]) == JointDistributionHandmade(Lambda((B[2], B[4]),
Piecewise((0.6, Eq(B[2], 1)), (0.4, Eq(B[2], 0)), (0, True))
*Piecewise((0.6, Eq(B[4], 1)), (0.4, Eq(B[4], 0)), (0, True))))
# Test for the sum distribution of Bernoulli Process RVs
Y = B[1] + B[2] + B[3]
assert P(Eq(Y, 0)).round(2) == Float(0.06, 1)
assert P(Eq(Y, 2)).round(2) == Float(0.43, 2)
assert P(Eq(Y, 4)).round(2) == 0
assert P(Gt(Y, 1)).round(2) == Float(0.65, 2)
# Test for independency of each Random Indexed variable
assert P(Eq(B[1], 0) & Eq(B[2], 1) & Eq(B[3], 0) & Eq(B[4], 1)).round(2) == Float(0.06, 1)
assert E(2 * B[1] + B[2]).round(2) == Float(1.80, 3)
assert E(2 * B[1] + B[2] + 5).round(2) == Float(6.80, 3)
assert E(B[2] * B[4] + B[10]).round(2) == Float(0.96, 2)
assert E(B[2] > 0, Eq(B[1],1) & Eq(B[2],1)).round(2) == Float(0.60,2)
assert E(B[1]) == 0.6
assert P(B[1] > 0).round(2) == Float(0.60, 2)
assert P(B[1] < 1).round(2) == Float(0.40, 2)
assert P(B[1] > 0, B[2] <= 1).round(2) == Float(0.60, 2)
assert P(B[12] * B[5] > 0).round(2) == Float(0.36, 2)
assert P(B[12] * B[5] > 0, B[4] < 1).round(2) == Float(0.36, 2)
assert P(Eq(B[2], 1), B[2] > 0) == 1
assert P(Eq(B[5], 3)) == 0
assert P(Eq(B[1], 1), B[1] < 0) == 0
assert P(B[2] > 0, Eq(B[2], 1)) == 1
assert P(B[2] < 0, Eq(B[2], 1)) == 0
assert P(B[2] > 0, B[2]==7) == 0
assert P(B[5] > 0, B[5]) == BernoulliDistribution(0.6, 0, 1)
raises(ValueError, lambda: P(3))
raises(ValueError, lambda: P(B[3] > 0, 3))
# test issue 19456
expr = Sum(B[t], (t, 0, 4))
expr2 = Sum(B[t], (t, 1, 3))
expr3 = Sum(B[t]**2, (t, 1, 3))
assert expr.doit() == B[0] + B[1] + B[2] + B[3] + B[4]
assert expr2.doit() == Y
assert expr3.doit() == B[1]**2 + B[2]**2 + B[3]**2
assert B[2*t].free_symbols == {B[2*t], t}
assert B[4].free_symbols == {B[4]}
assert B[x*t].free_symbols == {B[x*t], x, t}
|
0ff6b4d0c7e175183c6afcf66ffcfb77b018b7380cfc039512aa18296dfbfcd3
|
from sympy.ntheory.ecm import ecm, Point
from sympy.testing.pytest import slow
@slow
def test_ecm():
assert ecm(3146531246531241245132451321) == {3, 100327907731, 10454157497791297}
assert ecm(46167045131415113) == {43, 2634823, 407485517}
assert ecm(631211032315670776841) == {9312934919, 67777885039}
assert ecm(398883434337287) == {99476569, 4009823}
assert ecm(64211816600515193) == {281719, 359641, 633767}
assert ecm(4269021180054189416198169786894227) == {184039, 241603, 333331, 477973, 618619, 974123}
assert ecm(4516511326451341281684513) == {3, 39869, 131743543, 95542348571}
assert ecm(4132846513818654136451) == {47, 160343, 2802377, 195692803}
assert ecm(168541512131094651323) == {79, 113, 11011069, 1714635721}
#This takes ~10secs while factorint is not able to factorize this even in ~10mins
assert ecm(7060005655815754299976961394452809, B1=100000, B2=1000000) == {6988699669998001, 1010203040506070809}
def test_Point():
from sympy import mod_inverse
#The curve is of the form y**2 = x**3 + a*x**2 + x
mod = 101
a = 10
a_24 = (a + 2)*mod_inverse(4, mod)
p1 = Point(10, 17, a_24, mod)
p2 = p1.double()
assert p2 == Point(68, 56, a_24, mod)
p4 = p2.double()
assert p4 == Point(22, 64, a_24, mod)
p8 = p4.double()
assert p8 == Point(71, 95, a_24, mod)
p16 = p8.double()
assert p16 == Point(5, 16, a_24, mod)
p32 = p16.double()
assert p32 == Point(33, 96, a_24, mod)
# p3 = p2 + p1
p3 = p2.add(p1, p1)
assert p3 == Point(1, 61, a_24, mod)
# p5 = p3 + p2 or p4 + p1
p5 = p3.add(p2, p1)
assert p5 == Point(49, 90, a_24, mod)
assert p5 == p4.add(p1, p3)
# p6 = 2*p3
p6 = p3.double()
assert p6 == Point(87, 43, a_24, mod)
assert p6 == p4.add(p2, p2)
# p7 = p5 + p2
p7 = p5.add(p2, p3)
assert p7 == Point(69, 23, a_24, mod)
assert p7 == p4.add(p3, p1)
assert p7 == p6.add(p1, p5)
# p9 = p5 + p4
p9 = p5.add(p4, p1)
assert p9 == Point(56, 99, a_24, mod)
assert p9 == p6.add(p3, p3)
assert p9 == p7.add(p2, p5)
assert p9 == p8.add(p1, p7)
assert p5 == p1.mont_ladder(5)
assert p9 == p1.mont_ladder(9)
assert p16 == p1.mont_ladder(16)
assert p9 == p3.mont_ladder(3)
|
7c0cb1a9843b4eb5adaadbf301371e624b9ad7e6d3626cd13986661928e0aa22
|
from sympy import (
Abs, And, binomial, Catalan, cos, Derivative, E, Eq, exp, EulerGamma,
factorial, Function, harmonic, I, Integral, KroneckerDelta, log,
nan, oo, pi, Piecewise, Product, product, Rational, S, simplify, Identity,
sin, sqrt, Sum, summation, Symbol, symbols, sympify, zeta, gamma,
Indexed, Idx, IndexedBase, prod, Dummy, lowergamma, Range, floor,
RisingFactorial, MatrixSymbol)
from sympy.abc import a, b, c, d, k, m, x, y, z
from sympy.concrete.summations import telescopic, _dummy_with_inherited_properties_concrete
from sympy.concrete.expr_with_intlimits import ReorderError
from sympy.core.facts import InconsistentAssumptions
from sympy.testing.pytest import XFAIL, raises, slow
from sympy.matrices import \
Matrix, SparseMatrix, ImmutableDenseMatrix, ImmutableSparseMatrix
from sympy.core.mod import Mod
n = Symbol('n', integer=True)
def test_karr_convention():
# Test the Karr summation convention that we want to hold.
# See his paper "Summation in Finite Terms" for a detailed
# reasoning why we really want exactly this definition.
# The convention is described on page 309 and essentially
# in section 1.4, definition 3:
#
# \sum_{m <= i < n} f(i) 'has the obvious meaning' for m < n
# \sum_{m <= i < n} f(i) = 0 for m = n
# \sum_{m <= i < n} f(i) = - \sum_{n <= i < m} f(i) for m > n
#
# It is important to note that he defines all sums with
# the upper limit being *exclusive*.
# In contrast, sympy and the usual mathematical notation has:
#
# sum_{i = a}^b f(i) = f(a) + f(a+1) + ... + f(b-1) + f(b)
#
# with the upper limit *inclusive*. So translating between
# the two we find that:
#
# \sum_{m <= i < n} f(i) = \sum_{i = m}^{n-1} f(i)
#
# where we intentionally used two different ways to typeset the
# sum and its limits.
i = Symbol("i", integer=True)
k = Symbol("k", integer=True)
j = Symbol("j", integer=True)
# A simple example with a concrete summand and symbolic limits.
# The normal sum: m = k and n = k + j and therefore m < n:
m = k
n = k + j
a = m
b = n - 1
S1 = Sum(i**2, (i, a, b)).doit()
# The reversed sum: m = k + j and n = k and therefore m > n:
m = k + j
n = k
a = m
b = n - 1
S2 = Sum(i**2, (i, a, b)).doit()
assert simplify(S1 + S2) == 0
# Test the empty sum: m = k and n = k and therefore m = n:
m = k
n = k
a = m
b = n - 1
Sz = Sum(i**2, (i, a, b)).doit()
assert Sz == 0
# Another example this time with an unspecified summand and
# numeric limits. (We can not do both tests in the same example.)
f = Function("f")
# The normal sum with m < n:
m = 2
n = 11
a = m
b = n - 1
S1 = Sum(f(i), (i, a, b)).doit()
# The reversed sum with m > n:
m = 11
n = 2
a = m
b = n - 1
S2 = Sum(f(i), (i, a, b)).doit()
assert simplify(S1 + S2) == 0
# Test the empty sum with m = n:
m = 5
n = 5
a = m
b = n - 1
Sz = Sum(f(i), (i, a, b)).doit()
assert Sz == 0
e = Piecewise((exp(-i), Mod(i, 2) > 0), (0, True))
s = Sum(e, (i, 0, 11))
assert s.n(3) == s.doit().n(3)
def test_karr_proposition_2a():
# Test Karr, page 309, proposition 2, part a
i = Symbol("i", integer=True)
u = Symbol("u", integer=True)
v = Symbol("v", integer=True)
def test_the_sum(m, n):
# g
g = i**3 + 2*i**2 - 3*i
# f = Delta g
f = simplify(g.subs(i, i+1) - g)
# The sum
a = m
b = n - 1
S = Sum(f, (i, a, b)).doit()
# Test if Sum_{m <= i < n} f(i) = g(n) - g(m)
assert simplify(S - (g.subs(i, n) - g.subs(i, m))) == 0
# m < n
test_the_sum(u, u+v)
# m = n
test_the_sum(u, u )
# m > n
test_the_sum(u+v, u )
def test_karr_proposition_2b():
# Test Karr, page 309, proposition 2, part b
i = Symbol("i", integer=True)
u = Symbol("u", integer=True)
v = Symbol("v", integer=True)
w = Symbol("w", integer=True)
def test_the_sum(l, n, m):
# Summand
s = i**3
# First sum
a = l
b = n - 1
S1 = Sum(s, (i, a, b)).doit()
# Second sum
a = l
b = m - 1
S2 = Sum(s, (i, a, b)).doit()
# Third sum
a = m
b = n - 1
S3 = Sum(s, (i, a, b)).doit()
# Test if S1 = S2 + S3 as required
assert S1 - (S2 + S3) == 0
# l < m < n
test_the_sum(u, u+v, u+v+w)
# l < m = n
test_the_sum(u, u+v, u+v )
# l < m > n
test_the_sum(u, u+v+w, v )
# l = m < n
test_the_sum(u, u, u+v )
# l = m = n
test_the_sum(u, u, u )
# l = m > n
test_the_sum(u+v, u+v, u )
# l > m < n
test_the_sum(u+v, u, u+w )
# l > m = n
test_the_sum(u+v, u, u )
# l > m > n
test_the_sum(u+v+w, u+v, u )
def test_arithmetic_sums():
assert summation(1, (n, a, b)) == b - a + 1
assert Sum(S.NaN, (n, a, b)) is S.NaN
assert Sum(x, (n, a, a)).doit() == x
assert Sum(x, (x, a, a)).doit() == a
assert Sum(x, (n, 1, a)).doit() == a*x
assert Sum(x, (x, Range(1, 11))).doit() == 55
assert Sum(x, (x, Range(1, 11, 2))).doit() == 25
assert Sum(x, (x, Range(1, 10, 2))) == Sum(x, (x, Range(9, 0, -2)))
lo, hi = 1, 2
s1 = Sum(n, (n, lo, hi))
s2 = Sum(n, (n, hi, lo))
assert s1 != s2
assert s1.doit() == 3 and s2.doit() == 0
lo, hi = x, x + 1
s1 = Sum(n, (n, lo, hi))
s2 = Sum(n, (n, hi, lo))
assert s1 != s2
assert s1.doit() == 2*x + 1 and s2.doit() == 0
assert Sum(Integral(x, (x, 1, y)) + x, (x, 1, 2)).doit() == \
y**2 + 2
assert summation(1, (n, 1, 10)) == 10
assert summation(2*n, (n, 0, 10**10)) == 100000000010000000000
assert summation(4*n*m, (n, a, 1), (m, 1, d)).expand() == \
2*d + 2*d**2 + a*d + a*d**2 - d*a**2 - a**2*d**2
assert summation(cos(n), (n, -2, 1)) == cos(-2) + cos(-1) + cos(0) + cos(1)
assert summation(cos(n), (n, x, x + 2)) == cos(x) + cos(x + 1) + cos(x + 2)
assert isinstance(summation(cos(n), (n, x, x + S.Half)), Sum)
assert summation(k, (k, 0, oo)) is oo
assert summation(k, (k, Range(1, 11))) == 55
def test_polynomial_sums():
assert summation(n**2, (n, 3, 8)) == 199
assert summation(n, (n, a, b)) == \
((a + b)*(b - a + 1)/2).expand()
assert summation(n**2, (n, 1, b)) == \
((2*b**3 + 3*b**2 + b)/6).expand()
assert summation(n**3, (n, 1, b)) == \
((b**4 + 2*b**3 + b**2)/4).expand()
assert summation(n**6, (n, 1, b)) == \
((6*b**7 + 21*b**6 + 21*b**5 - 7*b**3 + b)/42).expand()
def test_geometric_sums():
assert summation(pi**n, (n, 0, b)) == (1 - pi**(b + 1)) / (1 - pi)
assert summation(2 * 3**n, (n, 0, b)) == 3**(b + 1) - 1
assert summation(S.Half**n, (n, 1, oo)) == 1
assert summation(2**n, (n, 0, b)) == 2**(b + 1) - 1
assert summation(2**n, (n, 1, oo)) is oo
assert summation(2**(-n), (n, 1, oo)) == 1
assert summation(3**(-n), (n, 4, oo)) == Rational(1, 54)
assert summation(2**(-4*n + 3), (n, 1, oo)) == Rational(8, 15)
assert summation(2**(n + 1), (n, 1, b)).expand() == 4*(2**b - 1)
# issue 6664:
assert summation(x**n, (n, 0, oo)) == \
Piecewise((1/(-x + 1), Abs(x) < 1), (Sum(x**n, (n, 0, oo)), True))
assert summation(-2**n, (n, 0, oo)) is -oo
assert summation(I**n, (n, 0, oo)) == Sum(I**n, (n, 0, oo))
# issue 6802:
assert summation((-1)**(2*x + 2), (x, 0, n)) == n + 1
assert summation((-2)**(2*x + 2), (x, 0, n)) == 4*4**(n + 1)/S(3) - Rational(4, 3)
assert summation((-1)**x, (x, 0, n)) == -(-1)**(n + 1)/S(2) + S.Half
assert summation(y**x, (x, a, b)) == \
Piecewise((-a + b + 1, Eq(y, 1)), ((y**a - y**(b + 1))/(-y + 1), True))
assert summation((-2)**(y*x + 2), (x, 0, n)) == \
4*Piecewise((n + 1, Eq((-2)**y, 1)),
((-(-2)**(y*(n + 1)) + 1)/(-(-2)**y + 1), True))
# issue 8251:
assert summation((1/(n + 1)**2)*n**2, (n, 0, oo)) is oo
#issue 9908:
assert Sum(1/(n**3 - 1), (n, -oo, -2)).doit() == summation(1/(n**3 - 1), (n, -oo, -2))
#issue 11642:
result = Sum(0.5**n, (n, 1, oo)).doit()
assert result == 1
assert result.is_Float
result = Sum(0.25**n, (n, 1, oo)).doit()
assert result == 1/3.
assert result.is_Float
result = Sum(0.99999**n, (n, 1, oo)).doit()
assert result == 99999
assert result.is_Float
result = Sum(S.Half**n, (n, 1, oo)).doit()
assert result == 1
assert not result.is_Float
result = Sum(Rational(3, 5)**n, (n, 1, oo)).doit()
assert result == Rational(3, 2)
assert not result.is_Float
assert Sum(1.0**n, (n, 1, oo)).doit() is oo
assert Sum(2.43**n, (n, 1, oo)).doit() is oo
# Issue 13979
i, k, q = symbols('i k q', integer=True)
result = summation(
exp(-2*I*pi*k*i/n) * exp(2*I*pi*q*i/n) / n, (i, 0, n - 1)
)
assert result.simplify() == Piecewise(
(1, Eq(exp(-2*I*pi*(k - q)/n), 1)), (0, True)
)
def test_harmonic_sums():
assert summation(1/k, (k, 0, n)) == Sum(1/k, (k, 0, n))
assert summation(1/k, (k, 1, n)) == harmonic(n)
assert summation(n/k, (k, 1, n)) == n*harmonic(n)
assert summation(1/k, (k, 5, n)) == harmonic(n) - harmonic(4)
def test_composite_sums():
f = S.Half*(7 - 6*n + Rational(1, 7)*n**3)
s = summation(f, (n, a, b))
assert not isinstance(s, Sum)
A = 0
for i in range(-3, 5):
A += f.subs(n, i)
B = s.subs(a, -3).subs(b, 4)
assert A == B
def test_hypergeometric_sums():
assert summation(
binomial(2*k, k)/4**k, (k, 0, n)) == (1 + 2*n)*binomial(2*n, n)/4**n
assert summation(binomial(2*k, k)/5**k, (k, -oo, oo)) == sqrt(5)
def test_other_sums():
f = m**2 + m*exp(m)
g = 3*exp(Rational(3, 2))/2 + exp(S.Half)/2 - exp(Rational(-1, 2))/2 - 3*exp(Rational(-3, 2))/2 + 5
assert summation(f, (m, Rational(-3, 2), Rational(3, 2))) == g
assert summation(f, (m, -1.5, 1.5)).evalf().epsilon_eq(g.evalf(), 1e-10)
fac = factorial
def NS(e, n=15, **options):
return str(sympify(e).evalf(n, **options))
def test_evalf_fast_series():
# Euler transformed series for sqrt(1+x)
assert NS(Sum(
fac(2*n + 1)/fac(n)**2/2**(3*n + 1), (n, 0, oo)), 100) == NS(sqrt(2), 100)
# Some series for exp(1)
estr = NS(E, 100)
assert NS(Sum(1/fac(n), (n, 0, oo)), 100) == estr
assert NS(1/Sum((1 - 2*n)/fac(2*n), (n, 0, oo)), 100) == estr
assert NS(Sum((2*n + 1)/fac(2*n), (n, 0, oo)), 100) == estr
assert NS(Sum((4*n + 3)/2**(2*n + 1)/fac(2*n + 1), (n, 0, oo))**2, 100) == estr
pistr = NS(pi, 100)
# Ramanujan series for pi
assert NS(9801/sqrt(8)/Sum(fac(
4*n)*(1103 + 26390*n)/fac(n)**4/396**(4*n), (n, 0, oo)), 100) == pistr
assert NS(1/Sum(
binomial(2*n, n)**3 * (42*n + 5)/2**(12*n + 4), (n, 0, oo)), 100) == pistr
# Machin's formula for pi
assert NS(16*Sum((-1)**n/(2*n + 1)/5**(2*n + 1), (n, 0, oo)) -
4*Sum((-1)**n/(2*n + 1)/239**(2*n + 1), (n, 0, oo)), 100) == pistr
# Apery's constant
astr = NS(zeta(3), 100)
P = 126392*n**5 + 412708*n**4 + 531578*n**3 + 336367*n**2 + 104000* \
n + 12463
assert NS(Sum((-1)**n * P / 24 * (fac(2*n + 1)*fac(2*n)*fac(
n))**3 / fac(3*n + 2) / fac(4*n + 3)**3, (n, 0, oo)), 100) == astr
assert NS(Sum((-1)**n * (205*n**2 + 250*n + 77)/64 * fac(n)**10 /
fac(2*n + 1)**5, (n, 0, oo)), 100) == astr
def test_evalf_fast_series_issue_4021():
# Catalan's constant
assert NS(Sum((-1)**(n - 1)*2**(8*n)*(40*n**2 - 24*n + 3)*fac(2*n)**3*
fac(n)**2/n**3/(2*n - 1)/fac(4*n)**2, (n, 1, oo))/64, 100) == \
NS(Catalan, 100)
astr = NS(zeta(3), 100)
assert NS(5*Sum(
(-1)**(n - 1)*fac(n)**2 / n**3 / fac(2*n), (n, 1, oo))/2, 100) == astr
assert NS(Sum((-1)**(n - 1)*(56*n**2 - 32*n + 5) / (2*n - 1)**2 * fac(n - 1)
**3 / fac(3*n), (n, 1, oo))/4, 100) == astr
def test_evalf_slow_series():
assert NS(Sum((-1)**n / n, (n, 1, oo)), 15) == NS(-log(2), 15)
assert NS(Sum((-1)**n / n, (n, 1, oo)), 50) == NS(-log(2), 50)
assert NS(Sum(1/n**2, (n, 1, oo)), 15) == NS(pi**2/6, 15)
assert NS(Sum(1/n**2, (n, 1, oo)), 100) == NS(pi**2/6, 100)
assert NS(Sum(1/n**2, (n, 1, oo)), 500) == NS(pi**2/6, 500)
assert NS(Sum((-1)**n / (2*n + 1)**3, (n, 0, oo)), 15) == NS(pi**3/32, 15)
assert NS(Sum((-1)**n / (2*n + 1)**3, (n, 0, oo)), 50) == NS(pi**3/32, 50)
def test_euler_maclaurin():
# Exact polynomial sums with E-M
def check_exact(f, a, b, m, n):
A = Sum(f, (k, a, b))
s, e = A.euler_maclaurin(m, n)
assert (e == 0) and (s.expand() == A.doit())
check_exact(k**4, a, b, 0, 2)
check_exact(k**4 + 2*k, a, b, 1, 2)
check_exact(k**4 + k**2, a, b, 1, 5)
check_exact(k**5, 2, 6, 1, 2)
check_exact(k**5, 2, 6, 1, 3)
assert Sum(x-1, (x, 0, 2)).euler_maclaurin(m=30, n=30, eps=2**-15) == (0, 0)
# Not exact
assert Sum(k**6, (k, a, b)).euler_maclaurin(0, 2)[1] != 0
# Numerical test
for mi, ni in [(2, 4), (2, 20), (10, 20), (18, 20)]:
A = Sum(1/k**3, (k, 1, oo))
s, e = A.euler_maclaurin(mi, ni)
assert abs((s - zeta(3)).evalf()) < e.evalf()
raises(ValueError, lambda: Sum(1, (x, 0, 1), (k, 0, 1)).euler_maclaurin())
@slow
def test_evalf_euler_maclaurin():
assert NS(Sum(1/k**k, (k, 1, oo)), 15) == '1.29128599706266'
assert NS(Sum(1/k**k, (k, 1, oo)),
50) == '1.2912859970626635404072825905956005414986193682745'
assert NS(Sum(1/k - log(1 + 1/k), (k, 1, oo)), 15) == NS(EulerGamma, 15)
assert NS(Sum(1/k - log(1 + 1/k), (k, 1, oo)), 50) == NS(EulerGamma, 50)
assert NS(Sum(log(k)/k**2, (k, 1, oo)), 15) == '0.937548254315844'
assert NS(Sum(log(k)/k**2, (k, 1, oo)),
50) == '0.93754825431584375370257409456786497789786028861483'
assert NS(Sum(1/k, (k, 1000000, 2000000)), 15) == '0.693147930560008'
assert NS(Sum(1/k, (k, 1000000, 2000000)),
50) == '0.69314793056000780941723211364567656807940638436025'
def test_evalf_symbolic():
f, g = symbols('f g', cls=Function)
# issue 6328
expr = Sum(f(x), (x, 1, 3)) + Sum(g(x), (x, 1, 3))
assert expr.evalf() == expr
def test_evalf_issue_3273():
assert Sum(0, (k, 1, oo)).evalf() == 0
def test_simple_products():
assert Product(S.NaN, (x, 1, 3)) is S.NaN
assert product(S.NaN, (x, 1, 3)) is S.NaN
assert Product(x, (n, a, a)).doit() == x
assert Product(x, (x, a, a)).doit() == a
assert Product(x, (y, 1, a)).doit() == x**a
lo, hi = 1, 2
s1 = Product(n, (n, lo, hi))
s2 = Product(n, (n, hi, lo))
assert s1 != s2
# This IS correct according to Karr product convention
assert s1.doit() == 2
assert s2.doit() == 1
lo, hi = x, x + 1
s1 = Product(n, (n, lo, hi))
s2 = Product(n, (n, hi, lo))
s3 = 1 / Product(n, (n, hi + 1, lo - 1))
assert s1 != s2
# This IS correct according to Karr product convention
assert s1.doit() == x*(x + 1)
assert s2.doit() == 1
assert s3.doit() == x*(x + 1)
assert Product(Integral(2*x, (x, 1, y)) + 2*x, (x, 1, 2)).doit() == \
(y**2 + 1)*(y**2 + 3)
assert product(2, (n, a, b)) == 2**(b - a + 1)
assert product(n, (n, 1, b)) == factorial(b)
assert product(n**3, (n, 1, b)) == factorial(b)**3
assert product(3**(2 + n), (n, a, b)) \
== 3**(2*(1 - a + b) + b/2 + (b**2)/2 + a/2 - (a**2)/2)
assert product(cos(n), (n, 3, 5)) == cos(3)*cos(4)*cos(5)
assert product(cos(n), (n, x, x + 2)) == cos(x)*cos(x + 1)*cos(x + 2)
assert isinstance(product(cos(n), (n, x, x + S.Half)), Product)
# If Product managed to evaluate this one, it most likely got it wrong!
assert isinstance(Product(n**n, (n, 1, b)), Product)
def test_rational_products():
assert simplify(product(1 + 1/n, (n, a, b))) == (1 + b)/a
assert simplify(product(n + 1, (n, a, b))) == gamma(2 + b)/gamma(1 + a)
assert simplify(product((n + 1)/(n - 1), (n, a, b))) == b*(1 + b)/(a*(a - 1))
assert simplify(product(n/(n + 1)/(n + 2), (n, a, b))) == \
a*gamma(a + 2)/(b + 1)/gamma(b + 3)
assert simplify(product(n*(n + 1)/(n - 1)/(n - 2), (n, a, b))) == \
b**2*(b - 1)*(1 + b)/(a - 1)**2/(a*(a - 2))
def test_wallis_product():
# Wallis product, given in two different forms to ensure that Product
# can factor simple rational expressions
A = Product(4*n**2 / (4*n**2 - 1), (n, 1, b))
B = Product((2*n)*(2*n)/(2*n - 1)/(2*n + 1), (n, 1, b))
R = pi*gamma(b + 1)**2/(2*gamma(b + S.Half)*gamma(b + Rational(3, 2)))
assert simplify(A.doit()) == R
assert simplify(B.doit()) == R
# This one should eventually also be doable (Euler's product formula for sin)
# assert Product(1+x/n**2, (n, 1, b)) == ...
def test_telescopic_sums():
#checks also input 2 of comment 1 issue 4127
assert Sum(1/k - 1/(k + 1), (k, 1, n)).doit() == 1 - 1/(1 + n)
f = Function("f")
assert Sum(
f(k) - f(k + 2), (k, m, n)).doit() == -f(1 + n) - f(2 + n) + f(m) + f(1 + m)
assert Sum(cos(k) - cos(k + 3), (k, 1, n)).doit() == -cos(1 + n) - \
cos(2 + n) - cos(3 + n) + cos(1) + cos(2) + cos(3)
# dummy variable shouldn't matter
assert telescopic(1/m, -m/(1 + m), (m, n - 1, n)) == \
telescopic(1/k, -k/(1 + k), (k, n - 1, n))
assert Sum(1/x/(x - 1), (x, a, b)).doit() == -((a - b - 1)/(b*(a - 1)))
def test_sum_reconstruct():
s = Sum(n**2, (n, -1, 1))
assert s == Sum(*s.args)
raises(ValueError, lambda: Sum(x, x))
raises(ValueError, lambda: Sum(x, (x, 1)))
def test_limit_subs():
for F in (Sum, Product, Integral):
assert F(a*exp(a), (a, -2, 2)) == F(a*exp(a), (a, -b, b)).subs(b, 2)
assert F(a, (a, F(b, (b, 1, 2)), 4)).subs(F(b, (b, 1, 2)), c) == \
F(a, (a, c, 4))
assert F(x, (x, 1, x + y)).subs(x, 1) == F(x, (x, 1, y + 1))
def test_function_subs():
f = Function("f")
S = Sum(x*f(y),(x,0,oo),(y,0,oo))
assert S.subs(f(y),y) == Sum(x*y,(x,0,oo),(y,0,oo))
assert S.subs(f(x),x) == S
raises(ValueError, lambda: S.subs(f(y),x+y) )
S = Sum(x*log(y),(x,0,oo),(y,0,oo))
assert S.subs(log(y),y) == S
S = Sum(x*f(y),(x,0,oo),(y,0,oo))
assert S.subs(f(y),y) == Sum(x*y,(x,0,oo),(y,0,oo))
def test_equality():
# if this fails remove special handling below
raises(ValueError, lambda: Sum(x, x))
r = symbols('x', real=True)
for F in (Sum, Product, Integral):
try:
assert F(x, x) != F(y, y)
assert F(x, (x, 1, 2)) != F(x, x)
assert F(x, (x, x)) != F(x, x) # or else they print the same
assert F(1, x) != F(1, y)
except ValueError:
pass
assert F(a, (x, 1, 2)) != F(a, (x, 1, 3)) # diff limit
assert F(a, (x, 1, x)) != F(a, (y, 1, y))
assert F(a, (x, 1, 2)) != F(b, (x, 1, 2)) # diff expression
assert F(x, (x, 1, 2)) != F(r, (r, 1, 2)) # diff assumptions
assert F(1, (x, 1, x)) != F(1, (y, 1, x)) # only dummy is diff
assert F(1, (x, 1, x)).dummy_eq(F(1, (y, 1, x)))
# issue 5265
assert Sum(x, (x, 1, x)).subs(x, a) == Sum(x, (x, 1, a))
def test_Sum_doit():
f = Function('f')
assert Sum(n*Integral(a**2), (n, 0, 2)).doit() == a**3
assert Sum(n*Integral(a**2), (n, 0, 2)).doit(deep=False) == \
3*Integral(a**2)
assert summation(n*Integral(a**2), (n, 0, 2)) == 3*Integral(a**2)
# test nested sum evaluation
s = Sum( Sum( Sum(2,(z,1,n+1)), (y,x+1,n)), (x,1,n))
assert 0 == (s.doit() - n*(n+1)*(n-1)).factor()
# Integer assumes finite
assert Sum(KroneckerDelta(x, y), (x, -oo, oo)).doit() == Piecewise((1, And(-oo <= y, y < oo)), (0, True))
assert Sum(KroneckerDelta(m, n), (m, -oo, oo)).doit() == 1
assert Sum(m*KroneckerDelta(x, y), (x, -oo, oo)).doit() == Piecewise((m, And(-oo <= y, y < oo)), (0, True))
assert Sum(x*KroneckerDelta(m, n), (m, -oo, oo)).doit() == x
assert Sum(Sum(KroneckerDelta(m, n), (m, 1, 3)), (n, 1, 3)).doit() == 3
assert Sum(Sum(KroneckerDelta(k, m), (m, 1, 3)), (n, 1, 3)).doit() == \
3 * Piecewise((1, And(1 <= k, k <= 3)), (0, True))
assert Sum(f(n) * Sum(KroneckerDelta(m, n), (m, 0, oo)), (n, 1, 3)).doit() == \
f(1) + f(2) + f(3)
assert Sum(f(n) * Sum(KroneckerDelta(m, n), (m, 0, oo)), (n, 1, oo)).doit() == \
Sum(f(n), (n, 1, oo))
# issue 2597
nmax = symbols('N', integer=True, positive=True)
pw = Piecewise((1, And(1 <= n, n <= nmax)), (0, True))
assert Sum(pw, (n, 1, nmax)).doit() == Sum(Piecewise((1, nmax >= n),
(0, True)), (n, 1, nmax))
q, s = symbols('q, s')
assert summation(1/n**(2*s), (n, 1, oo)) == Piecewise((zeta(2*s), 2*s > 1),
(Sum(n**(-2*s), (n, 1, oo)), True))
assert summation(1/(n+1)**s, (n, 0, oo)) == Piecewise((zeta(s), s > 1),
(Sum((n + 1)**(-s), (n, 0, oo)), True))
assert summation(1/(n+q)**s, (n, 0, oo)) == Piecewise(
(zeta(s, q), And(q > 0, s > 1)),
(Sum((n + q)**(-s), (n, 0, oo)), True))
assert summation(1/(n+q)**s, (n, q, oo)) == Piecewise(
(zeta(s, 2*q), And(2*q > 0, s > 1)),
(Sum((n + q)**(-s), (n, q, oo)), True))
assert summation(1/n**2, (n, 1, oo)) == zeta(2)
assert summation(1/n**s, (n, 0, oo)) == Sum(n**(-s), (n, 0, oo))
def test_Product_doit():
assert Product(n*Integral(a**2), (n, 1, 3)).doit() == 2 * a**9 / 9
assert Product(n*Integral(a**2), (n, 1, 3)).doit(deep=False) == \
6*Integral(a**2)**3
assert product(n*Integral(a**2), (n, 1, 3)) == 6*Integral(a**2)**3
def test_Sum_interface():
assert isinstance(Sum(0, (n, 0, 2)), Sum)
assert Sum(nan, (n, 0, 2)) is nan
assert Sum(nan, (n, 0, oo)) is nan
assert Sum(0, (n, 0, 2)).doit() == 0
assert isinstance(Sum(0, (n, 0, oo)), Sum)
assert Sum(0, (n, 0, oo)).doit() == 0
raises(ValueError, lambda: Sum(1))
raises(ValueError, lambda: summation(1))
def test_diff():
assert Sum(x, (x, 1, 2)).diff(x) == 0
assert Sum(x*y, (x, 1, 2)).diff(x) == 0
assert Sum(x*y, (y, 1, 2)).diff(x) == Sum(y, (y, 1, 2))
e = Sum(x*y, (x, 1, a))
assert e.diff(a) == Derivative(e, a)
assert Sum(x*y, (x, 1, 3), (a, 2, 5)).diff(y).doit() == \
Sum(x*y, (x, 1, 3), (a, 2, 5)).doit().diff(y) == 24
assert Sum(x, (x, 1, 2)).diff(y) == 0
def test_hypersum():
from sympy import sin
assert simplify(summation(x**n/fac(n), (n, 1, oo))) == -1 + exp(x)
assert summation((-1)**n * x**(2*n) / fac(2*n), (n, 0, oo)) == cos(x)
assert simplify(summation((-1)**n*x**(2*n + 1) /
factorial(2*n + 1), (n, 3, oo))) == -x + sin(x) + x**3/6 - x**5/120
assert summation(1/(n + 2)**3, (n, 1, oo)) == Rational(-9, 8) + zeta(3)
assert summation(1/n**4, (n, 1, oo)) == pi**4/90
s = summation(x**n*n, (n, -oo, 0))
assert s.is_Piecewise
assert s.args[0].args[0] == -1/(x*(1 - 1/x)**2)
assert s.args[0].args[1] == (abs(1/x) < 1)
m = Symbol('n', integer=True, positive=True)
assert summation(binomial(m, k), (k, 0, m)) == 2**m
def test_issue_4170():
assert summation(1/factorial(k), (k, 0, oo)) == E
def test_is_commutative():
from sympy.physics.secondquant import NO, F, Fd
m = Symbol('m', commutative=False)
for f in (Sum, Product, Integral):
assert f(z, (z, 1, 1)).is_commutative is True
assert f(z*y, (z, 1, 6)).is_commutative is True
assert f(m*x, (x, 1, 2)).is_commutative is False
assert f(NO(Fd(x)*F(y))*z, (z, 1, 2)).is_commutative is False
def test_is_zero():
for func in [Sum, Product]:
assert func(0, (x, 1, 1)).is_zero is True
assert func(x, (x, 1, 1)).is_zero is None
assert Sum(0, (x, 1, 0)).is_zero is True
assert Product(0, (x, 1, 0)).is_zero is False
def test_is_number():
# is number should not rely on evaluation or assumptions,
# it should be equivalent to `not foo.free_symbols`
assert Sum(1, (x, 1, 1)).is_number is True
assert Sum(1, (x, 1, x)).is_number is False
assert Sum(0, (x, y, z)).is_number is False
assert Sum(x, (y, 1, 2)).is_number is False
assert Sum(x, (y, 1, 1)).is_number is False
assert Sum(x, (x, 1, 2)).is_number is True
assert Sum(x*y, (x, 1, 2), (y, 1, 3)).is_number is True
assert Product(2, (x, 1, 1)).is_number is True
assert Product(2, (x, 1, y)).is_number is False
assert Product(0, (x, y, z)).is_number is False
assert Product(1, (x, y, z)).is_number is False
assert Product(x, (y, 1, x)).is_number is False
assert Product(x, (y, 1, 2)).is_number is False
assert Product(x, (y, 1, 1)).is_number is False
assert Product(x, (x, 1, 2)).is_number is True
def test_free_symbols():
for func in [Sum, Product]:
assert func(1, (x, 1, 2)).free_symbols == set()
assert func(0, (x, 1, y)).free_symbols == {y}
assert func(2, (x, 1, y)).free_symbols == {y}
assert func(x, (x, 1, 2)).free_symbols == set()
assert func(x, (x, 1, y)).free_symbols == {y}
assert func(x, (y, 1, y)).free_symbols == {x, y}
assert func(x, (y, 1, 2)).free_symbols == {x}
assert func(x, (y, 1, 1)).free_symbols == {x}
assert func(x, (y, 1, z)).free_symbols == {x, z}
assert func(x, (x, 1, y), (y, 1, 2)).free_symbols == set()
assert func(x, (x, 1, y), (y, 1, z)).free_symbols == {z}
assert func(x, (x, 1, y), (y, 1, y)).free_symbols == {y}
assert func(x, (y, 1, y), (y, 1, z)).free_symbols == {x, z}
assert Sum(1, (x, 1, y)).free_symbols == {y}
# free_symbols answers whether the object *as written* has free symbols,
# not whether the evaluated expression has free symbols
assert Product(1, (x, 1, y)).free_symbols == {y}
def test_conjugate_transpose():
A, B = symbols("A B", commutative=False)
p = Sum(A*B**n, (n, 1, 3))
assert p.adjoint().doit() == p.doit().adjoint()
assert p.conjugate().doit() == p.doit().conjugate()
assert p.transpose().doit() == p.doit().transpose()
p = Sum(B**n*A, (n, 1, 3))
assert p.adjoint().doit() == p.doit().adjoint()
assert p.conjugate().doit() == p.doit().conjugate()
assert p.transpose().doit() == p.doit().transpose()
def test_noncommutativity_honoured():
A, B = symbols("A B", commutative=False)
M = symbols('M', integer=True, positive=True)
p = Sum(A*B**n, (n, 1, M))
assert p.doit() == A*Piecewise((M, Eq(B, 1)),
((B - B**(M + 1))*(1 - B)**(-1), True))
p = Sum(B**n*A, (n, 1, M))
assert p.doit() == Piecewise((M, Eq(B, 1)),
((B - B**(M + 1))*(1 - B)**(-1), True))*A
p = Sum(B**n*A*B**n, (n, 1, M))
assert p.doit() == p
def test_issue_4171():
assert summation(factorial(2*k + 1)/factorial(2*k), (k, 0, oo)) is oo
assert summation(2*k + 1, (k, 0, oo)) is oo
def test_issue_6273():
assert Sum(x, (x, 1, n)).n(2, subs={n: 1}) == 1
def test_issue_6274():
assert Sum(x, (x, 1, 0)).doit() == 0
assert NS(Sum(x, (x, 1, 0))) == '0'
assert Sum(n, (n, 10, 5)).doit() == -30
assert NS(Sum(n, (n, 10, 5))) == '-30.0000000000000'
def test_simplify_sum():
y, t, v = symbols('y, t, v')
_simplify = lambda e: simplify(e, doit=False)
assert _simplify(Sum(x*y, (x, n, m), (y, a, k)) + \
Sum(y, (x, n, m), (y, a, k))) == Sum(y * (x + 1), (x, n, m), (y, a, k))
assert _simplify(Sum(x, (x, n, m)) + Sum(x, (x, m + 1, a))) == \
Sum(x, (x, n, a))
assert _simplify(Sum(x, (x, k + 1, a)) + Sum(x, (x, n, k))) == \
Sum(x, (x, n, a))
assert _simplify(Sum(x, (x, k + 1, a)) + Sum(x + 1, (x, n, k))) == \
Sum(x, (x, n, a)) + Sum(1, (x, n, k))
assert _simplify(Sum(x, (x, 0, 3)) * 3 + 3 * Sum(x, (x, 4, 6)) + \
4 * Sum(z, (z, 0, 1))) == 4*Sum(z, (z, 0, 1)) + 3*Sum(x, (x, 0, 6))
assert _simplify(3*Sum(x**2, (x, a, b)) + Sum(x, (x, a, b))) == \
Sum(x*(3*x + 1), (x, a, b))
assert _simplify(Sum(x**3, (x, n, k)) * 3 + 3 * Sum(x, (x, n, k)) + \
4 * y * Sum(z, (z, n, k))) + 1 == \
4*y*Sum(z, (z, n, k)) + 3*Sum(x**3 + x, (x, n, k)) + 1
assert _simplify(Sum(x, (x, a, b)) + 1 + Sum(x, (x, b + 1, c))) == \
1 + Sum(x, (x, a, c))
assert _simplify(Sum(x, (t, a, b)) + Sum(y, (t, a, b)) + \
Sum(x, (t, b+1, c))) == x * Sum(1, (t, a, c)) + y * Sum(1, (t, a, b))
assert _simplify(Sum(x, (t, a, b)) + Sum(x, (t, b+1, c)) + \
Sum(y, (t, a, b))) == x * Sum(1, (t, a, c)) + y * Sum(1, (t, a, b))
assert _simplify(Sum(x, (t, a, b)) + 2 * Sum(x, (t, b+1, c))) == \
_simplify(Sum(x, (t, a, b)) + Sum(x, (t, b+1, c)) + Sum(x, (t, b+1, c)))
assert _simplify(Sum(x, (x, a, b))*Sum(x**2, (x, a, b))) == \
Sum(x, (x, a, b)) * Sum(x**2, (x, a, b))
assert _simplify(Sum(x, (t, a, b)) + Sum(y, (t, a, b)) + Sum(z, (t, a, b))) \
== (x + y + z) * Sum(1, (t, a, b)) # issue 8596
assert _simplify(Sum(x, (t, a, b)) + Sum(y, (t, a, b)) + Sum(z, (t, a, b)) + \
Sum(v, (t, a, b))) == (x + y + z + v) * Sum(1, (t, a, b)) # issue 8596
assert _simplify(Sum(x * y, (x, a, b)) / (3 * y)) == \
(Sum(x, (x, a, b)) / 3)
assert _simplify(Sum(Function('f')(x) * y * z, (x, a, b)) / (y * z)) \
== Sum(Function('f')(x), (x, a, b))
assert _simplify(Sum(c * x, (x, a, b)) - c * Sum(x, (x, a, b))) == 0
assert _simplify(c * (Sum(x, (x, a, b)) + y)) == c * (y + Sum(x, (x, a, b)))
assert _simplify(c * (Sum(x, (x, a, b)) + y * Sum(x, (x, a, b)))) == \
c * (y + 1) * Sum(x, (x, a, b))
assert _simplify(Sum(Sum(c * x, (x, a, b)), (y, a, b))) == \
c * Sum(x, (x, a, b), (y, a, b))
assert _simplify(Sum((3 + y) * Sum(c * x, (x, a, b)), (y, a, b))) == \
c * Sum((3 + y), (y, a, b)) * Sum(x, (x, a, b))
assert _simplify(Sum((3 + t) * Sum(c * t, (x, a, b)), (y, a, b))) == \
c*t*(t + 3)*Sum(1, (x, a, b))*Sum(1, (y, a, b))
assert _simplify(Sum(Sum(d * t, (x, a, b - 1)) + \
Sum(d * t, (x, b, c)), (t, a, b))) == \
d * Sum(1, (x, a, c)) * Sum(t, (t, a, b))
def test_change_index():
b, v, w = symbols('b, v, w', integer = True)
assert Sum(x, (x, a, b)).change_index(x, x + 1, y) == \
Sum(y - 1, (y, a + 1, b + 1))
assert Sum(x**2, (x, a, b)).change_index( x, x - 1) == \
Sum((x+1)**2, (x, a - 1, b - 1))
assert Sum(x**2, (x, a, b)).change_index( x, -x, y) == \
Sum((-y)**2, (y, -b, -a))
assert Sum(x, (x, a, b)).change_index( x, -x - 1) == \
Sum(-x - 1, (x, -b - 1, -a - 1))
assert Sum(x*y, (x, a, b), (y, c, d)).change_index( x, x - 1, z) == \
Sum((z + 1)*y, (z, a - 1, b - 1), (y, c, d))
assert Sum(x, (x, a, b)).change_index( x, x + v) == \
Sum(-v + x, (x, a + v, b + v))
assert Sum(x, (x, a, b)).change_index( x, -x - v) == \
Sum(-v - x, (x, -b - v, -a - v))
assert Sum(x, (x, a, b)).change_index(x, w*x, v) == \
Sum(v/w, (v, b*w, a*w))
raises(ValueError, lambda: Sum(x, (x, a, b)).change_index(x, 2*x))
def test_reorder():
b, y, c, d, z = symbols('b, y, c, d, z', integer = True)
assert Sum(x*y, (x, a, b), (y, c, d)).reorder((0, 1)) == \
Sum(x*y, (y, c, d), (x, a, b))
assert Sum(x, (x, a, b), (x, c, d)).reorder((0, 1)) == \
Sum(x, (x, c, d), (x, a, b))
assert Sum(x*y + z, (x, a, b), (z, m, n), (y, c, d)).reorder(\
(2, 0), (0, 1)) == Sum(x*y + z, (z, m, n), (y, c, d), (x, a, b))
assert Sum(x*y*z, (x, a, b), (y, c, d), (z, m, n)).reorder(\
(0, 1), (1, 2), (0, 2)) == Sum(x*y*z, (x, a, b), (z, m, n), (y, c, d))
assert Sum(x*y*z, (x, a, b), (y, c, d), (z, m, n)).reorder(\
(x, y), (y, z), (x, z)) == Sum(x*y*z, (x, a, b), (z, m, n), (y, c, d))
assert Sum(x*y, (x, a, b), (y, c, d)).reorder((x, 1)) == \
Sum(x*y, (y, c, d), (x, a, b))
assert Sum(x*y, (x, a, b), (y, c, d)).reorder((y, x)) == \
Sum(x*y, (y, c, d), (x, a, b))
def test_reverse_order():
assert Sum(x, (x, 0, 3)).reverse_order(0) == Sum(-x, (x, 4, -1))
assert Sum(x*y, (x, 1, 5), (y, 0, 6)).reverse_order(0, 1) == \
Sum(x*y, (x, 6, 0), (y, 7, -1))
assert Sum(x, (x, 1, 2)).reverse_order(0) == Sum(-x, (x, 3, 0))
assert Sum(x, (x, 1, 3)).reverse_order(0) == Sum(-x, (x, 4, 0))
assert Sum(x, (x, 1, a)).reverse_order(0) == Sum(-x, (x, a + 1, 0))
assert Sum(x, (x, a, 5)).reverse_order(0) == Sum(-x, (x, 6, a - 1))
assert Sum(x, (x, a + 1, a + 5)).reverse_order(0) == \
Sum(-x, (x, a + 6, a))
assert Sum(x, (x, a + 1, a + 2)).reverse_order(0) == \
Sum(-x, (x, a + 3, a))
assert Sum(x, (x, a + 1, a + 1)).reverse_order(0) == \
Sum(-x, (x, a + 2, a))
assert Sum(x, (x, a, b)).reverse_order(0) == Sum(-x, (x, b + 1, a - 1))
assert Sum(x, (x, a, b)).reverse_order(x) == Sum(-x, (x, b + 1, a - 1))
assert Sum(x*y, (x, a, b), (y, 2, 5)).reverse_order(x, 1) == \
Sum(x*y, (x, b + 1, a - 1), (y, 6, 1))
assert Sum(x*y, (x, a, b), (y, 2, 5)).reverse_order(y, x) == \
Sum(x*y, (x, b + 1, a - 1), (y, 6, 1))
def test_issue_7097():
assert sum(x**n/n for n in range(1, 401)) == summation(x**n/n, (n, 1, 400))
def test_factor_expand_subs():
# test factoring
assert Sum(4 * x, (x, 1, y)).factor() == 4 * Sum(x, (x, 1, y))
assert Sum(x * a, (x, 1, y)).factor() == a * Sum(x, (x, 1, y))
assert Sum(4 * x * a, (x, 1, y)).factor() == 4 * a * Sum(x, (x, 1, y))
assert Sum(4 * x * y, (x, 1, y)).factor() == 4 * y * Sum(x, (x, 1, y))
# test expand
assert Sum(x+1,(x,1,y)).expand() == Sum(x,(x,1,y)) + Sum(1,(x,1,y))
assert Sum(x+a*x**2,(x,1,y)).expand() == Sum(x,(x,1,y)) + Sum(a*x**2,(x,1,y))
assert Sum(x**(n + 1)*(n + 1), (n, -1, oo)).expand() \
== Sum(x*x**n, (n, -1, oo)) + Sum(n*x*x**n, (n, -1, oo))
assert Sum(x**(n + 1)*(n + 1), (n, -1, oo)).expand(power_exp=False) \
== Sum(n*x**(n+1), (n, -1, oo)) + Sum(x**(n+1), (n, -1, oo))
assert Sum(a*n+a*n**2,(n,0,4)).expand() \
== Sum(a*n,(n,0,4)) + Sum(a*n**2,(n,0,4))
assert Sum(x**a*x**n,(x,0,3)) \
== Sum(x**(a+n),(x,0,3)).expand(power_exp=True)
assert Sum(x**(a+n),(x,0,3)) \
== Sum(x**(a+n),(x,0,3)).expand(power_exp=False)
# test subs
assert Sum(1/(1+a*x**2),(x,0,3)).subs([(a,3)]) == Sum(1/(1+3*x**2),(x,0,3))
assert Sum(x*y,(x,0,y),(y,0,x)).subs([(x,3)]) == Sum(x*y,(x,0,y),(y,0,3))
assert Sum(x,(x,1,10)).subs([(x,y-2)]) == Sum(x,(x,1,10))
assert Sum(1/x,(x,1,10)).subs([(x,(3+n)**3)]) == Sum(1/x,(x,1,10))
assert Sum(1/x,(x,1,10)).subs([(x,3*x-2)]) == Sum(1/x,(x,1,10))
def test_distribution_over_equality():
f = Function('f')
assert Product(Eq(x*2, f(x)), (x, 1, 3)).doit() == Eq(48, f(1)*f(2)*f(3))
assert Sum(Eq(f(x), x**2), (x, 0, y)) == \
Eq(Sum(f(x), (x, 0, y)), Sum(x**2, (x, 0, y)))
def test_issue_2787():
n, k = symbols('n k', positive=True, integer=True)
p = symbols('p', positive=True)
binomial_dist = binomial(n, k)*p**k*(1 - p)**(n - k)
s = Sum(binomial_dist*k, (k, 0, n))
res = s.doit().simplify()
assert res == Piecewise(
(n*p, p/Abs(p - 1) <= 1),
((-p + 1)**n*Sum(k*p**k*(-p + 1)**(-k)*binomial(n, k), (k, 0, n)),
True))
# Issue #17165: make sure that another simplify does not change/increase
# the result
assert res == res.simplify()
def test_issue_4668():
assert summation(1/n, (n, 2, oo)) is oo
def test_matrix_sum():
A = Matrix([[0, 1], [n, 0]])
result = Sum(A, (n, 0, 3)).doit()
assert result == Matrix([[0, 4], [6, 0]])
assert result.__class__ == ImmutableDenseMatrix
A = SparseMatrix([[0, 1], [n, 0]])
result = Sum(A, (n, 0, 3)).doit()
assert result.__class__ == ImmutableSparseMatrix
def test_failing_matrix_sum():
n = Symbol('n')
# TODO Implement matrix geometric series summation.
A = Matrix([[0, 1, 0], [-1, 0, 0], [0, 0, 0]])
assert Sum(A ** n, (n, 1, 4)).doit() == \
Matrix([[0, 0, 0], [0, 0, 0], [0, 0, 0]])
# issue sympy/sympy#16989
assert summation(A**n, (n, 1, 1)) == A
def test_indexed_idx_sum():
i = symbols('i', cls=Idx)
r = Indexed('r', i)
assert Sum(r, (i, 0, 3)).doit() == sum([r.xreplace({i: j}) for j in range(4)])
assert Product(r, (i, 0, 3)).doit() == prod([r.xreplace({i: j}) for j in range(4)])
j = symbols('j', integer=True)
assert Sum(r, (i, j, j+2)).doit() == sum([r.xreplace({i: j+k}) for k in range(3)])
assert Product(r, (i, j, j+2)).doit() == prod([r.xreplace({i: j+k}) for k in range(3)])
k = Idx('k', range=(1, 3))
A = IndexedBase('A')
assert Sum(A[k], k).doit() == sum([A[Idx(j, (1, 3))] for j in range(1, 4)])
assert Product(A[k], k).doit() == prod([A[Idx(j, (1, 3))] for j in range(1, 4)])
raises(ValueError, lambda: Sum(A[k], (k, 1, 4)))
raises(ValueError, lambda: Sum(A[k], (k, 0, 3)))
raises(ValueError, lambda: Sum(A[k], (k, 2, oo)))
raises(ValueError, lambda: Product(A[k], (k, 1, 4)))
raises(ValueError, lambda: Product(A[k], (k, 0, 3)))
raises(ValueError, lambda: Product(A[k], (k, 2, oo)))
def test_is_convergent():
# divergence tests --
assert Sum(n/(2*n + 1), (n, 1, oo)).is_convergent() is S.false
assert Sum(factorial(n)/5**n, (n, 1, oo)).is_convergent() is S.false
assert Sum(3**(-2*n - 1)*n**n, (n, 1, oo)).is_convergent() is S.false
assert Sum((-1)**n*n, (n, 3, oo)).is_convergent() is S.false
assert Sum((-1)**n, (n, 1, oo)).is_convergent() is S.false
assert Sum(log(1/n), (n, 2, oo)).is_convergent() is S.false
# root test --
assert Sum((-12)**n/n, (n, 1, oo)).is_convergent() is S.false
# integral test --
# p-series test --
assert Sum(1/(n**2 + 1), (n, 1, oo)).is_convergent() is S.true
assert Sum(1/n**Rational(6, 5), (n, 1, oo)).is_convergent() is S.true
assert Sum(2/(n*sqrt(n - 1)), (n, 2, oo)).is_convergent() is S.true
assert Sum(1/(sqrt(n)*sqrt(n)), (n, 2, oo)).is_convergent() is S.false
# comparison test --
assert Sum(1/(n + log(n)), (n, 1, oo)).is_convergent() is S.false
assert Sum(1/(n**2*log(n)), (n, 2, oo)).is_convergent() is S.true
assert Sum(1/(n*log(n)), (n, 2, oo)).is_convergent() is S.false
assert Sum(2/(n*log(n)*log(log(n))**2), (n, 5, oo)).is_convergent() is S.true
assert Sum(2/(n*log(n)**2), (n, 2, oo)).is_convergent() is S.true
assert Sum((n - 1)/(n**2*log(n)**3), (n, 2, oo)).is_convergent() is S.true
assert Sum(1/(n*log(n)*log(log(n))), (n, 5, oo)).is_convergent() is S.false
assert Sum((n - 1)/(n*log(n)**3), (n, 3, oo)).is_convergent() is S.false
assert Sum(2/(n**2*log(n)), (n, 2, oo)).is_convergent() is S.true
assert Sum(1/(n*sqrt(log(n))*log(log(n))), (n, 100, oo)).is_convergent() is S.false
assert Sum(log(log(n))/(n*log(n)**2), (n, 100, oo)).is_convergent() is S.true
assert Sum(log(n)/n**2, (n, 5, oo)).is_convergent() is S.true
# alternating series tests --
assert Sum((-1)**(n - 1)/(n**2 - 1), (n, 3, oo)).is_convergent() is S.true
# with -negativeInfinite Limits
assert Sum(1/(n**2 + 1), (n, -oo, 1)).is_convergent() is S.true
assert Sum(1/(n - 1), (n, -oo, -1)).is_convergent() is S.false
assert Sum(1/(n**2 - 1), (n, -oo, -5)).is_convergent() is S.true
assert Sum(1/(n**2 - 1), (n, -oo, 2)).is_convergent() is S.true
assert Sum(1/(n**2 - 1), (n, -oo, oo)).is_convergent() is S.true
# piecewise functions
f = Piecewise((n**(-2), n <= 1), (n**2, n > 1))
assert Sum(f, (n, 1, oo)).is_convergent() is S.false
assert Sum(f, (n, -oo, oo)).is_convergent() is S.false
assert Sum(f, (n, 1, 100)).is_convergent() is S.true
#assert Sum(f, (n, -oo, 1)).is_convergent() is S.true
# integral test
assert Sum(log(n)/n**3, (n, 1, oo)).is_convergent() is S.true
assert Sum(-log(n)/n**3, (n, 1, oo)).is_convergent() is S.true
# the following function has maxima located at (x, y) =
# (1.2, 0.43), (3.0, -0.25) and (6.8, 0.050)
eq = (x - 2)*(x**2 - 6*x + 4)*exp(-x)
assert Sum(eq, (x, 1, oo)).is_convergent() is S.true
assert Sum(eq, (x, 1, 2)).is_convergent() is S.true
assert Sum(1/(x**3), (x, 1, oo)).is_convergent() is S.true
assert Sum(1/(x**S.Half), (x, 1, oo)).is_convergent() is S.false
# issue 19545
assert Sum(1/n - 3/(3*n +2), (n, 1, oo)).is_convergent() is S.true
def test_is_absolutely_convergent():
assert Sum((-1)**n, (n, 1, oo)).is_absolutely_convergent() is S.false
assert Sum((-1)**n/n**2, (n, 1, oo)).is_absolutely_convergent() is S.true
@XFAIL
def test_convergent_failing():
# dirichlet tests
assert Sum(sin(n)/n, (n, 1, oo)).is_convergent() is S.true
assert Sum(sin(2*n)/n, (n, 1, oo)).is_convergent() is S.true
def test_issue_6966():
i, k, m = symbols('i k m', integer=True)
z_i, q_i = symbols('z_i q_i')
a_k = Sum(-q_i*z_i/k,(i,1,m))
b_k = a_k.diff(z_i)
assert isinstance(b_k, Sum)
assert b_k == Sum(-q_i/k,(i,1,m))
def test_issue_10156():
cx = Sum(2*y**2*x, (x, 1,3))
e = 2*y*Sum(2*cx*x**2, (x, 1, 9))
assert e.factor() == \
8*y**3*Sum(x, (x, 1, 3))*Sum(x**2, (x, 1, 9))
def test_issue_14129():
assert Sum( k*x**k, (k, 0, n-1)).doit() == \
Piecewise((n**2/2 - n/2, Eq(x, 1)), ((n*x*x**n -
n*x**n - x*x**n + x)/(x - 1)**2, True))
assert Sum( x**k, (k, 0, n-1)).doit() == \
Piecewise((n, Eq(x, 1)), ((-x**n + 1)/(-x + 1), True))
assert Sum( k*(x/y+x)**k, (k, 0, n-1)).doit() == \
Piecewise((n*(n - 1)/2, Eq(x, y/(y + 1))),
(x*(y + 1)*(n*x*y*(x + x/y)**n/(x + x/y)
+ n*x*(x + x/y)**n/(x + x/y) - n*y*(x
+ x/y)**n/(x + x/y) - x*y*(x + x/y)**n/(x
+ x/y) - x*(x + x/y)**n/(x + x/y) + y)/(x*y
+ x - y)**2, True))
def test_issue_14112():
assert Sum((-1)**n/sqrt(n), (n, 1, oo)).is_absolutely_convergent() is S.false
assert Sum((-1)**(2*n)/n, (n, 1, oo)).is_convergent() is S.false
assert Sum((-2)**n + (-3)**n, (n, 1, oo)).is_convergent() is S.false
def test_sin_times_absolutely_convergent():
assert Sum(sin(n) / n**3, (n, 1, oo)).is_convergent() is S.true
assert Sum(sin(n) * log(n) / n**3, (n, 1, oo)).is_convergent() is S.true
def test_issue_14111():
assert Sum(1/log(log(n)), (n, 22, oo)).is_convergent() is S.false
def test_issue_14484():
raises(NotImplementedError, lambda: Sum(sin(n)/log(log(n)), (n, 22, oo)).is_convergent())
def test_issue_14640():
i, n = symbols("i n", integer=True)
a, b, c = symbols("a b c")
assert Sum(a**-i/(a - b), (i, 0, n)).doit() == Sum(
1/(a*a**i - a**i*b), (i, 0, n)).doit() == Piecewise(
(n + 1, Eq(1/a, 1)),
((-a**(-n - 1) + 1)/(1 - 1/a), True))/(a - b)
assert Sum((b*a**i - c*a**i)**-2, (i, 0, n)).doit() == Piecewise(
(n + 1, Eq(a**(-2), 1)),
((-a**(-2*n - 2) + 1)/(1 - 1/a**2), True))/(b - c)**2
s = Sum(i*(a**(n - i) - b**(n - i))/(a - b), (i, 0, n)).doit()
assert not s.has(Sum)
assert s.subs({a: 2, b: 3, n: 5}) == 122
def test_issue_15943():
s = Sum(binomial(n, k)*factorial(n - k), (k, 0, n)).doit().rewrite(gamma)
assert s == -E*(n + 1)*gamma(n + 1)*lowergamma(n + 1, 1)/gamma(n + 2
) + E*gamma(n + 1)
assert s.simplify() == E*(factorial(n) - lowergamma(n + 1, 1))
def test_Sum_dummy_eq():
assert not Sum(x, (x, a, b)).dummy_eq(1)
assert not Sum(x, (x, a, b)).dummy_eq(Sum(x, (x, a, b), (a, 1, 2)))
assert not Sum(x, (x, a, b)).dummy_eq(Sum(x, (x, a, c)))
assert Sum(x, (x, a, b)).dummy_eq(Sum(x, (x, a, b)))
d = Dummy()
assert Sum(x, (x, a, d)).dummy_eq(Sum(x, (x, a, c)), c)
assert not Sum(x, (x, a, d)).dummy_eq(Sum(x, (x, a, c)))
assert Sum(x, (x, a, c)).dummy_eq(Sum(y, (y, a, c)))
assert Sum(x, (x, a, d)).dummy_eq(Sum(y, (y, a, c)), c)
assert not Sum(x, (x, a, d)).dummy_eq(Sum(y, (y, a, c)))
def test_issue_15852():
assert summation(x**y*y, (y, -oo, oo)).doit() == Sum(x**y*y, (y, -oo, oo))
def test_exceptions():
S = Sum(x, (x, a, b))
raises(ValueError, lambda: S.change_index(x, x**2, y))
S = Sum(x, (x, a, b), (x, 1, 4))
raises(ValueError, lambda: S.index(x))
S = Sum(x, (x, a, b), (y, 1, 4))
raises(ValueError, lambda: S.reorder([x]))
S = Sum(x, (x, y, b), (y, 1, 4))
raises(ReorderError, lambda: S.reorder_limit(0, 1))
S = Sum(x*y, (x, a, b), (y, 1, 4))
raises(NotImplementedError, lambda: S.is_convergent())
def test_sumproducts_assumptions():
M = Symbol('M', integer=True, positive=True)
m = Symbol('m', integer=True)
for func in [Sum, Product]:
assert func(m, (m, -M, M)).is_positive is None
assert func(m, (m, -M, M)).is_nonpositive is None
assert func(m, (m, -M, M)).is_negative is None
assert func(m, (m, -M, M)).is_nonnegative is None
assert func(m, (m, -M, M)).is_finite is True
m = Symbol('m', integer=True, nonnegative=True)
for func in [Sum, Product]:
assert func(m, (m, 0, M)).is_positive is None
assert func(m, (m, 0, M)).is_nonpositive is None
assert func(m, (m, 0, M)).is_negative is False
assert func(m, (m, 0, M)).is_nonnegative is True
assert func(m, (m, 0, M)).is_finite is True
m = Symbol('m', integer=True, positive=True)
for func in [Sum, Product]:
assert func(m, (m, 1, M)).is_positive is True
assert func(m, (m, 1, M)).is_nonpositive is False
assert func(m, (m, 1, M)).is_negative is False
assert func(m, (m, 1, M)).is_nonnegative is True
assert func(m, (m, 1, M)).is_finite is True
m = Symbol('m', integer=True, negative=True)
assert Sum(m, (m, -M, -1)).is_positive is False
assert Sum(m, (m, -M, -1)).is_nonpositive is True
assert Sum(m, (m, -M, -1)).is_negative is True
assert Sum(m, (m, -M, -1)).is_nonnegative is False
assert Sum(m, (m, -M, -1)).is_finite is True
assert Product(m, (m, -M, -1)).is_positive is None
assert Product(m, (m, -M, -1)).is_nonpositive is None
assert Product(m, (m, -M, -1)).is_negative is None
assert Product(m, (m, -M, -1)).is_nonnegative is None
assert Product(m, (m, -M, -1)).is_finite is True
m = Symbol('m', integer=True, nonpositive=True)
assert Sum(m, (m, -M, 0)).is_positive is False
assert Sum(m, (m, -M, 0)).is_nonpositive is True
assert Sum(m, (m, -M, 0)).is_negative is None
assert Sum(m, (m, -M, 0)).is_nonnegative is None
assert Sum(m, (m, -M, 0)).is_finite is True
assert Product(m, (m, -M, 0)).is_positive is None
assert Product(m, (m, -M, 0)).is_nonpositive is None
assert Product(m, (m, -M, 0)).is_negative is None
assert Product(m, (m, -M, 0)).is_nonnegative is None
assert Product(m, (m, -M, 0)).is_finite is True
m = Symbol('m', integer=True)
assert Sum(2, (m, 0, oo)).is_positive is None
assert Sum(2, (m, 0, oo)).is_nonpositive is None
assert Sum(2, (m, 0, oo)).is_negative is None
assert Sum(2, (m, 0, oo)).is_nonnegative is None
assert Sum(2, (m, 0, oo)).is_finite is None
assert Product(2, (m, 0, oo)).is_positive is None
assert Product(2, (m, 0, oo)).is_nonpositive is None
assert Product(2, (m, 0, oo)).is_negative is False
assert Product(2, (m, 0, oo)).is_nonnegative is None
assert Product(2, (m, 0, oo)).is_finite is None
assert Product(0, (x, M, M-1)).is_positive is True
assert Product(0, (x, M, M-1)).is_finite is True
def test_expand_with_assumptions():
M = Symbol('M', integer=True, positive=True)
x = Symbol('x', positive=True)
m = Symbol('m', nonnegative=True)
assert log(Product(x**m, (m, 0, M))).expand() == Sum(m*log(x), (m, 0, M))
assert log(Product(exp(x**m), (m, 0, M))).expand() == Sum(x**m, (m, 0, M))
assert log(Product(x**m, (m, 0, M))).rewrite(Sum).expand() == Sum(m*log(x), (m, 0, M))
assert log(Product(exp(x**m), (m, 0, M))).rewrite(Sum).expand() == Sum(x**m, (m, 0, M))
n = Symbol('n', nonnegative=True)
i, j = symbols('i,j', positive=True, integer=True)
x, y = symbols('x,y', positive=True)
assert log(Product(x**i*y**j, (i, 1, n), (j, 1, m))).expand() \
== Sum(i*log(x) + j*log(y), (i, 1, n), (j, 1, m))
def test_has_finite_limits():
x = Symbol('x')
assert Sum(1, (x, 1, 9)).has_finite_limits is True
assert Sum(1, (x, 1, oo)).has_finite_limits is False
M = Symbol('M')
assert Sum(1, (x, 1, M)).has_finite_limits is None
M = Symbol('M', positive=True)
assert Sum(1, (x, 1, M)).has_finite_limits is True
x = Symbol('x', positive=True)
M = Symbol('M')
assert Sum(1, (x, 1, M)).has_finite_limits is True
assert Sum(1, (x, 1, M), (y, -oo, oo)).has_finite_limits is False
def test_has_reversed_limits():
assert Sum(1, (x, 1, 1)).has_reversed_limits is False
assert Sum(1, (x, 1, 9)).has_reversed_limits is False
assert Sum(1, (x, 1, -9)).has_reversed_limits is True
assert Sum(1, (x, 1, 0)).has_reversed_limits is True
assert Sum(1, (x, 1, oo)).has_reversed_limits is False
M = Symbol('M')
assert Sum(1, (x, 1, M)).has_reversed_limits is None
M = Symbol('M', positive=True, integer=True)
assert Sum(1, (x, 1, M)).has_reversed_limits is False
assert Sum(1, (x, 1, M), (y, -oo, oo)).has_reversed_limits is False
M = Symbol('M', negative=True)
assert Sum(1, (x, 1, M)).has_reversed_limits is True
assert Sum(1, (x, 1, M), (y, -oo, oo)).has_reversed_limits is True
assert Sum(1, (x, oo, oo)).has_reversed_limits is None
def test_has_empty_sequence():
assert Sum(1, (x, 1, 1)).has_empty_sequence is False
assert Sum(1, (x, 1, 9)).has_empty_sequence is False
assert Sum(1, (x, 1, -9)).has_empty_sequence is False
assert Sum(1, (x, 1, 0)).has_empty_sequence is True
assert Sum(1, (x, y, y - 1)).has_empty_sequence is True
assert Sum(1, (x, 3, 2), (y, -oo, oo)).has_empty_sequence is True
assert Sum(1, (y, -oo, oo), (x, 3, 2)).has_empty_sequence is True
assert Sum(1, (x, oo, oo)).has_empty_sequence is False
def test_empty_sequence():
assert Product(x*y, (x, -oo, oo), (y, 1, 0)).doit() == 1
assert Product(x*y, (y, 1, 0), (x, -oo, oo)).doit() == 1
assert Sum(x, (x, -oo, oo), (y, 1, 0)).doit() == 0
assert Sum(x, (y, 1, 0), (x, -oo, oo)).doit() == 0
def test_issue_8016():
k = Symbol('k', integer=True)
n, m = symbols('n, m', integer=True, positive=True)
s = Sum(binomial(m, k)*binomial(m, n - k)*(-1)**k, (k, 0, n))
assert s.doit().simplify() == \
cos(pi*n/2)*gamma(m + 1)/gamma(n/2 + 1)/gamma(m - n/2 + 1)
@XFAIL
def test_issue_14313():
assert Sum(S.Half**floor(n/2), (n, 1, oo)).is_convergent()
@XFAIL
def test_issue_14871():
assert Sum((Rational(1, 10))**x*RisingFactorial(0, x)/factorial(x), (x, 0, oo)).rewrite(factorial).doit() == 1
def test_issue_17165():
n = symbols("n", integer=True)
x = symbols('x')
s = (x*Sum(x**n, (n, -1, oo)))
ssimp = s.doit().simplify()
assert ssimp == Piecewise((-1/(x - 1), Abs(x) < 1),
(x*Sum(x**n, (n, -1, oo)), True))
assert ssimp == ssimp.simplify()
def test__dummy_with_inherited_properties_concrete():
x = Symbol('x')
from sympy import Tuple
d = _dummy_with_inherited_properties_concrete(Tuple(x, 0, 5))
assert d.is_real
assert d.is_integer
assert d.is_nonnegative
assert d.is_extended_nonnegative
d = _dummy_with_inherited_properties_concrete(Tuple(x, 1, 9))
assert d.is_real
assert d.is_integer
assert d.is_positive
assert d.is_odd is None
d = _dummy_with_inherited_properties_concrete(Tuple(x, -5, 5))
assert d.is_real
assert d.is_integer
assert d.is_positive is None
assert d.is_extended_nonnegative is None
assert d.is_odd is None
d = _dummy_with_inherited_properties_concrete(Tuple(x, -1.5, 1.5))
assert d.is_real
assert d.is_integer is None
assert d.is_positive is None
assert d.is_extended_nonnegative is None
N = Symbol('N', integer=True, positive=True)
d = _dummy_with_inherited_properties_concrete(Tuple(x, 2, N))
assert d.is_real
assert d.is_positive
assert d.is_integer
# Return None if no assumptions are added
N = Symbol('N', integer=True, positive=True)
d = _dummy_with_inherited_properties_concrete(Tuple(N, 2, 4))
assert d is None
x = Symbol('x', negative=True)
raises(InconsistentAssumptions,
lambda: _dummy_with_inherited_properties_concrete(Tuple(x, 1, 5)))
def test_matrixsymbol_summation_numerical_limits():
A = MatrixSymbol('A', 3, 3)
n = Symbol('n', integer=True)
assert Sum(A**n, (n, 0, 2)).doit() == Identity(3) + A + A**2
assert Sum(A, (n, 0, 2)).doit() == 3*A
assert Sum(n*A, (n, 0, 2)).doit() == 3*A
B = Matrix([[0, n, 0], [-1, 0, 0], [0, 0, 2]])
ans = Matrix([[0, 6, 0], [-4, 0, 0], [0, 0, 8]]) + 4*A
assert Sum(A+B, (n, 0, 3)).doit() == ans
ans = A*Matrix([[0, 6, 0], [-4, 0, 0], [0, 0, 8]])
assert Sum(A*B, (n, 0, 3)).doit() == ans
ans = (A**2*Matrix([[-2, 0, 0], [0,-2, 0], [0, 0, 4]]) +
A**3*Matrix([[0, -9, 0], [3, 0, 0], [0, 0, 8]]) +
A*Matrix([[0, 1, 0], [-1, 0, 0], [0, 0, 2]]))
assert Sum(A**n*B**n, (n, 1, 3)).doit() == ans
@XFAIL
def test_matrixsymbol_summation_symbolic_limits():
N = Symbol('N', integer=True, positive=True)
A = MatrixSymbol('A', 3, 3)
n = Symbol('n', integer=True)
assert Sum(A, (n, 0, N)).doit() == (N+1)*A
assert Sum(n*A, (n, 0, N)).doit() == (N**2/2+N/2)*A
|
b833f4821e5a97d20bd0fa671bb94f630aa9a6c4760faaa26ac95e9d08613b30
|
from sympy import (symbols, Symbol, oo, Sum, harmonic, exp, Add, S, binomial,
factorial, log, fibonacci, subfactorial, sin, cos, pi, I, sqrt, Rational)
from sympy.series.limitseq import limit_seq
from sympy.series.limitseq import difference_delta as dd
from sympy.testing.pytest import raises, XFAIL
from sympy.calculus.util import AccumulationBounds
n, m, k = symbols('n m k', integer=True)
def test_difference_delta():
e = n*(n + 1)
e2 = e * k
assert dd(e) == 2*n + 2
assert dd(e2, n, 2) == k*(4*n + 6)
raises(ValueError, lambda: dd(e2))
raises(ValueError, lambda: dd(e2, n, oo))
def test_difference_delta__Sum():
e = Sum(1/k, (k, 1, n))
assert dd(e, n) == 1/(n + 1)
assert dd(e, n, 5) == Add(*[1/(i + n + 1) for i in range(5)])
e = Sum(1/k, (k, 1, 3*n))
assert dd(e, n) == Add(*[1/(i + 3*n + 1) for i in range(3)])
e = n * Sum(1/k, (k, 1, n))
assert dd(e, n) == 1 + Sum(1/k, (k, 1, n))
e = Sum(1/k, (k, 1, n), (m, 1, n))
assert dd(e, n) == harmonic(n)
def test_difference_delta__Add():
e = n + n*(n + 1)
assert dd(e, n) == 2*n + 3
assert dd(e, n, 2) == 4*n + 8
e = n + Sum(1/k, (k, 1, n))
assert dd(e, n) == 1 + 1/(n + 1)
assert dd(e, n, 5) == 5 + Add(*[1/(i + n + 1) for i in range(5)])
def test_difference_delta__Pow():
e = 4**n
assert dd(e, n) == 3*4**n
assert dd(e, n, 2) == 15*4**n
e = 4**(2*n)
assert dd(e, n) == 15*4**(2*n)
assert dd(e, n, 2) == 255*4**(2*n)
e = n**4
assert dd(e, n) == (n + 1)**4 - n**4
e = n**n
assert dd(e, n) == (n + 1)**(n + 1) - n**n
def test_limit_seq():
e = binomial(2*n, n) / Sum(binomial(2*k, k), (k, 1, n))
assert limit_seq(e) == S(3) / 4
assert limit_seq(e, m) == e
e = (5*n**3 + 3*n**2 + 4) / (3*n**3 + 4*n - 5)
assert limit_seq(e, n) == S(5) / 3
e = (harmonic(n) * Sum(harmonic(k), (k, 1, n))) / (n * harmonic(2*n)**2)
assert limit_seq(e, n) == 1
e = Sum(k**2 * Sum(2**m/m, (m, 1, k)), (k, 1, n)) / (2**n*n)
assert limit_seq(e, n) == 4
e = (Sum(binomial(3*k, k) * binomial(5*k, k), (k, 1, n)) /
(binomial(3*n, n) * binomial(5*n, n)))
assert limit_seq(e, n) == S(84375) / 83351
e = Sum(harmonic(k)**2/k, (k, 1, 2*n)) / harmonic(n)**3
assert limit_seq(e, n) == S.One / 3
raises(ValueError, lambda: limit_seq(e * m))
def test_alternating_sign():
assert limit_seq((-1)**n/n**2, n) == 0
assert limit_seq((-2)**(n+1)/(n + 3**n), n) == 0
assert limit_seq((2*n + (-1)**n)/(n + 1), n) == 2
assert limit_seq(sin(pi*n), n) == 0
assert limit_seq(cos(2*pi*n), n) == 1
assert limit_seq((S.NegativeOne/5)**n, n) == 0
assert limit_seq((Rational(-1, 5))**n, n) == 0
assert limit_seq((I/3)**n, n) == 0
assert limit_seq(sqrt(n)*(I/2)**n, n) == 0
assert limit_seq(n**7*(I/3)**n, n) == 0
assert limit_seq(n/(n + 1) + (I/2)**n, n) == 1
def test_accum_bounds():
assert limit_seq((-1)**n, n) == AccumulationBounds(-1, 1)
assert limit_seq(cos(pi*n), n) == AccumulationBounds(-1, 1)
assert limit_seq(sin(pi*n/2)**2, n) == AccumulationBounds(0, 1)
assert limit_seq(2*(-3)**n/(n + 3**n), n) == AccumulationBounds(-2, 2)
assert limit_seq(3*n/(n + 1) + 2*(-1)**n, n) == AccumulationBounds(1, 5)
def test_limitseq_sum():
from sympy.abc import x, y, z
assert limit_seq(Sum(1/x, (x, 1, y)) - log(y), y) == S.EulerGamma
assert limit_seq(Sum(1/x, (x, 1, y)) - 1/y, y) is S.Infinity
assert (limit_seq(binomial(2*x, x) / Sum(binomial(2*y, y), (y, 1, x)), x) ==
S(3) / 4)
assert (limit_seq(Sum(y**2 * Sum(2**z/z, (z, 1, y)), (y, 1, x)) /
(2**x*x), x) == 4)
def test_issue_9308():
assert limit_seq(subfactorial(n)/factorial(n), n) == exp(-1)
def test_issue_10382():
n = Symbol('n', integer=True)
assert limit_seq(fibonacci(n+1)/fibonacci(n), n) == S.GoldenRatio
@XFAIL
def test_limit_seq_fail():
# improve Summation algorithm or add ad-hoc criteria
e = (harmonic(n)**3 * Sum(1/harmonic(k), (k, 1, n)) /
(n * Sum(harmonic(k)/k, (k, 1, n))))
assert limit_seq(e, n) == 2
# No unique dominant term
e = (Sum(2**k * binomial(2*k, k) / k**2, (k, 1, n)) /
(Sum(2**k/k*2, (k, 1, n)) * Sum(binomial(2*k, k), (k, 1, n))))
assert limit_seq(e, n) == S(3) / 7
# Simplifications of summations needs to be improved.
e = n**3*Sum(2**k/k**2, (k, 1, n))**2 / (2**n * Sum(2**k/k, (k, 1, n)))
assert limit_seq(e, n) == 2
e = (harmonic(n) * Sum(2**k/k, (k, 1, n)) /
(n * Sum(2**k*harmonic(k)/k**2, (k, 1, n))))
assert limit_seq(e, n) == 1
e = (Sum(2**k*factorial(k) / k**2, (k, 1, 2*n)) /
(Sum(4**k/k**2, (k, 1, n)) * Sum(factorial(k), (k, 1, 2*n))))
assert limit_seq(e, n) == S(3) / 16
|
509d3f01f8041aec619382b11989aaea9fcc53ab6339a313d08c1010e589df16
|
from sympy import Symbol, exp, log, oo, Rational, I, sin, gamma, loggamma, S, \
atan, acot, pi, cancel, E, erf, sqrt, zeta, cos, digamma, Integer, Ei, EulerGamma
from sympy.functions.elementary.hyperbolic import cosh, coth, sinh, tanh
from sympy.series.gruntz import compare, mrv, rewrite, mrv_leadterm, gruntz, \
sign
from sympy.testing.pytest import XFAIL, skip, slow
"""
This test suite is testing the limit algorithm using the bottom up approach.
See the documentation in limits2.py. The algorithm itself is highly recursive
by nature, so "compare" is logically the lowest part of the algorithm, yet in
some sense it's the most complex part, because it needs to calculate a limit
to return the result.
Nevertheless, the rest of the algorithm depends on compare working correctly.
"""
x = Symbol('x', real=True)
m = Symbol('m', real=True)
runslow = False
def _sskip():
if not runslow:
skip("slow")
@slow
def test_gruntz_evaluation():
# Gruntz' thesis pp. 122 to 123
# 8.1
assert gruntz(exp(x)*(exp(1/x - exp(-x)) - exp(1/x)), x, oo) == -1
# 8.2
assert gruntz(exp(x)*(exp(1/x + exp(-x) + exp(-x**2))
- exp(1/x - exp(-exp(x)))), x, oo) == 1
# 8.3
assert gruntz(exp(exp(x - exp(-x))/(1 - 1/x)) - exp(exp(x)), x, oo) is oo
# 8.5
assert gruntz(exp(exp(exp(x + exp(-x)))) / exp(exp(exp(x))), x, oo) is oo
# 8.6
assert gruntz(exp(exp(exp(x))) / exp(exp(exp(x - exp(-exp(x))))),
x, oo) is oo
# 8.7
assert gruntz(exp(exp(exp(x))) / exp(exp(exp(x - exp(-exp(exp(x)))))),
x, oo) == 1
# 8.8
assert gruntz(exp(exp(x)) / exp(exp(x - exp(-exp(exp(x))))), x, oo) == 1
# 8.9
assert gruntz(log(x)**2 * exp(sqrt(log(x))*(log(log(x)))**2
* exp(sqrt(log(log(x))) * (log(log(log(x))))**3)) / sqrt(x),
x, oo) == 0
# 8.10
assert gruntz((x*log(x)*(log(x*exp(x) - x**2))**2)
/ (log(log(x**2 + 2*exp(exp(3*x**3*log(x)))))), x, oo) == Rational(1, 3)
# 8.11
assert gruntz((exp(x*exp(-x)/(exp(-x) + exp(-2*x**2/(x + 1)))) - exp(x))/x,
x, oo) == -exp(2)
# 8.12
assert gruntz((3**x + 5**x)**(1/x), x, oo) == 5
# 8.13
assert gruntz(x/log(x**(log(x**(log(2)/log(x))))), x, oo) is oo
# 8.14
assert gruntz(exp(exp(2*log(x**5 + x)*log(log(x))))
/ exp(exp(10*log(x)*log(log(x)))), x, oo) is oo
# 8.15
assert gruntz(exp(exp(Rational(5, 2)*x**Rational(-5, 7) + Rational(21, 8)*x**Rational(6, 11)
+ 2*x**(-8) + Rational(54, 17)*x**Rational(49, 45)))**8
/ log(log(-log(Rational(4, 3)*x**Rational(-5, 14))))**Rational(7, 6), x, oo) is oo
# 8.16
assert gruntz((exp(4*x*exp(-x)/(1/exp(x) + 1/exp(2*x**2/(x + 1)))) - exp(x))
/ exp(x)**4, x, oo) == 1
# 8.17
assert gruntz(exp(x*exp(-x)/(exp(-x) + exp(-2*x**2/(x + 1))))/exp(x), x, oo) \
== 1
# 8.19
assert gruntz(log(x)*(log(log(x) + log(log(x))) - log(log(x)))
/ (log(log(x) + log(log(log(x))))), x, oo) == 1
# 8.20
assert gruntz(exp((log(log(x + exp(log(x)*log(log(x))))))
/ (log(log(log(exp(x) + x + log(x)))))), x, oo) == E
# Another
assert gruntz(exp(exp(exp(x + exp(-x)))) / exp(exp(x)), x, oo) is oo
def test_gruntz_evaluation_slow():
_sskip()
# 8.4
assert gruntz(exp(exp(exp(x)/(1 - 1/x)))
- exp(exp(exp(x)/(1 - 1/x - log(x)**(-log(x))))), x, oo) is -oo
# 8.18
assert gruntz((exp(exp(-x/(1 + exp(-x))))*exp(-x/(1 + exp(-x/(1 + exp(-x)))))
*exp(exp(-x + exp(-x/(1 + exp(-x))))))
/ (exp(-x/(1 + exp(-x))))**2 - exp(x) + x, x, oo) == 2
@slow
def test_gruntz_eval_special():
# Gruntz, p. 126
assert gruntz(exp(x)*(sin(1/x + exp(-x)) - sin(1/x + exp(-x**2))), x, oo) == 1
assert gruntz((erf(x - exp(-exp(x))) - erf(x)) * exp(exp(x)) * exp(x**2),
x, oo) == -2/sqrt(pi)
assert gruntz(exp(exp(x)) * (exp(sin(1/x + exp(-exp(x)))) - exp(sin(1/x))),
x, oo) == 1
assert gruntz(exp(x)*(gamma(x + exp(-x)) - gamma(x)), x, oo) is oo
assert gruntz(exp(exp(digamma(digamma(x))))/x, x, oo) == exp(Rational(-1, 2))
assert gruntz(exp(exp(digamma(log(x))))/x, x, oo) == exp(Rational(-1, 2))
assert gruntz(digamma(digamma(digamma(x))), x, oo) is oo
assert gruntz(loggamma(loggamma(x)), x, oo) is oo
assert gruntz(((gamma(x + 1/gamma(x)) - gamma(x))/log(x) - cos(1/x))
* x*log(x), x, oo) == Rational(-1, 2)
assert gruntz(x * (gamma(x - 1/gamma(x)) - gamma(x) + log(x)), x, oo) \
== S.Half
assert gruntz((gamma(x + 1/gamma(x)) - gamma(x)) / log(x), x, oo) == 1
def test_gruntz_eval_special_slow():
_sskip()
assert gruntz(gamma(x + 1)/sqrt(2*pi)
- exp(-x)*(x**(x + S.Half) + x**(x - S.Half)/12), x, oo) is oo
assert gruntz(exp(exp(exp(digamma(digamma(digamma(x))))))/x, x, oo) == 0
@XFAIL
def test_grunts_eval_special_slow_sometimes_fail():
_sskip()
# XXX This sometimes fails!!!
assert gruntz(exp(gamma(x - exp(-x))*exp(1/x)) - exp(gamma(x)), x, oo) is oo
@XFAIL
def test_gruntz_eval_special_fail():
# TODO exponential integral Ei
assert gruntz(
(Ei(x - exp(-exp(x))) - Ei(x)) *exp(-x)*exp(exp(x))*x, x, oo) == -1
# TODO zeta function series
assert gruntz(
exp((log(2) + 1)*x) * (zeta(x + exp(-x)) - zeta(x)), x, oo) == -log(2)
# TODO 8.35 - 8.37 (bessel, max-min)
def test_gruntz_hyperbolic():
assert gruntz(cosh(x), x, oo) is oo
assert gruntz(cosh(x), x, -oo) is oo
assert gruntz(sinh(x), x, oo) is oo
assert gruntz(sinh(x), x, -oo) is -oo
assert gruntz(2*cosh(x)*exp(x), x, oo) is oo
assert gruntz(2*cosh(x)*exp(x), x, -oo) == 1
assert gruntz(2*sinh(x)*exp(x), x, oo) is oo
assert gruntz(2*sinh(x)*exp(x), x, -oo) == -1
assert gruntz(tanh(x), x, oo) == 1
assert gruntz(tanh(x), x, -oo) == -1
assert gruntz(coth(x), x, oo) == 1
assert gruntz(coth(x), x, -oo) == -1
def test_compare1():
assert compare(2, x, x) == "<"
assert compare(x, exp(x), x) == "<"
assert compare(exp(x), exp(x**2), x) == "<"
assert compare(exp(x**2), exp(exp(x)), x) == "<"
assert compare(1, exp(exp(x)), x) == "<"
assert compare(x, 2, x) == ">"
assert compare(exp(x), x, x) == ">"
assert compare(exp(x**2), exp(x), x) == ">"
assert compare(exp(exp(x)), exp(x**2), x) == ">"
assert compare(exp(exp(x)), 1, x) == ">"
assert compare(2, 3, x) == "="
assert compare(3, -5, x) == "="
assert compare(2, -5, x) == "="
assert compare(x, x**2, x) == "="
assert compare(x**2, x**3, x) == "="
assert compare(x**3, 1/x, x) == "="
assert compare(1/x, x**m, x) == "="
assert compare(x**m, -x, x) == "="
assert compare(exp(x), exp(-x), x) == "="
assert compare(exp(-x), exp(2*x), x) == "="
assert compare(exp(2*x), exp(x)**2, x) == "="
assert compare(exp(x)**2, exp(x + exp(-x)), x) == "="
assert compare(exp(x), exp(x + exp(-x)), x) == "="
assert compare(exp(x**2), 1/exp(x**2), x) == "="
def test_compare2():
assert compare(exp(x), x**5, x) == ">"
assert compare(exp(x**2), exp(x)**2, x) == ">"
assert compare(exp(x), exp(x + exp(-x)), x) == "="
assert compare(exp(x + exp(-x)), exp(x), x) == "="
assert compare(exp(x + exp(-x)), exp(-x), x) == "="
assert compare(exp(-x), x, x) == ">"
assert compare(x, exp(-x), x) == "<"
assert compare(exp(x + 1/x), x, x) == ">"
assert compare(exp(-exp(x)), exp(x), x) == ">"
assert compare(exp(exp(-exp(x)) + x), exp(-exp(x)), x) == "<"
def test_compare3():
assert compare(exp(exp(x)), exp(x + exp(-exp(x))), x) == ">"
def test_sign1():
assert sign(Rational(0), x) == 0
assert sign(Rational(3), x) == 1
assert sign(Rational(-5), x) == -1
assert sign(log(x), x) == 1
assert sign(exp(-x), x) == 1
assert sign(exp(x), x) == 1
assert sign(-exp(x), x) == -1
assert sign(3 - 1/x, x) == 1
assert sign(-3 - 1/x, x) == -1
assert sign(sin(1/x), x) == 1
assert sign((x**Integer(2)), x) == 1
assert sign(x**2, x) == 1
assert sign(x**5, x) == 1
def test_sign2():
assert sign(x, x) == 1
assert sign(-x, x) == -1
y = Symbol("y", positive=True)
assert sign(y, x) == 1
assert sign(-y, x) == -1
assert sign(y*x, x) == 1
assert sign(-y*x, x) == -1
def mmrv(a, b):
return set(mrv(a, b)[0].keys())
def test_mrv1():
assert mmrv(x, x) == {x}
assert mmrv(x + 1/x, x) == {x}
assert mmrv(x**2, x) == {x}
assert mmrv(log(x), x) == {x}
assert mmrv(exp(x), x) == {exp(x)}
assert mmrv(exp(-x), x) == {exp(-x)}
assert mmrv(exp(x**2), x) == {exp(x**2)}
assert mmrv(-exp(1/x), x) == {x}
assert mmrv(exp(x + 1/x), x) == {exp(x + 1/x)}
def test_mrv2a():
assert mmrv(exp(x + exp(-exp(x))), x) == {exp(-exp(x))}
assert mmrv(exp(x + exp(-x)), x) == {exp(x + exp(-x)), exp(-x)}
assert mmrv(exp(1/x + exp(-x)), x) == {exp(-x)}
#sometimes infinite recursion due to log(exp(x**2)) not simplifying
def test_mrv2b():
assert mmrv(exp(x + exp(-x**2)), x) == {exp(-x**2)}
#sometimes infinite recursion due to log(exp(x**2)) not simplifying
def test_mrv2c():
assert mmrv(
exp(-x + 1/x**2) - exp(x + 1/x), x) == {exp(x + 1/x), exp(1/x**2 - x)}
#sometimes infinite recursion due to log(exp(x**2)) not simplifying
def test_mrv3():
assert mmrv(exp(x**2) + x*exp(x) + log(x)**x/x, x) == {exp(x**2)}
assert mmrv(
exp(x)*(exp(1/x + exp(-x)) - exp(1/x)), x) == {exp(x), exp(-x)}
assert mmrv(log(
x**2 + 2*exp(exp(3*x**3*log(x)))), x) == {exp(exp(3*x**3*log(x)))}
assert mmrv(log(x - log(x))/log(x), x) == {x}
assert mmrv(
(exp(1/x - exp(-x)) - exp(1/x))*exp(x), x) == {exp(x), exp(-x)}
assert mmrv(
1/exp(-x + exp(-x)) - exp(x), x) == {exp(x), exp(-x), exp(x - exp(-x))}
assert mmrv(log(log(x*exp(x*exp(x)) + 1)), x) == {exp(x*exp(x))}
assert mmrv(exp(exp(log(log(x) + 1/x))), x) == {x}
def test_mrv4():
ln = log
assert mmrv((ln(ln(x) + ln(ln(x))) - ln(ln(x)))/ln(ln(x) + ln(ln(ln(x))))*ln(x),
x) == {x}
assert mmrv(log(log(x*exp(x*exp(x)) + 1)) - exp(exp(log(log(x) + 1/x))), x) == \
{exp(x*exp(x))}
def mrewrite(a, b, c):
return rewrite(a[1], a[0], b, c)
def test_rewrite1():
e = exp(x)
assert mrewrite(mrv(e, x), x, m) == (1/m, -x)
e = exp(x**2)
assert mrewrite(mrv(e, x), x, m) == (1/m, -x**2)
e = exp(x + 1/x)
assert mrewrite(mrv(e, x), x, m) == (1/m, -x - 1/x)
e = 1/exp(-x + exp(-x)) - exp(x)
assert mrewrite(mrv(e, x), x, m) == (1/(m*exp(m)) - 1/m, -x)
def test_rewrite2():
e = exp(x)*log(log(exp(x)))
assert mmrv(e, x) == {exp(x)}
assert mrewrite(mrv(e, x), x, m) == (1/m*log(x), -x)
#sometimes infinite recursion due to log(exp(x**2)) not simplifying
def test_rewrite3():
e = exp(-x + 1/x**2) - exp(x + 1/x)
#both of these are correct and should be equivalent:
assert mrewrite(mrv(e, x), x, m) in [(-1/m + m*exp(
1/x + 1/x**2), -x - 1/x), (m - 1/m*exp(1/x + x**(-2)), x**(-2) - x)]
def test_mrv_leadterm1():
assert mrv_leadterm(-exp(1/x), x) == (-1, 0)
assert mrv_leadterm(1/exp(-x + exp(-x)) - exp(x), x) == (-1, 0)
assert mrv_leadterm(
(exp(1/x - exp(-x)) - exp(1/x))*exp(x), x) == (-exp(1/x), 0)
def test_mrv_leadterm2():
#Gruntz: p51, 3.25
assert mrv_leadterm((log(exp(x) + x) - x)/log(exp(x) + log(x))*exp(x), x) == \
(1, 0)
def test_mrv_leadterm3():
#Gruntz: p56, 3.27
assert mmrv(exp(-x + exp(-x)*exp(-x*log(x))), x) == {exp(-x - x*log(x))}
assert mrv_leadterm(exp(-x + exp(-x)*exp(-x*log(x))), x) == (exp(-x), 0)
def test_limit1():
assert gruntz(x, x, oo) is oo
assert gruntz(x, x, -oo) is -oo
assert gruntz(-x, x, oo) is -oo
assert gruntz(x**2, x, -oo) is oo
assert gruntz(-x**2, x, oo) is -oo
assert gruntz(x*log(x), x, 0, dir="+") == 0
assert gruntz(1/x, x, oo) == 0
assert gruntz(exp(x), x, oo) is oo
assert gruntz(-exp(x), x, oo) is -oo
assert gruntz(exp(x)/x, x, oo) is oo
assert gruntz(1/x - exp(-x), x, oo) == 0
assert gruntz(x + 1/x, x, oo) is oo
def test_limit2():
assert gruntz(x**x, x, 0, dir="+") == 1
assert gruntz((exp(x) - 1)/x, x, 0) == 1
assert gruntz(1 + 1/x, x, oo) == 1
assert gruntz(-exp(1/x), x, oo) == -1
assert gruntz(x + exp(-x), x, oo) is oo
assert gruntz(x + exp(-x**2), x, oo) is oo
assert gruntz(x + exp(-exp(x)), x, oo) is oo
assert gruntz(13 + 1/x - exp(-x), x, oo) == 13
def test_limit3():
a = Symbol('a')
assert gruntz(x - log(1 + exp(x)), x, oo) == 0
assert gruntz(x - log(a + exp(x)), x, oo) == 0
assert gruntz(exp(x)/(1 + exp(x)), x, oo) == 1
assert gruntz(exp(x)/(a + exp(x)), x, oo) == 1
def test_limit4():
#issue 3463
assert gruntz((3**x + 5**x)**(1/x), x, oo) == 5
#issue 3463
assert gruntz((3**(1/x) + 5**(1/x))**x, x, 0) == 5
@XFAIL
def test_MrvTestCase_page47_ex3_21():
h = exp(-x/(1 + exp(-x)))
expr = exp(h)*exp(-x/(1 + h))*exp(exp(-x + h))/h**2 - exp(x) + x
expected = {1/h, exp(x), exp(x - h), exp(x/(1 + h))}
# XXX Incorrect result
assert mrv(expr, x).difference(expected) == set()
def test_I():
y = Symbol("y")
assert gruntz(I*x, x, oo) == I*oo
assert gruntz(y*I*x, x, oo) == y*I*oo
assert gruntz(y*3*I*x, x, oo) == y*I*oo
assert gruntz(y*3*sin(I)*x, x, oo).simplify() == y*I*oo
def test_issue_4814():
assert gruntz((x + 1)**(1/log(x + 1)), x, oo) == E
def test_intractable():
assert gruntz(1/gamma(x), x, oo) == 0
assert gruntz(1/loggamma(x), x, oo) == 0
assert gruntz(gamma(x)/loggamma(x), x, oo) is oo
assert gruntz(exp(gamma(x))/gamma(x), x, oo) is oo
assert gruntz(gamma(x), x, 3) == 2
assert gruntz(gamma(Rational(1, 7) + 1/x), x, oo) == gamma(Rational(1, 7))
assert gruntz(log(x**x)/log(gamma(x)), x, oo) == 1
assert gruntz(log(gamma(gamma(x)))/exp(x), x, oo) is oo
def test_aseries_trig():
assert cancel(gruntz(1/log(atan(x)), x, oo)
- 1/(log(pi) + log(S.Half))) == 0
assert gruntz(1/acot(x), x, -oo) is -oo
def test_exp_log_series():
assert gruntz(x/log(log(x*exp(x))), x, oo) is oo
def test_issue_3644():
assert gruntz(((x**7 + x + 1)/(2**x + x**2))**(-1/x), x, oo) == 2
def test_issue_6843():
n = Symbol('n', integer=True, positive=True)
r = (n + 1)*x**(n + 1)/(x**(n + 1) - 1) - x/(x - 1)
assert gruntz(r, x, 1).simplify() == n/2
def test_issue_4190():
assert gruntz(x - gamma(1/x), x, oo) == S.EulerGamma
@XFAIL
def test_issue_5172():
n = Symbol('n')
r = Symbol('r', positive=True)
c = Symbol('c')
p = Symbol('p', positive=True)
m = Symbol('m', negative=True)
expr = ((2*n*(n - r + 1)/(n + r*(n - r + 1)))**c + \
(r - 1)*(n*(n - r + 2)/(n + r*(n - r + 1)))**c - n)/(n**c - n)
expr = expr.subs(c, c + 1)
assert gruntz(expr.subs(c, m), n, oo) == 1
# fail:
assert gruntz(expr.subs(c, p), n, oo).simplify() == \
(2**(p + 1) + r - 1)/(r + 1)**(p + 1)
def test_issue_4109():
assert gruntz(1/gamma(x), x, 0) == 0
assert gruntz(x*gamma(x), x, 0) == 1
def test_issue_6682():
assert gruntz(exp(2*Ei(-x))/x**2, x, 0) == exp(2*EulerGamma)
def test_issue_7096():
from sympy.functions import sign
assert gruntz(x**-pi, x, 0, dir='-') == oo*sign((-1)**(-pi))
|
e0a0207102dbe194d70015f95a0ebe28028dc2d7e7f090ab1e0e7ef131605946
|
from sympy import sin, cos, exp, E, series, oo, S, Derivative, O, Integral, \
Function, PoleError, log, sqrt, N, Symbol, Subs, pi, symbols, atan, LambertW, Rational
from sympy.abc import x, y, n, k
from sympy.testing.pytest import raises
from sympy.series.gruntz import calculate_series
def test_sin():
e1 = sin(x).series(x, 0)
e2 = series(sin(x), x, 0)
assert e1 == e2
def test_cos():
e1 = cos(x).series(x, 0)
e2 = series(cos(x), x, 0)
assert e1 == e2
def test_exp():
e1 = exp(x).series(x, 0)
e2 = series(exp(x), x, 0)
assert e1 == e2
def test_exp2():
e1 = exp(cos(x)).series(x, 0)
e2 = series(exp(cos(x)), x, 0)
assert e1 == e2
def test_issue_5223():
assert series(1, x) == 1
assert next(S.Zero.lseries(x)) == 0
assert cos(x).series() == cos(x).series(x)
raises(ValueError, lambda: cos(x + y).series())
raises(ValueError, lambda: x.series(dir=""))
assert (cos(x).series(x, 1) -
cos(x + 1).series(x).subs(x, x - 1)).removeO() == 0
e = cos(x).series(x, 1, n=None)
assert [next(e) for i in range(2)] == [cos(1), -((x - 1)*sin(1))]
e = cos(x).series(x, 1, n=None, dir='-')
assert [next(e) for i in range(2)] == [cos(1), (1 - x)*sin(1)]
# the following test is exact so no need for x -> x - 1 replacement
assert abs(x).series(x, 1, dir='-') == x
assert exp(x).series(x, 1, dir='-', n=3).removeO() == \
E - E*(-x + 1) + E*(-x + 1)**2/2
D = Derivative
assert D(x**2 + x**3*y**2, x, 2, y, 1).series(x).doit() == 12*x*y
assert next(D(cos(x), x).lseries()) == D(1, x)
assert D(
exp(x), x).series(n=3) == D(1, x) + D(x, x) + D(x**2/2, x) + D(x**3/6, x) + O(x**3)
assert Integral(x, (x, 1, 3), (y, 1, x)).series(x) == -4 + 4*x
assert (1 + x + O(x**2)).getn() == 2
assert (1 + x).getn() is None
raises(PoleError, lambda: ((1/sin(x))**oo).series())
logx = Symbol('logx')
assert ((sin(x))**y).nseries(x, n=1, logx=logx) == \
exp(y*logx) + O(x*exp(y*logx), x)
assert sin(1/x).series(x, oo, n=5) == 1/x - 1/(6*x**3) + O(x**(-5), (x, oo))
assert abs(x).series(x, oo, n=5, dir='+') == x
assert abs(x).series(x, -oo, n=5, dir='-') == -x
assert abs(-x).series(x, oo, n=5, dir='+') == x
assert abs(-x).series(x, -oo, n=5, dir='-') == -x
assert exp(x*log(x)).series(n=3) == \
1 + x*log(x) + x**2*log(x)**2/2 + O(x**3*log(x)**3)
# XXX is this right? If not, fix "ngot > n" handling in expr.
p = Symbol('p', positive=True)
assert exp(sqrt(p)**3*log(p)).series(n=3) == \
1 + p**S('3/2')*log(p) + O(p**3*log(p)**3)
assert exp(sin(x)*log(x)).series(n=2) == 1 + x*log(x) + O(x**2*log(x)**2)
def test_issue_11313():
assert Integral(cos(x), x).series(x) == sin(x).series(x)
assert Derivative(sin(x), x).series(x, n=3).doit() == cos(x).series(x, n=3)
assert Derivative(x**3, x).as_leading_term(x) == 3*x**2
assert Derivative(x**3, y).as_leading_term(x) == 0
assert Derivative(sin(x), x).as_leading_term(x) == 1
assert Derivative(cos(x), x).as_leading_term(x) == -x
# This result is equivalent to zero, zero is not return because
# `Expr.series` doesn't currently detect an `x` in its `free_symbol`s.
assert Derivative(1, x).as_leading_term(x) == Derivative(1, x)
assert Derivative(exp(x), x).series(x).doit() == exp(x).series(x)
assert 1 + Integral(exp(x), x).series(x) == exp(x).series(x)
assert Derivative(log(x), x).series(x).doit() == (1/x).series(x)
assert Integral(log(x), x).series(x) == Integral(log(x), x).doit().series(x).removeO()
def test_series_of_Subs():
from sympy.abc import x, y, z
subs1 = Subs(sin(x), x, y)
subs2 = Subs(sin(x) * cos(z), x, y)
subs3 = Subs(sin(x * z), (x, z), (y, x))
assert subs1.series(x) == subs1
subs1_series = (Subs(x, x, y) + Subs(-x**3/6, x, y) +
Subs(x**5/120, x, y) + O(y**6))
assert subs1.series() == subs1_series
assert subs1.series(y) == subs1_series
assert subs1.series(z) == subs1
assert subs2.series(z) == (Subs(z**4*sin(x)/24, x, y) +
Subs(-z**2*sin(x)/2, x, y) + Subs(sin(x), x, y) + O(z**6))
assert subs3.series(x).doit() == subs3.doit().series(x)
assert subs3.series(z).doit() == sin(x*y)
raises(ValueError, lambda: Subs(x + 2*y, y, z).series())
assert Subs(x + y, y, z).series(x).doit() == x + z
def test_issue_3978():
f = Function('f')
assert f(x).series(x, 0, 3, dir='-') == \
f(0) + x*Subs(Derivative(f(x), x), x, 0) + \
x**2*Subs(Derivative(f(x), x, x), x, 0)/2 + O(x**3)
assert f(x).series(x, 0, 3) == \
f(0) + x*Subs(Derivative(f(x), x), x, 0) + \
x**2*Subs(Derivative(f(x), x, x), x, 0)/2 + O(x**3)
assert f(x**2).series(x, 0, 3) == \
f(0) + x**2*Subs(Derivative(f(x), x), x, 0) + O(x**3)
assert f(x**2+1).series(x, 0, 3) == \
f(1) + x**2*Subs(Derivative(f(x), x), x, 1) + O(x**3)
class TestF(Function):
pass
assert TestF(x).series(x, 0, 3) == TestF(0) + \
x*Subs(Derivative(TestF(x), x), x, 0) + \
x**2*Subs(Derivative(TestF(x), x, x), x, 0)/2 + O(x**3)
from sympy.series.acceleration import richardson, shanks
from sympy import Sum, Integer
def test_acceleration():
e = (1 + 1/n)**n
assert round(richardson(e, n, 10, 20).evalf(), 10) == round(E.evalf(), 10)
A = Sum(Integer(-1)**(k + 1) / k, (k, 1, n))
assert round(shanks(A, n, 25).evalf(), 4) == round(log(2).evalf(), 4)
assert round(shanks(A, n, 25, 5).evalf(), 10) == round(log(2).evalf(), 10)
def test_issue_5852():
assert series(1/cos(x/log(x)), x, 0) == 1 + x**2/(2*log(x)**2) + \
5*x**4/(24*log(x)**4) + O(x**6)
def test_issue_4583():
assert cos(1 + x + x**2).series(x, 0, 5) == cos(1) - x*sin(1) + \
x**2*(-sin(1) - cos(1)/2) + x**3*(-cos(1) + sin(1)/6) + \
x**4*(-11*cos(1)/24 + sin(1)/2) + O(x**5)
def test_issue_6318():
eq = (1/x)**Rational(2, 3)
assert (eq + 1).as_leading_term(x) == eq
def test_x_is_base_detection():
eq = (x**2)**Rational(2, 3)
assert eq.series() == x**Rational(4, 3)
def test_sin_power():
e = sin(x)**1.2
assert calculate_series(e, x) == x**1.2
def test_issue_7203():
assert series(cos(x), x, pi, 3) == \
-1 + (x - pi)**2/2 + O((x - pi)**3, (x, pi))
def test_exp_product_positive_factors():
a, b = symbols('a, b', positive=True)
x = a * b
assert series(exp(x), x, n=8) == 1 + a*b + a**2*b**2/2 + \
a**3*b**3/6 + a**4*b**4/24 + a**5*b**5/120 + a**6*b**6/720 + \
a**7*b**7/5040 + O(a**8*b**8, a, b)
def test_issue_8805():
assert series(1, n=8) == 1
def test_issue_9549():
y = (x**2 + x + 1) / (x**3 + x**2)
assert series(y, x, oo) == x**(-5) - 1/x**4 + x**(-3) + 1/x + O(x**(-6), (x, oo))
def test_issue_10761():
assert series(1/(x**-2 + x**-3), x, 0) == x**3 - x**4 + x**5 + O(x**6)
def test_issue_12578():
y = (1 - 1/(x/2 - 1/(2*x))**4)**(S(1)/8)
assert y.series(x, 0, n=17) == 1 - 2*x**4 - 8*x**6 - 34*x**8 - 152*x**10 - 714*x**12 - \
3472*x**14 - 17318*x**16 + O(x**17)
def test_issue_14885():
assert series(x**Rational(-3, 2)*exp(x), x, 0) == (x**Rational(-3, 2) + 1/sqrt(x) +
sqrt(x)/2 + x**Rational(3, 2)/6 + x**Rational(5, 2)/24 + x**Rational(7, 2)/120 +
x**Rational(9, 2)/720 + x**Rational(11, 2)/5040 + O(x**6))
def test_issue_15539():
assert series(atan(x), x, -oo) == (-1/(5*x**5) + 1/(3*x**3) - 1/x - pi/2
+ O(x**(-6), (x, -oo)))
assert series(atan(x), x, oo) == (-1/(5*x**5) + 1/(3*x**3) - 1/x + pi/2
+ O(x**(-6), (x, oo)))
def test_issue_7259():
assert series(LambertW(x), x) == x - x**2 + 3*x**3/2 - 8*x**4/3 + 125*x**5/24 + O(x**6)
assert series(LambertW(x**2), x, n=8) == x**2 - x**4 + 3*x**6/2 + O(x**8)
assert series(LambertW(sin(x)), x, n=4) == x - x**2 + 4*x**3/3 + O(x**4)
def test_issue_11884():
assert cos(x).series(x, 1, n=1) == cos(1) + O(x - 1, (x, 1))
def test_issue_18008():
y = x*(1 + x*(1 - x))/((1 + x*(1 - x)) - (1 - x)*(1 - x))
assert y.series(x, oo, n=4) == -9/(32*x**3) - 3/(16*x**2) - 1/(8*x) + S(1)/4 + x/2 + \
O(x**(-4), (x, oo))
def test_issue_19534():
dt = symbols('dt', real=True)
expr = 16*dt*(0.125*dt*(2.0*dt + 1.0) + 0.875*dt + 1.0)/45 + \
49*dt*(-0.049335189898860408029*dt*(2.0*dt + 1.0) + \
0.29601113939316244817*dt*(0.125*dt*(2.0*dt + 1.0) + 0.875*dt + 1.0) - \
0.12564355335492979587*dt*(0.074074074074074074074*dt*(2.0*dt + 1.0) + \
0.2962962962962962963*dt*(0.125*dt*(2.0*dt + 1.0) + 0.875*dt + 1.0) + \
0.96296296296296296296*dt + 1.0) + 0.051640768506639183825*dt + \
dt*(1/2 - sqrt(21)/14) + 1.0)/180 + 49*dt*(-0.23637909581542530626*dt*(2.0*dt + 1.0) - \
0.74817562366625959291*dt*(0.125*dt*(2.0*dt + 1.0) + 0.875*dt + 1.0) + \
0.88085458023927036857*dt*(0.074074074074074074074*dt*(2.0*dt + 1.0) + \
0.2962962962962962963*dt*(0.125*dt*(2.0*dt + 1.0) + 0.875*dt + 1.0) + \
0.96296296296296296296*dt + 1.0) + \
2.1165151389911680013*dt*(-0.049335189898860408029*dt*(2.0*dt + 1.0) + \
0.29601113939316244817*dt*(0.125*dt*(2.0*dt + 1.0) + 0.875*dt + 1.0) - \
0.12564355335492979587*dt*(0.074074074074074074074*dt*(2.0*dt + 1.0) + \
0.2962962962962962963*dt*(0.125*dt*(2.0*dt + 1.0) + 0.875*dt + 1.0) + \
0.96296296296296296296*dt + 1.0) + 0.22431393315265061193*dt + 1.0) - \
1.1854881643947648988*dt + dt*(sqrt(21)/14 + 1/2) + 1.0)/180 + \
dt*(0.66666666666666666667*dt*(2.0*dt + 1.0) + \
6.0173399699313066769*dt*(0.125*dt*(2.0*dt + 1.0) + 0.875*dt + 1.0) - \
4.1117044797036320069*dt*(0.074074074074074074074*dt*(2.0*dt + 1.0) + \
0.2962962962962962963*dt*(0.125*dt*(2.0*dt + 1.0) + 0.875*dt + 1.0) + \
0.96296296296296296296*dt + 1.0) - \
7.0189140975801991157*dt*(-0.049335189898860408029*dt*(2.0*dt + 1.0) + \
0.29601113939316244817*dt*(0.125*dt*(2.0*dt + 1.0) + 0.875*dt + 1.0) - \
0.12564355335492979587*dt*(0.074074074074074074074*dt*(2.0*dt + 1.0) + \
0.2962962962962962963*dt*(0.125*dt*(2.0*dt + 1.0) + 0.875*dt + 1.0) + \
0.96296296296296296296*dt + 1.0) + 0.22431393315265061193*dt + 1.0) + \
0.94010945196161777522*dt*(-0.23637909581542530626*dt*(2.0*dt + 1.0) - \
0.74817562366625959291*dt*(0.125*dt*(2.0*dt + 1.0) + 0.875*dt + 1.0) + \
0.88085458023927036857*dt*(0.074074074074074074074*dt*(2.0*dt + 1.0) + \
0.2962962962962962963*dt*(0.125*dt*(2.0*dt + 1.0) + 0.875*dt + 1.0) + \
0.96296296296296296296*dt + 1.0) + \
2.1165151389911680013*dt*(-0.049335189898860408029*dt*(2.0*dt + 1.0) + \
0.29601113939316244817*dt*(0.125*dt*(2.0*dt + 1.0) + 0.875*dt + 1.0) - \
0.12564355335492979587*dt*(0.074074074074074074074*dt*(2.0*dt + 1.0) + \
0.2962962962962962963*dt*(0.125*dt*(2.0*dt + 1.0) + 0.875*dt + 1.0) + \
0.96296296296296296296*dt + 1.0) + 0.22431393315265061193*dt + 1.0) - \
0.35816132904077632692*dt + 1.0) + 5.5065024887242400038*dt + 1.0)/20 + dt/20 + 1
assert N(expr.series(dt, 0, 8), 20) == -0.00092592592592592596126*dt**7 + 0.0027777777777777783175*dt**6 + \
0.016666666666666656027*dt**5 + 0.083333333333333300952*dt**4 + 0.33333333333333337034*dt**3 + \
1.0*dt**2 + 1.0*dt + 1.0
|
06f132e44f4b0322fe65600197f13fd078671179d0f4b7fe3a157437d4dd8f28
|
from sympy import (Symbol, Rational, Order, exp, ln, log, nan, oo, O, pi, I,
S, Integral, sin, cos, sqrt, conjugate, expand, transpose, symbols,
Function, Add)
from sympy.core.expr import unchanged
from sympy.testing.pytest import raises
from sympy.abc import w, x, y, z
def test_caching_bug():
#needs to be a first test, so that all caches are clean
#cache it
O(w)
#and test that this won't raise an exception
O(w**(-1/x/log(3)*log(5)), w)
def test_free_symbols():
assert Order(1).free_symbols == set()
assert Order(x).free_symbols == {x}
assert Order(1, x).free_symbols == {x}
assert Order(x*y).free_symbols == {x, y}
assert Order(x, x, y).free_symbols == {x, y}
def test_simple_1():
o = Rational(0)
assert Order(2*x) == Order(x)
assert Order(x)*3 == Order(x)
assert -28*Order(x) == Order(x)
assert Order(Order(x)) == Order(x)
assert Order(Order(x), y) == Order(Order(x), x, y)
assert Order(-23) == Order(1)
assert Order(exp(x)) == Order(1, x)
assert Order(exp(1/x)).expr == exp(1/x)
assert Order(x*exp(1/x)).expr == x*exp(1/x)
assert Order(x**(o/3)).expr == x**(o/3)
assert Order(x**(o*Rational(5, 3))).expr == x**(o*Rational(5, 3))
assert Order(x**2 + x + y, x) == O(1, x)
assert Order(x**2 + x + y, y) == O(1, y)
raises(ValueError, lambda: Order(exp(x), x, x))
raises(TypeError, lambda: Order(x, 2 - x))
def test_simple_2():
assert Order(2*x)*x == Order(x**2)
assert Order(2*x)/x == Order(1, x)
assert Order(2*x)*x*exp(1/x) == Order(x**2*exp(1/x))
assert (Order(2*x)*x*exp(1/x)/ln(x)**3).expr == x**2*exp(1/x)*ln(x)**-3
def test_simple_3():
assert Order(x) + x == Order(x)
assert Order(x) + 2 == 2 + Order(x)
assert Order(x) + x**2 == Order(x)
assert Order(x) + 1/x == 1/x + Order(x)
assert Order(1/x) + 1/x**2 == 1/x**2 + Order(1/x)
assert Order(x) + exp(1/x) == Order(x) + exp(1/x)
def test_simple_4():
assert Order(x)**2 == Order(x**2)
def test_simple_5():
assert Order(x) + Order(x**2) == Order(x)
assert Order(x) + Order(x**-2) == Order(x**-2)
assert Order(x) + Order(1/x) == Order(1/x)
def test_simple_6():
assert Order(x) - Order(x) == Order(x)
assert Order(x) + Order(1) == Order(1)
assert Order(x) + Order(x**2) == Order(x)
assert Order(1/x) + Order(1) == Order(1/x)
assert Order(x) + Order(exp(1/x)) == Order(exp(1/x))
assert Order(x**3) + Order(exp(2/x)) == Order(exp(2/x))
assert Order(x**-3) + Order(exp(2/x)) == Order(exp(2/x))
def test_simple_7():
assert 1 + O(1) == O(1)
assert 2 + O(1) == O(1)
assert x + O(1) == O(1)
assert 1/x + O(1) == 1/x + O(1)
def test_simple_8():
assert O(sqrt(-x)) == O(sqrt(x))
assert O(x**2*sqrt(x)) == O(x**Rational(5, 2))
assert O(x**3*sqrt(-(-x)**3)) == O(x**Rational(9, 2))
assert O(x**Rational(3, 2)*sqrt((-x)**3)) == O(x**3)
assert O(x*(-2*x)**(I/2)) == O(x*(-x)**(I/2))
def test_as_expr_variables():
assert Order(x).as_expr_variables(None) == (x, ((x, 0),))
assert Order(x).as_expr_variables((((x, 0),))) == (x, ((x, 0),))
assert Order(y).as_expr_variables(((x, 0),)) == (y, ((x, 0), (y, 0)))
assert Order(y).as_expr_variables(((x, 0), (y, 0))) == (y, ((x, 0), (y, 0)))
def test_contains_0():
assert Order(1, x).contains(Order(1, x))
assert Order(1, x).contains(Order(1))
assert Order(1).contains(Order(1, x)) is False
def test_contains_1():
assert Order(x).contains(Order(x))
assert Order(x).contains(Order(x**2))
assert not Order(x**2).contains(Order(x))
assert not Order(x).contains(Order(1/x))
assert not Order(1/x).contains(Order(exp(1/x)))
assert not Order(x).contains(Order(exp(1/x)))
assert Order(1/x).contains(Order(x))
assert Order(exp(1/x)).contains(Order(x))
assert Order(exp(1/x)).contains(Order(1/x))
assert Order(exp(1/x)).contains(Order(exp(1/x)))
assert Order(exp(2/x)).contains(Order(exp(1/x)))
assert not Order(exp(1/x)).contains(Order(exp(2/x)))
def test_contains_2():
assert Order(x).contains(Order(y)) is None
assert Order(x).contains(Order(y*x))
assert Order(y*x).contains(Order(x))
assert Order(y).contains(Order(x*y))
assert Order(x).contains(Order(y**2*x))
def test_contains_3():
assert Order(x*y**2).contains(Order(x**2*y)) is None
assert Order(x**2*y).contains(Order(x*y**2)) is None
def test_contains_4():
assert Order(sin(1/x**2)).contains(Order(cos(1/x**2))) is None
assert Order(cos(1/x**2)).contains(Order(sin(1/x**2))) is None
def test_contains():
assert Order(1, x) not in Order(1)
assert Order(1) in Order(1, x)
raises(TypeError, lambda: Order(x*y**2) in Order(x**2*y))
def test_add_1():
assert Order(x + x) == Order(x)
assert Order(3*x - 2*x**2) == Order(x)
assert Order(1 + x) == Order(1, x)
assert Order(1 + 1/x) == Order(1/x)
assert Order(ln(x) + 1/ln(x)) == Order(ln(x))
assert Order(exp(1/x) + x) == Order(exp(1/x))
assert Order(exp(1/x) + 1/x**20) == Order(exp(1/x))
def test_ln_args():
assert O(log(x)) + O(log(2*x)) == O(log(x))
assert O(log(x)) + O(log(x**3)) == O(log(x))
assert O(log(x*y)) + O(log(x) + log(y)) == O(log(x*y))
def test_multivar_0():
assert Order(x*y).expr == x*y
assert Order(x*y**2).expr == x*y**2
assert Order(x*y, x).expr == x
assert Order(x*y**2, y).expr == y**2
assert Order(x*y*z).expr == x*y*z
assert Order(x/y).expr == x/y
assert Order(x*exp(1/y)).expr == x*exp(1/y)
assert Order(exp(x)*exp(1/y)).expr == exp(1/y)
def test_multivar_0a():
assert Order(exp(1/x)*exp(1/y)).expr == exp(1/x + 1/y)
def test_multivar_1():
assert Order(x + y).expr == x + y
assert Order(x + 2*y).expr == x + y
assert (Order(x + y) + x).expr == (x + y)
assert (Order(x + y) + x**2) == Order(x + y)
assert (Order(x + y) + 1/x) == 1/x + Order(x + y)
assert Order(x**2 + y*x).expr == x**2 + y*x
def test_multivar_2():
assert Order(x**2*y + y**2*x, x, y).expr == x**2*y + y**2*x
def test_multivar_mul_1():
assert Order(x + y)*x == Order(x**2 + y*x, x, y)
def test_multivar_3():
assert (Order(x) + Order(y)).args in [
(Order(x), Order(y)),
(Order(y), Order(x))]
assert Order(x) + Order(y) + Order(x + y) == Order(x + y)
assert (Order(x**2*y) + Order(y**2*x)).args in [
(Order(x*y**2), Order(y*x**2)),
(Order(y*x**2), Order(x*y**2))]
assert (Order(x**2*y) + Order(y*x)) == Order(x*y)
def test_issue_3468():
y = Symbol('y', negative=True)
z = Symbol('z', complex=True)
# check that Order does not modify assumptions about symbols
Order(x)
Order(y)
Order(z)
assert x.is_positive is None
assert y.is_positive is False
assert z.is_positive is None
def test_leading_order():
assert (x + 1 + 1/x**5).extract_leading_order(x) == ((1/x**5, O(1/x**5)),)
assert (1 + 1/x).extract_leading_order(x) == ((1/x, O(1/x)),)
assert (1 + x).extract_leading_order(x) == ((1, O(1, x)),)
assert (1 + x**2).extract_leading_order(x) == ((1, O(1, x)),)
assert (2 + x**2).extract_leading_order(x) == ((2, O(1, x)),)
assert (x + x**2).extract_leading_order(x) == ((x, O(x)),)
def test_leading_order2():
assert set((2 + pi + x**2).extract_leading_order(x)) == set(((pi, O(1, x)),
(S(2), O(1, x))))
assert set((2*x + pi*x + x**2).extract_leading_order(x)) == set(((2*x, O(x)),
(x*pi, O(x))))
def test_order_leadterm():
assert O(x**2)._eval_as_leading_term(x) == O(x**2)
def test_order_symbols():
e = x*y*sin(x)*Integral(x, (x, 1, 2))
assert O(e) == O(x**2*y, x, y)
assert O(e, x) == O(x**2)
def test_nan():
assert O(nan) is nan
assert not O(x).contains(nan)
def test_O1():
assert O(1, x) * x == O(x)
assert O(1, y) * x == O(1, y)
def test_getn():
# other lines are tested incidentally by the suite
assert O(x).getn() == 1
assert O(x/log(x)).getn() == 1
assert O(x**2/log(x)**2).getn() == 2
assert O(x*log(x)).getn() == 1
raises(NotImplementedError, lambda: (O(x) + O(y)).getn())
def test_diff():
assert O(x**2).diff(x) == O(x)
def test_getO():
assert (x).getO() is None
assert (x).removeO() == x
assert (O(x)).getO() == O(x)
assert (O(x)).removeO() == 0
assert (z + O(x) + O(y)).getO() == O(x) + O(y)
assert (z + O(x) + O(y)).removeO() == z
raises(NotImplementedError, lambda: (O(x) + O(y)).getn())
def test_leading_term():
from sympy import digamma
assert O(1/digamma(1/x)) == O(1/log(x))
def test_eval():
assert Order(x).subs(Order(x), 1) == 1
assert Order(x).subs(x, y) == Order(y)
assert Order(x).subs(y, x) == Order(x)
assert Order(x).subs(x, x + y) == Order(x + y, (x, -y))
assert (O(1)**x).is_Pow
def test_issue_4279():
a, b = symbols('a b')
assert O(a, a, b) + O(1, a, b) == O(1, a, b)
assert O(b, a, b) + O(1, a, b) == O(1, a, b)
assert O(a + b, a, b) + O(1, a, b) == O(1, a, b)
assert O(1, a, b) + O(a, a, b) == O(1, a, b)
assert O(1, a, b) + O(b, a, b) == O(1, a, b)
assert O(1, a, b) + O(a + b, a, b) == O(1, a, b)
def test_issue_4855():
assert 1/O(1) != O(1)
assert 1/O(x) != O(1/x)
assert 1/O(x, (x, oo)) != O(1/x, (x, oo))
f = Function('f')
assert 1/O(f(x)) != O(1/x)
def test_order_conjugate_transpose():
x = Symbol('x', real=True)
y = Symbol('y', imaginary=True)
assert conjugate(Order(x)) == Order(conjugate(x))
assert conjugate(Order(y)) == Order(conjugate(y))
assert conjugate(Order(x**2)) == Order(conjugate(x)**2)
assert conjugate(Order(y**2)) == Order(conjugate(y)**2)
assert transpose(Order(x)) == Order(transpose(x))
assert transpose(Order(y)) == Order(transpose(y))
assert transpose(Order(x**2)) == Order(transpose(x)**2)
assert transpose(Order(y**2)) == Order(transpose(y)**2)
def test_order_noncommutative():
A = Symbol('A', commutative=False)
assert Order(A + A*x, x) == Order(1, x)
assert (A + A*x)*Order(x) == Order(x)
assert (A*x)*Order(x) == Order(x**2, x)
assert expand((1 + Order(x))*A*A*x) == A*A*x + Order(x**2, x)
assert expand((A*A + Order(x))*x) == A*A*x + Order(x**2, x)
assert expand((A + Order(x))*A*x) == A*A*x + Order(x**2, x)
def test_issue_6753():
assert (1 + x**2)**10000*O(x) == O(x)
def test_order_at_infinity():
assert Order(1 + x, (x, oo)) == Order(x, (x, oo))
assert Order(3*x, (x, oo)) == Order(x, (x, oo))
assert Order(x, (x, oo))*3 == Order(x, (x, oo))
assert -28*Order(x, (x, oo)) == Order(x, (x, oo))
assert Order(Order(x, (x, oo)), (x, oo)) == Order(x, (x, oo))
assert Order(Order(x, (x, oo)), (y, oo)) == Order(x, (x, oo), (y, oo))
assert Order(3, (x, oo)) == Order(1, (x, oo))
assert Order(x**2 + x + y, (x, oo)) == O(x**2, (x, oo))
assert Order(x**2 + x + y, (y, oo)) == O(y, (y, oo))
assert Order(2*x, (x, oo))*x == Order(x**2, (x, oo))
assert Order(2*x, (x, oo))/x == Order(1, (x, oo))
assert Order(2*x, (x, oo))*x*exp(1/x) == Order(x**2*exp(1/x), (x, oo))
assert Order(2*x, (x, oo))*x*exp(1/x)/ln(x)**3 == Order(x**2*exp(1/x)*ln(x)**-3, (x, oo))
assert Order(x, (x, oo)) + 1/x == 1/x + Order(x, (x, oo)) == Order(x, (x, oo))
assert Order(x, (x, oo)) + 1 == 1 + Order(x, (x, oo)) == Order(x, (x, oo))
assert Order(x, (x, oo)) + x == x + Order(x, (x, oo)) == Order(x, (x, oo))
assert Order(x, (x, oo)) + x**2 == x**2 + Order(x, (x, oo))
assert Order(1/x, (x, oo)) + 1/x**2 == 1/x**2 + Order(1/x, (x, oo)) == Order(1/x, (x, oo))
assert Order(x, (x, oo)) + exp(1/x) == exp(1/x) + Order(x, (x, oo))
assert Order(x, (x, oo))**2 == Order(x**2, (x, oo))
assert Order(x, (x, oo)) + Order(x**2, (x, oo)) == Order(x**2, (x, oo))
assert Order(x, (x, oo)) + Order(x**-2, (x, oo)) == Order(x, (x, oo))
assert Order(x, (x, oo)) + Order(1/x, (x, oo)) == Order(x, (x, oo))
assert Order(x, (x, oo)) - Order(x, (x, oo)) == Order(x, (x, oo))
assert Order(x, (x, oo)) + Order(1, (x, oo)) == Order(x, (x, oo))
assert Order(x, (x, oo)) + Order(x**2, (x, oo)) == Order(x**2, (x, oo))
assert Order(1/x, (x, oo)) + Order(1, (x, oo)) == Order(1, (x, oo))
assert Order(x, (x, oo)) + Order(exp(1/x), (x, oo)) == Order(x, (x, oo))
assert Order(x**3, (x, oo)) + Order(exp(2/x), (x, oo)) == Order(x**3, (x, oo))
assert Order(x**-3, (x, oo)) + Order(exp(2/x), (x, oo)) == Order(exp(2/x), (x, oo))
# issue 7207
assert Order(exp(x), (x, oo)).expr == Order(2*exp(x), (x, oo)).expr == exp(x)
assert Order(y**x, (x, oo)).expr == Order(2*y**x, (x, oo)).expr == exp(log(y)*x)
# issue 19545
assert Order(1/x - 3/(3*x + 2), (x, oo)).expr == x**(-2)
def test_mixing_order_at_zero_and_infinity():
assert (Order(x, (x, 0)) + Order(x, (x, oo))).is_Add
assert Order(x, (x, 0)) + Order(x, (x, oo)) == Order(x, (x, oo)) + Order(x, (x, 0))
assert Order(Order(x, (x, oo))) == Order(x, (x, oo))
# not supported (yet)
raises(NotImplementedError, lambda: Order(x, (x, 0))*Order(x, (x, oo)))
raises(NotImplementedError, lambda: Order(x, (x, oo))*Order(x, (x, 0)))
raises(NotImplementedError, lambda: Order(Order(x, (x, oo)), y))
raises(NotImplementedError, lambda: Order(Order(x), (x, oo)))
def test_order_at_some_point():
assert Order(x, (x, 1)) == Order(1, (x, 1))
assert Order(2*x - 2, (x, 1)) == Order(x - 1, (x, 1))
assert Order(-x + 1, (x, 1)) == Order(x - 1, (x, 1))
assert Order(x - 1, (x, 1))**2 == Order((x - 1)**2, (x, 1))
assert Order(x - 2, (x, 2)) - O(x - 2, (x, 2)) == Order(x - 2, (x, 2))
def test_order_subs_limits():
# issue 3333
assert (1 + Order(x)).subs(x, 1/x) == 1 + Order(1/x, (x, oo))
assert (1 + Order(x)).limit(x, 0) == 1
# issue 5769
assert ((x + Order(x**2))/x).limit(x, 0) == 1
assert Order(x**2).subs(x, y - 1) == Order((y - 1)**2, (y, 1))
assert Order(10*x**2, (x, 2)).subs(x, y - 1) == Order(1, (y, 3))
def test_issue_9351():
assert exp(x).series(x, 10, 1) == exp(10) + Order(x - 10, (x, 10))
def test_issue_9192():
assert O(1)*O(1) == O(1)
assert O(1)**O(1) == O(1)
def test_performance_of_adding_order():
l = list(x**i for i in range(1000))
l.append(O(x**1001))
assert Add(*l).subs(x,1) == O(1)
def test_issue_14622():
assert (x**(-4) + x**(-3) + x**(-1) + O(x**(-6), (x, oo))).as_numer_denom() == (
x**4 + x**5 + x**7 + O(x**2, (x, oo)), x**8)
assert (x**3 + O(x**2, (x, oo))).is_Add
assert O(x**2, (x, oo)).contains(x**3) is False
assert O(x, (x, oo)).contains(O(x, (x, 0))) is None
assert O(x, (x, 0)).contains(O(x, (x, oo))) is None
raises(NotImplementedError, lambda: O(x**3).contains(x**w))
def test_issue_15539():
assert O(1/x**2 + 1/x**4, (x, -oo)) == O(1/x**2, (x, -oo))
assert O(1/x**4 + exp(x), (x, -oo)) == O(1/x**4, (x, -oo))
assert O(1/x**4 + exp(-x), (x, -oo)) == O(exp(-x), (x, -oo))
assert O(1/x, (x, oo)).subs(x, -x) == O(-1/x, (x, -oo))
def test_issue_18606():
assert unchanged(Order, 0)
|
7979897aa25b89746c5c4fdb81c5f5f697cc5433c04b4c43e0af21f1a419fcf2
|
from itertools import product as cartes
from sympy import (
limit, exp, oo, log, sqrt, Limit, sin, floor, cos, ceiling,
atan, Abs, gamma, Symbol, S, pi, Integral, Rational, I,
tan, cot, integrate, Sum, sign, Function, subfactorial, symbols,
binomial, simplify, frac, Float, sec, zoo, fresnelc, fresnels,
acos, erf, erfi, LambertW, factorial, digamma, Ei, EulerGamma,
asin, atanh, acot, acoth, asec, acsc, cbrt)
from sympy.calculus.util import AccumBounds
from sympy.core.add import Add
from sympy.core.mul import Mul
from sympy.series.limits import heuristics
from sympy.series.order import Order
from sympy.testing.pytest import XFAIL, raises
from sympy.abc import x, y, z, k
n = Symbol('n', integer=True, positive=True)
def test_basic1():
assert limit(x, x, oo) is oo
assert limit(x, x, -oo) is -oo
assert limit(-x, x, oo) is -oo
assert limit(x**2, x, -oo) is oo
assert limit(-x**2, x, oo) is -oo
assert limit(x*log(x), x, 0, dir="+") == 0
assert limit(1/x, x, oo) == 0
assert limit(exp(x), x, oo) is oo
assert limit(-exp(x), x, oo) is -oo
assert limit(exp(x)/x, x, oo) is oo
assert limit(1/x - exp(-x), x, oo) == 0
assert limit(x + 1/x, x, oo) is oo
assert limit(x - x**2, x, oo) is -oo
assert limit((1 + x)**(1 + sqrt(2)), x, 0) == 1
assert limit((1 + x)**oo, x, 0) == Limit((x + 1)**oo, x, 0)
assert limit((1 + x)**oo, x, 0, dir='-') == Limit((x + 1)**oo, x, 0, dir='-')
assert limit((1 + x + y)**oo, x, 0, dir='-') == (1 + y)**(oo)
assert limit(y/x/log(x), x, 0) == -oo*sign(y)
assert limit(cos(x + y)/x, x, 0) == sign(cos(y))*oo
assert limit(gamma(1/x + 3), x, oo) == 2
assert limit(S.NaN, x, -oo) is S.NaN
assert limit(Order(2)*x, x, S.NaN) is S.NaN
assert limit(1/(x - 1), x, 1, dir="+") is oo
assert limit(1/(x - 1), x, 1, dir="-") is -oo
assert limit(1/(5 - x)**3, x, 5, dir="+") is -oo
assert limit(1/(5 - x)**3, x, 5, dir="-") is oo
assert limit(1/sin(x), x, pi, dir="+") is -oo
assert limit(1/sin(x), x, pi, dir="-") is oo
assert limit(1/cos(x), x, pi/2, dir="+") is -oo
assert limit(1/cos(x), x, pi/2, dir="-") is oo
assert limit(1/tan(x**3), x, (2*pi)**Rational(1, 3), dir="+") is oo
assert limit(1/tan(x**3), x, (2*pi)**Rational(1, 3), dir="-") is -oo
assert limit(1/cot(x)**3, x, (pi*Rational(3, 2)), dir="+") is -oo
assert limit(1/cot(x)**3, x, (pi*Rational(3, 2)), dir="-") is oo
# test bi-directional limits
assert limit(sin(x)/x, x, 0, dir="+-") == 1
assert limit(x**2, x, 0, dir="+-") == 0
assert limit(1/x**2, x, 0, dir="+-") is oo
# test failing bi-directional limits
assert limit(1/x, x, 0, dir="+-") is zoo
# approaching 0
# from dir="+"
assert limit(1 + 1/x, x, 0) is oo
# from dir='-'
# Add
assert limit(1 + 1/x, x, 0, dir='-') is -oo
# Pow
assert limit(x**(-2), x, 0, dir='-') is oo
assert limit(x**(-3), x, 0, dir='-') is -oo
assert limit(1/sqrt(x), x, 0, dir='-') == (-oo)*I
assert limit(x**2, x, 0, dir='-') == 0
assert limit(sqrt(x), x, 0, dir='-') == 0
assert limit(x**-pi, x, 0, dir='-') == oo*sign((-1)**(-pi))
assert limit((1 + cos(x))**oo, x, 0) is oo
def test_basic2():
assert limit(x**x, x, 0, dir="+") == 1
assert limit((exp(x) - 1)/x, x, 0) == 1
assert limit(1 + 1/x, x, oo) == 1
assert limit(-exp(1/x), x, oo) == -1
assert limit(x + exp(-x), x, oo) is oo
assert limit(x + exp(-x**2), x, oo) is oo
assert limit(x + exp(-exp(x)), x, oo) is oo
assert limit(13 + 1/x - exp(-x), x, oo) == 13
def test_basic3():
assert limit(1/x, x, 0, dir="+") is oo
assert limit(1/x, x, 0, dir="-") is -oo
def test_basic4():
assert limit(2*x + y*x, x, 0) == 0
assert limit(2*x + y*x, x, 1) == 2 + y
assert limit(2*x**8 + y*x**(-3), x, -2) == 512 - y/8
assert limit(sqrt(x + 1) - sqrt(x), x, oo) == 0
assert integrate(1/(x**3 + 1), (x, 0, oo)) == 2*pi*sqrt(3)/9
def test_basic5():
class my(Function):
@classmethod
def eval(cls, arg):
if arg is S.Infinity:
return S.NaN
assert limit(my(x), x, oo) == Limit(my(x), x, oo)
def test_issue_3885():
assert limit(x*y + x*z, z, 2) == x*(y + 2)
def test_Limit():
assert Limit(sin(x)/x, x, 0) != 1
assert Limit(sin(x)/x, x, 0).doit() == 1
assert Limit(x, x, 0, dir='+-').args == (x, x, 0, Symbol('+-'))
def test_floor():
assert limit(floor(x), x, -2, "+") == -2
assert limit(floor(x), x, -2, "-") == -3
assert limit(floor(x), x, -1, "+") == -1
assert limit(floor(x), x, -1, "-") == -2
assert limit(floor(x), x, 0, "+") == 0
assert limit(floor(x), x, 0, "-") == -1
assert limit(floor(x), x, 1, "+") == 1
assert limit(floor(x), x, 1, "-") == 0
assert limit(floor(x), x, 2, "+") == 2
assert limit(floor(x), x, 2, "-") == 1
assert limit(floor(x), x, 248, "+") == 248
assert limit(floor(x), x, 248, "-") == 247
def test_floor_requires_robust_assumptions():
assert limit(floor(sin(x)), x, 0, "+") == 0
assert limit(floor(sin(x)), x, 0, "-") == -1
assert limit(floor(cos(x)), x, 0, "+") == 0
assert limit(floor(cos(x)), x, 0, "-") == 0
assert limit(floor(5 + sin(x)), x, 0, "+") == 5
assert limit(floor(5 + sin(x)), x, 0, "-") == 4
assert limit(floor(5 + cos(x)), x, 0, "+") == 5
assert limit(floor(5 + cos(x)), x, 0, "-") == 5
def test_ceiling():
assert limit(ceiling(x), x, -2, "+") == -1
assert limit(ceiling(x), x, -2, "-") == -2
assert limit(ceiling(x), x, -1, "+") == 0
assert limit(ceiling(x), x, -1, "-") == -1
assert limit(ceiling(x), x, 0, "+") == 1
assert limit(ceiling(x), x, 0, "-") == 0
assert limit(ceiling(x), x, 1, "+") == 2
assert limit(ceiling(x), x, 1, "-") == 1
assert limit(ceiling(x), x, 2, "+") == 3
assert limit(ceiling(x), x, 2, "-") == 2
assert limit(ceiling(x), x, 248, "+") == 249
assert limit(ceiling(x), x, 248, "-") == 248
def test_ceiling_requires_robust_assumptions():
assert limit(ceiling(sin(x)), x, 0, "+") == 1
assert limit(ceiling(sin(x)), x, 0, "-") == 0
assert limit(ceiling(cos(x)), x, 0, "+") == 1
assert limit(ceiling(cos(x)), x, 0, "-") == 1
assert limit(ceiling(5 + sin(x)), x, 0, "+") == 6
assert limit(ceiling(5 + sin(x)), x, 0, "-") == 5
assert limit(ceiling(5 + cos(x)), x, 0, "+") == 6
assert limit(ceiling(5 + cos(x)), x, 0, "-") == 6
def test_atan():
x = Symbol("x", real=True)
assert limit(atan(x)*sin(1/x), x, 0) == 0
assert limit(atan(x) + sqrt(x + 1) - sqrt(x), x, oo) == pi/2
def test_abs():
assert limit(abs(x), x, 0) == 0
assert limit(abs(sin(x)), x, 0) == 0
assert limit(abs(cos(x)), x, 0) == 1
assert limit(abs(sin(x + 1)), x, 0) == sin(1)
def test_heuristic():
x = Symbol("x", real=True)
assert heuristics(sin(1/x) + atan(x), x, 0, '+') == AccumBounds(-1, 1)
assert limit(log(2 + sqrt(atan(x))*sqrt(sin(1/x))), x, 0) == log(2)
def test_issue_3871():
z = Symbol("z", positive=True)
f = -1/z*exp(-z*x)
assert limit(f, x, oo) == 0
assert f.limit(x, oo) == 0
def test_exponential():
n = Symbol('n')
x = Symbol('x', real=True)
assert limit((1 + x/n)**n, n, oo) == exp(x)
assert limit((1 + x/(2*n))**n, n, oo) == exp(x/2)
assert limit((1 + x/(2*n + 1))**n, n, oo) == exp(x/2)
assert limit(((x - 1)/(x + 1))**x, x, oo) == exp(-2)
assert limit(1 + (1 + 1/x)**x, x, oo) == 1 + S.Exp1
assert limit((2 + 6*x)**x/(6*x)**x, x, oo) == exp(S('1/3'))
@XFAIL
def test_exponential2():
n = Symbol('n')
assert limit((1 + x/(n + sin(n)))**n, n, oo) == exp(x)
def test_doit():
f = Integral(2 * x, x)
l = Limit(f, x, oo)
assert l.doit() is oo
def test_AccumBounds():
assert limit(sin(k) - sin(k + 1), k, oo) == AccumBounds(-2, 2)
assert limit(cos(k) - cos(k + 1) + 1, k, oo) == AccumBounds(-1, 3)
# not the exact bound
assert limit(sin(k) - sin(k)*cos(k), k, oo) == AccumBounds(-2, 2)
# test for issue #9934
t1 = Mul(S.Half, 1/(-1 + cos(1)), Add(AccumBounds(-3, 1), cos(1)))
assert limit(simplify(Sum(cos(n).rewrite(exp), (n, 0, k)).doit().rewrite(sin)), k, oo) == t1
t2 = Mul(S.Half, Add(AccumBounds(-2, 2), sin(1)), 1/(-cos(1) + 1))
assert limit(simplify(Sum(sin(n).rewrite(exp), (n, 0, k)).doit().rewrite(sin)), k, oo) == t2
assert limit(frac(x)**x, x, oo) == AccumBounds(0, oo)
assert limit(((sin(x) + 1)/2)**x, x, oo) == AccumBounds(0, oo)
# Possible improvement: AccumBounds(0, 1)
@XFAIL
def test_doit2():
f = Integral(2 * x, x)
l = Limit(f, x, oo)
# limit() breaks on the contained Integral.
assert l.doit(deep=False) == l
def test_issue_2929():
assert limit((x * exp(x))/(exp(x) - 1), x, -oo) == 0
def test_issue_3792():
assert limit((1 - cos(x))/x**2, x, S.Half) == 4 - 4*cos(S.Half)
assert limit(sin(sin(x + 1) + 1), x, 0) == sin(1 + sin(1))
assert limit(abs(sin(x + 1) + 1), x, 0) == 1 + sin(1)
def test_issue_4090():
assert limit(1/(x + 3), x, 2) == Rational(1, 5)
assert limit(1/(x + pi), x, 2) == S.One/(2 + pi)
assert limit(log(x)/(x**2 + 3), x, 2) == log(2)/7
assert limit(log(x)/(x**2 + pi), x, 2) == log(2)/(4 + pi)
def test_issue_4547():
assert limit(cot(x), x, 0, dir='+') is oo
assert limit(cot(x), x, pi/2, dir='+') == 0
def test_issue_5164():
assert limit(x**0.5, x, oo) == oo**0.5 is oo
assert limit(x**0.5, x, 16) == S(16)**0.5
assert limit(x**0.5, x, 0) == 0
assert limit(x**(-0.5), x, oo) == 0
assert limit(x**(-0.5), x, 4) == S(4)**(-0.5)
def test_issue_5183():
# using list(...) so py.test can recalculate values
tests = list(cartes([x, -x],
[-1, 1],
[2, 3, S.Half, Rational(2, 3)],
['-', '+']))
results = (oo, oo, -oo, oo, -oo*I, oo, -oo*(-1)**Rational(1, 3), oo,
0, 0, 0, 0, 0, 0, 0, 0,
oo, oo, oo, -oo, oo, -oo*I, oo, -oo*(-1)**Rational(1, 3),
0, 0, 0, 0, 0, 0, 0, 0)
assert len(tests) == len(results)
for i, (args, res) in enumerate(zip(tests, results)):
y, s, e, d = args
eq = y**(s*e)
try:
assert limit(eq, x, 0, dir=d) == res
except AssertionError:
if 0: # change to 1 if you want to see the failing tests
print()
print(i, res, eq, d, limit(eq, x, 0, dir=d))
else:
assert None
def test_issue_5184():
assert limit(sin(x)/x, x, oo) == 0
assert limit(atan(x), x, oo) == pi/2
assert limit(gamma(x), x, oo) is oo
assert limit(cos(x)/x, x, oo) == 0
assert limit(gamma(x), x, S.Half) == sqrt(pi)
r = Symbol('r', real=True)
assert limit(r*sin(1/r), r, 0) == 0
def test_issue_5229():
assert limit((1 + y)**(1/y) - S.Exp1, y, 0) == 0
def test_issue_4546():
# using list(...) so py.test can recalculate values
tests = list(cartes([cot, tan],
[-pi/2, 0, pi/2, pi, pi*Rational(3, 2)],
['-', '+']))
results = (0, 0, -oo, oo, 0, 0, -oo, oo, 0, 0,
oo, -oo, 0, 0, oo, -oo, 0, 0, oo, -oo)
assert len(tests) == len(results)
for i, (args, res) in enumerate(zip(tests, results)):
f, l, d = args
eq = f(x)
try:
assert limit(eq, x, l, dir=d) == res
except AssertionError:
if 0: # change to 1 if you want to see the failing tests
print()
print(i, res, eq, l, d, limit(eq, x, l, dir=d))
else:
assert None
def test_issue_3934():
assert limit((1 + x**log(3))**(1/x), x, 0) == 1
assert limit((5**(1/x) + 3**(1/x))**x, x, 0) == 5
def test_calculate_series():
# needs gruntz calculate_series to go to n = 32
assert limit(x**Rational(77, 3)/(1 + x**Rational(77, 3)), x, oo) == 1
# needs gruntz calculate_series to go to n = 128
assert limit(x**101.1/(1 + x**101.1), x, oo) == 1
def test_issue_5955():
assert limit((x**16)/(1 + x**16), x, oo) == 1
assert limit((x**100)/(1 + x**100), x, oo) == 1
assert limit((x**1885)/(1 + x**1885), x, oo) == 1
assert limit((x**1000/((x + 1)**1000 + exp(-x))), x, oo) == 1
def test_newissue():
assert limit(exp(1/sin(x))/exp(cot(x)), x, 0) == 1
def test_extended_real_line():
assert limit(x - oo, x, oo) is -oo
assert limit(oo - x, x, -oo) is oo
assert limit(x**2/(x - 5) - oo, x, oo) is -oo
assert limit(1/(x + sin(x)) - oo, x, 0) is -oo
assert limit(oo/x, x, oo) is oo
assert limit(x - oo + 1/x, x, oo) is -oo
assert limit(x - oo + 1/x, x, 0) is -oo
@XFAIL
def test_order_oo():
x = Symbol('x', positive=True)
assert Order(x)*oo != Order(1, x)
assert limit(oo/(x**2 - 4), x, oo) is oo
def test_issue_5436():
raises(NotImplementedError, lambda: limit(exp(x*y), x, oo))
raises(NotImplementedError, lambda: limit(exp(-x*y), x, oo))
def test_Limit_dir():
raises(TypeError, lambda: Limit(x, x, 0, dir=0))
raises(ValueError, lambda: Limit(x, x, 0, dir='0'))
def test_polynomial():
assert limit((x + 1)**1000/((x + 1)**1000 + 1), x, oo) == 1
assert limit((x + 1)**1000/((x + 1)**1000 + 1), x, -oo) == 1
def test_rational():
assert limit(1/y - (1/(y + x) + x/(y + x)/y)/z, x, oo) == (z - 1)/(y*z)
assert limit(1/y - (1/(y + x) + x/(y + x)/y)/z, x, -oo) == (z - 1)/(y*z)
def test_issue_5740():
assert limit(log(x)*z - log(2*x)*y, x, 0) == oo*sign(y - z)
def test_issue_6366():
n = Symbol('n', integer=True, positive=True)
r = (n + 1)*x**(n + 1)/(x**(n + 1) - 1) - x/(x - 1)
assert limit(r, x, 1) == n/2
def test_factorial():
from sympy import factorial, E
f = factorial(x)
assert limit(f, x, oo) is oo
assert limit(x/f, x, oo) == 0
# see Stirling's approximation:
# https://en.wikipedia.org/wiki/Stirling's_approximation
assert limit(f/(sqrt(2*pi*x)*(x/E)**x), x, oo) == 1
assert limit(f, x, -oo) == factorial(-oo)
assert limit(f, x, x**2) == factorial(x**2)
assert limit(f, x, -x**2) == factorial(-x**2)
def test_issue_6560():
e = (5*x**3/4 - x*Rational(3, 4) + (y*(3*x**2/2 - S.Half) +
35*x**4/8 - 15*x**2/4 + Rational(3, 8))/(2*(y + 1)))
assert limit(e, y, oo) == (5*x**3 + 3*x**2 - 3*x - 1)/4
@XFAIL
def test_issue_5172():
n = Symbol('n')
r = Symbol('r', positive=True)
c = Symbol('c')
p = Symbol('p', positive=True)
m = Symbol('m', negative=True)
expr = ((2*n*(n - r + 1)/(n + r*(n - r + 1)))**c +
(r - 1)*(n*(n - r + 2)/(n + r*(n - r + 1)))**c - n)/(n**c - n)
expr = expr.subs(c, c + 1)
raises(NotImplementedError, lambda: limit(expr, n, oo))
assert limit(expr.subs(c, m), n, oo) == 1
assert limit(expr.subs(c, p), n, oo).simplify() == \
(2**(p + 1) + r - 1)/(r + 1)**(p + 1)
def test_issue_7088():
a = Symbol('a')
assert limit(sqrt(x/(x + a)), x, oo) == 1
def test_branch_cuts():
assert limit(asin(I*x + 2), x, 0) == pi - asin(2)
assert limit(asin(I*x + 2), x, 0, '-') == asin(2)
assert limit(asin(I*x - 2), x, 0) == -asin(2)
assert limit(asin(I*x - 2), x, 0, '-') == -pi + asin(2)
assert limit(acos(I*x + 2), x, 0) == -acos(2)
assert limit(acos(I*x + 2), x, 0, '-') == acos(2)
assert limit(acos(I*x - 2), x, 0) == acos(-2)
assert limit(acos(I*x - 2), x, 0, '-') == 2*pi - acos(-2)
assert limit(atan(x + 2*I), x, 0) == I*atanh(2)
assert limit(atan(x + 2*I), x, 0, '-') == -pi + I*atanh(2)
assert limit(atan(x - 2*I), x, 0) == pi - I*atanh(2)
assert limit(atan(x - 2*I), x, 0, '-') == -I*atanh(2)
assert limit(atan(1/x), x, 0) == pi/2
assert limit(atan(1/x), x, 0, '-') == -pi/2
assert limit(atan(x), x, oo) == pi/2
assert limit(atan(x), x, -oo) == -pi/2
assert limit(acot(x + S(1)/2*I), x, 0) == pi - I*acoth(S(1)/2)
assert limit(acot(x + S(1)/2*I), x, 0, '-') == -I*acoth(S(1)/2)
assert limit(acot(x - S(1)/2*I), x, 0) == I*acoth(S(1)/2)
assert limit(acot(x - S(1)/2*I), x, 0, '-') == -pi + I*acoth(S(1)/2)
assert limit(acot(x), x, 0) == pi/2
assert limit(acot(x), x, 0, '-') == -pi/2
assert limit(asec(I*x + S(1)/2), x, 0) == asec(S(1)/2)
assert limit(asec(I*x + S(1)/2), x, 0, '-') == -asec(S(1)/2)
assert limit(asec(I*x - S(1)/2), x, 0) == 2*pi - asec(-S(1)/2)
assert limit(asec(I*x - S(1)/2), x, 0, '-') == asec(-S(1)/2)
assert limit(acsc(I*x + S(1)/2), x, 0) == acsc(S(1)/2)
assert limit(acsc(I*x + S(1)/2), x, 0, '-') == pi - acsc(S(1)/2)
assert limit(acsc(I*x - S(1)/2), x, 0) == -pi + acsc(S(1)/2)
assert limit(acsc(I*x - S(1)/2), x, 0, '-') == -acsc(S(1)/2)
assert limit(log(I*x - 1), x, 0) == I*pi
assert limit(log(I*x - 1), x, 0, '-') == -I*pi
assert limit(log(-I*x - 1), x, 0) == -I*pi
assert limit(log(-I*x - 1), x, 0, '-') == I*pi
assert limit(sqrt(I*x - 1), x, 0) == I
assert limit(sqrt(I*x - 1), x, 0, '-') == -I
assert limit(sqrt(-I*x - 1), x, 0) == -I
assert limit(sqrt(-I*x - 1), x, 0, '-') == I
assert limit(cbrt(I*x - 1), x, 0) == (-1)**(S(1)/3)
assert limit(cbrt(I*x - 1), x, 0, '-') == -(-1)**(S(2)/3)
assert limit(cbrt(-I*x - 1), x, 0) == -(-1)**(S(2)/3)
assert limit(cbrt(-I*x - 1), x, 0, '-') == (-1)**(S(1)/3)
def test_issue_6364():
a = Symbol('a')
e = z/(1 - sqrt(1 + z)*sin(a)**2 - sqrt(1 - z)*cos(a)**2)
assert limit(e, z, 0).simplify() == 2/cos(2*a)
def test_issue_4099():
a = Symbol('a')
assert limit(a/x, x, 0) == oo*sign(a)
assert limit(-a/x, x, 0) == -oo*sign(a)
assert limit(-a*x, x, oo) == -oo*sign(a)
assert limit(a*x, x, oo) == oo*sign(a)
def test_issue_4503():
dx = Symbol('dx')
assert limit((sqrt(1 + exp(x + dx)) - sqrt(1 + exp(x)))/dx, dx, 0) == \
exp(x)/(2*sqrt(exp(x) + 1))
def test_issue_8481():
k = Symbol('k', integer=True, nonnegative=True)
lamda = Symbol('lamda', real=True, positive=True)
limit(lamda**k * exp(-lamda) / factorial(k), k, oo) == 0
def test_issue_8730():
assert limit(subfactorial(x), x, oo) is oo
def test_issue_9558():
assert limit(sin(x)**15, x, 0, '-') == 0
def test_issue_10801():
# make sure limits work with binomial
assert limit(16**k / (k * binomial(2*k, k)**2), k, oo) == pi
def test_issue_9041():
assert limit(factorial(n) / ((n/exp(1))**n * sqrt(2*pi*n)), n, oo) == 1
def test_issue_9205():
x, y, a = symbols('x, y, a')
assert Limit(x, x, a).free_symbols == {a}
assert Limit(x, x, a, '-').free_symbols == {a}
assert Limit(x + y, x + y, a).free_symbols == {a}
assert Limit(-x**2 + y, x**2, a).free_symbols == {y, a}
def test_issue_9471():
assert limit((((27**(log(n,3))))/n**3),n,oo) == 1
assert limit((((27**(log(n,3)+1)))/n**3),n,oo) == 27
def test_issue_11879():
assert simplify(limit(((x+y)**n-x**n)/y, y, 0)) == n*x**(n-1)
def test_limit_with_Float():
k = symbols("k")
assert limit(1.0 ** k, k, oo) == 1
assert limit(0.3*1.0**k, k, oo) == Float(0.3)
def test_issue_10610():
assert limit(3**x*3**(-x - 1)*(x + 1)**2/x**2, x, oo) == Rational(1, 3)
def test_issue_6599():
assert limit((n + cos(n))/n, n, oo) == 1
def test_issue_12555():
assert limit((3**x + 2* x**10) / (x**10 + exp(x)), x, -oo) == 2
assert limit((3**x + 2* x**10) / (x**10 + exp(x)), x, oo) is oo
def test_issue_12769():
r, z, x = symbols('r z x', real=True)
a, b, s0, K, F0, s, T = symbols('a b s0 K F0 s T', positive=True, real=True)
fx = (F0**b*K**b*r*s0 - sqrt((F0**2*K**(2*b)*a**2*(b - 1) + \
F0**(2*b)*K**2*a**2*(b - 1) + F0**(2*b)*K**(2*b)*s0**2*(b - 1)*(b**2 - 2*b + 1) - \
2*F0**(2*b)*K**(b + 1)*a*r*s0*(b**2 - 2*b + 1) + \
2*F0**(b + 1)*K**(2*b)*a*r*s0*(b**2 - 2*b + 1) - \
2*F0**(b + 1)*K**(b + 1)*a**2*(b - 1))/((b - 1)*(b**2 - 2*b + 1))))*(b*r - b - r + 1)
assert fx.subs(K, F0).cancel().together() == limit(fx, K, F0).together()
def test_issue_13332():
assert limit(sqrt(30)*5**(-5*x - 1)*(46656*x)**x*(5*x + 2)**(5*x + 5*S.Half) *
(6*x + 2)**(-6*x - 5*S.Half), x, oo) == Rational(25, 36)
def test_issue_12564():
assert limit(x**2 + x*sin(x) + cos(x), x, -oo) is oo
assert limit(x**2 + x*sin(x) + cos(x), x, oo) is oo
assert limit(((x + cos(x))**2).expand(), x, oo) is oo
assert limit(((x + sin(x))**2).expand(), x, oo) is oo
assert limit(((x + cos(x))**2).expand(), x, -oo) is oo
assert limit(((x + sin(x))**2).expand(), x, -oo) is oo
def test_issue_14456():
raises(NotImplementedError, lambda: Limit(exp(x), x, zoo).doit())
raises(NotImplementedError, lambda: Limit(x**2/(x+1), x, zoo).doit())
def test_issue_14411():
assert limit(3*sec(4*pi*x - x/3), x, 3*pi/(24*pi - 2)) is -oo
def test_issue_13382():
assert limit(x*(((x + 1)**2 + 1)/(x**2 + 1) - 1), x, oo) == 2
def test_issue_13403():
assert limit(x*(-1 + (x + log(x + 1) + 1)/(x + log(x))), x ,oo) == 1
def test_issue_13416():
assert limit((-x**3*log(x)**3 + (x - 1)*(x + 1)**2*log(x + 1)**3)/(x**2*log(x)**3), x ,oo) == 1
def test_issue_13462():
assert limit(n**2*(2*n*(-(1 - 1/(2*n))**x + 1) - x - (-x**2/4 + x/4)/n), n, oo) == x*(x**2 - 3*x + 2)/24
def test_issue_14574():
assert limit(sqrt(x)*cos(x - x**2) / (x + 1), x, oo) == 0
def test_issue_10102():
assert limit(fresnels(x), x, oo) == S.Half
assert limit(3 + fresnels(x), x, oo) == 3 + S.Half
assert limit(5*fresnels(x), x, oo) == Rational(5, 2)
assert limit(fresnelc(x), x, oo) == S.Half
assert limit(fresnels(x), x, -oo) == Rational(-1, 2)
assert limit(4*fresnelc(x), x, -oo) == -2
def test_issue_14377():
raises(NotImplementedError, lambda: limit(exp(I*x)*sin(pi*x), x, oo))
def test_issue_15146():
e = (x/2) * (-2*x**3 - 2*(x**3 - 1) * x**2 * digamma(x**3 + 1) + \
2*(x**3 - 1) * x**2 * digamma(x**3 + x + 1) + x + 3)
assert limit(e, x, oo) == S(1)/3
def test_issue_15984():
assert limit((-x + log(exp(x) + 1))/x, x, oo, dir='-').doit() == 0
def test_issue_13575():
assert limit(acos(erfi(x)), x, 1).cancel() == acos(-I*erf(I))
def test_issue_17325():
assert Limit(sin(x)/x, x, 0, dir="+-").doit() == 1
assert Limit(x**2, x, 0, dir="+-").doit() == 0
assert Limit(1/x**2, x, 0, dir="+-").doit() is oo
assert Limit(1/x, x, 0, dir="+-").doit() is zoo
def test_issue_10978():
assert LambertW(x).limit(x, 0) == 0
@XFAIL
def test_issue_14313_comment():
assert limit(floor(n/2), n, oo) is oo
@XFAIL
def test_issue_15323():
d = ((1 - 1/x)**x).diff(x)
assert limit(d, x, 1, dir='+') == 1
def test_issue_12571():
assert limit(-LambertW(-log(x))/log(x), x, 1) == 1
def test_issue_14590():
assert limit((x**3*((x + 1)/x)**x)/((x + 1)*(x + 2)*(x + 3)), x, oo) == exp(1)
def test_issue_14393():
a, b = symbols('a b')
assert limit((x**b - y**b)/(x**a - y**a), x, y) == b*y**(-a)*y**b/a
def test_issue_14556():
assert limit(factorial(n + 1)**(1/(n + 1)) - factorial(n)**(1/n), n, oo) == exp(-1)
def test_issue_14811():
assert limit(((1 + ((S(2)/3)**(x + 1)))**(2**x))/(2**((S(4)/3)**(x - 1))), x, oo) == oo
def test_issue_16722():
z = symbols('z', positive=True)
assert limit(binomial(n + z, n)*n**-z, n, oo) == 1/gamma(z + 1)
z = symbols('z', positive=True, integer=True)
assert limit(binomial(n + z, n)*n**-z, n, oo) == 1/gamma(z + 1)
def test_issue_17431():
assert limit(((n + 1) + 1) / (((n + 1) + 2) * factorial(n + 1)) *
(n + 2) * factorial(n) / (n + 1), n, oo) == 0
assert limit((n + 2)**2*factorial(n)/((n + 1)*(n + 3)*factorial(n + 1))
, n, oo) == 0
assert limit((n + 1) * factorial(n) / (n * factorial(n + 1)), n, oo) == 0
def test_issue_17671():
assert limit(Ei(-log(x)) - log(log(x))/x, x, 1) == EulerGamma
def test_issue_17751():
a, b, c, x = symbols('a b c x', positive=True)
assert limit((a + 1)*x - sqrt((a + 1)**2*x**2 + b*x + c), x, oo) == -b/(2*a + 2)
def test_issue_17792():
assert limit(factorial(n)/sqrt(n)*(exp(1)/n)**n, n, oo) == sqrt(2)*sqrt(pi)
def test_issue_18306():
assert limit(sin(sqrt(x))/sqrt(sin(x)), x, 0, '+') == 1
def test_issue_18378():
assert limit(log(exp(3*x) + x)/log(exp(x) + x**100), x, oo) == 3
def test_issue_18442():
assert limit(tan(x)**(2**(sqrt(pi))), x, oo, dir='-') == Limit(tan(x)**(2**(sqrt(pi))), x, oo, dir='-')
def test_issue_18482():
assert limit((2*exp(3*x)/(exp(2*x) + 1))**(1/x), x, oo) == exp(1)
def test_issue_18501():
assert limit(Abs(log(x - 1)**3 - 1), x, 1, '+') == oo
def test_issue_18508():
assert limit(sin(x)/sqrt(1-cos(x)), x, 0) == sqrt(2)
assert limit(sin(x)/sqrt(1-cos(x)), x, 0, dir='+') == sqrt(2)
assert limit(sin(x)/sqrt(1-cos(x)), x, 0, dir='-') == -sqrt(2)
def test_issue_18992():
assert limit(n/(factorial(n)**(1/n)), n, oo) == exp(1)
def test_issue_18997():
assert limit(Abs(log(x)), x, 0) == oo
assert limit(Abs(log(Abs(x))), x, 0) == oo
def test_issue_19026():
x = Symbol('x', positive=True)
assert limit(Abs(log(x) + 1)/log(x), x, oo) == 1
def test_issue_19067():
x = Symbol('x')
assert limit(gamma(x)/(gamma(x - 1)*gamma(x + 2)), x, 0) == -1
def test_issue_19586():
assert limit(x**(2**x*3**(-x)), x, oo) == 1
def test_issue_13715():
n = Symbol('n')
p = Symbol('p', zero=True)
assert limit(n + p, n, 0) == p
def test_issue_15055():
assert limit(n**3*((-n - 1)*sin(1/n) + (n + 2)*sin(1/(n + 1)))/(-n + 1), n, oo) == 1
|
bcc4cd24bf68b30c67a7428b4a00e439415012b4674f14d25c0dda67b5aa6ab1
|
from sympy import (Symbol, Rational, ln, exp, log, sqrt, E, O, pi, I, sinh,
sin, cosh, cos, tanh, coth, asinh, acosh, atanh, acoth, tan, cot, Integer,
PoleError, floor, ceiling, asin, symbols, limit, Piecewise, Eq, sign,
Derivative, S)
from sympy.abc import x, y, z
from sympy.testing.pytest import raises, XFAIL
def test_simple_1():
assert x.nseries(x, n=5) == x
assert y.nseries(x, n=5) == y
assert (1/(x*y)).nseries(y, n=5) == 1/(x*y)
assert Rational(3, 4).nseries(x, n=5) == Rational(3, 4)
assert x.nseries() == x
def test_mul_0():
assert (x*ln(x)).nseries(x, n=5) == x*ln(x)
def test_mul_1():
assert (x*ln(2 + x)).nseries(x, n=5) == x*log(2) + x**2/2 - x**3/8 + \
x**4/24 + O(x**5)
assert (x*ln(1 + x)).nseries(
x, n=5) == x**2 - x**3/2 + x**4/3 + O(x**5)
def test_pow_0():
assert (x**2).nseries(x, n=5) == x**2
assert (1/x).nseries(x, n=5) == 1/x
assert (1/x**2).nseries(x, n=5) == 1/x**2
assert (x**Rational(2, 3)).nseries(x, n=5) == (x**Rational(2, 3))
assert (sqrt(x)**3).nseries(x, n=5) == (sqrt(x)**3)
def test_pow_1():
assert ((1 + x)**2).nseries(x, n=5) == x**2 + 2*x + 1
def test_geometric_1():
assert (1/(1 - x)).nseries(x, n=5) == 1 + x + x**2 + x**3 + x**4 + O(x**5)
assert (x/(1 - x)).nseries(x, n=6) == x + x**2 + x**3 + x**4 + x**5 + O(x**6)
assert (x**3/(1 - x)).nseries(x, n=8) == x**3 + x**4 + x**5 + x**6 + \
x**7 + O(x**8)
def test_sqrt_1():
assert sqrt(1 + x).nseries(x, n=5) == 1 + x/2 - x**2/8 + x**3/16 - 5*x**4/128 + O(x**5)
def test_exp_1():
assert exp(x).nseries(x, n=5) == 1 + x + x**2/2 + x**3/6 + x**4/24 + O(x**5)
assert exp(x).nseries(x, n=12) == 1 + x + x**2/2 + x**3/6 + x**4/24 + x**5/120 + \
x**6/720 + x**7/5040 + x**8/40320 + x**9/362880 + x**10/3628800 + \
x**11/39916800 + O(x**12)
assert exp(1/x).nseries(x, n=5) == exp(1/x)
assert exp(1/(1 + x)).nseries(x, n=4) == \
(E*(1 - x - 13*x**3/6 + 3*x**2/2)).expand() + O(x**4)
assert exp(2 + x).nseries(x, n=5) == \
(exp(2)*(1 + x + x**2/2 + x**3/6 + x**4/24)).expand() + O(x**5)
def test_exp_sqrt_1():
assert exp(1 + sqrt(x)).nseries(x, n=3) == \
(exp(1)*(1 + sqrt(x) + x/2 + sqrt(x)*x/6)).expand() + O(sqrt(x)**3)
def test_power_x_x1():
assert (exp(x*ln(x))).nseries(x, n=4) == \
1 + x*log(x) + x**2*log(x)**2/2 + x**3*log(x)**3/6 + O(x**4*log(x)**4)
def test_power_x_x2():
assert (x**x).nseries(x, n=4) == \
1 + x*log(x) + x**2*log(x)**2/2 + x**3*log(x)**3/6 + O(x**4*log(x)**4)
def test_log_singular1():
assert log(1 + 1/x).nseries(x, n=5) == x - log(x) - x**2/2 + x**3/3 - \
x**4/4 + O(x**5)
def test_log_power1():
e = 1 / (1/x + x ** (log(3)/log(2)))
assert e.nseries(x, n=5) == -x**(log(3)/log(2) + 2) + x + O(x**5)
def test_log_series():
l = Symbol('l')
e = 1/(1 - log(x))
assert e.nseries(x, n=5, logx=l) == 1/(1 - l)
def test_log2():
e = log(-1/x)
assert e.nseries(x, n=5) == -log(x) + log(-1)
def test_log3():
l = Symbol('l')
e = 1/log(-1/x)
assert e.nseries(x, n=4, logx=l) == 1/(-l + log(-1))
def test_series1():
e = sin(x)
assert e.nseries(x, 0, 0) != 0
assert e.nseries(x, 0, 0) == O(1, x)
assert e.nseries(x, 0, 1) == O(x, x)
assert e.nseries(x, 0, 2) == x + O(x**2, x)
assert e.nseries(x, 0, 3) == x + O(x**3, x)
assert e.nseries(x, 0, 4) == x - x**3/6 + O(x**4, x)
e = (exp(x) - 1)/x
assert e.nseries(x, 0, 3) == 1 + x/2 + x**2/6 + O(x**3)
assert x.nseries(x, 0, 2) == x
@XFAIL
def test_series1_failing():
assert x.nseries(x, 0, 0) == O(1, x)
assert x.nseries(x, 0, 1) == O(x, x)
def test_seriesbug1():
assert (1/x).nseries(x, 0, 3) == 1/x
assert (x + 1/x).nseries(x, 0, 3) == x + 1/x
def test_series2x():
assert ((x + 1)**(-2)).nseries(x, 0, 4) == 1 - 2*x + 3*x**2 - 4*x**3 + O(x**4, x)
assert ((x + 1)**(-1)).nseries(x, 0, 4) == 1 - x + x**2 - x**3 + O(x**4, x)
assert ((x + 1)**0).nseries(x, 0, 3) == 1
assert ((x + 1)**1).nseries(x, 0, 3) == 1 + x
assert ((x + 1)**2).nseries(x, 0, 3) == x**2 + 2*x + 1
assert ((x + 1)**3).nseries(x, 0, 3) == 1 + 3*x + 3*x**2 + O(x**3)
assert (1/(1 + x)).nseries(x, 0, 4) == 1 - x + x**2 - x**3 + O(x**4, x)
assert (x + 3/(1 + 2*x)).nseries(x, 0, 4) == 3 - 5*x + 12*x**2 - 24*x**3 + O(x**4, x)
assert ((1/x + 1)**3).nseries(x, 0, 3) == 1 + 3/x + 3/x**2 + x**(-3)
assert (1/(1 + 1/x)).nseries(x, 0, 4) == x - x**2 + x**3 - O(x**4, x)
assert (1/(1 + 1/x**2)).nseries(x, 0, 6) == x**2 - x**4 + O(x**6, x)
def test_bug2(): # 1/log(0)*log(0) problem
w = Symbol("w")
e = (w**(-1) + w**(
-log(3)*log(2)**(-1)))**(-1)*(3*w**(-log(3)*log(2)**(-1)) + 2*w**(-1))
e = e.expand()
assert e.nseries(w, 0, 4).subs(w, 0) == 3
def test_exp():
e = (1 + x)**(1/x)
assert e.nseries(x, n=3) == exp(1) - x*exp(1)/2 + 11*exp(1)*x**2/24 + O(x**3)
def test_exp2():
w = Symbol("w")
e = w**(1 - log(x)/(log(2) + log(x)))
logw = Symbol("logw")
assert e.nseries(
w, 0, 1, logx=logw) == exp(logw*log(2)/(log(x) + log(2)))
def test_bug3():
e = (2/x + 3/x**2)/(1/x + 1/x**2)
assert e.nseries(x, n=3) == 3 - x + x**2 + O(x**3)
def test_generalexponent():
p = 2
e = (2/x + 3/x**p)/(1/x + 1/x**p)
assert e.nseries(x, 0, 3) == 3 - x + x**2 + O(x**3)
p = S.Half
e = (2/x + 3/x**p)/(1/x + 1/x**p)
assert e.nseries(x, 0, 2) == 2 - x + sqrt(x) + x**(S(3)/2) + O(x**2)
e = 1 + sqrt(x)
assert e.nseries(x, 0, 4) == 1 + sqrt(x)
# more complicated example
def test_genexp_x():
e = 1/(1 + sqrt(x))
assert e.nseries(x, 0, 2) == \
1 + x - sqrt(x) - sqrt(x)**3 + O(x**2, x)
# more complicated example
def test_genexp_x2():
p = Rational(3, 2)
e = (2/x + 3/x**p)/(1/x + 1/x**p)
assert e.nseries(x, 0, 3) == 3 + x + x**2 - sqrt(x) - x**(S(3)/2) - x**(S(5)/2) + O(x**3)
def test_seriesbug2():
w = Symbol("w")
#simple case (1):
e = ((2*w)/w)**(1 + w)
assert e.nseries(w, 0, 1) == 2 + O(w, w)
assert e.nseries(w, 0, 1).subs(w, 0) == 2
def test_seriesbug2b():
w = Symbol("w")
#test sin
e = sin(2*w)/w
assert e.nseries(w, 0, 3) == 2 - 4*w**2/3 + O(w**3)
def test_seriesbug2d():
w = Symbol("w", real=True)
e = log(sin(2*w)/w)
assert e.series(w, n=5) == log(2) - 2*w**2/3 - 4*w**4/45 + O(w**5)
def test_seriesbug2c():
w = Symbol("w", real=True)
#more complicated case, but sin(x)~x, so the result is the same as in (1)
e = (sin(2*w)/w)**(1 + w)
assert e.series(w, 0, 1) == 2 + O(w)
assert e.series(w, 0, 3) == 2 + 2*w*log(2) + \
w**2*(Rational(-4, 3) + log(2)**2) + O(w**3)
assert e.series(w, 0, 2).subs(w, 0) == 2
def test_expbug4():
x = Symbol("x", real=True)
assert (log(
sin(2*x)/x)*(1 + x)).series(x, 0, 2) == log(2) + x*log(2) + O(x**2, x)
assert exp(
log(sin(2*x)/x)*(1 + x)).series(x, 0, 2) == 2 + 2*x*log(2) + O(x**2)
assert exp(log(2) + O(x)).nseries(x, 0, 2) == 2 + O(x)
assert ((2 + O(x))**(1 + x)).nseries(x, 0, 2) == 2 + O(x)
def test_logbug4():
assert log(2 + O(x)).nseries(x, 0, 2) == log(2) + O(x, x)
def test_expbug5():
assert exp(log(1 + x)/x).nseries(x, n=3) == exp(1) + -exp(1)*x/2 + 11*exp(1)*x**2/24 + O(x**3)
assert exp(O(x)).nseries(x, 0, 2) == 1 + O(x)
def test_sinsinbug():
assert sin(sin(x)).nseries(x, 0, 8) == x - x**3/3 + x**5/10 - 8*x**7/315 + O(x**8)
def test_issue_3258():
a = x/(exp(x) - 1)
assert a.nseries(x, 0, 5) == 1 - x/2 - x**4/720 + x**2/12 + O(x**5)
def test_issue_3204():
x = Symbol("x", nonnegative=True)
f = sin(x**3)**Rational(1, 3)
assert f.nseries(x, 0, 17) == x - x**7/18 - x**13/3240 + O(x**17)
def test_issue_3224():
f = sqrt(1 - sqrt(y))
assert f.nseries(y, 0, 2) == 1 - sqrt(y)/2 - y/8 - sqrt(y)**3/16 + O(y**2)
def test_issue_3463():
from sympy import symbols
w, i = symbols('w,i')
r = log(5)/log(3)
p = w**(-1 + r)
e = 1/x*(-log(w**(1 + r)) + log(w + w**r))
e_ser = -r*log(w)/x + p/x - p**2/(2*x) + O(p**3)
assert e.nseries(w, n=3) == e_ser
def test_sin():
assert sin(8*x).nseries(x, n=4) == 8*x - 256*x**3/3 + O(x**4)
assert sin(x + y).nseries(x, n=1) == sin(y) + O(x)
assert sin(x + y).nseries(x, n=2) == sin(y) + cos(y)*x + O(x**2)
assert sin(x + y).nseries(x, n=5) == sin(y) + cos(y)*x - sin(y)*x**2/2 - \
cos(y)*x**3/6 + sin(y)*x**4/24 + O(x**5)
def test_issue_3515():
e = sin(8*x)/x
assert e.nseries(x, n=6) == 8 - 256*x**2/3 + 4096*x**4/15 + O(x**6)
def test_issue_3505():
e = sin(x)**(-4)*(sqrt(cos(x))*sin(x)**2 -
cos(x)**Rational(1, 3)*sin(x)**2)
assert e.nseries(x, n=9) == Rational(-1, 12) - 7*x**2/288 - \
43*x**4/10368 - 1123*x**6/2488320 + 377*x**8/29859840 + O(x**9)
def test_issue_3501():
a = Symbol("a")
e = x**(-2)*(x*sin(a + x) - x*sin(a))
assert e.nseries(x, n=6) == cos(a) - sin(a)*x/2 - cos(a)*x**2/6 + \
sin(a)*x**3/24 + O(x**4)
e = x**(-2)*(x*cos(a + x) - x*cos(a))
assert e.nseries(x, n=6) == -sin(a) - cos(a)*x/2 + sin(a)*x**2/6 + \
cos(a)*x**3/24 + O(x**4)
def test_issue_3502():
e = sin(5*x)/sin(2*x)
assert e.nseries(x, n=2) == Rational(5, 2) + O(x**2)
assert e.nseries(x, n=6) == \
Rational(5, 2) - 35*x**2/4 + 329*x**4/48 + O(x**6)
def test_issue_3503():
e = sin(2 + x)/(2 + x)
assert e.nseries(x, n=2) == sin(2)/2 + x*cos(2)/2 - x*sin(2)/4 + O(x**2)
def test_issue_3506():
e = (x + sin(3*x))**(-2)*(x*(x + sin(3*x)) - (x + sin(3*x))*sin(2*x))
assert e.nseries(x, n=7) == \
Rational(-1, 4) + 5*x**2/96 + 91*x**4/768 + 11117*x**6/129024 + O(x**7)
def test_issue_3508():
x = Symbol("x", real=True)
assert log(sin(x)).series(x, n=5) == log(x) - x**2/6 - x**4/180 + O(x**5)
e = -log(x) + x*(-log(x) + log(sin(2*x))) + log(sin(2*x))
assert e.series(x, n=5) == \
log(2) + log(2)*x - 2*x**2/3 - 2*x**3/3 - 4*x**4/45 + O(x**5)
def test_issue_3507():
e = x**(-4)*(x**2 - x**2*sqrt(cos(x)))
assert e.nseries(x, n=9) == \
Rational(1, 4) + x**2/96 + 19*x**4/5760 + 559*x**6/645120 + 29161*x**8/116121600 + O(x**9)
def test_issue_3639():
assert sin(cos(x)).nseries(x, n=5) == \
sin(1) - x**2*cos(1)/2 - x**4*sin(1)/8 + x**4*cos(1)/24 + O(x**5)
def test_hyperbolic():
assert sinh(x).nseries(x, n=6) == x + x**3/6 + x**5/120 + O(x**6)
assert cosh(x).nseries(x, n=5) == 1 + x**2/2 + x**4/24 + O(x**5)
assert tanh(x).nseries(x, n=6) == x - x**3/3 + 2*x**5/15 + O(x**6)
assert coth(x).nseries(x, n=6) == \
1/x - x**3/45 + x/3 + 2*x**5/945 + O(x**6)
assert asinh(x).nseries(x, n=6) == x - x**3/6 + 3*x**5/40 + O(x**6)
assert acosh(x).nseries(x, n=6) == \
pi*I/2 - I*x - 3*I*x**5/40 - I*x**3/6 + O(x**6)
assert atanh(x).nseries(x, n=6) == x + x**3/3 + x**5/5 + O(x**6)
assert acoth(x).nseries(x, n=6) == x + x**3/3 + x**5/5 + pi*I/2 + O(x**6)
def test_series2():
w = Symbol("w", real=True)
x = Symbol("x", real=True)
e = w**(-2)*(w*exp(1/x - w) - w*exp(1/x))
assert e.nseries(w, n=4) == -exp(1/x) + w*exp(1/x)/2 - w**2*exp(1/x)/6 + w**3*exp(1/x)/24 + O(w**4)
def test_series3():
w = Symbol("w", real=True)
e = w**(-6)*(w**3*tan(w) - w**3*sin(w))
assert e.nseries(w, n=8) == Integer(1)/2 + w**2/8 + 13*w**4/240 + 529*w**6/24192 + O(w**8)
def test_bug4():
w = Symbol("w")
e = x/(w**4 + x**2*w**4 + 2*x*w**4)*w**4
assert e.nseries(w, n=2).removeO() in [x/(1 + 2*x + x**2),
1/(1 + x/2 + 1/x/2)/2, 1/x/(1 + 2/x + x**(-2))]
def test_bug5():
w = Symbol("w")
l = Symbol('l')
e = (-log(w) + log(1 + w*log(x)))**(-2)*w**(-2)*((-log(w) +
log(1 + x*w))*(-log(w) + log(1 + w*log(x)))*w - x*(-log(w) +
log(1 + w*log(x)))*w)
assert e.nseries(w, n=2, logx=l) == x/w/l + 1/w + O(1, w)
assert e.nseries(w, n=3, logx=l) == x/w/l + 1/w - x/l + 1/l*log(x) \
+ x*log(x)/l**2 + O(w)
def test_issue_4115():
assert (sin(x)/(1 - cos(x))).nseries(x, n=1) == 2/x + O(x)
assert (sin(x)**2/(1 - cos(x))).nseries(x, n=1) == 2 + O(x)
def test_pole():
raises(PoleError, lambda: sin(1/x).series(x, 0, 5))
raises(PoleError, lambda: sin(1 + 1/x).series(x, 0, 5))
raises(PoleError, lambda: (x*sin(1/x)).series(x, 0, 5))
def test_expsinbug():
assert exp(sin(x)).series(x, 0, 0) == O(1, x)
assert exp(sin(x)).series(x, 0, 1) == 1 + O(x)
assert exp(sin(x)).series(x, 0, 2) == 1 + x + O(x**2)
assert exp(sin(x)).series(x, 0, 3) == 1 + x + x**2/2 + O(x**3)
assert exp(sin(x)).series(x, 0, 4) == 1 + x + x**2/2 + O(x**4)
assert exp(sin(x)).series(x, 0, 5) == 1 + x + x**2/2 - x**4/8 + O(x**5)
def test_floor():
x = Symbol('x')
assert floor(x).series(x) == 0
assert floor(-x).series(x) == -1
assert floor(sin(x)).series(x) == 0
assert floor(sin(-x)).series(x) == -1
assert floor(x**3).series(x) == 0
assert floor(-x**3).series(x) == -1
assert floor(cos(x)).series(x) == 0
assert floor(cos(-x)).series(x) == 0
assert floor(5 + sin(x)).series(x) == 5
assert floor(5 + sin(-x)).series(x) == 4
assert floor(x).series(x, 2) == 2
assert floor(-x).series(x, 2) == -3
x = Symbol('x', negative=True)
assert floor(x + 1.5).series(x) == 1
def test_ceiling():
assert ceiling(x).series(x) == 1
assert ceiling(-x).series(x) == 0
assert ceiling(sin(x)).series(x) == 1
assert ceiling(sin(-x)).series(x) == 0
assert ceiling(1 - cos(x)).series(x) == 1
assert ceiling(1 - cos(-x)).series(x) == 1
assert ceiling(x).series(x, 2) == 3
assert ceiling(-x).series(x, 2) == -2
def test_abs():
a = Symbol('a')
assert abs(x).nseries(x, n=4) == x
assert abs(-x).nseries(x, n=4) == x
assert abs(x + 1).nseries(x, n=4) == x + 1
assert abs(sin(x)).nseries(x, n=4) == x - Rational(1, 6)*x**3 + O(x**4)
assert abs(sin(-x)).nseries(x, n=4) == x - Rational(1, 6)*x**3 + O(x**4)
assert abs(x - a).nseries(x, 1) == Piecewise((x - 1, Eq(1 - a, 0)),
((x - a)*sign(1 - a), True))
def test_dir():
assert abs(x).series(x, 0, dir="+") == x
assert abs(x).series(x, 0, dir="-") == -x
assert floor(x + 2).series(x, 0, dir='+') == 2
assert floor(x + 2).series(x, 0, dir='-') == 1
assert floor(x + 2.2).series(x, 0, dir='-') == 2
assert ceiling(x + 2.2).series(x, 0, dir='-') == 3
assert sin(x + y).series(x, 0, dir='-') == sin(x + y).series(x, 0, dir='+')
def test_issue_3504():
a = Symbol("a")
e = asin(a*x)/x
assert e.series(x, 4, n=2).removeO() == \
(x - 4)*(a/(4*sqrt(-16*a**2 + 1)) - asin(4*a)/16) + asin(4*a)/4
def test_issue_4441():
a, b = symbols('a,b')
f = 1/(1 + a*x)
assert f.series(x, 0, 5) == 1 - a*x + a**2*x**2 - a**3*x**3 + \
a**4*x**4 + O(x**5)
f = 1/(1 + (a + b)*x)
assert f.series(x, 0, 3) == 1 + x*(-a - b) + \
x**2*(a + b)**2 + O(x**3)
def test_issue_4329():
assert tan(x).series(x, pi/2, n=3).removeO() == \
-pi/6 + x/3 - 1/(x - pi/2)
assert cot(x).series(x, pi, n=3).removeO() == \
-x/3 + pi/3 + 1/(x - pi)
assert limit(tan(x)**tan(2*x), x, pi/4) == exp(-1)
def test_issue_5183():
assert abs(x + x**2).series(n=1) == O(x)
assert abs(x + x**2).series(n=2) == x + O(x**2)
assert ((1 + x)**2).series(x, n=6) == x**2 + 2*x + 1
assert (1 + 1/x).series() == 1 + 1/x
assert Derivative(exp(x).series(), x).doit() == \
1 + x + x**2/2 + x**3/6 + x**4/24 + O(x**5)
def test_issue_5654():
a = Symbol('a')
assert (1/(x**2+a**2)**2).nseries(x, x0=I*a, n=0) == \
-I/(4*a**3*(-I*a + x)) - 1/(4*a**2*(-I*a + x)**2) + O(1, (x, I*a))
assert (1/(x**2+a**2)**2).nseries(x, x0=I*a, n=1) == 3/(16*a**4) \
-I/(4*a**3*(-I*a + x)) - 1/(4*a**2*(-I*a + x)**2) + O(-I*a + x, (x, I*a))
def test_issue_5925():
sx = sqrt(x + z).series(z, 0, 1)
sxy = sqrt(x + y + z).series(z, 0, 1)
s1, s2 = sx.subs(x, x + y), sxy
assert (s1 - s2).expand().removeO().simplify() == 0
sx = sqrt(x + z).series(z, 0, 1)
sxy = sqrt(x + y + z).series(z, 0, 1)
assert sxy.subs({x:1, y:2}) == sx.subs(x, 3)
def test_exp_2():
assert exp(x**3).nseries(x, 0, 14) == 1 + x**3 + x**6/2 + x**9/6 + x**12/24 + O(x**14)
|
cb14ca961b4fd268795a5ab4cf1f9f0e8f701cfe51500186dcb0cbb8c4122a47
|
from sympy import (
symbols, sin, simplify, cos, trigsimp, tan, exptrigsimp,sinh,
cosh, diff, cot, Subs, exp, tanh, S, integrate, I,Matrix,
Symbol, coth, pi, log, count_ops, sqrt, E, expand, Piecewise , Rational
)
from sympy.testing.pytest import XFAIL
from sympy.abc import x, y
def test_trigsimp1():
x, y = symbols('x,y')
assert trigsimp(1 - sin(x)**2) == cos(x)**2
assert trigsimp(1 - cos(x)**2) == sin(x)**2
assert trigsimp(sin(x)**2 + cos(x)**2) == 1
assert trigsimp(1 + tan(x)**2) == 1/cos(x)**2
assert trigsimp(1/cos(x)**2 - 1) == tan(x)**2
assert trigsimp(1/cos(x)**2 - tan(x)**2) == 1
assert trigsimp(1 + cot(x)**2) == 1/sin(x)**2
assert trigsimp(1/sin(x)**2 - 1) == 1/tan(x)**2
assert trigsimp(1/sin(x)**2 - cot(x)**2) == 1
assert trigsimp(5*cos(x)**2 + 5*sin(x)**2) == 5
assert trigsimp(5*cos(x/2)**2 + 2*sin(x/2)**2) == 3*cos(x)/2 + Rational(7, 2)
assert trigsimp(sin(x)/cos(x)) == tan(x)
assert trigsimp(2*tan(x)*cos(x)) == 2*sin(x)
assert trigsimp(cot(x)**3*sin(x)**3) == cos(x)**3
assert trigsimp(y*tan(x)**2/sin(x)**2) == y/cos(x)**2
assert trigsimp(cot(x)/cos(x)) == 1/sin(x)
assert trigsimp(sin(x + y) + sin(x - y)) == 2*sin(x)*cos(y)
assert trigsimp(sin(x + y) - sin(x - y)) == 2*sin(y)*cos(x)
assert trigsimp(cos(x + y) + cos(x - y)) == 2*cos(x)*cos(y)
assert trigsimp(cos(x + y) - cos(x - y)) == -2*sin(x)*sin(y)
assert trigsimp(tan(x + y) - tan(x)/(1 - tan(x)*tan(y))) == \
sin(y)/(-sin(y)*tan(x) + cos(y)) # -tan(y)/(tan(x)*tan(y) - 1)
assert trigsimp(sinh(x + y) + sinh(x - y)) == 2*sinh(x)*cosh(y)
assert trigsimp(sinh(x + y) - sinh(x - y)) == 2*sinh(y)*cosh(x)
assert trigsimp(cosh(x + y) + cosh(x - y)) == 2*cosh(x)*cosh(y)
assert trigsimp(cosh(x + y) - cosh(x - y)) == 2*sinh(x)*sinh(y)
assert trigsimp(tanh(x + y) - tanh(x)/(1 + tanh(x)*tanh(y))) == \
sinh(y)/(sinh(y)*tanh(x) + cosh(y))
assert trigsimp(cos(0.12345)**2 + sin(0.12345)**2) == 1
e = 2*sin(x)**2 + 2*cos(x)**2
assert trigsimp(log(e)) == log(2)
def test_trigsimp1a():
assert trigsimp(sin(2)**2*cos(3)*exp(2)/cos(2)**2) == tan(2)**2*cos(3)*exp(2)
assert trigsimp(tan(2)**2*cos(3)*exp(2)*cos(2)**2) == sin(2)**2*cos(3)*exp(2)
assert trigsimp(cot(2)*cos(3)*exp(2)*sin(2)) == cos(3)*exp(2)*cos(2)
assert trigsimp(tan(2)*cos(3)*exp(2)/sin(2)) == cos(3)*exp(2)/cos(2)
assert trigsimp(cot(2)*cos(3)*exp(2)/cos(2)) == cos(3)*exp(2)/sin(2)
assert trigsimp(cot(2)*cos(3)*exp(2)*tan(2)) == cos(3)*exp(2)
assert trigsimp(sinh(2)*cos(3)*exp(2)/cosh(2)) == tanh(2)*cos(3)*exp(2)
assert trigsimp(tanh(2)*cos(3)*exp(2)*cosh(2)) == sinh(2)*cos(3)*exp(2)
assert trigsimp(coth(2)*cos(3)*exp(2)*sinh(2)) == cosh(2)*cos(3)*exp(2)
assert trigsimp(tanh(2)*cos(3)*exp(2)/sinh(2)) == cos(3)*exp(2)/cosh(2)
assert trigsimp(coth(2)*cos(3)*exp(2)/cosh(2)) == cos(3)*exp(2)/sinh(2)
assert trigsimp(coth(2)*cos(3)*exp(2)*tanh(2)) == cos(3)*exp(2)
def test_trigsimp2():
x, y = symbols('x,y')
assert trigsimp(cos(x)**2*sin(y)**2 + cos(x)**2*cos(y)**2 + sin(x)**2,
recursive=True) == 1
assert trigsimp(sin(x)**2*sin(y)**2 + sin(x)**2*cos(y)**2 + cos(x)**2,
recursive=True) == 1
assert trigsimp(
Subs(x, x, sin(y)**2 + cos(y)**2)) == Subs(x, x, 1)
def test_issue_4373():
x = Symbol("x")
assert abs(trigsimp(2.0*sin(x)**2 + 2.0*cos(x)**2) - 2.0) < 1e-10
def test_trigsimp3():
x, y = symbols('x,y')
assert trigsimp(sin(x)/cos(x)) == tan(x)
assert trigsimp(sin(x)**2/cos(x)**2) == tan(x)**2
assert trigsimp(sin(x)**3/cos(x)**3) == tan(x)**3
assert trigsimp(sin(x)**10/cos(x)**10) == tan(x)**10
assert trigsimp(cos(x)/sin(x)) == 1/tan(x)
assert trigsimp(cos(x)**2/sin(x)**2) == 1/tan(x)**2
assert trigsimp(cos(x)**10/sin(x)**10) == 1/tan(x)**10
assert trigsimp(tan(x)) == trigsimp(sin(x)/cos(x))
def test_issue_4661():
a, x, y = symbols('a x y')
eq = -4*sin(x)**4 + 4*cos(x)**4 - 8*cos(x)**2
assert trigsimp(eq) == -4
n = sin(x)**6 + 4*sin(x)**4*cos(x)**2 + 5*sin(x)**2*cos(x)**4 + 2*cos(x)**6
d = -sin(x)**2 - 2*cos(x)**2
assert simplify(n/d) == -1
assert trigsimp(-2*cos(x)**2 + cos(x)**4 - sin(x)**4) == -1
eq = (- sin(x)**3/4)*cos(x) + (cos(x)**3/4)*sin(x) - sin(2*x)*cos(2*x)/8
assert trigsimp(eq) == 0
def test_issue_4494():
a, b = symbols('a b')
eq = sin(a)**2*sin(b)**2 + cos(a)**2*cos(b)**2*tan(a)**2 + cos(a)**2
assert trigsimp(eq) == 1
def test_issue_5948():
a, x, y = symbols('a x y')
assert trigsimp(diff(integrate(cos(x)/sin(x)**7, x), x)) == \
cos(x)/sin(x)**7
def test_issue_4775():
a, x, y = symbols('a x y')
assert trigsimp(sin(x)*cos(y)+cos(x)*sin(y)) == sin(x + y)
assert trigsimp(sin(x)*cos(y)+cos(x)*sin(y)+3) == sin(x + y) + 3
def test_issue_4280():
a, x, y = symbols('a x y')
assert trigsimp(cos(x)**2 + cos(y)**2*sin(x)**2 + sin(y)**2*sin(x)**2) == 1
assert trigsimp(a**2*sin(x)**2 + a**2*cos(y)**2*cos(x)**2 + a**2*cos(x)**2*sin(y)**2) == a**2
assert trigsimp(a**2*cos(y)**2*sin(x)**2 + a**2*sin(y)**2*sin(x)**2) == a**2*sin(x)**2
def test_issue_3210():
eqs = (sin(2)*cos(3) + sin(3)*cos(2),
-sin(2)*sin(3) + cos(2)*cos(3),
sin(2)*cos(3) - sin(3)*cos(2),
sin(2)*sin(3) + cos(2)*cos(3),
sin(2)*sin(3) + cos(2)*cos(3) + cos(2),
sinh(2)*cosh(3) + sinh(3)*cosh(2),
sinh(2)*sinh(3) + cosh(2)*cosh(3),
)
assert [trigsimp(e) for e in eqs] == [
sin(5),
cos(5),
-sin(1),
cos(1),
cos(1) + cos(2),
sinh(5),
cosh(5),
]
def test_trigsimp_issues():
a, x, y = symbols('a x y')
# issue 4625 - factor_terms works, too
assert trigsimp(sin(x)**3 + cos(x)**2*sin(x)) == sin(x)
# issue 5948
assert trigsimp(diff(integrate(cos(x)/sin(x)**3, x), x)) == \
cos(x)/sin(x)**3
assert trigsimp(diff(integrate(sin(x)/cos(x)**3, x), x)) == \
sin(x)/cos(x)**3
# check integer exponents
e = sin(x)**y/cos(x)**y
assert trigsimp(e) == e
assert trigsimp(e.subs(y, 2)) == tan(x)**2
assert trigsimp(e.subs(x, 1)) == tan(1)**y
# check for multiple patterns
assert (cos(x)**2/sin(x)**2*cos(y)**2/sin(y)**2).trigsimp() == \
1/tan(x)**2/tan(y)**2
assert trigsimp(cos(x)/sin(x)*cos(x+y)/sin(x+y)) == \
1/(tan(x)*tan(x + y))
eq = cos(2)*(cos(3) + 1)**2/(cos(3) - 1)**2
assert trigsimp(eq) == eq.factor() # factor makes denom (-1 + cos(3))**2
assert trigsimp(cos(2)*(cos(3) + 1)**2*(cos(3) - 1)**2) == \
cos(2)*sin(3)**4
# issue 6789; this generates an expression that formerly caused
# trigsimp to hang
assert cot(x).equals(tan(x)) is False
# nan or the unchanged expression is ok, but not sin(1)
z = cos(x)**2 + sin(x)**2 - 1
z1 = tan(x)**2 - 1/cot(x)**2
n = (1 + z1/z)
assert trigsimp(sin(n)) != sin(1)
eq = x*(n - 1) - x*n
assert trigsimp(eq) is S.NaN
assert trigsimp(eq, recursive=True) is S.NaN
assert trigsimp(1).is_Integer
assert trigsimp(-sin(x)**4 - 2*sin(x)**2*cos(x)**2 - cos(x)**4) == -1
def test_trigsimp_issue_2515():
x = Symbol('x')
assert trigsimp(x*cos(x)*tan(x)) == x*sin(x)
assert trigsimp(-sin(x) + cos(x)*tan(x)) == 0
def test_trigsimp_issue_3826():
assert trigsimp(tan(2*x).expand(trig=True)) == tan(2*x)
def test_trigsimp_issue_4032():
n = Symbol('n', integer=True, positive=True)
assert trigsimp(2**(n/2)*cos(pi*n/4)/2 + 2**(n - 1)/2) == \
2**(n/2)*cos(pi*n/4)/2 + 2**n/4
def test_trigsimp_issue_7761():
assert trigsimp(cosh(pi/4)) == cosh(pi/4)
def test_trigsimp_noncommutative():
x, y = symbols('x,y')
A, B = symbols('A,B', commutative=False)
assert trigsimp(A - A*sin(x)**2) == A*cos(x)**2
assert trigsimp(A - A*cos(x)**2) == A*sin(x)**2
assert trigsimp(A*sin(x)**2 + A*cos(x)**2) == A
assert trigsimp(A + A*tan(x)**2) == A/cos(x)**2
assert trigsimp(A/cos(x)**2 - A) == A*tan(x)**2
assert trigsimp(A/cos(x)**2 - A*tan(x)**2) == A
assert trigsimp(A + A*cot(x)**2) == A/sin(x)**2
assert trigsimp(A/sin(x)**2 - A) == A/tan(x)**2
assert trigsimp(A/sin(x)**2 - A*cot(x)**2) == A
assert trigsimp(y*A*cos(x)**2 + y*A*sin(x)**2) == y*A
assert trigsimp(A*sin(x)/cos(x)) == A*tan(x)
assert trigsimp(A*tan(x)*cos(x)) == A*sin(x)
assert trigsimp(A*cot(x)**3*sin(x)**3) == A*cos(x)**3
assert trigsimp(y*A*tan(x)**2/sin(x)**2) == y*A/cos(x)**2
assert trigsimp(A*cot(x)/cos(x)) == A/sin(x)
assert trigsimp(A*sin(x + y) + A*sin(x - y)) == 2*A*sin(x)*cos(y)
assert trigsimp(A*sin(x + y) - A*sin(x - y)) == 2*A*sin(y)*cos(x)
assert trigsimp(A*cos(x + y) + A*cos(x - y)) == 2*A*cos(x)*cos(y)
assert trigsimp(A*cos(x + y) - A*cos(x - y)) == -2*A*sin(x)*sin(y)
assert trigsimp(A*sinh(x + y) + A*sinh(x - y)) == 2*A*sinh(x)*cosh(y)
assert trigsimp(A*sinh(x + y) - A*sinh(x - y)) == 2*A*sinh(y)*cosh(x)
assert trigsimp(A*cosh(x + y) + A*cosh(x - y)) == 2*A*cosh(x)*cosh(y)
assert trigsimp(A*cosh(x + y) - A*cosh(x - y)) == 2*A*sinh(x)*sinh(y)
assert trigsimp(A*cos(0.12345)**2 + A*sin(0.12345)**2) == 1.0*A
def test_hyperbolic_simp():
x, y = symbols('x,y')
assert trigsimp(sinh(x)**2 + 1) == cosh(x)**2
assert trigsimp(cosh(x)**2 - 1) == sinh(x)**2
assert trigsimp(cosh(x)**2 - sinh(x)**2) == 1
assert trigsimp(1 - tanh(x)**2) == 1/cosh(x)**2
assert trigsimp(1 - 1/cosh(x)**2) == tanh(x)**2
assert trigsimp(tanh(x)**2 + 1/cosh(x)**2) == 1
assert trigsimp(coth(x)**2 - 1) == 1/sinh(x)**2
assert trigsimp(1/sinh(x)**2 + 1) == 1/tanh(x)**2
assert trigsimp(coth(x)**2 - 1/sinh(x)**2) == 1
assert trigsimp(5*cosh(x)**2 - 5*sinh(x)**2) == 5
assert trigsimp(5*cosh(x/2)**2 - 2*sinh(x/2)**2) == 3*cosh(x)/2 + Rational(7, 2)
assert trigsimp(sinh(x)/cosh(x)) == tanh(x)
assert trigsimp(tanh(x)) == trigsimp(sinh(x)/cosh(x))
assert trigsimp(cosh(x)/sinh(x)) == 1/tanh(x)
assert trigsimp(2*tanh(x)*cosh(x)) == 2*sinh(x)
assert trigsimp(coth(x)**3*sinh(x)**3) == cosh(x)**3
assert trigsimp(y*tanh(x)**2/sinh(x)**2) == y/cosh(x)**2
assert trigsimp(coth(x)/cosh(x)) == 1/sinh(x)
for a in (pi/6*I, pi/4*I, pi/3*I):
assert trigsimp(sinh(a)*cosh(x) + cosh(a)*sinh(x)) == sinh(x + a)
assert trigsimp(-sinh(a)*cosh(x) + cosh(a)*sinh(x)) == sinh(x - a)
e = 2*cosh(x)**2 - 2*sinh(x)**2
assert trigsimp(log(e)) == log(2)
# issue 19535:
assert trigsimp(sqrt(cosh(x)**2 - 1)) == sqrt(sinh(x)**2)
assert trigsimp(cosh(x)**2*cosh(y)**2 - cosh(x)**2*sinh(y)**2 - sinh(x)**2,
recursive=True) == 1
assert trigsimp(sinh(x)**2*sinh(y)**2 - sinh(x)**2*cosh(y)**2 + cosh(x)**2,
recursive=True) == 1
assert abs(trigsimp(2.0*cosh(x)**2 - 2.0*sinh(x)**2) - 2.0) < 1e-10
assert trigsimp(sinh(x)**2/cosh(x)**2) == tanh(x)**2
assert trigsimp(sinh(x)**3/cosh(x)**3) == tanh(x)**3
assert trigsimp(sinh(x)**10/cosh(x)**10) == tanh(x)**10
assert trigsimp(cosh(x)**3/sinh(x)**3) == 1/tanh(x)**3
assert trigsimp(cosh(x)/sinh(x)) == 1/tanh(x)
assert trigsimp(cosh(x)**2/sinh(x)**2) == 1/tanh(x)**2
assert trigsimp(cosh(x)**10/sinh(x)**10) == 1/tanh(x)**10
assert trigsimp(x*cosh(x)*tanh(x)) == x*sinh(x)
assert trigsimp(-sinh(x) + cosh(x)*tanh(x)) == 0
assert tan(x) != 1/cot(x) # cot doesn't auto-simplify
assert trigsimp(tan(x) - 1/cot(x)) == 0
assert trigsimp(3*tanh(x)**7 - 2/coth(x)**7) == tanh(x)**7
def test_trigsimp_groebner():
from sympy.simplify.trigsimp import trigsimp_groebner
c = cos(x)
s = sin(x)
ex = (4*s*c + 12*s + 5*c**3 + 21*c**2 + 23*c + 15)/(
-s*c**2 + 2*s*c + 15*s + 7*c**3 + 31*c**2 + 37*c + 21)
resnum = (5*s - 5*c + 1)
resdenom = (8*s - 6*c)
results = [resnum/resdenom, (-resnum)/(-resdenom)]
assert trigsimp_groebner(ex) in results
assert trigsimp_groebner(s/c, hints=[tan]) == tan(x)
assert trigsimp_groebner(c*s) == c*s
assert trigsimp((-s + 1)/c + c/(-s + 1),
method='groebner') == 2/c
assert trigsimp((-s + 1)/c + c/(-s + 1),
method='groebner', polynomial=True) == 2/c
# Test quick=False works
assert trigsimp_groebner(ex, hints=[2]) in results
assert trigsimp_groebner(ex, hints=[int(2)]) in results
# test "I"
assert trigsimp_groebner(sin(I*x)/cos(I*x), hints=[tanh]) == I*tanh(x)
# test hyperbolic / sums
assert trigsimp_groebner((tanh(x)+tanh(y))/(1+tanh(x)*tanh(y)),
hints=[(tanh, x, y)]) == tanh(x + y)
def test_issue_2827_trigsimp_methods():
measure1 = lambda expr: len(str(expr))
measure2 = lambda expr: -count_ops(expr)
# Return the most complicated result
expr = (x + 1)/(x + sin(x)**2 + cos(x)**2)
ans = Matrix([1])
M = Matrix([expr])
assert trigsimp(M, method='fu', measure=measure1) == ans
assert trigsimp(M, method='fu', measure=measure2) != ans
# all methods should work with Basic expressions even if they
# aren't Expr
M = Matrix.eye(1)
assert all(trigsimp(M, method=m) == M for m in
'fu matching groebner old'.split())
# watch for E in exptrigsimp, not only exp()
eq = 1/sqrt(E) + E
assert exptrigsimp(eq) == eq
def test_issue_15129_trigsimp_methods():
t1 = Matrix([sin(Rational(1, 50)), cos(Rational(1, 50)), 0])
t2 = Matrix([sin(Rational(1, 25)), cos(Rational(1, 25)), 0])
t3 = Matrix([cos(Rational(1, 25)), sin(Rational(1, 25)), 0])
r1 = t1.dot(t2)
r2 = t1.dot(t3)
assert trigsimp(r1) == cos(Rational(1, 50))
assert trigsimp(r2) == sin(Rational(3, 50))
def test_exptrigsimp():
def valid(a, b):
from sympy.testing.randtest import verify_numerically as tn
if not (tn(a, b) and a == b):
return False
return True
assert exptrigsimp(exp(x) + exp(-x)) == 2*cosh(x)
assert exptrigsimp(exp(x) - exp(-x)) == 2*sinh(x)
assert exptrigsimp((2*exp(x)-2*exp(-x))/(exp(x)+exp(-x))) == 2*tanh(x)
assert exptrigsimp((2*exp(2*x)-2)/(exp(2*x)+1)) == 2*tanh(x)
e = [cos(x) + I*sin(x), cos(x) - I*sin(x),
cosh(x) - sinh(x), cosh(x) + sinh(x)]
ok = [exp(I*x), exp(-I*x), exp(-x), exp(x)]
assert all(valid(i, j) for i, j in zip(
[exptrigsimp(ei) for ei in e], ok))
ue = [cos(x) + sin(x), cos(x) - sin(x),
cosh(x) + I*sinh(x), cosh(x) - I*sinh(x)]
assert [exptrigsimp(ei) == ei for ei in ue]
res = []
ok = [y*tanh(1), 1/(y*tanh(1)), I*y*tan(1), -I/(y*tan(1)),
y*tanh(x), 1/(y*tanh(x)), I*y*tan(x), -I/(y*tan(x)),
y*tanh(1 + I), 1/(y*tanh(1 + I))]
for a in (1, I, x, I*x, 1 + I):
w = exp(a)
eq = y*(w - 1/w)/(w + 1/w)
res.append(simplify(eq))
res.append(simplify(1/eq))
assert all(valid(i, j) for i, j in zip(res, ok))
for a in range(1, 3):
w = exp(a)
e = w + 1/w
s = simplify(e)
assert s == exptrigsimp(e)
assert valid(s, 2*cosh(a))
e = w - 1/w
s = simplify(e)
assert s == exptrigsimp(e)
assert valid(s, 2*sinh(a))
def test_exptrigsimp_noncommutative():
a,b = symbols('a b', commutative=False)
x = Symbol('x', commutative=True)
assert exp(a + x) == exptrigsimp(exp(a)*exp(x))
p = exp(a)*exp(b) - exp(b)*exp(a)
assert p == exptrigsimp(p) != 0
def test_powsimp_on_numbers():
assert 2**(Rational(1, 3) - 2) == 2**Rational(1, 3)/4
@XFAIL
def test_issue_6811_fail():
# from doc/src/modules/physics/mechanics/examples.rst, the current `eq`
# at Line 576 (in different variables) was formerly the equivalent and
# shorter expression given below...it would be nice to get the short one
# back again
xp, y, x, z = symbols('xp, y, x, z')
eq = 4*(-19*sin(x)*y + 5*sin(3*x)*y + 15*cos(2*x)*z - 21*z)*xp/(9*cos(x) - 5*cos(3*x))
assert trigsimp(eq) == -2*(2*cos(x)*tan(x)*y + 3*z)*xp/cos(x)
def test_Piecewise():
e1 = x*(x + y) - y*(x + y)
e2 = sin(x)**2 + cos(x)**2
e3 = expand((x + y)*y/x)
# s1 = simplify(e1)
s2 = simplify(e2)
# s3 = simplify(e3)
# trigsimp tries not to touch non-trig containing args
assert trigsimp(Piecewise((e1, e3 < e2), (e3, True))) == \
Piecewise((e1, e3 < s2), (e3, True))
def test_trigsimp_old():
x, y = symbols('x,y')
assert trigsimp(1 - sin(x)**2, old=True) == cos(x)**2
assert trigsimp(1 - cos(x)**2, old=True) == sin(x)**2
assert trigsimp(sin(x)**2 + cos(x)**2, old=True) == 1
assert trigsimp(1 + tan(x)**2, old=True) == 1/cos(x)**2
assert trigsimp(1/cos(x)**2 - 1, old=True) == tan(x)**2
assert trigsimp(1/cos(x)**2 - tan(x)**2, old=True) == 1
assert trigsimp(1 + cot(x)**2, old=True) == 1/sin(x)**2
assert trigsimp(1/sin(x)**2 - cot(x)**2, old=True) == 1
assert trigsimp(5*cos(x)**2 + 5*sin(x)**2, old=True) == 5
assert trigsimp(sin(x)/cos(x), old=True) == tan(x)
assert trigsimp(2*tan(x)*cos(x), old=True) == 2*sin(x)
assert trigsimp(cot(x)**3*sin(x)**3, old=True) == cos(x)**3
assert trigsimp(y*tan(x)**2/sin(x)**2, old=True) == y/cos(x)**2
assert trigsimp(cot(x)/cos(x), old=True) == 1/sin(x)
assert trigsimp(sin(x + y) + sin(x - y), old=True) == 2*sin(x)*cos(y)
assert trigsimp(sin(x + y) - sin(x - y), old=True) == 2*sin(y)*cos(x)
assert trigsimp(cos(x + y) + cos(x - y), old=True) == 2*cos(x)*cos(y)
assert trigsimp(cos(x + y) - cos(x - y), old=True) == -2*sin(x)*sin(y)
assert trigsimp(sinh(x + y) + sinh(x - y), old=True) == 2*sinh(x)*cosh(y)
assert trigsimp(sinh(x + y) - sinh(x - y), old=True) == 2*sinh(y)*cosh(x)
assert trigsimp(cosh(x + y) + cosh(x - y), old=True) == 2*cosh(x)*cosh(y)
assert trigsimp(cosh(x + y) - cosh(x - y), old=True) == 2*sinh(x)*sinh(y)
assert trigsimp(cos(0.12345)**2 + sin(0.12345)**2, old=True) == 1
assert trigsimp(sin(x)/cos(x), old=True, method='combined') == tan(x)
assert trigsimp(sin(x)/cos(x), old=True, method='groebner') == sin(x)/cos(x)
assert trigsimp(sin(x)/cos(x), old=True, method='groebner', hints=[tan]) == tan(x)
assert trigsimp(1-sin(sin(x)**2+cos(x)**2)**2, old=True, deep=True) == cos(1)**2
|
732f3fa108d86a7e2001a3f39d3696b296658eae66e6cd7e712136f4d5304166
|
from typing import List
from sympy.core import S, sympify, Dummy, Mod
from sympy.core.cache import cacheit
from sympy.core.compatibility import reduce, HAS_GMPY
from sympy.core.function import Function, ArgumentIndexError
from sympy.core.logic import fuzzy_and
from sympy.core.numbers import Integer, pi
from sympy.core.relational import Eq
from sympy.ntheory import sieve
from sympy.polys.polytools import Poly
from math import sqrt as _sqrt
class CombinatorialFunction(Function):
"""Base class for combinatorial functions. """
def _eval_simplify(self, **kwargs):
from sympy.simplify.combsimp import combsimp
# combinatorial function with non-integer arguments is
# automatically passed to gammasimp
expr = combsimp(self)
measure = kwargs['measure']
if measure(expr) <= kwargs['ratio']*measure(self):
return expr
return self
###############################################################################
######################## FACTORIAL and MULTI-FACTORIAL ########################
###############################################################################
class factorial(CombinatorialFunction):
r"""Implementation of factorial function over nonnegative integers.
By convention (consistent with the gamma function and the binomial
coefficients), factorial of a negative integer is complex infinity.
The factorial is very important in combinatorics where it gives
the number of ways in which `n` objects can be permuted. It also
arises in calculus, probability, number theory, etc.
There is strict relation of factorial with gamma function. In
fact `n! = gamma(n+1)` for nonnegative integers. Rewrite of this
kind is very useful in case of combinatorial simplification.
Computation of the factorial is done using two algorithms. For
small arguments a precomputed look up table is used. However for bigger
input algorithm Prime-Swing is used. It is the fastest algorithm
known and computes `n!` via prime factorization of special class
of numbers, called here the 'Swing Numbers'.
Examples
========
>>> from sympy import Symbol, factorial, S
>>> n = Symbol('n', integer=True)
>>> factorial(0)
1
>>> factorial(7)
5040
>>> factorial(-2)
zoo
>>> factorial(n)
factorial(n)
>>> factorial(2*n)
factorial(2*n)
>>> factorial(S(1)/2)
factorial(1/2)
See Also
========
factorial2, RisingFactorial, FallingFactorial
"""
def fdiff(self, argindex=1):
from sympy import gamma, polygamma
if argindex == 1:
return gamma(self.args[0] + 1)*polygamma(0, self.args[0] + 1)
else:
raise ArgumentIndexError(self, argindex)
_small_swing = [
1, 1, 1, 3, 3, 15, 5, 35, 35, 315, 63, 693, 231, 3003, 429, 6435, 6435, 109395,
12155, 230945, 46189, 969969, 88179, 2028117, 676039, 16900975, 1300075,
35102025, 5014575, 145422675, 9694845, 300540195, 300540195
]
_small_factorials = [] # type: List[int]
@classmethod
def _swing(cls, n):
if n < 33:
return cls._small_swing[n]
else:
N, primes = int(_sqrt(n)), []
for prime in sieve.primerange(3, N + 1):
p, q = 1, n
while True:
q //= prime
if q > 0:
if q & 1 == 1:
p *= prime
else:
break
if p > 1:
primes.append(p)
for prime in sieve.primerange(N + 1, n//3 + 1):
if (n // prime) & 1 == 1:
primes.append(prime)
L_product = R_product = 1
for prime in sieve.primerange(n//2 + 1, n + 1):
L_product *= prime
for prime in primes:
R_product *= prime
return L_product*R_product
@classmethod
def _recursive(cls, n):
if n < 2:
return 1
else:
return (cls._recursive(n//2)**2)*cls._swing(n)
@classmethod
def eval(cls, n):
n = sympify(n)
if n.is_Number:
if n.is_zero:
return S.One
elif n is S.Infinity:
return S.Infinity
elif n.is_Integer:
if n.is_negative:
return S.ComplexInfinity
else:
n = n.p
if n < 20:
if not cls._small_factorials:
result = 1
for i in range(1, 20):
result *= i
cls._small_factorials.append(result)
result = cls._small_factorials[n-1]
# GMPY factorial is faster, use it when available
elif HAS_GMPY:
from sympy.core.compatibility import gmpy
result = gmpy.fac(n)
else:
bits = bin(n).count('1')
result = cls._recursive(n)*2**(n - bits)
return Integer(result)
def _facmod(self, n, q):
res, N = 1, int(_sqrt(n))
# Exponent of prime p in n! is e_p(n) = [n/p] + [n/p**2] + ...
# for p > sqrt(n), e_p(n) < sqrt(n), the primes with [n/p] = m,
# occur consecutively and are grouped together in pw[m] for
# simultaneous exponentiation at a later stage
pw = [1]*N
m = 2 # to initialize the if condition below
for prime in sieve.primerange(2, n + 1):
if m > 1:
m, y = 0, n // prime
while y:
m += y
y //= prime
if m < N:
pw[m] = pw[m]*prime % q
else:
res = res*pow(prime, m, q) % q
for ex, bs in enumerate(pw):
if ex == 0 or bs == 1:
continue
if bs == 0:
return 0
res = res*pow(bs, ex, q) % q
return res
def _eval_Mod(self, q):
n = self.args[0]
if n.is_integer and n.is_nonnegative and q.is_integer:
aq = abs(q)
d = aq - n
if d.is_nonpositive:
return S.Zero
else:
isprime = aq.is_prime
if d == 1:
# Apply Wilson's theorem (if a natural number n > 1
# is a prime number, then (n-1)! = -1 mod n) and
# its inverse (if n > 4 is a composite number, then
# (n-1)! = 0 mod n)
if isprime:
return S(-1 % q)
elif isprime is False and (aq - 6).is_nonnegative:
return S.Zero
elif n.is_Integer and q.is_Integer:
n, d, aq = map(int, (n, d, aq))
if isprime and (d - 1 < n):
fc = self._facmod(d - 1, aq)
fc = pow(fc, aq - 2, aq)
if d%2:
fc = -fc
else:
fc = self._facmod(n, aq)
return S(fc % q)
def _eval_rewrite_as_gamma(self, n, **kwargs):
from sympy import gamma
return gamma(n + 1)
def _eval_rewrite_as_Product(self, n, **kwargs):
from sympy import Product
if n.is_nonnegative and n.is_integer:
i = Dummy('i', integer=True)
return Product(i, (i, 1, n))
def _eval_is_integer(self):
if self.args[0].is_integer and self.args[0].is_nonnegative:
return True
def _eval_is_positive(self):
if self.args[0].is_integer and self.args[0].is_nonnegative:
return True
def _eval_is_even(self):
x = self.args[0]
if x.is_integer and x.is_nonnegative:
return (x - 2).is_nonnegative
def _eval_is_composite(self):
x = self.args[0]
if x.is_integer and x.is_nonnegative:
return (x - 3).is_nonnegative
def _eval_is_real(self):
x = self.args[0]
if x.is_nonnegative or x.is_noninteger:
return True
def _eval_as_leading_term(self, x, cdir=0):
from sympy import Order
arg = self.args[0]
arg_1 = arg.as_leading_term(x)
if Order(x, x).contains(arg_1):
return S.One
if Order(1, x).contains(arg_1):
return self.func(arg_1)
####################################################
# The correct result here should be 'None'. #
# Indeed arg in not bounded as x tends to 0. #
# Consequently the series expansion does not admit #
# the leading term. #
# For compatibility reasons, the return value here #
# is the original function, i.e. factorial(arg), #
# instead of None. #
####################################################
return self.func(arg)
class MultiFactorial(CombinatorialFunction):
pass
class subfactorial(CombinatorialFunction):
r"""The subfactorial counts the derangements of n items and is
defined for non-negative integers as:
.. math:: !n = \begin{cases} 1 & n = 0 \\ 0 & n = 1 \\
(n-1)(!(n-1) + !(n-2)) & n > 1 \end{cases}
It can also be written as ``int(round(n!/exp(1)))`` but the
recursive definition with caching is implemented for this function.
An interesting analytic expression is the following [2]_
.. math:: !x = \Gamma(x + 1, -1)/e
which is valid for non-negative integers `x`. The above formula
is not very useful incase of non-integers. :math:`\Gamma(x + 1, -1)` is
single-valued only for integral arguments `x`, elsewhere on the positive
real axis it has an infinite number of branches none of which are real.
References
==========
.. [1] https://en.wikipedia.org/wiki/Subfactorial
.. [2] http://mathworld.wolfram.com/Subfactorial.html
Examples
========
>>> from sympy import subfactorial
>>> from sympy.abc import n
>>> subfactorial(n + 1)
subfactorial(n + 1)
>>> subfactorial(5)
44
See Also
========
sympy.functions.combinatorial.factorials.factorial,
sympy.utilities.iterables.generate_derangements,
sympy.functions.special.gamma_functions.uppergamma
"""
@classmethod
@cacheit
def _eval(self, n):
if not n:
return S.One
elif n == 1:
return S.Zero
else:
z1, z2 = 1, 0
for i in range(2, n + 1):
z1, z2 = z2, (i - 1)*(z2 + z1)
return z2
@classmethod
def eval(cls, arg):
if arg.is_Number:
if arg.is_Integer and arg.is_nonnegative:
return cls._eval(arg)
elif arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.Infinity
def _eval_is_even(self):
if self.args[0].is_odd and self.args[0].is_nonnegative:
return True
def _eval_is_integer(self):
if self.args[0].is_integer and self.args[0].is_nonnegative:
return True
def _eval_rewrite_as_factorial(self, arg, **kwargs):
from sympy import summation
i = Dummy('i')
f = S.NegativeOne**i / factorial(i)
return factorial(arg) * summation(f, (i, 0, arg))
def _eval_rewrite_as_gamma(self, arg, **kwargs):
from sympy import exp, gamma, I, lowergamma
return ((-1)**(arg + 1)*exp(-I*pi*arg)*lowergamma(arg + 1, -1) + gamma(arg + 1))*exp(-1)
def _eval_rewrite_as_uppergamma(self, arg, **kwargs):
from sympy import uppergamma
return uppergamma(arg + 1, -1)/S.Exp1
def _eval_is_nonnegative(self):
if self.args[0].is_integer and self.args[0].is_nonnegative:
return True
def _eval_is_odd(self):
if self.args[0].is_even and self.args[0].is_nonnegative:
return True
class factorial2(CombinatorialFunction):
r"""The double factorial `n!!`, not to be confused with `(n!)!`
The double factorial is defined for nonnegative integers and for odd
negative integers as:
.. math:: n!! = \begin{cases} 1 & n = 0 \\
n(n-2)(n-4) \cdots 1 & n\ \text{positive odd} \\
n(n-2)(n-4) \cdots 2 & n\ \text{positive even} \\
(n+2)!!/(n+2) & n\ \text{negative odd} \end{cases}
References
==========
.. [1] https://en.wikipedia.org/wiki/Double_factorial
Examples
========
>>> from sympy import factorial2, var
>>> n = var('n')
>>> n
n
>>> factorial2(n + 1)
factorial2(n + 1)
>>> factorial2(5)
15
>>> factorial2(-1)
1
>>> factorial2(-5)
1/3
See Also
========
factorial, RisingFactorial, FallingFactorial
"""
@classmethod
def eval(cls, arg):
# TODO: extend this to complex numbers?
if arg.is_Number:
if not arg.is_Integer:
raise ValueError("argument must be nonnegative integer "
"or negative odd integer")
# This implementation is faster than the recursive one
# It also avoids "maximum recursion depth exceeded" runtime error
if arg.is_nonnegative:
if arg.is_even:
k = arg / 2
return 2**k * factorial(k)
return factorial(arg) / factorial2(arg - 1)
if arg.is_odd:
return arg*(S.NegativeOne)**((1 - arg)/2) / factorial2(-arg)
raise ValueError("argument must be nonnegative integer "
"or negative odd integer")
def _eval_is_even(self):
# Double factorial is even for every positive even input
n = self.args[0]
if n.is_integer:
if n.is_odd:
return False
if n.is_even:
if n.is_positive:
return True
if n.is_zero:
return False
def _eval_is_integer(self):
# Double factorial is an integer for every nonnegative input, and for
# -1 and -3
n = self.args[0]
if n.is_integer:
if (n + 1).is_nonnegative:
return True
if n.is_odd:
return (n + 3).is_nonnegative
def _eval_is_odd(self):
# Double factorial is odd for every odd input not smaller than -3, and
# for 0
n = self.args[0]
if n.is_odd:
return (n + 3).is_nonnegative
if n.is_even:
if n.is_positive:
return False
if n.is_zero:
return True
def _eval_is_positive(self):
# Double factorial is positive for every nonnegative input, and for
# every odd negative input which is of the form -1-4k for an
# nonnegative integer k
n = self.args[0]
if n.is_integer:
if (n + 1).is_nonnegative:
return True
if n.is_odd:
return ((n + 1) / 2).is_even
def _eval_rewrite_as_gamma(self, n, **kwargs):
from sympy import gamma, Piecewise, sqrt
return 2**(n/2)*gamma(n/2 + 1) * Piecewise((1, Eq(Mod(n, 2), 0)),
(sqrt(2/pi), Eq(Mod(n, 2), 1)))
###############################################################################
######################## RISING and FALLING FACTORIALS ########################
###############################################################################
class RisingFactorial(CombinatorialFunction):
r"""
Rising factorial (also called Pochhammer symbol) is a double valued
function arising in concrete mathematics, hypergeometric functions
and series expansions. It is defined by:
.. math:: rf(x,k) = x \cdot (x+1) \cdots (x+k-1)
where `x` can be arbitrary expression and `k` is an integer. For
more information check "Concrete mathematics" by Graham, pp. 66
or visit http://mathworld.wolfram.com/RisingFactorial.html page.
When `x` is a Poly instance of degree >= 1 with a single variable,
`rf(x,k) = x(y) \cdot x(y+1) \cdots x(y+k-1)`, where `y` is the
variable of `x`. This is as described in Peter Paule, "Greatest
Factorial Factorization and Symbolic Summation", Journal of
Symbolic Computation, vol. 20, pp. 235-268, 1995.
Examples
========
>>> from sympy import rf, symbols, factorial, ff, binomial, Poly
>>> from sympy.abc import x
>>> n, k = symbols('n k', integer=True)
>>> rf(x, 0)
1
>>> rf(1, 5)
120
>>> rf(x, 5) == x*(1 + x)*(2 + x)*(3 + x)*(4 + x)
True
>>> rf(Poly(x**3, x), 2)
Poly(x**6 + 3*x**5 + 3*x**4 + x**3, x, domain='ZZ')
Rewrite
>>> rf(x, k).rewrite(ff)
FallingFactorial(k + x - 1, k)
>>> rf(x, k).rewrite(binomial)
binomial(k + x - 1, k)*factorial(k)
>>> rf(n, k).rewrite(factorial)
factorial(k + n - 1)/factorial(n - 1)
See Also
========
factorial, factorial2, FallingFactorial
References
==========
.. [1] https://en.wikipedia.org/wiki/Pochhammer_symbol
"""
@classmethod
def eval(cls, x, k):
x = sympify(x)
k = sympify(k)
if x is S.NaN or k is S.NaN:
return S.NaN
elif x is S.One:
return factorial(k)
elif k.is_Integer:
if k.is_zero:
return S.One
else:
if k.is_positive:
if x is S.Infinity:
return S.Infinity
elif x is S.NegativeInfinity:
if k.is_odd:
return S.NegativeInfinity
else:
return S.Infinity
else:
if isinstance(x, Poly):
gens = x.gens
if len(gens)!= 1:
raise ValueError("rf only defined for "
"polynomials on one generator")
else:
return reduce(lambda r, i:
r*(x.shift(i)),
range(0, int(k)), 1)
else:
return reduce(lambda r, i: r*(x + i),
range(0, int(k)), 1)
else:
if x is S.Infinity:
return S.Infinity
elif x is S.NegativeInfinity:
return S.Infinity
else:
if isinstance(x, Poly):
gens = x.gens
if len(gens)!= 1:
raise ValueError("rf only defined for "
"polynomials on one generator")
else:
return 1/reduce(lambda r, i:
r*(x.shift(-i)),
range(1, abs(int(k)) + 1), 1)
else:
return 1/reduce(lambda r, i:
r*(x - i),
range(1, abs(int(k)) + 1), 1)
if k.is_integer == False:
if x.is_integer and x.is_negative:
return S.Zero
def _eval_rewrite_as_gamma(self, x, k, **kwargs):
from sympy import gamma
return gamma(x + k) / gamma(x)
def _eval_rewrite_as_FallingFactorial(self, x, k, **kwargs):
return FallingFactorial(x + k - 1, k)
def _eval_rewrite_as_factorial(self, x, k, **kwargs):
if x.is_integer and k.is_integer:
return factorial(k + x - 1) / factorial(x - 1)
def _eval_rewrite_as_binomial(self, x, k, **kwargs):
if k.is_integer:
return factorial(k) * binomial(x + k - 1, k)
def _eval_is_integer(self):
return fuzzy_and((self.args[0].is_integer, self.args[1].is_integer,
self.args[1].is_nonnegative))
def _sage_(self):
import sage.all as sage
return sage.rising_factorial(self.args[0]._sage_(),
self.args[1]._sage_())
class FallingFactorial(CombinatorialFunction):
r"""
Falling factorial (related to rising factorial) is a double valued
function arising in concrete mathematics, hypergeometric functions
and series expansions. It is defined by
.. math:: ff(x,k) = x \cdot (x-1) \cdots (x-k+1)
where `x` can be arbitrary expression and `k` is an integer. For
more information check "Concrete mathematics" by Graham, pp. 66
or visit http://mathworld.wolfram.com/FallingFactorial.html page.
When `x` is a Poly instance of degree >= 1 with single variable,
`ff(x,k) = x(y) \cdot x(y-1) \cdots x(y-k+1)`, where `y` is the
variable of `x`. This is as described in Peter Paule, "Greatest
Factorial Factorization and Symbolic Summation", Journal of
Symbolic Computation, vol. 20, pp. 235-268, 1995.
>>> from sympy import ff, factorial, rf, gamma, binomial, symbols, Poly
>>> from sympy.abc import x, k
>>> n, m = symbols('n m', integer=True)
>>> ff(x, 0)
1
>>> ff(5, 5)
120
>>> ff(x, 5) == x*(x-1)*(x-2)*(x-3)*(x-4)
True
>>> ff(Poly(x**2, x), 2)
Poly(x**4 - 2*x**3 + x**2, x, domain='ZZ')
>>> ff(n, n)
factorial(n)
Rewrite
>>> ff(x, k).rewrite(gamma)
(-1)**k*gamma(k - x)/gamma(-x)
>>> ff(x, k).rewrite(rf)
RisingFactorial(-k + x + 1, k)
>>> ff(x, m).rewrite(binomial)
binomial(x, m)*factorial(m)
>>> ff(n, m).rewrite(factorial)
factorial(n)/factorial(-m + n)
See Also
========
factorial, factorial2, RisingFactorial
References
==========
.. [1] http://mathworld.wolfram.com/FallingFactorial.html
"""
@classmethod
def eval(cls, x, k):
x = sympify(x)
k = sympify(k)
if x is S.NaN or k is S.NaN:
return S.NaN
elif k.is_integer and x == k:
return factorial(x)
elif k.is_Integer:
if k.is_zero:
return S.One
else:
if k.is_positive:
if x is S.Infinity:
return S.Infinity
elif x is S.NegativeInfinity:
if k.is_odd:
return S.NegativeInfinity
else:
return S.Infinity
else:
if isinstance(x, Poly):
gens = x.gens
if len(gens)!= 1:
raise ValueError("ff only defined for "
"polynomials on one generator")
else:
return reduce(lambda r, i:
r*(x.shift(-i)),
range(0, int(k)), 1)
else:
return reduce(lambda r, i: r*(x - i),
range(0, int(k)), 1)
else:
if x is S.Infinity:
return S.Infinity
elif x is S.NegativeInfinity:
return S.Infinity
else:
if isinstance(x, Poly):
gens = x.gens
if len(gens)!= 1:
raise ValueError("rf only defined for "
"polynomials on one generator")
else:
return 1/reduce(lambda r, i:
r*(x.shift(i)),
range(1, abs(int(k)) + 1), 1)
else:
return 1/reduce(lambda r, i: r*(x + i),
range(1, abs(int(k)) + 1), 1)
def _eval_rewrite_as_gamma(self, x, k, **kwargs):
from sympy import gamma
return (-1)**k*gamma(k - x) / gamma(-x)
def _eval_rewrite_as_RisingFactorial(self, x, k, **kwargs):
return rf(x - k + 1, k)
def _eval_rewrite_as_binomial(self, x, k, **kwargs):
if k.is_integer:
return factorial(k) * binomial(x, k)
def _eval_rewrite_as_factorial(self, x, k, **kwargs):
if x.is_integer and k.is_integer:
return factorial(x) / factorial(x - k)
def _eval_is_integer(self):
return fuzzy_and((self.args[0].is_integer, self.args[1].is_integer,
self.args[1].is_nonnegative))
def _sage_(self):
import sage.all as sage
return sage.falling_factorial(self.args[0]._sage_(),
self.args[1]._sage_())
rf = RisingFactorial
ff = FallingFactorial
###############################################################################
########################### BINOMIAL COEFFICIENTS #############################
###############################################################################
class binomial(CombinatorialFunction):
r"""Implementation of the binomial coefficient. It can be defined
in two ways depending on its desired interpretation:
.. math:: \binom{n}{k} = \frac{n!}{k!(n-k)!}\ \text{or}\
\binom{n}{k} = \frac{ff(n, k)}{k!}
First, in a strict combinatorial sense it defines the
number of ways we can choose `k` elements from a set of
`n` elements. In this case both arguments are nonnegative
integers and binomial is computed using an efficient
algorithm based on prime factorization.
The other definition is generalization for arbitrary `n`,
however `k` must also be nonnegative. This case is very
useful when evaluating summations.
For the sake of convenience for negative integer `k` this function
will return zero no matter what valued is the other argument.
To expand the binomial when `n` is a symbol, use either
``expand_func()`` or ``expand(func=True)``. The former will keep
the polynomial in factored form while the latter will expand the
polynomial itself. See examples for details.
Examples
========
>>> from sympy import Symbol, Rational, binomial, expand_func
>>> n = Symbol('n', integer=True, positive=True)
>>> binomial(15, 8)
6435
>>> binomial(n, -1)
0
Rows of Pascal's triangle can be generated with the binomial function:
>>> for N in range(8):
... print([binomial(N, i) for i in range(N + 1)])
...
[1]
[1, 1]
[1, 2, 1]
[1, 3, 3, 1]
[1, 4, 6, 4, 1]
[1, 5, 10, 10, 5, 1]
[1, 6, 15, 20, 15, 6, 1]
[1, 7, 21, 35, 35, 21, 7, 1]
As can a given diagonal, e.g. the 4th diagonal:
>>> N = -4
>>> [binomial(N, i) for i in range(1 - N)]
[1, -4, 10, -20, 35]
>>> binomial(Rational(5, 4), 3)
-5/128
>>> binomial(Rational(-5, 4), 3)
-195/128
>>> binomial(n, 3)
binomial(n, 3)
>>> binomial(n, 3).expand(func=True)
n**3/6 - n**2/2 + n/3
>>> expand_func(binomial(n, 3))
n*(n - 2)*(n - 1)/6
References
==========
.. [1] https://www.johndcook.com/blog/binomial_coefficients/
"""
def fdiff(self, argindex=1):
from sympy import polygamma
if argindex == 1:
# http://functions.wolfram.com/GammaBetaErf/Binomial/20/01/01/
n, k = self.args
return binomial(n, k)*(polygamma(0, n + 1) - \
polygamma(0, n - k + 1))
elif argindex == 2:
# http://functions.wolfram.com/GammaBetaErf/Binomial/20/01/02/
n, k = self.args
return binomial(n, k)*(polygamma(0, n - k + 1) - \
polygamma(0, k + 1))
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def _eval(self, n, k):
# n.is_Number and k.is_Integer and k != 1 and n != k
if k.is_Integer:
if n.is_Integer and n >= 0:
n, k = int(n), int(k)
if k > n:
return S.Zero
elif k > n // 2:
k = n - k
if HAS_GMPY:
from sympy.core.compatibility import gmpy
return Integer(gmpy.bincoef(n, k))
d, result = n - k, 1
for i in range(1, k + 1):
d += 1
result = result * d // i
return Integer(result)
else:
d, result = n - k, 1
for i in range(1, k + 1):
d += 1
result *= d
result /= i
return result
@classmethod
def eval(cls, n, k):
n, k = map(sympify, (n, k))
d = n - k
n_nonneg, n_isint = n.is_nonnegative, n.is_integer
if k.is_zero or ((n_nonneg or n_isint is False)
and d.is_zero):
return S.One
if (k - 1).is_zero or ((n_nonneg or n_isint is False)
and (d - 1).is_zero):
return n
if k.is_integer:
if k.is_negative or (n_nonneg and n_isint and d.is_negative):
return S.Zero
elif n.is_number:
res = cls._eval(n, k)
return res.expand(basic=True) if res else res
elif n_nonneg is False and n_isint:
# a special case when binomial evaluates to complex infinity
return S.ComplexInfinity
elif k.is_number:
from sympy import gamma
return gamma(n + 1)/(gamma(k + 1)*gamma(n - k + 1))
def _eval_Mod(self, q):
n, k = self.args
if any(x.is_integer is False for x in (n, k, q)):
raise ValueError("Integers expected for binomial Mod")
if all(x.is_Integer for x in (n, k, q)):
n, k = map(int, (n, k))
aq, res = abs(q), 1
# handle negative integers k or n
if k < 0:
return S.Zero
if n < 0:
n = -n + k - 1
res = -1 if k%2 else 1
# non negative integers k and n
if k > n:
return S.Zero
isprime = aq.is_prime
aq = int(aq)
if isprime:
if aq < n:
# use Lucas Theorem
N, K = n, k
while N or K:
res = res*binomial(N % aq, K % aq) % aq
N, K = N // aq, K // aq
else:
# use Factorial Modulo
d = n - k
if k > d:
k, d = d, k
kf = 1
for i in range(2, k + 1):
kf = kf*i % aq
df = kf
for i in range(k + 1, d + 1):
df = df*i % aq
res *= df
for i in range(d + 1, n + 1):
res = res*i % aq
res *= pow(kf*df % aq, aq - 2, aq)
res %= aq
else:
# Binomial Factorization is performed by calculating the
# exponents of primes <= n in `n! /(k! (n - k)!)`,
# for non-negative integers n and k. As the exponent of
# prime in n! is e_p(n) = [n/p] + [n/p**2] + ...
# the exponent of prime in binomial(n, k) would be
# e_p(n) - e_p(k) - e_p(n - k)
M = int(_sqrt(n))
for prime in sieve.primerange(2, n + 1):
if prime > n - k:
res = res*prime % aq
elif prime > n // 2:
continue
elif prime > M:
if n % prime < k % prime:
res = res*prime % aq
else:
N, K = n, k
exp = a = 0
while N > 0:
a = int((N % prime) < (K % prime + a))
N, K = N // prime, K // prime
exp += a
if exp > 0:
res *= pow(prime, exp, aq)
res %= aq
return S(res % q)
def _eval_expand_func(self, **hints):
"""
Function to expand binomial(n, k) when m is positive integer
Also,
n is self.args[0] and k is self.args[1] while using binomial(n, k)
"""
n = self.args[0]
if n.is_Number:
return binomial(*self.args)
k = self.args[1]
if (n-k).is_Integer:
k = n - k
if k.is_Integer:
if k.is_zero:
return S.One
elif k.is_negative:
return S.Zero
else:
n, result = self.args[0], 1
for i in range(1, k + 1):
result *= n - k + i
result /= i
return result
else:
return binomial(*self.args)
def _eval_rewrite_as_factorial(self, n, k, **kwargs):
return factorial(n)/(factorial(k)*factorial(n - k))
def _eval_rewrite_as_gamma(self, n, k, **kwargs):
from sympy import gamma
return gamma(n + 1)/(gamma(k + 1)*gamma(n - k + 1))
def _eval_rewrite_as_tractable(self, n, k, **kwargs):
return self._eval_rewrite_as_gamma(n, k).rewrite('tractable')
def _eval_rewrite_as_FallingFactorial(self, n, k, **kwargs):
if k.is_integer:
return ff(n, k) / factorial(k)
def _eval_is_integer(self):
n, k = self.args
if n.is_integer and k.is_integer:
return True
elif k.is_integer is False:
return False
def _eval_is_nonnegative(self):
n, k = self.args
if n.is_integer and k.is_integer:
if n.is_nonnegative or k.is_negative or k.is_even:
return True
elif k.is_even is False:
return False
|
80b10ea53550b8fb770e31cbfb33ede0e2deebf5aed83ce41845f216b39f8983
|
from sympy.core.add import Add
from sympy.core.basic import sympify, cacheit
from sympy.core.function import Function, ArgumentIndexError, expand_mul
from sympy.core.logic import fuzzy_not, fuzzy_or, FuzzyBool
from sympy.core.numbers import igcdex, Rational, pi
from sympy.core.relational import Ne
from sympy.core.singleton import S
from sympy.core.symbol import Symbol
from sympy.functions.combinatorial.factorials import factorial, RisingFactorial
from sympy.functions.elementary.exponential import log, exp
from sympy.functions.elementary.integers import floor
from sympy.functions.elementary.hyperbolic import (acoth, asinh, atanh, cosh,
coth, HyperbolicFunction, sinh, tanh)
from sympy.functions.elementary.miscellaneous import sqrt, Min, Max
from sympy.functions.elementary.piecewise import Piecewise
from sympy.sets.sets import FiniteSet
from sympy.utilities.iterables import numbered_symbols
###############################################################################
########################## TRIGONOMETRIC FUNCTIONS ############################
###############################################################################
class TrigonometricFunction(Function):
"""Base class for trigonometric functions. """
unbranched = True
_singularities = (S.ComplexInfinity,)
def _eval_is_rational(self):
s = self.func(*self.args)
if s.func == self.func:
if s.args[0].is_rational and fuzzy_not(s.args[0].is_zero):
return False
else:
return s.is_rational
def _eval_is_algebraic(self):
s = self.func(*self.args)
if s.func == self.func:
if fuzzy_not(self.args[0].is_zero) and self.args[0].is_algebraic:
return False
pi_coeff = _pi_coeff(self.args[0])
if pi_coeff is not None and pi_coeff.is_rational:
return True
else:
return s.is_algebraic
def _eval_expand_complex(self, deep=True, **hints):
re_part, im_part = self.as_real_imag(deep=deep, **hints)
return re_part + im_part*S.ImaginaryUnit
def _as_real_imag(self, deep=True, **hints):
if self.args[0].is_extended_real:
if deep:
hints['complex'] = False
return (self.args[0].expand(deep, **hints), S.Zero)
else:
return (self.args[0], S.Zero)
if deep:
re, im = self.args[0].expand(deep, **hints).as_real_imag()
else:
re, im = self.args[0].as_real_imag()
return (re, im)
def _period(self, general_period, symbol=None):
f = expand_mul(self.args[0])
if symbol is None:
symbol = tuple(f.free_symbols)[0]
if not f.has(symbol):
return S.Zero
if f == symbol:
return general_period
if symbol in f.free_symbols:
if f.is_Mul:
g, h = f.as_independent(symbol)
if h == symbol:
return general_period/abs(g)
if f.is_Add:
a, h = f.as_independent(symbol)
g, h = h.as_independent(symbol, as_Add=False)
if h == symbol:
return general_period/abs(g)
raise NotImplementedError("Use the periodicity function instead.")
def _peeloff_pi(arg):
"""
Split ARG into two parts, a "rest" and a multiple of pi/2.
This assumes ARG to be an Add.
The multiple of pi returned in the second position is always a Rational.
Examples
========
>>> from sympy.functions.elementary.trigonometric import _peeloff_pi as peel
>>> from sympy import pi
>>> from sympy.abc import x, y
>>> peel(x + pi/2)
(x, pi/2)
>>> peel(x + 2*pi/3 + pi*y)
(x + pi*y + pi/6, pi/2)
"""
for a in Add.make_args(arg):
if a is S.Pi:
K = S.One
break
elif a.is_Mul:
K, p = a.as_two_terms()
if p is S.Pi and K.is_Rational:
break
else:
return arg, S.Zero
m1 = (K % S.Half)*S.Pi
m2 = K*S.Pi - m1
return arg - m2, m2
def _pi_coeff(arg, cycles=1):
"""
When arg is a Number times pi (e.g. 3*pi/2) then return the Number
normalized to be in the range [0, 2], else None.
When an even multiple of pi is encountered, if it is multiplying
something with known parity then the multiple is returned as 0 otherwise
as 2.
Examples
========
>>> from sympy.functions.elementary.trigonometric import _pi_coeff as coeff
>>> from sympy import pi, Dummy
>>> from sympy.abc import x
>>> coeff(3*x*pi)
3*x
>>> coeff(11*pi/7)
11/7
>>> coeff(-11*pi/7)
3/7
>>> coeff(4*pi)
0
>>> coeff(5*pi)
1
>>> coeff(5.0*pi)
1
>>> coeff(5.5*pi)
3/2
>>> coeff(2 + pi)
>>> coeff(2*Dummy(integer=True)*pi)
2
>>> coeff(2*Dummy(even=True)*pi)
0
"""
arg = sympify(arg)
if arg is S.Pi:
return S.One
elif not arg:
return S.Zero
elif arg.is_Mul:
cx = arg.coeff(S.Pi)
if cx:
c, x = cx.as_coeff_Mul() # pi is not included as coeff
if c.is_Float:
# recast exact binary fractions to Rationals
f = abs(c) % 1
if f != 0:
p = -int(round(log(f, 2).evalf()))
m = 2**p
cm = c*m
i = int(cm)
if i == cm:
c = Rational(i, m)
cx = c*x
else:
c = Rational(int(c))
cx = c*x
if x.is_integer:
c2 = c % 2
if c2 == 1:
return x
elif not c2:
if x.is_even is not None: # known parity
return S.Zero
return S(2)
else:
return c2*x
return cx
elif arg.is_zero:
return S.Zero
class sin(TrigonometricFunction):
"""
The sine function.
Returns the sine of x (measured in radians).
Notes
=====
This function will evaluate automatically in the
case x/pi is some rational number [4]_. For example,
if x is a multiple of pi, pi/2, pi/3, pi/4 and pi/6.
Examples
========
>>> from sympy import sin, pi
>>> from sympy.abc import x
>>> sin(x**2).diff(x)
2*x*cos(x**2)
>>> sin(1).diff(x)
0
>>> sin(pi)
0
>>> sin(pi/2)
1
>>> sin(pi/6)
1/2
>>> sin(pi/12)
-sqrt(2)/4 + sqrt(6)/4
See Also
========
csc, cos, sec, tan, cot
asin, acsc, acos, asec, atan, acot, atan2
References
==========
.. [1] https://en.wikipedia.org/wiki/Trigonometric_functions
.. [2] http://dlmf.nist.gov/4.14
.. [3] http://functions.wolfram.com/ElementaryFunctions/Sin
.. [4] http://mathworld.wolfram.com/TrigonometryAngles.html
"""
def period(self, symbol=None):
return self._period(2*pi, symbol)
def fdiff(self, argindex=1):
if argindex == 1:
return cos(self.args[0])
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, arg):
from sympy.calculus import AccumBounds
from sympy.sets.setexpr import SetExpr
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg.is_zero:
return S.Zero
elif arg is S.Infinity or arg is S.NegativeInfinity:
return AccumBounds(-1, 1)
if arg is S.ComplexInfinity:
return S.NaN
if isinstance(arg, AccumBounds):
min, max = arg.min, arg.max
d = floor(min/(2*S.Pi))
if min is not S.NegativeInfinity:
min = min - d*2*S.Pi
if max is not S.Infinity:
max = max - d*2*S.Pi
if AccumBounds(min, max).intersection(FiniteSet(S.Pi/2, S.Pi*Rational(5, 2))) \
is not S.EmptySet and \
AccumBounds(min, max).intersection(FiniteSet(S.Pi*Rational(3, 2),
S.Pi*Rational(7, 2))) is not S.EmptySet:
return AccumBounds(-1, 1)
elif AccumBounds(min, max).intersection(FiniteSet(S.Pi/2, S.Pi*Rational(5, 2))) \
is not S.EmptySet:
return AccumBounds(Min(sin(min), sin(max)), 1)
elif AccumBounds(min, max).intersection(FiniteSet(S.Pi*Rational(3, 2), S.Pi*Rational(8, 2))) \
is not S.EmptySet:
return AccumBounds(-1, Max(sin(min), sin(max)))
else:
return AccumBounds(Min(sin(min), sin(max)),
Max(sin(min), sin(max)))
elif isinstance(arg, SetExpr):
return arg._eval_func(cls)
if arg.could_extract_minus_sign():
return -cls(-arg)
i_coeff = arg.as_coefficient(S.ImaginaryUnit)
if i_coeff is not None:
return S.ImaginaryUnit*sinh(i_coeff)
pi_coeff = _pi_coeff(arg)
if pi_coeff is not None:
if pi_coeff.is_integer:
return S.Zero
if (2*pi_coeff).is_integer:
# is_even-case handled above as then pi_coeff.is_integer,
# so check if known to be not even
if pi_coeff.is_even is False:
return S.NegativeOne**(pi_coeff - S.Half)
if not pi_coeff.is_Rational:
narg = pi_coeff*S.Pi
if narg != arg:
return cls(narg)
return None
# https://github.com/sympy/sympy/issues/6048
# transform a sine to a cosine, to avoid redundant code
if pi_coeff.is_Rational:
x = pi_coeff % 2
if x > 1:
return -cls((x % 1)*S.Pi)
if 2*x > 1:
return cls((1 - x)*S.Pi)
narg = ((pi_coeff + Rational(3, 2)) % 2)*S.Pi
result = cos(narg)
if not isinstance(result, cos):
return result
if pi_coeff*S.Pi != arg:
return cls(pi_coeff*S.Pi)
return None
if arg.is_Add:
x, m = _peeloff_pi(arg)
if m:
return sin(m)*cos(x) + cos(m)*sin(x)
if arg.is_zero:
return S.Zero
if isinstance(arg, asin):
return arg.args[0]
if isinstance(arg, atan):
x = arg.args[0]
return x/sqrt(1 + x**2)
if isinstance(arg, atan2):
y, x = arg.args
return y/sqrt(x**2 + y**2)
if isinstance(arg, acos):
x = arg.args[0]
return sqrt(1 - x**2)
if isinstance(arg, acot):
x = arg.args[0]
return 1/(sqrt(1 + 1/x**2)*x)
if isinstance(arg, acsc):
x = arg.args[0]
return 1/x
if isinstance(arg, asec):
x = arg.args[0]
return sqrt(1 - 1/x**2)
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
if len(previous_terms) > 2:
p = previous_terms[-2]
return -p*x**2/(n*(n - 1))
else:
return (-1)**(n//2)*x**(n)/factorial(n)
def _eval_rewrite_as_exp(self, arg, **kwargs):
I = S.ImaginaryUnit
if isinstance(arg, TrigonometricFunction) or isinstance(arg, HyperbolicFunction):
arg = arg.func(arg.args[0]).rewrite(exp)
return (exp(arg*I) - exp(-arg*I))/(2*I)
def _eval_rewrite_as_Pow(self, arg, **kwargs):
if isinstance(arg, log):
I = S.ImaginaryUnit
x = arg.args[0]
return I*x**-I/2 - I*x**I /2
def _eval_rewrite_as_cos(self, arg, **kwargs):
return cos(arg - S.Pi/2, evaluate=False)
def _eval_rewrite_as_tan(self, arg, **kwargs):
tan_half = tan(S.Half*arg)
return 2*tan_half/(1 + tan_half**2)
def _eval_rewrite_as_sincos(self, arg, **kwargs):
return sin(arg)*cos(arg)/cos(arg)
def _eval_rewrite_as_cot(self, arg, **kwargs):
cot_half = cot(S.Half*arg)
return 2*cot_half/(1 + cot_half**2)
def _eval_rewrite_as_pow(self, arg, **kwargs):
return self.rewrite(cos).rewrite(pow)
def _eval_rewrite_as_sqrt(self, arg, **kwargs):
return self.rewrite(cos).rewrite(sqrt)
def _eval_rewrite_as_csc(self, arg, **kwargs):
return 1/csc(arg)
def _eval_rewrite_as_sec(self, arg, **kwargs):
return 1/sec(arg - S.Pi/2, evaluate=False)
def _eval_rewrite_as_sinc(self, arg, **kwargs):
return arg*sinc(arg)
def _eval_conjugate(self):
return self.func(self.args[0].conjugate())
def as_real_imag(self, deep=True, **hints):
re, im = self._as_real_imag(deep=deep, **hints)
return (sin(re)*cosh(im), cos(re)*sinh(im))
def _eval_expand_trig(self, **hints):
from sympy import expand_mul
from sympy.functions.special.polynomials import chebyshevt, chebyshevu
arg = self.args[0]
x = None
if arg.is_Add: # TODO, implement more if deep stuff here
# TODO: Do this more efficiently for more than two terms
x, y = arg.as_two_terms()
sx = sin(x, evaluate=False)._eval_expand_trig()
sy = sin(y, evaluate=False)._eval_expand_trig()
cx = cos(x, evaluate=False)._eval_expand_trig()
cy = cos(y, evaluate=False)._eval_expand_trig()
return sx*cy + sy*cx
else:
n, x = arg.as_coeff_Mul(rational=True)
if n.is_Integer: # n will be positive because of .eval
# canonicalization
# See http://mathworld.wolfram.com/Multiple-AngleFormulas.html
if n.is_odd:
return (-1)**((n - 1)/2)*chebyshevt(n, sin(x))
else:
return expand_mul((-1)**(n/2 - 1)*cos(x)*chebyshevu(n -
1, sin(x)), deep=False)
pi_coeff = _pi_coeff(arg)
if pi_coeff is not None:
if pi_coeff.is_Rational:
return self.rewrite(sqrt)
return sin(arg)
def _eval_as_leading_term(self, x, cdir=0):
from sympy import Order
arg = self.args[0].as_leading_term(x)
if x in arg.free_symbols and Order(1, x).contains(arg):
return arg
else:
if not arg.subs(x, 0).is_finite:
return self
else:
return self.func(arg)
def _eval_is_extended_real(self):
if self.args[0].is_extended_real:
return True
def _eval_is_finite(self):
arg = self.args[0]
if arg.is_extended_real:
return True
def _eval_is_zero(self):
arg = self.args[0]
if arg.is_zero:
return True
def _eval_is_complex(self):
if self.args[0].is_extended_real \
or self.args[0].is_complex:
return True
class cos(TrigonometricFunction):
"""
The cosine function.
Returns the cosine of x (measured in radians).
Notes
=====
See :func:`sin` for notes about automatic evaluation.
Examples
========
>>> from sympy import cos, pi
>>> from sympy.abc import x
>>> cos(x**2).diff(x)
-2*x*sin(x**2)
>>> cos(1).diff(x)
0
>>> cos(pi)
-1
>>> cos(pi/2)
0
>>> cos(2*pi/3)
-1/2
>>> cos(pi/12)
sqrt(2)/4 + sqrt(6)/4
See Also
========
sin, csc, sec, tan, cot
asin, acsc, acos, asec, atan, acot, atan2
References
==========
.. [1] https://en.wikipedia.org/wiki/Trigonometric_functions
.. [2] http://dlmf.nist.gov/4.14
.. [3] http://functions.wolfram.com/ElementaryFunctions/Cos
"""
def period(self, symbol=None):
return self._period(2*pi, symbol)
def fdiff(self, argindex=1):
if argindex == 1:
return -sin(self.args[0])
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, arg):
from sympy.functions.special.polynomials import chebyshevt
from sympy.calculus.util import AccumBounds
from sympy.sets.setexpr import SetExpr
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg.is_zero:
return S.One
elif arg is S.Infinity or arg is S.NegativeInfinity:
# In this case it is better to return AccumBounds(-1, 1)
# rather than returning S.NaN, since AccumBounds(-1, 1)
# preserves the information that sin(oo) is between
# -1 and 1, where S.NaN does not do that.
return AccumBounds(-1, 1)
if arg is S.ComplexInfinity:
return S.NaN
if isinstance(arg, AccumBounds):
return sin(arg + S.Pi/2)
elif isinstance(arg, SetExpr):
return arg._eval_func(cls)
if arg.could_extract_minus_sign():
return cls(-arg)
i_coeff = arg.as_coefficient(S.ImaginaryUnit)
if i_coeff is not None:
return cosh(i_coeff)
pi_coeff = _pi_coeff(arg)
if pi_coeff is not None:
if pi_coeff.is_integer:
return (S.NegativeOne)**pi_coeff
if (2*pi_coeff).is_integer:
# is_even-case handled above as then pi_coeff.is_integer,
# so check if known to be not even
if pi_coeff.is_even is False:
return S.Zero
if not pi_coeff.is_Rational:
narg = pi_coeff*S.Pi
if narg != arg:
return cls(narg)
return None
# cosine formula #####################
# https://github.com/sympy/sympy/issues/6048
# explicit calculations are performed for
# cos(k pi/n) for n = 8,10,12,15,20,24,30,40,60,120
# Some other exact values like cos(k pi/240) can be
# calculated using a partial-fraction decomposition
# by calling cos( X ).rewrite(sqrt)
cst_table_some = {
3: S.Half,
5: (sqrt(5) + 1)/4,
}
if pi_coeff.is_Rational:
q = pi_coeff.q
p = pi_coeff.p % (2*q)
if p > q:
narg = (pi_coeff - 1)*S.Pi
return -cls(narg)
if 2*p > q:
narg = (1 - pi_coeff)*S.Pi
return -cls(narg)
# If nested sqrt's are worse than un-evaluation
# you can require q to be in (1, 2, 3, 4, 6, 12)
# q <= 12, q=15, q=20, q=24, q=30, q=40, q=60, q=120 return
# expressions with 2 or fewer sqrt nestings.
table2 = {
12: (3, 4),
20: (4, 5),
30: (5, 6),
15: (6, 10),
24: (6, 8),
40: (8, 10),
60: (20, 30),
120: (40, 60)
}
if q in table2:
a, b = p*S.Pi/table2[q][0], p*S.Pi/table2[q][1]
nvala, nvalb = cls(a), cls(b)
if None == nvala or None == nvalb:
return None
return nvala*nvalb + cls(S.Pi/2 - a)*cls(S.Pi/2 - b)
if q > 12:
return None
if q in cst_table_some:
cts = cst_table_some[pi_coeff.q]
return chebyshevt(pi_coeff.p, cts).expand()
if 0 == q % 2:
narg = (pi_coeff*2)*S.Pi
nval = cls(narg)
if None == nval:
return None
x = (2*pi_coeff + 1)/2
sign_cos = (-1)**((-1 if x < 0 else 1)*int(abs(x)))
return sign_cos*sqrt( (1 + nval)/2 )
return None
if arg.is_Add:
x, m = _peeloff_pi(arg)
if m:
return cos(m)*cos(x) - sin(m)*sin(x)
if arg.is_zero:
return S.One
if isinstance(arg, acos):
return arg.args[0]
if isinstance(arg, atan):
x = arg.args[0]
return 1/sqrt(1 + x**2)
if isinstance(arg, atan2):
y, x = arg.args
return x/sqrt(x**2 + y**2)
if isinstance(arg, asin):
x = arg.args[0]
return sqrt(1 - x ** 2)
if isinstance(arg, acot):
x = arg.args[0]
return 1/sqrt(1 + 1/x**2)
if isinstance(arg, acsc):
x = arg.args[0]
return sqrt(1 - 1/x**2)
if isinstance(arg, asec):
x = arg.args[0]
return 1/x
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n < 0 or n % 2 == 1:
return S.Zero
else:
x = sympify(x)
if len(previous_terms) > 2:
p = previous_terms[-2]
return -p*x**2/(n*(n - 1))
else:
return (-1)**(n//2)*x**(n)/factorial(n)
def _eval_rewrite_as_exp(self, arg, **kwargs):
I = S.ImaginaryUnit
if isinstance(arg, TrigonometricFunction) or isinstance(arg, HyperbolicFunction):
arg = arg.func(arg.args[0]).rewrite(exp)
return (exp(arg*I) + exp(-arg*I))/2
def _eval_rewrite_as_Pow(self, arg, **kwargs):
if isinstance(arg, log):
I = S.ImaginaryUnit
x = arg.args[0]
return x**I/2 + x**-I/2
def _eval_rewrite_as_sin(self, arg, **kwargs):
return sin(arg + S.Pi/2, evaluate=False)
def _eval_rewrite_as_tan(self, arg, **kwargs):
tan_half = tan(S.Half*arg)**2
return (1 - tan_half)/(1 + tan_half)
def _eval_rewrite_as_sincos(self, arg, **kwargs):
return sin(arg)*cos(arg)/sin(arg)
def _eval_rewrite_as_cot(self, arg, **kwargs):
cot_half = cot(S.Half*arg)**2
return (cot_half - 1)/(cot_half + 1)
def _eval_rewrite_as_pow(self, arg, **kwargs):
return self._eval_rewrite_as_sqrt(arg)
def _eval_rewrite_as_sqrt(self, arg, **kwargs):
from sympy.functions.special.polynomials import chebyshevt
def migcdex(x):
# recursive calcuation of gcd and linear combination
# for a sequence of integers.
# Given (x1, x2, x3)
# Returns (y1, y1, y3, g)
# such that g is the gcd and x1*y1+x2*y2+x3*y3 - g = 0
# Note, that this is only one such linear combination.
if len(x) == 1:
return (1, x[0])
if len(x) == 2:
return igcdex(x[0], x[-1])
g = migcdex(x[1:])
u, v, h = igcdex(x[0], g[-1])
return tuple([u] + [v*i for i in g[0:-1] ] + [h])
def ipartfrac(r, factors=None):
from sympy.ntheory import factorint
if isinstance(r, int):
return r
if not isinstance(r, Rational):
raise TypeError("r is not rational")
n = r.q
if 2 > r.q*r.q:
return r.q
if None == factors:
a = [n//x**y for x, y in factorint(r.q).items()]
else:
a = [n//x for x in factors]
if len(a) == 1:
return [ r ]
h = migcdex(a)
ans = [ r.p*Rational(i*j, r.q) for i, j in zip(h[:-1], a) ]
assert r == sum(ans)
return ans
pi_coeff = _pi_coeff(arg)
if pi_coeff is None:
return None
if pi_coeff.is_integer:
# it was unevaluated
return self.func(pi_coeff*S.Pi)
if not pi_coeff.is_Rational:
return None
def _cospi257():
""" Express cos(pi/257) explicitly as a function of radicals
Based upon the equations in
http://math.stackexchange.com/questions/516142/how-does-cos2-pi-257-look-like-in-real-radicals
See also http://www.susqu.edu/brakke/constructions/257-gon.m.txt
"""
def f1(a, b):
return (a + sqrt(a**2 + b))/2, (a - sqrt(a**2 + b))/2
def f2(a, b):
return (a - sqrt(a**2 + b))/2
t1, t2 = f1(-1, 256)
z1, z3 = f1(t1, 64)
z2, z4 = f1(t2, 64)
y1, y5 = f1(z1, 4*(5 + t1 + 2*z1))
y6, y2 = f1(z2, 4*(5 + t2 + 2*z2))
y3, y7 = f1(z3, 4*(5 + t1 + 2*z3))
y8, y4 = f1(z4, 4*(5 + t2 + 2*z4))
x1, x9 = f1(y1, -4*(t1 + y1 + y3 + 2*y6))
x2, x10 = f1(y2, -4*(t2 + y2 + y4 + 2*y7))
x3, x11 = f1(y3, -4*(t1 + y3 + y5 + 2*y8))
x4, x12 = f1(y4, -4*(t2 + y4 + y6 + 2*y1))
x5, x13 = f1(y5, -4*(t1 + y5 + y7 + 2*y2))
x6, x14 = f1(y6, -4*(t2 + y6 + y8 + 2*y3))
x15, x7 = f1(y7, -4*(t1 + y7 + y1 + 2*y4))
x8, x16 = f1(y8, -4*(t2 + y8 + y2 + 2*y5))
v1 = f2(x1, -4*(x1 + x2 + x3 + x6))
v2 = f2(x2, -4*(x2 + x3 + x4 + x7))
v3 = f2(x8, -4*(x8 + x9 + x10 + x13))
v4 = f2(x9, -4*(x9 + x10 + x11 + x14))
v5 = f2(x10, -4*(x10 + x11 + x12 + x15))
v6 = f2(x16, -4*(x16 + x1 + x2 + x5))
u1 = -f2(-v1, -4*(v2 + v3))
u2 = -f2(-v4, -4*(v5 + v6))
w1 = -2*f2(-u1, -4*u2)
return sqrt(sqrt(2)*sqrt(w1 + 4)/8 + S.Half)
cst_table_some = {
3: S.Half,
5: (sqrt(5) + 1)/4,
17: sqrt((15 + sqrt(17))/32 + sqrt(2)*(sqrt(17 - sqrt(17)) +
sqrt(sqrt(2)*(-8*sqrt(17 + sqrt(17)) - (1 - sqrt(17))
*sqrt(17 - sqrt(17))) + 6*sqrt(17) + 34))/32),
257: _cospi257()
# 65537 is the only other known Fermat prime and the very
# large expression is intentionally omitted from SymPy; see
# http://www.susqu.edu/brakke/constructions/65537-gon.m.txt
}
def _fermatCoords(n):
# if n can be factored in terms of Fermat primes with
# multiplicity of each being 1, return those primes, else
# False
primes = []
for p_i in cst_table_some:
quotient, remainder = divmod(n, p_i)
if remainder == 0:
n = quotient
primes.append(p_i)
if n == 1:
return tuple(primes)
return False
if pi_coeff.q in cst_table_some:
rv = chebyshevt(pi_coeff.p, cst_table_some[pi_coeff.q])
if pi_coeff.q < 257:
rv = rv.expand()
return rv
if not pi_coeff.q % 2: # recursively remove factors of 2
pico2 = pi_coeff*2
nval = cos(pico2*S.Pi).rewrite(sqrt)
x = (pico2 + 1)/2
sign_cos = -1 if int(x) % 2 else 1
return sign_cos*sqrt( (1 + nval)/2 )
FC = _fermatCoords(pi_coeff.q)
if FC:
decomp = ipartfrac(pi_coeff, FC)
X = [(x[1], x[0]*S.Pi) for x in zip(decomp, numbered_symbols('z'))]
pcls = cos(sum([x[0] for x in X]))._eval_expand_trig().subs(X)
return pcls.rewrite(sqrt)
else:
decomp = ipartfrac(pi_coeff)
X = [(x[1], x[0]*S.Pi) for x in zip(decomp, numbered_symbols('z'))]
pcls = cos(sum([x[0] for x in X]))._eval_expand_trig().subs(X)
return pcls
def _eval_rewrite_as_sec(self, arg, **kwargs):
return 1/sec(arg)
def _eval_rewrite_as_csc(self, arg, **kwargs):
return 1/sec(arg).rewrite(csc)
def _eval_conjugate(self):
return self.func(self.args[0].conjugate())
def as_real_imag(self, deep=True, **hints):
re, im = self._as_real_imag(deep=deep, **hints)
return (cos(re)*cosh(im), -sin(re)*sinh(im))
def _eval_expand_trig(self, **hints):
from sympy.functions.special.polynomials import chebyshevt
arg = self.args[0]
x = None
if arg.is_Add: # TODO: Do this more efficiently for more than two terms
x, y = arg.as_two_terms()
sx = sin(x, evaluate=False)._eval_expand_trig()
sy = sin(y, evaluate=False)._eval_expand_trig()
cx = cos(x, evaluate=False)._eval_expand_trig()
cy = cos(y, evaluate=False)._eval_expand_trig()
return cx*cy - sx*sy
else:
coeff, terms = arg.as_coeff_Mul(rational=True)
if coeff.is_Integer:
return chebyshevt(coeff, cos(terms))
pi_coeff = _pi_coeff(arg)
if pi_coeff is not None:
if pi_coeff.is_Rational:
return self.rewrite(sqrt)
return cos(arg)
def _eval_as_leading_term(self, x, cdir=0):
arg = self.args[0]
x0 = arg.subs(x, 0).cancel()
n = (x0 + S.Pi/2)/S.Pi
if n.is_integer:
lt = (arg - n*S.Pi + S.Pi/2).as_leading_term(x)
return ((-1)**n)*lt
if not x0.is_finite:
return self
return self.func(x0)
def _eval_is_extended_real(self):
if self.args[0].is_extended_real:
return True
def _eval_is_finite(self):
arg = self.args[0]
if arg.is_extended_real:
return True
def _eval_is_complex(self):
if self.args[0].is_extended_real \
or self.args[0].is_complex:
return True
class tan(TrigonometricFunction):
"""
The tangent function.
Returns the tangent of x (measured in radians).
Notes
=====
See :func:`sin` for notes about automatic evaluation.
Examples
========
>>> from sympy import tan, pi
>>> from sympy.abc import x
>>> tan(x**2).diff(x)
2*x*(tan(x**2)**2 + 1)
>>> tan(1).diff(x)
0
>>> tan(pi/8).expand()
-1 + sqrt(2)
See Also
========
sin, csc, cos, sec, cot
asin, acsc, acos, asec, atan, acot, atan2
References
==========
.. [1] https://en.wikipedia.org/wiki/Trigonometric_functions
.. [2] http://dlmf.nist.gov/4.14
.. [3] http://functions.wolfram.com/ElementaryFunctions/Tan
"""
def period(self, symbol=None):
return self._period(pi, symbol)
def fdiff(self, argindex=1):
if argindex == 1:
return S.One + self**2
else:
raise ArgumentIndexError(self, argindex)
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return atan
@classmethod
def eval(cls, arg):
from sympy.calculus.util import AccumBounds
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg.is_zero:
return S.Zero
elif arg is S.Infinity or arg is S.NegativeInfinity:
return AccumBounds(S.NegativeInfinity, S.Infinity)
if arg is S.ComplexInfinity:
return S.NaN
if isinstance(arg, AccumBounds):
min, max = arg.min, arg.max
d = floor(min/S.Pi)
if min is not S.NegativeInfinity:
min = min - d*S.Pi
if max is not S.Infinity:
max = max - d*S.Pi
if AccumBounds(min, max).intersection(FiniteSet(S.Pi/2, S.Pi*Rational(3, 2))):
return AccumBounds(S.NegativeInfinity, S.Infinity)
else:
return AccumBounds(tan(min), tan(max))
if arg.could_extract_minus_sign():
return -cls(-arg)
i_coeff = arg.as_coefficient(S.ImaginaryUnit)
if i_coeff is not None:
return S.ImaginaryUnit*tanh(i_coeff)
pi_coeff = _pi_coeff(arg, 2)
if pi_coeff is not None:
if pi_coeff.is_integer:
return S.Zero
if not pi_coeff.is_Rational:
narg = pi_coeff*S.Pi
if narg != arg:
return cls(narg)
return None
if pi_coeff.is_Rational:
q = pi_coeff.q
p = pi_coeff.p % q
# ensure simplified results are returned for n*pi/5, n*pi/10
table10 = {
1: sqrt(1 - 2*sqrt(5)/5),
2: sqrt(5 - 2*sqrt(5)),
3: sqrt(1 + 2*sqrt(5)/5),
4: sqrt(5 + 2*sqrt(5))
}
if q == 5 or q == 10:
n = 10*p/q
if n > 5:
n = 10 - n
return -table10[n]
else:
return table10[n]
if not pi_coeff.q % 2:
narg = pi_coeff*S.Pi*2
cresult, sresult = cos(narg), cos(narg - S.Pi/2)
if not isinstance(cresult, cos) \
and not isinstance(sresult, cos):
if sresult == 0:
return S.ComplexInfinity
return 1/sresult - cresult/sresult
table2 = {
12: (3, 4),
20: (4, 5),
30: (5, 6),
15: (6, 10),
24: (6, 8),
40: (8, 10),
60: (20, 30),
120: (40, 60)
}
if q in table2:
nvala, nvalb = cls(p*S.Pi/table2[q][0]), cls(p*S.Pi/table2[q][1])
if None == nvala or None == nvalb:
return None
return (nvala - nvalb)/(1 + nvala*nvalb)
narg = ((pi_coeff + S.Half) % 1 - S.Half)*S.Pi
# see cos() to specify which expressions should be
# expanded automatically in terms of radicals
cresult, sresult = cos(narg), cos(narg - S.Pi/2)
if not isinstance(cresult, cos) \
and not isinstance(sresult, cos):
if cresult == 0:
return S.ComplexInfinity
return (sresult/cresult)
if narg != arg:
return cls(narg)
if arg.is_Add:
x, m = _peeloff_pi(arg)
if m:
tanm = tan(m)
if tanm is S.ComplexInfinity:
return -cot(x)
else: # tanm == 0
return tan(x)
if arg.is_zero:
return S.Zero
if isinstance(arg, atan):
return arg.args[0]
if isinstance(arg, atan2):
y, x = arg.args
return y/x
if isinstance(arg, asin):
x = arg.args[0]
return x/sqrt(1 - x**2)
if isinstance(arg, acos):
x = arg.args[0]
return sqrt(1 - x**2)/x
if isinstance(arg, acot):
x = arg.args[0]
return 1/x
if isinstance(arg, acsc):
x = arg.args[0]
return 1/(sqrt(1 - 1/x**2)*x)
if isinstance(arg, asec):
x = arg.args[0]
return sqrt(1 - 1/x**2)*x
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
from sympy import bernoulli
if n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
a, b = ((n - 1)//2), 2**(n + 1)
B = bernoulli(n + 1)
F = factorial(n + 1)
return (-1)**a*b*(b - 1)*B/F*x**n
def _eval_nseries(self, x, n, logx, cdir=0):
i = self.args[0].limit(x, 0)*2/S.Pi
if i and i.is_Integer:
return self.rewrite(cos)._eval_nseries(x, n=n, logx=logx)
return Function._eval_nseries(self, x, n=n, logx=logx)
def _eval_rewrite_as_Pow(self, arg, **kwargs):
if isinstance(arg, log):
I = S.ImaginaryUnit
x = arg.args[0]
return I*(x**-I - x**I)/(x**-I + x**I)
def _eval_conjugate(self):
return self.func(self.args[0].conjugate())
def as_real_imag(self, deep=True, **hints):
re, im = self._as_real_imag(deep=deep, **hints)
if im:
denom = cos(2*re) + cosh(2*im)
return (sin(2*re)/denom, sinh(2*im)/denom)
else:
return (self.func(re), S.Zero)
def _eval_expand_trig(self, **hints):
from sympy import im, re
arg = self.args[0]
x = None
if arg.is_Add:
from sympy import symmetric_poly
n = len(arg.args)
TX = []
for x in arg.args:
tx = tan(x, evaluate=False)._eval_expand_trig()
TX.append(tx)
Yg = numbered_symbols('Y')
Y = [ next(Yg) for i in range(n) ]
p = [0, 0]
for i in range(n + 1):
p[1 - i % 2] += symmetric_poly(i, Y)*(-1)**((i % 4)//2)
return (p[0]/p[1]).subs(list(zip(Y, TX)))
else:
coeff, terms = arg.as_coeff_Mul(rational=True)
if coeff.is_Integer and coeff > 1:
I = S.ImaginaryUnit
z = Symbol('dummy', real=True)
P = ((1 + I*z)**coeff).expand()
return (im(P)/re(P)).subs([(z, tan(terms))])
return tan(arg)
def _eval_rewrite_as_exp(self, arg, **kwargs):
I = S.ImaginaryUnit
if isinstance(arg, TrigonometricFunction) or isinstance(arg, HyperbolicFunction):
arg = arg.func(arg.args[0]).rewrite(exp)
neg_exp, pos_exp = exp(-arg*I), exp(arg*I)
return I*(neg_exp - pos_exp)/(neg_exp + pos_exp)
def _eval_rewrite_as_sin(self, x, **kwargs):
return 2*sin(x)**2/sin(2*x)
def _eval_rewrite_as_cos(self, x, **kwargs):
return cos(x - S.Pi/2, evaluate=False)/cos(x)
def _eval_rewrite_as_sincos(self, arg, **kwargs):
return sin(arg)/cos(arg)
def _eval_rewrite_as_cot(self, arg, **kwargs):
return 1/cot(arg)
def _eval_rewrite_as_sec(self, arg, **kwargs):
sin_in_sec_form = sin(arg).rewrite(sec)
cos_in_sec_form = cos(arg).rewrite(sec)
return sin_in_sec_form/cos_in_sec_form
def _eval_rewrite_as_csc(self, arg, **kwargs):
sin_in_csc_form = sin(arg).rewrite(csc)
cos_in_csc_form = cos(arg).rewrite(csc)
return sin_in_csc_form/cos_in_csc_form
def _eval_rewrite_as_pow(self, arg, **kwargs):
y = self.rewrite(cos).rewrite(pow)
if y.has(cos):
return None
return y
def _eval_rewrite_as_sqrt(self, arg, **kwargs):
y = self.rewrite(cos).rewrite(sqrt)
if y.has(cos):
return None
return y
def _eval_as_leading_term(self, x, cdir=0):
arg = self.args[0]
x0 = arg.subs(x, 0)
n = x0/S.Pi
if n.is_integer:
lt = (arg - n*S.Pi).as_leading_term(x)
return lt if n.is_even else -1/lt
if not x0.is_finite:
return self
return self.func(x0)
def _eval_is_extended_real(self):
# FIXME: currently tan(pi/2) return zoo
return self.args[0].is_extended_real
def _eval_is_real(self):
arg = self.args[0]
if arg.is_real and (arg/pi - S.Half).is_integer is False:
return True
def _eval_is_finite(self):
arg = self.args[0]
if arg.is_real and (arg/pi - S.Half).is_integer is False:
return True
if arg.is_imaginary:
return True
def _eval_is_zero(self):
arg = self.args[0]
if arg.is_zero:
return True
def _eval_is_complex(self):
arg = self.args[0]
if arg.is_real and (arg/pi - S.Half).is_integer is False:
return True
class cot(TrigonometricFunction):
"""
The cotangent function.
Returns the cotangent of x (measured in radians).
Notes
=====
See :func:`sin` for notes about automatic evaluation.
Examples
========
>>> from sympy import cot, pi
>>> from sympy.abc import x
>>> cot(x**2).diff(x)
2*x*(-cot(x**2)**2 - 1)
>>> cot(1).diff(x)
0
>>> cot(pi/12)
sqrt(3) + 2
See Also
========
sin, csc, cos, sec, tan
asin, acsc, acos, asec, atan, acot, atan2
References
==========
.. [1] https://en.wikipedia.org/wiki/Trigonometric_functions
.. [2] http://dlmf.nist.gov/4.14
.. [3] http://functions.wolfram.com/ElementaryFunctions/Cot
"""
def period(self, symbol=None):
return self._period(pi, symbol)
def fdiff(self, argindex=1):
if argindex == 1:
return S.NegativeOne - self**2
else:
raise ArgumentIndexError(self, argindex)
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return acot
@classmethod
def eval(cls, arg):
from sympy.calculus.util import AccumBounds
if arg.is_Number:
if arg is S.NaN:
return S.NaN
if arg.is_zero:
return S.ComplexInfinity
if arg is S.ComplexInfinity:
return S.NaN
if isinstance(arg, AccumBounds):
return -tan(arg + S.Pi/2)
if arg.could_extract_minus_sign():
return -cls(-arg)
i_coeff = arg.as_coefficient(S.ImaginaryUnit)
if i_coeff is not None:
return -S.ImaginaryUnit*coth(i_coeff)
pi_coeff = _pi_coeff(arg, 2)
if pi_coeff is not None:
if pi_coeff.is_integer:
return S.ComplexInfinity
if not pi_coeff.is_Rational:
narg = pi_coeff*S.Pi
if narg != arg:
return cls(narg)
return None
if pi_coeff.is_Rational:
if pi_coeff.q == 5 or pi_coeff.q == 10:
return tan(S.Pi/2 - arg)
if pi_coeff.q > 2 and not pi_coeff.q % 2:
narg = pi_coeff*S.Pi*2
cresult, sresult = cos(narg), cos(narg - S.Pi/2)
if not isinstance(cresult, cos) \
and not isinstance(sresult, cos):
return 1/sresult + cresult/sresult
table2 = {
12: (3, 4),
20: (4, 5),
30: (5, 6),
15: (6, 10),
24: (6, 8),
40: (8, 10),
60: (20, 30),
120: (40, 60)
}
q = pi_coeff.q
p = pi_coeff.p % q
if q in table2:
nvala, nvalb = cls(p*S.Pi/table2[q][0]), cls(p*S.Pi/table2[q][1])
if None == nvala or None == nvalb:
return None
return (1 + nvala*nvalb)/(nvalb - nvala)
narg = (((pi_coeff + S.Half) % 1) - S.Half)*S.Pi
# see cos() to specify which expressions should be
# expanded automatically in terms of radicals
cresult, sresult = cos(narg), cos(narg - S.Pi/2)
if not isinstance(cresult, cos) \
and not isinstance(sresult, cos):
if sresult == 0:
return S.ComplexInfinity
return cresult/sresult
if narg != arg:
return cls(narg)
if arg.is_Add:
x, m = _peeloff_pi(arg)
if m:
cotm = cot(m)
if cotm is S.ComplexInfinity:
return cot(x)
else: # cotm == 0
return -tan(x)
if arg.is_zero:
return S.ComplexInfinity
if isinstance(arg, acot):
return arg.args[0]
if isinstance(arg, atan):
x = arg.args[0]
return 1/x
if isinstance(arg, atan2):
y, x = arg.args
return x/y
if isinstance(arg, asin):
x = arg.args[0]
return sqrt(1 - x**2)/x
if isinstance(arg, acos):
x = arg.args[0]
return x/sqrt(1 - x**2)
if isinstance(arg, acsc):
x = arg.args[0]
return sqrt(1 - 1/x**2)*x
if isinstance(arg, asec):
x = arg.args[0]
return 1/(sqrt(1 - 1/x**2)*x)
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
from sympy import bernoulli
if n == 0:
return 1/sympify(x)
elif n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
B = bernoulli(n + 1)
F = factorial(n + 1)
return (-1)**((n + 1)//2)*2**(n + 1)*B/F*x**n
def _eval_nseries(self, x, n, logx, cdir=0):
i = self.args[0].limit(x, 0)/S.Pi
if i and i.is_Integer:
return self.rewrite(cos)._eval_nseries(x, n=n, logx=logx)
return self.rewrite(tan)._eval_nseries(x, n=n, logx=logx)
def _eval_conjugate(self):
return self.func(self.args[0].conjugate())
def as_real_imag(self, deep=True, **hints):
re, im = self._as_real_imag(deep=deep, **hints)
if im:
denom = cos(2*re) - cosh(2*im)
return (-sin(2*re)/denom, sinh(2*im)/denom)
else:
return (self.func(re), S.Zero)
def _eval_rewrite_as_exp(self, arg, **kwargs):
I = S.ImaginaryUnit
if isinstance(arg, TrigonometricFunction) or isinstance(arg, HyperbolicFunction):
arg = arg.func(arg.args[0]).rewrite(exp)
neg_exp, pos_exp = exp(-arg*I), exp(arg*I)
return I*(pos_exp + neg_exp)/(pos_exp - neg_exp)
def _eval_rewrite_as_Pow(self, arg, **kwargs):
if isinstance(arg, log):
I = S.ImaginaryUnit
x = arg.args[0]
return -I*(x**-I + x**I)/(x**-I - x**I)
def _eval_rewrite_as_sin(self, x, **kwargs):
return sin(2*x)/(2*(sin(x)**2))
def _eval_rewrite_as_cos(self, x, **kwargs):
return cos(x)/cos(x - S.Pi/2, evaluate=False)
def _eval_rewrite_as_sincos(self, arg, **kwargs):
return cos(arg)/sin(arg)
def _eval_rewrite_as_tan(self, arg, **kwargs):
return 1/tan(arg)
def _eval_rewrite_as_sec(self, arg, **kwargs):
cos_in_sec_form = cos(arg).rewrite(sec)
sin_in_sec_form = sin(arg).rewrite(sec)
return cos_in_sec_form/sin_in_sec_form
def _eval_rewrite_as_csc(self, arg, **kwargs):
cos_in_csc_form = cos(arg).rewrite(csc)
sin_in_csc_form = sin(arg).rewrite(csc)
return cos_in_csc_form/sin_in_csc_form
def _eval_rewrite_as_pow(self, arg, **kwargs):
y = self.rewrite(cos).rewrite(pow)
if y.has(cos):
return None
return y
def _eval_rewrite_as_sqrt(self, arg, **kwargs):
y = self.rewrite(cos).rewrite(sqrt)
if y.has(cos):
return None
return y
def _eval_as_leading_term(self, x, cdir=0):
from sympy import Order
arg = self.args[0].as_leading_term(x)
if x in arg.free_symbols and Order(1, x).contains(arg):
return 1/arg
else:
return self.func(arg)
def _eval_is_extended_real(self):
return self.args[0].is_extended_real
def _eval_expand_trig(self, **hints):
from sympy import im, re
arg = self.args[0]
x = None
if arg.is_Add:
from sympy import symmetric_poly
n = len(arg.args)
CX = []
for x in arg.args:
cx = cot(x, evaluate=False)._eval_expand_trig()
CX.append(cx)
Yg = numbered_symbols('Y')
Y = [ next(Yg) for i in range(n) ]
p = [0, 0]
for i in range(n, -1, -1):
p[(n - i) % 2] += symmetric_poly(i, Y)*(-1)**(((n - i) % 4)//2)
return (p[0]/p[1]).subs(list(zip(Y, CX)))
else:
coeff, terms = arg.as_coeff_Mul(rational=True)
if coeff.is_Integer and coeff > 1:
I = S.ImaginaryUnit
z = Symbol('dummy', real=True)
P = ((z + I)**coeff).expand()
return (re(P)/im(P)).subs([(z, cot(terms))])
return cot(arg)
def _eval_is_finite(self):
arg = self.args[0]
if arg.is_real and (arg/pi).is_integer is False:
return True
if arg.is_imaginary:
return True
def _eval_is_real(self):
arg = self.args[0]
if arg.is_real and (arg/pi).is_integer is False:
return True
def _eval_is_complex(self):
arg = self.args[0]
if arg.is_real and (arg/pi).is_integer is False:
return True
def _eval_subs(self, old, new):
arg = self.args[0]
argnew = arg.subs(old, new)
if arg != argnew and (argnew/S.Pi).is_integer:
return S.ComplexInfinity
return cot(argnew)
class ReciprocalTrigonometricFunction(TrigonometricFunction):
"""Base class for reciprocal functions of trigonometric functions. """
_reciprocal_of = None # mandatory, to be defined in subclass
_singularities = (S.ComplexInfinity,)
# _is_even and _is_odd are used for correct evaluation of csc(-x), sec(-x)
# TODO refactor into TrigonometricFunction common parts of
# trigonometric functions eval() like even/odd, func(x+2*k*pi), etc.
# optional, to be defined in subclasses:
_is_even = None # type: FuzzyBool
_is_odd = None # type: FuzzyBool
@classmethod
def eval(cls, arg):
if arg.could_extract_minus_sign():
if cls._is_even:
return cls(-arg)
if cls._is_odd:
return -cls(-arg)
pi_coeff = _pi_coeff(arg)
if (pi_coeff is not None
and not (2*pi_coeff).is_integer
and pi_coeff.is_Rational):
q = pi_coeff.q
p = pi_coeff.p % (2*q)
if p > q:
narg = (pi_coeff - 1)*S.Pi
return -cls(narg)
if 2*p > q:
narg = (1 - pi_coeff)*S.Pi
if cls._is_odd:
return cls(narg)
elif cls._is_even:
return -cls(narg)
if hasattr(arg, 'inverse') and arg.inverse() == cls:
return arg.args[0]
t = cls._reciprocal_of.eval(arg)
if t is None:
return t
elif any(isinstance(i, cos) for i in (t, -t)):
return (1/t).rewrite(sec)
elif any(isinstance(i, sin) for i in (t, -t)):
return (1/t).rewrite(csc)
else:
return 1/t
def _call_reciprocal(self, method_name, *args, **kwargs):
# Calls method_name on _reciprocal_of
o = self._reciprocal_of(self.args[0])
return getattr(o, method_name)(*args, **kwargs)
def _calculate_reciprocal(self, method_name, *args, **kwargs):
# If calling method_name on _reciprocal_of returns a value != None
# then return the reciprocal of that value
t = self._call_reciprocal(method_name, *args, **kwargs)
return 1/t if t is not None else t
def _rewrite_reciprocal(self, method_name, arg):
# Special handling for rewrite functions. If reciprocal rewrite returns
# unmodified expression, then return None
t = self._call_reciprocal(method_name, arg)
if t is not None and t != self._reciprocal_of(arg):
return 1/t
def _period(self, symbol):
f = expand_mul(self.args[0])
return self._reciprocal_of(f).period(symbol)
def fdiff(self, argindex=1):
return -self._calculate_reciprocal("fdiff", argindex)/self**2
def _eval_rewrite_as_exp(self, arg, **kwargs):
return self._rewrite_reciprocal("_eval_rewrite_as_exp", arg)
def _eval_rewrite_as_Pow(self, arg, **kwargs):
return self._rewrite_reciprocal("_eval_rewrite_as_Pow", arg)
def _eval_rewrite_as_sin(self, arg, **kwargs):
return self._rewrite_reciprocal("_eval_rewrite_as_sin", arg)
def _eval_rewrite_as_cos(self, arg, **kwargs):
return self._rewrite_reciprocal("_eval_rewrite_as_cos", arg)
def _eval_rewrite_as_tan(self, arg, **kwargs):
return self._rewrite_reciprocal("_eval_rewrite_as_tan", arg)
def _eval_rewrite_as_pow(self, arg, **kwargs):
return self._rewrite_reciprocal("_eval_rewrite_as_pow", arg)
def _eval_rewrite_as_sqrt(self, arg, **kwargs):
return self._rewrite_reciprocal("_eval_rewrite_as_sqrt", arg)
def _eval_conjugate(self):
return self.func(self.args[0].conjugate())
def as_real_imag(self, deep=True, **hints):
return (1/self._reciprocal_of(self.args[0])).as_real_imag(deep,
**hints)
def _eval_expand_trig(self, **hints):
return self._calculate_reciprocal("_eval_expand_trig", **hints)
def _eval_is_extended_real(self):
return self._reciprocal_of(self.args[0])._eval_is_extended_real()
def _eval_as_leading_term(self, x, cdir=0):
return (1/self._reciprocal_of(self.args[0]))._eval_as_leading_term(x)
def _eval_is_finite(self):
return (1/self._reciprocal_of(self.args[0])).is_finite
def _eval_nseries(self, x, n, logx, cdir=0):
return (1/self._reciprocal_of(self.args[0]))._eval_nseries(x, n, logx)
class sec(ReciprocalTrigonometricFunction):
"""
The secant function.
Returns the secant of x (measured in radians).
Notes
=====
See :func:`sin` for notes about automatic evaluation.
Examples
========
>>> from sympy import sec
>>> from sympy.abc import x
>>> sec(x**2).diff(x)
2*x*tan(x**2)*sec(x**2)
>>> sec(1).diff(x)
0
See Also
========
sin, csc, cos, tan, cot
asin, acsc, acos, asec, atan, acot, atan2
References
==========
.. [1] https://en.wikipedia.org/wiki/Trigonometric_functions
.. [2] http://dlmf.nist.gov/4.14
.. [3] http://functions.wolfram.com/ElementaryFunctions/Sec
"""
_reciprocal_of = cos
_is_even = True
def period(self, symbol=None):
return self._period(symbol)
def _eval_rewrite_as_cot(self, arg, **kwargs):
cot_half_sq = cot(arg/2)**2
return (cot_half_sq + 1)/(cot_half_sq - 1)
def _eval_rewrite_as_cos(self, arg, **kwargs):
return (1/cos(arg))
def _eval_rewrite_as_sincos(self, arg, **kwargs):
return sin(arg)/(cos(arg)*sin(arg))
def _eval_rewrite_as_sin(self, arg, **kwargs):
return (1/cos(arg).rewrite(sin))
def _eval_rewrite_as_tan(self, arg, **kwargs):
return (1/cos(arg).rewrite(tan))
def _eval_rewrite_as_csc(self, arg, **kwargs):
return csc(pi/2 - arg, evaluate=False)
def fdiff(self, argindex=1):
if argindex == 1:
return tan(self.args[0])*sec(self.args[0])
else:
raise ArgumentIndexError(self, argindex)
def _eval_is_complex(self):
arg = self.args[0]
if arg.is_complex and (arg/pi - S.Half).is_integer is False:
return True
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
# Reference Formula:
# http://functions.wolfram.com/ElementaryFunctions/Sec/06/01/02/01/
from sympy.functions.combinatorial.numbers import euler
if n < 0 or n % 2 == 1:
return S.Zero
else:
x = sympify(x)
k = n//2
return (-1)**k*euler(2*k)/factorial(2*k)*x**(2*k)
def _eval_as_leading_term(self, x, cdir=0):
arg = self.args[0]
x0 = arg.subs(x, 0).cancel()
n = (x0 + S.Pi/2)/S.Pi
if n.is_integer:
lt = (arg - n*S.Pi + S.Pi/2).as_leading_term(x)
return ((-1)**n)/lt
return self.func(x0)
class csc(ReciprocalTrigonometricFunction):
"""
The cosecant function.
Returns the cosecant of x (measured in radians).
Notes
=====
See :func:`sin` for notes about automatic evaluation.
Examples
========
>>> from sympy import csc
>>> from sympy.abc import x
>>> csc(x**2).diff(x)
-2*x*cot(x**2)*csc(x**2)
>>> csc(1).diff(x)
0
See Also
========
sin, cos, sec, tan, cot
asin, acsc, acos, asec, atan, acot, atan2
References
==========
.. [1] https://en.wikipedia.org/wiki/Trigonometric_functions
.. [2] http://dlmf.nist.gov/4.14
.. [3] http://functions.wolfram.com/ElementaryFunctions/Csc
"""
_reciprocal_of = sin
_is_odd = True
def period(self, symbol=None):
return self._period(symbol)
def _eval_rewrite_as_sin(self, arg, **kwargs):
return (1/sin(arg))
def _eval_rewrite_as_sincos(self, arg, **kwargs):
return cos(arg)/(sin(arg)*cos(arg))
def _eval_rewrite_as_cot(self, arg, **kwargs):
cot_half = cot(arg/2)
return (1 + cot_half**2)/(2*cot_half)
def _eval_rewrite_as_cos(self, arg, **kwargs):
return 1/sin(arg).rewrite(cos)
def _eval_rewrite_as_sec(self, arg, **kwargs):
return sec(pi/2 - arg, evaluate=False)
def _eval_rewrite_as_tan(self, arg, **kwargs):
return (1/sin(arg).rewrite(tan))
def fdiff(self, argindex=1):
if argindex == 1:
return -cot(self.args[0])*csc(self.args[0])
else:
raise ArgumentIndexError(self, argindex)
def _eval_is_complex(self):
arg = self.args[0]
if arg.is_real and (arg/pi).is_integer is False:
return True
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
from sympy import bernoulli
if n == 0:
return 1/sympify(x)
elif n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
k = n//2 + 1
return ((-1)**(k - 1)*2*(2**(2*k - 1) - 1)*
bernoulli(2*k)*x**(2*k - 1)/factorial(2*k))
class sinc(Function):
r"""
Represents an unnormalized sinc function:
.. math::
\operatorname{sinc}(x) =
\begin{cases}
\frac{\sin x}{x} & \qquad x \neq 0 \\
1 & \qquad x = 0
\end{cases}
Examples
========
>>> from sympy import sinc, oo, jn
>>> from sympy.abc import x
>>> sinc(x)
sinc(x)
* Automated Evaluation
>>> sinc(0)
1
>>> sinc(oo)
0
* Differentiation
>>> sinc(x).diff()
Piecewise(((x*cos(x) - sin(x))/x**2, Ne(x, 0)), (0, True))
* Series Expansion
>>> sinc(x).series()
1 - x**2/6 + x**4/120 + O(x**6)
* As zero'th order spherical Bessel Function
>>> sinc(x).rewrite(jn)
jn(0, x)
References
==========
.. [1] https://en.wikipedia.org/wiki/Sinc_function
"""
_singularities = (S.ComplexInfinity,)
def fdiff(self, argindex=1):
x = self.args[0]
if argindex == 1:
return Piecewise(((x*cos(x) - sin(x))/x**2, Ne(x, S.Zero)), (S.Zero, S.true))
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, arg):
if arg.is_zero:
return S.One
if arg.is_Number:
if arg in [S.Infinity, S.NegativeInfinity]:
return S.Zero
elif arg is S.NaN:
return S.NaN
if arg is S.ComplexInfinity:
return S.NaN
if arg.could_extract_minus_sign():
return cls(-arg)
pi_coeff = _pi_coeff(arg)
if pi_coeff is not None:
if pi_coeff.is_integer:
if fuzzy_not(arg.is_zero):
return S.Zero
elif (2*pi_coeff).is_integer:
return S.NegativeOne**(pi_coeff - S.Half)/arg
def _eval_nseries(self, x, n, logx, cdir=0):
x = self.args[0]
return (sin(x)/x)._eval_nseries(x, n, logx)
def _eval_rewrite_as_jn(self, arg, **kwargs):
from sympy.functions.special.bessel import jn
return jn(0, arg)
def _eval_rewrite_as_sin(self, arg, **kwargs):
return Piecewise((sin(arg)/arg, Ne(arg, S.Zero)), (S.One, S.true))
###############################################################################
########################### TRIGONOMETRIC INVERSES ############################
###############################################################################
class InverseTrigonometricFunction(Function):
"""Base class for inverse trigonometric functions."""
_singularities = (1, -1, 0, S.ComplexInfinity)
@staticmethod
def _asin_table():
# Only keys with could_extract_minus_sign() == False
# are actually needed.
return {
sqrt(3)/2: S.Pi/3,
sqrt(2)/2: S.Pi/4,
1/sqrt(2): S.Pi/4,
sqrt((5 - sqrt(5))/8): S.Pi/5,
sqrt(2)*sqrt(5 - sqrt(5))/4: S.Pi/5,
sqrt((5 + sqrt(5))/8): S.Pi*Rational(2, 5),
sqrt(2)*sqrt(5 + sqrt(5))/4: S.Pi*Rational(2, 5),
S.Half: S.Pi/6,
sqrt(2 - sqrt(2))/2: S.Pi/8,
sqrt(S.Half - sqrt(2)/4): S.Pi/8,
sqrt(2 + sqrt(2))/2: S.Pi*Rational(3, 8),
sqrt(S.Half + sqrt(2)/4): S.Pi*Rational(3, 8),
(sqrt(5) - 1)/4: S.Pi/10,
(1 - sqrt(5))/4: -S.Pi/10,
(sqrt(5) + 1)/4: S.Pi*Rational(3, 10),
sqrt(6)/4 - sqrt(2)/4: S.Pi/12,
-sqrt(6)/4 + sqrt(2)/4: -S.Pi/12,
(sqrt(3) - 1)/sqrt(8): S.Pi/12,
(1 - sqrt(3))/sqrt(8): -S.Pi/12,
sqrt(6)/4 + sqrt(2)/4: S.Pi*Rational(5, 12),
(1 + sqrt(3))/sqrt(8): S.Pi*Rational(5, 12)
}
@staticmethod
def _atan_table():
# Only keys with could_extract_minus_sign() == False
# are actually needed.
return {
sqrt(3)/3: S.Pi/6,
1/sqrt(3): S.Pi/6,
sqrt(3): S.Pi/3,
sqrt(2) - 1: S.Pi/8,
1 - sqrt(2): -S.Pi/8,
1 + sqrt(2): S.Pi*Rational(3, 8),
sqrt(5 - 2*sqrt(5)): S.Pi/5,
sqrt(5 + 2*sqrt(5)): S.Pi*Rational(2, 5),
sqrt(1 - 2*sqrt(5)/5): S.Pi/10,
sqrt(1 + 2*sqrt(5)/5): S.Pi*Rational(3, 10),
2 - sqrt(3): S.Pi/12,
-2 + sqrt(3): -S.Pi/12,
2 + sqrt(3): S.Pi*Rational(5, 12)
}
@staticmethod
def _acsc_table():
# Keys for which could_extract_minus_sign()
# will obviously return True are omitted.
return {
2*sqrt(3)/3: S.Pi/3,
sqrt(2): S.Pi/4,
sqrt(2 + 2*sqrt(5)/5): S.Pi/5,
1/sqrt(Rational(5, 8) - sqrt(5)/8): S.Pi/5,
sqrt(2 - 2*sqrt(5)/5): S.Pi*Rational(2, 5),
1/sqrt(Rational(5, 8) + sqrt(5)/8): S.Pi*Rational(2, 5),
2: S.Pi/6,
sqrt(4 + 2*sqrt(2)): S.Pi/8,
2/sqrt(2 - sqrt(2)): S.Pi/8,
sqrt(4 - 2*sqrt(2)): S.Pi*Rational(3, 8),
2/sqrt(2 + sqrt(2)): S.Pi*Rational(3, 8),
1 + sqrt(5): S.Pi/10,
sqrt(5) - 1: S.Pi*Rational(3, 10),
-(sqrt(5) - 1): S.Pi*Rational(-3, 10),
sqrt(6) + sqrt(2): S.Pi/12,
sqrt(6) - sqrt(2): S.Pi*Rational(5, 12),
-(sqrt(6) - sqrt(2)): S.Pi*Rational(-5, 12)
}
class asin(InverseTrigonometricFunction):
"""
The inverse sine function.
Returns the arcsine of x in radians.
Notes
=====
``asin(x)`` will evaluate automatically in the cases ``oo``, ``-oo``,
``0``, ``1``, ``-1`` and for some instances when the result is a rational
multiple of pi (see the eval class method).
A purely imaginary argument will lead to an asinh expression.
Examples
========
>>> from sympy import asin, oo
>>> asin(1)
pi/2
>>> asin(-1)
-pi/2
>>> asin(-oo)
oo*I
>>> asin(oo)
-oo*I
See Also
========
sin, csc, cos, sec, tan, cot
acsc, acos, asec, atan, acot, atan2
References
==========
.. [1] https://en.wikipedia.org/wiki/Inverse_trigonometric_functions
.. [2] http://dlmf.nist.gov/4.23
.. [3] http://functions.wolfram.com/ElementaryFunctions/ArcSin
"""
def fdiff(self, argindex=1):
if argindex == 1:
return 1/sqrt(1 - self.args[0]**2)
else:
raise ArgumentIndexError(self, argindex)
def _eval_is_rational(self):
s = self.func(*self.args)
if s.func == self.func:
if s.args[0].is_rational:
return False
else:
return s.is_rational
def _eval_is_positive(self):
return self._eval_is_extended_real() and self.args[0].is_positive
def _eval_is_negative(self):
return self._eval_is_extended_real() and self.args[0].is_negative
@classmethod
def eval(cls, arg):
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.NegativeInfinity*S.ImaginaryUnit
elif arg is S.NegativeInfinity:
return S.Infinity*S.ImaginaryUnit
elif arg.is_zero:
return S.Zero
elif arg is S.One:
return S.Pi/2
elif arg is S.NegativeOne:
return -S.Pi/2
if arg is S.ComplexInfinity:
return S.ComplexInfinity
if arg.could_extract_minus_sign():
return -cls(-arg)
if arg.is_number:
asin_table = cls._asin_table()
if arg in asin_table:
return asin_table[arg]
i_coeff = arg.as_coefficient(S.ImaginaryUnit)
if i_coeff is not None:
return S.ImaginaryUnit*asinh(i_coeff)
if arg.is_zero:
return S.Zero
if isinstance(arg, sin):
ang = arg.args[0]
if ang.is_comparable:
ang %= 2*pi # restrict to [0,2*pi)
if ang > pi: # restrict to (-pi,pi]
ang = pi - ang
# restrict to [-pi/2,pi/2]
if ang > pi/2:
ang = pi - ang
if ang < -pi/2:
ang = -pi - ang
return ang
if isinstance(arg, cos): # acos(x) + asin(x) = pi/2
ang = arg.args[0]
if ang.is_comparable:
return pi/2 - acos(arg)
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
if len(previous_terms) >= 2 and n > 2:
p = previous_terms[-2]
return p*(n - 2)**2/(n*(n - 1))*x**2
else:
k = (n - 1) // 2
R = RisingFactorial(S.Half, k)
F = factorial(k)
return R/F*x**n/n
def _eval_as_leading_term(self, x, cdir=0):
from sympy import I, im, log
arg = self.args[0]
x0 = arg.subs(x, 0).cancel()
if x0.is_zero:
return arg.as_leading_term(x)
if x0 is S.ComplexInfinity:
return I*log(arg.as_leading_term(x))
if cdir != 0:
cdir = arg.dir(x, cdir)
if im(cdir) < 0 and x0.is_real and x0 < S.NegativeOne:
return -S.Pi - self.func(x0)
elif im(cdir) > 0 and x0.is_real and x0 > S.One:
return S.Pi - self.func(x0)
return self.func(x0)
def _eval_nseries(self, x, n, logx, cdir=0): #asin
from sympy import Dummy, im, O
arg0 = self.args[0].subs(x, 0)
if arg0 is S.One:
t = Dummy('t', positive=True)
ser = asin(S.One - t**2).rewrite(log).nseries(t, 0, 2*n)
arg1 = S.One - self.args[0]
f = arg1.as_leading_term(x)
g = (arg1 - f)/ f
if not g.is_meromorphic(x, 0): # cannot be expanded
return O(1) if n == 0 else S.Pi/2 + O(sqrt(x))
res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx)
res = (res1.removeO()*sqrt(f)).expand()
return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x)
if arg0 is S.NegativeOne:
t = Dummy('t', positive=True)
ser = asin(S.NegativeOne + t**2).rewrite(log).nseries(t, 0, 2*n)
arg1 = S.One + self.args[0]
f = arg1.as_leading_term(x)
g = (arg1 - f)/ f
if not g.is_meromorphic(x, 0): # cannot be expanded
return O(1) if n == 0 else -S.Pi/2 + O(sqrt(x))
res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx)
res = (res1.removeO()*sqrt(f)).expand()
return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x)
res = Function._eval_nseries(self, x, n=n, logx=logx)
if arg0 is S.ComplexInfinity:
return res
if cdir != 0:
cdir = self.args[0].dir(x, cdir)
if im(cdir) < 0 and arg0.is_real and arg0 < S.NegativeOne:
return -S.Pi - res
elif im(cdir) > 0 and arg0.is_real and arg0 > S.One:
return S.Pi - res
return res
def _eval_rewrite_as_acos(self, x, **kwargs):
return S.Pi/2 - acos(x)
def _eval_rewrite_as_atan(self, x, **kwargs):
return 2*atan(x/(1 + sqrt(1 - x**2)))
def _eval_rewrite_as_log(self, x, **kwargs):
return -S.ImaginaryUnit*log(S.ImaginaryUnit*x + sqrt(1 - x**2))
def _eval_rewrite_as_acot(self, arg, **kwargs):
return 2*acot((1 + sqrt(1 - arg**2))/arg)
def _eval_rewrite_as_asec(self, arg, **kwargs):
return S.Pi/2 - asec(1/arg)
def _eval_rewrite_as_acsc(self, arg, **kwargs):
return acsc(1/arg)
def _eval_is_extended_real(self):
x = self.args[0]
return x.is_extended_real and (1 - abs(x)).is_nonnegative
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return sin
class acos(InverseTrigonometricFunction):
"""
The inverse cosine function.
Returns the arc cosine of x (measured in radians).
Notes
=====
``acos(x)`` will evaluate automatically in the cases
``oo``, ``-oo``, ``0``, ``1``, ``-1`` and for some instances when
the result is a rational multiple of pi (see the eval class method).
``acos(zoo)`` evaluates to ``zoo``
(see note in :class:`sympy.functions.elementary.trigonometric.asec`)
A purely imaginary argument will be rewritten to asinh.
Examples
========
>>> from sympy import acos, oo
>>> acos(1)
0
>>> acos(0)
pi/2
>>> acos(oo)
oo*I
See Also
========
sin, csc, cos, sec, tan, cot
asin, acsc, asec, atan, acot, atan2
References
==========
.. [1] https://en.wikipedia.org/wiki/Inverse_trigonometric_functions
.. [2] http://dlmf.nist.gov/4.23
.. [3] http://functions.wolfram.com/ElementaryFunctions/ArcCos
"""
def fdiff(self, argindex=1):
if argindex == 1:
return -1/sqrt(1 - self.args[0]**2)
else:
raise ArgumentIndexError(self, argindex)
def _eval_is_rational(self):
s = self.func(*self.args)
if s.func == self.func:
if s.args[0].is_rational:
return False
else:
return s.is_rational
@classmethod
def eval(cls, arg):
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.Infinity*S.ImaginaryUnit
elif arg is S.NegativeInfinity:
return S.NegativeInfinity*S.ImaginaryUnit
elif arg.is_zero:
return S.Pi/2
elif arg is S.One:
return S.Zero
elif arg is S.NegativeOne:
return S.Pi
if arg is S.ComplexInfinity:
return S.ComplexInfinity
if arg.is_number:
asin_table = cls._asin_table()
if arg in asin_table:
return pi/2 - asin_table[arg]
elif -arg in asin_table:
return pi/2 + asin_table[-arg]
i_coeff = arg.as_coefficient(S.ImaginaryUnit)
if i_coeff is not None:
return pi/2 - asin(arg)
if isinstance(arg, cos):
ang = arg.args[0]
if ang.is_comparable:
ang %= 2*pi # restrict to [0,2*pi)
if ang > pi: # restrict to [0,pi]
ang = 2*pi - ang
return ang
if isinstance(arg, sin): # acos(x) + asin(x) = pi/2
ang = arg.args[0]
if ang.is_comparable:
return pi/2 - asin(arg)
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n == 0:
return S.Pi/2
elif n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
if len(previous_terms) >= 2 and n > 2:
p = previous_terms[-2]
return p*(n - 2)**2/(n*(n - 1))*x**2
else:
k = (n - 1) // 2
R = RisingFactorial(S.Half, k)
F = factorial(k)
return -R/F*x**n/n
def _eval_as_leading_term(self, x, cdir=0):
from sympy import I, im, log
arg = self.args[0]
x0 = arg.subs(x, 0).cancel()
if x0 == 1:
return sqrt(2)*sqrt((S.One - arg).as_leading_term(x))
if x0 is S.ComplexInfinity:
return I*log(arg.as_leading_term(x))
if cdir != 0:
cdir = arg.dir(x, cdir)
if im(cdir) < 0 and x0.is_real and x0 < S.NegativeOne:
return 2*S.Pi - self.func(x0)
elif im(cdir) > 0 and x0.is_real and x0 > S.One:
return -self.func(x0)
return self.func(x0)
def _eval_is_extended_real(self):
x = self.args[0]
return x.is_extended_real and (1 - abs(x)).is_nonnegative
def _eval_is_nonnegative(self):
return self._eval_is_extended_real()
def _eval_nseries(self, x, n, logx, cdir=0): #acos
from sympy import Dummy, im, O
arg0 = self.args[0].subs(x, 0)
if arg0 is S.One:
t = Dummy('t', positive=True)
ser = acos(S.One - t**2).rewrite(log).nseries(t, 0, 2*n)
arg1 = S.One - self.args[0]
f = arg1.as_leading_term(x)
g = (arg1 - f)/ f
if not g.is_meromorphic(x, 0): # cannot be expanded
return O(1) if n == 0 else O(sqrt(x))
res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx)
res = (res1.removeO()*sqrt(f)).expand()
return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x)
if arg0 is S.NegativeOne:
t = Dummy('t', positive=True)
ser = acos(S.NegativeOne + t**2).rewrite(log).nseries(t, 0, 2*n)
arg1 = S.One + self.args[0]
f = arg1.as_leading_term(x)
g = (arg1 - f)/ f
if not g.is_meromorphic(x, 0): # cannot be expanded
return O(1) if n == 0 else S.Pi + O(sqrt(x))
res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx)
res = (res1.removeO()*sqrt(f)).expand()
return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x)
res = Function._eval_nseries(self, x, n=n, logx=logx)
if arg0 is S.ComplexInfinity:
return res
if cdir != 0:
cdir = self.args[0].dir(x, cdir)
if im(cdir) < 0 and arg0.is_real and arg0 < S.NegativeOne:
return 2*S.Pi - res
elif im(cdir) > 0 and arg0.is_real and arg0 > S.One:
return -res
return res
def _eval_rewrite_as_log(self, x, **kwargs):
return S.Pi/2 + S.ImaginaryUnit*\
log(S.ImaginaryUnit*x + sqrt(1 - x**2))
def _eval_rewrite_as_asin(self, x, **kwargs):
return S.Pi/2 - asin(x)
def _eval_rewrite_as_atan(self, x, **kwargs):
return atan(sqrt(1 - x**2)/x) + (S.Pi/2)*(1 - x*sqrt(1/x**2))
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return cos
def _eval_rewrite_as_acot(self, arg, **kwargs):
return S.Pi/2 - 2*acot((1 + sqrt(1 - arg**2))/arg)
def _eval_rewrite_as_asec(self, arg, **kwargs):
return asec(1/arg)
def _eval_rewrite_as_acsc(self, arg, **kwargs):
return S.Pi/2 - acsc(1/arg)
def _eval_conjugate(self):
z = self.args[0]
r = self.func(self.args[0].conjugate())
if z.is_extended_real is False:
return r
elif z.is_extended_real and (z + 1).is_nonnegative and (z - 1).is_nonpositive:
return r
class atan(InverseTrigonometricFunction):
"""
The inverse tangent function.
Returns the arc tangent of x (measured in radians).
Notes
=====
``atan(x)`` will evaluate automatically in the cases
``oo``, ``-oo``, ``0``, ``1``, ``-1`` and for some instances when the
result is a rational multiple of pi (see the eval class method).
Examples
========
>>> from sympy import atan, oo
>>> atan(0)
0
>>> atan(1)
pi/4
>>> atan(oo)
pi/2
See Also
========
sin, csc, cos, sec, tan, cot
asin, acsc, acos, asec, acot, atan2
References
==========
.. [1] https://en.wikipedia.org/wiki/Inverse_trigonometric_functions
.. [2] http://dlmf.nist.gov/4.23
.. [3] http://functions.wolfram.com/ElementaryFunctions/ArcTan
"""
_singularities = (S.ImaginaryUnit, -S.ImaginaryUnit)
def fdiff(self, argindex=1):
if argindex == 1:
return 1/(1 + self.args[0]**2)
else:
raise ArgumentIndexError(self, argindex)
def _eval_is_rational(self):
s = self.func(*self.args)
if s.func == self.func:
if s.args[0].is_rational:
return False
else:
return s.is_rational
def _eval_is_positive(self):
return self.args[0].is_extended_positive
def _eval_is_nonnegative(self):
return self.args[0].is_extended_nonnegative
def _eval_is_zero(self):
return self.args[0].is_zero
def _eval_is_real(self):
return self.args[0].is_extended_real
@classmethod
def eval(cls, arg):
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.Pi/2
elif arg is S.NegativeInfinity:
return -S.Pi/2
elif arg.is_zero:
return S.Zero
elif arg is S.One:
return S.Pi/4
elif arg is S.NegativeOne:
return -S.Pi/4
if arg is S.ComplexInfinity:
from sympy.calculus.util import AccumBounds
return AccumBounds(-S.Pi/2, S.Pi/2)
if arg.could_extract_minus_sign():
return -cls(-arg)
if arg.is_number:
atan_table = cls._atan_table()
if arg in atan_table:
return atan_table[arg]
i_coeff = arg.as_coefficient(S.ImaginaryUnit)
if i_coeff is not None:
return S.ImaginaryUnit*atanh(i_coeff)
if arg.is_zero:
return S.Zero
if isinstance(arg, tan):
ang = arg.args[0]
if ang.is_comparable:
ang %= pi # restrict to [0,pi)
if ang > pi/2: # restrict to [-pi/2,pi/2]
ang -= pi
return ang
if isinstance(arg, cot): # atan(x) + acot(x) = pi/2
ang = arg.args[0]
if ang.is_comparable:
ang = pi/2 - acot(arg)
if ang > pi/2: # restrict to [-pi/2,pi/2]
ang -= pi
return ang
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
return (-1)**((n - 1)//2)*x**n/n
def _eval_as_leading_term(self, x, cdir=0):
from sympy import im, re
arg = self.args[0]
x0 = arg.subs(x, 0).cancel()
if x0.is_zero:
return arg.as_leading_term(x)
if x0 is S.ComplexInfinity:
return acot(1/arg)._eval_as_leading_term(x, cdir=cdir)
if cdir != 0:
cdir = arg.dir(x, cdir)
if re(cdir) < 0 and re(x0).is_zero and im(x0) > S.One:
return self.func(x0) - S.Pi
elif re(cdir) > 0 and re(x0).is_zero and im(x0) < S.NegativeOne:
return self.func(x0) + S.Pi
return self.func(x0)
def _eval_nseries(self, x, n, logx, cdir=0): #atan
from sympy import im, re
arg0 = self.args[0].subs(x, 0)
res = Function._eval_nseries(self, x, n=n, logx=logx)
if cdir != 0:
cdir = self.args[0].dir(x, cdir)
if arg0 is S.ComplexInfinity:
if re(cdir) > 0:
return res - S.Pi
return res
if re(cdir) < 0 and re(arg0).is_zero and im(arg0) > S.One:
return res - S.Pi
elif re(cdir) > 0 and re(arg0).is_zero and im(arg0) < S.NegativeOne:
return res + S.Pi
return res
def _eval_rewrite_as_log(self, x, **kwargs):
return S.ImaginaryUnit/2*(log(S.One - S.ImaginaryUnit*x)
- log(S.One + S.ImaginaryUnit*x))
def _eval_aseries(self, n, args0, x, logx):
if args0[0] is S.Infinity:
return (S.Pi/2 - atan(1/self.args[0]))._eval_nseries(x, n, logx)
elif args0[0] is S.NegativeInfinity:
return (-S.Pi/2 - atan(1/self.args[0]))._eval_nseries(x, n, logx)
else:
return super()._eval_aseries(n, args0, x, logx)
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return tan
def _eval_rewrite_as_asin(self, arg, **kwargs):
return sqrt(arg**2)/arg*(S.Pi/2 - asin(1/sqrt(1 + arg**2)))
def _eval_rewrite_as_acos(self, arg, **kwargs):
return sqrt(arg**2)/arg*acos(1/sqrt(1 + arg**2))
def _eval_rewrite_as_acot(self, arg, **kwargs):
return acot(1/arg)
def _eval_rewrite_as_asec(self, arg, **kwargs):
return sqrt(arg**2)/arg*asec(sqrt(1 + arg**2))
def _eval_rewrite_as_acsc(self, arg, **kwargs):
return sqrt(arg**2)/arg*(S.Pi/2 - acsc(sqrt(1 + arg**2)))
class acot(InverseTrigonometricFunction):
r"""
The inverse cotangent function.
Returns the arc cotangent of x (measured in radians).
Notes
=====
``acot(x)`` will evaluate automatically in the cases ``oo``, ``-oo``,
``zoo``, ``0``, ``1``, ``-1`` and for some instances when the result is a
rational multiple of pi (see the eval class method).
A purely imaginary argument will lead to an ``acoth`` expression.
``acot(x)`` has a branch cut along `(-i, i)`, hence it is discontinuous
at 0. Its range for real ``x`` is `(-\frac{\pi}{2}, \frac{\pi}{2}]`.
Examples
========
>>> from sympy import acot, sqrt
>>> acot(0)
pi/2
>>> acot(1)
pi/4
>>> acot(sqrt(3) - 2)
-5*pi/12
See Also
========
sin, csc, cos, sec, tan, cot
asin, acsc, acos, asec, atan, atan2
References
==========
.. [1] http://dlmf.nist.gov/4.23
.. [2] http://functions.wolfram.com/ElementaryFunctions/ArcCot
"""
_singularities = (S.ImaginaryUnit, -S.ImaginaryUnit)
def fdiff(self, argindex=1):
if argindex == 1:
return -1/(1 + self.args[0]**2)
else:
raise ArgumentIndexError(self, argindex)
def _eval_is_rational(self):
s = self.func(*self.args)
if s.func == self.func:
if s.args[0].is_rational:
return False
else:
return s.is_rational
def _eval_is_positive(self):
return self.args[0].is_nonnegative
def _eval_is_negative(self):
return self.args[0].is_negative
def _eval_is_extended_real(self):
return self.args[0].is_extended_real
@classmethod
def eval(cls, arg):
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.Zero
elif arg is S.NegativeInfinity:
return S.Zero
elif arg.is_zero:
return S.Pi/ 2
elif arg is S.One:
return S.Pi/4
elif arg is S.NegativeOne:
return -S.Pi/4
if arg is S.ComplexInfinity:
return S.Zero
if arg.could_extract_minus_sign():
return -cls(-arg)
if arg.is_number:
atan_table = cls._atan_table()
if arg in atan_table:
ang = pi/2 - atan_table[arg]
if ang > pi/2: # restrict to (-pi/2,pi/2]
ang -= pi
return ang
i_coeff = arg.as_coefficient(S.ImaginaryUnit)
if i_coeff is not None:
return -S.ImaginaryUnit*acoth(i_coeff)
if arg.is_zero:
return S.Pi*S.Half
if isinstance(arg, cot):
ang = arg.args[0]
if ang.is_comparable:
ang %= pi # restrict to [0,pi)
if ang > pi/2: # restrict to (-pi/2,pi/2]
ang -= pi;
return ang
if isinstance(arg, tan): # atan(x) + acot(x) = pi/2
ang = arg.args[0]
if ang.is_comparable:
ang = pi/2 - atan(arg)
if ang > pi/2: # restrict to (-pi/2,pi/2]
ang -= pi
return ang
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n == 0:
return S.Pi/2 # FIX THIS
elif n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
return (-1)**((n + 1)//2)*x**n/n
def _eval_as_leading_term(self, x, cdir=0):
from sympy import im, re
arg = self.args[0]
x0 = arg.subs(x, 0).cancel()
if x0 is S.ComplexInfinity:
return (1/arg).as_leading_term(x)
if cdir != 0:
cdir = arg.dir(x, cdir)
if x0.is_zero:
if re(cdir) < 0:
return self.func(x0) - S.Pi
return self.func(x0)
if re(cdir) > 0 and re(x0).is_zero and im(x0) > S.Zero and im(x0) < S.One:
return self.func(x0) + S.Pi
if re(cdir) < 0 and re(x0).is_zero and im(x0) < S.Zero and im(x0) > S.NegativeOne:
return self.func(x0) - S.Pi
return self.func(x0)
def _eval_nseries(self, x, n, logx, cdir=0): #acot
from sympy import im, re
arg0 = self.args[0].subs(x, 0)
res = Function._eval_nseries(self, x, n=n, logx=logx)
if arg0 is S.ComplexInfinity:
return res
if cdir != 0:
cdir = self.args[0].dir(x, cdir)
if arg0.is_zero:
if re(cdir) < 0:
return res - S.Pi
return res
if re(cdir) > 0 and re(arg0).is_zero and im(arg0) > S.Zero and im(arg0) < S.One:
return res + S.Pi
if re(cdir) < 0 and re(arg0).is_zero and im(arg0) < S.Zero and im(arg0) > S.NegativeOne:
return res - S.Pi
return res
def _eval_aseries(self, n, args0, x, logx):
if args0[0] is S.Infinity:
return (S.Pi/2 - acot(1/self.args[0]))._eval_nseries(x, n, logx)
elif args0[0] is S.NegativeInfinity:
return (S.Pi*Rational(3, 2) - acot(1/self.args[0]))._eval_nseries(x, n, logx)
else:
return super(atan, self)._eval_aseries(n, args0, x, logx)
def _eval_rewrite_as_log(self, x, **kwargs):
return S.ImaginaryUnit/2*(log(1 - S.ImaginaryUnit/x)
- log(1 + S.ImaginaryUnit/x))
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return cot
def _eval_rewrite_as_asin(self, arg, **kwargs):
return (arg*sqrt(1/arg**2)*
(S.Pi/2 - asin(sqrt(-arg**2)/sqrt(-arg**2 - 1))))
def _eval_rewrite_as_acos(self, arg, **kwargs):
return arg*sqrt(1/arg**2)*acos(sqrt(-arg**2)/sqrt(-arg**2 - 1))
def _eval_rewrite_as_atan(self, arg, **kwargs):
return atan(1/arg)
def _eval_rewrite_as_asec(self, arg, **kwargs):
return arg*sqrt(1/arg**2)*asec(sqrt((1 + arg**2)/arg**2))
def _eval_rewrite_as_acsc(self, arg, **kwargs):
return arg*sqrt(1/arg**2)*(S.Pi/2 - acsc(sqrt((1 + arg**2)/arg**2)))
class asec(InverseTrigonometricFunction):
r"""
The inverse secant function.
Returns the arc secant of x (measured in radians).
Notes
=====
``asec(x)`` will evaluate automatically in the cases ``oo``, ``-oo``,
``0``, ``1``, ``-1`` and for some instances when the result is a rational
multiple of pi (see the eval class method).
``asec(x)`` has branch cut in the interval [-1, 1]. For complex arguments,
it can be defined [4]_ as
.. math::
\operatorname{sec^{-1}}(z) = -i\frac{\log\left(\sqrt{1 - z^2} + 1\right)}{z}
At ``x = 0``, for positive branch cut, the limit evaluates to ``zoo``. For
negative branch cut, the limit
.. math::
\lim_{z \to 0}-i\frac{\log\left(-\sqrt{1 - z^2} + 1\right)}{z}
simplifies to :math:`-i\log\left(z/2 + O\left(z^3\right)\right)` which
ultimately evaluates to ``zoo``.
As ``acos(x)`` = ``asec(1/x)``, a similar argument can be given for
``acos(x)``.
Examples
========
>>> from sympy import asec, oo
>>> asec(1)
0
>>> asec(-1)
pi
>>> asec(0)
zoo
>>> asec(-oo)
pi/2
See Also
========
sin, csc, cos, sec, tan, cot
asin, acsc, acos, atan, acot, atan2
References
==========
.. [1] https://en.wikipedia.org/wiki/Inverse_trigonometric_functions
.. [2] http://dlmf.nist.gov/4.23
.. [3] http://functions.wolfram.com/ElementaryFunctions/ArcSec
.. [4] http://reference.wolfram.com/language/ref/ArcSec.html
"""
@classmethod
def eval(cls, arg):
if arg.is_zero:
return S.ComplexInfinity
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.One:
return S.Zero
elif arg is S.NegativeOne:
return S.Pi
if arg in [S.Infinity, S.NegativeInfinity, S.ComplexInfinity]:
return S.Pi/2
if arg.is_number:
acsc_table = cls._acsc_table()
if arg in acsc_table:
return pi/2 - acsc_table[arg]
elif -arg in acsc_table:
return pi/2 + acsc_table[-arg]
if isinstance(arg, sec):
ang = arg.args[0]
if ang.is_comparable:
ang %= 2*pi # restrict to [0,2*pi)
if ang > pi: # restrict to [0,pi]
ang = 2*pi - ang
return ang
if isinstance(arg, csc): # asec(x) + acsc(x) = pi/2
ang = arg.args[0]
if ang.is_comparable:
return pi/2 - acsc(arg)
def fdiff(self, argindex=1):
if argindex == 1:
return 1/(self.args[0]**2*sqrt(1 - 1/self.args[0]**2))
else:
raise ArgumentIndexError(self, argindex)
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return sec
def _eval_as_leading_term(self, x, cdir=0):
from sympy import I, im, log
arg = self.args[0]
x0 = arg.subs(x, 0).cancel()
if x0 == 1:
return sqrt(2)*sqrt((arg - S.One).as_leading_term(x))
if x0.is_zero:
return I*log(arg.as_leading_term(x))
if cdir != 0:
cdir = arg.dir(x, cdir)
if im(cdir) < 0 and x0.is_real and x0 > S.Zero and x0 < S.One:
return -self.func(x0)
elif im(cdir) > 0 and x0.is_real and x0 < S.Zero and x0 > S.NegativeOne:
return 2*S.Pi - self.func(x0)
return self.func(x0)
def _eval_nseries(self, x, n, logx, cdir=0): #asec
from sympy import Dummy, im, O
arg0 = self.args[0].subs(x, 0)
if arg0 is S.One:
t = Dummy('t', positive=True)
ser = asec(S.One + t**2).rewrite(log).nseries(t, 0, 2*n)
arg1 = S.NegativeOne + self.args[0]
f = arg1.as_leading_term(x)
g = (arg1 - f)/ f
res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx)
res = (res1.removeO()*sqrt(f)).expand()
return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x)
if arg0 is S.NegativeOne:
t = Dummy('t', positive=True)
ser = asec(S.NegativeOne - t**2).rewrite(log).nseries(t, 0, 2*n)
arg1 = S.NegativeOne - self.args[0]
f = arg1.as_leading_term(x)
g = (arg1 - f)/ f
res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx)
res = (res1.removeO()*sqrt(f)).expand()
return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x)
res = Function._eval_nseries(self, x, n=n, logx=logx)
if arg0 is S.ComplexInfinity:
return res
if cdir != 0:
cdir = self.args[0].dir(x, cdir)
if im(cdir) < 0 and arg0.is_real and arg0 > S.Zero and arg0 < S.One:
return -res
elif im(cdir) > 0 and arg0.is_real and arg0 < S.Zero and arg0 > S.NegativeOne:
return 2*S.Pi - res
return res
def _eval_is_extended_real(self):
x = self.args[0]
if x.is_extended_real is False:
return False
return fuzzy_or(((x - 1).is_nonnegative, (-x - 1).is_nonnegative))
def _eval_rewrite_as_log(self, arg, **kwargs):
return S.Pi/2 + S.ImaginaryUnit*log(S.ImaginaryUnit/arg + sqrt(1 - 1/arg**2))
def _eval_rewrite_as_asin(self, arg, **kwargs):
return S.Pi/2 - asin(1/arg)
def _eval_rewrite_as_acos(self, arg, **kwargs):
return acos(1/arg)
def _eval_rewrite_as_atan(self, arg, **kwargs):
return sqrt(arg**2)/arg*(-S.Pi/2 + 2*atan(arg + sqrt(arg**2 - 1)))
def _eval_rewrite_as_acot(self, arg, **kwargs):
return sqrt(arg**2)/arg*(-S.Pi/2 + 2*acot(arg - sqrt(arg**2 - 1)))
def _eval_rewrite_as_acsc(self, arg, **kwargs):
return S.Pi/2 - acsc(arg)
class acsc(InverseTrigonometricFunction):
"""
The inverse cosecant function.
Returns the arc cosecant of x (measured in radians).
Notes
=====
``acsc(x)`` will evaluate automatically in the cases ``oo``, ``-oo``,
``0``, ``1``, ``-1`` and for some instances when the result is a rational
multiple of pi (see the eval class method).
Examples
========
>>> from sympy import acsc, oo
>>> acsc(1)
pi/2
>>> acsc(-1)
-pi/2
>>> acsc(oo)
0
>>> acsc(-oo) == acsc(oo)
True
>>> acsc(0)
zoo
See Also
========
sin, csc, cos, sec, tan, cot
asin, acos, asec, atan, acot, atan2
References
==========
.. [1] https://en.wikipedia.org/wiki/Inverse_trigonometric_functions
.. [2] http://dlmf.nist.gov/4.23
.. [3] http://functions.wolfram.com/ElementaryFunctions/ArcCsc
"""
@classmethod
def eval(cls, arg):
if arg.is_zero:
return S.ComplexInfinity
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.One:
return S.Pi/2
elif arg is S.NegativeOne:
return -S.Pi/2
if arg in [S.Infinity, S.NegativeInfinity, S.ComplexInfinity]:
return S.Zero
if arg.could_extract_minus_sign():
return -cls(-arg)
if arg.is_number:
acsc_table = cls._acsc_table()
if arg in acsc_table:
return acsc_table[arg]
if isinstance(arg, csc):
ang = arg.args[0]
if ang.is_comparable:
ang %= 2*pi # restrict to [0,2*pi)
if ang > pi: # restrict to (-pi,pi]
ang = pi - ang
# restrict to [-pi/2,pi/2]
if ang > pi/2:
ang = pi - ang
if ang < -pi/2:
ang = -pi - ang
return ang
if isinstance(arg, sec): # asec(x) + acsc(x) = pi/2
ang = arg.args[0]
if ang.is_comparable:
return pi/2 - asec(arg)
def fdiff(self, argindex=1):
if argindex == 1:
return -1/(self.args[0]**2*sqrt(1 - 1/self.args[0]**2))
else:
raise ArgumentIndexError(self, argindex)
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return csc
def _eval_as_leading_term(self, x, cdir=0):
from sympy import I, im, log
arg = self.args[0]
x0 = arg.subs(x, 0).cancel()
if x0.is_zero:
return I*log(arg.as_leading_term(x))
if x0 is S.ComplexInfinity:
return arg.as_leading_term(x)
if cdir != 0:
cdir = arg.dir(x, cdir)
if im(cdir) < 0 and x0.is_real and x0 > S.Zero and x0 < S.One:
return S.Pi - self.func(x0)
elif im(cdir) > 0 and x0.is_real and x0 < S.Zero and x0 > S.NegativeOne:
return -S.Pi - self.func(x0)
return self.func(x0)
def _eval_nseries(self, x, n, logx, cdir=0): #acsc
from sympy import Dummy, im, O
arg0 = self.args[0].subs(x, 0)
if arg0 is S.One:
t = Dummy('t', positive=True)
ser = acsc(S.One + t**2).rewrite(log).nseries(t, 0, 2*n)
arg1 = S.NegativeOne + self.args[0]
f = arg1.as_leading_term(x)
g = (arg1 - f)/ f
res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx)
res = (res1.removeO()*sqrt(f)).expand()
return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x)
if arg0 is S.NegativeOne:
t = Dummy('t', positive=True)
ser = acsc(S.NegativeOne - t**2).rewrite(log).nseries(t, 0, 2*n)
arg1 = S.NegativeOne - self.args[0]
f = arg1.as_leading_term(x)
g = (arg1 - f)/ f
res1 = sqrt(S.One + g)._eval_nseries(x, n=n, logx=logx)
res = (res1.removeO()*sqrt(f)).expand()
return ser.removeO().subs(t, res).expand().powsimp() + O(x**n, x)
res = Function._eval_nseries(self, x, n=n, logx=logx)
if arg0 is S.ComplexInfinity:
return res
if cdir != 0:
cdir = self.args[0].dir(x, cdir)
if im(cdir) < 0 and arg0.is_real and arg0 > S.Zero and arg0 < S.One:
return S.Pi - res
elif im(cdir) > 0 and arg0.is_real and arg0 < S.Zero and arg0 > S.NegativeOne:
return -S.Pi - res
return res
def _eval_rewrite_as_log(self, arg, **kwargs):
return -S.ImaginaryUnit*log(S.ImaginaryUnit/arg + sqrt(1 - 1/arg**2))
def _eval_rewrite_as_asin(self, arg, **kwargs):
return asin(1/arg)
def _eval_rewrite_as_acos(self, arg, **kwargs):
return S.Pi/2 - acos(1/arg)
def _eval_rewrite_as_atan(self, arg, **kwargs):
return sqrt(arg**2)/arg*(S.Pi/2 - atan(sqrt(arg**2 - 1)))
def _eval_rewrite_as_acot(self, arg, **kwargs):
return sqrt(arg**2)/arg*(S.Pi/2 - acot(1/sqrt(arg**2 - 1)))
def _eval_rewrite_as_asec(self, arg, **kwargs):
return S.Pi/2 - asec(arg)
class atan2(InverseTrigonometricFunction):
r"""
The function ``atan2(y, x)`` computes `\operatorname{atan}(y/x)` taking
two arguments `y` and `x`. Signs of both `y` and `x` are considered to
determine the appropriate quadrant of `\operatorname{atan}(y/x)`.
The range is `(-\pi, \pi]`. The complete definition reads as follows:
.. math::
\operatorname{atan2}(y, x) =
\begin{cases}
\arctan\left(\frac y x\right) & \qquad x > 0 \\
\arctan\left(\frac y x\right) + \pi& \qquad y \ge 0 , x < 0 \\
\arctan\left(\frac y x\right) - \pi& \qquad y < 0 , x < 0 \\
+\frac{\pi}{2} & \qquad y > 0 , x = 0 \\
-\frac{\pi}{2} & \qquad y < 0 , x = 0 \\
\text{undefined} & \qquad y = 0, x = 0
\end{cases}
Attention: Note the role reversal of both arguments. The `y`-coordinate
is the first argument and the `x`-coordinate the second.
If either `x` or `y` is complex:
.. math::
\operatorname{atan2}(y, x) =
-i\log\left(\frac{x + iy}{\sqrt{x**2 + y**2}}\right)
Examples
========
Going counter-clock wise around the origin we find the
following angles:
>>> from sympy import atan2
>>> atan2(0, 1)
0
>>> atan2(1, 1)
pi/4
>>> atan2(1, 0)
pi/2
>>> atan2(1, -1)
3*pi/4
>>> atan2(0, -1)
pi
>>> atan2(-1, -1)
-3*pi/4
>>> atan2(-1, 0)
-pi/2
>>> atan2(-1, 1)
-pi/4
which are all correct. Compare this to the results of the ordinary
`\operatorname{atan}` function for the point `(x, y) = (-1, 1)`
>>> from sympy import atan, S
>>> atan(S(1)/-1)
-pi/4
>>> atan2(1, -1)
3*pi/4
where only the `\operatorname{atan2}` function reurns what we expect.
We can differentiate the function with respect to both arguments:
>>> from sympy import diff
>>> from sympy.abc import x, y
>>> diff(atan2(y, x), x)
-y/(x**2 + y**2)
>>> diff(atan2(y, x), y)
x/(x**2 + y**2)
We can express the `\operatorname{atan2}` function in terms of
complex logarithms:
>>> from sympy import log
>>> atan2(y, x).rewrite(log)
-I*log((x + I*y)/sqrt(x**2 + y**2))
and in terms of `\operatorname(atan)`:
>>> from sympy import atan
>>> atan2(y, x).rewrite(atan)
Piecewise((2*atan(y/(x + sqrt(x**2 + y**2))), Ne(y, 0)), (pi, re(x) < 0), (0, Ne(x, 0)), (nan, True))
but note that this form is undefined on the negative real axis.
See Also
========
sin, csc, cos, sec, tan, cot
asin, acsc, acos, asec, atan, acot
References
==========
.. [1] https://en.wikipedia.org/wiki/Inverse_trigonometric_functions
.. [2] https://en.wikipedia.org/wiki/Atan2
.. [3] http://functions.wolfram.com/ElementaryFunctions/ArcTan2
"""
@classmethod
def eval(cls, y, x):
from sympy import Heaviside, im, re
if x is S.NegativeInfinity:
if y.is_zero:
# Special case y = 0 because we define Heaviside(0) = 1/2
return S.Pi
return 2*S.Pi*(Heaviside(re(y))) - S.Pi
elif x is S.Infinity:
return S.Zero
elif x.is_imaginary and y.is_imaginary and x.is_number and y.is_number:
x = im(x)
y = im(y)
if x.is_extended_real and y.is_extended_real:
if x.is_positive:
return atan(y/x)
elif x.is_negative:
if y.is_negative:
return atan(y/x) - S.Pi
elif y.is_nonnegative:
return atan(y/x) + S.Pi
elif x.is_zero:
if y.is_positive:
return S.Pi/2
elif y.is_negative:
return -S.Pi/2
elif y.is_zero:
return S.NaN
if y.is_zero:
if x.is_extended_nonzero:
return S.Pi*(S.One - Heaviside(x))
if x.is_number:
return Piecewise((S.Pi, re(x) < 0),
(0, Ne(x, 0)),
(S.NaN, True))
if x.is_number and y.is_number:
return -S.ImaginaryUnit*log(
(x + S.ImaginaryUnit*y)/sqrt(x**2 + y**2))
def _eval_rewrite_as_log(self, y, x, **kwargs):
return -S.ImaginaryUnit*log((x + S.ImaginaryUnit*y)/sqrt(x**2 + y**2))
def _eval_rewrite_as_atan(self, y, x, **kwargs):
from sympy import re
return Piecewise((2*atan(y/(x + sqrt(x**2 + y**2))), Ne(y, 0)),
(pi, re(x) < 0),
(0, Ne(x, 0)),
(S.NaN, True))
def _eval_rewrite_as_arg(self, y, x, **kwargs):
from sympy import arg
if x.is_extended_real and y.is_extended_real:
return arg(x + y*S.ImaginaryUnit)
n = x + S.ImaginaryUnit*y
d = x**2 + y**2
return arg(n/sqrt(d)) - S.ImaginaryUnit*log(abs(n)/sqrt(abs(d)))
def _eval_is_extended_real(self):
return self.args[0].is_extended_real and self.args[1].is_extended_real
def _eval_conjugate(self):
return self.func(self.args[0].conjugate(), self.args[1].conjugate())
def fdiff(self, argindex):
y, x = self.args
if argindex == 1:
# Diff wrt y
return x/(x**2 + y**2)
elif argindex == 2:
# Diff wrt x
return -y/(x**2 + y**2)
else:
raise ArgumentIndexError(self, argindex)
def _eval_evalf(self, prec):
y, x = self.args
if x.is_extended_real and y.is_extended_real:
return super()._eval_evalf(prec)
|
3449cdc9f26b8060d5a11ef9354267553e0f0f9d909fe58a7429e4b6268fd852
|
from sympy.core import Basic, S, Function, diff, Tuple, Dummy
from sympy.core.basic import as_Basic
from sympy.core.numbers import Rational, NumberSymbol
from sympy.core.relational import (Equality, Unequality, Relational,
_canonical)
from sympy.functions.elementary.miscellaneous import Max, Min
from sympy.logic.boolalg import (And, Boolean, distribute_and_over_or,
true, false, Or, ITE, simplify_logic)
from sympy.utilities.iterables import uniq, ordered, product, sift
from sympy.utilities.misc import filldedent, func_name
Undefined = S.NaN # Piecewise()
class ExprCondPair(Tuple):
"""Represents an expression, condition pair."""
def __new__(cls, expr, cond):
expr = as_Basic(expr)
if cond == True:
return Tuple.__new__(cls, expr, true)
elif cond == False:
return Tuple.__new__(cls, expr, false)
elif isinstance(cond, Basic) and cond.has(Piecewise):
cond = piecewise_fold(cond)
if isinstance(cond, Piecewise):
cond = cond.rewrite(ITE)
if not isinstance(cond, Boolean):
raise TypeError(filldedent('''
Second argument must be a Boolean,
not `%s`''' % func_name(cond)))
return Tuple.__new__(cls, expr, cond)
@property
def expr(self):
"""
Returns the expression of this pair.
"""
return self.args[0]
@property
def cond(self):
"""
Returns the condition of this pair.
"""
return self.args[1]
@property
def is_commutative(self):
return self.expr.is_commutative
def __iter__(self):
yield self.expr
yield self.cond
def _eval_simplify(self, **kwargs):
return self.func(*[a.simplify(**kwargs) for a in self.args])
class Piecewise(Function):
"""
Represents a piecewise function.
Usage:
Piecewise( (expr,cond), (expr,cond), ... )
- Each argument is a 2-tuple defining an expression and condition
- The conds are evaluated in turn returning the first that is True.
If any of the evaluated conds are not determined explicitly False,
e.g. x < 1, the function is returned in symbolic form.
- If the function is evaluated at a place where all conditions are False,
nan will be returned.
- Pairs where the cond is explicitly False, will be removed.
Examples
========
>>> from sympy import Piecewise, log, piecewise_fold
>>> from sympy.abc import x, y
>>> f = x**2
>>> g = log(x)
>>> p = Piecewise((0, x < -1), (f, x <= 1), (g, True))
>>> p.subs(x,1)
1
>>> p.subs(x,5)
log(5)
Booleans can contain Piecewise elements:
>>> cond = (x < y).subs(x, Piecewise((2, x < 0), (3, True))); cond
Piecewise((2, x < 0), (3, True)) < y
The folded version of this results in a Piecewise whose
expressions are Booleans:
>>> folded_cond = piecewise_fold(cond); folded_cond
Piecewise((2 < y, x < 0), (3 < y, True))
When a Boolean containing Piecewise (like cond) or a Piecewise
with Boolean expressions (like folded_cond) is used as a condition,
it is converted to an equivalent ITE object:
>>> Piecewise((1, folded_cond))
Piecewise((1, ITE(x < 0, y > 2, y > 3)))
When a condition is an ITE, it will be converted to a simplified
Boolean expression:
>>> piecewise_fold(_)
Piecewise((1, ((x >= 0) | (y > 2)) & ((y > 3) | (x < 0))))
See Also
========
piecewise_fold, ITE
"""
nargs = None
is_Piecewise = True
def __new__(cls, *args, **options):
if len(args) == 0:
raise TypeError("At least one (expr, cond) pair expected.")
# (Try to) sympify args first
newargs = []
for ec in args:
# ec could be a ExprCondPair or a tuple
pair = ExprCondPair(*getattr(ec, 'args', ec))
cond = pair.cond
if cond is false:
continue
newargs.append(pair)
if cond is true:
break
if options.pop('evaluate', True):
r = cls.eval(*newargs)
else:
r = None
if r is None:
return Basic.__new__(cls, *newargs, **options)
else:
return r
@classmethod
def eval(cls, *_args):
"""Either return a modified version of the args or, if no
modifications were made, return None.
Modifications that are made here:
1) relationals are made canonical
2) any False conditions are dropped
3) any repeat of a previous condition is ignored
3) any args past one with a true condition are dropped
If there are no args left, nan will be returned.
If there is a single arg with a True condition, its
corresponding expression will be returned.
"""
from sympy.functions.elementary.complexes import im, re
if not _args:
return Undefined
if len(_args) == 1 and _args[0][-1] == True:
return _args[0][0]
newargs = [] # the unevaluated conditions
current_cond = set() # the conditions up to a given e, c pair
# make conditions canonical
args = []
for e, c in _args:
if (not c.is_Atom and not isinstance(c, Relational) and
not c.has(im, re)):
free = c.free_symbols
if len(free) == 1:
funcs = [i for i in c.atoms(Function)
if not isinstance(i, Boolean)]
if len(funcs) == 1 and len(
c.xreplace({list(funcs)[0]: Dummy()}
).free_symbols) == 1:
# we can treat function like a symbol
free = funcs
_c = c
x = free.pop()
try:
c = c.as_set().as_relational(x)
except NotImplementedError:
pass
else:
reps = {}
for i in c.atoms(Relational):
ic = i.canonical
if ic.rhs in (S.Infinity, S.NegativeInfinity):
if not _c.has(ic.rhs):
# don't accept introduction of
# new Relationals with +/-oo
reps[i] = S.true
elif ('=' not in ic.rel_op and
c.xreplace({x: i.rhs}) !=
_c.xreplace({x: i.rhs})):
reps[i] = Relational(
i.lhs, i.rhs, i.rel_op + '=')
c = c.xreplace(reps)
args.append((e, _canonical(c)))
for expr, cond in args:
# Check here if expr is a Piecewise and collapse if one of
# the conds in expr matches cond. This allows the collapsing
# of Piecewise((Piecewise((x,x<0)),x<0)) to Piecewise((x,x<0)).
# This is important when using piecewise_fold to simplify
# multiple Piecewise instances having the same conds.
# Eventually, this code should be able to collapse Piecewise's
# having different intervals, but this will probably require
# using the new assumptions.
if isinstance(expr, Piecewise):
unmatching = []
for i, (e, c) in enumerate(expr.args):
if c in current_cond:
# this would already have triggered
continue
if c == cond:
if c != True:
# nothing past this condition will ever
# trigger and only those args before this
# that didn't match a previous condition
# could possibly trigger
if unmatching:
expr = Piecewise(*(
unmatching + [(e, c)]))
else:
expr = e
break
else:
unmatching.append((e, c))
# check for condition repeats
got = False
# -- if an And contains a condition that was
# already encountered, then the And will be
# False: if the previous condition was False
# then the And will be False and if the previous
# condition is True then then we wouldn't get to
# this point. In either case, we can skip this condition.
for i in ([cond] +
(list(cond.args) if isinstance(cond, And) else
[])):
if i in current_cond:
got = True
break
if got:
continue
# -- if not(c) is already in current_cond then c is
# a redundant condition in an And. This does not
# apply to Or, however: (e1, c), (e2, Or(~c, d))
# is not (e1, c), (e2, d) because if c and d are
# both False this would give no results when the
# true answer should be (e2, True)
if isinstance(cond, And):
nonredundant = []
for c in cond.args:
if (isinstance(c, Relational) and
c.negated.canonical in current_cond):
continue
nonredundant.append(c)
cond = cond.func(*nonredundant)
elif isinstance(cond, Relational):
if cond.negated.canonical in current_cond:
cond = S.true
current_cond.add(cond)
# collect successive e,c pairs when exprs or cond match
if newargs:
if newargs[-1].expr == expr:
orcond = Or(cond, newargs[-1].cond)
if isinstance(orcond, (And, Or)):
orcond = distribute_and_over_or(orcond)
newargs[-1] = ExprCondPair(expr, orcond)
continue
elif newargs[-1].cond == cond:
newargs[-1] = ExprCondPair(expr, cond)
continue
newargs.append(ExprCondPair(expr, cond))
# some conditions may have been redundant
missing = len(newargs) != len(_args)
# some conditions may have changed
same = all(a == b for a, b in zip(newargs, _args))
# if either change happened we return the expr with the
# updated args
if not newargs:
raise ValueError(filldedent('''
There are no conditions (or none that
are not trivially false) to define an
expression.'''))
if missing or not same:
return cls(*newargs)
def doit(self, **hints):
"""
Evaluate this piecewise function.
"""
newargs = []
for e, c in self.args:
if hints.get('deep', True):
if isinstance(e, Basic):
newe = e.doit(**hints)
if newe != self:
e = newe
if isinstance(c, Basic):
c = c.doit(**hints)
newargs.append((e, c))
return self.func(*newargs)
def _eval_simplify(self, **kwargs):
return piecewise_simplify(self, **kwargs)
def _eval_as_leading_term(self, x, cdir=0):
for e, c in self.args:
if c == True or c.subs(x, 0) == True:
return e.as_leading_term(x)
def _eval_adjoint(self):
return self.func(*[(e.adjoint(), c) for e, c in self.args])
def _eval_conjugate(self):
return self.func(*[(e.conjugate(), c) for e, c in self.args])
def _eval_derivative(self, x):
return self.func(*[(diff(e, x), c) for e, c in self.args])
def _eval_evalf(self, prec):
return self.func(*[(e._evalf(prec), c) for e, c in self.args])
def piecewise_integrate(self, x, **kwargs):
"""Return the Piecewise with each expression being
replaced with its antiderivative. To obtain a continuous
antiderivative, use the `integrate` function or method.
Examples
========
>>> from sympy import Piecewise
>>> from sympy.abc import x
>>> p = Piecewise((0, x < 0), (1, x < 1), (2, True))
>>> p.piecewise_integrate(x)
Piecewise((0, x < 0), (x, x < 1), (2*x, True))
Note that this does not give a continuous function, e.g.
at x = 1 the 3rd condition applies and the antiderivative
there is 2*x so the value of the antiderivative is 2:
>>> anti = _
>>> anti.subs(x, 1)
2
The continuous derivative accounts for the integral *up to*
the point of interest, however:
>>> p.integrate(x)
Piecewise((0, x < 0), (x, x < 1), (2*x - 1, True))
>>> _.subs(x, 1)
1
See Also
========
Piecewise._eval_integral
"""
from sympy.integrals import integrate
return self.func(*[(integrate(e, x, **kwargs), c) for e, c in self.args])
def _handle_irel(self, x, handler):
"""Return either None (if the conditions of self depend only on x) else
a Piecewise expression whose expressions (handled by the handler that
was passed) are paired with the governing x-independent relationals,
e.g. Piecewise((A, a(x) & b(y)), (B, c(x) | c(y)) ->
Piecewise(
(handler(Piecewise((A, a(x) & True), (B, c(x) | True)), b(y) & c(y)),
(handler(Piecewise((A, a(x) & True), (B, c(x) | False)), b(y)),
(handler(Piecewise((A, a(x) & False), (B, c(x) | True)), c(y)),
(handler(Piecewise((A, a(x) & False), (B, c(x) | False)), True))
"""
# identify governing relationals
rel = self.atoms(Relational)
irel = list(ordered([r for r in rel if x not in r.free_symbols
and r not in (S.true, S.false)]))
if irel:
args = {}
exprinorder = []
for truth in product((1, 0), repeat=len(irel)):
reps = dict(zip(irel, truth))
# only store the true conditions since the false are implied
# when they appear lower in the Piecewise args
if 1 not in truth:
cond = None # flag this one so it doesn't get combined
else:
andargs = Tuple(*[i for i in reps if reps[i]])
free = list(andargs.free_symbols)
if len(free) == 1:
from sympy.solvers.inequalities import (
reduce_inequalities, _solve_inequality)
try:
t = reduce_inequalities(andargs, free[0])
# ValueError when there are potentially
# nonvanishing imaginary parts
except (ValueError, NotImplementedError):
# at least isolate free symbol on left
t = And(*[_solve_inequality(
a, free[0], linear=True)
for a in andargs])
else:
t = And(*andargs)
if t is S.false:
continue # an impossible combination
cond = t
expr = handler(self.xreplace(reps))
if isinstance(expr, self.func) and len(expr.args) == 1:
expr, econd = expr.args[0]
cond = And(econd, True if cond is None else cond)
# the ec pairs are being collected since all possibilities
# are being enumerated, but don't put the last one in since
# its expr might match a previous expression and it
# must appear last in the args
if cond is not None:
args.setdefault(expr, []).append(cond)
# but since we only store the true conditions we must maintain
# the order so that the expression with the most true values
# comes first
exprinorder.append(expr)
# convert collected conditions as args of Or
for k in args:
args[k] = Or(*args[k])
# take them in the order obtained
args = [(e, args[e]) for e in uniq(exprinorder)]
# add in the last arg
args.append((expr, True))
# if any condition reduced to True, it needs to go last
# and there should only be one of them or else the exprs
# should agree
trues = [i for i in range(len(args)) if args[i][1] is S.true]
if not trues:
# make the last one True since all cases were enumerated
e, c = args[-1]
args[-1] = (e, S.true)
else:
assert len({e for e, c in [args[i] for i in trues]}) == 1
args.append(args.pop(trues.pop()))
while trues:
args.pop(trues.pop())
return Piecewise(*args)
def _eval_integral(self, x, _first=True, **kwargs):
"""Return the indefinite integral of the
Piecewise such that subsequent substitution of x with a
value will give the value of the integral (not including
the constant of integration) up to that point. To only
integrate the individual parts of Piecewise, use the
`piecewise_integrate` method.
Examples
========
>>> from sympy import Piecewise
>>> from sympy.abc import x
>>> p = Piecewise((0, x < 0), (1, x < 1), (2, True))
>>> p.integrate(x)
Piecewise((0, x < 0), (x, x < 1), (2*x - 1, True))
>>> p.piecewise_integrate(x)
Piecewise((0, x < 0), (x, x < 1), (2*x, True))
See Also
========
Piecewise.piecewise_integrate
"""
from sympy.integrals.integrals import integrate
if _first:
def handler(ipw):
if isinstance(ipw, self.func):
return ipw._eval_integral(x, _first=False, **kwargs)
else:
return ipw.integrate(x, **kwargs)
irv = self._handle_irel(x, handler)
if irv is not None:
return irv
# handle a Piecewise from -oo to oo with and no x-independent relationals
# -----------------------------------------------------------------------
try:
abei = self._intervals(x)
except NotImplementedError:
from sympy import Integral
return Integral(self, x) # unevaluated
pieces = [(a, b) for a, b, _, _ in abei]
oo = S.Infinity
done = [(-oo, oo, -1)]
for k, p in enumerate(pieces):
if p == (-oo, oo):
# all undone intervals will get this key
for j, (a, b, i) in enumerate(done):
if i == -1:
done[j] = a, b, k
break # nothing else to consider
N = len(done) - 1
for j, (a, b, i) in enumerate(reversed(done)):
if i == -1:
j = N - j
done[j: j + 1] = _clip(p, (a, b), k)
done = [(a, b, i) for a, b, i in done if a != b]
# append an arg if there is a hole so a reference to
# argument -1 will give Undefined
if any(i == -1 for (a, b, i) in done):
abei.append((-oo, oo, Undefined, -1))
# return the sum of the intervals
args = []
sum = None
for a, b, i in done:
anti = integrate(abei[i][-2], x, **kwargs)
if sum is None:
sum = anti
else:
sum = sum.subs(x, a)
if sum == Undefined:
sum = 0
sum += anti._eval_interval(x, a, x)
# see if we know whether b is contained in original
# condition
if b is S.Infinity:
cond = True
elif self.args[abei[i][-1]].cond.subs(x, b) == False:
cond = (x < b)
else:
cond = (x <= b)
args.append((sum, cond))
return Piecewise(*args)
def _eval_interval(self, sym, a, b, _first=True):
"""Evaluates the function along the sym in a given interval [a, b]"""
# FIXME: Currently complex intervals are not supported. A possible
# replacement algorithm, discussed in issue 5227, can be found in the
# following papers;
# http://portal.acm.org/citation.cfm?id=281649
# http://citeseerx.ist.psu.edu/viewdoc/download?doi=10.1.1.70.4127&rep=rep1&type=pdf
from sympy.core.symbol import Dummy
if a is None or b is None:
# In this case, it is just simple substitution
return super()._eval_interval(sym, a, b)
else:
x, lo, hi = map(as_Basic, (sym, a, b))
if _first: # get only x-dependent relationals
def handler(ipw):
if isinstance(ipw, self.func):
return ipw._eval_interval(x, lo, hi, _first=None)
else:
return ipw._eval_interval(x, lo, hi)
irv = self._handle_irel(x, handler)
if irv is not None:
return irv
if (lo < hi) is S.false or (
lo is S.Infinity or hi is S.NegativeInfinity):
rv = self._eval_interval(x, hi, lo, _first=False)
if isinstance(rv, Piecewise):
rv = Piecewise(*[(-e, c) for e, c in rv.args])
else:
rv = -rv
return rv
if (lo < hi) is S.true or (
hi is S.Infinity or lo is S.NegativeInfinity):
pass
else:
_a = Dummy('lo')
_b = Dummy('hi')
a = lo if lo.is_comparable else _a
b = hi if hi.is_comparable else _b
pos = self._eval_interval(x, a, b, _first=False)
if a == _a and b == _b:
# it's purely symbolic so just swap lo and hi and
# change the sign to get the value for when lo > hi
neg, pos = (-pos.xreplace({_a: hi, _b: lo}),
pos.xreplace({_a: lo, _b: hi}))
else:
# at least one of the bounds was comparable, so allow
# _eval_interval to use that information when computing
# the interval with lo and hi reversed
neg, pos = (-self._eval_interval(x, hi, lo, _first=False),
pos.xreplace({_a: lo, _b: hi}))
# allow simplification based on ordering of lo and hi
p = Dummy('', positive=True)
if lo.is_Symbol:
pos = pos.xreplace({lo: hi - p}).xreplace({p: hi - lo})
neg = neg.xreplace({lo: hi + p}).xreplace({p: lo - hi})
elif hi.is_Symbol:
pos = pos.xreplace({hi: lo + p}).xreplace({p: hi - lo})
neg = neg.xreplace({hi: lo - p}).xreplace({p: lo - hi})
# assemble return expression; make the first condition be Lt
# b/c then the first expression will look the same whether
# the lo or hi limit is symbolic
if a == _a: # the lower limit was symbolic
rv = Piecewise(
(pos,
lo < hi),
(neg,
True))
else:
rv = Piecewise(
(neg,
hi < lo),
(pos,
True))
if rv == Undefined:
raise ValueError("Can't integrate across undefined region.")
if any(isinstance(i, Piecewise) for i in (pos, neg)):
rv = piecewise_fold(rv)
return rv
# handle a Piecewise with lo <= hi and no x-independent relationals
# -----------------------------------------------------------------
try:
abei = self._intervals(x)
except NotImplementedError:
from sympy import Integral
# not being able to do the interval of f(x) can
# be stated as not being able to do the integral
# of f'(x) over the same range
return Integral(self.diff(x), (x, lo, hi)) # unevaluated
pieces = [(a, b) for a, b, _, _ in abei]
done = [(lo, hi, -1)]
oo = S.Infinity
for k, p in enumerate(pieces):
if p[:2] == (-oo, oo):
# all undone intervals will get this key
for j, (a, b, i) in enumerate(done):
if i == -1:
done[j] = a, b, k
break # nothing else to consider
N = len(done) - 1
for j, (a, b, i) in enumerate(reversed(done)):
if i == -1:
j = N - j
done[j: j + 1] = _clip(p, (a, b), k)
done = [(a, b, i) for a, b, i in done if a != b]
# return the sum of the intervals
sum = S.Zero
upto = None
for a, b, i in done:
if i == -1:
if upto is None:
return Undefined
# TODO simplify hi <= upto
return Piecewise((sum, hi <= upto), (Undefined, True))
sum += abei[i][-2]._eval_interval(x, a, b)
upto = b
return sum
def _intervals(self, sym):
"""Return a list of unique tuples, (a, b, e, i), where a and b
are the lower and upper bounds in which the expression e of
argument i in self is defined and a < b (when involving
numbers) or a <= b when involving symbols.
If there are any relationals not involving sym, or any
relational cannot be solved for sym, NotImplementedError is
raised. The calling routine should have removed such
relationals before calling this routine.
The evaluated conditions will be returned as ranges.
Discontinuous ranges will be returned separately with
identical expressions. The first condition that evaluates to
True will be returned as the last tuple with a, b = -oo, oo.
"""
from sympy.solvers.inequalities import _solve_inequality
from sympy.logic.boolalg import to_cnf, distribute_or_over_and
assert isinstance(self, Piecewise)
def _solve_relational(r):
if sym not in r.free_symbols:
nonsymfail(r)
rv = _solve_inequality(r, sym)
if isinstance(rv, Relational):
free = rv.args[1].free_symbols
if rv.args[0] != sym or sym in free:
raise NotImplementedError(filldedent('''
Unable to solve relational
%s for %s.''' % (r, sym)))
if rv.rel_op == '==':
# this equality has been affirmed to have the form
# Eq(sym, rhs) where rhs is sym-free; it represents
# a zero-width interval which will be ignored
# whether it is an isolated condition or contained
# within an And or an Or
rv = S.false
elif rv.rel_op == '!=':
try:
rv = Or(sym < rv.rhs, sym > rv.rhs)
except TypeError:
# e.g. x != I ==> all real x satisfy
rv = S.true
elif rv == (S.NegativeInfinity < sym) & (sym < S.Infinity):
rv = S.true
return rv
def nonsymfail(cond):
raise NotImplementedError(filldedent('''
A condition not involving
%s appeared: %s''' % (sym, cond)))
# make self canonical wrt Relationals
reps = {
r: _solve_relational(r) for r in self.atoms(Relational)}
# process args individually so if any evaluate, their position
# in the original Piecewise will be known
args = [i.xreplace(reps) for i in self.args]
# precondition args
expr_cond = []
default = idefault = None
for i, (expr, cond) in enumerate(args):
if cond is S.false:
continue
elif cond is S.true:
default = expr
idefault = i
break
cond = to_cnf(cond)
if isinstance(cond, And):
cond = distribute_or_over_and(cond)
if isinstance(cond, Or):
expr_cond.extend(
[(i, expr, o) for o in cond.args
if not isinstance(o, Equality)])
elif cond is not S.false:
expr_cond.append((i, expr, cond))
# determine intervals represented by conditions
int_expr = []
for iarg, expr, cond in expr_cond:
if isinstance(cond, And):
lower = S.NegativeInfinity
upper = S.Infinity
for cond2 in cond.args:
if isinstance(cond2, Equality):
lower = upper # ignore
break
elif cond2.lts == sym:
upper = Min(cond2.gts, upper)
elif cond2.gts == sym:
lower = Max(cond2.lts, lower)
else:
nonsymfail(cond2) # should never get here
elif isinstance(cond, Relational):
lower, upper = cond.lts, cond.gts # part 1: initialize with givens
if cond.lts == sym: # part 1a: expand the side ...
lower = S.NegativeInfinity # e.g. x <= 0 ---> -oo <= 0
elif cond.gts == sym: # part 1a: ... that can be expanded
upper = S.Infinity # e.g. x >= 0 ---> oo >= 0
else:
nonsymfail(cond)
else:
raise NotImplementedError(
'unrecognized condition: %s' % cond)
lower, upper = lower, Max(lower, upper)
if (lower >= upper) is not S.true:
int_expr.append((lower, upper, expr, iarg))
if default is not None:
int_expr.append(
(S.NegativeInfinity, S.Infinity, default, idefault))
return list(uniq(int_expr))
def _eval_nseries(self, x, n, logx, cdir=0):
args = [(ec.expr._eval_nseries(x, n, logx), ec.cond) for ec in self.args]
return self.func(*args)
def _eval_power(self, s):
return self.func(*[(e**s, c) for e, c in self.args])
def _eval_subs(self, old, new):
# this is strictly not necessary, but we can keep track
# of whether True or False conditions arise and be
# somewhat more efficient by avoiding other substitutions
# and avoiding invalid conditions that appear after a
# True condition
args = list(self.args)
args_exist = False
for i, (e, c) in enumerate(args):
c = c._subs(old, new)
if c != False:
args_exist = True
e = e._subs(old, new)
args[i] = (e, c)
if c == True:
break
if not args_exist:
args = ((Undefined, True),)
return self.func(*args)
def _eval_transpose(self):
return self.func(*[(e.transpose(), c) for e, c in self.args])
def _eval_template_is_attr(self, is_attr):
b = None
for expr, _ in self.args:
a = getattr(expr, is_attr)
if a is None:
return
if b is None:
b = a
elif b is not a:
return
return b
_eval_is_finite = lambda self: self._eval_template_is_attr(
'is_finite')
_eval_is_complex = lambda self: self._eval_template_is_attr('is_complex')
_eval_is_even = lambda self: self._eval_template_is_attr('is_even')
_eval_is_imaginary = lambda self: self._eval_template_is_attr(
'is_imaginary')
_eval_is_integer = lambda self: self._eval_template_is_attr('is_integer')
_eval_is_irrational = lambda self: self._eval_template_is_attr(
'is_irrational')
_eval_is_negative = lambda self: self._eval_template_is_attr('is_negative')
_eval_is_nonnegative = lambda self: self._eval_template_is_attr(
'is_nonnegative')
_eval_is_nonpositive = lambda self: self._eval_template_is_attr(
'is_nonpositive')
_eval_is_nonzero = lambda self: self._eval_template_is_attr(
'is_nonzero')
_eval_is_odd = lambda self: self._eval_template_is_attr('is_odd')
_eval_is_polar = lambda self: self._eval_template_is_attr('is_polar')
_eval_is_positive = lambda self: self._eval_template_is_attr('is_positive')
_eval_is_extended_real = lambda self: self._eval_template_is_attr(
'is_extended_real')
_eval_is_extended_positive = lambda self: self._eval_template_is_attr(
'is_extended_positive')
_eval_is_extended_negative = lambda self: self._eval_template_is_attr(
'is_extended_negative')
_eval_is_extended_nonzero = lambda self: self._eval_template_is_attr(
'is_extended_nonzero')
_eval_is_extended_nonpositive = lambda self: self._eval_template_is_attr(
'is_extended_nonpositive')
_eval_is_extended_nonnegative = lambda self: self._eval_template_is_attr(
'is_extended_nonnegative')
_eval_is_real = lambda self: self._eval_template_is_attr('is_real')
_eval_is_zero = lambda self: self._eval_template_is_attr(
'is_zero')
@classmethod
def __eval_cond(cls, cond):
"""Return the truth value of the condition."""
if cond == True:
return True
if isinstance(cond, Equality):
try:
diff = cond.lhs - cond.rhs
if diff.is_commutative:
return diff.is_zero
except TypeError:
pass
def as_expr_set_pairs(self, domain=S.Reals):
"""Return tuples for each argument of self that give
the expression and the interval in which it is valid
which is contained within the given domain.
If a condition cannot be converted to a set, an error
will be raised. The variable of the conditions is
assumed to be real; sets of real values are returned.
Examples
========
>>> from sympy import Piecewise, Interval
>>> from sympy.abc import x
>>> p = Piecewise(
... (1, x < 2),
... (2,(x > 0) & (x < 4)),
... (3, True))
>>> p.as_expr_set_pairs()
[(1, Interval.open(-oo, 2)),
(2, Interval.Ropen(2, 4)),
(3, Interval(4, oo))]
>>> p.as_expr_set_pairs(Interval(0, 3))
[(1, Interval.Ropen(0, 2)),
(2, Interval(2, 3)), (3, EmptySet)]
"""
exp_sets = []
U = domain
complex = not domain.is_subset(S.Reals)
cond_free = set()
for expr, cond in self.args:
cond_free |= cond.free_symbols
if len(cond_free) > 1:
raise NotImplementedError(filldedent('''
multivariate conditions are not handled.'''))
if complex:
for i in cond.atoms(Relational):
if not isinstance(i, (Equality, Unequality)):
raise ValueError(filldedent('''
Inequalities in the complex domain are
not supported. Try the real domain by
setting domain=S.Reals'''))
cond_int = U.intersect(cond.as_set())
U = U - cond_int
exp_sets.append((expr, cond_int))
return exp_sets
def _eval_rewrite_as_ITE(self, *args, **kwargs):
byfree = {}
args = list(args)
default = any(c == True for b, c in args)
for i, (b, c) in enumerate(args):
if not isinstance(b, Boolean) and b != True:
raise TypeError(filldedent('''
Expecting Boolean or bool but got `%s`
''' % func_name(b)))
if c == True:
break
# loop over independent conditions for this b
for c in c.args if isinstance(c, Or) else [c]:
free = c.free_symbols
x = free.pop()
try:
byfree[x] = byfree.setdefault(
x, S.EmptySet).union(c.as_set())
except NotImplementedError:
if not default:
raise NotImplementedError(filldedent('''
A method to determine whether a multivariate
conditional is consistent with a complete coverage
of all variables has not been implemented so the
rewrite is being stopped after encountering `%s`.
This error would not occur if a default expression
like `(foo, True)` were given.
''' % c))
if byfree[x] in (S.UniversalSet, S.Reals):
# collapse the ith condition to True and break
args[i] = list(args[i])
c = args[i][1] = True
break
if c == True:
break
if c != True:
raise ValueError(filldedent('''
Conditions must cover all reals or a final default
condition `(foo, True)` must be given.
'''))
last, _ = args[i] # ignore all past ith arg
for a, c in reversed(args[:i]):
last = ITE(c, a, last)
return _canonical(last)
def _eval_rewrite_as_KroneckerDelta(self, *args):
from sympy import Ne, Eq, Not, KroneckerDelta
rules = {
And: [False, False],
Or: [True, True],
Not: [True, False],
Eq: [None, None],
Ne: [None, None]
}
class UnrecognizedCondition(Exception):
pass
def rewrite(cond):
if isinstance(cond, Eq):
return KroneckerDelta(*cond.args)
if isinstance(cond, Ne):
return 1 - KroneckerDelta(*cond.args)
cls, args = type(cond), cond.args
if cls not in rules:
raise UnrecognizedCondition(cls)
b1, b2 = rules[cls]
k = 1
for c in args:
if b1:
k *= 1 - rewrite(c)
else:
k *= rewrite(c)
if b2:
return 1 - k
return k
conditions = []
true_value = None
for value, cond in args:
if type(cond) in rules:
conditions.append((value, cond))
elif cond is S.true:
if true_value is None:
true_value = value
else:
return
if true_value is not None:
result = true_value
for value, cond in conditions[::-1]:
try:
k = rewrite(cond)
result = k * value + (1 - k) * result
except UnrecognizedCondition:
return
return result
def piecewise_fold(expr):
"""
Takes an expression containing a piecewise function and returns the
expression in piecewise form. In addition, any ITE conditions are
rewritten in negation normal form and simplified.
Examples
========
>>> from sympy import Piecewise, piecewise_fold, sympify as S
>>> from sympy.abc import x
>>> p = Piecewise((x, x < 1), (1, S(1) <= x))
>>> piecewise_fold(x*p)
Piecewise((x**2, x < 1), (x, True))
See Also
========
Piecewise
"""
if not isinstance(expr, Basic) or not expr.has(Piecewise):
return expr
new_args = []
if isinstance(expr, (ExprCondPair, Piecewise)):
for e, c in expr.args:
if not isinstance(e, Piecewise):
e = piecewise_fold(e)
# we don't keep Piecewise in condition because
# it has to be checked to see that it's complete
# and we convert it to ITE at that time
assert not c.has(Piecewise) # pragma: no cover
if isinstance(c, ITE):
c = c.to_nnf()
c = simplify_logic(c, form='cnf')
if isinstance(e, Piecewise):
new_args.extend([(piecewise_fold(ei), And(ci, c))
for ei, ci in e.args])
else:
new_args.append((e, c))
else:
from sympy.utilities.iterables import cartes, sift, common_prefix
# Given
# P1 = Piecewise((e11, c1), (e12, c2), A)
# P2 = Piecewise((e21, c1), (e22, c2), B)
# ...
# the folding of f(P1, P2) is trivially
# Piecewise(
# (f(e11, e21), c1),
# (f(e12, e22), c2),
# (f(Piecewise(A), Piecewise(B)), True))
# Certain objects end up rewriting themselves as thus, so
# we do that grouping before the more generic folding.
# The following applies this idea when f = Add or f = Mul
# (and the expression is commutative).
if expr.is_Add or expr.is_Mul and expr.is_commutative:
p, args = sift(expr.args, lambda x: x.is_Piecewise, binary=True)
pc = sift(p, lambda x: tuple([c for e,c in x.args]))
for c in list(ordered(pc)):
if len(pc[c]) > 1:
pargs = [list(i.args) for i in pc[c]]
# the first one is the same; there may be more
com = common_prefix(*[
[i.cond for i in j] for j in pargs])
n = len(com)
collected = []
for i in range(n):
collected.append((
expr.func(*[ai[i].expr for ai in pargs]),
com[i]))
remains = []
for a in pargs:
if n == len(a): # no more args
continue
if a[n].cond == True: # no longer Piecewise
remains.append(a[n].expr)
else: # restore the remaining Piecewise
remains.append(
Piecewise(*a[n:], evaluate=False))
if remains:
collected.append((expr.func(*remains), True))
args.append(Piecewise(*collected, evaluate=False))
continue
args.extend(pc[c])
else:
args = expr.args
# fold
folded = list(map(piecewise_fold, args))
for ec in cartes(*[
(i.args if isinstance(i, Piecewise) else
[(i, true)]) for i in folded]):
e, c = zip(*ec)
new_args.append((expr.func(*e), And(*c)))
return Piecewise(*new_args)
def _clip(A, B, k):
"""Return interval B as intervals that are covered by A (keyed
to k) and all other intervals of B not covered by A keyed to -1.
The reference point of each interval is the rhs; if the lhs is
greater than the rhs then an interval of zero width interval will
result, e.g. (4, 1) is treated like (1, 1).
Examples
========
>>> from sympy.functions.elementary.piecewise import _clip
>>> from sympy import Tuple
>>> A = Tuple(1, 3)
>>> B = Tuple(2, 4)
>>> _clip(A, B, 0)
[(2, 3, 0), (3, 4, -1)]
Interpretation: interval portion (2, 3) of interval (2, 4) is
covered by interval (1, 3) and is keyed to 0 as requested;
interval (3, 4) was not covered by (1, 3) and is keyed to -1.
"""
a, b = B
c, d = A
c, d = Min(Max(c, a), b), Min(Max(d, a), b)
a, b = Min(a, b), b
p = []
if a != c:
p.append((a, c, -1))
else:
pass
if c != d:
p.append((c, d, k))
else:
pass
if b != d:
if d == c and p and p[-1][-1] == -1:
p[-1] = p[-1][0], b, -1
else:
p.append((d, b, -1))
else:
pass
return p
def piecewise_simplify_arguments(expr, **kwargs):
from sympy import simplify
args = []
for e, c in expr.args:
if isinstance(e, Basic):
doit = kwargs.pop('doit', None)
# Skip doit to avoid growth at every call for some integrals
# and sums, see sympy/sympy#17165
newe = simplify(e, doit=False, **kwargs)
if newe != expr:
e = newe
if isinstance(c, Basic):
c = simplify(c, doit=doit, **kwargs)
args.append((e, c))
return Piecewise(*args)
def piecewise_simplify(expr, **kwargs):
expr = piecewise_simplify_arguments(expr, **kwargs)
if not isinstance(expr, Piecewise):
return expr
args = list(expr.args)
_blessed = lambda e: getattr(e.lhs, '_diff_wrt', False) and (
getattr(e.rhs, '_diff_wrt', None) or
isinstance(e.rhs, (Rational, NumberSymbol)))
for i, (expr, cond) in enumerate(args):
# try to simplify conditions and the expression for
# equalities that are part of the condition, e.g.
# Piecewise((n, And(Eq(n,0), Eq(n + m, 0))), (1, True))
# -> Piecewise((0, And(Eq(n, 0), Eq(m, 0))), (1, True))
if isinstance(cond, And):
eqs, other = sift(cond.args,
lambda i: isinstance(i, Equality), binary=True)
elif isinstance(cond, Equality):
eqs, other = [cond], []
else:
eqs = other = []
if eqs:
eqs = list(ordered(eqs))
for j, e in enumerate(eqs):
# these blessed lhs objects behave like Symbols
# and the rhs are simple replacements for the "symbols"
if _blessed(e):
expr = expr.subs(*e.args)
eqs[j + 1:] = [ei.subs(*e.args) for ei in eqs[j + 1:]]
other = [ei.subs(*e.args) for ei in other]
cond = And(*(eqs + other))
args[i] = args[i].func(expr, cond)
# See if expressions valid for an Equal expression happens to evaluate
# to the same function as in the next piecewise segment, see:
# https://github.com/sympy/sympy/issues/8458
prevexpr = None
for i, (expr, cond) in reversed(list(enumerate(args))):
if prevexpr is not None:
if isinstance(cond, And):
eqs, other = sift(cond.args,
lambda i: isinstance(i, Equality), binary=True)
elif isinstance(cond, Equality):
eqs, other = [cond], []
else:
eqs = other = []
_prevexpr = prevexpr
_expr = expr
if eqs and not other:
eqs = list(ordered(eqs))
for e in eqs:
# these blessed lhs objects behave like Symbols
# and the rhs are simple replacements for the "symbols"
if _blessed(e):
_prevexpr = _prevexpr.subs(*e.args)
_expr = _expr.subs(*e.args)
# Did it evaluate to the same?
if _prevexpr == _expr:
# Set the expression for the Not equal section to the same
# as the next. These will be merged when creating the new
# Piecewise
args[i] = args[i].func(args[i+1][0], cond)
else:
# Update the expression that we compare against
prevexpr = expr
else:
prevexpr = expr
return Piecewise(*args)
|
9c1a65b2ec608be7b8b42ab05e5277cd98b6da15a42d6ae61b116368e127bc01
|
from sympy.core import Add, S
from sympy.core.evalf import get_integer_part, PrecisionExhausted
from sympy.core.function import Function
from sympy.core.logic import fuzzy_or
from sympy.core.numbers import Integer
from sympy.core.relational import Gt, Lt, Ge, Le, Relational
from sympy.core.symbol import Symbol
from sympy.core.sympify import _sympify
###############################################################################
######################### FLOOR and CEILING FUNCTIONS #########################
###############################################################################
class RoundFunction(Function):
"""The base class for rounding functions."""
@classmethod
def eval(cls, arg):
from sympy import im
v = cls._eval_number(arg)
if v is not None:
return v
if arg.is_integer or arg.is_finite is False:
return arg
if arg.is_imaginary or (S.ImaginaryUnit*arg).is_real:
i = im(arg)
if not i.has(S.ImaginaryUnit):
return cls(i)*S.ImaginaryUnit
return cls(arg, evaluate=False)
# Integral, numerical, symbolic part
ipart = npart = spart = S.Zero
# Extract integral (or complex integral) terms
terms = Add.make_args(arg)
for t in terms:
if t.is_integer or (t.is_imaginary and im(t).is_integer):
ipart += t
elif t.has(Symbol):
spart += t
else:
npart += t
if not (npart or spart):
return ipart
# Evaluate npart numerically if independent of spart
if npart and (
not spart or
npart.is_real and (spart.is_imaginary or (S.ImaginaryUnit*spart).is_real) or
npart.is_imaginary and spart.is_real):
try:
r, i = get_integer_part(
npart, cls._dir, {}, return_ints=True)
ipart += Integer(r) + Integer(i)*S.ImaginaryUnit
npart = S.Zero
except (PrecisionExhausted, NotImplementedError):
pass
spart += npart
if not spart:
return ipart
elif spart.is_imaginary or (S.ImaginaryUnit*spart).is_real:
return ipart + cls(im(spart), evaluate=False)*S.ImaginaryUnit
elif isinstance(spart, (floor, ceiling)):
return ipart + spart
else:
return ipart + cls(spart, evaluate=False)
def _eval_is_finite(self):
return self.args[0].is_finite
def _eval_is_real(self):
return self.args[0].is_real
def _eval_is_integer(self):
return self.args[0].is_real
class floor(RoundFunction):
"""
Floor is a univariate function which returns the largest integer
value not greater than its argument. This implementation
generalizes floor to complex numbers by taking the floor of the
real and imaginary parts separately.
Examples
========
>>> from sympy import floor, E, I, S, Float, Rational
>>> floor(17)
17
>>> floor(Rational(23, 10))
2
>>> floor(2*E)
5
>>> floor(-Float(0.567))
-1
>>> floor(-I/2)
-I
>>> floor(S(5)/2 + 5*I/2)
2 + 2*I
See Also
========
sympy.functions.elementary.integers.ceiling
References
==========
.. [1] "Concrete mathematics" by Graham, pp. 87
.. [2] http://mathworld.wolfram.com/FloorFunction.html
"""
_dir = -1
@classmethod
def _eval_number(cls, arg):
if arg.is_Number:
return arg.floor()
elif any(isinstance(i, j)
for i in (arg, -arg) for j in (floor, ceiling)):
return arg
if arg.is_NumberSymbol:
return arg.approximation_interval(Integer)[0]
def _eval_nseries(self, x, n, logx, cdir=0):
r = self.subs(x, 0)
args = self.args[0]
args0 = args.subs(x, 0)
if args0 == r:
direction = (args - args0).leadterm(x)[0]
if direction.is_positive:
return r
else:
return r - 1
else:
return r
def _eval_is_negative(self):
return self.args[0].is_negative
def _eval_is_nonnegative(self):
return self.args[0].is_nonnegative
def _eval_rewrite_as_ceiling(self, arg, **kwargs):
return -ceiling(-arg)
def _eval_rewrite_as_frac(self, arg, **kwargs):
return arg - frac(arg)
def _eval_Eq(self, other):
if isinstance(self, floor):
if (self.rewrite(ceiling) == other) or \
(self.rewrite(frac) == other):
return S.true
def __le__(self, other):
other = S(other)
if self.args[0].is_real:
if other.is_integer:
return self.args[0] < other + 1
if other.is_number and other.is_real:
return self.args[0] < ceiling(other)
if self.args[0] == other and other.is_real:
return S.true
if other is S.Infinity and self.is_finite:
return S.true
return Le(self, other, evaluate=False)
def __ge__(self, other):
other = S(other)
if self.args[0].is_real:
if other.is_integer:
return self.args[0] >= other
if other.is_number and other.is_real:
return self.args[0] >= ceiling(other)
if self.args[0] == other and other.is_real:
return S.false
if other is S.NegativeInfinity and self.is_finite:
return S.true
return Ge(self, other, evaluate=False)
def __gt__(self, other):
other = S(other)
if self.args[0].is_real:
if other.is_integer:
return self.args[0] >= other + 1
if other.is_number and other.is_real:
return self.args[0] >= ceiling(other)
if self.args[0] == other and other.is_real:
return S.false
if other is S.NegativeInfinity and self.is_finite:
return S.true
return Gt(self, other, evaluate=False)
def __lt__(self, other):
other = S(other)
if self.args[0].is_real:
if other.is_integer:
return self.args[0] < other
if other.is_number and other.is_real:
return self.args[0] < ceiling(other)
if self.args[0] == other and other.is_real:
return S.false
if other is S.Infinity and self.is_finite:
return S.true
return Lt(self, other, evaluate=False)
class ceiling(RoundFunction):
"""
Ceiling is a univariate function which returns the smallest integer
value not less than its argument. This implementation
generalizes ceiling to complex numbers by taking the ceiling of the
real and imaginary parts separately.
Examples
========
>>> from sympy import ceiling, E, I, S, Float, Rational
>>> ceiling(17)
17
>>> ceiling(Rational(23, 10))
3
>>> ceiling(2*E)
6
>>> ceiling(-Float(0.567))
0
>>> ceiling(I/2)
I
>>> ceiling(S(5)/2 + 5*I/2)
3 + 3*I
See Also
========
sympy.functions.elementary.integers.floor
References
==========
.. [1] "Concrete mathematics" by Graham, pp. 87
.. [2] http://mathworld.wolfram.com/CeilingFunction.html
"""
_dir = 1
@classmethod
def _eval_number(cls, arg):
if arg.is_Number:
return arg.ceiling()
elif any(isinstance(i, j)
for i in (arg, -arg) for j in (floor, ceiling)):
return arg
if arg.is_NumberSymbol:
return arg.approximation_interval(Integer)[1]
def _eval_nseries(self, x, n, logx, cdir=0):
r = self.subs(x, 0)
args = self.args[0]
args0 = args.subs(x, 0)
if args0 == r:
direction = (args - args0).leadterm(x)[0]
if direction.is_positive:
return r + 1
else:
return r
else:
return r
def _eval_rewrite_as_floor(self, arg, **kwargs):
return -floor(-arg)
def _eval_rewrite_as_frac(self, arg, **kwargs):
return arg + frac(-arg)
def _eval_is_positive(self):
return self.args[0].is_positive
def _eval_is_nonpositive(self):
return self.args[0].is_nonpositive
def _eval_Eq(self, other):
if isinstance(self, ceiling):
if (self.rewrite(floor) == other) or \
(self.rewrite(frac) == other):
return S.true
def __lt__(self, other):
other = S(other)
if self.args[0].is_real:
if other.is_integer:
return self.args[0] <= other - 1
if other.is_number and other.is_real:
return self.args[0] <= floor(other)
if self.args[0] == other and other.is_real:
return S.false
if other is S.Infinity and self.is_finite:
return S.true
return Lt(self, other, evaluate=False)
def __gt__(self, other):
other = S(other)
if self.args[0].is_real:
if other.is_integer:
return self.args[0] > other
if other.is_number and other.is_real:
return self.args[0] > floor(other)
if self.args[0] == other and other.is_real:
return S.false
if other is S.NegativeInfinity and self.is_finite:
return S.true
return Gt(self, other, evaluate=False)
def __ge__(self, other):
other = S(other)
if self.args[0].is_real:
if other.is_integer:
return self.args[0] > other - 1
if other.is_number and other.is_real:
return self.args[0] > floor(other)
if self.args[0] == other and other.is_real:
return S.true
if other is S.NegativeInfinity and self.is_finite:
return S.true
return Ge(self, other, evaluate=False)
def __le__(self, other):
other = S(other)
if self.args[0].is_real:
if other.is_integer:
return self.args[0] <= other
if other.is_number and other.is_real:
return self.args[0] <= floor(other)
if self.args[0] == other and other.is_real:
return S.false
if other is S.Infinity and self.is_finite:
return S.true
return Le(self, other, evaluate=False)
class frac(Function):
r"""Represents the fractional part of x
For real numbers it is defined [1]_ as
.. math::
x - \left\lfloor{x}\right\rfloor
Examples
========
>>> from sympy import Symbol, frac, Rational, floor, I
>>> frac(Rational(4, 3))
1/3
>>> frac(-Rational(4, 3))
2/3
returns zero for integer arguments
>>> n = Symbol('n', integer=True)
>>> frac(n)
0
rewrite as floor
>>> x = Symbol('x')
>>> frac(x).rewrite(floor)
x - floor(x)
for complex arguments
>>> r = Symbol('r', real=True)
>>> t = Symbol('t', real=True)
>>> frac(t + I*r)
I*frac(r) + frac(t)
See Also
========
sympy.functions.elementary.integers.floor
sympy.functions.elementary.integers.ceiling
References
===========
.. [1] https://en.wikipedia.org/wiki/Fractional_part
.. [2] http://mathworld.wolfram.com/FractionalPart.html
"""
@classmethod
def eval(cls, arg):
from sympy import AccumBounds, im
def _eval(arg):
if arg is S.Infinity or arg is S.NegativeInfinity:
return AccumBounds(0, 1)
if arg.is_integer:
return S.Zero
if arg.is_number:
if arg is S.NaN:
return S.NaN
elif arg is S.ComplexInfinity:
return S.NaN
else:
return arg - floor(arg)
return cls(arg, evaluate=False)
terms = Add.make_args(arg)
real, imag = S.Zero, S.Zero
for t in terms:
# Two checks are needed for complex arguments
# see issue-7649 for details
if t.is_imaginary or (S.ImaginaryUnit*t).is_real:
i = im(t)
if not i.has(S.ImaginaryUnit):
imag += i
else:
real += t
else:
real += t
real = _eval(real)
imag = _eval(imag)
return real + S.ImaginaryUnit*imag
def _eval_rewrite_as_floor(self, arg, **kwargs):
return arg - floor(arg)
def _eval_rewrite_as_ceiling(self, arg, **kwargs):
return arg + ceiling(-arg)
def _eval_Eq(self, other):
if isinstance(self, frac):
if (self.rewrite(floor) == other) or \
(self.rewrite(ceiling) == other):
return S.true
# Check if other < 0
if other.is_extended_negative:
return S.false
# Check if other >= 1
res = self._value_one_or_more(other)
if res is not None:
return S.false
def _eval_is_finite(self):
return True
def _eval_is_real(self):
return self.args[0].is_extended_real
def _eval_is_imaginary(self):
return self.args[0].is_imaginary
def _eval_is_integer(self):
return self.args[0].is_integer
def _eval_is_zero(self):
return fuzzy_or([self.args[0].is_zero, self.args[0].is_integer])
def _eval_is_negative(self):
return False
def __ge__(self, other):
if self.is_extended_real:
other = _sympify(other)
# Check if other <= 0
if other.is_extended_nonpositive:
return S.true
# Check if other >= 1
res = self._value_one_or_more(other)
if res is not None:
return not(res)
return Ge(self, other, evaluate=False)
def __gt__(self, other):
if self.is_extended_real:
other = _sympify(other)
# Check if other < 0
res = self._value_one_or_more(other)
if res is not None:
return not(res)
# Check if other >= 1
if other.is_extended_negative:
return S.true
return Gt(self, other, evaluate=False)
def __le__(self, other):
if self.is_extended_real:
other = _sympify(other)
# Check if other < 0
if other.is_extended_negative:
return S.false
# Check if other >= 1
res = self._value_one_or_more(other)
if res is not None:
return res
return Le(self, other, evaluate=False)
def __lt__(self, other):
if self.is_extended_real:
other = _sympify(other)
# Check if other <= 0
if other.is_extended_nonpositive:
return S.false
# Check if other >= 1
res = self._value_one_or_more(other)
if res is not None:
return res
return Lt(self, other, evaluate=False)
def _value_one_or_more(self, other):
if other.is_extended_real:
if other.is_number:
res = other >= 1
if res and not isinstance(res, Relational):
return S.true
if other.is_integer and other.is_positive:
return S.true
|
8c20a2005b47ba785713590042a739abec0b60ef7f5de62a11116690822b8832
|
from sympy.core import sympify
from sympy.core.add import Add
from sympy.core.cache import cacheit
from sympy.core.function import (Function, ArgumentIndexError, _coeff_isneg,
expand_mul)
from sympy.core.logic import fuzzy_and, fuzzy_not, fuzzy_or
from sympy.core.mul import Mul
from sympy.core.numbers import Integer, Rational
from sympy.core.power import Pow
from sympy.core.singleton import S
from sympy.core.symbol import Wild, Dummy
from sympy.functions.combinatorial.factorials import factorial
from sympy.functions.elementary.miscellaneous import sqrt
from sympy.ntheory import multiplicity, perfect_power
# NOTE IMPORTANT
# The series expansion code in this file is an important part of the gruntz
# algorithm for determining limits. _eval_nseries has to return a generalized
# power series with coefficients in C(log(x), log).
# In more detail, the result of _eval_nseries(self, x, n) must be
# c_0*x**e_0 + ... (finitely many terms)
# where e_i are numbers (not necessarily integers) and c_i involve only
# numbers, the function log, and log(x). [This also means it must not contain
# log(x(1+p)), this *has* to be expanded to log(x)+log(1+p) if x.is_positive and
# p.is_positive.]
class ExpBase(Function):
unbranched = True
_singularities = (S.ComplexInfinity,)
def inverse(self, argindex=1):
"""
Returns the inverse function of ``exp(x)``.
"""
return log
def as_numer_denom(self):
"""
Returns this with a positive exponent as a 2-tuple (a fraction).
Examples
========
>>> from sympy.functions import exp
>>> from sympy.abc import x
>>> exp(-x).as_numer_denom()
(1, exp(x))
>>> exp(x).as_numer_denom()
(exp(x), 1)
"""
# this should be the same as Pow.as_numer_denom wrt
# exponent handling
exp = self.exp
neg_exp = exp.is_negative
if not neg_exp and not (-exp).is_negative:
neg_exp = _coeff_isneg(exp)
if neg_exp:
return S.One, self.func(-exp)
return self, S.One
@property
def exp(self):
"""
Returns the exponent of the function.
"""
return self.args[0]
def as_base_exp(self):
"""
Returns the 2-tuple (base, exponent).
"""
return self.func(1), Mul(*self.args)
def _eval_adjoint(self):
return self.func(self.args[0].adjoint())
def _eval_conjugate(self):
return self.func(self.args[0].conjugate())
def _eval_transpose(self):
return self.func(self.args[0].transpose())
def _eval_is_finite(self):
arg = self.args[0]
if arg.is_infinite:
if arg.is_extended_negative:
return True
if arg.is_extended_positive:
return False
if arg.is_finite:
return True
def _eval_is_rational(self):
s = self.func(*self.args)
if s.func == self.func:
z = s.exp.is_zero
if z:
return True
elif s.exp.is_rational and fuzzy_not(z):
return False
else:
return s.is_rational
def _eval_is_zero(self):
return (self.args[0] is S.NegativeInfinity)
def _eval_power(self, other):
"""exp(arg)**e -> exp(arg*e) if assumptions allow it.
"""
b, e = self.as_base_exp()
return Pow._eval_power(Pow(b, e, evaluate=False), other)
def _eval_expand_power_exp(self, **hints):
from sympy import Sum, Product
arg = self.args[0]
if arg.is_Add and arg.is_commutative:
return Mul.fromiter(self.func(x) for x in arg.args)
elif isinstance(arg, Sum) and arg.is_commutative:
return Product(self.func(arg.function), *arg.limits)
return self.func(arg)
class exp_polar(ExpBase):
r"""
Represent a 'polar number' (see g-function Sphinx documentation).
``exp_polar`` represents the function
`Exp: \mathbb{C} \rightarrow \mathcal{S}`, sending the complex number
`z = a + bi` to the polar number `r = exp(a), \theta = b`. It is one of
the main functions to construct polar numbers.
>>> from sympy import exp_polar, pi, I, exp
The main difference is that polar numbers don't "wrap around" at `2 \pi`:
>>> exp(2*pi*I)
1
>>> exp_polar(2*pi*I)
exp_polar(2*I*pi)
apart from that they behave mostly like classical complex numbers:
>>> exp_polar(2)*exp_polar(3)
exp_polar(5)
See Also
========
sympy.simplify.powsimp.powsimp
polar_lift
periodic_argument
principal_branch
"""
is_polar = True
is_comparable = False # cannot be evalf'd
def _eval_Abs(self): # Abs is never a polar number
from sympy.functions.elementary.complexes import re
return exp(re(self.args[0]))
def _eval_evalf(self, prec):
""" Careful! any evalf of polar numbers is flaky """
from sympy import im, pi, re
i = im(self.args[0])
try:
bad = (i <= -pi or i > pi)
except TypeError:
bad = True
if bad:
return self # cannot evalf for this argument
res = exp(self.args[0])._eval_evalf(prec)
if i > 0 and im(res) < 0:
# i ~ pi, but exp(I*i) evaluated to argument slightly bigger than pi
return re(res)
return res
def _eval_power(self, other):
return self.func(self.args[0]*other)
def _eval_is_extended_real(self):
if self.args[0].is_extended_real:
return True
def as_base_exp(self):
# XXX exp_polar(0) is special!
if self.args[0] == 0:
return self, S.One
return ExpBase.as_base_exp(self)
class exp(ExpBase):
"""
The exponential function, :math:`e^x`.
See Also
========
log
"""
def fdiff(self, argindex=1):
"""
Returns the first derivative of this function.
"""
if argindex == 1:
return self
else:
raise ArgumentIndexError(self, argindex)
def _eval_refine(self, assumptions):
from sympy.assumptions import ask, Q
arg = self.args[0]
if arg.is_Mul:
Ioo = S.ImaginaryUnit*S.Infinity
if arg in [Ioo, -Ioo]:
return S.NaN
coeff = arg.as_coefficient(S.Pi*S.ImaginaryUnit)
if coeff:
if ask(Q.integer(2*coeff)):
if ask(Q.even(coeff)):
return S.One
elif ask(Q.odd(coeff)):
return S.NegativeOne
elif ask(Q.even(coeff + S.Half)):
return -S.ImaginaryUnit
elif ask(Q.odd(coeff + S.Half)):
return S.ImaginaryUnit
@classmethod
def eval(cls, arg):
from sympy.calculus import AccumBounds
from sympy.sets.setexpr import SetExpr
from sympy.matrices.matrices import MatrixBase
from sympy import logcombine
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg.is_zero:
return S.One
elif arg is S.One:
return S.Exp1
elif arg is S.Infinity:
return S.Infinity
elif arg is S.NegativeInfinity:
return S.Zero
elif arg is S.ComplexInfinity:
return S.NaN
elif isinstance(arg, log):
return arg.args[0]
elif isinstance(arg, AccumBounds):
return AccumBounds(exp(arg.min), exp(arg.max))
elif isinstance(arg, SetExpr):
return arg._eval_func(cls)
elif arg.is_Mul:
coeff = arg.as_coefficient(S.Pi*S.ImaginaryUnit)
if coeff:
if (2*coeff).is_integer:
if coeff.is_even:
return S.One
elif coeff.is_odd:
return S.NegativeOne
elif (coeff + S.Half).is_even:
return -S.ImaginaryUnit
elif (coeff + S.Half).is_odd:
return S.ImaginaryUnit
elif coeff.is_Rational:
ncoeff = coeff % 2 # restrict to [0, 2pi)
if ncoeff > 1: # restrict to (-pi, pi]
ncoeff -= 2
if ncoeff != coeff:
return cls(ncoeff*S.Pi*S.ImaginaryUnit)
# Warning: code in risch.py will be very sensitive to changes
# in this (see DifferentialExtension).
# look for a single log factor
coeff, terms = arg.as_coeff_Mul()
# but it can't be multiplied by oo
if coeff in [S.NegativeInfinity, S.Infinity]:
return None
coeffs, log_term = [coeff], None
for term in Mul.make_args(terms):
term_ = logcombine(term)
if isinstance(term_, log):
if log_term is None:
log_term = term_.args[0]
else:
return None
elif term.is_comparable:
coeffs.append(term)
else:
return None
return log_term**Mul(*coeffs) if log_term else None
elif arg.is_Add:
out = []
add = []
argchanged = False
for a in arg.args:
if a is S.One:
add.append(a)
continue
newa = cls(a)
if isinstance(newa, cls):
if newa.args[0] != a:
add.append(newa.args[0])
argchanged = True
else:
add.append(a)
else:
out.append(newa)
if out or argchanged:
return Mul(*out)*cls(Add(*add), evaluate=False)
elif isinstance(arg, MatrixBase):
return arg.exp()
if arg.is_zero:
return S.One
@property
def base(self):
"""
Returns the base of the exponential function.
"""
return S.Exp1
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
"""
Calculates the next term in the Taylor series expansion.
"""
if n < 0:
return S.Zero
if n == 0:
return S.One
x = sympify(x)
if previous_terms:
p = previous_terms[-1]
if p is not None:
return p * x / n
return x**n/factorial(n)
def as_real_imag(self, deep=True, **hints):
"""
Returns this function as a 2-tuple representing a complex number.
Examples
========
>>> from sympy import I
>>> from sympy.abc import x
>>> from sympy.functions import exp
>>> exp(x).as_real_imag()
(exp(re(x))*cos(im(x)), exp(re(x))*sin(im(x)))
>>> exp(1).as_real_imag()
(E, 0)
>>> exp(I).as_real_imag()
(cos(1), sin(1))
>>> exp(1+I).as_real_imag()
(E*cos(1), E*sin(1))
See Also
========
sympy.functions.elementary.complexes.re
sympy.functions.elementary.complexes.im
"""
import sympy
re, im = self.args[0].as_real_imag()
if deep:
re = re.expand(deep, **hints)
im = im.expand(deep, **hints)
cos, sin = sympy.cos(im), sympy.sin(im)
return (exp(re)*cos, exp(re)*sin)
def _eval_subs(self, old, new):
# keep processing of power-like args centralized in Pow
if old.is_Pow: # handle (exp(3*log(x))).subs(x**2, z) -> z**(3/2)
old = exp(old.exp*log(old.base))
elif old is S.Exp1 and new.is_Function:
old = exp
if isinstance(old, exp) or old is S.Exp1:
f = lambda a: Pow(*a.as_base_exp(), evaluate=False) if (
a.is_Pow or isinstance(a, exp)) else a
return Pow._eval_subs(f(self), f(old), new)
if old is exp and not new.is_Function:
return new**self.exp._subs(old, new)
return Function._eval_subs(self, old, new)
def _eval_is_extended_real(self):
if self.args[0].is_extended_real:
return True
elif self.args[0].is_imaginary:
arg2 = -S(2) * S.ImaginaryUnit * self.args[0] / S.Pi
return arg2.is_even
def _eval_is_complex(self):
def complex_extended_negative(arg):
yield arg.is_complex
yield arg.is_extended_negative
return fuzzy_or(complex_extended_negative(self.args[0]))
def _eval_is_algebraic(self):
s = self.func(*self.args)
if s.func == self.func:
if fuzzy_not(self.exp.is_zero):
if self.exp.is_algebraic:
return False
elif (self.exp/S.Pi).is_rational:
return False
else:
return s.is_algebraic
def _eval_is_extended_positive(self):
if self.args[0].is_extended_real:
return not self.args[0] is S.NegativeInfinity
elif self.args[0].is_imaginary:
arg2 = -S.ImaginaryUnit * self.args[0] / S.Pi
return arg2.is_even
def _eval_nseries(self, x, n, logx, cdir=0):
# NOTE Please see the comment at the beginning of this file, labelled
# IMPORTANT.
from sympy import ceiling, limit, oo, Order, powsimp, Wild, expand_complex
arg = self.args[0]
arg_series = arg._eval_nseries(x, n=n, logx=logx)
if arg_series.is_Order:
return 1 + arg_series
arg0 = limit(arg_series.removeO(), x, 0)
if arg0 in [-oo, oo]:
return self
t = Dummy("t")
nterms = n
try:
cf = Order(arg.as_leading_term(x), x).getn()
except NotImplementedError:
cf = 0
if cf and cf > 0:
nterms = ceiling(n/cf)
exp_series = exp(t)._taylor(t, nterms)
r = exp(arg0)*exp_series.subs(t, arg_series - arg0)
if cf and cf > 1:
r += Order((arg_series - arg0)**n, x)/x**((cf-1)*n)
else:
r += Order((arg_series - arg0)**n, x)
r = r.expand()
r = powsimp(r, deep=True, combine='exp')
# powsimp may introduce unexpanded (-1)**Rational; see PR #17201
simplerat = lambda x: x.is_Rational and x.q in [3, 4, 6]
w = Wild('w', properties=[simplerat])
r = r.replace((-1)**w, expand_complex((-1)**w))
return r
def _taylor(self, x, n):
l = []
g = None
for i in range(n):
g = self.taylor_term(i, self.args[0], g)
g = g.nseries(x, n=n)
l.append(g.removeO())
return Add(*l)
def _eval_as_leading_term(self, x, cdir=0):
from sympy import Order
arg = self.args[0]
if arg.is_Add:
return Mul(*[exp(f).as_leading_term(x) for f in arg.args])
arg_1 = arg.as_leading_term(x)
if Order(x, x).contains(arg_1):
return S.One
if Order(1, x).contains(arg_1):
return exp(arg_1)
####################################################
# The correct result here should be 'None'. #
# Indeed arg in not bounded as x tends to 0. #
# Consequently the series expansion does not admit #
# the leading term. #
# For compatibility reasons, the return value here #
# is the original function, i.e. exp(arg), #
# instead of None. #
####################################################
return exp(arg)
def _eval_rewrite_as_sin(self, arg, **kwargs):
from sympy import sin
I = S.ImaginaryUnit
return sin(I*arg + S.Pi/2) - I*sin(I*arg)
def _eval_rewrite_as_cos(self, arg, **kwargs):
from sympy import cos
I = S.ImaginaryUnit
return cos(I*arg) + I*cos(I*arg + S.Pi/2)
def _eval_rewrite_as_tanh(self, arg, **kwargs):
from sympy import tanh
return (1 + tanh(arg/2))/(1 - tanh(arg/2))
def _eval_rewrite_as_sqrt(self, arg, **kwargs):
from sympy.functions.elementary.trigonometric import sin, cos
if arg.is_Mul:
coeff = arg.coeff(S.Pi*S.ImaginaryUnit)
if coeff and coeff.is_number:
cosine, sine = cos(S.Pi*coeff), sin(S.Pi*coeff)
if not isinstance(cosine, cos) and not isinstance (sine, sin):
return cosine + S.ImaginaryUnit*sine
def _eval_rewrite_as_Pow(self, arg, **kwargs):
if arg.is_Mul:
logs = [a for a in arg.args if isinstance(a, log) and len(a.args) == 1]
if logs:
return Pow(logs[0].args[0], arg.coeff(logs[0]))
def match_real_imag(expr):
"""
Try to match expr with a + b*I for real a and b.
``match_real_imag`` returns a tuple containing the real and imaginary
parts of expr or (None, None) if direct matching is not possible. Contrary
to ``re()``, ``im()``, ``as_real_imag()``, this helper won't force things
by returning expressions themselves containing ``re()`` or ``im()`` and it
doesn't expand its argument either.
"""
r_, i_ = expr.as_independent(S.ImaginaryUnit, as_Add=True)
if i_ == 0 and r_.is_real:
return (r_, i_)
i_ = i_.as_coefficient(S.ImaginaryUnit)
if i_ and i_.is_real and r_.is_real:
return (r_, i_)
else:
return (None, None) # simpler to check for than None
class log(Function):
r"""
The natural logarithm function `\ln(x)` or `\log(x)`.
Logarithms are taken with the natural base, `e`. To get
a logarithm of a different base ``b``, use ``log(x, b)``,
which is essentially short-hand for ``log(x)/log(b)``.
``log`` represents the principal branch of the natural
logarithm. As such it has a branch cut along the negative
real axis and returns values having a complex argument in
`(-\pi, \pi]`.
Examples
========
>>> from sympy import log, sqrt, S, I
>>> log(8, 2)
3
>>> log(S(8)/3, 2)
-log(3)/log(2) + 3
>>> log(-1 + I*sqrt(3))
log(2) + 2*I*pi/3
See Also
========
exp
"""
_singularities = (S.Zero, S.ComplexInfinity)
def fdiff(self, argindex=1):
"""
Returns the first derivative of the function.
"""
if argindex == 1:
return 1/self.args[0]
else:
raise ArgumentIndexError(self, argindex)
def inverse(self, argindex=1):
r"""
Returns `e^x`, the inverse function of `\log(x)`.
"""
return exp
@classmethod
def eval(cls, arg, base=None):
from sympy import unpolarify
from sympy.calculus import AccumBounds
from sympy.sets.setexpr import SetExpr
from sympy.functions.elementary.complexes import Abs
arg = sympify(arg)
if base is not None:
base = sympify(base)
if base == 1:
if arg == 1:
return S.NaN
else:
return S.ComplexInfinity
try:
# handle extraction of powers of the base now
# or else expand_log in Mul would have to handle this
n = multiplicity(base, arg)
if n:
return n + log(arg / base**n) / log(base)
else:
return log(arg)/log(base)
except ValueError:
pass
if base is not S.Exp1:
return cls(arg)/cls(base)
else:
return cls(arg)
if arg.is_Number:
if arg.is_zero:
return S.ComplexInfinity
elif arg is S.One:
return S.Zero
elif arg is S.Infinity:
return S.Infinity
elif arg is S.NegativeInfinity:
return S.Infinity
elif arg is S.NaN:
return S.NaN
elif arg.is_Rational and arg.p == 1:
return -cls(arg.q)
I = S.ImaginaryUnit
if isinstance(arg, exp) and arg.args[0].is_extended_real:
return arg.args[0]
elif isinstance(arg, exp) and arg.args[0].is_number:
r_, i_ = match_real_imag(arg.args[0])
if i_ and i_.is_comparable:
i_ %= 2*S.Pi
if i_ > S.Pi:
i_ -= 2*S.Pi
return r_ + expand_mul(i_ * I, deep=False)
elif isinstance(arg, exp_polar):
return unpolarify(arg.exp)
elif isinstance(arg, AccumBounds):
if arg.min.is_positive:
return AccumBounds(log(arg.min), log(arg.max))
else:
return
elif isinstance(arg, SetExpr):
return arg._eval_func(cls)
if arg.is_number:
if arg.is_negative:
return S.Pi * I + cls(-arg)
elif arg is S.ComplexInfinity:
return S.ComplexInfinity
elif arg is S.Exp1:
return S.One
if arg.is_zero:
return S.ComplexInfinity
# don't autoexpand Pow or Mul (see the issue 3351):
if not arg.is_Add:
coeff = arg.as_coefficient(I)
if coeff is not None:
if coeff is S.Infinity:
return S.Infinity
elif coeff is S.NegativeInfinity:
return S.Infinity
elif coeff.is_Rational:
if coeff.is_nonnegative:
return S.Pi * I * S.Half + cls(coeff)
else:
return -S.Pi * I * S.Half + cls(-coeff)
if arg.is_number and arg.is_algebraic:
# Match arg = coeff*(r_ + i_*I) with coeff>0, r_ and i_ real.
coeff, arg_ = arg.as_independent(I, as_Add=False)
if coeff.is_negative:
coeff *= -1
arg_ *= -1
arg_ = expand_mul(arg_, deep=False)
r_, i_ = arg_.as_independent(I, as_Add=True)
i_ = i_.as_coefficient(I)
if coeff.is_real and i_ and i_.is_real and r_.is_real:
if r_.is_zero:
if i_.is_positive:
return S.Pi * I * S.Half + cls(coeff * i_)
elif i_.is_negative:
return -S.Pi * I * S.Half + cls(coeff * -i_)
else:
from sympy.simplify import ratsimp
# Check for arguments involving rational multiples of pi
t = (i_/r_).cancel()
atan_table = {
# first quadrant only
sqrt(3): S.Pi/3,
1: S.Pi/4,
sqrt(5 - 2*sqrt(5)): S.Pi/5,
sqrt(2)*sqrt(5 - sqrt(5))/(1 + sqrt(5)): S.Pi/5,
sqrt(5 + 2*sqrt(5)): S.Pi*Rational(2, 5),
sqrt(2)*sqrt(sqrt(5) + 5)/(-1 + sqrt(5)): S.Pi*Rational(2, 5),
sqrt(3)/3: S.Pi/6,
sqrt(2) - 1: S.Pi/8,
sqrt(2 - sqrt(2))/sqrt(sqrt(2) + 2): S.Pi/8,
sqrt(2) + 1: S.Pi*Rational(3, 8),
sqrt(sqrt(2) + 2)/sqrt(2 - sqrt(2)): S.Pi*Rational(3, 8),
sqrt(1 - 2*sqrt(5)/5): S.Pi/10,
(-sqrt(2) + sqrt(10))/(2*sqrt(sqrt(5) + 5)): S.Pi/10,
sqrt(1 + 2*sqrt(5)/5): S.Pi*Rational(3, 10),
(sqrt(2) + sqrt(10))/(2*sqrt(5 - sqrt(5))): S.Pi*Rational(3, 10),
2 - sqrt(3): S.Pi/12,
(-1 + sqrt(3))/(1 + sqrt(3)): S.Pi/12,
2 + sqrt(3): S.Pi*Rational(5, 12),
(1 + sqrt(3))/(-1 + sqrt(3)): S.Pi*Rational(5, 12)
}
if t in atan_table:
modulus = ratsimp(coeff * Abs(arg_))
if r_.is_positive:
return cls(modulus) + I * atan_table[t]
else:
return cls(modulus) + I * (atan_table[t] - S.Pi)
elif -t in atan_table:
modulus = ratsimp(coeff * Abs(arg_))
if r_.is_positive:
return cls(modulus) + I * (-atan_table[-t])
else:
return cls(modulus) + I * (S.Pi - atan_table[-t])
def as_base_exp(self):
"""
Returns this function in the form (base, exponent).
"""
return self, S.One
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms): # of log(1+x)
r"""
Returns the next term in the Taylor series expansion of `\log(1+x)`.
"""
from sympy import powsimp
if n < 0:
return S.Zero
x = sympify(x)
if n == 0:
return x
if previous_terms:
p = previous_terms[-1]
if p is not None:
return powsimp((-n) * p * x / (n + 1), deep=True, combine='exp')
return (1 - 2*(n % 2)) * x**(n + 1)/(n + 1)
def _eval_expand_log(self, deep=True, **hints):
from sympy import unpolarify, expand_log, factorint
from sympy.concrete import Sum, Product
force = hints.get('force', False)
factor = hints.get('factor', False)
if (len(self.args) == 2):
return expand_log(self.func(*self.args), deep=deep, force=force)
arg = self.args[0]
if arg.is_Integer:
# remove perfect powers
p = perfect_power(arg)
logarg = None
coeff = 1
if p is not False:
arg, coeff = p
logarg = self.func(arg)
# expand as product of its prime factors if factor=True
if factor:
p = factorint(arg)
if arg not in p.keys():
logarg = sum(n*log(val) for val, n in p.items())
if logarg is not None:
return coeff*logarg
elif arg.is_Rational:
return log(arg.p) - log(arg.q)
elif arg.is_Mul:
expr = []
nonpos = []
for x in arg.args:
if force or x.is_positive or x.is_polar:
a = self.func(x)
if isinstance(a, log):
expr.append(self.func(x)._eval_expand_log(**hints))
else:
expr.append(a)
elif x.is_negative:
a = self.func(-x)
expr.append(a)
nonpos.append(S.NegativeOne)
else:
nonpos.append(x)
return Add(*expr) + log(Mul(*nonpos))
elif arg.is_Pow or isinstance(arg, exp):
if force or (arg.exp.is_extended_real and (arg.base.is_positive or ((arg.exp+1)
.is_positive and (arg.exp-1).is_nonpositive))) or arg.base.is_polar:
b = arg.base
e = arg.exp
a = self.func(b)
if isinstance(a, log):
return unpolarify(e) * a._eval_expand_log(**hints)
else:
return unpolarify(e) * a
elif isinstance(arg, Product):
if force or arg.function.is_positive:
return Sum(log(arg.function), *arg.limits)
return self.func(arg)
def _eval_simplify(self, **kwargs):
from sympy.simplify.simplify import expand_log, simplify, inversecombine
if len(self.args) == 2: # it's unevaluated
return simplify(self.func(*self.args), **kwargs)
expr = self.func(simplify(self.args[0], **kwargs))
if kwargs['inverse']:
expr = inversecombine(expr)
expr = expand_log(expr, deep=True)
return min([expr, self], key=kwargs['measure'])
def as_real_imag(self, deep=True, **hints):
"""
Returns this function as a complex coordinate.
Examples
========
>>> from sympy import I
>>> from sympy.abc import x
>>> from sympy.functions import log
>>> log(x).as_real_imag()
(log(Abs(x)), arg(x))
>>> log(I).as_real_imag()
(0, pi/2)
>>> log(1 + I).as_real_imag()
(log(sqrt(2)), pi/4)
>>> log(I*x).as_real_imag()
(log(Abs(x)), arg(I*x))
"""
from sympy import Abs, arg
sarg = self.args[0]
if deep:
sarg = self.args[0].expand(deep, **hints)
abs = Abs(sarg)
if abs == sarg:
return self, S.Zero
arg = arg(sarg)
if hints.get('log', False): # Expand the log
hints['complex'] = False
return (log(abs).expand(deep, **hints), arg)
else:
return log(abs), arg
def _eval_is_rational(self):
s = self.func(*self.args)
if s.func == self.func:
if (self.args[0] - 1).is_zero:
return True
if s.args[0].is_rational and fuzzy_not((self.args[0] - 1).is_zero):
return False
else:
return s.is_rational
def _eval_is_algebraic(self):
s = self.func(*self.args)
if s.func == self.func:
if (self.args[0] - 1).is_zero:
return True
elif fuzzy_not((self.args[0] - 1).is_zero):
if self.args[0].is_algebraic:
return False
else:
return s.is_algebraic
def _eval_is_extended_real(self):
return self.args[0].is_extended_positive
def _eval_is_complex(self):
z = self.args[0]
return fuzzy_and([z.is_complex, fuzzy_not(z.is_zero)])
def _eval_is_finite(self):
arg = self.args[0]
if arg.is_zero:
return False
return arg.is_finite
def _eval_is_extended_positive(self):
return (self.args[0] - 1).is_extended_positive
def _eval_is_zero(self):
return (self.args[0] - 1).is_zero
def _eval_is_extended_nonnegative(self):
return (self.args[0] - 1).is_extended_nonnegative
def _eval_nseries(self, x, n, logx, cdir=0):
# NOTE Please see the comment at the beginning of this file, labelled
# IMPORTANT.
from sympy import im, cancel, I, Order, logcombine
if not logx:
logx = log(x)
if self.args[0] == x:
return logx
arg = self.args[0]
k, l = Wild("k"), Wild("l")
r = arg.match(k*x**l)
if r is not None:
k, l = r[k], r[l]
if l != 0 and not l.has(x) and not k.has(x):
r = log(k) + l*logx # XXX true regardless of assumptions?
return r
# TODO new and probably slow
try:
a, b = arg.leadterm(x)
s = arg.nseries(x, n=n+b, logx=logx)
except (ValueError, NotImplementedError):
s = arg.nseries(x, n=n, logx=logx)
while s.is_Order:
n += 1
s = arg.nseries(x, n=n, logx=logx)
a, b = s.leadterm(x)
p = cancel(s/(a*x**b) - 1)
if p.has(exp):
p = logcombine(p)
g = None
l = []
for i in range(n + 2):
g = log.taylor_term(i, p, g)
g = g.nseries(x, n=n, logx=logx)
l.append(g)
res = log(a) + b*logx
if cdir != 0:
cdir = self.args[0].dir(x, cdir)
if a.is_real and a.is_negative and im(cdir) < 0:
res -= 2*I*S.Pi
return res + Add(*l) + Order(p**n, x)
def _eval_as_leading_term(self, x, cdir=0):
from sympy import I, im
arg = self.args[0].together()
x0 = arg.subs(x, 0)
if x0 is S.One:
return (arg - S.One).as_leading_term(x)
if cdir != 0:
cdir = self.args[0].dir(x, cdir)
if x0.is_real and x0.is_negative and im(cdir) < 0:
return self.func(x0) -2*I*S.Pi
return self.func(arg.as_leading_term(x))
class LambertW(Function):
r"""
The Lambert W function `W(z)` is defined as the inverse
function of `w \exp(w)` [1]_.
In other words, the value of `W(z)` is such that `z = W(z) \exp(W(z))`
for any complex number `z`. The Lambert W function is a multivalued
function with infinitely many branches `W_k(z)`, indexed by
`k \in \mathbb{Z}`. Each branch gives a different solution `w`
of the equation `z = w \exp(w)`.
The Lambert W function has two partially real branches: the
principal branch (`k = 0`) is real for real `z > -1/e`, and the
`k = -1` branch is real for `-1/e < z < 0`. All branches except
`k = 0` have a logarithmic singularity at `z = 0`.
Examples
========
>>> from sympy import LambertW
>>> LambertW(1.2)
0.635564016364870
>>> LambertW(1.2, -1).n()
-1.34747534407696 - 4.41624341514535*I
>>> LambertW(-1).is_real
False
References
==========
.. [1] https://en.wikipedia.org/wiki/Lambert_W_function
"""
@classmethod
def eval(cls, x, k=None):
if k == S.Zero:
return cls(x)
elif k is None:
k = S.Zero
if k.is_zero:
if x.is_zero:
return S.Zero
if x is S.Exp1:
return S.One
if x == -1/S.Exp1:
return S.NegativeOne
if x == -log(2)/2:
return -log(2)
if x == 2*log(2):
return log(2)
if x == -S.Pi/2:
return S.ImaginaryUnit*S.Pi/2
if x == exp(1 + S.Exp1):
return S.Exp1
if x is S.Infinity:
return S.Infinity
if x.is_zero:
return S.Zero
if fuzzy_not(k.is_zero):
if x.is_zero:
return S.NegativeInfinity
if k is S.NegativeOne:
if x == -S.Pi/2:
return -S.ImaginaryUnit*S.Pi/2
elif x == -1/S.Exp1:
return S.NegativeOne
elif x == -2*exp(-2):
return -Integer(2)
def fdiff(self, argindex=1):
"""
Return the first derivative of this function.
"""
x = self.args[0]
if len(self.args) == 1:
if argindex == 1:
return LambertW(x)/(x*(1 + LambertW(x)))
else:
k = self.args[1]
if argindex == 1:
return LambertW(x, k)/(x*(1 + LambertW(x, k)))
raise ArgumentIndexError(self, argindex)
def _eval_is_extended_real(self):
x = self.args[0]
if len(self.args) == 1:
k = S.Zero
else:
k = self.args[1]
if k.is_zero:
if (x + 1/S.Exp1).is_positive:
return True
elif (x + 1/S.Exp1).is_nonpositive:
return False
elif (k + 1).is_zero:
if x.is_negative and (x + 1/S.Exp1).is_positive:
return True
elif x.is_nonpositive or (x + 1/S.Exp1).is_nonnegative:
return False
elif fuzzy_not(k.is_zero) and fuzzy_not((k + 1).is_zero):
if x.is_extended_real:
return False
def _eval_is_finite(self):
return self.args[0].is_finite
def _eval_is_algebraic(self):
s = self.func(*self.args)
if s.func == self.func:
if fuzzy_not(self.args[0].is_zero) and self.args[0].is_algebraic:
return False
else:
return s.is_algebraic
def _eval_nseries(self, x, n, logx, cdir=0):
if len(self.args) == 1:
from sympy import Order, ceiling, expand_multinomial
arg = self.args[0].nseries(x, n=n, logx=logx)
lt = arg.compute_leading_term(x, logx=logx)
lte = 1
if lt.is_Pow:
lte = lt.exp
if ceiling(n/lte) >= 1:
s = Add(*[(-S.One)**(k - 1)*Integer(k)**(k - 2)/
factorial(k - 1)*arg**k for k in range(1, ceiling(n/lte))])
s = expand_multinomial(s)
else:
s = S.Zero
return s + Order(x**n, x)
return super()._eval_nseries(x, n, logx)
def _eval_is_zero(self):
x = self.args[0]
if len(self.args) == 1:
k = S.Zero
else:
k = self.args[1]
if x.is_zero and k.is_zero:
return True
|
f4a332e655bd6e8160edf5d68981b6c70bf7004a92737c1942203d546d2078ab
|
from sympy.core.logic import FuzzyBool
from sympy.core import S, sympify, cacheit, pi, I, Rational
from sympy.core.add import Add
from sympy.core.function import Function, ArgumentIndexError, _coeff_isneg
from sympy.functions.combinatorial.factorials import factorial, RisingFactorial
from sympy.functions.elementary.exponential import exp, log, match_real_imag
from sympy.functions.elementary.miscellaneous import sqrt
from sympy.functions.elementary.integers import floor
from sympy.core.logic import fuzzy_or, fuzzy_and
def _rewrite_hyperbolics_as_exp(expr):
expr = sympify(expr)
return expr.xreplace({h: h.rewrite(exp)
for h in expr.atoms(HyperbolicFunction)})
###############################################################################
########################### HYPERBOLIC FUNCTIONS ##############################
###############################################################################
class HyperbolicFunction(Function):
"""
Base class for hyperbolic functions.
See Also
========
sinh, cosh, tanh, coth
"""
unbranched = True
def _peeloff_ipi(arg):
"""
Split ARG into two parts, a "rest" and a multiple of I*pi/2.
This assumes ARG to be an Add.
The multiple of I*pi returned in the second position is always a Rational.
Examples
========
>>> from sympy.functions.elementary.hyperbolic import _peeloff_ipi as peel
>>> from sympy import pi, I
>>> from sympy.abc import x, y
>>> peel(x + I*pi/2)
(x, I*pi/2)
>>> peel(x + I*2*pi/3 + I*pi*y)
(x + I*pi*y + I*pi/6, I*pi/2)
"""
for a in Add.make_args(arg):
if a == S.Pi*S.ImaginaryUnit:
K = S.One
break
elif a.is_Mul:
K, p = a.as_two_terms()
if p == S.Pi*S.ImaginaryUnit and K.is_Rational:
break
else:
return arg, S.Zero
m1 = (K % S.Half)*S.Pi*S.ImaginaryUnit
m2 = K*S.Pi*S.ImaginaryUnit - m1
return arg - m2, m2
class sinh(HyperbolicFunction):
r"""
The hyperbolic sine function, `\frac{e^x - e^{-x}}{2}`.
* sinh(x) -> Returns the hyperbolic sine of x
See Also
========
cosh, tanh, asinh
"""
def fdiff(self, argindex=1):
"""
Returns the first derivative of this function.
"""
if argindex == 1:
return cosh(self.args[0])
else:
raise ArgumentIndexError(self, argindex)
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return asinh
@classmethod
def eval(cls, arg):
from sympy import sin
arg = sympify(arg)
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.Infinity
elif arg is S.NegativeInfinity:
return S.NegativeInfinity
elif arg.is_zero:
return S.Zero
elif arg.is_negative:
return -cls(-arg)
else:
if arg is S.ComplexInfinity:
return S.NaN
i_coeff = arg.as_coefficient(S.ImaginaryUnit)
if i_coeff is not None:
return S.ImaginaryUnit * sin(i_coeff)
else:
if _coeff_isneg(arg):
return -cls(-arg)
if arg.is_Add:
x, m = _peeloff_ipi(arg)
if m:
return sinh(m)*cosh(x) + cosh(m)*sinh(x)
if arg.is_zero:
return S.Zero
if arg.func == asinh:
return arg.args[0]
if arg.func == acosh:
x = arg.args[0]
return sqrt(x - 1) * sqrt(x + 1)
if arg.func == atanh:
x = arg.args[0]
return x/sqrt(1 - x**2)
if arg.func == acoth:
x = arg.args[0]
return 1/(sqrt(x - 1) * sqrt(x + 1))
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
"""
Returns the next term in the Taylor series expansion.
"""
if n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
if len(previous_terms) > 2:
p = previous_terms[-2]
return p * x**2 / (n*(n - 1))
else:
return x**(n) / factorial(n)
def _eval_conjugate(self):
return self.func(self.args[0].conjugate())
def as_real_imag(self, deep=True, **hints):
"""
Returns this function as a complex coordinate.
"""
from sympy import cos, sin
if self.args[0].is_extended_real:
if deep:
hints['complex'] = False
return (self.expand(deep, **hints), S.Zero)
else:
return (self, S.Zero)
if deep:
re, im = self.args[0].expand(deep, **hints).as_real_imag()
else:
re, im = self.args[0].as_real_imag()
return (sinh(re)*cos(im), cosh(re)*sin(im))
def _eval_expand_complex(self, deep=True, **hints):
re_part, im_part = self.as_real_imag(deep=deep, **hints)
return re_part + im_part*S.ImaginaryUnit
def _eval_expand_trig(self, deep=True, **hints):
if deep:
arg = self.args[0].expand(deep, **hints)
else:
arg = self.args[0]
x = None
if arg.is_Add: # TODO, implement more if deep stuff here
x, y = arg.as_two_terms()
else:
coeff, terms = arg.as_coeff_Mul(rational=True)
if coeff is not S.One and coeff.is_Integer and terms is not S.One:
x = terms
y = (coeff - 1)*x
if x is not None:
return (sinh(x)*cosh(y) + sinh(y)*cosh(x)).expand(trig=True)
return sinh(arg)
def _eval_rewrite_as_tractable(self, arg, **kwargs):
return (exp(arg) - exp(-arg)) / 2
def _eval_rewrite_as_exp(self, arg, **kwargs):
return (exp(arg) - exp(-arg)) / 2
def _eval_rewrite_as_cosh(self, arg, **kwargs):
return -S.ImaginaryUnit*cosh(arg + S.Pi*S.ImaginaryUnit/2)
def _eval_rewrite_as_tanh(self, arg, **kwargs):
tanh_half = tanh(S.Half*arg)
return 2*tanh_half/(1 - tanh_half**2)
def _eval_rewrite_as_coth(self, arg, **kwargs):
coth_half = coth(S.Half*arg)
return 2*coth_half/(coth_half**2 - 1)
def _eval_as_leading_term(self, x, cdir=0):
from sympy import Order
arg = self.args[0].as_leading_term(x)
if x in arg.free_symbols and Order(1, x).contains(arg):
return arg
else:
return self.func(arg)
def _eval_is_real(self):
arg = self.args[0]
if arg.is_real:
return True
# if `im` is of the form n*pi
# else, check if it is a number
re, im = arg.as_real_imag()
return (im%pi).is_zero
def _eval_is_extended_real(self):
if self.args[0].is_extended_real:
return True
def _eval_is_positive(self):
if self.args[0].is_extended_real:
return self.args[0].is_positive
def _eval_is_negative(self):
if self.args[0].is_extended_real:
return self.args[0].is_negative
def _eval_is_finite(self):
arg = self.args[0]
return arg.is_finite
def _eval_is_zero(self):
arg = self.args[0]
if arg.is_zero:
return True
class cosh(HyperbolicFunction):
r"""
The hyperbolic cosine function, `\frac{e^x + e^{-x}}{2}`.
* cosh(x) -> Returns the hyperbolic cosine of x
See Also
========
sinh, tanh, acosh
"""
def fdiff(self, argindex=1):
if argindex == 1:
return sinh(self.args[0])
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, arg):
from sympy import cos
arg = sympify(arg)
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.Infinity
elif arg is S.NegativeInfinity:
return S.Infinity
elif arg.is_zero:
return S.One
elif arg.is_negative:
return cls(-arg)
else:
if arg is S.ComplexInfinity:
return S.NaN
i_coeff = arg.as_coefficient(S.ImaginaryUnit)
if i_coeff is not None:
return cos(i_coeff)
else:
if _coeff_isneg(arg):
return cls(-arg)
if arg.is_Add:
x, m = _peeloff_ipi(arg)
if m:
return cosh(m)*cosh(x) + sinh(m)*sinh(x)
if arg.is_zero:
return S.One
if arg.func == asinh:
return sqrt(1 + arg.args[0]**2)
if arg.func == acosh:
return arg.args[0]
if arg.func == atanh:
return 1/sqrt(1 - arg.args[0]**2)
if arg.func == acoth:
x = arg.args[0]
return x/(sqrt(x - 1) * sqrt(x + 1))
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n < 0 or n % 2 == 1:
return S.Zero
else:
x = sympify(x)
if len(previous_terms) > 2:
p = previous_terms[-2]
return p * x**2 / (n*(n - 1))
else:
return x**(n)/factorial(n)
def _eval_conjugate(self):
return self.func(self.args[0].conjugate())
def as_real_imag(self, deep=True, **hints):
from sympy import cos, sin
if self.args[0].is_extended_real:
if deep:
hints['complex'] = False
return (self.expand(deep, **hints), S.Zero)
else:
return (self, S.Zero)
if deep:
re, im = self.args[0].expand(deep, **hints).as_real_imag()
else:
re, im = self.args[0].as_real_imag()
return (cosh(re)*cos(im), sinh(re)*sin(im))
def _eval_expand_complex(self, deep=True, **hints):
re_part, im_part = self.as_real_imag(deep=deep, **hints)
return re_part + im_part*S.ImaginaryUnit
def _eval_expand_trig(self, deep=True, **hints):
if deep:
arg = self.args[0].expand(deep, **hints)
else:
arg = self.args[0]
x = None
if arg.is_Add: # TODO, implement more if deep stuff here
x, y = arg.as_two_terms()
else:
coeff, terms = arg.as_coeff_Mul(rational=True)
if coeff is not S.One and coeff.is_Integer and terms is not S.One:
x = terms
y = (coeff - 1)*x
if x is not None:
return (cosh(x)*cosh(y) + sinh(x)*sinh(y)).expand(trig=True)
return cosh(arg)
def _eval_rewrite_as_tractable(self, arg, **kwargs):
return (exp(arg) + exp(-arg)) / 2
def _eval_rewrite_as_exp(self, arg, **kwargs):
return (exp(arg) + exp(-arg)) / 2
def _eval_rewrite_as_sinh(self, arg, **kwargs):
return -S.ImaginaryUnit*sinh(arg + S.Pi*S.ImaginaryUnit/2)
def _eval_rewrite_as_tanh(self, arg, **kwargs):
tanh_half = tanh(S.Half*arg)**2
return (1 + tanh_half)/(1 - tanh_half)
def _eval_rewrite_as_coth(self, arg, **kwargs):
coth_half = coth(S.Half*arg)**2
return (coth_half + 1)/(coth_half - 1)
def _eval_as_leading_term(self, x, cdir=0):
from sympy import Order
arg = self.args[0].as_leading_term(x)
if x in arg.free_symbols and Order(1, x).contains(arg):
return S.One
else:
return self.func(arg)
def _eval_is_real(self):
arg = self.args[0]
# `cosh(x)` is real for real OR purely imaginary `x`
if arg.is_real or arg.is_imaginary:
return True
# cosh(a+ib) = cos(b)*cosh(a) + i*sin(b)*sinh(a)
# the imaginary part can be an expression like n*pi
# if not, check if the imaginary part is a number
re, im = arg.as_real_imag()
return (im%pi).is_zero
def _eval_is_positive(self):
# cosh(x+I*y) = cos(y)*cosh(x) + I*sin(y)*sinh(x)
# cosh(z) is positive iff it is real and the real part is positive.
# So we need sin(y)*sinh(x) = 0 which gives x=0 or y=n*pi
# Case 1 (y=n*pi): cosh(z) = (-1)**n * cosh(x) -> positive for n even
# Case 2 (x=0): cosh(z) = cos(y) -> positive when cos(y) is positive
z = self.args[0]
x, y = z.as_real_imag()
ymod = y % (2*pi)
yzero = ymod.is_zero
# shortcut if ymod is zero
if yzero:
return True
xzero = x.is_zero
# shortcut x is not zero
if xzero is False:
return yzero
return fuzzy_or([
# Case 1:
yzero,
# Case 2:
fuzzy_and([
xzero,
fuzzy_or([ymod < pi/2, ymod > 3*pi/2])
])
])
def _eval_is_nonnegative(self):
z = self.args[0]
x, y = z.as_real_imag()
ymod = y % (2*pi)
yzero = ymod.is_zero
# shortcut if ymod is zero
if yzero:
return True
xzero = x.is_zero
# shortcut x is not zero
if xzero is False:
return yzero
return fuzzy_or([
# Case 1:
yzero,
# Case 2:
fuzzy_and([
xzero,
fuzzy_or([ymod <= pi/2, ymod >= 3*pi/2])
])
])
def _eval_is_finite(self):
arg = self.args[0]
return arg.is_finite
class tanh(HyperbolicFunction):
r"""
The hyperbolic tangent function, `\frac{\sinh(x)}{\cosh(x)}`.
* tanh(x) -> Returns the hyperbolic tangent of x
See Also
========
sinh, cosh, atanh
"""
def fdiff(self, argindex=1):
if argindex == 1:
return S.One - tanh(self.args[0])**2
else:
raise ArgumentIndexError(self, argindex)
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return atanh
@classmethod
def eval(cls, arg):
from sympy import tan
arg = sympify(arg)
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.One
elif arg is S.NegativeInfinity:
return S.NegativeOne
elif arg.is_zero:
return S.Zero
elif arg.is_negative:
return -cls(-arg)
else:
if arg is S.ComplexInfinity:
return S.NaN
i_coeff = arg.as_coefficient(S.ImaginaryUnit)
if i_coeff is not None:
if _coeff_isneg(i_coeff):
return -S.ImaginaryUnit * tan(-i_coeff)
return S.ImaginaryUnit * tan(i_coeff)
else:
if _coeff_isneg(arg):
return -cls(-arg)
if arg.is_Add:
x, m = _peeloff_ipi(arg)
if m:
tanhm = tanh(m)
if tanhm is S.ComplexInfinity:
return coth(x)
else: # tanhm == 0
return tanh(x)
if arg.is_zero:
return S.Zero
if arg.func == asinh:
x = arg.args[0]
return x/sqrt(1 + x**2)
if arg.func == acosh:
x = arg.args[0]
return sqrt(x - 1) * sqrt(x + 1) / x
if arg.func == atanh:
return arg.args[0]
if arg.func == acoth:
return 1/arg.args[0]
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
from sympy import bernoulli
if n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
a = 2**(n + 1)
B = bernoulli(n + 1)
F = factorial(n + 1)
return a*(a - 1) * B/F * x**n
def _eval_conjugate(self):
return self.func(self.args[0].conjugate())
def as_real_imag(self, deep=True, **hints):
from sympy import cos, sin
if self.args[0].is_extended_real:
if deep:
hints['complex'] = False
return (self.expand(deep, **hints), S.Zero)
else:
return (self, S.Zero)
if deep:
re, im = self.args[0].expand(deep, **hints).as_real_imag()
else:
re, im = self.args[0].as_real_imag()
denom = sinh(re)**2 + cos(im)**2
return (sinh(re)*cosh(re)/denom, sin(im)*cos(im)/denom)
def _eval_rewrite_as_tractable(self, arg, **kwargs):
neg_exp, pos_exp = exp(-arg), exp(arg)
return (pos_exp - neg_exp)/(pos_exp + neg_exp)
def _eval_rewrite_as_exp(self, arg, **kwargs):
neg_exp, pos_exp = exp(-arg), exp(arg)
return (pos_exp - neg_exp)/(pos_exp + neg_exp)
def _eval_rewrite_as_sinh(self, arg, **kwargs):
return S.ImaginaryUnit*sinh(arg)/sinh(S.Pi*S.ImaginaryUnit/2 - arg)
def _eval_rewrite_as_cosh(self, arg, **kwargs):
return S.ImaginaryUnit*cosh(S.Pi*S.ImaginaryUnit/2 - arg)/cosh(arg)
def _eval_rewrite_as_coth(self, arg, **kwargs):
return 1/coth(arg)
def _eval_as_leading_term(self, x, cdir=0):
from sympy import Order
arg = self.args[0].as_leading_term(x)
if x in arg.free_symbols and Order(1, x).contains(arg):
return arg
else:
return self.func(arg)
def _eval_is_real(self):
arg = self.args[0]
if arg.is_real:
return True
re, im = arg.as_real_imag()
# if denom = 0, tanh(arg) = zoo
if re == 0 and im % pi == pi/2:
return None
# check if im is of the form n*pi/2 to make sin(2*im) = 0
# if not, im could be a number, return False in that case
return (im % (pi/2)).is_zero
def _eval_is_extended_real(self):
if self.args[0].is_extended_real:
return True
def _eval_is_positive(self):
if self.args[0].is_extended_real:
return self.args[0].is_positive
def _eval_is_negative(self):
if self.args[0].is_extended_real:
return self.args[0].is_negative
def _eval_is_finite(self):
from sympy import sinh, cos
arg = self.args[0]
re, im = arg.as_real_imag()
denom = cos(im)**2 + sinh(re)**2
if denom == 0:
return False
elif denom.is_number:
return True
if arg.is_extended_real:
return True
def _eval_is_zero(self):
arg = self.args[0]
if arg.is_zero:
return True
class coth(HyperbolicFunction):
r"""
The hyperbolic cotangent function, `\frac{\cosh(x)}{\sinh(x)}`.
* coth(x) -> Returns the hyperbolic cotangent of x
"""
def fdiff(self, argindex=1):
if argindex == 1:
return -1/sinh(self.args[0])**2
else:
raise ArgumentIndexError(self, argindex)
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return acoth
@classmethod
def eval(cls, arg):
from sympy import cot
arg = sympify(arg)
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.One
elif arg is S.NegativeInfinity:
return S.NegativeOne
elif arg.is_zero:
return S.ComplexInfinity
elif arg.is_negative:
return -cls(-arg)
else:
if arg is S.ComplexInfinity:
return S.NaN
i_coeff = arg.as_coefficient(S.ImaginaryUnit)
if i_coeff is not None:
if _coeff_isneg(i_coeff):
return S.ImaginaryUnit * cot(-i_coeff)
return -S.ImaginaryUnit * cot(i_coeff)
else:
if _coeff_isneg(arg):
return -cls(-arg)
if arg.is_Add:
x, m = _peeloff_ipi(arg)
if m:
cothm = coth(m)
if cothm is S.ComplexInfinity:
return coth(x)
else: # cothm == 0
return tanh(x)
if arg.is_zero:
return S.ComplexInfinity
if arg.func == asinh:
x = arg.args[0]
return sqrt(1 + x**2)/x
if arg.func == acosh:
x = arg.args[0]
return x/(sqrt(x - 1) * sqrt(x + 1))
if arg.func == atanh:
return 1/arg.args[0]
if arg.func == acoth:
return arg.args[0]
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
from sympy import bernoulli
if n == 0:
return 1 / sympify(x)
elif n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
B = bernoulli(n + 1)
F = factorial(n + 1)
return 2**(n + 1) * B/F * x**n
def _eval_conjugate(self):
return self.func(self.args[0].conjugate())
def as_real_imag(self, deep=True, **hints):
from sympy import cos, sin
if self.args[0].is_extended_real:
if deep:
hints['complex'] = False
return (self.expand(deep, **hints), S.Zero)
else:
return (self, S.Zero)
if deep:
re, im = self.args[0].expand(deep, **hints).as_real_imag()
else:
re, im = self.args[0].as_real_imag()
denom = sinh(re)**2 + sin(im)**2
return (sinh(re)*cosh(re)/denom, -sin(im)*cos(im)/denom)
def _eval_rewrite_as_tractable(self, arg, **kwargs):
neg_exp, pos_exp = exp(-arg), exp(arg)
return (pos_exp + neg_exp)/(pos_exp - neg_exp)
def _eval_rewrite_as_exp(self, arg, **kwargs):
neg_exp, pos_exp = exp(-arg), exp(arg)
return (pos_exp + neg_exp)/(pos_exp - neg_exp)
def _eval_rewrite_as_sinh(self, arg, **kwargs):
return -S.ImaginaryUnit*sinh(S.Pi*S.ImaginaryUnit/2 - arg)/sinh(arg)
def _eval_rewrite_as_cosh(self, arg, **kwargs):
return -S.ImaginaryUnit*cosh(arg)/cosh(S.Pi*S.ImaginaryUnit/2 - arg)
def _eval_rewrite_as_tanh(self, arg, **kwargs):
return 1/tanh(arg)
def _eval_is_positive(self):
if self.args[0].is_extended_real:
return self.args[0].is_positive
def _eval_is_negative(self):
if self.args[0].is_extended_real:
return self.args[0].is_negative
def _eval_as_leading_term(self, x, cdir=0):
from sympy import Order
arg = self.args[0].as_leading_term(x)
if x in arg.free_symbols and Order(1, x).contains(arg):
return 1/arg
else:
return self.func(arg)
class ReciprocalHyperbolicFunction(HyperbolicFunction):
"""Base class for reciprocal functions of hyperbolic functions. """
#To be defined in class
_reciprocal_of = None
_is_even = None # type: FuzzyBool
_is_odd = None # type: FuzzyBool
@classmethod
def eval(cls, arg):
if arg.could_extract_minus_sign():
if cls._is_even:
return cls(-arg)
if cls._is_odd:
return -cls(-arg)
t = cls._reciprocal_of.eval(arg)
if hasattr(arg, 'inverse') and arg.inverse() == cls:
return arg.args[0]
return 1/t if t is not None else t
def _call_reciprocal(self, method_name, *args, **kwargs):
# Calls method_name on _reciprocal_of
o = self._reciprocal_of(self.args[0])
return getattr(o, method_name)(*args, **kwargs)
def _calculate_reciprocal(self, method_name, *args, **kwargs):
# If calling method_name on _reciprocal_of returns a value != None
# then return the reciprocal of that value
t = self._call_reciprocal(method_name, *args, **kwargs)
return 1/t if t is not None else t
def _rewrite_reciprocal(self, method_name, arg):
# Special handling for rewrite functions. If reciprocal rewrite returns
# unmodified expression, then return None
t = self._call_reciprocal(method_name, arg)
if t is not None and t != self._reciprocal_of(arg):
return 1/t
def _eval_rewrite_as_exp(self, arg, **kwargs):
return self._rewrite_reciprocal("_eval_rewrite_as_exp", arg)
def _eval_rewrite_as_tractable(self, arg, **kwargs):
return self._rewrite_reciprocal("_eval_rewrite_as_tractable", arg)
def _eval_rewrite_as_tanh(self, arg, **kwargs):
return self._rewrite_reciprocal("_eval_rewrite_as_tanh", arg)
def _eval_rewrite_as_coth(self, arg, **kwargs):
return self._rewrite_reciprocal("_eval_rewrite_as_coth", arg)
def as_real_imag(self, deep = True, **hints):
return (1 / self._reciprocal_of(self.args[0])).as_real_imag(deep, **hints)
def _eval_conjugate(self):
return self.func(self.args[0].conjugate())
def _eval_expand_complex(self, deep=True, **hints):
re_part, im_part = self.as_real_imag(deep=True, **hints)
return re_part + S.ImaginaryUnit*im_part
def _eval_as_leading_term(self, x, cdir=0):
return (1/self._reciprocal_of(self.args[0]))._eval_as_leading_term(x)
def _eval_is_extended_real(self):
return self._reciprocal_of(self.args[0]).is_extended_real
def _eval_is_finite(self):
return (1/self._reciprocal_of(self.args[0])).is_finite
class csch(ReciprocalHyperbolicFunction):
r"""
The hyperbolic cosecant function, `\frac{2}{e^x - e^{-x}}`
* csch(x) -> Returns the hyperbolic cosecant of x
See Also
========
sinh, cosh, tanh, sech, asinh, acosh
"""
_reciprocal_of = sinh
_is_odd = True
def fdiff(self, argindex=1):
"""
Returns the first derivative of this function
"""
if argindex == 1:
return -coth(self.args[0]) * csch(self.args[0])
else:
raise ArgumentIndexError(self, argindex)
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
"""
Returns the next term in the Taylor series expansion
"""
from sympy import bernoulli
if n == 0:
return 1/sympify(x)
elif n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
B = bernoulli(n + 1)
F = factorial(n + 1)
return 2 * (1 - 2**n) * B/F * x**n
def _eval_rewrite_as_cosh(self, arg, **kwargs):
return S.ImaginaryUnit / cosh(arg + S.ImaginaryUnit * S.Pi / 2)
def _eval_is_positive(self):
if self.args[0].is_extended_real:
return self.args[0].is_positive
def _eval_is_negative(self):
if self.args[0].is_extended_real:
return self.args[0].is_negative
def _sage_(self):
import sage.all as sage
return sage.csch(self.args[0]._sage_())
class sech(ReciprocalHyperbolicFunction):
r"""
The hyperbolic secant function, `\frac{2}{e^x + e^{-x}}`
* sech(x) -> Returns the hyperbolic secant of x
See Also
========
sinh, cosh, tanh, coth, csch, asinh, acosh
"""
_reciprocal_of = cosh
_is_even = True
def fdiff(self, argindex=1):
if argindex == 1:
return - tanh(self.args[0])*sech(self.args[0])
else:
raise ArgumentIndexError(self, argindex)
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
from sympy.functions.combinatorial.numbers import euler
if n < 0 or n % 2 == 1:
return S.Zero
else:
x = sympify(x)
return euler(n) / factorial(n) * x**(n)
def _eval_rewrite_as_sinh(self, arg, **kwargs):
return S.ImaginaryUnit / sinh(arg + S.ImaginaryUnit * S.Pi /2)
def _eval_is_positive(self):
if self.args[0].is_extended_real:
return True
def _sage_(self):
import sage.all as sage
return sage.sech(self.args[0]._sage_())
###############################################################################
############################# HYPERBOLIC INVERSES #############################
###############################################################################
class InverseHyperbolicFunction(Function):
"""Base class for inverse hyperbolic functions."""
pass
class asinh(InverseHyperbolicFunction):
"""
The inverse hyperbolic sine function.
* asinh(x) -> Returns the inverse hyperbolic sine of x
See Also
========
acosh, atanh, sinh
"""
def fdiff(self, argindex=1):
if argindex == 1:
return 1/sqrt(self.args[0]**2 + 1)
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, arg):
from sympy import asin
arg = sympify(arg)
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.Infinity
elif arg is S.NegativeInfinity:
return S.NegativeInfinity
elif arg.is_zero:
return S.Zero
elif arg is S.One:
return log(sqrt(2) + 1)
elif arg is S.NegativeOne:
return log(sqrt(2) - 1)
elif arg.is_negative:
return -cls(-arg)
else:
if arg is S.ComplexInfinity:
return S.ComplexInfinity
if arg.is_zero:
return S.Zero
i_coeff = arg.as_coefficient(S.ImaginaryUnit)
if i_coeff is not None:
return S.ImaginaryUnit * asin(i_coeff)
else:
if _coeff_isneg(arg):
return -cls(-arg)
if isinstance(arg, sinh) and arg.args[0].is_number:
z = arg.args[0]
if z.is_real:
return z
r, i = match_real_imag(z)
if r is not None and i is not None:
f = floor((i + pi/2)/pi)
m = z - I*pi*f
even = f.is_even
if even is True:
return m
elif even is False:
return -m
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
if len(previous_terms) >= 2 and n > 2:
p = previous_terms[-2]
return -p * (n - 2)**2/(n*(n - 1)) * x**2
else:
k = (n - 1) // 2
R = RisingFactorial(S.Half, k)
F = factorial(k)
return (-1)**k * R / F * x**n / n
def _eval_as_leading_term(self, x, cdir=0):
from sympy import Order
arg = self.args[0].as_leading_term(x)
if x in arg.free_symbols and Order(1, x).contains(arg):
return arg
else:
return self.func(arg)
def _eval_rewrite_as_log(self, x, **kwargs):
return log(x + sqrt(x**2 + 1))
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return sinh
def _eval_is_zero(self):
arg = self.args[0]
if arg.is_zero:
return True
class acosh(InverseHyperbolicFunction):
"""
The inverse hyperbolic cosine function.
* acosh(x) -> Returns the inverse hyperbolic cosine of x
See Also
========
asinh, atanh, cosh
"""
def fdiff(self, argindex=1):
if argindex == 1:
return 1/sqrt(self.args[0]**2 - 1)
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, arg):
arg = sympify(arg)
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.Infinity
elif arg is S.NegativeInfinity:
return S.Infinity
elif arg.is_zero:
return S.Pi*S.ImaginaryUnit / 2
elif arg is S.One:
return S.Zero
elif arg is S.NegativeOne:
return S.Pi*S.ImaginaryUnit
if arg.is_number:
cst_table = {
S.ImaginaryUnit: log(S.ImaginaryUnit*(1 + sqrt(2))),
-S.ImaginaryUnit: log(-S.ImaginaryUnit*(1 + sqrt(2))),
S.Half: S.Pi/3,
Rational(-1, 2): S.Pi*Rational(2, 3),
sqrt(2)/2: S.Pi/4,
-sqrt(2)/2: S.Pi*Rational(3, 4),
1/sqrt(2): S.Pi/4,
-1/sqrt(2): S.Pi*Rational(3, 4),
sqrt(3)/2: S.Pi/6,
-sqrt(3)/2: S.Pi*Rational(5, 6),
(sqrt(3) - 1)/sqrt(2**3): S.Pi*Rational(5, 12),
-(sqrt(3) - 1)/sqrt(2**3): S.Pi*Rational(7, 12),
sqrt(2 + sqrt(2))/2: S.Pi/8,
-sqrt(2 + sqrt(2))/2: S.Pi*Rational(7, 8),
sqrt(2 - sqrt(2))/2: S.Pi*Rational(3, 8),
-sqrt(2 - sqrt(2))/2: S.Pi*Rational(5, 8),
(1 + sqrt(3))/(2*sqrt(2)): S.Pi/12,
-(1 + sqrt(3))/(2*sqrt(2)): S.Pi*Rational(11, 12),
(sqrt(5) + 1)/4: S.Pi/5,
-(sqrt(5) + 1)/4: S.Pi*Rational(4, 5)
}
if arg in cst_table:
if arg.is_extended_real:
return cst_table[arg]*S.ImaginaryUnit
return cst_table[arg]
if arg is S.ComplexInfinity:
return S.ComplexInfinity
if arg == S.ImaginaryUnit*S.Infinity:
return S.Infinity + S.ImaginaryUnit*S.Pi/2
if arg == -S.ImaginaryUnit*S.Infinity:
return S.Infinity - S.ImaginaryUnit*S.Pi/2
if arg.is_zero:
return S.Pi*S.ImaginaryUnit*S.Half
if isinstance(arg, cosh) and arg.args[0].is_number:
z = arg.args[0]
if z.is_real:
from sympy.functions.elementary.complexes import Abs
return Abs(z)
r, i = match_real_imag(z)
if r is not None and i is not None:
f = floor(i/pi)
m = z - I*pi*f
even = f.is_even
if even is True:
if r.is_nonnegative:
return m
elif r.is_negative:
return -m
elif even is False:
m -= I*pi
if r.is_nonpositive:
return -m
elif r.is_positive:
return m
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n == 0:
return S.Pi*S.ImaginaryUnit / 2
elif n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
if len(previous_terms) >= 2 and n > 2:
p = previous_terms[-2]
return p * (n - 2)**2/(n*(n - 1)) * x**2
else:
k = (n - 1) // 2
R = RisingFactorial(S.Half, k)
F = factorial(k)
return -R / F * S.ImaginaryUnit * x**n / n
def _eval_as_leading_term(self, x, cdir=0):
from sympy import Order
arg = self.args[0].as_leading_term(x)
if x in arg.free_symbols and Order(1, x).contains(arg):
return S.ImaginaryUnit*S.Pi/2
else:
return self.func(arg)
def _eval_rewrite_as_log(self, x, **kwargs):
return log(x + sqrt(x + 1) * sqrt(x - 1))
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return cosh
class atanh(InverseHyperbolicFunction):
"""
The inverse hyperbolic tangent function.
* atanh(x) -> Returns the inverse hyperbolic tangent of x
See Also
========
asinh, acosh, tanh
"""
def fdiff(self, argindex=1):
if argindex == 1:
return 1/(1 - self.args[0]**2)
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, arg):
from sympy import atan
arg = sympify(arg)
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg.is_zero:
return S.Zero
elif arg is S.One:
return S.Infinity
elif arg is S.NegativeOne:
return S.NegativeInfinity
elif arg is S.Infinity:
return -S.ImaginaryUnit * atan(arg)
elif arg is S.NegativeInfinity:
return S.ImaginaryUnit * atan(-arg)
elif arg.is_negative:
return -cls(-arg)
else:
if arg is S.ComplexInfinity:
from sympy.calculus.util import AccumBounds
return S.ImaginaryUnit*AccumBounds(-S.Pi/2, S.Pi/2)
i_coeff = arg.as_coefficient(S.ImaginaryUnit)
if i_coeff is not None:
return S.ImaginaryUnit * atan(i_coeff)
else:
if _coeff_isneg(arg):
return -cls(-arg)
if arg.is_zero:
return S.Zero
if isinstance(arg, tanh) and arg.args[0].is_number:
z = arg.args[0]
if z.is_real:
return z
r, i = match_real_imag(z)
if r is not None and i is not None:
f = floor(2*i/pi)
even = f.is_even
m = z - I*f*pi/2
if even is True:
return m
elif even is False:
return m - I*pi/2
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
return x**n / n
def _eval_as_leading_term(self, x, cdir=0):
from sympy import Order
arg = self.args[0].as_leading_term(x)
if x in arg.free_symbols and Order(1, x).contains(arg):
return arg
else:
return self.func(arg)
def _eval_rewrite_as_log(self, x, **kwargs):
return (log(1 + x) - log(1 - x)) / 2
def _eval_is_zero(self):
arg = self.args[0]
if arg.is_zero:
return True
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return tanh
class acoth(InverseHyperbolicFunction):
"""
The inverse hyperbolic cotangent function.
* acoth(x) -> Returns the inverse hyperbolic cotangent of x
"""
def fdiff(self, argindex=1):
if argindex == 1:
return 1/(1 - self.args[0]**2)
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, arg):
from sympy import acot
arg = sympify(arg)
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.Zero
elif arg is S.NegativeInfinity:
return S.Zero
elif arg.is_zero:
return S.Pi*S.ImaginaryUnit / 2
elif arg is S.One:
return S.Infinity
elif arg is S.NegativeOne:
return S.NegativeInfinity
elif arg.is_negative:
return -cls(-arg)
else:
if arg is S.ComplexInfinity:
return S.Zero
i_coeff = arg.as_coefficient(S.ImaginaryUnit)
if i_coeff is not None:
return -S.ImaginaryUnit * acot(i_coeff)
else:
if _coeff_isneg(arg):
return -cls(-arg)
if arg.is_zero:
return S.Pi*S.ImaginaryUnit*S.Half
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n == 0:
return S.Pi*S.ImaginaryUnit / 2
elif n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
return x**n / n
def _eval_as_leading_term(self, x, cdir=0):
from sympy import Order
arg = self.args[0].as_leading_term(x)
if x in arg.free_symbols and Order(1, x).contains(arg):
return S.ImaginaryUnit*S.Pi/2
else:
return self.func(arg)
def _eval_rewrite_as_log(self, x, **kwargs):
return (log(1 + 1/x) - log(1 - 1/x)) / 2
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return coth
class asech(InverseHyperbolicFunction):
"""
The inverse hyperbolic secant function.
* asech(x) -> Returns the inverse hyperbolic secant of x
Examples
========
>>> from sympy import asech, sqrt, S
>>> from sympy.abc import x
>>> asech(x).diff(x)
-1/(x*sqrt(1 - x**2))
>>> asech(1).diff(x)
0
>>> asech(1)
0
>>> asech(S(2))
I*pi/3
>>> asech(-sqrt(2))
3*I*pi/4
>>> asech((sqrt(6) - sqrt(2)))
I*pi/12
See Also
========
asinh, atanh, cosh, acoth
References
==========
.. [1] https://en.wikipedia.org/wiki/Hyperbolic_function
.. [2] http://dlmf.nist.gov/4.37
.. [3] http://functions.wolfram.com/ElementaryFunctions/ArcSech/
"""
def fdiff(self, argindex=1):
if argindex == 1:
z = self.args[0]
return -1/(z*sqrt(1 - z**2))
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, arg):
arg = sympify(arg)
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.Pi*S.ImaginaryUnit / 2
elif arg is S.NegativeInfinity:
return S.Pi*S.ImaginaryUnit / 2
elif arg.is_zero:
return S.Infinity
elif arg is S.One:
return S.Zero
elif arg is S.NegativeOne:
return S.Pi*S.ImaginaryUnit
if arg.is_number:
cst_table = {
S.ImaginaryUnit: - (S.Pi*S.ImaginaryUnit / 2) + log(1 + sqrt(2)),
-S.ImaginaryUnit: (S.Pi*S.ImaginaryUnit / 2) + log(1 + sqrt(2)),
(sqrt(6) - sqrt(2)): S.Pi / 12,
(sqrt(2) - sqrt(6)): 11*S.Pi / 12,
sqrt(2 - 2/sqrt(5)): S.Pi / 10,
-sqrt(2 - 2/sqrt(5)): 9*S.Pi / 10,
2 / sqrt(2 + sqrt(2)): S.Pi / 8,
-2 / sqrt(2 + sqrt(2)): 7*S.Pi / 8,
2 / sqrt(3): S.Pi / 6,
-2 / sqrt(3): 5*S.Pi / 6,
(sqrt(5) - 1): S.Pi / 5,
(1 - sqrt(5)): 4*S.Pi / 5,
sqrt(2): S.Pi / 4,
-sqrt(2): 3*S.Pi / 4,
sqrt(2 + 2/sqrt(5)): 3*S.Pi / 10,
-sqrt(2 + 2/sqrt(5)): 7*S.Pi / 10,
S(2): S.Pi / 3,
-S(2): 2*S.Pi / 3,
sqrt(2*(2 + sqrt(2))): 3*S.Pi / 8,
-sqrt(2*(2 + sqrt(2))): 5*S.Pi / 8,
(1 + sqrt(5)): 2*S.Pi / 5,
(-1 - sqrt(5)): 3*S.Pi / 5,
(sqrt(6) + sqrt(2)): 5*S.Pi / 12,
(-sqrt(6) - sqrt(2)): 7*S.Pi / 12,
}
if arg in cst_table:
if arg.is_extended_real:
return cst_table[arg]*S.ImaginaryUnit
return cst_table[arg]
if arg is S.ComplexInfinity:
from sympy.calculus.util import AccumBounds
return S.ImaginaryUnit*AccumBounds(-S.Pi/2, S.Pi/2)
if arg.is_zero:
return S.Infinity
@staticmethod
@cacheit
def expansion_term(n, x, *previous_terms):
if n == 0:
return log(2 / x)
elif n < 0 or n % 2 == 1:
return S.Zero
else:
x = sympify(x)
if len(previous_terms) > 2 and n > 2:
p = previous_terms[-2]
return p * (n - 1)**2 // (n // 2)**2 * x**2 / 4
else:
k = n // 2
R = RisingFactorial(S.Half , k) * n
F = factorial(k) * n // 2 * n // 2
return -1 * R / F * x**n / 4
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return sech
def _eval_rewrite_as_log(self, arg, **kwargs):
return log(1/arg + sqrt(1/arg - 1) * sqrt(1/arg + 1))
class acsch(InverseHyperbolicFunction):
"""
The inverse hyperbolic cosecant function.
* acsch(x) -> Returns the inverse hyperbolic cosecant of x
Examples
========
>>> from sympy import acsch, sqrt, S
>>> from sympy.abc import x
>>> acsch(x).diff(x)
-1/(x**2*sqrt(1 + x**(-2)))
>>> acsch(1).diff(x)
0
>>> acsch(1)
log(1 + sqrt(2))
>>> acsch(S.ImaginaryUnit)
-I*pi/2
>>> acsch(-2*S.ImaginaryUnit)
I*pi/6
>>> acsch(S.ImaginaryUnit*(sqrt(6) - sqrt(2)))
-5*I*pi/12
References
==========
.. [1] https://en.wikipedia.org/wiki/Hyperbolic_function
.. [2] http://dlmf.nist.gov/4.37
.. [3] http://functions.wolfram.com/ElementaryFunctions/ArcCsch/
"""
def fdiff(self, argindex=1):
if argindex == 1:
z = self.args[0]
return -1/(z**2*sqrt(1 + 1/z**2))
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, arg):
arg = sympify(arg)
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.Zero
elif arg is S.NegativeInfinity:
return S.Zero
elif arg.is_zero:
return S.ComplexInfinity
elif arg is S.One:
return log(1 + sqrt(2))
elif arg is S.NegativeOne:
return - log(1 + sqrt(2))
if arg.is_number:
cst_table = {
S.ImaginaryUnit: -S.Pi / 2,
S.ImaginaryUnit*(sqrt(2) + sqrt(6)): -S.Pi / 12,
S.ImaginaryUnit*(1 + sqrt(5)): -S.Pi / 10,
S.ImaginaryUnit*2 / sqrt(2 - sqrt(2)): -S.Pi / 8,
S.ImaginaryUnit*2: -S.Pi / 6,
S.ImaginaryUnit*sqrt(2 + 2/sqrt(5)): -S.Pi / 5,
S.ImaginaryUnit*sqrt(2): -S.Pi / 4,
S.ImaginaryUnit*(sqrt(5)-1): -3*S.Pi / 10,
S.ImaginaryUnit*2 / sqrt(3): -S.Pi / 3,
S.ImaginaryUnit*2 / sqrt(2 + sqrt(2)): -3*S.Pi / 8,
S.ImaginaryUnit*sqrt(2 - 2/sqrt(5)): -2*S.Pi / 5,
S.ImaginaryUnit*(sqrt(6) - sqrt(2)): -5*S.Pi / 12,
S(2): -S.ImaginaryUnit*log((1+sqrt(5))/2),
}
if arg in cst_table:
return cst_table[arg]*S.ImaginaryUnit
if arg is S.ComplexInfinity:
return S.Zero
if arg.is_zero:
return S.ComplexInfinity
if _coeff_isneg(arg):
return -cls(-arg)
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return csch
def _eval_rewrite_as_log(self, arg, **kwargs):
return log(1/arg + sqrt(1/arg**2 + 1))
|
c9b4b31dd3100d1e7361ba051386a18ac40ef2426296a85c8a5ae6d0e89c0dfa
|
from sympy.core import S, Add, Mul, sympify, Symbol, Dummy, Basic
from sympy.core.expr import Expr
from sympy.core.exprtools import factor_terms
from sympy.core.function import (Function, Derivative, ArgumentIndexError,
AppliedUndef)
from sympy.core.logic import fuzzy_not, fuzzy_or
from sympy.core.numbers import pi, I, oo
from sympy.core.relational import Eq
from sympy.functions.elementary.exponential import exp, exp_polar, log
from sympy.functions.elementary.integers import ceiling
from sympy.functions.elementary.miscellaneous import sqrt
from sympy.functions.elementary.piecewise import Piecewise
from sympy.functions.elementary.trigonometric import atan, atan2
###############################################################################
######################### REAL and IMAGINARY PARTS ############################
###############################################################################
class re(Function):
"""
Returns real part of expression. This function performs only
elementary analysis and so it will fail to decompose properly
more complicated expressions. If completely simplified result
is needed then use Basic.as_real_imag() or perform complex
expansion on instance of this function.
Examples
========
>>> from sympy import re, im, I, E
>>> from sympy.abc import x
>>> re(2*E)
2*E
>>> re(2*I + 17)
17
>>> re(2*I)
0
>>> re(im(x) + x*I + 2)
2
See Also
========
im
"""
is_extended_real = True
unbranched = True # implicitly works on the projection to C
_singularities = True # non-holomorphic
@classmethod
def eval(cls, arg):
if arg is S.NaN:
return S.NaN
elif arg is S.ComplexInfinity:
return S.NaN
elif arg.is_extended_real:
return arg
elif arg.is_imaginary or (S.ImaginaryUnit*arg).is_extended_real:
return S.Zero
elif arg.is_Matrix:
return arg.as_real_imag()[0]
elif arg.is_Function and isinstance(arg, conjugate):
return re(arg.args[0])
else:
included, reverted, excluded = [], [], []
args = Add.make_args(arg)
for term in args:
coeff = term.as_coefficient(S.ImaginaryUnit)
if coeff is not None:
if not coeff.is_extended_real:
reverted.append(coeff)
elif not term.has(S.ImaginaryUnit) and term.is_extended_real:
excluded.append(term)
else:
# Try to do some advanced expansion. If
# impossible, don't try to do re(arg) again
# (because this is what we are trying to do now).
real_imag = term.as_real_imag(ignore=arg)
if real_imag:
excluded.append(real_imag[0])
else:
included.append(term)
if len(args) != len(included):
a, b, c = (Add(*xs) for xs in [included, reverted, excluded])
return cls(a) - im(b) + c
def as_real_imag(self, deep=True, **hints):
"""
Returns the real number with a zero imaginary part.
"""
return (self, S.Zero)
def _eval_derivative(self, x):
if x.is_extended_real or self.args[0].is_extended_real:
return re(Derivative(self.args[0], x, evaluate=True))
if x.is_imaginary or self.args[0].is_imaginary:
return -S.ImaginaryUnit \
* im(Derivative(self.args[0], x, evaluate=True))
def _eval_rewrite_as_im(self, arg, **kwargs):
return self.args[0] - S.ImaginaryUnit*im(self.args[0])
def _eval_is_algebraic(self):
return self.args[0].is_algebraic
def _eval_is_zero(self):
# is_imaginary implies nonzero
return fuzzy_or([self.args[0].is_imaginary, self.args[0].is_zero])
def _eval_is_finite(self):
if self.args[0].is_finite:
return True
def _eval_is_complex(self):
if self.args[0].is_finite:
return True
def _sage_(self):
import sage.all as sage
return sage.real_part(self.args[0]._sage_())
class im(Function):
"""
Returns imaginary part of expression. This function performs only
elementary analysis and so it will fail to decompose properly more
complicated expressions. If completely simplified result is needed then
use Basic.as_real_imag() or perform complex expansion on instance of
this function.
Examples
========
>>> from sympy import re, im, E, I
>>> from sympy.abc import x, y
>>> im(2*E)
0
>>> re(2*I + 17)
17
>>> im(x*I)
re(x)
>>> im(re(x) + y)
im(y)
See Also
========
re
"""
is_extended_real = True
unbranched = True # implicitly works on the projection to C
_singularities = True # non-holomorphic
@classmethod
def eval(cls, arg):
if arg is S.NaN:
return S.NaN
elif arg is S.ComplexInfinity:
return S.NaN
elif arg.is_extended_real:
return S.Zero
elif arg.is_imaginary or (S.ImaginaryUnit*arg).is_extended_real:
return -S.ImaginaryUnit * arg
elif arg.is_Matrix:
return arg.as_real_imag()[1]
elif arg.is_Function and isinstance(arg, conjugate):
return -im(arg.args[0])
else:
included, reverted, excluded = [], [], []
args = Add.make_args(arg)
for term in args:
coeff = term.as_coefficient(S.ImaginaryUnit)
if coeff is not None:
if not coeff.is_extended_real:
reverted.append(coeff)
else:
excluded.append(coeff)
elif term.has(S.ImaginaryUnit) or not term.is_extended_real:
# Try to do some advanced expansion. If
# impossible, don't try to do im(arg) again
# (because this is what we are trying to do now).
real_imag = term.as_real_imag(ignore=arg)
if real_imag:
excluded.append(real_imag[1])
else:
included.append(term)
if len(args) != len(included):
a, b, c = (Add(*xs) for xs in [included, reverted, excluded])
return cls(a) + re(b) + c
def as_real_imag(self, deep=True, **hints):
"""
Return the imaginary part with a zero real part.
Examples
========
>>> from sympy.functions import im
>>> from sympy import I
>>> im(2 + 3*I).as_real_imag()
(3, 0)
"""
return (self, S.Zero)
def _eval_derivative(self, x):
if x.is_extended_real or self.args[0].is_extended_real:
return im(Derivative(self.args[0], x, evaluate=True))
if x.is_imaginary or self.args[0].is_imaginary:
return -S.ImaginaryUnit \
* re(Derivative(self.args[0], x, evaluate=True))
def _sage_(self):
import sage.all as sage
return sage.imag_part(self.args[0]._sage_())
def _eval_rewrite_as_re(self, arg, **kwargs):
return -S.ImaginaryUnit*(self.args[0] - re(self.args[0]))
def _eval_is_algebraic(self):
return self.args[0].is_algebraic
def _eval_is_zero(self):
return self.args[0].is_extended_real
def _eval_is_finite(self):
if self.args[0].is_finite:
return True
def _eval_is_complex(self):
if self.args[0].is_finite:
return True
###############################################################################
############### SIGN, ABSOLUTE VALUE, ARGUMENT and CONJUGATION ################
###############################################################################
class sign(Function):
"""
Returns the complex sign of an expression:
If the expression is real the sign will be:
* 1 if expression is positive
* 0 if expression is equal to zero
* -1 if expression is negative
If the expression is imaginary the sign will be:
* I if im(expression) is positive
* -I if im(expression) is negative
Otherwise an unevaluated expression will be returned. When evaluated, the
result (in general) will be ``cos(arg(expr)) + I*sin(arg(expr))``.
Examples
========
>>> from sympy.functions import sign
>>> from sympy.core.numbers import I
>>> sign(-1)
-1
>>> sign(0)
0
>>> sign(-3*I)
-I
>>> sign(1 + I)
sign(1 + I)
>>> _.evalf()
0.707106781186548 + 0.707106781186548*I
See Also
========
Abs, conjugate
"""
is_complex = True
_singularities = True
def doit(self, **hints):
if self.args[0].is_zero is False:
return self.args[0] / Abs(self.args[0])
return self
@classmethod
def eval(cls, arg):
# handle what we can
if arg.is_Mul:
c, args = arg.as_coeff_mul()
unk = []
s = sign(c)
for a in args:
if a.is_extended_negative:
s = -s
elif a.is_extended_positive:
pass
else:
ai = im(a)
if a.is_imaginary and ai.is_comparable: # i.e. a = I*real
s *= S.ImaginaryUnit
if ai.is_extended_negative:
# can't use sign(ai) here since ai might not be
# a Number
s = -s
else:
unk.append(a)
if c is S.One and len(unk) == len(args):
return None
return s * cls(arg._new_rawargs(*unk))
if arg is S.NaN:
return S.NaN
if arg.is_zero: # it may be an Expr that is zero
return S.Zero
if arg.is_extended_positive:
return S.One
if arg.is_extended_negative:
return S.NegativeOne
if arg.is_Function:
if isinstance(arg, sign):
return arg
if arg.is_imaginary:
if arg.is_Pow and arg.exp is S.Half:
# we catch this because non-trivial sqrt args are not expanded
# e.g. sqrt(1-sqrt(2)) --x--> to I*sqrt(sqrt(2) - 1)
return S.ImaginaryUnit
arg2 = -S.ImaginaryUnit * arg
if arg2.is_extended_positive:
return S.ImaginaryUnit
if arg2.is_extended_negative:
return -S.ImaginaryUnit
def _eval_Abs(self):
if fuzzy_not(self.args[0].is_zero):
return S.One
def _eval_conjugate(self):
return sign(conjugate(self.args[0]))
def _eval_derivative(self, x):
if self.args[0].is_extended_real:
from sympy.functions.special.delta_functions import DiracDelta
return 2 * Derivative(self.args[0], x, evaluate=True) \
* DiracDelta(self.args[0])
elif self.args[0].is_imaginary:
from sympy.functions.special.delta_functions import DiracDelta
return 2 * Derivative(self.args[0], x, evaluate=True) \
* DiracDelta(-S.ImaginaryUnit * self.args[0])
def _eval_is_nonnegative(self):
if self.args[0].is_nonnegative:
return True
def _eval_is_nonpositive(self):
if self.args[0].is_nonpositive:
return True
def _eval_is_imaginary(self):
return self.args[0].is_imaginary
def _eval_is_integer(self):
return self.args[0].is_extended_real
def _eval_is_zero(self):
return self.args[0].is_zero
def _eval_power(self, other):
if (
fuzzy_not(self.args[0].is_zero) and
other.is_integer and
other.is_even
):
return S.One
def _sage_(self):
import sage.all as sage
return sage.sgn(self.args[0]._sage_())
def _eval_rewrite_as_Piecewise(self, arg, **kwargs):
if arg.is_extended_real:
return Piecewise((1, arg > 0), (-1, arg < 0), (0, True))
def _eval_rewrite_as_Heaviside(self, arg, **kwargs):
from sympy.functions.special.delta_functions import Heaviside
if arg.is_extended_real:
return Heaviside(arg, H0=S(1)/2) * 2 - 1
def _eval_simplify(self, **kwargs):
return self.func(factor_terms(self.args[0])) # XXX include doit?
class Abs(Function):
"""
Return the absolute value of the argument.
This is an extension of the built-in function abs() to accept symbolic
values. If you pass a SymPy expression to the built-in abs(), it will
pass it automatically to Abs().
Examples
========
>>> from sympy import Abs, Symbol, S
>>> Abs(-1)
1
>>> x = Symbol('x', real=True)
>>> Abs(-x)
Abs(x)
>>> Abs(x**2)
x**2
>>> abs(-x) # The Python built-in
Abs(x)
Note that the Python built-in will return either an Expr or int depending on
the argument::
>>> type(abs(-1))
<... 'int'>
>>> type(abs(S.NegativeOne))
<class 'sympy.core.numbers.One'>
Abs will always return a sympy object.
See Also
========
sign, conjugate
"""
is_extended_real = True
is_extended_negative = False
is_extended_nonnegative = True
unbranched = True
_singularities = True # non-holomorphic
def fdiff(self, argindex=1):
"""
Get the first derivative of the argument to Abs().
Examples
========
>>> from sympy.abc import x
>>> from sympy.functions import Abs
>>> Abs(-x).fdiff()
sign(x)
"""
if argindex == 1:
return sign(self.args[0])
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, arg):
from sympy.simplify.simplify import signsimp
from sympy.core.function import expand_mul
from sympy.core.power import Pow
if hasattr(arg, '_eval_Abs'):
obj = arg._eval_Abs()
if obj is not None:
return obj
if not isinstance(arg, Expr):
raise TypeError("Bad argument type for Abs(): %s" % type(arg))
# handle what we can
arg = signsimp(arg, evaluate=False)
n, d = arg.as_numer_denom()
if d.free_symbols and not n.free_symbols:
return cls(n)/cls(d)
if arg.is_Mul:
known = []
unk = []
for t in arg.args:
if t.is_Pow and t.exp.is_integer and t.exp.is_negative:
bnew = cls(t.base)
if isinstance(bnew, cls):
unk.append(t)
else:
known.append(Pow(bnew, t.exp))
else:
tnew = cls(t)
if isinstance(tnew, cls):
unk.append(t)
else:
known.append(tnew)
known = Mul(*known)
unk = cls(Mul(*unk), evaluate=False) if unk else S.One
return known*unk
if arg is S.NaN:
return S.NaN
if arg is S.ComplexInfinity:
return S.Infinity
if arg.is_Pow:
base, exponent = arg.as_base_exp()
if base.is_extended_real:
if exponent.is_integer:
if exponent.is_even:
return arg
if base is S.NegativeOne:
return S.One
return Abs(base)**exponent
if base.is_extended_nonnegative:
return base**re(exponent)
if base.is_extended_negative:
return (-base)**re(exponent)*exp(-S.Pi*im(exponent))
return
elif not base.has(Symbol): # complex base
# express base**exponent as exp(exponent*log(base))
a, b = log(base).as_real_imag()
z = a + I*b
return exp(re(exponent*z))
if isinstance(arg, exp):
return exp(re(arg.args[0]))
if isinstance(arg, AppliedUndef):
return
if arg.is_Add and arg.has(S.Infinity, S.NegativeInfinity):
if any(a.is_infinite for a in arg.as_real_imag()):
return S.Infinity
if arg.is_zero:
return S.Zero
if arg.is_extended_nonnegative:
return arg
if arg.is_extended_nonpositive:
return -arg
if arg.is_imaginary:
arg2 = -S.ImaginaryUnit * arg
if arg2.is_extended_nonnegative:
return arg2
# reject result if all new conjugates are just wrappers around
# an expression that was already in the arg
conj = signsimp(arg.conjugate(), evaluate=False)
new_conj = conj.atoms(conjugate) - arg.atoms(conjugate)
if new_conj and all(arg.has(i.args[0]) for i in new_conj):
return
if arg != conj and arg != -conj:
ignore = arg.atoms(Abs)
abs_free_arg = arg.xreplace({i: Dummy(real=True) for i in ignore})
unk = [a for a in abs_free_arg.free_symbols if a.is_extended_real is None]
if not unk or not all(conj.has(conjugate(u)) for u in unk):
return sqrt(expand_mul(arg*conj))
def _eval_is_real(self):
if self.args[0].is_finite:
return True
def _eval_is_integer(self):
if self.args[0].is_extended_real:
return self.args[0].is_integer
def _eval_is_extended_nonzero(self):
return fuzzy_not(self._args[0].is_zero)
def _eval_is_zero(self):
return self._args[0].is_zero
def _eval_is_extended_positive(self):
is_z = self.is_zero
if is_z is not None:
return not is_z
def _eval_is_rational(self):
if self.args[0].is_extended_real:
return self.args[0].is_rational
def _eval_is_even(self):
if self.args[0].is_extended_real:
return self.args[0].is_even
def _eval_is_odd(self):
if self.args[0].is_extended_real:
return self.args[0].is_odd
def _eval_is_algebraic(self):
return self.args[0].is_algebraic
def _eval_power(self, exponent):
if self.args[0].is_extended_real and exponent.is_integer:
if exponent.is_even:
return self.args[0]**exponent
elif exponent is not S.NegativeOne and exponent.is_Integer:
return self.args[0]**(exponent - 1)*self
return
def _eval_nseries(self, x, n, logx, cdir=0):
direction = self.args[0].leadterm(x)[0]
if direction.has(log(x)):
direction = direction.subs(log(x), logx)
s = self.args[0]._eval_nseries(x, n=n, logx=logx)
when = Eq(direction, 0)
return Piecewise(
((s.subs(direction, 0)), when),
(sign(direction)*s, True),
)
def _sage_(self):
import sage.all as sage
return sage.abs_symbolic(self.args[0]._sage_())
def _eval_derivative(self, x):
if self.args[0].is_extended_real or self.args[0].is_imaginary:
return Derivative(self.args[0], x, evaluate=True) \
* sign(conjugate(self.args[0]))
rv = (re(self.args[0]) * Derivative(re(self.args[0]), x,
evaluate=True) + im(self.args[0]) * Derivative(im(self.args[0]),
x, evaluate=True)) / Abs(self.args[0])
return rv.rewrite(sign)
def _eval_rewrite_as_Heaviside(self, arg, **kwargs):
# Note this only holds for real arg (since Heaviside is not defined
# for complex arguments).
from sympy.functions.special.delta_functions import Heaviside
if arg.is_extended_real:
return arg*(Heaviside(arg) - Heaviside(-arg))
def _eval_rewrite_as_Piecewise(self, arg, **kwargs):
if arg.is_extended_real:
return Piecewise((arg, arg >= 0), (-arg, True))
elif arg.is_imaginary:
return Piecewise((I*arg, I*arg >= 0), (-I*arg, True))
def _eval_rewrite_as_sign(self, arg, **kwargs):
return arg/sign(arg)
def _eval_rewrite_as_conjugate(self, arg, **kwargs):
return (arg*conjugate(arg))**S.Half
class arg(Function):
"""
Returns the argument (in radians) of a complex number. For a positive
number, the argument is always 0.
Examples
========
>>> from sympy.functions import arg
>>> from sympy import I, sqrt
>>> arg(2.0)
0
>>> arg(I)
pi/2
>>> arg(sqrt(2) + I*sqrt(2))
pi/4
"""
is_extended_real = True
is_real = True
is_finite = True
_singularities = True # non-holomorphic
@classmethod
def eval(cls, arg):
if isinstance(arg, exp_polar):
return periodic_argument(arg, oo)
if not arg.is_Atom:
c, arg_ = factor_terms(arg).as_coeff_Mul()
if arg_.is_Mul:
arg_ = Mul(*[a if (sign(a) not in (-1, 1)) else
sign(a) for a in arg_.args])
arg_ = sign(c)*arg_
else:
arg_ = arg
if arg_.atoms(AppliedUndef):
return
x, y = arg_.as_real_imag()
rv = atan2(y, x)
if rv.is_number:
return rv
if arg_ != arg:
return cls(arg_, evaluate=False)
def _eval_derivative(self, t):
x, y = self.args[0].as_real_imag()
return (x * Derivative(y, t, evaluate=True) - y *
Derivative(x, t, evaluate=True)) / (x**2 + y**2)
def _eval_rewrite_as_atan2(self, arg, **kwargs):
x, y = self.args[0].as_real_imag()
return atan2(y, x)
class conjugate(Function):
"""
Returns the `complex conjugate` Ref[1] of an argument.
In mathematics, the complex conjugate of a complex number
is given by changing the sign of the imaginary part.
Thus, the conjugate of the complex number
:math:`a + ib` (where a and b are real numbers) is :math:`a - ib`
Examples
========
>>> from sympy import conjugate, I
>>> conjugate(2)
2
>>> conjugate(I)
-I
See Also
========
sign, Abs
References
==========
.. [1] https://en.wikipedia.org/wiki/Complex_conjugation
"""
_singularities = True # non-holomorphic
@classmethod
def eval(cls, arg):
obj = arg._eval_conjugate()
if obj is not None:
return obj
def _eval_Abs(self):
return Abs(self.args[0], evaluate=True)
def _eval_adjoint(self):
return transpose(self.args[0])
def _eval_conjugate(self):
return self.args[0]
def _eval_derivative(self, x):
if x.is_real:
return conjugate(Derivative(self.args[0], x, evaluate=True))
elif x.is_imaginary:
return -conjugate(Derivative(self.args[0], x, evaluate=True))
def _eval_transpose(self):
return adjoint(self.args[0])
def _eval_is_algebraic(self):
return self.args[0].is_algebraic
class transpose(Function):
"""
Linear map transposition.
"""
@classmethod
def eval(cls, arg):
obj = arg._eval_transpose()
if obj is not None:
return obj
def _eval_adjoint(self):
return conjugate(self.args[0])
def _eval_conjugate(self):
return adjoint(self.args[0])
def _eval_transpose(self):
return self.args[0]
class adjoint(Function):
"""
Conjugate transpose or Hermite conjugation.
"""
@classmethod
def eval(cls, arg):
obj = arg._eval_adjoint()
if obj is not None:
return obj
obj = arg._eval_transpose()
if obj is not None:
return conjugate(obj)
def _eval_adjoint(self):
return self.args[0]
def _eval_conjugate(self):
return transpose(self.args[0])
def _eval_transpose(self):
return conjugate(self.args[0])
def _latex(self, printer, exp=None, *args):
arg = printer._print(self.args[0])
tex = r'%s^{\dagger}' % arg
if exp:
tex = r'\left(%s\right)^{%s}' % (tex, exp)
return tex
def _pretty(self, printer, *args):
from sympy.printing.pretty.stringpict import prettyForm
pform = printer._print(self.args[0], *args)
if printer._use_unicode:
pform = pform**prettyForm('\N{DAGGER}')
else:
pform = pform**prettyForm('+')
return pform
###############################################################################
############### HANDLING OF POLAR NUMBERS #####################################
###############################################################################
class polar_lift(Function):
"""
Lift argument to the Riemann surface of the logarithm, using the
standard branch.
>>> from sympy import Symbol, polar_lift, I
>>> p = Symbol('p', polar=True)
>>> x = Symbol('x')
>>> polar_lift(4)
4*exp_polar(0)
>>> polar_lift(-4)
4*exp_polar(I*pi)
>>> polar_lift(-I)
exp_polar(-I*pi/2)
>>> polar_lift(I + 2)
polar_lift(2 + I)
>>> polar_lift(4*x)
4*polar_lift(x)
>>> polar_lift(4*p)
4*p
See Also
========
sympy.functions.elementary.exponential.exp_polar
periodic_argument
"""
is_polar = True
is_comparable = False # Cannot be evalf'd.
@classmethod
def eval(cls, arg):
from sympy.functions.elementary.complexes import arg as argument
if arg.is_number:
ar = argument(arg)
# In general we want to affirm that something is known,
# e.g. `not ar.has(argument) and not ar.has(atan)`
# but for now we will just be more restrictive and
# see that it has evaluated to one of the known values.
if ar in (0, pi/2, -pi/2, pi):
return exp_polar(I*ar)*abs(arg)
if arg.is_Mul:
args = arg.args
else:
args = [arg]
included = []
excluded = []
positive = []
for arg in args:
if arg.is_polar:
included += [arg]
elif arg.is_positive:
positive += [arg]
else:
excluded += [arg]
if len(excluded) < len(args):
if excluded:
return Mul(*(included + positive))*polar_lift(Mul(*excluded))
elif included:
return Mul(*(included + positive))
else:
return Mul(*positive)*exp_polar(0)
def _eval_evalf(self, prec):
""" Careful! any evalf of polar numbers is flaky """
return self.args[0]._eval_evalf(prec)
def _eval_Abs(self):
return Abs(self.args[0], evaluate=True)
class periodic_argument(Function):
"""
Represent the argument on a quotient of the Riemann surface of the
logarithm. That is, given a period P, always return a value in
(-P/2, P/2], by using exp(P*I) == 1.
>>> from sympy import exp, exp_polar, periodic_argument, unbranched_argument
>>> from sympy import I, pi
>>> unbranched_argument(exp(5*I*pi))
pi
>>> unbranched_argument(exp_polar(5*I*pi))
5*pi
>>> periodic_argument(exp_polar(5*I*pi), 2*pi)
pi
>>> periodic_argument(exp_polar(5*I*pi), 3*pi)
-pi
>>> periodic_argument(exp_polar(5*I*pi), pi)
0
See Also
========
sympy.functions.elementary.exponential.exp_polar
polar_lift : Lift argument to the Riemann surface of the logarithm
principal_branch
"""
@classmethod
def _getunbranched(cls, ar):
if ar.is_Mul:
args = ar.args
else:
args = [ar]
unbranched = 0
for a in args:
if not a.is_polar:
unbranched += arg(a)
elif isinstance(a, exp_polar):
unbranched += a.exp.as_real_imag()[1]
elif a.is_Pow:
re, im = a.exp.as_real_imag()
unbranched += re*unbranched_argument(
a.base) + im*log(abs(a.base))
elif isinstance(a, polar_lift):
unbranched += arg(a.args[0])
else:
return None
return unbranched
@classmethod
def eval(cls, ar, period):
# Our strategy is to evaluate the argument on the Riemann surface of the
# logarithm, and then reduce.
# NOTE evidently this means it is a rather bad idea to use this with
# period != 2*pi and non-polar numbers.
if not period.is_extended_positive:
return None
if period == oo and isinstance(ar, principal_branch):
return periodic_argument(*ar.args)
if isinstance(ar, polar_lift) and period >= 2*pi:
return periodic_argument(ar.args[0], period)
if ar.is_Mul:
newargs = [x for x in ar.args if not x.is_positive]
if len(newargs) != len(ar.args):
return periodic_argument(Mul(*newargs), period)
unbranched = cls._getunbranched(ar)
if unbranched is None:
return None
if unbranched.has(periodic_argument, atan2, atan):
return None
if period == oo:
return unbranched
if period != oo:
n = ceiling(unbranched/period - S.Half)*period
if not n.has(ceiling):
return unbranched - n
def _eval_evalf(self, prec):
z, period = self.args
if period == oo:
unbranched = periodic_argument._getunbranched(z)
if unbranched is None:
return self
return unbranched._eval_evalf(prec)
ub = periodic_argument(z, oo)._eval_evalf(prec)
return (ub - ceiling(ub/period - S.Half)*period)._eval_evalf(prec)
def unbranched_argument(arg):
return periodic_argument(arg, oo)
class principal_branch(Function):
"""
Represent a polar number reduced to its principal branch on a quotient
of the Riemann surface of the logarithm.
This is a function of two arguments. The first argument is a polar
number `z`, and the second one a positive real number of infinity, `p`.
The result is "z mod exp_polar(I*p)".
>>> from sympy import exp_polar, principal_branch, oo, I, pi
>>> from sympy.abc import z
>>> principal_branch(z, oo)
z
>>> principal_branch(exp_polar(2*pi*I)*3, 2*pi)
3*exp_polar(0)
>>> principal_branch(exp_polar(2*pi*I)*3*z, 2*pi)
3*principal_branch(z, 2*pi)
See Also
========
sympy.functions.elementary.exponential.exp_polar
polar_lift : Lift argument to the Riemann surface of the logarithm
periodic_argument
"""
is_polar = True
is_comparable = False # cannot always be evalf'd
@classmethod
def eval(self, x, period):
from sympy import oo, exp_polar, I, Mul, polar_lift, Symbol
if isinstance(x, polar_lift):
return principal_branch(x.args[0], period)
if period == oo:
return x
ub = periodic_argument(x, oo)
barg = periodic_argument(x, period)
if ub != barg and not ub.has(periodic_argument) \
and not barg.has(periodic_argument):
pl = polar_lift(x)
def mr(expr):
if not isinstance(expr, Symbol):
return polar_lift(expr)
return expr
pl = pl.replace(polar_lift, mr)
# Recompute unbranched argument
ub = periodic_argument(pl, oo)
if not pl.has(polar_lift):
if ub != barg:
res = exp_polar(I*(barg - ub))*pl
else:
res = pl
if not res.is_polar and not res.has(exp_polar):
res *= exp_polar(0)
return res
if not x.free_symbols:
c, m = x, ()
else:
c, m = x.as_coeff_mul(*x.free_symbols)
others = []
for y in m:
if y.is_positive:
c *= y
else:
others += [y]
m = tuple(others)
arg = periodic_argument(c, period)
if arg.has(periodic_argument):
return None
if arg.is_number and (unbranched_argument(c) != arg or
(arg == 0 and m != () and c != 1)):
if arg == 0:
return abs(c)*principal_branch(Mul(*m), period)
return principal_branch(exp_polar(I*arg)*Mul(*m), period)*abs(c)
if arg.is_number and ((abs(arg) < period/2) == True or arg == period/2) \
and m == ():
return exp_polar(arg*I)*abs(c)
def _eval_evalf(self, prec):
from sympy import exp, pi, I
z, period = self.args
p = periodic_argument(z, period)._eval_evalf(prec)
if abs(p) > pi or p == -pi:
return self # Cannot evalf for this argument.
return (abs(z)*exp(I*p))._eval_evalf(prec)
def _polarify(eq, lift, pause=False):
from sympy import Integral
if eq.is_polar:
return eq
if eq.is_number and not pause:
return polar_lift(eq)
if isinstance(eq, Symbol) and not pause and lift:
return polar_lift(eq)
elif eq.is_Atom:
return eq
elif eq.is_Add:
r = eq.func(*[_polarify(arg, lift, pause=True) for arg in eq.args])
if lift:
return polar_lift(r)
return r
elif eq.is_Function:
return eq.func(*[_polarify(arg, lift, pause=False) for arg in eq.args])
elif isinstance(eq, Integral):
# Don't lift the integration variable
func = _polarify(eq.function, lift, pause=pause)
limits = []
for limit in eq.args[1:]:
var = _polarify(limit[0], lift=False, pause=pause)
rest = _polarify(limit[1:], lift=lift, pause=pause)
limits.append((var,) + rest)
return Integral(*((func,) + tuple(limits)))
else:
return eq.func(*[_polarify(arg, lift, pause=pause)
if isinstance(arg, Expr) else arg for arg in eq.args])
def polarify(eq, subs=True, lift=False):
"""
Turn all numbers in eq into their polar equivalents (under the standard
choice of argument).
Note that no attempt is made to guess a formal convention of adding
polar numbers, expressions like 1 + x will generally not be altered.
Note also that this function does not promote exp(x) to exp_polar(x).
If ``subs`` is True, all symbols which are not already polar will be
substituted for polar dummies; in this case the function behaves much
like posify.
If ``lift`` is True, both addition statements and non-polar symbols are
changed to their polar_lift()ed versions.
Note that lift=True implies subs=False.
>>> from sympy import polarify, sin, I
>>> from sympy.abc import x, y
>>> expr = (-x)**y
>>> expr.expand()
(-x)**y
>>> polarify(expr)
((_x*exp_polar(I*pi))**_y, {_x: x, _y: y})
>>> polarify(expr)[0].expand()
_x**_y*exp_polar(_y*I*pi)
>>> polarify(x, lift=True)
polar_lift(x)
>>> polarify(x*(1+y), lift=True)
polar_lift(x)*polar_lift(y + 1)
Adds are treated carefully:
>>> polarify(1 + sin((1 + I)*x))
(sin(_x*polar_lift(1 + I)) + 1, {_x: x})
"""
if lift:
subs = False
eq = _polarify(sympify(eq), lift)
if not subs:
return eq
reps = {s: Dummy(s.name, polar=True) for s in eq.free_symbols}
eq = eq.subs(reps)
return eq, {r: s for s, r in reps.items()}
def _unpolarify(eq, exponents_only, pause=False):
if not isinstance(eq, Basic) or eq.is_Atom:
return eq
if not pause:
if isinstance(eq, exp_polar):
return exp(_unpolarify(eq.exp, exponents_only))
if isinstance(eq, principal_branch) and eq.args[1] == 2*pi:
return _unpolarify(eq.args[0], exponents_only)
if (
eq.is_Add or eq.is_Mul or eq.is_Boolean or
eq.is_Relational and (
eq.rel_op in ('==', '!=') and 0 in eq.args or
eq.rel_op not in ('==', '!='))
):
return eq.func(*[_unpolarify(x, exponents_only) for x in eq.args])
if isinstance(eq, polar_lift):
return _unpolarify(eq.args[0], exponents_only)
if eq.is_Pow:
expo = _unpolarify(eq.exp, exponents_only)
base = _unpolarify(eq.base, exponents_only,
not (expo.is_integer and not pause))
return base**expo
if eq.is_Function and getattr(eq.func, 'unbranched', False):
return eq.func(*[_unpolarify(x, exponents_only, exponents_only)
for x in eq.args])
return eq.func(*[_unpolarify(x, exponents_only, True) for x in eq.args])
def unpolarify(eq, subs={}, exponents_only=False):
"""
If p denotes the projection from the Riemann surface of the logarithm to
the complex line, return a simplified version eq' of `eq` such that
p(eq') == p(eq).
Also apply the substitution subs in the end. (This is a convenience, since
``unpolarify``, in a certain sense, undoes polarify.)
>>> from sympy import unpolarify, polar_lift, sin, I
>>> unpolarify(polar_lift(I + 2))
2 + I
>>> unpolarify(sin(polar_lift(I + 7)))
sin(7 + I)
"""
if isinstance(eq, bool):
return eq
eq = sympify(eq)
if subs != {}:
return unpolarify(eq.subs(subs))
changed = True
pause = False
if exponents_only:
pause = True
while changed:
changed = False
res = _unpolarify(eq, exponents_only, pause)
if res != eq:
changed = True
eq = res
if isinstance(res, bool):
return res
# Finally, replacing Exp(0) by 1 is always correct.
# So is polar_lift(0) -> 0.
return res.subs({exp_polar(0): 1, polar_lift(0): 0})
|
c22efe5c42f95e424928cec77ebcf92f9a74754ded2e6552be7aa63a9f90242d
|
"""Hypergeometric and Meijer G-functions"""
from sympy.core import S, I, pi, oo, zoo, ilcm, Mod
from sympy.core.function import Function, Derivative, ArgumentIndexError
from sympy.core.compatibility import reduce
from sympy.core.containers import Tuple
from sympy.core.mul import Mul
from sympy.core.symbol import Dummy
from sympy.functions import (sqrt, exp, log, sin, cos, asin, atan,
sinh, cosh, asinh, acosh, atanh, acoth, Abs)
from sympy.utilities.iterables import default_sort_key
class TupleArg(Tuple):
def limit(self, x, xlim, dir='+'):
""" Compute limit x->xlim.
"""
from sympy.series.limits import limit
return TupleArg(*[limit(f, x, xlim, dir) for f in self.args])
# TODO should __new__ accept **options?
# TODO should constructors should check if parameters are sensible?
def _prep_tuple(v):
"""
Turn an iterable argument *v* into a tuple and unpolarify, since both
hypergeometric and meijer g-functions are unbranched in their parameters.
Examples
========
>>> from sympy.functions.special.hyper import _prep_tuple
>>> _prep_tuple([1, 2, 3])
(1, 2, 3)
>>> _prep_tuple((4, 5))
(4, 5)
>>> _prep_tuple((7, 8, 9))
(7, 8, 9)
"""
from sympy import unpolarify
return TupleArg(*[unpolarify(x) for x in v])
class TupleParametersBase(Function):
""" Base class that takes care of differentiation, when some of
the arguments are actually tuples. """
# This is not deduced automatically since there are Tuples as arguments.
is_commutative = True
def _eval_derivative(self, s):
try:
res = 0
if self.args[0].has(s) or self.args[1].has(s):
for i, p in enumerate(self._diffargs):
m = self._diffargs[i].diff(s)
if m != 0:
res += self.fdiff((1, i))*m
return res + self.fdiff(3)*self.args[2].diff(s)
except (ArgumentIndexError, NotImplementedError):
return Derivative(self, s)
class hyper(TupleParametersBase):
r"""
The generalized hypergeometric function is defined by a series where
the ratios of successive terms are a rational function of the summation
index. When convergent, it is continued analytically to the largest
possible domain.
Explanation
===========
The hypergeometric function depends on two vectors of parameters, called
the numerator parameters $a_p$, and the denominator parameters
$b_q$. It also has an argument $z$. The series definition is
.. math ::
{}_pF_q\left(\begin{matrix} a_1, \cdots, a_p \\ b_1, \cdots, b_q \end{matrix}
\middle| z \right)
= \sum_{n=0}^\infty \frac{(a_1)_n \cdots (a_p)_n}{(b_1)_n \cdots (b_q)_n}
\frac{z^n}{n!},
where $(a)_n = (a)(a+1)\cdots(a+n-1)$ denotes the rising factorial.
If one of the $b_q$ is a non-positive integer then the series is
undefined unless one of the $a_p$ is a larger (i.e., smaller in
magnitude) non-positive integer. If none of the $b_q$ is a
non-positive integer and one of the $a_p$ is a non-positive
integer, then the series reduces to a polynomial. To simplify the
following discussion, we assume that none of the $a_p$ or
$b_q$ is a non-positive integer. For more details, see the
references.
The series converges for all $z$ if $p \le q$, and thus
defines an entire single-valued function in this case. If $p =
q+1$ the series converges for $|z| < 1$, and can be continued
analytically into a half-plane. If $p > q+1$ the series is
divergent for all $z$.
Please note the hypergeometric function constructor currently does *not*
check if the parameters actually yield a well-defined function.
Examples
========
The parameters $a_p$ and $b_q$ can be passed as arbitrary
iterables, for example:
>>> from sympy.functions import hyper
>>> from sympy.abc import x, n, a
>>> hyper((1, 2, 3), [3, 4], x)
hyper((1, 2, 3), (3, 4), x)
There is also pretty printing (it looks better using Unicode):
>>> from sympy import pprint
>>> pprint(hyper((1, 2, 3), [3, 4], x), use_unicode=False)
_
|_ /1, 2, 3 | \
| | | x|
3 2 \ 3, 4 | /
The parameters must always be iterables, even if they are vectors of
length one or zero:
>>> hyper((1, ), [], x)
hyper((1,), (), x)
But of course they may be variables (but if they depend on $x$ then you
should not expect much implemented functionality):
>>> hyper((n, a), (n**2,), x)
hyper((n, a), (n**2,), x)
The hypergeometric function generalizes many named special functions.
The function ``hyperexpand()`` tries to express a hypergeometric function
using named special functions. For example:
>>> from sympy import hyperexpand
>>> hyperexpand(hyper([], [], x))
exp(x)
You can also use ``expand_func()``:
>>> from sympy import expand_func
>>> expand_func(x*hyper([1, 1], [2], -x))
log(x + 1)
More examples:
>>> from sympy import S
>>> hyperexpand(hyper([], [S(1)/2], -x**2/4))
cos(x)
>>> hyperexpand(x*hyper([S(1)/2, S(1)/2], [S(3)/2], x**2))
asin(x)
We can also sometimes ``hyperexpand()`` parametric functions:
>>> from sympy.abc import a
>>> hyperexpand(hyper([-a], [], x))
(1 - x)**a
See Also
========
sympy.simplify.hyperexpand
gamma
meijerg
References
==========
.. [1] Luke, Y. L. (1969), The Special Functions and Their Approximations,
Volume 1
.. [2] https://en.wikipedia.org/wiki/Generalized_hypergeometric_function
"""
def __new__(cls, ap, bq, z, **kwargs):
# TODO should we check convergence conditions?
return Function.__new__(cls, _prep_tuple(ap), _prep_tuple(bq), z, **kwargs)
@classmethod
def eval(cls, ap, bq, z):
from sympy import unpolarify
if len(ap) <= len(bq) or (len(ap) == len(bq) + 1 and (Abs(z) <= 1) == True):
nz = unpolarify(z)
if z != nz:
return hyper(ap, bq, nz)
def fdiff(self, argindex=3):
if argindex != 3:
raise ArgumentIndexError(self, argindex)
nap = Tuple(*[a + 1 for a in self.ap])
nbq = Tuple(*[b + 1 for b in self.bq])
fac = Mul(*self.ap)/Mul(*self.bq)
return fac*hyper(nap, nbq, self.argument)
def _eval_expand_func(self, **hints):
from sympy import gamma, hyperexpand
if len(self.ap) == 2 and len(self.bq) == 1 and self.argument == 1:
a, b = self.ap
c = self.bq[0]
return gamma(c)*gamma(c - a - b)/gamma(c - a)/gamma(c - b)
return hyperexpand(self)
def _eval_rewrite_as_Sum(self, ap, bq, z, **kwargs):
from sympy.functions import factorial, RisingFactorial, Piecewise
from sympy import Sum
n = Dummy("n", integer=True)
rfap = Tuple(*[RisingFactorial(a, n) for a in ap])
rfbq = Tuple(*[RisingFactorial(b, n) for b in bq])
coeff = Mul(*rfap) / Mul(*rfbq)
return Piecewise((Sum(coeff * z**n / factorial(n), (n, 0, oo)),
self.convergence_statement), (self, True))
def _eval_nseries(self, x, n, logx, cdir=0):
from sympy.functions import factorial, RisingFactorial
from sympy import Order, Add
arg = self.args[2]
x0 = arg.limit(x, 0)
ap = self.args[0]
bq = self.args[1]
if x0 != 0:
return super()._eval_nseries(x, n, logx)
terms = []
for i in range(n):
num = 1
den = 1
for a in ap:
num *= RisingFactorial(a, i)
for b in bq:
den *= RisingFactorial(b, i)
terms.append(((num/den) * (arg**i)) / factorial(i))
return (Add(*terms) + Order(x**n,x))
@property
def argument(self):
""" Argument of the hypergeometric function. """
return self.args[2]
@property
def ap(self):
""" Numerator parameters of the hypergeometric function. """
return Tuple(*self.args[0])
@property
def bq(self):
""" Denominator parameters of the hypergeometric function. """
return Tuple(*self.args[1])
@property
def _diffargs(self):
return self.ap + self.bq
@property
def eta(self):
""" A quantity related to the convergence of the series. """
return sum(self.ap) - sum(self.bq)
@property
def radius_of_convergence(self):
"""
Compute the radius of convergence of the defining series.
Explanation
===========
Note that even if this is not ``oo``, the function may still be
evaluated outside of the radius of convergence by analytic
continuation. But if this is zero, then the function is not actually
defined anywhere else.
Examples
========
>>> from sympy.functions import hyper
>>> from sympy.abc import z
>>> hyper((1, 2), [3], z).radius_of_convergence
1
>>> hyper((1, 2, 3), [4], z).radius_of_convergence
0
>>> hyper((1, 2), (3, 4), z).radius_of_convergence
oo
"""
if any(a.is_integer and (a <= 0) == True for a in self.ap + self.bq):
aints = [a for a in self.ap if a.is_Integer and (a <= 0) == True]
bints = [a for a in self.bq if a.is_Integer and (a <= 0) == True]
if len(aints) < len(bints):
return S.Zero
popped = False
for b in bints:
cancelled = False
while aints:
a = aints.pop()
if a >= b:
cancelled = True
break
popped = True
if not cancelled:
return S.Zero
if aints or popped:
# There are still non-positive numerator parameters.
# This is a polynomial.
return oo
if len(self.ap) == len(self.bq) + 1:
return S.One
elif len(self.ap) <= len(self.bq):
return oo
else:
return S.Zero
@property
def convergence_statement(self):
""" Return a condition on z under which the series converges. """
from sympy import And, Or, re, Ne, oo
R = self.radius_of_convergence
if R == 0:
return False
if R == oo:
return True
# The special functions and their approximations, page 44
e = self.eta
z = self.argument
c1 = And(re(e) < 0, abs(z) <= 1)
c2 = And(0 <= re(e), re(e) < 1, abs(z) <= 1, Ne(z, 1))
c3 = And(re(e) >= 1, abs(z) < 1)
return Or(c1, c2, c3)
def _eval_simplify(self, **kwargs):
from sympy.simplify.hyperexpand import hyperexpand
return hyperexpand(self)
def _sage_(self):
import sage.all as sage
ap = [arg._sage_() for arg in self.args[0]]
bq = [arg._sage_() for arg in self.args[1]]
return sage.hypergeometric(ap, bq, self.argument._sage_())
class meijerg(TupleParametersBase):
r"""
The Meijer G-function is defined by a Mellin-Barnes type integral that
resembles an inverse Mellin transform. It generalizes the hypergeometric
functions.
Explanation
===========
The Meijer G-function depends on four sets of parameters. There are
"*numerator parameters*"
$a_1, \ldots, a_n$ and $a_{n+1}, \ldots, a_p$, and there are
"*denominator parameters*"
$b_1, \ldots, b_m$ and $b_{m+1}, \ldots, b_q$.
Confusingly, it is traditionally denoted as follows (note the position
of $m$, $n$, $p$, $q$, and how they relate to the lengths of the four
parameter vectors):
.. math ::
G_{p,q}^{m,n} \left(\begin{matrix}a_1, \cdots, a_n & a_{n+1}, \cdots, a_p \\
b_1, \cdots, b_m & b_{m+1}, \cdots, b_q
\end{matrix} \middle| z \right).
However, in SymPy the four parameter vectors are always available
separately (see examples), so that there is no need to keep track of the
decorating sub- and super-scripts on the G symbol.
The G function is defined as the following integral:
.. math ::
\frac{1}{2 \pi i} \int_L \frac{\prod_{j=1}^m \Gamma(b_j - s)
\prod_{j=1}^n \Gamma(1 - a_j + s)}{\prod_{j=m+1}^q \Gamma(1- b_j +s)
\prod_{j=n+1}^p \Gamma(a_j - s)} z^s \mathrm{d}s,
where $\Gamma(z)$ is the gamma function. There are three possible
contours which we will not describe in detail here (see the references).
If the integral converges along more than one of them, the definitions
agree. The contours all separate the poles of $\Gamma(1-a_j+s)$
from the poles of $\Gamma(b_k-s)$, so in particular the G function
is undefined if $a_j - b_k \in \mathbb{Z}_{>0}$ for some
$j \le n$ and $k \le m$.
The conditions under which one of the contours yields a convergent integral
are complicated and we do not state them here, see the references.
Please note currently the Meijer G-function constructor does *not* check any
convergence conditions.
Examples
========
You can pass the parameters either as four separate vectors:
>>> from sympy.functions import meijerg
>>> from sympy.abc import x, a
>>> from sympy.core.containers import Tuple
>>> from sympy import pprint
>>> pprint(meijerg((1, 2), (a, 4), (5,), [], x), use_unicode=False)
__1, 2 /1, 2 a, 4 | \
/__ | | x|
\_|4, 1 \ 5 | /
Or as two nested vectors:
>>> pprint(meijerg([(1, 2), (3, 4)], ([5], Tuple()), x), use_unicode=False)
__1, 2 /1, 2 3, 4 | \
/__ | | x|
\_|4, 1 \ 5 | /
As with the hypergeometric function, the parameters may be passed as
arbitrary iterables. Vectors of length zero and one also have to be
passed as iterables. The parameters need not be constants, but if they
depend on the argument then not much implemented functionality should be
expected.
All the subvectors of parameters are available:
>>> from sympy import pprint
>>> g = meijerg([1], [2], [3], [4], x)
>>> pprint(g, use_unicode=False)
__1, 1 /1 2 | \
/__ | | x|
\_|2, 2 \3 4 | /
>>> g.an
(1,)
>>> g.ap
(1, 2)
>>> g.aother
(2,)
>>> g.bm
(3,)
>>> g.bq
(3, 4)
>>> g.bother
(4,)
The Meijer G-function generalizes the hypergeometric functions.
In some cases it can be expressed in terms of hypergeometric functions,
using Slater's theorem. For example:
>>> from sympy import hyperexpand
>>> from sympy.abc import a, b, c
>>> hyperexpand(meijerg([a], [], [c], [b], x), allow_hyper=True)
x**c*gamma(-a + c + 1)*hyper((-a + c + 1,),
(-b + c + 1,), -x)/gamma(-b + c + 1)
Thus the Meijer G-function also subsumes many named functions as special
cases. You can use ``expand_func()`` or ``hyperexpand()`` to (try to)
rewrite a Meijer G-function in terms of named special functions. For
example:
>>> from sympy import expand_func, S
>>> expand_func(meijerg([[],[]], [[0],[]], -x))
exp(x)
>>> hyperexpand(meijerg([[],[]], [[S(1)/2],[0]], (x/2)**2))
sin(x)/sqrt(pi)
See Also
========
hyper
sympy.simplify.hyperexpand
References
==========
.. [1] Luke, Y. L. (1969), The Special Functions and Their Approximations,
Volume 1
.. [2] https://en.wikipedia.org/wiki/Meijer_G-function
"""
def __new__(cls, *args, **kwargs):
if len(args) == 5:
args = [(args[0], args[1]), (args[2], args[3]), args[4]]
if len(args) != 3:
raise TypeError("args must be either as, as', bs, bs', z or "
"as, bs, z")
def tr(p):
if len(p) != 2:
raise TypeError("wrong argument")
return TupleArg(_prep_tuple(p[0]), _prep_tuple(p[1]))
arg0, arg1 = tr(args[0]), tr(args[1])
if Tuple(arg0, arg1).has(oo, zoo, -oo):
raise ValueError("G-function parameters must be finite")
if any((a - b).is_Integer and a - b > 0
for a in arg0[0] for b in arg1[0]):
raise ValueError("no parameter a1, ..., an may differ from "
"any b1, ..., bm by a positive integer")
# TODO should we check convergence conditions?
return Function.__new__(cls, arg0, arg1, args[2], **kwargs)
def fdiff(self, argindex=3):
if argindex != 3:
return self._diff_wrt_parameter(argindex[1])
if len(self.an) >= 1:
a = list(self.an)
a[0] -= 1
G = meijerg(a, self.aother, self.bm, self.bother, self.argument)
return 1/self.argument * ((self.an[0] - 1)*self + G)
elif len(self.bm) >= 1:
b = list(self.bm)
b[0] += 1
G = meijerg(self.an, self.aother, b, self.bother, self.argument)
return 1/self.argument * (self.bm[0]*self - G)
else:
return S.Zero
def _diff_wrt_parameter(self, idx):
# Differentiation wrt a parameter can only be done in very special
# cases. In particular, if we want to differentiate with respect to
# `a`, all other gamma factors have to reduce to rational functions.
#
# Let MT denote mellin transform. Suppose T(-s) is the gamma factor
# appearing in the definition of G. Then
#
# MT(log(z)G(z)) = d/ds T(s) = d/da T(s) + ...
#
# Thus d/da G(z) = log(z)G(z) - ...
# The ... can be evaluated as a G function under the above conditions,
# the formula being most easily derived by using
#
# d Gamma(s + n) Gamma(s + n) / 1 1 1 \
# -- ------------ = ------------ | - + ---- + ... + --------- |
# ds Gamma(s) Gamma(s) \ s s + 1 s + n - 1 /
#
# which follows from the difference equation of the digamma function.
# (There is a similar equation for -n instead of +n).
# We first figure out how to pair the parameters.
an = list(self.an)
ap = list(self.aother)
bm = list(self.bm)
bq = list(self.bother)
if idx < len(an):
an.pop(idx)
else:
idx -= len(an)
if idx < len(ap):
ap.pop(idx)
else:
idx -= len(ap)
if idx < len(bm):
bm.pop(idx)
else:
bq.pop(idx - len(bm))
pairs1 = []
pairs2 = []
for l1, l2, pairs in [(an, bq, pairs1), (ap, bm, pairs2)]:
while l1:
x = l1.pop()
found = None
for i, y in enumerate(l2):
if not Mod((x - y).simplify(), 1):
found = i
break
if found is None:
raise NotImplementedError('Derivative not expressible '
'as G-function?')
y = l2[i]
l2.pop(i)
pairs.append((x, y))
# Now build the result.
res = log(self.argument)*self
for a, b in pairs1:
sign = 1
n = a - b
base = b
if n < 0:
sign = -1
n = b - a
base = a
for k in range(n):
res -= sign*meijerg(self.an + (base + k + 1,), self.aother,
self.bm, self.bother + (base + k + 0,),
self.argument)
for a, b in pairs2:
sign = 1
n = b - a
base = a
if n < 0:
sign = -1
n = a - b
base = b
for k in range(n):
res -= sign*meijerg(self.an, self.aother + (base + k + 1,),
self.bm + (base + k + 0,), self.bother,
self.argument)
return res
def get_period(self):
"""
Return a number $P$ such that $G(x*exp(I*P)) == G(x)$.
Examples
========
>>> from sympy.functions.special.hyper import meijerg
>>> from sympy.abc import z
>>> from sympy import pi, S
>>> meijerg([1], [], [], [], z).get_period()
2*pi
>>> meijerg([pi], [], [], [], z).get_period()
oo
>>> meijerg([1, 2], [], [], [], z).get_period()
oo
>>> meijerg([1,1], [2], [1, S(1)/2, S(1)/3], [1], z).get_period()
12*pi
"""
# This follows from slater's theorem.
def compute(l):
# first check that no two differ by an integer
for i, b in enumerate(l):
if not b.is_Rational:
return oo
for j in range(i + 1, len(l)):
if not Mod((b - l[j]).simplify(), 1):
return oo
return reduce(ilcm, (x.q for x in l), 1)
beta = compute(self.bm)
alpha = compute(self.an)
p, q = len(self.ap), len(self.bq)
if p == q:
if beta == oo or alpha == oo:
return oo
return 2*pi*ilcm(alpha, beta)
elif p < q:
return 2*pi*beta
else:
return 2*pi*alpha
def _eval_expand_func(self, **hints):
from sympy import hyperexpand
return hyperexpand(self)
def _eval_evalf(self, prec):
# The default code is insufficient for polar arguments.
# mpmath provides an optional argument "r", which evaluates
# G(z**(1/r)). I am not sure what its intended use is, but we hijack it
# here in the following way: to evaluate at a number z of |argument|
# less than (say) n*pi, we put r=1/n, compute z' = root(z, n)
# (carefully so as not to loose the branch information), and evaluate
# G(z'**(1/r)) = G(z'**n) = G(z).
from sympy.functions import exp_polar, ceiling
from sympy import Expr
import mpmath
znum = self.argument._eval_evalf(prec)
if znum.has(exp_polar):
znum, branch = znum.as_coeff_mul(exp_polar)
if len(branch) != 1:
return
branch = branch[0].args[0]/I
else:
branch = S.Zero
n = ceiling(abs(branch/S.Pi)) + 1
znum = znum**(S.One/n)*exp(I*branch / n)
# Convert all args to mpf or mpc
try:
[z, r, ap, bq] = [arg._to_mpmath(prec)
for arg in [znum, 1/n, self.args[0], self.args[1]]]
except ValueError:
return
with mpmath.workprec(prec):
v = mpmath.meijerg(ap, bq, z, r)
return Expr._from_mpmath(v, prec)
def integrand(self, s):
""" Get the defining integrand D(s). """
from sympy import gamma
return self.argument**s \
* Mul(*(gamma(b - s) for b in self.bm)) \
* Mul(*(gamma(1 - a + s) for a in self.an)) \
/ Mul(*(gamma(1 - b + s) for b in self.bother)) \
/ Mul(*(gamma(a - s) for a in self.aother))
@property
def argument(self):
""" Argument of the Meijer G-function. """
return self.args[2]
@property
def an(self):
""" First set of numerator parameters. """
return Tuple(*self.args[0][0])
@property
def ap(self):
""" Combined numerator parameters. """
return Tuple(*(self.args[0][0] + self.args[0][1]))
@property
def aother(self):
""" Second set of numerator parameters. """
return Tuple(*self.args[0][1])
@property
def bm(self):
""" First set of denominator parameters. """
return Tuple(*self.args[1][0])
@property
def bq(self):
""" Combined denominator parameters. """
return Tuple(*(self.args[1][0] + self.args[1][1]))
@property
def bother(self):
""" Second set of denominator parameters. """
return Tuple(*self.args[1][1])
@property
def _diffargs(self):
return self.ap + self.bq
@property
def nu(self):
""" A quantity related to the convergence region of the integral,
c.f. references. """
return sum(self.bq) - sum(self.ap)
@property
def delta(self):
""" A quantity related to the convergence region of the integral,
c.f. references. """
return len(self.bm) + len(self.an) - S(len(self.ap) + len(self.bq))/2
@property
def is_number(self):
""" Returns true if expression has numeric data only. """
return not self.free_symbols
class HyperRep(Function):
"""
A base class for "hyper representation functions".
This is used exclusively in ``hyperexpand()``, but fits more logically here.
pFq is branched at 1 if p == q+1. For use with slater-expansion, we want
define an "analytic continuation" to all polar numbers, which is
continuous on circles and on the ray t*exp_polar(I*pi). Moreover, we want
a "nice" expression for the various cases.
This base class contains the core logic, concrete derived classes only
supply the actual functions.
"""
@classmethod
def eval(cls, *args):
from sympy import unpolarify
newargs = tuple(map(unpolarify, args[:-1])) + args[-1:]
if args != newargs:
return cls(*newargs)
@classmethod
def _expr_small(cls, x):
""" An expression for F(x) which holds for |x| < 1. """
raise NotImplementedError
@classmethod
def _expr_small_minus(cls, x):
""" An expression for F(-x) which holds for |x| < 1. """
raise NotImplementedError
@classmethod
def _expr_big(cls, x, n):
""" An expression for F(exp_polar(2*I*pi*n)*x), |x| > 1. """
raise NotImplementedError
@classmethod
def _expr_big_minus(cls, x, n):
""" An expression for F(exp_polar(2*I*pi*n + pi*I)*x), |x| > 1. """
raise NotImplementedError
def _eval_rewrite_as_nonrep(self, *args, **kwargs):
from sympy import Piecewise
x, n = self.args[-1].extract_branch_factor(allow_half=True)
minus = False
newargs = self.args[:-1] + (x,)
if not n.is_Integer:
minus = True
n -= S.Half
newerargs = newargs + (n,)
if minus:
small = self._expr_small_minus(*newargs)
big = self._expr_big_minus(*newerargs)
else:
small = self._expr_small(*newargs)
big = self._expr_big(*newerargs)
if big == small:
return small
return Piecewise((big, abs(x) > 1), (small, True))
def _eval_rewrite_as_nonrepsmall(self, *args, **kwargs):
x, n = self.args[-1].extract_branch_factor(allow_half=True)
args = self.args[:-1] + (x,)
if not n.is_Integer:
return self._expr_small_minus(*args)
return self._expr_small(*args)
class HyperRep_power1(HyperRep):
""" Return a representative for hyper([-a], [], z) == (1 - z)**a. """
@classmethod
def _expr_small(cls, a, x):
return (1 - x)**a
@classmethod
def _expr_small_minus(cls, a, x):
return (1 + x)**a
@classmethod
def _expr_big(cls, a, x, n):
if a.is_integer:
return cls._expr_small(a, x)
return (x - 1)**a*exp((2*n - 1)*pi*I*a)
@classmethod
def _expr_big_minus(cls, a, x, n):
if a.is_integer:
return cls._expr_small_minus(a, x)
return (1 + x)**a*exp(2*n*pi*I*a)
class HyperRep_power2(HyperRep):
""" Return a representative for hyper([a, a - 1/2], [2*a], z). """
@classmethod
def _expr_small(cls, a, x):
return 2**(2*a - 1)*(1 + sqrt(1 - x))**(1 - 2*a)
@classmethod
def _expr_small_minus(cls, a, x):
return 2**(2*a - 1)*(1 + sqrt(1 + x))**(1 - 2*a)
@classmethod
def _expr_big(cls, a, x, n):
sgn = -1
if n.is_odd:
sgn = 1
n -= 1
return 2**(2*a - 1)*(1 + sgn*I*sqrt(x - 1))**(1 - 2*a) \
*exp(-2*n*pi*I*a)
@classmethod
def _expr_big_minus(cls, a, x, n):
sgn = 1
if n.is_odd:
sgn = -1
return sgn*2**(2*a - 1)*(sqrt(1 + x) + sgn)**(1 - 2*a)*exp(-2*pi*I*a*n)
class HyperRep_log1(HyperRep):
""" Represent -z*hyper([1, 1], [2], z) == log(1 - z). """
@classmethod
def _expr_small(cls, x):
return log(1 - x)
@classmethod
def _expr_small_minus(cls, x):
return log(1 + x)
@classmethod
def _expr_big(cls, x, n):
return log(x - 1) + (2*n - 1)*pi*I
@classmethod
def _expr_big_minus(cls, x, n):
return log(1 + x) + 2*n*pi*I
class HyperRep_atanh(HyperRep):
""" Represent hyper([1/2, 1], [3/2], z) == atanh(sqrt(z))/sqrt(z). """
@classmethod
def _expr_small(cls, x):
return atanh(sqrt(x))/sqrt(x)
def _expr_small_minus(cls, x):
return atan(sqrt(x))/sqrt(x)
def _expr_big(cls, x, n):
if n.is_even:
return (acoth(sqrt(x)) + I*pi/2)/sqrt(x)
else:
return (acoth(sqrt(x)) - I*pi/2)/sqrt(x)
def _expr_big_minus(cls, x, n):
if n.is_even:
return atan(sqrt(x))/sqrt(x)
else:
return (atan(sqrt(x)) - pi)/sqrt(x)
class HyperRep_asin1(HyperRep):
""" Represent hyper([1/2, 1/2], [3/2], z) == asin(sqrt(z))/sqrt(z). """
@classmethod
def _expr_small(cls, z):
return asin(sqrt(z))/sqrt(z)
@classmethod
def _expr_small_minus(cls, z):
return asinh(sqrt(z))/sqrt(z)
@classmethod
def _expr_big(cls, z, n):
return S.NegativeOne**n*((S.Half - n)*pi/sqrt(z) + I*acosh(sqrt(z))/sqrt(z))
@classmethod
def _expr_big_minus(cls, z, n):
return S.NegativeOne**n*(asinh(sqrt(z))/sqrt(z) + n*pi*I/sqrt(z))
class HyperRep_asin2(HyperRep):
""" Represent hyper([1, 1], [3/2], z) == asin(sqrt(z))/sqrt(z)/sqrt(1-z). """
# TODO this can be nicer
@classmethod
def _expr_small(cls, z):
return HyperRep_asin1._expr_small(z) \
/HyperRep_power1._expr_small(S.Half, z)
@classmethod
def _expr_small_minus(cls, z):
return HyperRep_asin1._expr_small_minus(z) \
/HyperRep_power1._expr_small_minus(S.Half, z)
@classmethod
def _expr_big(cls, z, n):
return HyperRep_asin1._expr_big(z, n) \
/HyperRep_power1._expr_big(S.Half, z, n)
@classmethod
def _expr_big_minus(cls, z, n):
return HyperRep_asin1._expr_big_minus(z, n) \
/HyperRep_power1._expr_big_minus(S.Half, z, n)
class HyperRep_sqrts1(HyperRep):
""" Return a representative for hyper([-a, 1/2 - a], [1/2], z). """
@classmethod
def _expr_small(cls, a, z):
return ((1 - sqrt(z))**(2*a) + (1 + sqrt(z))**(2*a))/2
@classmethod
def _expr_small_minus(cls, a, z):
return (1 + z)**a*cos(2*a*atan(sqrt(z)))
@classmethod
def _expr_big(cls, a, z, n):
if n.is_even:
return ((sqrt(z) + 1)**(2*a)*exp(2*pi*I*n*a) +
(sqrt(z) - 1)**(2*a)*exp(2*pi*I*(n - 1)*a))/2
else:
n -= 1
return ((sqrt(z) - 1)**(2*a)*exp(2*pi*I*a*(n + 1)) +
(sqrt(z) + 1)**(2*a)*exp(2*pi*I*a*n))/2
@classmethod
def _expr_big_minus(cls, a, z, n):
if n.is_even:
return (1 + z)**a*exp(2*pi*I*n*a)*cos(2*a*atan(sqrt(z)))
else:
return (1 + z)**a*exp(2*pi*I*n*a)*cos(2*a*atan(sqrt(z)) - 2*pi*a)
class HyperRep_sqrts2(HyperRep):
""" Return a representative for
sqrt(z)/2*[(1-sqrt(z))**2a - (1 + sqrt(z))**2a]
== -2*z/(2*a+1) d/dz hyper([-a - 1/2, -a], [1/2], z)"""
@classmethod
def _expr_small(cls, a, z):
return sqrt(z)*((1 - sqrt(z))**(2*a) - (1 + sqrt(z))**(2*a))/2
@classmethod
def _expr_small_minus(cls, a, z):
return sqrt(z)*(1 + z)**a*sin(2*a*atan(sqrt(z)))
@classmethod
def _expr_big(cls, a, z, n):
if n.is_even:
return sqrt(z)/2*((sqrt(z) - 1)**(2*a)*exp(2*pi*I*a*(n - 1)) -
(sqrt(z) + 1)**(2*a)*exp(2*pi*I*a*n))
else:
n -= 1
return sqrt(z)/2*((sqrt(z) - 1)**(2*a)*exp(2*pi*I*a*(n + 1)) -
(sqrt(z) + 1)**(2*a)*exp(2*pi*I*a*n))
def _expr_big_minus(cls, a, z, n):
if n.is_even:
return (1 + z)**a*exp(2*pi*I*n*a)*sqrt(z)*sin(2*a*atan(sqrt(z)))
else:
return (1 + z)**a*exp(2*pi*I*n*a)*sqrt(z) \
*sin(2*a*atan(sqrt(z)) - 2*pi*a)
class HyperRep_log2(HyperRep):
""" Represent log(1/2 + sqrt(1 - z)/2) == -z/4*hyper([3/2, 1, 1], [2, 2], z) """
@classmethod
def _expr_small(cls, z):
return log(S.Half + sqrt(1 - z)/2)
@classmethod
def _expr_small_minus(cls, z):
return log(S.Half + sqrt(1 + z)/2)
@classmethod
def _expr_big(cls, z, n):
if n.is_even:
return (n - S.Half)*pi*I + log(sqrt(z)/2) + I*asin(1/sqrt(z))
else:
return (n - S.Half)*pi*I + log(sqrt(z)/2) - I*asin(1/sqrt(z))
def _expr_big_minus(cls, z, n):
if n.is_even:
return pi*I*n + log(S.Half + sqrt(1 + z)/2)
else:
return pi*I*n + log(sqrt(1 + z)/2 - S.Half)
class HyperRep_cosasin(HyperRep):
""" Represent hyper([a, -a], [1/2], z) == cos(2*a*asin(sqrt(z))). """
# Note there are many alternative expressions, e.g. as powers of a sum of
# square roots.
@classmethod
def _expr_small(cls, a, z):
return cos(2*a*asin(sqrt(z)))
@classmethod
def _expr_small_minus(cls, a, z):
return cosh(2*a*asinh(sqrt(z)))
@classmethod
def _expr_big(cls, a, z, n):
return cosh(2*a*acosh(sqrt(z)) + a*pi*I*(2*n - 1))
@classmethod
def _expr_big_minus(cls, a, z, n):
return cosh(2*a*asinh(sqrt(z)) + 2*a*pi*I*n)
class HyperRep_sinasin(HyperRep):
""" Represent 2*a*z*hyper([1 - a, 1 + a], [3/2], z)
== sqrt(z)/sqrt(1-z)*sin(2*a*asin(sqrt(z))) """
@classmethod
def _expr_small(cls, a, z):
return sqrt(z)/sqrt(1 - z)*sin(2*a*asin(sqrt(z)))
@classmethod
def _expr_small_minus(cls, a, z):
return -sqrt(z)/sqrt(1 + z)*sinh(2*a*asinh(sqrt(z)))
@classmethod
def _expr_big(cls, a, z, n):
return -1/sqrt(1 - 1/z)*sinh(2*a*acosh(sqrt(z)) + a*pi*I*(2*n - 1))
@classmethod
def _expr_big_minus(cls, a, z, n):
return -1/sqrt(1 + 1/z)*sinh(2*a*asinh(sqrt(z)) + 2*a*pi*I*n)
class appellf1(Function):
r"""
This is the Appell hypergeometric function of two variables as:
.. math ::
F_1(a,b_1,b_2,c,x,y) = \sum_{m=0}^{\infty} \sum_{n=0}^{\infty}
\frac{(a)_{m+n} (b_1)_m (b_2)_n}{(c)_{m+n}}
\frac{x^m y^n}{m! n!}.
References
==========
.. [1] https://en.wikipedia.org/wiki/Appell_series
.. [2] http://functions.wolfram.com/HypergeometricFunctions/AppellF1/
"""
@classmethod
def eval(cls, a, b1, b2, c, x, y):
if default_sort_key(b1) > default_sort_key(b2):
b1, b2 = b2, b1
x, y = y, x
return cls(a, b1, b2, c, x, y)
elif b1 == b2 and default_sort_key(x) > default_sort_key(y):
x, y = y, x
return cls(a, b1, b2, c, x, y)
if x == 0 and y == 0:
return S.One
def fdiff(self, argindex=5):
a, b1, b2, c, x, y = self.args
if argindex == 5:
return (a*b1/c)*appellf1(a + 1, b1 + 1, b2, c + 1, x, y)
elif argindex == 6:
return (a*b2/c)*appellf1(a + 1, b1, b2 + 1, c + 1, x, y)
elif argindex in (1, 2, 3, 4):
return Derivative(self, self.args[argindex-1])
else:
raise ArgumentIndexError(self, argindex)
|
cbbadf31a71dec394426a7599d9a49c83f0379e3867020f273b26f0806e6eea9
|
from sympy.core import Add, S, sympify, oo, pi, Dummy, expand_func
from sympy.core.compatibility import as_int
from sympy.core.function import Function, ArgumentIndexError
from sympy.core.logic import fuzzy_and, fuzzy_not
from sympy.core.numbers import Rational
from sympy.core.power import Pow
from sympy.functions.special.zeta_functions import zeta
from sympy.functions.special.error_functions import erf, erfc, Ei
from sympy.functions.elementary.complexes import re
from sympy.functions.elementary.exponential import exp, log
from sympy.functions.elementary.integers import ceiling, floor
from sympy.functions.elementary.miscellaneous import sqrt
from sympy.functions.elementary.trigonometric import sin, cos, cot
from sympy.functions.combinatorial.numbers import bernoulli, harmonic
from sympy.functions.combinatorial.factorials import factorial, rf, RisingFactorial
def intlike(n):
try:
as_int(n, strict=False)
return True
except ValueError:
return False
###############################################################################
############################ COMPLETE GAMMA FUNCTION ##########################
###############################################################################
class gamma(Function):
r"""
The gamma function
.. math::
\Gamma(x) := \int^{\infty}_{0} t^{x-1} e^{-t} \mathrm{d}t.
Explanation
===========
The ``gamma`` function implements the function which passes through the
values of the factorial function (i.e., $\Gamma(n) = (n - 1)!$ when n is
an integer). More generally, $\Gamma(z)$ is defined in the whole complex
plane except at the negative integers where there are simple poles.
Examples
========
>>> from sympy import S, I, pi, gamma
>>> from sympy.abc import x
Several special values are known:
>>> gamma(1)
1
>>> gamma(4)
6
>>> gamma(S(3)/2)
sqrt(pi)/2
The ``gamma`` function obeys the mirror symmetry:
>>> from sympy import conjugate
>>> conjugate(gamma(x))
gamma(conjugate(x))
Differentiation with respect to $x$ is supported:
>>> from sympy import diff
>>> diff(gamma(x), x)
gamma(x)*polygamma(0, x)
Series expansion is also supported:
>>> from sympy import series
>>> series(gamma(x), x, 0, 3)
1/x - EulerGamma + x*(EulerGamma**2/2 + pi**2/12) + x**2*(-EulerGamma*pi**2/12 + polygamma(2, 1)/6 - EulerGamma**3/6) + O(x**3)
We can numerically evaluate the ``gamma`` function to arbitrary precision
on the whole complex plane:
>>> gamma(pi).evalf(40)
2.288037795340032417959588909060233922890
>>> gamma(1+I).evalf(20)
0.49801566811835604271 - 0.15494982830181068512*I
See Also
========
lowergamma: Lower incomplete gamma function.
uppergamma: Upper incomplete gamma function.
polygamma: Polygamma function.
loggamma: Log Gamma function.
digamma: Digamma function.
trigamma: Trigamma function.
beta: Euler Beta function.
References
==========
.. [1] https://en.wikipedia.org/wiki/Gamma_function
.. [2] http://dlmf.nist.gov/5
.. [3] http://mathworld.wolfram.com/GammaFunction.html
.. [4] http://functions.wolfram.com/GammaBetaErf/Gamma/
"""
unbranched = True
_singularities = (S.ComplexInfinity,)
def fdiff(self, argindex=1):
if argindex == 1:
return self.func(self.args[0])*polygamma(0, self.args[0])
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, arg):
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.Infinity
elif intlike(arg):
if arg.is_positive:
return factorial(arg - 1)
else:
return S.ComplexInfinity
elif arg.is_Rational:
if arg.q == 2:
n = abs(arg.p) // arg.q
if arg.is_positive:
k, coeff = n, S.One
else:
n = k = n + 1
if n & 1 == 0:
coeff = S.One
else:
coeff = S.NegativeOne
for i in range(3, 2*k, 2):
coeff *= i
if arg.is_positive:
return coeff*sqrt(S.Pi) / 2**n
else:
return 2**n*sqrt(S.Pi) / coeff
def _eval_expand_func(self, **hints):
arg = self.args[0]
if arg.is_Rational:
if abs(arg.p) > arg.q:
x = Dummy('x')
n = arg.p // arg.q
p = arg.p - n*arg.q
return self.func(x + n)._eval_expand_func().subs(x, Rational(p, arg.q))
if arg.is_Add:
coeff, tail = arg.as_coeff_add()
if coeff and coeff.q != 1:
intpart = floor(coeff)
tail = (coeff - intpart,) + tail
coeff = intpart
tail = arg._new_rawargs(*tail, reeval=False)
return self.func(tail)*RisingFactorial(tail, coeff)
return self.func(*self.args)
def _eval_conjugate(self):
return self.func(self.args[0].conjugate())
def _eval_is_real(self):
x = self.args[0]
if x.is_nonpositive and x.is_integer:
return False
if intlike(x) and x <= 0:
return False
if x.is_positive or x.is_noninteger:
return True
def _eval_is_positive(self):
x = self.args[0]
if x.is_positive:
return True
elif x.is_noninteger:
return floor(x).is_even
def _eval_rewrite_as_tractable(self, z, **kwargs):
return exp(loggamma(z))
def _eval_rewrite_as_factorial(self, z, **kwargs):
return factorial(z - 1)
def _eval_nseries(self, x, n, logx, cdir=0):
x0 = self.args[0].limit(x, 0)
if not (x0.is_Integer and x0 <= 0):
return super()._eval_nseries(x, n, logx)
t = self.args[0] - x0
return (self.func(t + 1)/rf(self.args[0], -x0 + 1))._eval_nseries(x, n, logx)
def _sage_(self):
import sage.all as sage
return sage.gamma(self.args[0]._sage_())
def _eval_as_leading_term(self, x, cdir=0):
arg = self.args[0]
x0 = arg.subs(x, 0)
if x0.is_integer and x0.is_nonpositive:
n = -x0
res = (-1)**n/self.func(n + 1)
return res/(arg + n).as_leading_term(x)
elif x0.is_finite:
return self.func(x0)
####################################################
# The correct result here should be 'None'. #
# Indeed arg in not bounded as x tends to 0. #
# Consequently the series expansion does not admit #
# the leading term. #
# For compatibility reasons, the return value here #
# is the original function, i.e. gamma(arg), #
# instead of None. #
####################################################
return self.func(arg)
###############################################################################
################## LOWER and UPPER INCOMPLETE GAMMA FUNCTIONS #################
###############################################################################
class lowergamma(Function):
r"""
The lower incomplete gamma function.
Explanation
===========
It can be defined as the meromorphic continuation of
.. math::
\gamma(s, x) := \int_0^x t^{s-1} e^{-t} \mathrm{d}t = \Gamma(s) - \Gamma(s, x).
This can be shown to be the same as
.. math::
\gamma(s, x) = \frac{x^s}{s} {}_1F_1\left({s \atop s+1} \middle| -x\right),
where ${}_1F_1$ is the (confluent) hypergeometric function.
Examples
========
>>> from sympy import lowergamma, S
>>> from sympy.abc import s, x
>>> lowergamma(s, x)
lowergamma(s, x)
>>> lowergamma(3, x)
-2*(x**2/2 + x + 1)*exp(-x) + 2
>>> lowergamma(-S(1)/2, x)
-2*sqrt(pi)*erf(sqrt(x)) - 2*exp(-x)/sqrt(x)
See Also
========
gamma: Gamma function.
uppergamma: Upper incomplete gamma function.
polygamma: Polygamma function.
loggamma: Log Gamma function.
digamma: Digamma function.
trigamma: Trigamma function.
beta: Euler Beta function.
References
==========
.. [1] https://en.wikipedia.org/wiki/Incomplete_gamma_function#Lower_incomplete_Gamma_function
.. [2] Abramowitz, Milton; Stegun, Irene A., eds. (1965), Chapter 6,
Section 5, Handbook of Mathematical Functions with Formulas, Graphs,
and Mathematical Tables
.. [3] http://dlmf.nist.gov/8
.. [4] http://functions.wolfram.com/GammaBetaErf/Gamma2/
.. [5] http://functions.wolfram.com/GammaBetaErf/Gamma3/
"""
def fdiff(self, argindex=2):
from sympy import meijerg, unpolarify
if argindex == 2:
a, z = self.args
return exp(-unpolarify(z))*z**(a - 1)
elif argindex == 1:
a, z = self.args
return gamma(a)*digamma(a) - log(z)*uppergamma(a, z) \
- meijerg([], [1, 1], [0, 0, a], [], z)
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, a, x):
# For lack of a better place, we use this one to extract branching
# information. The following can be
# found in the literature (c/f references given above), albeit scattered:
# 1) For fixed x != 0, lowergamma(s, x) is an entire function of s
# 2) For fixed positive integers s, lowergamma(s, x) is an entire
# function of x.
# 3) For fixed non-positive integers s,
# lowergamma(s, exp(I*2*pi*n)*x) =
# 2*pi*I*n*(-1)**(-s)/factorial(-s) + lowergamma(s, x)
# (this follows from lowergamma(s, x).diff(x) = x**(s-1)*exp(-x)).
# 4) For fixed non-integral s,
# lowergamma(s, x) = x**s*gamma(s)*lowergamma_unbranched(s, x),
# where lowergamma_unbranched(s, x) is an entire function (in fact
# of both s and x), i.e.
# lowergamma(s, exp(2*I*pi*n)*x) = exp(2*pi*I*n*a)*lowergamma(a, x)
from sympy import unpolarify, I
if x is S.Zero:
return S.Zero
nx, n = x.extract_branch_factor()
if a.is_integer and a.is_positive:
nx = unpolarify(x)
if nx != x:
return lowergamma(a, nx)
elif a.is_integer and a.is_nonpositive:
if n != 0:
return 2*pi*I*n*(-1)**(-a)/factorial(-a) + lowergamma(a, nx)
elif n != 0:
return exp(2*pi*I*n*a)*lowergamma(a, nx)
# Special values.
if a.is_Number:
if a is S.One:
return S.One - exp(-x)
elif a is S.Half:
return sqrt(pi)*erf(sqrt(x))
elif a.is_Integer or (2*a).is_Integer:
b = a - 1
if b.is_positive:
if a.is_integer:
return factorial(b) - exp(-x) * factorial(b) * Add(*[x ** k / factorial(k) for k in range(a)])
else:
return gamma(a)*(lowergamma(S.Half, x)/sqrt(pi) - exp(-x)*Add(*[x**(k - S.Half)/gamma(S.Half + k) for k in range(1, a + S.Half)]))
if not a.is_Integer:
return (-1)**(S.Half - a)*pi*erf(sqrt(x))/gamma(1 - a) + exp(-x)*Add(*[x**(k + a - 1)*gamma(a)/gamma(a + k) for k in range(1, Rational(3, 2) - a)])
if x.is_zero:
return S.Zero
def _eval_evalf(self, prec):
from mpmath import mp, workprec
from sympy import Expr
if all(x.is_number for x in self.args):
a = self.args[0]._to_mpmath(prec)
z = self.args[1]._to_mpmath(prec)
with workprec(prec):
res = mp.gammainc(a, 0, z)
return Expr._from_mpmath(res, prec)
else:
return self
def _eval_conjugate(self):
x = self.args[1]
if x not in (S.Zero, S.NegativeInfinity):
return self.func(self.args[0].conjugate(), x.conjugate())
def _eval_rewrite_as_uppergamma(self, s, x, **kwargs):
return gamma(s) - uppergamma(s, x)
def _eval_rewrite_as_expint(self, s, x, **kwargs):
from sympy import expint
if s.is_integer and s.is_nonpositive:
return self
return self.rewrite(uppergamma).rewrite(expint)
def _eval_is_zero(self):
x = self.args[1]
if x.is_zero:
return True
class uppergamma(Function):
r"""
The upper incomplete gamma function.
Explanation
===========
It can be defined as the meromorphic continuation of
.. math::
\Gamma(s, x) := \int_x^\infty t^{s-1} e^{-t} \mathrm{d}t = \Gamma(s) - \gamma(s, x).
where $\gamma(s, x)$ is the lower incomplete gamma function,
:class:`lowergamma`. This can be shown to be the same as
.. math::
\Gamma(s, x) = \Gamma(s) - \frac{x^s}{s} {}_1F_1\left({s \atop s+1} \middle| -x\right),
where ${}_1F_1$ is the (confluent) hypergeometric function.
The upper incomplete gamma function is also essentially equivalent to the
generalized exponential integral:
.. math::
\operatorname{E}_{n}(x) = \int_{1}^{\infty}{\frac{e^{-xt}}{t^n} \, dt} = x^{n-1}\Gamma(1-n,x).
Examples
========
>>> from sympy import uppergamma, S
>>> from sympy.abc import s, x
>>> uppergamma(s, x)
uppergamma(s, x)
>>> uppergamma(3, x)
2*(x**2/2 + x + 1)*exp(-x)
>>> uppergamma(-S(1)/2, x)
-2*sqrt(pi)*erfc(sqrt(x)) + 2*exp(-x)/sqrt(x)
>>> uppergamma(-2, x)
expint(3, x)/x**2
See Also
========
gamma: Gamma function.
lowergamma: Lower incomplete gamma function.
polygamma: Polygamma function.
loggamma: Log Gamma function.
digamma: Digamma function.
trigamma: Trigamma function.
beta: Euler Beta function.
References
==========
.. [1] https://en.wikipedia.org/wiki/Incomplete_gamma_function#Upper_incomplete_Gamma_function
.. [2] Abramowitz, Milton; Stegun, Irene A., eds. (1965), Chapter 6,
Section 5, Handbook of Mathematical Functions with Formulas, Graphs,
and Mathematical Tables
.. [3] http://dlmf.nist.gov/8
.. [4] http://functions.wolfram.com/GammaBetaErf/Gamma2/
.. [5] http://functions.wolfram.com/GammaBetaErf/Gamma3/
.. [6] https://en.wikipedia.org/wiki/Exponential_integral#Relation_with_other_functions
"""
def fdiff(self, argindex=2):
from sympy import meijerg, unpolarify
if argindex == 2:
a, z = self.args
return -exp(-unpolarify(z))*z**(a - 1)
elif argindex == 1:
a, z = self.args
return uppergamma(a, z)*log(z) + meijerg([], [1, 1], [0, 0, a], [], z)
else:
raise ArgumentIndexError(self, argindex)
def _eval_evalf(self, prec):
from mpmath import mp, workprec
from sympy import Expr
if all(x.is_number for x in self.args):
a = self.args[0]._to_mpmath(prec)
z = self.args[1]._to_mpmath(prec)
with workprec(prec):
res = mp.gammainc(a, z, mp.inf)
return Expr._from_mpmath(res, prec)
return self
@classmethod
def eval(cls, a, z):
from sympy import unpolarify, I, expint
if z.is_Number:
if z is S.NaN:
return S.NaN
elif z is S.Infinity:
return S.Zero
elif z.is_zero:
if re(a).is_positive:
return gamma(a)
# We extract branching information here. C/f lowergamma.
nx, n = z.extract_branch_factor()
if a.is_integer and a.is_positive:
nx = unpolarify(z)
if z != nx:
return uppergamma(a, nx)
elif a.is_integer and a.is_nonpositive:
if n != 0:
return -2*pi*I*n*(-1)**(-a)/factorial(-a) + uppergamma(a, nx)
elif n != 0:
return gamma(a)*(1 - exp(2*pi*I*n*a)) + exp(2*pi*I*n*a)*uppergamma(a, nx)
# Special values.
if a.is_Number:
if a is S.Zero and z.is_positive:
return -Ei(-z)
elif a is S.One:
return exp(-z)
elif a is S.Half:
return sqrt(pi)*erfc(sqrt(z))
elif a.is_Integer or (2*a).is_Integer:
b = a - 1
if b.is_positive:
if a.is_integer:
return exp(-z) * factorial(b) * Add(*[z**k / factorial(k) for k in range(a)])
else:
return gamma(a) * erfc(sqrt(z)) + (-1)**(a - S(3)/2) * exp(-z) * sqrt(z) * Add(*[gamma(-S.Half - k) * (-z)**k / gamma(1-a) for k in range(a - S.Half)])
elif b.is_Integer:
return expint(-b, z)*unpolarify(z)**(b + 1)
if not a.is_Integer:
return (-1)**(S.Half - a) * pi*erfc(sqrt(z))/gamma(1-a) - z**a * exp(-z) * Add(*[z**k * gamma(a) / gamma(a+k+1) for k in range(S.Half - a)])
if a.is_zero and z.is_positive:
return -Ei(-z)
if z.is_zero and re(a).is_positive:
return gamma(a)
def _eval_conjugate(self):
z = self.args[1]
if not z in (S.Zero, S.NegativeInfinity):
return self.func(self.args[0].conjugate(), z.conjugate())
def _eval_rewrite_as_lowergamma(self, s, x, **kwargs):
return gamma(s) - lowergamma(s, x)
def _eval_rewrite_as_expint(self, s, x, **kwargs):
from sympy import expint
return expint(1 - s, x)*x**s
def _sage_(self):
import sage.all as sage
return sage.gamma(self.args[0]._sage_(), self.args[1]._sage_())
###############################################################################
###################### POLYGAMMA and LOGGAMMA FUNCTIONS #######################
###############################################################################
class polygamma(Function):
r"""
The function ``polygamma(n, z)`` returns ``log(gamma(z)).diff(n + 1)``.
Explanation
===========
It is a meromorphic function on $\mathbb{C}$ and defined as the $(n+1)$-th
derivative of the logarithm of the gamma function:
.. math::
\psi^{(n)} (z) := \frac{\mathrm{d}^{n+1}}{\mathrm{d} z^{n+1}} \log\Gamma(z).
Examples
========
Several special values are known:
>>> from sympy import S, polygamma
>>> polygamma(0, 1)
-EulerGamma
>>> polygamma(0, 1/S(2))
-2*log(2) - EulerGamma
>>> polygamma(0, 1/S(3))
-log(3) - sqrt(3)*pi/6 - EulerGamma - log(sqrt(3))
>>> polygamma(0, 1/S(4))
-pi/2 - log(4) - log(2) - EulerGamma
>>> polygamma(0, 2)
1 - EulerGamma
>>> polygamma(0, 23)
19093197/5173168 - EulerGamma
>>> from sympy import oo, I
>>> polygamma(0, oo)
oo
>>> polygamma(0, -oo)
oo
>>> polygamma(0, I*oo)
oo
>>> polygamma(0, -I*oo)
oo
Differentiation with respect to $x$ is supported:
>>> from sympy import Symbol, diff
>>> x = Symbol("x")
>>> diff(polygamma(0, x), x)
polygamma(1, x)
>>> diff(polygamma(0, x), x, 2)
polygamma(2, x)
>>> diff(polygamma(0, x), x, 3)
polygamma(3, x)
>>> diff(polygamma(1, x), x)
polygamma(2, x)
>>> diff(polygamma(1, x), x, 2)
polygamma(3, x)
>>> diff(polygamma(2, x), x)
polygamma(3, x)
>>> diff(polygamma(2, x), x, 2)
polygamma(4, x)
>>> n = Symbol("n")
>>> diff(polygamma(n, x), x)
polygamma(n + 1, x)
>>> diff(polygamma(n, x), x, 2)
polygamma(n + 2, x)
We can rewrite ``polygamma`` functions in terms of harmonic numbers:
>>> from sympy import harmonic
>>> polygamma(0, x).rewrite(harmonic)
harmonic(x - 1) - EulerGamma
>>> polygamma(2, x).rewrite(harmonic)
2*harmonic(x - 1, 3) - 2*zeta(3)
>>> ni = Symbol("n", integer=True)
>>> polygamma(ni, x).rewrite(harmonic)
(-1)**(n + 1)*(-harmonic(x - 1, n + 1) + zeta(n + 1))*factorial(n)
See Also
========
gamma: Gamma function.
lowergamma: Lower incomplete gamma function.
uppergamma: Upper incomplete gamma function.
loggamma: Log Gamma function.
digamma: Digamma function.
trigamma: Trigamma function.
beta: Euler Beta function.
References
==========
.. [1] https://en.wikipedia.org/wiki/Polygamma_function
.. [2] http://mathworld.wolfram.com/PolygammaFunction.html
.. [3] http://functions.wolfram.com/GammaBetaErf/PolyGamma/
.. [4] http://functions.wolfram.com/GammaBetaErf/PolyGamma2/
"""
def _eval_evalf(self, prec):
n = self.args[0]
# the mpmath polygamma implementation valid only for nonnegative integers
if n.is_number and n.is_real:
if (n.is_integer or n == int(n)) and n.is_nonnegative:
return super()._eval_evalf(prec)
def fdiff(self, argindex=2):
if argindex == 2:
n, z = self.args[:2]
return polygamma(n + 1, z)
else:
raise ArgumentIndexError(self, argindex)
def _eval_is_real(self):
if self.args[0].is_positive and self.args[1].is_positive:
return True
def _eval_is_complex(self):
z = self.args[1]
is_negative_integer = fuzzy_and([z.is_negative, z.is_integer])
return fuzzy_and([z.is_complex, fuzzy_not(is_negative_integer)])
def _eval_is_positive(self):
if self.args[0].is_positive and self.args[1].is_positive:
return self.args[0].is_odd
def _eval_is_negative(self):
if self.args[0].is_positive and self.args[1].is_positive:
return self.args[0].is_even
def _eval_aseries(self, n, args0, x, logx):
from sympy import Order
if args0[1] != oo or not \
(self.args[0].is_Integer and self.args[0].is_nonnegative):
return super()._eval_aseries(n, args0, x, logx)
z = self.args[1]
N = self.args[0]
if N == 0:
# digamma function series
# Abramowitz & Stegun, p. 259, 6.3.18
r = log(z) - 1/(2*z)
o = None
if n < 2:
o = Order(1/z, x)
else:
m = ceiling((n + 1)//2)
l = [bernoulli(2*k) / (2*k*z**(2*k)) for k in range(1, m)]
r -= Add(*l)
o = Order(1/z**n, x)
return r._eval_nseries(x, n, logx) + o
else:
# proper polygamma function
# Abramowitz & Stegun, p. 260, 6.4.10
# We return terms to order higher than O(x**n) on purpose
# -- otherwise we would not be able to return any terms for
# quite a long time!
fac = gamma(N)
e0 = fac + N*fac/(2*z)
m = ceiling((n + 1)//2)
for k in range(1, m):
fac = fac*(2*k + N - 1)*(2*k + N - 2) / ((2*k)*(2*k - 1))
e0 += bernoulli(2*k)*fac/z**(2*k)
o = Order(1/z**(2*m), x)
if n == 0:
o = Order(1/z, x)
elif n == 1:
o = Order(1/z**2, x)
r = e0._eval_nseries(z, n, logx) + o
return (-1 * (-1/z)**N * r)._eval_nseries(x, n, logx)
@classmethod
def eval(cls, n, z):
n, z = map(sympify, (n, z))
from sympy import unpolarify
if n.is_integer:
if n.is_nonnegative:
nz = unpolarify(z)
if z != nz:
return polygamma(n, nz)
if n.is_positive:
if z is S.Half:
return (-1)**(n + 1)*factorial(n)*(2**(n + 1) - 1)*zeta(n + 1)
if n is S.NegativeOne:
return loggamma(z)
else:
if z.is_Number:
if z is S.NaN:
return S.NaN
elif z is S.Infinity:
if n.is_Number:
if n.is_zero:
return S.Infinity
else:
return S.Zero
if n.is_zero:
return S.Infinity
elif z.is_Integer:
if z.is_nonpositive:
return S.ComplexInfinity
else:
if n.is_zero:
return -S.EulerGamma + harmonic(z - 1, 1)
elif n.is_odd:
return (-1)**(n + 1)*factorial(n)*zeta(n + 1, z)
if n.is_zero:
if z is S.NaN:
return S.NaN
elif z.is_Rational:
p, q = z.as_numer_denom()
# only expand for small denominators to avoid creating long expressions
if q <= 5:
return expand_func(polygamma(S.Zero, z, evaluate=False))
elif z in (S.Infinity, S.NegativeInfinity):
return S.Infinity
else:
t = z.extract_multiplicatively(S.ImaginaryUnit)
if t in (S.Infinity, S.NegativeInfinity):
return S.Infinity
# TODO n == 1 also can do some rational z
def _eval_expand_func(self, **hints):
n, z = self.args
if n.is_Integer and n.is_nonnegative:
if z.is_Add:
coeff = z.args[0]
if coeff.is_Integer:
e = -(n + 1)
if coeff > 0:
tail = Add(*[Pow(
z - i, e) for i in range(1, int(coeff) + 1)])
else:
tail = -Add(*[Pow(
z + i, e) for i in range(0, int(-coeff))])
return polygamma(n, z - coeff) + (-1)**n*factorial(n)*tail
elif z.is_Mul:
coeff, z = z.as_two_terms()
if coeff.is_Integer and coeff.is_positive:
tail = [ polygamma(n, z + Rational(
i, coeff)) for i in range(0, int(coeff)) ]
if n == 0:
return Add(*tail)/coeff + log(coeff)
else:
return Add(*tail)/coeff**(n + 1)
z *= coeff
if n == 0 and z.is_Rational:
p, q = z.as_numer_denom()
# Reference:
# Values of the polygamma functions at rational arguments, J. Choi, 2007
part_1 = -S.EulerGamma - pi * cot(p * pi / q) / 2 - log(q) + Add(
*[cos(2 * k * pi * p / q) * log(2 * sin(k * pi / q)) for k in range(1, q)])
if z > 0:
n = floor(z)
z0 = z - n
return part_1 + Add(*[1 / (z0 + k) for k in range(n)])
elif z < 0:
n = floor(1 - z)
z0 = z + n
return part_1 - Add(*[1 / (z0 - 1 - k) for k in range(n)])
return polygamma(n, z)
def _eval_rewrite_as_zeta(self, n, z, **kwargs):
if n.is_integer:
if (n - S.One).is_nonnegative:
return (-1)**(n + 1)*factorial(n)*zeta(n + 1, z)
def _eval_rewrite_as_harmonic(self, n, z, **kwargs):
if n.is_integer:
if n.is_zero:
return harmonic(z - 1) - S.EulerGamma
else:
return S.NegativeOne**(n+1) * factorial(n) * (zeta(n+1) - harmonic(z-1, n+1))
def _eval_as_leading_term(self, x, cdir=0):
from sympy import Order
n, z = [a.as_leading_term(x) for a in self.args]
o = Order(z, x)
if n == 0 and o.contains(1/x):
return o.getn() * log(x)
else:
return self.func(n, z)
class loggamma(Function):
r"""
The ``loggamma`` function implements the logarithm of the
gamma function (i.e., $\log\Gamma(x)$).
Examples
========
Several special values are known. For numerical integral
arguments we have:
>>> from sympy import loggamma
>>> loggamma(-2)
oo
>>> loggamma(0)
oo
>>> loggamma(1)
0
>>> loggamma(2)
0
>>> loggamma(3)
log(2)
And for symbolic values:
>>> from sympy import Symbol
>>> n = Symbol("n", integer=True, positive=True)
>>> loggamma(n)
log(gamma(n))
>>> loggamma(-n)
oo
For half-integral values:
>>> from sympy import S
>>> loggamma(S(5)/2)
log(3*sqrt(pi)/4)
>>> loggamma(n/2)
log(2**(1 - n)*sqrt(pi)*gamma(n)/gamma(n/2 + 1/2))
And general rational arguments:
>>> from sympy import expand_func
>>> L = loggamma(S(16)/3)
>>> expand_func(L).doit()
-5*log(3) + loggamma(1/3) + log(4) + log(7) + log(10) + log(13)
>>> L = loggamma(S(19)/4)
>>> expand_func(L).doit()
-4*log(4) + loggamma(3/4) + log(3) + log(7) + log(11) + log(15)
>>> L = loggamma(S(23)/7)
>>> expand_func(L).doit()
-3*log(7) + log(2) + loggamma(2/7) + log(9) + log(16)
The ``loggamma`` function has the following limits towards infinity:
>>> from sympy import oo
>>> loggamma(oo)
oo
>>> loggamma(-oo)
zoo
The ``loggamma`` function obeys the mirror symmetry
if $x \in \mathbb{C} \setminus \{-\infty, 0\}$:
>>> from sympy.abc import x
>>> from sympy import conjugate
>>> conjugate(loggamma(x))
loggamma(conjugate(x))
Differentiation with respect to $x$ is supported:
>>> from sympy import diff
>>> diff(loggamma(x), x)
polygamma(0, x)
Series expansion is also supported:
>>> from sympy import series
>>> series(loggamma(x), x, 0, 4).cancel()
-log(x) - EulerGamma*x + pi**2*x**2/12 + x**3*polygamma(2, 1)/6 + O(x**4)
We can numerically evaluate the ``gamma`` function to arbitrary precision
on the whole complex plane:
>>> from sympy import I
>>> loggamma(5).evalf(30)
3.17805383034794561964694160130
>>> loggamma(I).evalf(20)
-0.65092319930185633889 - 1.8724366472624298171*I
See Also
========
gamma: Gamma function.
lowergamma: Lower incomplete gamma function.
uppergamma: Upper incomplete gamma function.
polygamma: Polygamma function.
digamma: Digamma function.
trigamma: Trigamma function.
beta: Euler Beta function.
References
==========
.. [1] https://en.wikipedia.org/wiki/Gamma_function
.. [2] http://dlmf.nist.gov/5
.. [3] http://mathworld.wolfram.com/LogGammaFunction.html
.. [4] http://functions.wolfram.com/GammaBetaErf/LogGamma/
"""
@classmethod
def eval(cls, z):
z = sympify(z)
if z.is_integer:
if z.is_nonpositive:
return S.Infinity
elif z.is_positive:
return log(gamma(z))
elif z.is_rational:
p, q = z.as_numer_denom()
# Half-integral values:
if p.is_positive and q == 2:
return log(sqrt(S.Pi) * 2**(1 - p) * gamma(p) / gamma((p + 1)*S.Half))
if z is S.Infinity:
return S.Infinity
elif abs(z) is S.Infinity:
return S.ComplexInfinity
if z is S.NaN:
return S.NaN
def _eval_expand_func(self, **hints):
from sympy import Sum
z = self.args[0]
if z.is_Rational:
p, q = z.as_numer_denom()
# General rational arguments (u + p/q)
# Split z as n + p/q with p < q
n = p // q
p = p - n*q
if p.is_positive and q.is_positive and p < q:
k = Dummy("k")
if n.is_positive:
return loggamma(p / q) - n*log(q) + Sum(log((k - 1)*q + p), (k, 1, n))
elif n.is_negative:
return loggamma(p / q) - n*log(q) + S.Pi*S.ImaginaryUnit*n - Sum(log(k*q - p), (k, 1, -n))
elif n.is_zero:
return loggamma(p / q)
return self
def _eval_nseries(self, x, n, logx=None, cdir=0):
x0 = self.args[0].limit(x, 0)
if x0.is_zero:
f = self._eval_rewrite_as_intractable(*self.args)
return f._eval_nseries(x, n, logx)
return super()._eval_nseries(x, n, logx)
def _eval_aseries(self, n, args0, x, logx):
from sympy import Order
if args0[0] != oo:
return super()._eval_aseries(n, args0, x, logx)
z = self.args[0]
r = log(z)*(z - S.Half) - z + log(2*pi)/2
l = [bernoulli(2*k) / (2*k*(2*k - 1)*z**(2*k - 1)) for k in range(1, n)]
o = None
if n == 0:
o = Order(1, x)
else:
o = Order(1/z**n, x)
# It is very inefficient to first add the order and then do the nseries
return (r + Add(*l))._eval_nseries(x, n, logx) + o
def _eval_rewrite_as_intractable(self, z, **kwargs):
return log(gamma(z))
def _eval_is_real(self):
z = self.args[0]
if z.is_positive:
return True
elif z.is_nonpositive:
return False
def _eval_conjugate(self):
z = self.args[0]
if not z in (S.Zero, S.NegativeInfinity):
return self.func(z.conjugate())
def fdiff(self, argindex=1):
if argindex == 1:
return polygamma(0, self.args[0])
else:
raise ArgumentIndexError(self, argindex)
def _sage_(self):
import sage.all as sage
return sage.log_gamma(self.args[0]._sage_())
class digamma(Function):
r"""
The ``digamma`` function is the first derivative of the ``loggamma``
function
.. math::
\psi(x) := \frac{\mathrm{d}}{\mathrm{d} z} \log\Gamma(z)
= \frac{\Gamma'(z)}{\Gamma(z) }.
In this case, ``digamma(z) = polygamma(0, z)``.
Examples
========
>>> from sympy import digamma
>>> digamma(0)
zoo
>>> from sympy import Symbol
>>> z = Symbol('z')
>>> digamma(z)
polygamma(0, z)
To retain ``digamma`` as it is:
>>> digamma(0, evaluate=False)
digamma(0)
>>> digamma(z, evaluate=False)
digamma(z)
See Also
========
gamma: Gamma function.
lowergamma: Lower incomplete gamma function.
uppergamma: Upper incomplete gamma function.
polygamma: Polygamma function.
loggamma: Log Gamma function.
trigamma: Trigamma function.
beta: Euler Beta function.
References
==========
.. [1] https://en.wikipedia.org/wiki/Digamma_function
.. [2] http://mathworld.wolfram.com/DigammaFunction.html
.. [3] http://functions.wolfram.com/GammaBetaErf/PolyGamma2/
"""
def _eval_evalf(self, prec):
z = self.args[0]
return polygamma(0, z).evalf(prec)
def fdiff(self, argindex=1):
z = self.args[0]
return polygamma(0, z).fdiff()
def _eval_is_real(self):
z = self.args[0]
return polygamma(0, z).is_real
def _eval_is_positive(self):
z = self.args[0]
return polygamma(0, z).is_positive
def _eval_is_negative(self):
z = self.args[0]
return polygamma(0, z).is_negative
def _eval_aseries(self, n, args0, x, logx):
as_polygamma = self.rewrite(polygamma)
args0 = [S.Zero,] + args0
return as_polygamma._eval_aseries(n, args0, x, logx)
@classmethod
def eval(cls, z):
return polygamma(0, z)
def _eval_expand_func(self, **hints):
z = self.args[0]
return polygamma(0, z).expand(func=True)
def _eval_rewrite_as_harmonic(self, z, **kwargs):
return harmonic(z - 1) - S.EulerGamma
def _eval_rewrite_as_polygamma(self, z, **kwargs):
return polygamma(0, z)
def _eval_as_leading_term(self, x, cdir=0):
z = self.args[0]
return polygamma(0, z).as_leading_term(x)
class trigamma(Function):
r"""
The ``trigamma`` function is the second derivative of the ``loggamma``
function
.. math::
\psi^{(1)}(z) := \frac{\mathrm{d}^{2}}{\mathrm{d} z^{2}} \log\Gamma(z).
In this case, ``trigamma(z) = polygamma(1, z)``.
Examples
========
>>> from sympy import trigamma
>>> trigamma(0)
zoo
>>> from sympy import Symbol
>>> z = Symbol('z')
>>> trigamma(z)
polygamma(1, z)
To retain ``trigamma`` as it is:
>>> trigamma(0, evaluate=False)
trigamma(0)
>>> trigamma(z, evaluate=False)
trigamma(z)
See Also
========
gamma: Gamma function.
lowergamma: Lower incomplete gamma function.
uppergamma: Upper incomplete gamma function.
polygamma: Polygamma function.
loggamma: Log Gamma function.
digamma: Digamma function.
beta: Euler Beta function.
References
==========
.. [1] https://en.wikipedia.org/wiki/Trigamma_function
.. [2] http://mathworld.wolfram.com/TrigammaFunction.html
.. [3] http://functions.wolfram.com/GammaBetaErf/PolyGamma2/
"""
def _eval_evalf(self, prec):
z = self.args[0]
return polygamma(1, z).evalf(prec)
def fdiff(self, argindex=1):
z = self.args[0]
return polygamma(1, z).fdiff()
def _eval_is_real(self):
z = self.args[0]
return polygamma(1, z).is_real
def _eval_is_positive(self):
z = self.args[0]
return polygamma(1, z).is_positive
def _eval_is_negative(self):
z = self.args[0]
return polygamma(1, z).is_negative
def _eval_aseries(self, n, args0, x, logx):
as_polygamma = self.rewrite(polygamma)
args0 = [S.One,] + args0
return as_polygamma._eval_aseries(n, args0, x, logx)
@classmethod
def eval(cls, z):
return polygamma(1, z)
def _eval_expand_func(self, **hints):
z = self.args[0]
return polygamma(1, z).expand(func=True)
def _eval_rewrite_as_zeta(self, z, **kwargs):
return zeta(2, z)
def _eval_rewrite_as_polygamma(self, z, **kwargs):
return polygamma(1, z)
def _eval_rewrite_as_harmonic(self, z, **kwargs):
return -harmonic(z - 1, 2) + S.Pi**2 / 6
def _eval_as_leading_term(self, x, cdir=0):
z = self.args[0]
return polygamma(1, z).as_leading_term(x)
###############################################################################
##################### COMPLETE MULTIVARIATE GAMMA FUNCTION ####################
###############################################################################
class multigamma(Function):
r"""
The multivariate gamma function is a generalization of the gamma function
.. math::
\Gamma_p(z) = \pi^{p(p-1)/4}\prod_{k=1}^p \Gamma[z + (1 - k)/2].
In a special case, ``multigamma(x, 1) = gamma(x)``.
Examples
========
>>> from sympy import S, multigamma
>>> from sympy import Symbol
>>> x = Symbol('x')
>>> p = Symbol('p', positive=True, integer=True)
>>> multigamma(x, p)
pi**(p*(p - 1)/4)*Product(gamma(-_k/2 + x + 1/2), (_k, 1, p))
Several special values are known:
>>> multigamma(1, 1)
1
>>> multigamma(4, 1)
6
>>> multigamma(S(3)/2, 1)
sqrt(pi)/2
Writing ``multigamma`` in terms of the ``gamma`` function:
>>> multigamma(x, 1)
gamma(x)
>>> multigamma(x, 2)
sqrt(pi)*gamma(x)*gamma(x - 1/2)
>>> multigamma(x, 3)
pi**(3/2)*gamma(x)*gamma(x - 1)*gamma(x - 1/2)
Parameters
==========
p : order or dimension of the multivariate gamma function
See Also
========
gamma, lowergamma, uppergamma, polygamma, loggamma, digamma, trigamma,
beta
References
==========
.. [1] https://en.wikipedia.org/wiki/Multivariate_gamma_function
"""
unbranched = True
def fdiff(self, argindex=2):
from sympy import Sum
if argindex == 2:
x, p = self.args
k = Dummy("k")
return self.func(x, p)*Sum(polygamma(0, x + (1 - k)/2), (k, 1, p))
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, x, p):
from sympy import Product
x, p = map(sympify, (x, p))
if p.is_positive is False or p.is_integer is False:
raise ValueError('Order parameter p must be positive integer.')
k = Dummy("k")
return (pi**(p*(p - 1)/4)*Product(gamma(x + (1 - k)/2),
(k, 1, p))).doit()
def _eval_conjugate(self):
x, p = self.args
return self.func(x.conjugate(), p)
def _eval_is_real(self):
x, p = self.args
y = 2*x
if y.is_integer and (y <= (p - 1)) is True:
return False
if intlike(y) and (y <= (p - 1)):
return False
if y > (p - 1) or y.is_noninteger:
return True
|
178a37a20772a9e75525b89f453d5b34edef554a286274220d5943b756c59a44
|
from sympy.core import S, sympify, diff
from sympy.core.decorators import deprecated
from sympy.core.function import Function, ArgumentIndexError
from sympy.core.logic import fuzzy_not
from sympy.core.relational import Eq, Ne
from sympy.functions.elementary.complexes import im, sign
from sympy.functions.elementary.piecewise import Piecewise
from sympy.polys.polyerrors import PolynomialError
from sympy.utilities import filldedent
###############################################################################
################################ DELTA FUNCTION ###############################
###############################################################################
class DiracDelta(Function):
r"""
The DiracDelta function and its derivatives.
Explanation
===========
DiracDelta is not an ordinary function. It can be rigorously defined either
as a distribution or as a measure.
DiracDelta only makes sense in definite integrals, and in particular,
integrals of the form ``Integral(f(x)*DiracDelta(x - x0), (x, a, b))``,
where it equals ``f(x0)`` if ``a <= x0 <= b`` and ``0`` otherwise. Formally,
DiracDelta acts in some ways like a function that is ``0`` everywhere except
at ``0``, but in many ways it also does not. It can often be useful to treat
DiracDelta in formal ways, building up and manipulating expressions with
delta functions (which may eventually be integrated), but care must be taken
to not treat it as a real function. SymPy's ``oo`` is similar. It only
truly makes sense formally in certain contexts (such as integration limits),
but SymPy allows its use everywhere, and it tries to be consistent with
operations on it (like ``1/oo``), but it is easy to get into trouble and get
wrong results if ``oo`` is treated too much like a number. Similarly, if
DiracDelta is treated too much like a function, it is easy to get wrong or
nonsensical results.
DiracDelta function has the following properties:
1) $\frac{d}{d x} \theta(x) = \delta(x)$
2) $\int_{-\infty}^\infty \delta(x - a)f(x)\, dx = f(a)$ and $\int_{a-
\epsilon}^{a+\epsilon} \delta(x - a)f(x)\, dx = f(a)$
3) $\delta(x) = 0$ for all $x \neq 0$
4) $\delta(g(x)) = \sum_i \frac{\delta(x - x_i)}{\|g'(x_i)\|}$ where $x_i$
are the roots of $g$
5) $\delta(-x) = \delta(x)$
Derivatives of ``k``-th order of DiracDelta have the following properties:
6) $\delta(x, k) = 0$ for all $x \neq 0$
7) $\delta(-x, k) = -\delta(x, k)$ for odd $k$
8) $\delta(-x, k) = \delta(x, k)$ for even $k$
Examples
========
>>> from sympy import DiracDelta, diff, pi
>>> from sympy.abc import x, y
>>> DiracDelta(x)
DiracDelta(x)
>>> DiracDelta(1)
0
>>> DiracDelta(-1)
0
>>> DiracDelta(pi)
0
>>> DiracDelta(x - 4).subs(x, 4)
DiracDelta(0)
>>> diff(DiracDelta(x))
DiracDelta(x, 1)
>>> diff(DiracDelta(x - 1),x,2)
DiracDelta(x - 1, 2)
>>> diff(DiracDelta(x**2 - 1),x,2)
2*(2*x**2*DiracDelta(x**2 - 1, 2) + DiracDelta(x**2 - 1, 1))
>>> DiracDelta(3*x).is_simple(x)
True
>>> DiracDelta(x**2).is_simple(x)
False
>>> DiracDelta((x**2 - 1)*y).expand(diracdelta=True, wrt=x)
DiracDelta(x - 1)/(2*Abs(y)) + DiracDelta(x + 1)/(2*Abs(y))
See Also
========
Heaviside
sympy.simplify.simplify.simplify, is_simple
sympy.functions.special.tensor_functions.KroneckerDelta
References
==========
.. [1] http://mathworld.wolfram.com/DeltaFunction.html
"""
is_real = True
def fdiff(self, argindex=1):
"""
Returns the first derivative of a DiracDelta Function.
Explanation
===========
The difference between ``diff()`` and ``fdiff()`` is: ``diff()`` is the
user-level function and ``fdiff()`` is an object method. ``fdiff()`` is
a convenience method available in the ``Function`` class. It returns
the derivative of the function without considering the chain rule.
``diff(function, x)`` calls ``Function._eval_derivative`` which in turn
calls ``fdiff()`` internally to compute the derivative of the function.
Examples
========
>>> from sympy import DiracDelta, diff
>>> from sympy.abc import x
>>> DiracDelta(x).fdiff()
DiracDelta(x, 1)
>>> DiracDelta(x, 1).fdiff()
DiracDelta(x, 2)
>>> DiracDelta(x**2 - 1).fdiff()
DiracDelta(x**2 - 1, 1)
>>> diff(DiracDelta(x, 1)).fdiff()
DiracDelta(x, 3)
Parameters
==========
argindex : integer
degree of derivative
"""
if argindex == 1:
#I didn't know if there is a better way to handle default arguments
k = 0
if len(self.args) > 1:
k = self.args[1]
return self.func(self.args[0], k + 1)
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, arg, k=0):
"""
Returns a simplified form or a value of DiracDelta depending on the
argument passed by the DiracDelta object.
Explanation
===========
The ``eval()`` method is automatically called when the ``DiracDelta``
class is about to be instantiated and it returns either some simplified
instance or the unevaluated instance depending on the argument passed.
In other words, ``eval()`` method is not needed to be called explicitly,
it is being called and evaluated once the object is called.
Examples
========
>>> from sympy import DiracDelta, S
>>> from sympy.abc import x
>>> DiracDelta(x)
DiracDelta(x)
>>> DiracDelta(-x, 1)
-DiracDelta(x, 1)
>>> DiracDelta(1)
0
>>> DiracDelta(5, 1)
0
>>> DiracDelta(0)
DiracDelta(0)
>>> DiracDelta(-1)
0
>>> DiracDelta(S.NaN)
nan
>>> DiracDelta(x).eval(1)
0
>>> DiracDelta(x - 100).subs(x, 5)
0
>>> DiracDelta(x - 100).subs(x, 100)
DiracDelta(0)
Parameters
==========
k : integer
order of derivative
arg : argument passed to DiracDelta
"""
k = sympify(k)
if not k.is_Integer or k.is_negative:
raise ValueError("Error: the second argument of DiracDelta must be \
a non-negative integer, %s given instead." % (k,))
arg = sympify(arg)
if arg is S.NaN:
return S.NaN
if arg.is_nonzero:
return S.Zero
if fuzzy_not(im(arg).is_zero):
raise ValueError(filldedent('''
Function defined only for Real Values.
Complex part: %s found in %s .''' % (
repr(im(arg)), repr(arg))))
c, nc = arg.args_cnc()
if c and c[0] is S.NegativeOne:
# keep this fast and simple instead of using
# could_extract_minus_sign
if k.is_odd:
return -cls(-arg, k)
elif k.is_even:
return cls(-arg, k) if k else cls(-arg)
@deprecated(useinstead="expand(diracdelta=True, wrt=x)", issue=12859, deprecated_since_version="1.1")
def simplify(self, x, **kwargs):
return self.expand(diracdelta=True, wrt=x)
def _eval_expand_diracdelta(self, **hints):
"""
Compute a simplified representation of the function using
property number 4. Pass ``wrt`` as a hint to expand the expression
with respect to a particular variable.
Explanation
===========
``wrt`` is:
- a variable with respect to which a DiracDelta expression will
get expanded.
Examples
========
>>> from sympy import DiracDelta
>>> from sympy.abc import x, y
>>> DiracDelta(x*y).expand(diracdelta=True, wrt=x)
DiracDelta(x)/Abs(y)
>>> DiracDelta(x*y).expand(diracdelta=True, wrt=y)
DiracDelta(y)/Abs(x)
>>> DiracDelta(x**2 + x - 2).expand(diracdelta=True, wrt=x)
DiracDelta(x - 1)/3 + DiracDelta(x + 2)/3
See Also
========
is_simple, Diracdelta
"""
from sympy.polys.polyroots import roots
wrt = hints.get('wrt', None)
if wrt is None:
free = self.free_symbols
if len(free) == 1:
wrt = free.pop()
else:
raise TypeError(filldedent('''
When there is more than 1 free symbol or variable in the expression,
the 'wrt' keyword is required as a hint to expand when using the
DiracDelta hint.'''))
if not self.args[0].has(wrt) or (len(self.args) > 1 and self.args[1] != 0 ):
return self
try:
argroots = roots(self.args[0], wrt)
result = 0
valid = True
darg = abs(diff(self.args[0], wrt))
for r, m in argroots.items():
if r.is_real is not False and m == 1:
result += self.func(wrt - r)/darg.subs(wrt, r)
else:
# don't handle non-real and if m != 1 then
# a polynomial will have a zero in the derivative (darg)
# at r
valid = False
break
if valid:
return result
except PolynomialError:
pass
return self
def is_simple(self, x):
"""
Tells whether the argument(args[0]) of DiracDelta is a linear
expression in *x*.
Examples
========
>>> from sympy import DiracDelta, cos
>>> from sympy.abc import x, y
>>> DiracDelta(x*y).is_simple(x)
True
>>> DiracDelta(x*y).is_simple(y)
True
>>> DiracDelta(x**2 + x - 2).is_simple(x)
False
>>> DiracDelta(cos(x)).is_simple(x)
False
Parameters
==========
x : can be a symbol
See Also
========
sympy.simplify.simplify.simplify, DiracDelta
"""
p = self.args[0].as_poly(x)
if p:
return p.degree() == 1
return False
def _eval_rewrite_as_Piecewise(self, *args, **kwargs):
"""
Represents DiracDelta in a piecewise form.
Examples
========
>>> from sympy import DiracDelta, Piecewise, Symbol
>>> x = Symbol('x')
>>> DiracDelta(x).rewrite(Piecewise)
Piecewise((DiracDelta(0), Eq(x, 0)), (0, True))
>>> DiracDelta(x - 5).rewrite(Piecewise)
Piecewise((DiracDelta(0), Eq(x - 5, 0)), (0, True))
>>> DiracDelta(x**2 - 5).rewrite(Piecewise)
Piecewise((DiracDelta(0), Eq(x**2 - 5, 0)), (0, True))
>>> DiracDelta(x - 5, 4).rewrite(Piecewise)
DiracDelta(x - 5, 4)
"""
if len(args) == 1:
return Piecewise((DiracDelta(0), Eq(args[0], 0)), (0, True))
def _eval_rewrite_as_SingularityFunction(self, *args, **kwargs):
"""
Returns the DiracDelta expression written in the form of Singularity
Functions.
"""
from sympy.solvers import solve
from sympy.functions import SingularityFunction
if self == DiracDelta(0):
return SingularityFunction(0, 0, -1)
if self == DiracDelta(0, 1):
return SingularityFunction(0, 0, -2)
free = self.free_symbols
if len(free) == 1:
x = (free.pop())
if len(args) == 1:
return SingularityFunction(x, solve(args[0], x)[0], -1)
return SingularityFunction(x, solve(args[0], x)[0], -args[1] - 1)
else:
# I don't know how to handle the case for DiracDelta expressions
# having arguments with more than one variable.
raise TypeError(filldedent('''
rewrite(SingularityFunction) doesn't support
arguments with more that 1 variable.'''))
def _sage_(self):
import sage.all as sage
return sage.dirac_delta(self.args[0]._sage_())
###############################################################################
############################## HEAVISIDE FUNCTION #############################
###############################################################################
class Heaviside(Function):
r"""
Heaviside Piecewise function.
Explanation
===========
Heaviside function has the following properties:
1) $\frac{d}{d x} \theta(x) = \delta(x)$
2) $\theta(x) = \begin{cases} 0 & \text{for}\: x < 0 \\ \text{undefined} &
\text{for}\: x = 0 \\1 & \text{for}\: x > 0 \end{cases}$
3) $\frac{d}{d x} \max(x, 0) = \theta(x)$
Heaviside(x) is printed as $\theta(x)$ with the SymPy LaTeX printer.
Regarding to the value at 0, Mathematica defines $\theta(0)=1$, but Maple
uses $\theta(0) = \text{undefined}$. Different application areas may have
specific conventions. For example, in control theory, it is common practice
to assume $\theta(0) = 0$ to match the Laplace transform of a DiracDelta
distribution.
To specify the value of Heaviside at ``x=0``, a second argument can be
given. Omit this 2nd argument or pass ``None`` to recover the default
behavior.
Examples
========
>>> from sympy import Heaviside, S
>>> from sympy.abc import x
>>> Heaviside(9)
1
>>> Heaviside(-9)
0
>>> Heaviside(0)
Heaviside(0)
>>> Heaviside(0, S.Half)
1/2
>>> (Heaviside(x) + 1).replace(Heaviside(x), Heaviside(x, 1))
Heaviside(x, 1) + 1
See Also
========
DiracDelta
References
==========
.. [1] http://mathworld.wolfram.com/HeavisideStepFunction.html
.. [2] http://dlmf.nist.gov/1.16#iv
"""
is_real = True
def fdiff(self, argindex=1):
"""
Returns the first derivative of a Heaviside Function.
Examples
========
>>> from sympy import Heaviside, diff
>>> from sympy.abc import x
>>> Heaviside(x).fdiff()
DiracDelta(x)
>>> Heaviside(x**2 - 1).fdiff()
DiracDelta(x**2 - 1)
>>> diff(Heaviside(x)).fdiff()
DiracDelta(x, 1)
Parameters
==========
argindex : integer
order of derivative
"""
if argindex == 1:
# property number 1
return DiracDelta(self.args[0])
else:
raise ArgumentIndexError(self, argindex)
def __new__(cls, arg, H0=None, **options):
if isinstance(H0, Heaviside) and len(H0.args) == 1:
H0 = None
if H0 is None:
return super(cls, cls).__new__(cls, arg, **options)
return super(cls, cls).__new__(cls, arg, H0, **options)
@classmethod
def eval(cls, arg, H0=None):
"""
Returns a simplified form or a value of Heaviside depending on the
argument passed by the Heaviside object.
Explanation
===========
The ``eval()`` method is automatically called when the ``Heaviside``
class is about to be instantiated and it returns either some simplified
instance or the unevaluated instance depending on the argument passed.
In other words, ``eval()`` method is not needed to be called explicitly,
it is being called and evaluated once the object is called.
Examples
========
>>> from sympy import Heaviside, S
>>> from sympy.abc import x
>>> Heaviside(x)
Heaviside(x)
>>> Heaviside(19)
1
>>> Heaviside(0)
Heaviside(0)
>>> Heaviside(0, 1)
1
>>> Heaviside(-5)
0
>>> Heaviside(S.NaN)
nan
>>> Heaviside(x).eval(100)
1
>>> Heaviside(x - 100).subs(x, 5)
0
>>> Heaviside(x - 100).subs(x, 105)
1
Parameters
==========
arg : argument passed by HeaviSide object
HO : boolean flag for HeaviSide Object is set to True
"""
H0 = sympify(H0)
arg = sympify(arg)
if arg.is_extended_negative:
return S.Zero
elif arg.is_extended_positive:
return S.One
elif arg.is_zero:
return H0
elif arg is S.NaN:
return S.NaN
elif fuzzy_not(im(arg).is_zero):
raise ValueError("Function defined only for Real Values. Complex part: %s found in %s ." % (repr(im(arg)), repr(arg)) )
def _eval_rewrite_as_Piecewise(self, arg, H0=None, **kwargs):
"""
Represents Heaviside in a Piecewise form.
Examples
========
>>> from sympy import Heaviside, Piecewise, Symbol
>>> x = Symbol('x')
>>> Heaviside(x).rewrite(Piecewise)
Piecewise((0, x < 0), (Heaviside(0), Eq(x, 0)), (1, x > 0))
>>> Heaviside(x - 5).rewrite(Piecewise)
Piecewise((0, x - 5 < 0), (Heaviside(0), Eq(x - 5, 0)), (1, x - 5 > 0))
>>> Heaviside(x**2 - 1).rewrite(Piecewise)
Piecewise((0, x**2 - 1 < 0), (Heaviside(0), Eq(x**2 - 1, 0)), (1, x**2 - 1 > 0))
"""
if H0 is None:
return Piecewise((0, arg < 0), (Heaviside(0), Eq(arg, 0)), (1, arg > 0))
if H0 == 0:
return Piecewise((0, arg <= 0), (1, arg > 0))
if H0 == 1:
return Piecewise((0, arg < 0), (1, arg >= 0))
return Piecewise((0, arg < 0), (H0, Eq(arg, 0)), (1, arg > 0))
def _eval_rewrite_as_sign(self, arg, H0=None, **kwargs):
"""
Represents the Heaviside function in the form of sign function.
Explanation
===========
The value of the second argument of Heaviside must specify Heaviside(0)
= 1/2 for rewritting as sign to be strictly equivalent. For easier
usage, we also allow this rewriting when Heaviside(0) is undefined.
Examples
========
>>> from sympy import Heaviside, Symbol, sign, S
>>> x = Symbol('x', real=True)
>>> Heaviside(x, H0=S.Half).rewrite(sign)
sign(x)/2 + 1/2
>>> Heaviside(x, 0).rewrite(sign)
Piecewise((sign(x)/2 + 1/2, Ne(x, 0)), (0, True))
>>> Heaviside(x - 2, H0=S.Half).rewrite(sign)
sign(x - 2)/2 + 1/2
>>> Heaviside(x**2 - 2*x + 1, H0=S.Half).rewrite(sign)
sign(x**2 - 2*x + 1)/2 + 1/2
>>> y = Symbol('y')
>>> Heaviside(y).rewrite(sign)
Heaviside(y)
>>> Heaviside(y**2 - 2*y + 1).rewrite(sign)
Heaviside(y**2 - 2*y + 1)
See Also
========
sign
"""
if arg.is_extended_real:
pw1 = Piecewise(
((sign(arg) + 1)/2, Ne(arg, 0)),
(Heaviside(0, H0=H0), True))
pw2 = Piecewise(
((sign(arg) + 1)/2, Eq(Heaviside(0, H0=H0), S(1)/2)),
(pw1, True))
return pw2
def _eval_rewrite_as_SingularityFunction(self, args, **kwargs):
"""
Returns the Heaviside expression written in the form of Singularity
Functions.
"""
from sympy.solvers import solve
from sympy.functions import SingularityFunction
if self == Heaviside(0):
return SingularityFunction(0, 0, 0)
free = self.free_symbols
if len(free) == 1:
x = (free.pop())
return SingularityFunction(x, solve(args, x)[0], 0)
# TODO
# ((x - 5)**3*Heaviside(x - 5)).rewrite(SingularityFunction) should output
# SingularityFunction(x, 5, 0) instead of (x - 5)**3*SingularityFunction(x, 5, 0)
else:
# I don't know how to handle the case for Heaviside expressions
# having arguments with more than one variable.
raise TypeError(filldedent('''
rewrite(SingularityFunction) doesn't
support arguments with more that 1 variable.'''))
def _sage_(self):
import sage.all as sage
return sage.heaviside(self.args[0]._sage_())
|
4f6136a3d68c249092036cb78d73eca2f22ec357cde3190aa38236c93e919315
|
from sympy import pi, I
from sympy.core import Dummy, sympify
from sympy.core.function import Function, ArgumentIndexError
from sympy.core.singleton import S
from sympy.functions import assoc_legendre
from sympy.functions.combinatorial.factorials import factorial
from sympy.functions.elementary.complexes import Abs
from sympy.functions.elementary.exponential import exp
from sympy.functions.elementary.miscellaneous import sqrt
from sympy.functions.elementary.trigonometric import sin, cos, cot
_x = Dummy("x")
class Ynm(Function):
r"""
Spherical harmonics defined as
.. math::
Y_n^m(\theta, \varphi) := \sqrt{\frac{(2n+1)(n-m)!}{4\pi(n+m)!}}
\exp(i m \varphi)
\mathrm{P}_n^m\left(\cos(\theta)\right)
Explanation
===========
``Ynm()`` gives the spherical harmonic function of order $n$ and $m$
in $\theta$ and $\varphi$, $Y_n^m(\theta, \varphi)$. The four
parameters are as follows: $n \geq 0$ an integer and $m$ an integer
such that $-n \leq m \leq n$ holds. The two angles are real-valued
with $\theta \in [0, \pi]$ and $\varphi \in [0, 2\pi]$.
Examples
========
>>> from sympy import Ynm, Symbol, simplify
>>> from sympy.abc import n,m
>>> theta = Symbol("theta")
>>> phi = Symbol("phi")
>>> Ynm(n, m, theta, phi)
Ynm(n, m, theta, phi)
Several symmetries are known, for the order:
>>> Ynm(n, -m, theta, phi)
(-1)**m*exp(-2*I*m*phi)*Ynm(n, m, theta, phi)
As well as for the angles:
>>> Ynm(n, m, -theta, phi)
Ynm(n, m, theta, phi)
>>> Ynm(n, m, theta, -phi)
exp(-2*I*m*phi)*Ynm(n, m, theta, phi)
For specific integers $n$ and $m$ we can evaluate the harmonics
to more useful expressions:
>>> simplify(Ynm(0, 0, theta, phi).expand(func=True))
1/(2*sqrt(pi))
>>> simplify(Ynm(1, -1, theta, phi).expand(func=True))
sqrt(6)*exp(-I*phi)*sin(theta)/(4*sqrt(pi))
>>> simplify(Ynm(1, 0, theta, phi).expand(func=True))
sqrt(3)*cos(theta)/(2*sqrt(pi))
>>> simplify(Ynm(1, 1, theta, phi).expand(func=True))
-sqrt(6)*exp(I*phi)*sin(theta)/(4*sqrt(pi))
>>> simplify(Ynm(2, -2, theta, phi).expand(func=True))
sqrt(30)*exp(-2*I*phi)*sin(theta)**2/(8*sqrt(pi))
>>> simplify(Ynm(2, -1, theta, phi).expand(func=True))
sqrt(30)*exp(-I*phi)*sin(2*theta)/(8*sqrt(pi))
>>> simplify(Ynm(2, 0, theta, phi).expand(func=True))
sqrt(5)*(3*cos(theta)**2 - 1)/(4*sqrt(pi))
>>> simplify(Ynm(2, 1, theta, phi).expand(func=True))
-sqrt(30)*exp(I*phi)*sin(2*theta)/(8*sqrt(pi))
>>> simplify(Ynm(2, 2, theta, phi).expand(func=True))
sqrt(30)*exp(2*I*phi)*sin(theta)**2/(8*sqrt(pi))
We can differentiate the functions with respect
to both angles:
>>> from sympy import Ynm, Symbol, diff
>>> from sympy.abc import n,m
>>> theta = Symbol("theta")
>>> phi = Symbol("phi")
>>> diff(Ynm(n, m, theta, phi), theta)
m*cot(theta)*Ynm(n, m, theta, phi) + sqrt((-m + n)*(m + n + 1))*exp(-I*phi)*Ynm(n, m + 1, theta, phi)
>>> diff(Ynm(n, m, theta, phi), phi)
I*m*Ynm(n, m, theta, phi)
Further we can compute the complex conjugation:
>>> from sympy import Ynm, Symbol, conjugate
>>> from sympy.abc import n,m
>>> theta = Symbol("theta")
>>> phi = Symbol("phi")
>>> conjugate(Ynm(n, m, theta, phi))
(-1)**(2*m)*exp(-2*I*m*phi)*Ynm(n, m, theta, phi)
To get back the well known expressions in spherical
coordinates, we use full expansion:
>>> from sympy import Ynm, Symbol, expand_func
>>> from sympy.abc import n,m
>>> theta = Symbol("theta")
>>> phi = Symbol("phi")
>>> expand_func(Ynm(n, m, theta, phi))
sqrt((2*n + 1)*factorial(-m + n)/factorial(m + n))*exp(I*m*phi)*assoc_legendre(n, m, cos(theta))/(2*sqrt(pi))
See Also
========
Ynm_c, Znm
References
==========
.. [1] https://en.wikipedia.org/wiki/Spherical_harmonics
.. [2] http://mathworld.wolfram.com/SphericalHarmonic.html
.. [3] http://functions.wolfram.com/Polynomials/SphericalHarmonicY/
.. [4] http://dlmf.nist.gov/14.30
"""
@classmethod
def eval(cls, n, m, theta, phi):
n, m, theta, phi = [sympify(x) for x in (n, m, theta, phi)]
# Handle negative index m and arguments theta, phi
if m.could_extract_minus_sign():
m = -m
return S.NegativeOne**m * exp(-2*I*m*phi) * Ynm(n, m, theta, phi)
if theta.could_extract_minus_sign():
theta = -theta
return Ynm(n, m, theta, phi)
if phi.could_extract_minus_sign():
phi = -phi
return exp(-2*I*m*phi) * Ynm(n, m, theta, phi)
# TODO Add more simplififcation here
def _eval_expand_func(self, **hints):
n, m, theta, phi = self.args
rv = (sqrt((2*n + 1)/(4*pi) * factorial(n - m)/factorial(n + m)) *
exp(I*m*phi) * assoc_legendre(n, m, cos(theta)))
# We can do this because of the range of theta
return rv.subs(sqrt(-cos(theta)**2 + 1), sin(theta))
def fdiff(self, argindex=4):
if argindex == 1:
# Diff wrt n
raise ArgumentIndexError(self, argindex)
elif argindex == 2:
# Diff wrt m
raise ArgumentIndexError(self, argindex)
elif argindex == 3:
# Diff wrt theta
n, m, theta, phi = self.args
return (m * cot(theta) * Ynm(n, m, theta, phi) +
sqrt((n - m)*(n + m + 1)) * exp(-I*phi) * Ynm(n, m + 1, theta, phi))
elif argindex == 4:
# Diff wrt phi
n, m, theta, phi = self.args
return I * m * Ynm(n, m, theta, phi)
else:
raise ArgumentIndexError(self, argindex)
def _eval_rewrite_as_polynomial(self, n, m, theta, phi, **kwargs):
# TODO: Make sure n \in N
# TODO: Assert |m| <= n ortherwise we should return 0
return self.expand(func=True)
def _eval_rewrite_as_sin(self, n, m, theta, phi, **kwargs):
return self.rewrite(cos)
def _eval_rewrite_as_cos(self, n, m, theta, phi, **kwargs):
# This method can be expensive due to extensive use of simplification!
from sympy.simplify import simplify, trigsimp
# TODO: Make sure n \in N
# TODO: Assert |m| <= n ortherwise we should return 0
term = simplify(self.expand(func=True))
# We can do this because of the range of theta
term = term.xreplace({Abs(sin(theta)):sin(theta)})
return simplify(trigsimp(term))
def _eval_conjugate(self):
# TODO: Make sure theta \in R and phi \in R
n, m, theta, phi = self.args
return S.NegativeOne**m * self.func(n, -m, theta, phi)
def as_real_imag(self, deep=True, **hints):
# TODO: Handle deep and hints
n, m, theta, phi = self.args
re = (sqrt((2*n + 1)/(4*pi) * factorial(n - m)/factorial(n + m)) *
cos(m*phi) * assoc_legendre(n, m, cos(theta)))
im = (sqrt((2*n + 1)/(4*pi) * factorial(n - m)/factorial(n + m)) *
sin(m*phi) * assoc_legendre(n, m, cos(theta)))
return (re, im)
def _eval_evalf(self, prec):
# Note: works without this function by just calling
# mpmath for Legendre polynomials. But using
# the dedicated function directly is cleaner.
from mpmath import mp, workprec
from sympy import Expr
n = self.args[0]._to_mpmath(prec)
m = self.args[1]._to_mpmath(prec)
theta = self.args[2]._to_mpmath(prec)
phi = self.args[3]._to_mpmath(prec)
with workprec(prec):
res = mp.spherharm(n, m, theta, phi)
return Expr._from_mpmath(res, prec)
def _sage_(self):
import sage.all as sage
return sage.spherical_harmonic(self.args[0]._sage_(),
self.args[1]._sage_(),
self.args[2]._sage_(),
self.args[3]._sage_())
def Ynm_c(n, m, theta, phi):
r"""
Conjugate spherical harmonics defined as
.. math::
\overline{Y_n^m(\theta, \varphi)} := (-1)^m Y_n^{-m}(\theta, \varphi).
Examples
========
>>> from sympy import Ynm_c, Symbol, simplify
>>> from sympy.abc import n,m
>>> theta = Symbol("theta")
>>> phi = Symbol("phi")
>>> Ynm_c(n, m, theta, phi)
(-1)**(2*m)*exp(-2*I*m*phi)*Ynm(n, m, theta, phi)
>>> Ynm_c(n, m, -theta, phi)
(-1)**(2*m)*exp(-2*I*m*phi)*Ynm(n, m, theta, phi)
For specific integers $n$ and $m$ we can evaluate the harmonics
to more useful expressions:
>>> simplify(Ynm_c(0, 0, theta, phi).expand(func=True))
1/(2*sqrt(pi))
>>> simplify(Ynm_c(1, -1, theta, phi).expand(func=True))
sqrt(6)*exp(I*(-phi + 2*conjugate(phi)))*sin(theta)/(4*sqrt(pi))
See Also
========
Ynm, Znm
References
==========
.. [1] https://en.wikipedia.org/wiki/Spherical_harmonics
.. [2] http://mathworld.wolfram.com/SphericalHarmonic.html
.. [3] http://functions.wolfram.com/Polynomials/SphericalHarmonicY/
"""
from sympy import conjugate
return conjugate(Ynm(n, m, theta, phi))
class Znm(Function):
r"""
Real spherical harmonics defined as
.. math::
Z_n^m(\theta, \varphi) :=
\begin{cases}
\frac{Y_n^m(\theta, \varphi) + \overline{Y_n^m(\theta, \varphi)}}{\sqrt{2}} &\quad m > 0 \\
Y_n^m(\theta, \varphi) &\quad m = 0 \\
\frac{Y_n^m(\theta, \varphi) - \overline{Y_n^m(\theta, \varphi)}}{i \sqrt{2}} &\quad m < 0 \\
\end{cases}
which gives in simplified form
.. math::
Z_n^m(\theta, \varphi) =
\begin{cases}
\frac{Y_n^m(\theta, \varphi) + (-1)^m Y_n^{-m}(\theta, \varphi)}{\sqrt{2}} &\quad m > 0 \\
Y_n^m(\theta, \varphi) &\quad m = 0 \\
\frac{Y_n^m(\theta, \varphi) - (-1)^m Y_n^{-m}(\theta, \varphi)}{i \sqrt{2}} &\quad m < 0 \\
\end{cases}
See Also
========
Ynm, Ynm_c
References
==========
.. [1] https://en.wikipedia.org/wiki/Spherical_harmonics
.. [2] http://mathworld.wolfram.com/SphericalHarmonic.html
.. [3] http://functions.wolfram.com/Polynomials/SphericalHarmonicY/
"""
@classmethod
def eval(cls, n, m, theta, phi):
n, m, th, ph = [sympify(x) for x in (n, m, theta, phi)]
if m.is_positive:
zz = (Ynm(n, m, th, ph) + Ynm_c(n, m, th, ph)) / sqrt(2)
return zz
elif m.is_zero:
return Ynm(n, m, th, ph)
elif m.is_negative:
zz = (Ynm(n, m, th, ph) - Ynm_c(n, m, th, ph)) / (sqrt(2)*I)
return zz
|
020a543aff654093a0ac27f7f706c6fba985e8d26db7da881cf11e5cdccbc769
|
from sympy.core import S, sympify
from sympy.functions import Piecewise, piecewise_fold
from sympy.sets.sets import Interval
from sympy.core.cache import lru_cache
def _ivl(cond, x):
"""return the interval corresponding to the condition
Conditions in spline's Piecewise give the range over
which an expression is valid like (lo <= x) & (x <= hi).
This function returns (lo, hi).
"""
from sympy.logic.boolalg import And
if isinstance(cond, And) and len(cond.args) == 2:
a, b = cond.args
if a.lts == x:
a, b = b, a
return a.lts, b.gts
raise TypeError('unexpected cond type: %s' % cond)
def _add_splines(c, b1, d, b2, x):
"""Construct c*b1 + d*b2."""
if b1 == S.Zero or c == S.Zero:
rv = piecewise_fold(d * b2)
elif b2 == S.Zero or d == S.Zero:
rv = piecewise_fold(c * b1)
else:
new_args = []
# Just combining the Piecewise without any fancy optimization
p1 = piecewise_fold(c * b1)
p2 = piecewise_fold(d * b2)
# Search all Piecewise arguments except (0, True)
p2args = list(p2.args[:-1])
# This merging algorithm assumes the conditions in
# p1 and p2 are sorted
for arg in p1.args[:-1]:
expr = arg.expr
cond = arg.cond
lower = _ivl(cond, x)[0]
# Check p2 for matching conditions that can be merged
for i, arg2 in enumerate(p2args):
expr2 = arg2.expr
cond2 = arg2.cond
lower_2, upper_2 = _ivl(cond2, x)
if cond2 == cond:
# Conditions match, join expressions
expr += expr2
# Remove matching element
del p2args[i]
# No need to check the rest
break
elif lower_2 < lower and upper_2 <= lower:
# Check if arg2 condition smaller than arg1,
# add to new_args by itself (no match expected
# in p1)
new_args.append(arg2)
del p2args[i]
break
# Checked all, add expr and cond
new_args.append((expr, cond))
# Add remaining items from p2args
new_args.extend(p2args)
# Add final (0, True)
new_args.append((0, True))
rv = Piecewise(*new_args, evaluate=False)
return rv.expand()
@lru_cache(maxsize=128)
def bspline_basis(d, knots, n, x):
"""
The $n$-th B-spline at $x$ of degree $d$ with knots.
Explanation
===========
B-Splines are piecewise polynomials of degree $d$. They are defined on a
set of knots, which is a sequence of integers or floats.
Examples
========
The 0th degree splines have a value of 1 on a single interval:
>>> from sympy import bspline_basis
>>> from sympy.abc import x
>>> d = 0
>>> knots = tuple(range(5))
>>> bspline_basis(d, knots, 0, x)
Piecewise((1, (x >= 0) & (x <= 1)), (0, True))
For a given ``(d, knots)`` there are ``len(knots)-d-1`` B-splines
defined, that are indexed by ``n`` (starting at 0).
Here is an example of a cubic B-spline:
>>> bspline_basis(3, tuple(range(5)), 0, x)
Piecewise((x**3/6, (x >= 0) & (x <= 1)),
(-x**3/2 + 2*x**2 - 2*x + 2/3,
(x >= 1) & (x <= 2)),
(x**3/2 - 4*x**2 + 10*x - 22/3,
(x >= 2) & (x <= 3)),
(-x**3/6 + 2*x**2 - 8*x + 32/3,
(x >= 3) & (x <= 4)),
(0, True))
By repeating knot points, you can introduce discontinuities in the
B-splines and their derivatives:
>>> d = 1
>>> knots = (0, 0, 2, 3, 4)
>>> bspline_basis(d, knots, 0, x)
Piecewise((1 - x/2, (x >= 0) & (x <= 2)), (0, True))
It is quite time consuming to construct and evaluate B-splines. If
you need to evaluate a B-spline many times, it is best to lambdify them
first:
>>> from sympy import lambdify
>>> d = 3
>>> knots = tuple(range(10))
>>> b0 = bspline_basis(d, knots, 0, x)
>>> f = lambdify(x, b0)
>>> y = f(0.5)
Parameters
==========
d : integer
degree of bspline
knots : list of integer values
list of knots points of bspline
n : integer
$n$-th B-spline
x : symbol
See Also
========
bspline_basis_set
References
==========
.. [1] https://en.wikipedia.org/wiki/B-spline
"""
from sympy.core.symbol import Dummy
# make sure x has no assumptions so conditions don't evaluate
xvar = x
x = Dummy()
knots = tuple(sympify(k) for k in knots)
d = int(d)
n = int(n)
n_knots = len(knots)
n_intervals = n_knots - 1
if n + d + 1 > n_intervals:
raise ValueError("n + d + 1 must not exceed len(knots) - 1")
if d == 0:
result = Piecewise(
(S.One, Interval(knots[n], knots[n + 1]).contains(x)), (0, True)
)
elif d > 0:
denom = knots[n + d + 1] - knots[n + 1]
if denom != S.Zero:
B = (knots[n + d + 1] - x) / denom
b2 = bspline_basis(d - 1, knots, n + 1, x)
else:
b2 = B = S.Zero
denom = knots[n + d] - knots[n]
if denom != S.Zero:
A = (x - knots[n]) / denom
b1 = bspline_basis(d - 1, knots, n, x)
else:
b1 = A = S.Zero
result = _add_splines(A, b1, B, b2, x)
else:
raise ValueError("degree must be non-negative: %r" % n)
# return result with user-given x
return result.xreplace({x: xvar})
def bspline_basis_set(d, knots, x):
"""
Return the ``len(knots)-d-1`` B-splines at *x* of degree *d*
with *knots*.
Explanation
===========
This function returns a list of piecewise polynomials that are the
``len(knots)-d-1`` B-splines of degree *d* for the given knots.
This function calls ``bspline_basis(d, knots, n, x)`` for different
values of *n*.
Examples
========
>>> from sympy import bspline_basis_set
>>> from sympy.abc import x
>>> d = 2
>>> knots = range(5)
>>> splines = bspline_basis_set(d, knots, x)
>>> splines
[Piecewise((x**2/2, (x >= 0) & (x <= 1)),
(-x**2 + 3*x - 3/2, (x >= 1) & (x <= 2)),
(x**2/2 - 3*x + 9/2, (x >= 2) & (x <= 3)),
(0, True)),
Piecewise((x**2/2 - x + 1/2, (x >= 1) & (x <= 2)),
(-x**2 + 5*x - 11/2, (x >= 2) & (x <= 3)),
(x**2/2 - 4*x + 8, (x >= 3) & (x <= 4)),
(0, True))]
Parameters
==========
d : integer
degree of bspline
knots : list of integers
list of knots points of bspline
x : symbol
See Also
========
bspline_basis
"""
n_splines = len(knots) - d - 1
return [bspline_basis(d, tuple(knots), i, x) for i in range(n_splines)]
def interpolating_spline(d, x, X, Y):
"""
Return spline of degree *d*, passing through the given *X*
and *Y* values.
Explanation
===========
This function returns a piecewise function such that each part is
a polynomial of degree not greater than *d*. The value of *d*
must be 1 or greater and the values of *X* must be strictly
increasing.
Examples
========
>>> from sympy import interpolating_spline
>>> from sympy.abc import x
>>> interpolating_spline(1, x, [1, 2, 4, 7], [3, 6, 5, 7])
Piecewise((3*x, (x >= 1) & (x <= 2)),
(7 - x/2, (x >= 2) & (x <= 4)),
(2*x/3 + 7/3, (x >= 4) & (x <= 7)))
>>> interpolating_spline(3, x, [-2, 0, 1, 3, 4], [4, 2, 1, 1, 3])
Piecewise((7*x**3/117 + 7*x**2/117 - 131*x/117 + 2, (x >= -2) & (x <= 1)),
(10*x**3/117 - 2*x**2/117 - 122*x/117 + 77/39, (x >= 1) & (x <= 4)))
Parameters
==========
d : integer
Degree of Bspline strictly greater than equal to one
x : symbol
X : list of strictly increasing integer values
list of X coordinates through which the spline passes
Y : list of strictly increasing integer values
list of Y coordinates through which the spline passes
See Also
========
bspline_basis_set, interpolating_poly
"""
from sympy import symbols, Dummy
from sympy.solvers.solveset import linsolve
from sympy.matrices.dense import Matrix
# Input sanitization
d = sympify(d)
if not (d.is_Integer and d.is_positive):
raise ValueError("Spline degree must be a positive integer, not %s." % d)
if len(X) != len(Y):
raise ValueError("Number of X and Y coordinates must be the same.")
if len(X) < d + 1:
raise ValueError("Degree must be less than the number of control points.")
if not all(a < b for a, b in zip(X, X[1:])):
raise ValueError("The x-coordinates must be strictly increasing.")
X = [sympify(i) for i in X]
# Evaluating knots value
if d.is_odd:
j = (d + 1) // 2
interior_knots = X[j:-j]
else:
j = d // 2
interior_knots = [
(a + b)/2 for a, b in zip(X[j : -j - 1], X[j + 1 : -j])
]
knots = [X[0]] * (d + 1) + list(interior_knots) + [X[-1]] * (d + 1)
basis = bspline_basis_set(d, knots, x)
A = [[b.subs(x, v) for b in basis] for v in X]
coeff = linsolve((Matrix(A), Matrix(Y)), symbols("c0:{}".format(len(X)), cls=Dummy))
coeff = list(coeff)[0]
intervals = {c for b in basis for (e, c) in b.args if c != True}
# Sorting the intervals
# ival contains the end-points of each interval
ival = [_ivl(c, x) for c in intervals]
com = zip(ival, intervals)
com = sorted(com, key=lambda x: x[0])
intervals = [y for x, y in com]
basis_dicts = [{c: e for (e, c) in b.args} for b in basis]
spline = []
for i in intervals:
piece = sum(
[c * d.get(i, S.Zero) for (c, d) in zip(coeff, basis_dicts)], S.Zero
)
spline.append((piece, i))
return Piecewise(*spline)
|
41a5b781bc14bc48b028873d4efd2ea086f9408620b796b0fdc62178b7778ea8
|
from functools import wraps
from sympy import S, pi, I, Rational, Wild, cacheit, sympify
from sympy.core.function import Function, ArgumentIndexError
from sympy.core.power import Pow
from sympy.functions.combinatorial.factorials import factorial
from sympy.functions.elementary.trigonometric import sin, cos, csc, cot
from sympy.functions.elementary.complexes import Abs
from sympy.functions.elementary.miscellaneous import sqrt, root
from sympy.functions.elementary.complexes import re, im
from sympy.functions.special.gamma_functions import gamma
from sympy.functions.special.hyper import hyper
from sympy.polys.orthopolys import spherical_bessel_fn as fn
# TODO
# o Scorer functions G1 and G2
# o Asymptotic expansions
# These are possible, e.g. for fixed order, but since the bessel type
# functions are oscillatory they are not actually tractable at
# infinity, so this is not particularly useful right now.
# o Series Expansions for functions of the second kind about zero
# o Nicer series expansions.
# o More rewriting.
# o Add solvers to ode.py (or rather add solvers for the hypergeometric equation).
class BesselBase(Function):
"""
Abstract base class for Bessel-type functions.
This class is meant to reduce code duplication.
All Bessel-type functions can 1) be differentiated, with the derivatives
expressed in terms of similar functions, and 2) be rewritten in terms
of other Bessel-type functions.
Here, Bessel-type functions are assumed to have one complex parameter.
To use this base class, define class attributes ``_a`` and ``_b`` such that
``2*F_n' = -_a*F_{n+1} + b*F_{n-1}``.
"""
@property
def order(self):
""" The order of the Bessel-type function. """
return self.args[0]
@property
def argument(self):
""" The argument of the Bessel-type function. """
return self.args[1]
@classmethod
def eval(cls, nu, z):
return
def fdiff(self, argindex=2):
if argindex != 2:
raise ArgumentIndexError(self, argindex)
return (self._b/2 * self.__class__(self.order - 1, self.argument) -
self._a/2 * self.__class__(self.order + 1, self.argument))
def _eval_conjugate(self):
z = self.argument
if z.is_extended_negative is False:
return self.__class__(self.order.conjugate(), z.conjugate())
def _eval_expand_func(self, **hints):
nu, z, f = self.order, self.argument, self.__class__
if nu.is_extended_real:
if (nu - 1).is_extended_positive:
return (-self._a*self._b*f(nu - 2, z)._eval_expand_func() +
2*self._a*(nu - 1)*f(nu - 1, z)._eval_expand_func()/z)
elif (nu + 1).is_extended_negative:
return (2*self._b*(nu + 1)*f(nu + 1, z)._eval_expand_func()/z -
self._a*self._b*f(nu + 2, z)._eval_expand_func())
return self
def _eval_simplify(self, **kwargs):
from sympy.simplify.simplify import besselsimp
return besselsimp(self)
class besselj(BesselBase):
r"""
Bessel function of the first kind.
Explanation
===========
The Bessel $J$ function of order $\nu$ is defined to be the function
satisfying Bessel's differential equation
.. math ::
z^2 \frac{\mathrm{d}^2 w}{\mathrm{d}z^2}
+ z \frac{\mathrm{d}w}{\mathrm{d}z} + (z^2 - \nu^2) w = 0,
with Laurent expansion
.. math ::
J_\nu(z) = z^\nu \left(\frac{1}{\Gamma(\nu + 1) 2^\nu} + O(z^2) \right),
if $\nu$ is not a negative integer. If $\nu=-n \in \mathbb{Z}_{<0}$
*is* a negative integer, then the definition is
.. math ::
J_{-n}(z) = (-1)^n J_n(z).
Examples
========
Create a Bessel function object:
>>> from sympy import besselj, jn
>>> from sympy.abc import z, n
>>> b = besselj(n, z)
Differentiate it:
>>> b.diff(z)
besselj(n - 1, z)/2 - besselj(n + 1, z)/2
Rewrite in terms of spherical Bessel functions:
>>> b.rewrite(jn)
sqrt(2)*sqrt(z)*jn(n - 1/2, z)/sqrt(pi)
Access the parameter and argument:
>>> b.order
n
>>> b.argument
z
See Also
========
bessely, besseli, besselk
References
==========
.. [1] Abramowitz, Milton; Stegun, Irene A., eds. (1965), "Chapter 9",
Handbook of Mathematical Functions with Formulas, Graphs, and
Mathematical Tables
.. [2] Luke, Y. L. (1969), The Special Functions and Their
Approximations, Volume 1
.. [3] https://en.wikipedia.org/wiki/Bessel_function
.. [4] http://functions.wolfram.com/Bessel-TypeFunctions/BesselJ/
"""
_a = S.One
_b = S.One
@classmethod
def eval(cls, nu, z):
if z.is_zero:
if nu.is_zero:
return S.One
elif (nu.is_integer and nu.is_zero is False) or re(nu).is_positive:
return S.Zero
elif re(nu).is_negative and not (nu.is_integer is True):
return S.ComplexInfinity
elif nu.is_imaginary:
return S.NaN
if z is S.Infinity or (z is S.NegativeInfinity):
return S.Zero
if z.could_extract_minus_sign():
return (z)**nu*(-z)**(-nu)*besselj(nu, -z)
if nu.is_integer:
if nu.could_extract_minus_sign():
return S.NegativeOne**(-nu)*besselj(-nu, z)
newz = z.extract_multiplicatively(I)
if newz: # NOTE we don't want to change the function if z==0
return I**(nu)*besseli(nu, newz)
# branch handling:
from sympy import unpolarify, exp
if nu.is_integer:
newz = unpolarify(z)
if newz != z:
return besselj(nu, newz)
else:
newz, n = z.extract_branch_factor()
if n != 0:
return exp(2*n*pi*nu*I)*besselj(nu, newz)
nnu = unpolarify(nu)
if nu != nnu:
return besselj(nnu, z)
def _eval_rewrite_as_besseli(self, nu, z, **kwargs):
from sympy import polar_lift, exp
return exp(I*pi*nu/2)*besseli(nu, polar_lift(-I)*z)
def _eval_rewrite_as_bessely(self, nu, z, **kwargs):
if nu.is_integer is False:
return csc(pi*nu)*bessely(-nu, z) - cot(pi*nu)*bessely(nu, z)
def _eval_rewrite_as_jn(self, nu, z, **kwargs):
return sqrt(2*z/pi)*jn(nu - S.Half, self.argument)
def _eval_is_extended_real(self):
nu, z = self.args
if nu.is_integer and z.is_extended_real:
return True
def _sage_(self):
import sage.all as sage
return sage.bessel_J(self.args[0]._sage_(), self.args[1]._sage_())
class bessely(BesselBase):
r"""
Bessel function of the second kind.
Explanation
===========
The Bessel $Y$ function of order $\nu$ is defined as
.. math ::
Y_\nu(z) = \lim_{\mu \to \nu} \frac{J_\mu(z) \cos(\pi \mu)
- J_{-\mu}(z)}{\sin(\pi \mu)},
where $J_\mu(z)$ is the Bessel function of the first kind.
It is a solution to Bessel's equation, and linearly independent from
$J_\nu$.
Examples
========
>>> from sympy import bessely, yn
>>> from sympy.abc import z, n
>>> b = bessely(n, z)
>>> b.diff(z)
bessely(n - 1, z)/2 - bessely(n + 1, z)/2
>>> b.rewrite(yn)
sqrt(2)*sqrt(z)*yn(n - 1/2, z)/sqrt(pi)
See Also
========
besselj, besseli, besselk
References
==========
.. [1] http://functions.wolfram.com/Bessel-TypeFunctions/BesselY/
"""
_a = S.One
_b = S.One
@classmethod
def eval(cls, nu, z):
if z.is_zero:
if nu.is_zero:
return S.NegativeInfinity
elif re(nu).is_zero is False:
return S.ComplexInfinity
elif re(nu).is_zero:
return S.NaN
if z is S.Infinity or z is S.NegativeInfinity:
return S.Zero
if nu.is_integer:
if nu.could_extract_minus_sign():
return S.NegativeOne**(-nu)*bessely(-nu, z)
def _eval_rewrite_as_besselj(self, nu, z, **kwargs):
if nu.is_integer is False:
return csc(pi*nu)*(cos(pi*nu)*besselj(nu, z) - besselj(-nu, z))
def _eval_rewrite_as_besseli(self, nu, z, **kwargs):
aj = self._eval_rewrite_as_besselj(*self.args)
if aj:
return aj.rewrite(besseli)
def _eval_rewrite_as_yn(self, nu, z, **kwargs):
return sqrt(2*z/pi) * yn(nu - S.Half, self.argument)
def _eval_is_extended_real(self):
nu, z = self.args
if nu.is_integer and z.is_positive:
return True
def _sage_(self):
import sage.all as sage
return sage.bessel_Y(self.args[0]._sage_(), self.args[1]._sage_())
class besseli(BesselBase):
r"""
Modified Bessel function of the first kind.
Explanation
===========
The Bessel $I$ function is a solution to the modified Bessel equation
.. math ::
z^2 \frac{\mathrm{d}^2 w}{\mathrm{d}z^2}
+ z \frac{\mathrm{d}w}{\mathrm{d}z} + (z^2 + \nu^2)^2 w = 0.
It can be defined as
.. math ::
I_\nu(z) = i^{-\nu} J_\nu(iz),
where $J_\nu(z)$ is the Bessel function of the first kind.
Examples
========
>>> from sympy import besseli
>>> from sympy.abc import z, n
>>> besseli(n, z).diff(z)
besseli(n - 1, z)/2 + besseli(n + 1, z)/2
See Also
========
besselj, bessely, besselk
References
==========
.. [1] http://functions.wolfram.com/Bessel-TypeFunctions/BesselI/
"""
_a = -S.One
_b = S.One
@classmethod
def eval(cls, nu, z):
if z.is_zero:
if nu.is_zero:
return S.One
elif (nu.is_integer and nu.is_zero is False) or re(nu).is_positive:
return S.Zero
elif re(nu).is_negative and not (nu.is_integer is True):
return S.ComplexInfinity
elif nu.is_imaginary:
return S.NaN
if im(z) is S.Infinity or im(z) is S.NegativeInfinity:
return S.Zero
if z.could_extract_minus_sign():
return (z)**nu*(-z)**(-nu)*besseli(nu, -z)
if nu.is_integer:
if nu.could_extract_minus_sign():
return besseli(-nu, z)
newz = z.extract_multiplicatively(I)
if newz: # NOTE we don't want to change the function if z==0
return I**(-nu)*besselj(nu, -newz)
# branch handling:
from sympy import unpolarify, exp
if nu.is_integer:
newz = unpolarify(z)
if newz != z:
return besseli(nu, newz)
else:
newz, n = z.extract_branch_factor()
if n != 0:
return exp(2*n*pi*nu*I)*besseli(nu, newz)
nnu = unpolarify(nu)
if nu != nnu:
return besseli(nnu, z)
def _eval_rewrite_as_besselj(self, nu, z, **kwargs):
from sympy import polar_lift, exp
return exp(-I*pi*nu/2)*besselj(nu, polar_lift(I)*z)
def _eval_rewrite_as_bessely(self, nu, z, **kwargs):
aj = self._eval_rewrite_as_besselj(*self.args)
if aj:
return aj.rewrite(bessely)
def _eval_rewrite_as_jn(self, nu, z, **kwargs):
return self._eval_rewrite_as_besselj(*self.args).rewrite(jn)
def _eval_is_extended_real(self):
nu, z = self.args
if nu.is_integer and z.is_extended_real:
return True
def _sage_(self):
import sage.all as sage
return sage.bessel_I(self.args[0]._sage_(), self.args[1]._sage_())
class besselk(BesselBase):
r"""
Modified Bessel function of the second kind.
Explanation
===========
The Bessel $K$ function of order $\nu$ is defined as
.. math ::
K_\nu(z) = \lim_{\mu \to \nu} \frac{\pi}{2}
\frac{I_{-\mu}(z) -I_\mu(z)}{\sin(\pi \mu)},
where $I_\mu(z)$ is the modified Bessel function of the first kind.
It is a solution of the modified Bessel equation, and linearly independent
from $Y_\nu$.
Examples
========
>>> from sympy import besselk
>>> from sympy.abc import z, n
>>> besselk(n, z).diff(z)
-besselk(n - 1, z)/2 - besselk(n + 1, z)/2
See Also
========
besselj, besseli, bessely
References
==========
.. [1] http://functions.wolfram.com/Bessel-TypeFunctions/BesselK/
"""
_a = S.One
_b = -S.One
@classmethod
def eval(cls, nu, z):
if z.is_zero:
if nu.is_zero:
return S.Infinity
elif re(nu).is_zero is False:
return S.ComplexInfinity
elif re(nu).is_zero:
return S.NaN
if im(z) is S.Infinity or im(z) is S.NegativeInfinity:
return S.Zero
if nu.is_integer:
if nu.could_extract_minus_sign():
return besselk(-nu, z)
def _eval_rewrite_as_besseli(self, nu, z, **kwargs):
if nu.is_integer is False:
return pi*csc(pi*nu)*(besseli(-nu, z) - besseli(nu, z))/2
def _eval_rewrite_as_besselj(self, nu, z, **kwargs):
ai = self._eval_rewrite_as_besseli(*self.args)
if ai:
return ai.rewrite(besselj)
def _eval_rewrite_as_bessely(self, nu, z, **kwargs):
aj = self._eval_rewrite_as_besselj(*self.args)
if aj:
return aj.rewrite(bessely)
def _eval_rewrite_as_yn(self, nu, z, **kwargs):
ay = self._eval_rewrite_as_bessely(*self.args)
if ay:
return ay.rewrite(yn)
def _eval_is_extended_real(self):
nu, z = self.args
if nu.is_integer and z.is_positive:
return True
def _sage_(self):
import sage.all as sage
return sage.bessel_K(self.args[0]._sage_(), self.args[1]._sage_())
class hankel1(BesselBase):
r"""
Hankel function of the first kind.
Explanation
===========
This function is defined as
.. math ::
H_\nu^{(1)} = J_\nu(z) + iY_\nu(z),
where $J_\nu(z)$ is the Bessel function of the first kind, and
$Y_\nu(z)$ is the Bessel function of the second kind.
It is a solution to Bessel's equation.
Examples
========
>>> from sympy import hankel1
>>> from sympy.abc import z, n
>>> hankel1(n, z).diff(z)
hankel1(n - 1, z)/2 - hankel1(n + 1, z)/2
See Also
========
hankel2, besselj, bessely
References
==========
.. [1] http://functions.wolfram.com/Bessel-TypeFunctions/HankelH1/
"""
_a = S.One
_b = S.One
def _eval_conjugate(self):
z = self.argument
if z.is_extended_negative is False:
return hankel2(self.order.conjugate(), z.conjugate())
class hankel2(BesselBase):
r"""
Hankel function of the second kind.
Explanation
===========
This function is defined as
.. math ::
H_\nu^{(2)} = J_\nu(z) - iY_\nu(z),
where $J_\nu(z)$ is the Bessel function of the first kind, and
$Y_\nu(z)$ is the Bessel function of the second kind.
It is a solution to Bessel's equation, and linearly independent from
$H_\nu^{(1)}$.
Examples
========
>>> from sympy import hankel2
>>> from sympy.abc import z, n
>>> hankel2(n, z).diff(z)
hankel2(n - 1, z)/2 - hankel2(n + 1, z)/2
See Also
========
hankel1, besselj, bessely
References
==========
.. [1] http://functions.wolfram.com/Bessel-TypeFunctions/HankelH2/
"""
_a = S.One
_b = S.One
def _eval_conjugate(self):
z = self.argument
if z.is_extended_negative is False:
return hankel1(self.order.conjugate(), z.conjugate())
def assume_integer_order(fn):
@wraps(fn)
def g(self, nu, z):
if nu.is_integer:
return fn(self, nu, z)
return g
class SphericalBesselBase(BesselBase):
"""
Base class for spherical Bessel functions.
These are thin wrappers around ordinary Bessel functions,
since spherical Bessel functions differ from the ordinary
ones just by a slight change in order.
To use this class, define the ``_rewrite()`` and ``_expand()`` methods.
"""
def _expand(self, **hints):
""" Expand self into a polynomial. Nu is guaranteed to be Integer. """
raise NotImplementedError('expansion')
def _rewrite(self):
""" Rewrite self in terms of ordinary Bessel functions. """
raise NotImplementedError('rewriting')
def _eval_expand_func(self, **hints):
if self.order.is_Integer:
return self._expand(**hints)
return self
def _eval_evalf(self, prec):
if self.order.is_Integer:
return self._rewrite()._eval_evalf(prec)
def fdiff(self, argindex=2):
if argindex != 2:
raise ArgumentIndexError(self, argindex)
return self.__class__(self.order - 1, self.argument) - \
self * (self.order + 1)/self.argument
def _jn(n, z):
return fn(n, z)*sin(z) + (-1)**(n + 1)*fn(-n - 1, z)*cos(z)
def _yn(n, z):
# (-1)**(n + 1) * _jn(-n - 1, z)
return (-1)**(n + 1) * fn(-n - 1, z)*sin(z) - fn(n, z)*cos(z)
class jn(SphericalBesselBase):
r"""
Spherical Bessel function of the first kind.
Explanation
===========
This function is a solution to the spherical Bessel equation
.. math ::
z^2 \frac{\mathrm{d}^2 w}{\mathrm{d}z^2}
+ 2z \frac{\mathrm{d}w}{\mathrm{d}z} + (z^2 - \nu(\nu + 1)) w = 0.
It can be defined as
.. math ::
j_\nu(z) = \sqrt{\frac{\pi}{2z}} J_{\nu + \frac{1}{2}}(z),
where $J_\nu(z)$ is the Bessel function of the first kind.
The spherical Bessel functions of integral order are
calculated using the formula:
.. math:: j_n(z) = f_n(z) \sin{z} + (-1)^{n+1} f_{-n-1}(z) \cos{z},
where the coefficients $f_n(z)$ are available as
:func:`sympy.polys.orthopolys.spherical_bessel_fn`.
Examples
========
>>> from sympy import Symbol, jn, sin, cos, expand_func, besselj, bessely
>>> z = Symbol("z")
>>> nu = Symbol("nu", integer=True)
>>> print(expand_func(jn(0, z)))
sin(z)/z
>>> expand_func(jn(1, z)) == sin(z)/z**2 - cos(z)/z
True
>>> expand_func(jn(3, z))
(-6/z**2 + 15/z**4)*sin(z) + (1/z - 15/z**3)*cos(z)
>>> jn(nu, z).rewrite(besselj)
sqrt(2)*sqrt(pi)*sqrt(1/z)*besselj(nu + 1/2, z)/2
>>> jn(nu, z).rewrite(bessely)
(-1)**nu*sqrt(2)*sqrt(pi)*sqrt(1/z)*bessely(-nu - 1/2, z)/2
>>> jn(2, 5.2+0.3j).evalf(20)
0.099419756723640344491 - 0.054525080242173562897*I
See Also
========
besselj, bessely, besselk, yn
References
==========
.. [1] http://dlmf.nist.gov/10.47
"""
@classmethod
def eval(cls, nu, z):
if z.is_zero:
if nu.is_zero:
return S.One
elif nu.is_integer:
if nu.is_positive:
return S.Zero
else:
return S.ComplexInfinity
if z in (S.NegativeInfinity, S.Infinity):
return S.Zero
def _rewrite(self):
return self._eval_rewrite_as_besselj(self.order, self.argument)
def _eval_rewrite_as_besselj(self, nu, z, **kwargs):
return sqrt(pi/(2*z)) * besselj(nu + S.Half, z)
def _eval_rewrite_as_bessely(self, nu, z, **kwargs):
return (-1)**nu * sqrt(pi/(2*z)) * bessely(-nu - S.Half, z)
def _eval_rewrite_as_yn(self, nu, z, **kwargs):
return (-1)**(nu) * yn(-nu - 1, z)
def _expand(self, **hints):
return _jn(self.order, self.argument)
class yn(SphericalBesselBase):
r"""
Spherical Bessel function of the second kind.
Explanation
===========
This function is another solution to the spherical Bessel equation, and
linearly independent from $j_n$. It can be defined as
.. math ::
y_\nu(z) = \sqrt{\frac{\pi}{2z}} Y_{\nu + \frac{1}{2}}(z),
where $Y_\nu(z)$ is the Bessel function of the second kind.
For integral orders $n$, $y_n$ is calculated using the formula:
.. math:: y_n(z) = (-1)^{n+1} j_{-n-1}(z)
Examples
========
>>> from sympy import Symbol, yn, sin, cos, expand_func, besselj, bessely
>>> z = Symbol("z")
>>> nu = Symbol("nu", integer=True)
>>> print(expand_func(yn(0, z)))
-cos(z)/z
>>> expand_func(yn(1, z)) == -cos(z)/z**2-sin(z)/z
True
>>> yn(nu, z).rewrite(besselj)
(-1)**(nu + 1)*sqrt(2)*sqrt(pi)*sqrt(1/z)*besselj(-nu - 1/2, z)/2
>>> yn(nu, z).rewrite(bessely)
sqrt(2)*sqrt(pi)*sqrt(1/z)*bessely(nu + 1/2, z)/2
>>> yn(2, 5.2+0.3j).evalf(20)
0.18525034196069722536 + 0.014895573969924817587*I
See Also
========
besselj, bessely, besselk, jn
References
==========
.. [1] http://dlmf.nist.gov/10.47
"""
def _rewrite(self):
return self._eval_rewrite_as_bessely(self.order, self.argument)
@assume_integer_order
def _eval_rewrite_as_besselj(self, nu, z, **kwargs):
return (-1)**(nu+1) * sqrt(pi/(2*z)) * besselj(-nu - S.Half, z)
@assume_integer_order
def _eval_rewrite_as_bessely(self, nu, z, **kwargs):
return sqrt(pi/(2*z)) * bessely(nu + S.Half, z)
def _eval_rewrite_as_jn(self, nu, z, **kwargs):
return (-1)**(nu + 1) * jn(-nu - 1, z)
def _expand(self, **hints):
return _yn(self.order, self.argument)
class SphericalHankelBase(SphericalBesselBase):
def _rewrite(self):
return self._eval_rewrite_as_besselj(self.order, self.argument)
@assume_integer_order
def _eval_rewrite_as_besselj(self, nu, z, **kwargs):
# jn +- I*yn
# jn as beeselj: sqrt(pi/(2*z)) * besselj(nu + S.Half, z)
# yn as besselj: (-1)**(nu+1) * sqrt(pi/(2*z)) * besselj(-nu - S.Half, z)
hks = self._hankel_kind_sign
return sqrt(pi/(2*z))*(besselj(nu + S.Half, z) +
hks*I*(-1)**(nu+1)*besselj(-nu - S.Half, z))
@assume_integer_order
def _eval_rewrite_as_bessely(self, nu, z, **kwargs):
# jn +- I*yn
# jn as bessely: (-1)**nu * sqrt(pi/(2*z)) * bessely(-nu - S.Half, z)
# yn as bessely: sqrt(pi/(2*z)) * bessely(nu + S.Half, z)
hks = self._hankel_kind_sign
return sqrt(pi/(2*z))*((-1)**nu*bessely(-nu - S.Half, z) +
hks*I*bessely(nu + S.Half, z))
def _eval_rewrite_as_yn(self, nu, z, **kwargs):
hks = self._hankel_kind_sign
return jn(nu, z).rewrite(yn) + hks*I*yn(nu, z)
def _eval_rewrite_as_jn(self, nu, z, **kwargs):
hks = self._hankel_kind_sign
return jn(nu, z) + hks*I*yn(nu, z).rewrite(jn)
def _eval_expand_func(self, **hints):
if self.order.is_Integer:
return self._expand(**hints)
else:
nu = self.order
z = self.argument
hks = self._hankel_kind_sign
return jn(nu, z) + hks*I*yn(nu, z)
def _expand(self, **hints):
n = self.order
z = self.argument
hks = self._hankel_kind_sign
# fully expanded version
# return ((fn(n, z) * sin(z) +
# (-1)**(n + 1) * fn(-n - 1, z) * cos(z)) + # jn
# (hks * I * (-1)**(n + 1) *
# (fn(-n - 1, z) * hk * I * sin(z) +
# (-1)**(-n) * fn(n, z) * I * cos(z))) # +-I*yn
# )
return (_jn(n, z) + hks*I*_yn(n, z)).expand()
class hn1(SphericalHankelBase):
r"""
Spherical Hankel function of the first kind.
Explanation
===========
This function is defined as
.. math:: h_\nu^(1)(z) = j_\nu(z) + i y_\nu(z),
where $j_\nu(z)$ and $y_\nu(z)$ are the spherical
Bessel function of the first and second kinds.
For integral orders $n$, $h_n^(1)$ is calculated using the formula:
.. math:: h_n^(1)(z) = j_{n}(z) + i (-1)^{n+1} j_{-n-1}(z)
Examples
========
>>> from sympy import Symbol, hn1, hankel1, expand_func, yn, jn
>>> z = Symbol("z")
>>> nu = Symbol("nu", integer=True)
>>> print(expand_func(hn1(nu, z)))
jn(nu, z) + I*yn(nu, z)
>>> print(expand_func(hn1(0, z)))
sin(z)/z - I*cos(z)/z
>>> print(expand_func(hn1(1, z)))
-I*sin(z)/z - cos(z)/z + sin(z)/z**2 - I*cos(z)/z**2
>>> hn1(nu, z).rewrite(jn)
(-1)**(nu + 1)*I*jn(-nu - 1, z) + jn(nu, z)
>>> hn1(nu, z).rewrite(yn)
(-1)**nu*yn(-nu - 1, z) + I*yn(nu, z)
>>> hn1(nu, z).rewrite(hankel1)
sqrt(2)*sqrt(pi)*sqrt(1/z)*hankel1(nu, z)/2
See Also
========
hn2, jn, yn, hankel1, hankel2
References
==========
.. [1] http://dlmf.nist.gov/10.47
"""
_hankel_kind_sign = S.One
@assume_integer_order
def _eval_rewrite_as_hankel1(self, nu, z, **kwargs):
return sqrt(pi/(2*z))*hankel1(nu, z)
class hn2(SphericalHankelBase):
r"""
Spherical Hankel function of the second kind.
Explanation
===========
This function is defined as
.. math:: h_\nu^(2)(z) = j_\nu(z) - i y_\nu(z),
where $j_\nu(z)$ and $y_\nu(z)$ are the spherical
Bessel function of the first and second kinds.
For integral orders $n$, $h_n^(2)$ is calculated using the formula:
.. math:: h_n^(2)(z) = j_{n} - i (-1)^{n+1} j_{-n-1}(z)
Examples
========
>>> from sympy import Symbol, hn2, hankel2, expand_func, jn, yn
>>> z = Symbol("z")
>>> nu = Symbol("nu", integer=True)
>>> print(expand_func(hn2(nu, z)))
jn(nu, z) - I*yn(nu, z)
>>> print(expand_func(hn2(0, z)))
sin(z)/z + I*cos(z)/z
>>> print(expand_func(hn2(1, z)))
I*sin(z)/z - cos(z)/z + sin(z)/z**2 + I*cos(z)/z**2
>>> hn2(nu, z).rewrite(hankel2)
sqrt(2)*sqrt(pi)*sqrt(1/z)*hankel2(nu, z)/2
>>> hn2(nu, z).rewrite(jn)
-(-1)**(nu + 1)*I*jn(-nu - 1, z) + jn(nu, z)
>>> hn2(nu, z).rewrite(yn)
(-1)**nu*yn(-nu - 1, z) - I*yn(nu, z)
See Also
========
hn1, jn, yn, hankel1, hankel2
References
==========
.. [1] http://dlmf.nist.gov/10.47
"""
_hankel_kind_sign = -S.One
@assume_integer_order
def _eval_rewrite_as_hankel2(self, nu, z, **kwargs):
return sqrt(pi/(2*z))*hankel2(nu, z)
def jn_zeros(n, k, method="sympy", dps=15):
"""
Zeros of the spherical Bessel function of the first kind.
Explanation
===========
This returns an array of zeros of $jn$ up to the $k$-th zero.
* method = "sympy": uses `mpmath.besseljzero
<http://mpmath.org/doc/current/functions/bessel.html#mpmath.besseljzero>`_
* method = "scipy": uses the
`SciPy's sph_jn <http://docs.scipy.org/doc/scipy/reference/generated/scipy.special.jn_zeros.html>`_
and
`newton <http://docs.scipy.org/doc/scipy/reference/generated/scipy.optimize.newton.html>`_
to find all
roots, which is faster than computing the zeros using a general
numerical solver, but it requires SciPy and only works with low
precision floating point numbers. (The function used with
method="sympy" is a recent addition to mpmath; before that a general
solver was used.)
Examples
========
>>> from sympy import jn_zeros
>>> jn_zeros(2, 4, dps=5)
[5.7635, 9.095, 12.323, 15.515]
See Also
========
jn, yn, besselj, besselk, bessely
Parameters
==========
n : integer
order of Bessel function
k : integer
number of zeros to return
"""
from math import pi
if method == "sympy":
from mpmath import besseljzero
from mpmath.libmp.libmpf import dps_to_prec
from sympy import Expr
prec = dps_to_prec(dps)
return [Expr._from_mpmath(besseljzero(S(n + 0.5)._to_mpmath(prec),
int(l)), prec)
for l in range(1, k + 1)]
elif method == "scipy":
from scipy.optimize import newton
try:
from scipy.special import spherical_jn
f = lambda x: spherical_jn(n, x)
except ImportError:
from scipy.special import sph_jn
f = lambda x: sph_jn(n, x)[0][-1]
else:
raise NotImplementedError("Unknown method.")
def solver(f, x):
if method == "scipy":
root = newton(f, x)
else:
raise NotImplementedError("Unknown method.")
return root
# we need to approximate the position of the first root:
root = n + pi
# determine the first root exactly:
root = solver(f, root)
roots = [root]
for i in range(k - 1):
# estimate the position of the next root using the last root + pi:
root = solver(f, root + pi)
roots.append(root)
return roots
class AiryBase(Function):
"""
Abstract base class for Airy functions.
This class is meant to reduce code duplication.
"""
def _eval_conjugate(self):
return self.func(self.args[0].conjugate())
def _eval_is_extended_real(self):
return self.args[0].is_extended_real
def as_real_imag(self, deep=True, **hints):
z = self.args[0]
zc = z.conjugate()
f = self.func
u = (f(z)+f(zc))/2
v = I*(f(zc)-f(z))/2
return u, v
def _eval_expand_complex(self, deep=True, **hints):
re_part, im_part = self.as_real_imag(deep=deep, **hints)
return re_part + im_part*S.ImaginaryUnit
class airyai(AiryBase):
r"""
The Airy function $\operatorname{Ai}$ of the first kind.
Explanation
===========
The Airy function $\operatorname{Ai}(z)$ is defined to be the function
satisfying Airy's differential equation
.. math::
\frac{\mathrm{d}^2 w(z)}{\mathrm{d}z^2} - z w(z) = 0.
Equivalently, for real $z$
.. math::
\operatorname{Ai}(z) := \frac{1}{\pi}
\int_0^\infty \cos\left(\frac{t^3}{3} + z t\right) \mathrm{d}t.
Examples
========
Create an Airy function object:
>>> from sympy import airyai
>>> from sympy.abc import z
>>> airyai(z)
airyai(z)
Several special values are known:
>>> airyai(0)
3**(1/3)/(3*gamma(2/3))
>>> from sympy import oo
>>> airyai(oo)
0
>>> airyai(-oo)
0
The Airy function obeys the mirror symmetry:
>>> from sympy import conjugate
>>> conjugate(airyai(z))
airyai(conjugate(z))
Differentiation with respect to $z$ is supported:
>>> from sympy import diff
>>> diff(airyai(z), z)
airyaiprime(z)
>>> diff(airyai(z), z, 2)
z*airyai(z)
Series expansion is also supported:
>>> from sympy import series
>>> series(airyai(z), z, 0, 3)
3**(5/6)*gamma(1/3)/(6*pi) - 3**(1/6)*z*gamma(2/3)/(2*pi) + O(z**3)
We can numerically evaluate the Airy function to arbitrary precision
on the whole complex plane:
>>> airyai(-2).evalf(50)
0.22740742820168557599192443603787379946077222541710
Rewrite $\operatorname{Ai}(z)$ in terms of hypergeometric functions:
>>> from sympy import hyper
>>> airyai(z).rewrite(hyper)
-3**(2/3)*z*hyper((), (4/3,), z**3/9)/(3*gamma(1/3)) + 3**(1/3)*hyper((), (2/3,), z**3/9)/(3*gamma(2/3))
See Also
========
airybi: Airy function of the second kind.
airyaiprime: Derivative of the Airy function of the first kind.
airybiprime: Derivative of the Airy function of the second kind.
References
==========
.. [1] https://en.wikipedia.org/wiki/Airy_function
.. [2] http://dlmf.nist.gov/9
.. [3] http://www.encyclopediaofmath.org/index.php/Airy_functions
.. [4] http://mathworld.wolfram.com/AiryFunctions.html
"""
nargs = 1
unbranched = True
@classmethod
def eval(cls, arg):
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.Zero
elif arg is S.NegativeInfinity:
return S.Zero
elif arg.is_zero:
return S.One / (3**Rational(2, 3) * gamma(Rational(2, 3)))
if arg.is_zero:
return S.One / (3**Rational(2, 3) * gamma(Rational(2, 3)))
def fdiff(self, argindex=1):
if argindex == 1:
return airyaiprime(self.args[0])
else:
raise ArgumentIndexError(self, argindex)
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n < 0:
return S.Zero
else:
x = sympify(x)
if len(previous_terms) > 1:
p = previous_terms[-1]
return ((3**Rational(1, 3)*x)**(-n)*(3**Rational(1, 3)*x)**(n + 1)*sin(pi*(n*Rational(2, 3) + Rational(4, 3)))*factorial(n) *
gamma(n/3 + Rational(2, 3))/(sin(pi*(n*Rational(2, 3) + Rational(2, 3)))*factorial(n + 1)*gamma(n/3 + Rational(1, 3))) * p)
else:
return (S.One/(3**Rational(2, 3)*pi) * gamma((n+S.One)/S(3)) * sin(2*pi*(n+S.One)/S(3)) /
factorial(n) * (root(3, 3)*x)**n)
def _eval_rewrite_as_besselj(self, z, **kwargs):
ot = Rational(1, 3)
tt = Rational(2, 3)
a = Pow(-z, Rational(3, 2))
if re(z).is_negative:
return ot*sqrt(-z) * (besselj(-ot, tt*a) + besselj(ot, tt*a))
def _eval_rewrite_as_besseli(self, z, **kwargs):
ot = Rational(1, 3)
tt = Rational(2, 3)
a = Pow(z, Rational(3, 2))
if re(z).is_positive:
return ot*sqrt(z) * (besseli(-ot, tt*a) - besseli(ot, tt*a))
else:
return ot*(Pow(a, ot)*besseli(-ot, tt*a) - z*Pow(a, -ot)*besseli(ot, tt*a))
def _eval_rewrite_as_hyper(self, z, **kwargs):
pf1 = S.One / (3**Rational(2, 3)*gamma(Rational(2, 3)))
pf2 = z / (root(3, 3)*gamma(Rational(1, 3)))
return pf1 * hyper([], [Rational(2, 3)], z**3/9) - pf2 * hyper([], [Rational(4, 3)], z**3/9)
def _eval_expand_func(self, **hints):
arg = self.args[0]
symbs = arg.free_symbols
if len(symbs) == 1:
z = symbs.pop()
c = Wild("c", exclude=[z])
d = Wild("d", exclude=[z])
m = Wild("m", exclude=[z])
n = Wild("n", exclude=[z])
M = arg.match(c*(d*z**n)**m)
if M is not None:
m = M[m]
# The transformation is given by 03.05.16.0001.01
# http://functions.wolfram.com/Bessel-TypeFunctions/AiryAi/16/01/01/0001/
if (3*m).is_integer:
c = M[c]
d = M[d]
n = M[n]
pf = (d * z**n)**m / (d**m * z**(m*n))
newarg = c * d**m * z**(m*n)
return S.Half * ((pf + S.One)*airyai(newarg) - (pf - S.One)/sqrt(3)*airybi(newarg))
class airybi(AiryBase):
r"""
The Airy function $\operatorname{Bi}$ of the second kind.
Explanation
===========
The Airy function $\operatorname{Bi}(z)$ is defined to be the function
satisfying Airy's differential equation
.. math::
\frac{\mathrm{d}^2 w(z)}{\mathrm{d}z^2} - z w(z) = 0.
Equivalently, for real $z$
.. math::
\operatorname{Bi}(z) := \frac{1}{\pi}
\int_0^\infty
\exp\left(-\frac{t^3}{3} + z t\right)
+ \sin\left(\frac{t^3}{3} + z t\right) \mathrm{d}t.
Examples
========
Create an Airy function object:
>>> from sympy import airybi
>>> from sympy.abc import z
>>> airybi(z)
airybi(z)
Several special values are known:
>>> airybi(0)
3**(5/6)/(3*gamma(2/3))
>>> from sympy import oo
>>> airybi(oo)
oo
>>> airybi(-oo)
0
The Airy function obeys the mirror symmetry:
>>> from sympy import conjugate
>>> conjugate(airybi(z))
airybi(conjugate(z))
Differentiation with respect to $z$ is supported:
>>> from sympy import diff
>>> diff(airybi(z), z)
airybiprime(z)
>>> diff(airybi(z), z, 2)
z*airybi(z)
Series expansion is also supported:
>>> from sympy import series
>>> series(airybi(z), z, 0, 3)
3**(1/3)*gamma(1/3)/(2*pi) + 3**(2/3)*z*gamma(2/3)/(2*pi) + O(z**3)
We can numerically evaluate the Airy function to arbitrary precision
on the whole complex plane:
>>> airybi(-2).evalf(50)
-0.41230258795639848808323405461146104203453483447240
Rewrite $\operatorname{Bi}(z)$ in terms of hypergeometric functions:
>>> from sympy import hyper
>>> airybi(z).rewrite(hyper)
3**(1/6)*z*hyper((), (4/3,), z**3/9)/gamma(1/3) + 3**(5/6)*hyper((), (2/3,), z**3/9)/(3*gamma(2/3))
See Also
========
airyai: Airy function of the first kind.
airyaiprime: Derivative of the Airy function of the first kind.
airybiprime: Derivative of the Airy function of the second kind.
References
==========
.. [1] https://en.wikipedia.org/wiki/Airy_function
.. [2] http://dlmf.nist.gov/9
.. [3] http://www.encyclopediaofmath.org/index.php/Airy_functions
.. [4] http://mathworld.wolfram.com/AiryFunctions.html
"""
nargs = 1
unbranched = True
@classmethod
def eval(cls, arg):
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.Infinity
elif arg is S.NegativeInfinity:
return S.Zero
elif arg.is_zero:
return S.One / (3**Rational(1, 6) * gamma(Rational(2, 3)))
if arg.is_zero:
return S.One / (3**Rational(1, 6) * gamma(Rational(2, 3)))
def fdiff(self, argindex=1):
if argindex == 1:
return airybiprime(self.args[0])
else:
raise ArgumentIndexError(self, argindex)
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n < 0:
return S.Zero
else:
x = sympify(x)
if len(previous_terms) > 1:
p = previous_terms[-1]
return (3**Rational(1, 3)*x * Abs(sin(2*pi*(n + S.One)/S(3))) * factorial((n - S.One)/S(3)) /
((n + S.One) * Abs(cos(2*pi*(n + S.Half)/S(3))) * factorial((n - 2)/S(3))) * p)
else:
return (S.One/(root(3, 6)*pi) * gamma((n + S.One)/S(3)) * Abs(sin(2*pi*(n + S.One)/S(3))) /
factorial(n) * (root(3, 3)*x)**n)
def _eval_rewrite_as_besselj(self, z, **kwargs):
ot = Rational(1, 3)
tt = Rational(2, 3)
a = Pow(-z, Rational(3, 2))
if re(z).is_negative:
return sqrt(-z/3) * (besselj(-ot, tt*a) - besselj(ot, tt*a))
def _eval_rewrite_as_besseli(self, z, **kwargs):
ot = Rational(1, 3)
tt = Rational(2, 3)
a = Pow(z, Rational(3, 2))
if re(z).is_positive:
return sqrt(z)/sqrt(3) * (besseli(-ot, tt*a) + besseli(ot, tt*a))
else:
b = Pow(a, ot)
c = Pow(a, -ot)
return sqrt(ot)*(b*besseli(-ot, tt*a) + z*c*besseli(ot, tt*a))
def _eval_rewrite_as_hyper(self, z, **kwargs):
pf1 = S.One / (root(3, 6)*gamma(Rational(2, 3)))
pf2 = z*root(3, 6) / gamma(Rational(1, 3))
return pf1 * hyper([], [Rational(2, 3)], z**3/9) + pf2 * hyper([], [Rational(4, 3)], z**3/9)
def _eval_expand_func(self, **hints):
arg = self.args[0]
symbs = arg.free_symbols
if len(symbs) == 1:
z = symbs.pop()
c = Wild("c", exclude=[z])
d = Wild("d", exclude=[z])
m = Wild("m", exclude=[z])
n = Wild("n", exclude=[z])
M = arg.match(c*(d*z**n)**m)
if M is not None:
m = M[m]
# The transformation is given by 03.06.16.0001.01
# http://functions.wolfram.com/Bessel-TypeFunctions/AiryBi/16/01/01/0001/
if (3*m).is_integer:
c = M[c]
d = M[d]
n = M[n]
pf = (d * z**n)**m / (d**m * z**(m*n))
newarg = c * d**m * z**(m*n)
return S.Half * (sqrt(3)*(S.One - pf)*airyai(newarg) + (S.One + pf)*airybi(newarg))
class airyaiprime(AiryBase):
r"""
The derivative $\operatorname{Ai}^\prime$ of the Airy function of the first
kind.
Explanation
===========
The Airy function $\operatorname{Ai}^\prime(z)$ is defined to be the
function
.. math::
\operatorname{Ai}^\prime(z) := \frac{\mathrm{d} \operatorname{Ai}(z)}{\mathrm{d} z}.
Examples
========
Create an Airy function object:
>>> from sympy import airyaiprime
>>> from sympy.abc import z
>>> airyaiprime(z)
airyaiprime(z)
Several special values are known:
>>> airyaiprime(0)
-3**(2/3)/(3*gamma(1/3))
>>> from sympy import oo
>>> airyaiprime(oo)
0
The Airy function obeys the mirror symmetry:
>>> from sympy import conjugate
>>> conjugate(airyaiprime(z))
airyaiprime(conjugate(z))
Differentiation with respect to $z$ is supported:
>>> from sympy import diff
>>> diff(airyaiprime(z), z)
z*airyai(z)
>>> diff(airyaiprime(z), z, 2)
z*airyaiprime(z) + airyai(z)
Series expansion is also supported:
>>> from sympy import series
>>> series(airyaiprime(z), z, 0, 3)
-3**(2/3)/(3*gamma(1/3)) + 3**(1/3)*z**2/(6*gamma(2/3)) + O(z**3)
We can numerically evaluate the Airy function to arbitrary precision
on the whole complex plane:
>>> airyaiprime(-2).evalf(50)
0.61825902074169104140626429133247528291577794512415
Rewrite $\operatorname{Ai}^\prime(z)$ in terms of hypergeometric functions:
>>> from sympy import hyper
>>> airyaiprime(z).rewrite(hyper)
3**(1/3)*z**2*hyper((), (5/3,), z**3/9)/(6*gamma(2/3)) - 3**(2/3)*hyper((), (1/3,), z**3/9)/(3*gamma(1/3))
See Also
========
airyai: Airy function of the first kind.
airybi: Airy function of the second kind.
airybiprime: Derivative of the Airy function of the second kind.
References
==========
.. [1] https://en.wikipedia.org/wiki/Airy_function
.. [2] http://dlmf.nist.gov/9
.. [3] http://www.encyclopediaofmath.org/index.php/Airy_functions
.. [4] http://mathworld.wolfram.com/AiryFunctions.html
"""
nargs = 1
unbranched = True
@classmethod
def eval(cls, arg):
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.Zero
if arg.is_zero:
return S.NegativeOne / (3**Rational(1, 3) * gamma(Rational(1, 3)))
def fdiff(self, argindex=1):
if argindex == 1:
return self.args[0]*airyai(self.args[0])
else:
raise ArgumentIndexError(self, argindex)
def _eval_evalf(self, prec):
from mpmath import mp, workprec
from sympy import Expr
z = self.args[0]._to_mpmath(prec)
with workprec(prec):
res = mp.airyai(z, derivative=1)
return Expr._from_mpmath(res, prec)
def _eval_rewrite_as_besselj(self, z, **kwargs):
tt = Rational(2, 3)
a = Pow(-z, Rational(3, 2))
if re(z).is_negative:
return z/3 * (besselj(-tt, tt*a) - besselj(tt, tt*a))
def _eval_rewrite_as_besseli(self, z, **kwargs):
ot = Rational(1, 3)
tt = Rational(2, 3)
a = tt * Pow(z, Rational(3, 2))
if re(z).is_positive:
return z/3 * (besseli(tt, a) - besseli(-tt, a))
else:
a = Pow(z, Rational(3, 2))
b = Pow(a, tt)
c = Pow(a, -tt)
return ot * (z**2*c*besseli(tt, tt*a) - b*besseli(-ot, tt*a))
def _eval_rewrite_as_hyper(self, z, **kwargs):
pf1 = z**2 / (2*3**Rational(2, 3)*gamma(Rational(2, 3)))
pf2 = 1 / (root(3, 3)*gamma(Rational(1, 3)))
return pf1 * hyper([], [Rational(5, 3)], z**3/9) - pf2 * hyper([], [Rational(1, 3)], z**3/9)
def _eval_expand_func(self, **hints):
arg = self.args[0]
symbs = arg.free_symbols
if len(symbs) == 1:
z = symbs.pop()
c = Wild("c", exclude=[z])
d = Wild("d", exclude=[z])
m = Wild("m", exclude=[z])
n = Wild("n", exclude=[z])
M = arg.match(c*(d*z**n)**m)
if M is not None:
m = M[m]
# The transformation is in principle
# given by 03.07.16.0001.01 but note
# that there is an error in this formula.
# http://functions.wolfram.com/Bessel-TypeFunctions/AiryAiPrime/16/01/01/0001/
if (3*m).is_integer:
c = M[c]
d = M[d]
n = M[n]
pf = (d**m * z**(n*m)) / (d * z**n)**m
newarg = c * d**m * z**(n*m)
return S.Half * ((pf + S.One)*airyaiprime(newarg) + (pf - S.One)/sqrt(3)*airybiprime(newarg))
class airybiprime(AiryBase):
r"""
The derivative $\operatorname{Bi}^\prime$ of the Airy function of the first
kind.
Explanation
===========
The Airy function $\operatorname{Bi}^\prime(z)$ is defined to be the
function
.. math::
\operatorname{Bi}^\prime(z) := \frac{\mathrm{d} \operatorname{Bi}(z)}{\mathrm{d} z}.
Examples
========
Create an Airy function object:
>>> from sympy import airybiprime
>>> from sympy.abc import z
>>> airybiprime(z)
airybiprime(z)
Several special values are known:
>>> airybiprime(0)
3**(1/6)/gamma(1/3)
>>> from sympy import oo
>>> airybiprime(oo)
oo
>>> airybiprime(-oo)
0
The Airy function obeys the mirror symmetry:
>>> from sympy import conjugate
>>> conjugate(airybiprime(z))
airybiprime(conjugate(z))
Differentiation with respect to $z$ is supported:
>>> from sympy import diff
>>> diff(airybiprime(z), z)
z*airybi(z)
>>> diff(airybiprime(z), z, 2)
z*airybiprime(z) + airybi(z)
Series expansion is also supported:
>>> from sympy import series
>>> series(airybiprime(z), z, 0, 3)
3**(1/6)/gamma(1/3) + 3**(5/6)*z**2/(6*gamma(2/3)) + O(z**3)
We can numerically evaluate the Airy function to arbitrary precision
on the whole complex plane:
>>> airybiprime(-2).evalf(50)
0.27879516692116952268509756941098324140300059345163
Rewrite $\operatorname{Bi}^\prime(z)$ in terms of hypergeometric functions:
>>> from sympy import hyper
>>> airybiprime(z).rewrite(hyper)
3**(5/6)*z**2*hyper((), (5/3,), z**3/9)/(6*gamma(2/3)) + 3**(1/6)*hyper((), (1/3,), z**3/9)/gamma(1/3)
See Also
========
airyai: Airy function of the first kind.
airybi: Airy function of the second kind.
airyaiprime: Derivative of the Airy function of the first kind.
References
==========
.. [1] https://en.wikipedia.org/wiki/Airy_function
.. [2] http://dlmf.nist.gov/9
.. [3] http://www.encyclopediaofmath.org/index.php/Airy_functions
.. [4] http://mathworld.wolfram.com/AiryFunctions.html
"""
nargs = 1
unbranched = True
@classmethod
def eval(cls, arg):
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.Infinity
elif arg is S.NegativeInfinity:
return S.Zero
elif arg.is_zero:
return 3**Rational(1, 6) / gamma(Rational(1, 3))
if arg.is_zero:
return 3**Rational(1, 6) / gamma(Rational(1, 3))
def fdiff(self, argindex=1):
if argindex == 1:
return self.args[0]*airybi(self.args[0])
else:
raise ArgumentIndexError(self, argindex)
def _eval_evalf(self, prec):
from mpmath import mp, workprec
from sympy import Expr
z = self.args[0]._to_mpmath(prec)
with workprec(prec):
res = mp.airybi(z, derivative=1)
return Expr._from_mpmath(res, prec)
def _eval_rewrite_as_besselj(self, z, **kwargs):
tt = Rational(2, 3)
a = tt * Pow(-z, Rational(3, 2))
if re(z).is_negative:
return -z/sqrt(3) * (besselj(-tt, a) + besselj(tt, a))
def _eval_rewrite_as_besseli(self, z, **kwargs):
ot = Rational(1, 3)
tt = Rational(2, 3)
a = tt * Pow(z, Rational(3, 2))
if re(z).is_positive:
return z/sqrt(3) * (besseli(-tt, a) + besseli(tt, a))
else:
a = Pow(z, Rational(3, 2))
b = Pow(a, tt)
c = Pow(a, -tt)
return sqrt(ot) * (b*besseli(-tt, tt*a) + z**2*c*besseli(tt, tt*a))
def _eval_rewrite_as_hyper(self, z, **kwargs):
pf1 = z**2 / (2*root(3, 6)*gamma(Rational(2, 3)))
pf2 = root(3, 6) / gamma(Rational(1, 3))
return pf1 * hyper([], [Rational(5, 3)], z**3/9) + pf2 * hyper([], [Rational(1, 3)], z**3/9)
def _eval_expand_func(self, **hints):
arg = self.args[0]
symbs = arg.free_symbols
if len(symbs) == 1:
z = symbs.pop()
c = Wild("c", exclude=[z])
d = Wild("d", exclude=[z])
m = Wild("m", exclude=[z])
n = Wild("n", exclude=[z])
M = arg.match(c*(d*z**n)**m)
if M is not None:
m = M[m]
# The transformation is in principle
# given by 03.08.16.0001.01 but note
# that there is an error in this formula.
# http://functions.wolfram.com/Bessel-TypeFunctions/AiryBiPrime/16/01/01/0001/
if (3*m).is_integer:
c = M[c]
d = M[d]
n = M[n]
pf = (d**m * z**(n*m)) / (d * z**n)**m
newarg = c * d**m * z**(n*m)
return S.Half * (sqrt(3)*(pf - S.One)*airyaiprime(newarg) + (pf + S.One)*airybiprime(newarg))
class marcumq(Function):
r"""
The Marcum Q-function.
Explanation
===========
The Marcum Q-function is defined by the meromorphic continuation of
.. math::
Q_m(a, b) = a^{- m + 1} \int_{b}^{\infty} x^{m} e^{- \frac{a^{2}}{2} - \frac{x^{2}}{2}} I_{m - 1}\left(a x\right)\, dx
Examples
========
>>> from sympy import marcumq
>>> from sympy.abc import m, a, b
>>> marcumq(m, a, b)
marcumq(m, a, b)
Special values:
>>> marcumq(m, 0, b)
uppergamma(m, b**2/2)/gamma(m)
>>> marcumq(0, 0, 0)
0
>>> marcumq(0, a, 0)
1 - exp(-a**2/2)
>>> marcumq(1, a, a)
1/2 + exp(-a**2)*besseli(0, a**2)/2
>>> marcumq(2, a, a)
1/2 + exp(-a**2)*besseli(0, a**2)/2 + exp(-a**2)*besseli(1, a**2)
Differentiation with respect to $a$ and $b$ is supported:
>>> from sympy import diff
>>> diff(marcumq(m, a, b), a)
a*(-marcumq(m, a, b) + marcumq(m + 1, a, b))
>>> diff(marcumq(m, a, b), b)
-a**(1 - m)*b**m*exp(-a**2/2 - b**2/2)*besseli(m - 1, a*b)
References
==========
.. [1] https://en.wikipedia.org/wiki/Marcum_Q-function
.. [2] http://mathworld.wolfram.com/MarcumQ-Function.html
"""
@classmethod
def eval(cls, m, a, b):
from sympy import exp, uppergamma
if a is S.Zero:
if m is S.Zero and b is S.Zero:
return S.Zero
return uppergamma(m, b**2 * S.Half) / gamma(m)
if m is S.Zero and b is S.Zero:
return 1 - 1 / exp(a**2 * S.Half)
if a == b:
if m is S.One:
return (1 + exp(-a**2) * besseli(0, a**2))*S.Half
if m == 2:
return S.Half + S.Half * exp(-a**2) * besseli(0, a**2) + exp(-a**2) * besseli(1, a**2)
if a.is_zero:
if m.is_zero and b.is_zero:
return S.Zero
return uppergamma(m, b**2*S.Half) / gamma(m)
if m.is_zero and b.is_zero:
return 1 - 1 / exp(a**2*S.Half)
def fdiff(self, argindex=2):
from sympy import exp
m, a, b = self.args
if argindex == 2:
return a * (-marcumq(m, a, b) + marcumq(1+m, a, b))
elif argindex == 3:
return (-b**m / a**(m-1)) * exp(-(a**2 + b**2)/2) * besseli(m-1, a*b)
else:
raise ArgumentIndexError(self, argindex)
def _eval_rewrite_as_Integral(self, m, a, b, **kwargs):
from sympy import Integral, exp, Dummy, oo
x = kwargs.get('x', Dummy('x'))
return a ** (1 - m) * \
Integral(x**m * exp(-(x**2 + a**2)/2) * besseli(m-1, a*x), [x, b, oo])
def _eval_rewrite_as_Sum(self, m, a, b, **kwargs):
from sympy import Sum, exp, Dummy, oo
k = kwargs.get('k', Dummy('k'))
return exp(-(a**2 + b**2) / 2) * Sum((a/b)**k * besseli(k, a*b), [k, 1-m, oo])
def _eval_rewrite_as_besseli(self, m, a, b, **kwargs):
if a == b:
from sympy import exp
if m == 1:
return (1 + exp(-a**2) * besseli(0, a**2)) / 2
if m.is_Integer and m >= 2:
s = sum([besseli(i, a**2) for i in range(1, m)])
return S.Half + exp(-a**2) * besseli(0, a**2) / 2 + exp(-a**2) * s
def _eval_is_zero(self):
if all(arg.is_zero for arg in self.args):
return True
|
1743c79fbdf18dd174900abb47de509681793ce8d0b041d685f614b3b3cbef22
|
""" Elliptic Integrals. """
from sympy.core import S, pi, I, Rational
from sympy.core.function import Function, ArgumentIndexError
from sympy.functions.elementary.complexes import sign
from sympy.functions.elementary.hyperbolic import atanh
from sympy.functions.elementary.miscellaneous import sqrt
from sympy.functions.elementary.trigonometric import sin, tan
from sympy.functions.special.gamma_functions import gamma
from sympy.functions.special.hyper import hyper, meijerg
class elliptic_k(Function):
r"""
The complete elliptic integral of the first kind, defined by
.. math:: K(m) = F\left(\tfrac{\pi}{2}\middle| m\right)
where $F\left(z\middle| m\right)$ is the Legendre incomplete
elliptic integral of the first kind.
Explanation
===========
The function $K(m)$ is a single-valued function on the complex
plane with branch cut along the interval $(1, \infty)$.
Note that our notation defines the incomplete elliptic integral
in terms of the parameter $m$ instead of the elliptic modulus
(eccentricity) $k$.
In this case, the parameter $m$ is defined as $m=k^2$.
Examples
========
>>> from sympy import elliptic_k, I
>>> from sympy.abc import m
>>> elliptic_k(0)
pi/2
>>> elliptic_k(1.0 + I)
1.50923695405127 + 0.625146415202697*I
>>> elliptic_k(m).series(n=3)
pi/2 + pi*m/8 + 9*pi*m**2/128 + O(m**3)
See Also
========
elliptic_f
References
==========
.. [1] https://en.wikipedia.org/wiki/Elliptic_integrals
.. [2] http://functions.wolfram.com/EllipticIntegrals/EllipticK
"""
@classmethod
def eval(cls, m):
if m.is_zero:
return pi/2
elif m is S.Half:
return 8*pi**Rational(3, 2)/gamma(Rational(-1, 4))**2
elif m is S.One:
return S.ComplexInfinity
elif m is S.NegativeOne:
return gamma(Rational(1, 4))**2/(4*sqrt(2*pi))
elif m in (S.Infinity, S.NegativeInfinity, I*S.Infinity,
I*S.NegativeInfinity, S.ComplexInfinity):
return S.Zero
if m.is_zero:
return pi*S.Half
def fdiff(self, argindex=1):
m = self.args[0]
return (elliptic_e(m) - (1 - m)*elliptic_k(m))/(2*m*(1 - m))
def _eval_conjugate(self):
m = self.args[0]
if (m.is_real and (m - 1).is_positive) is False:
return self.func(m.conjugate())
def _eval_nseries(self, x, n, logx, cdir=0):
from sympy.simplify import hyperexpand
return hyperexpand(self.rewrite(hyper)._eval_nseries(x, n=n, logx=logx))
def _eval_rewrite_as_hyper(self, m, **kwargs):
return pi*S.Half*hyper((S.Half, S.Half), (S.One,), m)
def _eval_rewrite_as_meijerg(self, m, **kwargs):
return meijerg(((S.Half, S.Half), []), ((S.Zero,), (S.Zero,)), -m)/2
def _eval_is_zero(self):
m = self.args[0]
if m.is_infinite:
return True
def _eval_rewrite_as_Integral(self, *args):
from sympy import Integral, Dummy
t = Dummy('t')
m = self.args[0]
return Integral(1/sqrt(1 - m*sin(t)**2), (t, 0, pi/2))
def _sage_(self):
import sage.all as sage
return sage.elliptic_kc(self.args[0]._sage_())
class elliptic_f(Function):
r"""
The Legendre incomplete elliptic integral of the first
kind, defined by
.. math:: F\left(z\middle| m\right) =
\int_0^z \frac{dt}{\sqrt{1 - m \sin^2 t}}
Explanation
===========
This function reduces to a complete elliptic integral of
the first kind, $K(m)$, when $z = \pi/2$.
Note that our notation defines the incomplete elliptic integral
in terms of the parameter $m$ instead of the elliptic modulus
(eccentricity) $k$.
In this case, the parameter $m$ is defined as $m=k^2$.
Examples
========
>>> from sympy import elliptic_f, I
>>> from sympy.abc import z, m
>>> elliptic_f(z, m).series(z)
z + z**5*(3*m**2/40 - m/30) + m*z**3/6 + O(z**6)
>>> elliptic_f(3.0 + I/2, 1.0 + I)
2.909449841483 + 1.74720545502474*I
See Also
========
elliptic_k
References
==========
.. [1] https://en.wikipedia.org/wiki/Elliptic_integrals
.. [2] http://functions.wolfram.com/EllipticIntegrals/EllipticF
"""
@classmethod
def eval(cls, z, m):
if z.is_zero:
return S.Zero
if m.is_zero:
return z
k = 2*z/pi
if k.is_integer:
return k*elliptic_k(m)
elif m in (S.Infinity, S.NegativeInfinity):
return S.Zero
elif z.could_extract_minus_sign():
return -elliptic_f(-z, m)
def fdiff(self, argindex=1):
z, m = self.args
fm = sqrt(1 - m*sin(z)**2)
if argindex == 1:
return 1/fm
elif argindex == 2:
return (elliptic_e(z, m)/(2*m*(1 - m)) - elliptic_f(z, m)/(2*m) -
sin(2*z)/(4*(1 - m)*fm))
raise ArgumentIndexError(self, argindex)
def _eval_conjugate(self):
z, m = self.args
if (m.is_real and (m - 1).is_positive) is False:
return self.func(z.conjugate(), m.conjugate())
def _eval_rewrite_as_Integral(self, *args):
from sympy import Integral, Dummy
t = Dummy('t')
z, m = self.args[0], self.args[1]
return Integral(1/(sqrt(1 - m*sin(t)**2)), (t, 0, z))
def _eval_is_zero(self):
z, m = self.args
if z.is_zero:
return True
if m.is_extended_real and m.is_infinite:
return True
class elliptic_e(Function):
r"""
Called with two arguments $z$ and $m$, evaluates the
incomplete elliptic integral of the second kind, defined by
.. math:: E\left(z\middle| m\right) = \int_0^z \sqrt{1 - m \sin^2 t} dt
Called with a single argument $m$, evaluates the Legendre complete
elliptic integral of the second kind
.. math:: E(m) = E\left(\tfrac{\pi}{2}\middle| m\right)
Explanation
===========
The function $E(m)$ is a single-valued function on the complex
plane with branch cut along the interval $(1, \infty)$.
Note that our notation defines the incomplete elliptic integral
in terms of the parameter $m$ instead of the elliptic modulus
(eccentricity) $k$.
In this case, the parameter $m$ is defined as $m=k^2$.
Examples
========
>>> from sympy import elliptic_e, I
>>> from sympy.abc import z, m
>>> elliptic_e(z, m).series(z)
z + z**5*(-m**2/40 + m/30) - m*z**3/6 + O(z**6)
>>> elliptic_e(m).series(n=4)
pi/2 - pi*m/8 - 3*pi*m**2/128 - 5*pi*m**3/512 + O(m**4)
>>> elliptic_e(1 + I, 2 - I/2).n()
1.55203744279187 + 0.290764986058437*I
>>> elliptic_e(0)
pi/2
>>> elliptic_e(2.0 - I)
0.991052601328069 + 0.81879421395609*I
References
==========
.. [1] https://en.wikipedia.org/wiki/Elliptic_integrals
.. [2] http://functions.wolfram.com/EllipticIntegrals/EllipticE2
.. [3] http://functions.wolfram.com/EllipticIntegrals/EllipticE
"""
@classmethod
def eval(cls, m, z=None):
if z is not None:
z, m = m, z
k = 2*z/pi
if m.is_zero:
return z
if z.is_zero:
return S.Zero
elif k.is_integer:
return k*elliptic_e(m)
elif m in (S.Infinity, S.NegativeInfinity):
return S.ComplexInfinity
elif z.could_extract_minus_sign():
return -elliptic_e(-z, m)
else:
if m.is_zero:
return pi/2
elif m is S.One:
return S.One
elif m is S.Infinity:
return I*S.Infinity
elif m is S.NegativeInfinity:
return S.Infinity
elif m is S.ComplexInfinity:
return S.ComplexInfinity
def fdiff(self, argindex=1):
if len(self.args) == 2:
z, m = self.args
if argindex == 1:
return sqrt(1 - m*sin(z)**2)
elif argindex == 2:
return (elliptic_e(z, m) - elliptic_f(z, m))/(2*m)
else:
m = self.args[0]
if argindex == 1:
return (elliptic_e(m) - elliptic_k(m))/(2*m)
raise ArgumentIndexError(self, argindex)
def _eval_conjugate(self):
if len(self.args) == 2:
z, m = self.args
if (m.is_real and (m - 1).is_positive) is False:
return self.func(z.conjugate(), m.conjugate())
else:
m = self.args[0]
if (m.is_real and (m - 1).is_positive) is False:
return self.func(m.conjugate())
def _eval_nseries(self, x, n, logx, cdir=0):
from sympy.simplify import hyperexpand
if len(self.args) == 1:
return hyperexpand(self.rewrite(hyper)._eval_nseries(x, n=n, logx=logx))
return super()._eval_nseries(x, n=n, logx=logx)
def _eval_rewrite_as_hyper(self, *args, **kwargs):
if len(args) == 1:
m = args[0]
return (pi/2)*hyper((Rational(-1, 2), S.Half), (S.One,), m)
def _eval_rewrite_as_meijerg(self, *args, **kwargs):
if len(args) == 1:
m = args[0]
return -meijerg(((S.Half, Rational(3, 2)), []), \
((S.Zero,), (S.Zero,)), -m)/4
def _eval_rewrite_as_Integral(self, *args):
from sympy import Integral, Dummy
z, m = (pi/2, self.args[0]) if len(self.args) == 1 else self.args
t = Dummy('t')
return Integral(sqrt(1 - m*sin(t)**2), (t, 0, z))
class elliptic_pi(Function):
r"""
Called with three arguments $n$, $z$ and $m$, evaluates the
Legendre incomplete elliptic integral of the third kind, defined by
.. math:: \Pi\left(n; z\middle| m\right) = \int_0^z \frac{dt}
{\left(1 - n \sin^2 t\right) \sqrt{1 - m \sin^2 t}}
Called with two arguments $n$ and $m$, evaluates the complete
elliptic integral of the third kind:
.. math:: \Pi\left(n\middle| m\right) =
\Pi\left(n; \tfrac{\pi}{2}\middle| m\right)
Explanation
===========
Note that our notation defines the incomplete elliptic integral
in terms of the parameter $m$ instead of the elliptic modulus
(eccentricity) $k$.
In this case, the parameter $m$ is defined as $m=k^2$.
Examples
========
>>> from sympy import elliptic_pi, I
>>> from sympy.abc import z, n, m
>>> elliptic_pi(n, z, m).series(z, n=4)
z + z**3*(m/6 + n/3) + O(z**4)
>>> elliptic_pi(0.5 + I, 1.0 - I, 1.2)
2.50232379629182 - 0.760939574180767*I
>>> elliptic_pi(0, 0)
pi/2
>>> elliptic_pi(1.0 - I/3, 2.0 + I)
3.29136443417283 + 0.32555634906645*I
References
==========
.. [1] https://en.wikipedia.org/wiki/Elliptic_integrals
.. [2] http://functions.wolfram.com/EllipticIntegrals/EllipticPi3
.. [3] http://functions.wolfram.com/EllipticIntegrals/EllipticPi
"""
@classmethod
def eval(cls, n, m, z=None):
if z is not None:
n, z, m = n, m, z
if n.is_zero:
return elliptic_f(z, m)
elif n is S.One:
return (elliptic_f(z, m) +
(sqrt(1 - m*sin(z)**2)*tan(z) -
elliptic_e(z, m))/(1 - m))
k = 2*z/pi
if k.is_integer:
return k*elliptic_pi(n, m)
elif m.is_zero:
return atanh(sqrt(n - 1)*tan(z))/sqrt(n - 1)
elif n == m:
return (elliptic_f(z, n) - elliptic_pi(1, z, n) +
tan(z)/sqrt(1 - n*sin(z)**2))
elif n in (S.Infinity, S.NegativeInfinity):
return S.Zero
elif m in (S.Infinity, S.NegativeInfinity):
return S.Zero
elif z.could_extract_minus_sign():
return -elliptic_pi(n, -z, m)
if n.is_zero:
return elliptic_f(z, m)
if m.is_extended_real and m.is_infinite or \
n.is_extended_real and n.is_infinite:
return S.Zero
else:
if n.is_zero:
return elliptic_k(m)
elif n is S.One:
return S.ComplexInfinity
elif m.is_zero:
return pi/(2*sqrt(1 - n))
elif m == S.One:
return S.NegativeInfinity/sign(n - 1)
elif n == m:
return elliptic_e(n)/(1 - n)
elif n in (S.Infinity, S.NegativeInfinity):
return S.Zero
elif m in (S.Infinity, S.NegativeInfinity):
return S.Zero
if n.is_zero:
return elliptic_k(m)
if m.is_extended_real and m.is_infinite or \
n.is_extended_real and n.is_infinite:
return S.Zero
def _eval_conjugate(self):
if len(self.args) == 3:
n, z, m = self.args
if (n.is_real and (n - 1).is_positive) is False and \
(m.is_real and (m - 1).is_positive) is False:
return self.func(n.conjugate(), z.conjugate(), m.conjugate())
else:
n, m = self.args
return self.func(n.conjugate(), m.conjugate())
def fdiff(self, argindex=1):
if len(self.args) == 3:
n, z, m = self.args
fm, fn = sqrt(1 - m*sin(z)**2), 1 - n*sin(z)**2
if argindex == 1:
return (elliptic_e(z, m) + (m - n)*elliptic_f(z, m)/n +
(n**2 - m)*elliptic_pi(n, z, m)/n -
n*fm*sin(2*z)/(2*fn))/(2*(m - n)*(n - 1))
elif argindex == 2:
return 1/(fm*fn)
elif argindex == 3:
return (elliptic_e(z, m)/(m - 1) +
elliptic_pi(n, z, m) -
m*sin(2*z)/(2*(m - 1)*fm))/(2*(n - m))
else:
n, m = self.args
if argindex == 1:
return (elliptic_e(m) + (m - n)*elliptic_k(m)/n +
(n**2 - m)*elliptic_pi(n, m)/n)/(2*(m - n)*(n - 1))
elif argindex == 2:
return (elliptic_e(m)/(m - 1) + elliptic_pi(n, m))/(2*(n - m))
raise ArgumentIndexError(self, argindex)
def _eval_rewrite_as_Integral(self, *args):
from sympy import Integral, Dummy
if len(self.args) == 2:
n, m, z = self.args[0], self.args[1], pi/2
else:
n, z, m = self.args
t = Dummy('t')
return Integral(1/((1 - n*sin(t)**2)*sqrt(1 - m*sin(t)**2)), (t, 0, z))
|
156c74c68b2d87e677fc5a4c7df2ff895dc9779b3803b85025da4ce96680d7e7
|
""" This module contains various functions that are special cases
of incomplete gamma functions. It should probably be renamed. """
from sympy.core import Add, S, sympify, cacheit, pi, I, Rational
from sympy.core.function import Function, ArgumentIndexError
from sympy.core.symbol import Symbol
from sympy.functions.combinatorial.factorials import factorial
from sympy.functions.elementary.integers import floor
from sympy.functions.elementary.miscellaneous import sqrt, root
from sympy.functions.elementary.exponential import exp, log
from sympy.functions.elementary.complexes import polar_lift
from sympy.functions.elementary.hyperbolic import cosh, sinh
from sympy.functions.elementary.trigonometric import cos, sin, sinc
from sympy.functions.special.hyper import hyper, meijerg
# TODO series expansions
# TODO see the "Note:" in Ei
# Helper function
def real_to_real_as_real_imag(self, deep=True, **hints):
if self.args[0].is_extended_real:
if deep:
hints['complex'] = False
return (self.expand(deep, **hints), S.Zero)
else:
return (self, S.Zero)
if deep:
x, y = self.args[0].expand(deep, **hints).as_real_imag()
else:
x, y = self.args[0].as_real_imag()
re = (self.func(x + I*y) + self.func(x - I*y))/2
im = (self.func(x + I*y) - self.func(x - I*y))/(2*I)
return (re, im)
###############################################################################
################################ ERROR FUNCTION ###############################
###############################################################################
class erf(Function):
r"""
The Gauss error function.
Explanation
===========
This function is defined as:
.. math ::
\mathrm{erf}(x) = \frac{2}{\sqrt{\pi}} \int_0^x e^{-t^2} \mathrm{d}t.
Examples
========
>>> from sympy import I, oo, erf
>>> from sympy.abc import z
Several special values are known:
>>> erf(0)
0
>>> erf(oo)
1
>>> erf(-oo)
-1
>>> erf(I*oo)
oo*I
>>> erf(-I*oo)
-oo*I
In general one can pull out factors of -1 and $I$ from the argument:
>>> erf(-z)
-erf(z)
The error function obeys the mirror symmetry:
>>> from sympy import conjugate
>>> conjugate(erf(z))
erf(conjugate(z))
Differentiation with respect to $z$ is supported:
>>> from sympy import diff
>>> diff(erf(z), z)
2*exp(-z**2)/sqrt(pi)
We can numerically evaluate the error function to arbitrary precision
on the whole complex plane:
>>> erf(4).evalf(30)
0.999999984582742099719981147840
>>> erf(-4*I).evalf(30)
-1296959.73071763923152794095062*I
See Also
========
erfc: Complementary error function.
erfi: Imaginary error function.
erf2: Two-argument error function.
erfinv: Inverse error function.
erfcinv: Inverse Complementary error function.
erf2inv: Inverse two-argument error function.
References
==========
.. [1] https://en.wikipedia.org/wiki/Error_function
.. [2] http://dlmf.nist.gov/7
.. [3] http://mathworld.wolfram.com/Erf.html
.. [4] http://functions.wolfram.com/GammaBetaErf/Erf
"""
unbranched = True
def fdiff(self, argindex=1):
if argindex == 1:
return 2*exp(-self.args[0]**2)/sqrt(S.Pi)
else:
raise ArgumentIndexError(self, argindex)
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return erfinv
@classmethod
def eval(cls, arg):
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.One
elif arg is S.NegativeInfinity:
return S.NegativeOne
elif arg.is_zero:
return S.Zero
if isinstance(arg, erfinv):
return arg.args[0]
if isinstance(arg, erfcinv):
return S.One - arg.args[0]
if arg.is_zero:
return S.Zero
# Only happens with unevaluated erf2inv
if isinstance(arg, erf2inv) and arg.args[0].is_zero:
return arg.args[1]
# Try to pull out factors of I
t = arg.extract_multiplicatively(S.ImaginaryUnit)
if t is S.Infinity or t is S.NegativeInfinity:
return arg
# Try to pull out factors of -1
if arg.could_extract_minus_sign():
return -cls(-arg)
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
k = floor((n - 1)/S(2))
if len(previous_terms) > 2:
return -previous_terms[-2] * x**2 * (n - 2)/(n*k)
else:
return 2*(-1)**k * x**n/(n*factorial(k)*sqrt(S.Pi))
def _eval_conjugate(self):
return self.func(self.args[0].conjugate())
def _eval_is_real(self):
return self.args[0].is_extended_real
def _eval_is_finite(self):
if self.args[0].is_finite:
return True
else:
return self.args[0].is_extended_real
def _eval_is_zero(self):
if self.args[0].is_zero:
return True
def _eval_rewrite_as_uppergamma(self, z, **kwargs):
from sympy import uppergamma
return sqrt(z**2)/z*(S.One - uppergamma(S.Half, z**2)/sqrt(S.Pi))
def _eval_rewrite_as_fresnels(self, z, **kwargs):
arg = (S.One - S.ImaginaryUnit)*z/sqrt(pi)
return (S.One + S.ImaginaryUnit)*(fresnelc(arg) - I*fresnels(arg))
def _eval_rewrite_as_fresnelc(self, z, **kwargs):
arg = (S.One - S.ImaginaryUnit)*z/sqrt(pi)
return (S.One + S.ImaginaryUnit)*(fresnelc(arg) - I*fresnels(arg))
def _eval_rewrite_as_meijerg(self, z, **kwargs):
return z/sqrt(pi)*meijerg([S.Half], [], [0], [Rational(-1, 2)], z**2)
def _eval_rewrite_as_hyper(self, z, **kwargs):
return 2*z/sqrt(pi)*hyper([S.Half], [3*S.Half], -z**2)
def _eval_rewrite_as_expint(self, z, **kwargs):
return sqrt(z**2)/z - z*expint(S.Half, z**2)/sqrt(S.Pi)
def _eval_rewrite_as_tractable(self, z, **kwargs):
return S.One - _erfs(z)*exp(-z**2)
def _eval_rewrite_as_erfc(self, z, **kwargs):
return S.One - erfc(z)
def _eval_rewrite_as_erfi(self, z, **kwargs):
return -I*erfi(I*z)
def _eval_as_leading_term(self, x, cdir=0):
from sympy import Order
arg = self.args[0].as_leading_term(x)
if x in arg.free_symbols and Order(1, x).contains(arg):
return 2*x/sqrt(pi)
else:
return self.func(arg)
as_real_imag = real_to_real_as_real_imag
class erfc(Function):
r"""
Complementary Error Function.
Explanation
===========
The function is defined as:
.. math ::
\mathrm{erfc}(x) = \frac{2}{\sqrt{\pi}} \int_x^\infty e^{-t^2} \mathrm{d}t
Examples
========
>>> from sympy import I, oo, erfc
>>> from sympy.abc import z
Several special values are known:
>>> erfc(0)
1
>>> erfc(oo)
0
>>> erfc(-oo)
2
>>> erfc(I*oo)
-oo*I
>>> erfc(-I*oo)
oo*I
The error function obeys the mirror symmetry:
>>> from sympy import conjugate
>>> conjugate(erfc(z))
erfc(conjugate(z))
Differentiation with respect to $z$ is supported:
>>> from sympy import diff
>>> diff(erfc(z), z)
-2*exp(-z**2)/sqrt(pi)
It also follows
>>> erfc(-z)
2 - erfc(z)
We can numerically evaluate the complementary error function to arbitrary
precision on the whole complex plane:
>>> erfc(4).evalf(30)
0.0000000154172579002800188521596734869
>>> erfc(4*I).evalf(30)
1.0 - 1296959.73071763923152794095062*I
See Also
========
erf: Gaussian error function.
erfi: Imaginary error function.
erf2: Two-argument error function.
erfinv: Inverse error function.
erfcinv: Inverse Complementary error function.
erf2inv: Inverse two-argument error function.
References
==========
.. [1] https://en.wikipedia.org/wiki/Error_function
.. [2] http://dlmf.nist.gov/7
.. [3] http://mathworld.wolfram.com/Erfc.html
.. [4] http://functions.wolfram.com/GammaBetaErf/Erfc
"""
unbranched = True
def fdiff(self, argindex=1):
if argindex == 1:
return -2*exp(-self.args[0]**2)/sqrt(S.Pi)
else:
raise ArgumentIndexError(self, argindex)
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return erfcinv
@classmethod
def eval(cls, arg):
if arg.is_Number:
if arg is S.NaN:
return S.NaN
elif arg is S.Infinity:
return S.Zero
elif arg.is_zero:
return S.One
if isinstance(arg, erfinv):
return S.One - arg.args[0]
if isinstance(arg, erfcinv):
return arg.args[0]
if arg.is_zero:
return S.One
# Try to pull out factors of I
t = arg.extract_multiplicatively(S.ImaginaryUnit)
if t is S.Infinity or t is S.NegativeInfinity:
return -arg
# Try to pull out factors of -1
if arg.could_extract_minus_sign():
return S(2) - cls(-arg)
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n == 0:
return S.One
elif n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
k = floor((n - 1)/S(2))
if len(previous_terms) > 2:
return -previous_terms[-2] * x**2 * (n - 2)/(n*k)
else:
return -2*(-1)**k * x**n/(n*factorial(k)*sqrt(S.Pi))
def _eval_conjugate(self):
return self.func(self.args[0].conjugate())
def _eval_is_real(self):
return self.args[0].is_extended_real
def _eval_rewrite_as_tractable(self, z, **kwargs):
return self.rewrite(erf).rewrite("tractable", deep=True)
def _eval_rewrite_as_erf(self, z, **kwargs):
return S.One - erf(z)
def _eval_rewrite_as_erfi(self, z, **kwargs):
return S.One + I*erfi(I*z)
def _eval_rewrite_as_fresnels(self, z, **kwargs):
arg = (S.One - S.ImaginaryUnit)*z/sqrt(pi)
return S.One - (S.One + S.ImaginaryUnit)*(fresnelc(arg) - I*fresnels(arg))
def _eval_rewrite_as_fresnelc(self, z, **kwargs):
arg = (S.One-S.ImaginaryUnit)*z/sqrt(pi)
return S.One - (S.One + S.ImaginaryUnit)*(fresnelc(arg) - I*fresnels(arg))
def _eval_rewrite_as_meijerg(self, z, **kwargs):
return S.One - z/sqrt(pi)*meijerg([S.Half], [], [0], [Rational(-1, 2)], z**2)
def _eval_rewrite_as_hyper(self, z, **kwargs):
return S.One - 2*z/sqrt(pi)*hyper([S.Half], [3*S.Half], -z**2)
def _eval_rewrite_as_uppergamma(self, z, **kwargs):
from sympy import uppergamma
return S.One - sqrt(z**2)/z*(S.One - uppergamma(S.Half, z**2)/sqrt(S.Pi))
def _eval_rewrite_as_expint(self, z, **kwargs):
return S.One - sqrt(z**2)/z + z*expint(S.Half, z**2)/sqrt(S.Pi)
def _eval_expand_func(self, **hints):
return self.rewrite(erf)
def _eval_as_leading_term(self, x, cdir=0):
from sympy import Order
arg = self.args[0].as_leading_term(x)
if x in arg.free_symbols and Order(1, x).contains(arg):
return S.One
else:
return self.func(arg)
as_real_imag = real_to_real_as_real_imag
class erfi(Function):
r"""
Imaginary error function.
Explanation
===========
The function erfi is defined as:
.. math ::
\mathrm{erfi}(x) = \frac{2}{\sqrt{\pi}} \int_0^x e^{t^2} \mathrm{d}t
Examples
========
>>> from sympy import I, oo, erfi
>>> from sympy.abc import z
Several special values are known:
>>> erfi(0)
0
>>> erfi(oo)
oo
>>> erfi(-oo)
-oo
>>> erfi(I*oo)
I
>>> erfi(-I*oo)
-I
In general one can pull out factors of -1 and $I$ from the argument:
>>> erfi(-z)
-erfi(z)
>>> from sympy import conjugate
>>> conjugate(erfi(z))
erfi(conjugate(z))
Differentiation with respect to $z$ is supported:
>>> from sympy import diff
>>> diff(erfi(z), z)
2*exp(z**2)/sqrt(pi)
We can numerically evaluate the imaginary error function to arbitrary
precision on the whole complex plane:
>>> erfi(2).evalf(30)
18.5648024145755525987042919132
>>> erfi(-2*I).evalf(30)
-0.995322265018952734162069256367*I
See Also
========
erf: Gaussian error function.
erfc: Complementary error function.
erf2: Two-argument error function.
erfinv: Inverse error function.
erfcinv: Inverse Complementary error function.
erf2inv: Inverse two-argument error function.
References
==========
.. [1] https://en.wikipedia.org/wiki/Error_function
.. [2] http://mathworld.wolfram.com/Erfi.html
.. [3] http://functions.wolfram.com/GammaBetaErf/Erfi
"""
unbranched = True
def fdiff(self, argindex=1):
if argindex == 1:
return 2*exp(self.args[0]**2)/sqrt(S.Pi)
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, z):
if z.is_Number:
if z is S.NaN:
return S.NaN
elif z.is_zero:
return S.Zero
elif z is S.Infinity:
return S.Infinity
if z.is_zero:
return S.Zero
# Try to pull out factors of -1
if z.could_extract_minus_sign():
return -cls(-z)
# Try to pull out factors of I
nz = z.extract_multiplicatively(I)
if nz is not None:
if nz is S.Infinity:
return I
if isinstance(nz, erfinv):
return I*nz.args[0]
if isinstance(nz, erfcinv):
return I*(S.One - nz.args[0])
# Only happens with unevaluated erf2inv
if isinstance(nz, erf2inv) and nz.args[0].is_zero:
return I*nz.args[1]
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n < 0 or n % 2 == 0:
return S.Zero
else:
x = sympify(x)
k = floor((n - 1)/S(2))
if len(previous_terms) > 2:
return previous_terms[-2] * x**2 * (n - 2)/(n*k)
else:
return 2 * x**n/(n*factorial(k)*sqrt(S.Pi))
def _eval_conjugate(self):
return self.func(self.args[0].conjugate())
def _eval_is_extended_real(self):
return self.args[0].is_extended_real
def _eval_is_zero(self):
if self.args[0].is_zero:
return True
def _eval_rewrite_as_tractable(self, z, **kwargs):
return self.rewrite(erf).rewrite("tractable", deep=True)
def _eval_rewrite_as_erf(self, z, **kwargs):
return -I*erf(I*z)
def _eval_rewrite_as_erfc(self, z, **kwargs):
return I*erfc(I*z) - I
def _eval_rewrite_as_fresnels(self, z, **kwargs):
arg = (S.One + S.ImaginaryUnit)*z/sqrt(pi)
return (S.One - S.ImaginaryUnit)*(fresnelc(arg) - I*fresnels(arg))
def _eval_rewrite_as_fresnelc(self, z, **kwargs):
arg = (S.One + S.ImaginaryUnit)*z/sqrt(pi)
return (S.One - S.ImaginaryUnit)*(fresnelc(arg) - I*fresnels(arg))
def _eval_rewrite_as_meijerg(self, z, **kwargs):
return z/sqrt(pi)*meijerg([S.Half], [], [0], [Rational(-1, 2)], -z**2)
def _eval_rewrite_as_hyper(self, z, **kwargs):
return 2*z/sqrt(pi)*hyper([S.Half], [3*S.Half], z**2)
def _eval_rewrite_as_uppergamma(self, z, **kwargs):
from sympy import uppergamma
return sqrt(-z**2)/z*(uppergamma(S.Half, -z**2)/sqrt(S.Pi) - S.One)
def _eval_rewrite_as_expint(self, z, **kwargs):
return sqrt(-z**2)/z - z*expint(S.Half, -z**2)/sqrt(S.Pi)
def _eval_expand_func(self, **hints):
return self.rewrite(erf)
as_real_imag = real_to_real_as_real_imag
class erf2(Function):
r"""
Two-argument error function.
Explanation
===========
This function is defined as:
.. math ::
\mathrm{erf2}(x, y) = \frac{2}{\sqrt{\pi}} \int_x^y e^{-t^2} \mathrm{d}t
Examples
========
>>> from sympy import oo, erf2
>>> from sympy.abc import x, y
Several special values are known:
>>> erf2(0, 0)
0
>>> erf2(x, x)
0
>>> erf2(x, oo)
1 - erf(x)
>>> erf2(x, -oo)
-erf(x) - 1
>>> erf2(oo, y)
erf(y) - 1
>>> erf2(-oo, y)
erf(y) + 1
In general one can pull out factors of -1:
>>> erf2(-x, -y)
-erf2(x, y)
The error function obeys the mirror symmetry:
>>> from sympy import conjugate
>>> conjugate(erf2(x, y))
erf2(conjugate(x), conjugate(y))
Differentiation with respect to $x$, $y$ is supported:
>>> from sympy import diff
>>> diff(erf2(x, y), x)
-2*exp(-x**2)/sqrt(pi)
>>> diff(erf2(x, y), y)
2*exp(-y**2)/sqrt(pi)
See Also
========
erf: Gaussian error function.
erfc: Complementary error function.
erfi: Imaginary error function.
erfinv: Inverse error function.
erfcinv: Inverse Complementary error function.
erf2inv: Inverse two-argument error function.
References
==========
.. [1] http://functions.wolfram.com/GammaBetaErf/Erf2/
"""
def fdiff(self, argindex):
x, y = self.args
if argindex == 1:
return -2*exp(-x**2)/sqrt(S.Pi)
elif argindex == 2:
return 2*exp(-y**2)/sqrt(S.Pi)
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, x, y):
I = S.Infinity
N = S.NegativeInfinity
O = S.Zero
if x is S.NaN or y is S.NaN:
return S.NaN
elif x == y:
return S.Zero
elif (x is I or x is N or x is O) or (y is I or y is N or y is O):
return erf(y) - erf(x)
if isinstance(y, erf2inv) and y.args[0] == x:
return y.args[1]
if x.is_zero or y.is_zero or x.is_extended_real and x.is_infinite or \
y.is_extended_real and y.is_infinite:
return erf(y) - erf(x)
#Try to pull out -1 factor
sign_x = x.could_extract_minus_sign()
sign_y = y.could_extract_minus_sign()
if (sign_x and sign_y):
return -cls(-x, -y)
elif (sign_x or sign_y):
return erf(y)-erf(x)
def _eval_conjugate(self):
return self.func(self.args[0].conjugate(), self.args[1].conjugate())
def _eval_is_extended_real(self):
return self.args[0].is_extended_real and self.args[1].is_extended_real
def _eval_rewrite_as_erf(self, x, y, **kwargs):
return erf(y) - erf(x)
def _eval_rewrite_as_erfc(self, x, y, **kwargs):
return erfc(x) - erfc(y)
def _eval_rewrite_as_erfi(self, x, y, **kwargs):
return I*(erfi(I*x)-erfi(I*y))
def _eval_rewrite_as_fresnels(self, x, y, **kwargs):
return erf(y).rewrite(fresnels) - erf(x).rewrite(fresnels)
def _eval_rewrite_as_fresnelc(self, x, y, **kwargs):
return erf(y).rewrite(fresnelc) - erf(x).rewrite(fresnelc)
def _eval_rewrite_as_meijerg(self, x, y, **kwargs):
return erf(y).rewrite(meijerg) - erf(x).rewrite(meijerg)
def _eval_rewrite_as_hyper(self, x, y, **kwargs):
return erf(y).rewrite(hyper) - erf(x).rewrite(hyper)
def _eval_rewrite_as_uppergamma(self, x, y, **kwargs):
from sympy import uppergamma
return (sqrt(y**2)/y*(S.One - uppergamma(S.Half, y**2)/sqrt(S.Pi)) -
sqrt(x**2)/x*(S.One - uppergamma(S.Half, x**2)/sqrt(S.Pi)))
def _eval_rewrite_as_expint(self, x, y, **kwargs):
return erf(y).rewrite(expint) - erf(x).rewrite(expint)
def _eval_expand_func(self, **hints):
return self.rewrite(erf)
class erfinv(Function):
r"""
Inverse Error Function. The erfinv function is defined as:
.. math ::
\mathrm{erf}(x) = y \quad \Rightarrow \quad \mathrm{erfinv}(y) = x
Examples
========
>>> from sympy import erfinv
>>> from sympy.abc import x
Several special values are known:
>>> erfinv(0)
0
>>> erfinv(1)
oo
Differentiation with respect to $x$ is supported:
>>> from sympy import diff
>>> diff(erfinv(x), x)
sqrt(pi)*exp(erfinv(x)**2)/2
We can numerically evaluate the inverse error function to arbitrary
precision on [-1, 1]:
>>> erfinv(0.2).evalf(30)
0.179143454621291692285822705344
See Also
========
erf: Gaussian error function.
erfc: Complementary error function.
erfi: Imaginary error function.
erf2: Two-argument error function.
erfcinv: Inverse Complementary error function.
erf2inv: Inverse two-argument error function.
References
==========
.. [1] https://en.wikipedia.org/wiki/Error_function#Inverse_functions
.. [2] http://functions.wolfram.com/GammaBetaErf/InverseErf/
"""
def fdiff(self, argindex =1):
if argindex == 1:
return sqrt(S.Pi)*exp(self.func(self.args[0])**2)*S.Half
else :
raise ArgumentIndexError(self, argindex)
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return erf
@classmethod
def eval(cls, z):
if z is S.NaN:
return S.NaN
elif z is S.NegativeOne:
return S.NegativeInfinity
elif z.is_zero:
return S.Zero
elif z is S.One:
return S.Infinity
if isinstance(z, erf) and z.args[0].is_extended_real:
return z.args[0]
if z.is_zero:
return S.Zero
# Try to pull out factors of -1
nz = z.extract_multiplicatively(-1)
if nz is not None and (isinstance(nz, erf) and (nz.args[0]).is_extended_real):
return -nz.args[0]
def _eval_rewrite_as_erfcinv(self, z, **kwargs):
return erfcinv(1-z)
def _eval_is_zero(self):
if self.args[0].is_zero:
return True
class erfcinv (Function):
r"""
Inverse Complementary Error Function. The erfcinv function is defined as:
.. math ::
\mathrm{erfc}(x) = y \quad \Rightarrow \quad \mathrm{erfcinv}(y) = x
Examples
========
>>> from sympy import erfcinv
>>> from sympy.abc import x
Several special values are known:
>>> erfcinv(1)
0
>>> erfcinv(0)
oo
Differentiation with respect to $x$ is supported:
>>> from sympy import diff
>>> diff(erfcinv(x), x)
-sqrt(pi)*exp(erfcinv(x)**2)/2
See Also
========
erf: Gaussian error function.
erfc: Complementary error function.
erfi: Imaginary error function.
erf2: Two-argument error function.
erfinv: Inverse error function.
erf2inv: Inverse two-argument error function.
References
==========
.. [1] https://en.wikipedia.org/wiki/Error_function#Inverse_functions
.. [2] http://functions.wolfram.com/GammaBetaErf/InverseErfc/
"""
def fdiff(self, argindex =1):
if argindex == 1:
return -sqrt(S.Pi)*exp(self.func(self.args[0])**2)*S.Half
else:
raise ArgumentIndexError(self, argindex)
def inverse(self, argindex=1):
"""
Returns the inverse of this function.
"""
return erfc
@classmethod
def eval(cls, z):
if z is S.NaN:
return S.NaN
elif z.is_zero:
return S.Infinity
elif z is S.One:
return S.Zero
elif z == 2:
return S.NegativeInfinity
if z.is_zero:
return S.Infinity
def _eval_rewrite_as_erfinv(self, z, **kwargs):
return erfinv(1-z)
class erf2inv(Function):
r"""
Two-argument Inverse error function. The erf2inv function is defined as:
.. math ::
\mathrm{erf2}(x, w) = y \quad \Rightarrow \quad \mathrm{erf2inv}(x, y) = w
Examples
========
>>> from sympy import erf2inv, oo
>>> from sympy.abc import x, y
Several special values are known:
>>> erf2inv(0, 0)
0
>>> erf2inv(1, 0)
1
>>> erf2inv(0, 1)
oo
>>> erf2inv(0, y)
erfinv(y)
>>> erf2inv(oo, y)
erfcinv(-y)
Differentiation with respect to $x$ and $y$ is supported:
>>> from sympy import diff
>>> diff(erf2inv(x, y), x)
exp(-x**2 + erf2inv(x, y)**2)
>>> diff(erf2inv(x, y), y)
sqrt(pi)*exp(erf2inv(x, y)**2)/2
See Also
========
erf: Gaussian error function.
erfc: Complementary error function.
erfi: Imaginary error function.
erf2: Two-argument error function.
erfinv: Inverse error function.
erfcinv: Inverse complementary error function.
References
==========
.. [1] http://functions.wolfram.com/GammaBetaErf/InverseErf2/
"""
def fdiff(self, argindex):
x, y = self.args
if argindex == 1:
return exp(self.func(x,y)**2-x**2)
elif argindex == 2:
return sqrt(S.Pi)*S.Half*exp(self.func(x,y)**2)
else:
raise ArgumentIndexError(self, argindex)
@classmethod
def eval(cls, x, y):
if x is S.NaN or y is S.NaN:
return S.NaN
elif x.is_zero and y.is_zero:
return S.Zero
elif x.is_zero and y is S.One:
return S.Infinity
elif x is S.One and y.is_zero:
return S.One
elif x.is_zero:
return erfinv(y)
elif x is S.Infinity:
return erfcinv(-y)
elif y.is_zero:
return x
elif y is S.Infinity:
return erfinv(x)
if x.is_zero:
if y.is_zero:
return S.Zero
else:
return erfinv(y)
if y.is_zero:
return x
def _eval_is_zero(self):
x, y = self.args
if x.is_zero and y.is_zero:
return True
###############################################################################
#################### EXPONENTIAL INTEGRALS ####################################
###############################################################################
class Ei(Function):
r"""
The classical exponential integral.
Explanation
===========
For use in SymPy, this function is defined as
.. math:: \operatorname{Ei}(x) = \sum_{n=1}^\infty \frac{x^n}{n\, n!}
+ \log(x) + \gamma,
where $\gamma$ is the Euler-Mascheroni constant.
If $x$ is a polar number, this defines an analytic function on the
Riemann surface of the logarithm. Otherwise this defines an analytic
function in the cut plane $\mathbb{C} \setminus (-\infty, 0]$.
**Background**
The name exponential integral comes from the following statement:
.. math:: \operatorname{Ei}(x) = \int_{-\infty}^x \frac{e^t}{t} \mathrm{d}t
If the integral is interpreted as a Cauchy principal value, this statement
holds for $x > 0$ and $\operatorname{Ei}(x)$ as defined above.
Examples
========
>>> from sympy import Ei, polar_lift, exp_polar, I, pi
>>> from sympy.abc import x
>>> Ei(-1)
Ei(-1)
This yields a real value:
>>> Ei(-1).n(chop=True)
-0.219383934395520
On the other hand the analytic continuation is not real:
>>> Ei(polar_lift(-1)).n(chop=True)
-0.21938393439552 + 3.14159265358979*I
The exponential integral has a logarithmic branch point at the origin:
>>> Ei(x*exp_polar(2*I*pi))
Ei(x) + 2*I*pi
Differentiation is supported:
>>> Ei(x).diff(x)
exp(x)/x
The exponential integral is related to many other special functions.
For example:
>>> from sympy import expint, Shi
>>> Ei(x).rewrite(expint)
-expint(1, x*exp_polar(I*pi)) - I*pi
>>> Ei(x).rewrite(Shi)
Chi(x) + Shi(x)
See Also
========
expint: Generalised exponential integral.
E1: Special case of the generalised exponential integral.
li: Logarithmic integral.
Li: Offset logarithmic integral.
Si: Sine integral.
Ci: Cosine integral.
Shi: Hyperbolic sine integral.
Chi: Hyperbolic cosine integral.
uppergamma: Upper incomplete gamma function.
References
==========
.. [1] http://dlmf.nist.gov/6.6
.. [2] https://en.wikipedia.org/wiki/Exponential_integral
.. [3] Abramowitz & Stegun, section 5: http://people.math.sfu.ca/~cbm/aands/page_228.htm
"""
@classmethod
def eval(cls, z):
if z.is_zero:
return S.NegativeInfinity
elif z is S.Infinity:
return S.Infinity
elif z is S.NegativeInfinity:
return S.Zero
if z.is_zero:
return S.NegativeInfinity
nz, n = z.extract_branch_factor()
if n:
return Ei(nz) + 2*I*pi*n
def fdiff(self, argindex=1):
from sympy import unpolarify
arg = unpolarify(self.args[0])
if argindex == 1:
return exp(arg)/arg
else:
raise ArgumentIndexError(self, argindex)
def _eval_evalf(self, prec):
if (self.args[0]/polar_lift(-1)).is_positive:
return Function._eval_evalf(self, prec) + (I*pi)._eval_evalf(prec)
return Function._eval_evalf(self, prec)
def _eval_rewrite_as_uppergamma(self, z, **kwargs):
from sympy import uppergamma
# XXX this does not currently work usefully because uppergamma
# immediately turns into expint
return -uppergamma(0, polar_lift(-1)*z) - I*pi
def _eval_rewrite_as_expint(self, z, **kwargs):
return -expint(1, polar_lift(-1)*z) - I*pi
def _eval_rewrite_as_li(self, z, **kwargs):
if isinstance(z, log):
return li(z.args[0])
# TODO:
# Actually it only holds that:
# Ei(z) = li(exp(z))
# for -pi < imag(z) <= pi
return li(exp(z))
def _eval_rewrite_as_Si(self, z, **kwargs):
if z.is_negative:
return Shi(z) + Chi(z) - I*pi
else:
return Shi(z) + Chi(z)
_eval_rewrite_as_Ci = _eval_rewrite_as_Si
_eval_rewrite_as_Chi = _eval_rewrite_as_Si
_eval_rewrite_as_Shi = _eval_rewrite_as_Si
def _eval_rewrite_as_tractable(self, z, **kwargs):
return exp(z) * _eis(z)
def _eval_nseries(self, x, n, logx, cdir=0):
x0 = self.args[0].limit(x, 0)
if x0.is_zero:
f = self._eval_rewrite_as_Si(*self.args)
return f._eval_nseries(x, n, logx)
return super()._eval_nseries(x, n, logx)
class expint(Function):
r"""
Generalized exponential integral.
Explanation
===========
This function is defined as
.. math:: \operatorname{E}_\nu(z) = z^{\nu - 1} \Gamma(1 - \nu, z),
where $\Gamma(1 - \nu, z)$ is the upper incomplete gamma function
(``uppergamma``).
Hence for $z$ with positive real part we have
.. math:: \operatorname{E}_\nu(z)
= \int_1^\infty \frac{e^{-zt}}{t^\nu} \mathrm{d}t,
which explains the name.
The representation as an incomplete gamma function provides an analytic
continuation for $\operatorname{E}_\nu(z)$. If $\nu$ is a
non-positive integer, the exponential integral is thus an unbranched
function of $z$, otherwise there is a branch point at the origin.
Refer to the incomplete gamma function documentation for details of the
branching behavior.
Examples
========
>>> from sympy import expint, S
>>> from sympy.abc import nu, z
Differentiation is supported. Differentiation with respect to $z$ further
explains the name: for integral orders, the exponential integral is an
iterated integral of the exponential function.
>>> expint(nu, z).diff(z)
-expint(nu - 1, z)
Differentiation with respect to $\nu$ has no classical expression:
>>> expint(nu, z).diff(nu)
-z**(nu - 1)*meijerg(((), (1, 1)), ((0, 0, 1 - nu), ()), z)
At non-postive integer orders, the exponential integral reduces to the
exponential function:
>>> expint(0, z)
exp(-z)/z
>>> expint(-1, z)
exp(-z)/z + exp(-z)/z**2
At half-integers it reduces to error functions:
>>> expint(S(1)/2, z)
sqrt(pi)*erfc(sqrt(z))/sqrt(z)
At positive integer orders it can be rewritten in terms of exponentials
and ``expint(1, z)``. Use ``expand_func()`` to do this:
>>> from sympy import expand_func
>>> expand_func(expint(5, z))
z**4*expint(1, z)/24 + (-z**3 + z**2 - 2*z + 6)*exp(-z)/24
The generalised exponential integral is essentially equivalent to the
incomplete gamma function:
>>> from sympy import uppergamma
>>> expint(nu, z).rewrite(uppergamma)
z**(nu - 1)*uppergamma(1 - nu, z)
As such it is branched at the origin:
>>> from sympy import exp_polar, pi, I
>>> expint(4, z*exp_polar(2*pi*I))
I*pi*z**3/3 + expint(4, z)
>>> expint(nu, z*exp_polar(2*pi*I))
z**(nu - 1)*(exp(2*I*pi*nu) - 1)*gamma(1 - nu) + expint(nu, z)
See Also
========
Ei: Another related function called exponential integral.
E1: The classical case, returns expint(1, z).
li: Logarithmic integral.
Li: Offset logarithmic integral.
Si: Sine integral.
Ci: Cosine integral.
Shi: Hyperbolic sine integral.
Chi: Hyperbolic cosine integral.
uppergamma
References
==========
.. [1] http://dlmf.nist.gov/8.19
.. [2] http://functions.wolfram.com/GammaBetaErf/ExpIntegralE/
.. [3] https://en.wikipedia.org/wiki/Exponential_integral
"""
@classmethod
def eval(cls, nu, z):
from sympy import (unpolarify, expand_mul, uppergamma, exp, gamma,
factorial)
nu2 = unpolarify(nu)
if nu != nu2:
return expint(nu2, z)
if nu.is_Integer and nu <= 0 or (not nu.is_Integer and (2*nu).is_Integer):
return unpolarify(expand_mul(z**(nu - 1)*uppergamma(1 - nu, z)))
# Extract branching information. This can be deduced from what is
# explained in lowergamma.eval().
z, n = z.extract_branch_factor()
if n is S.Zero:
return
if nu.is_integer:
if not nu > 0:
return
return expint(nu, z) \
- 2*pi*I*n*(-1)**(nu - 1)/factorial(nu - 1)*unpolarify(z)**(nu - 1)
else:
return (exp(2*I*pi*nu*n) - 1)*z**(nu - 1)*gamma(1 - nu) + expint(nu, z)
def fdiff(self, argindex):
from sympy import meijerg
nu, z = self.args
if argindex == 1:
return -z**(nu - 1)*meijerg([], [1, 1], [0, 0, 1 - nu], [], z)
elif argindex == 2:
return -expint(nu - 1, z)
else:
raise ArgumentIndexError(self, argindex)
def _eval_rewrite_as_uppergamma(self, nu, z, **kwargs):
from sympy import uppergamma
return z**(nu - 1)*uppergamma(1 - nu, z)
def _eval_rewrite_as_Ei(self, nu, z, **kwargs):
from sympy import exp_polar, unpolarify, exp, factorial
if nu == 1:
return -Ei(z*exp_polar(-I*pi)) - I*pi
elif nu.is_Integer and nu > 1:
# DLMF, 8.19.7
x = -unpolarify(z)
return x**(nu - 1)/factorial(nu - 1)*E1(z).rewrite(Ei) + \
exp(x)/factorial(nu - 1) * \
Add(*[factorial(nu - k - 2)*x**k for k in range(nu - 1)])
else:
return self
def _eval_expand_func(self, **hints):
return self.rewrite(Ei).rewrite(expint, **hints)
def _eval_rewrite_as_Si(self, nu, z, **kwargs):
if nu != 1:
return self
return Shi(z) - Chi(z)
_eval_rewrite_as_Ci = _eval_rewrite_as_Si
_eval_rewrite_as_Chi = _eval_rewrite_as_Si
_eval_rewrite_as_Shi = _eval_rewrite_as_Si
def _eval_nseries(self, x, n, logx, cdir=0):
if not self.args[0].has(x):
nu = self.args[0]
if nu == 1:
f = self._eval_rewrite_as_Si(*self.args)
return f._eval_nseries(x, n, logx)
elif nu.is_Integer and nu > 1:
f = self._eval_rewrite_as_Ei(*self.args)
return f._eval_nseries(x, n, logx)
return super()._eval_nseries(x, n, logx)
def _sage_(self):
import sage.all as sage
return sage.exp_integral_e(self.args[0]._sage_(), self.args[1]._sage_())
def E1(z):
"""
Classical case of the generalized exponential integral.
Explanation
===========
This is equivalent to ``expint(1, z)``.
Examples
========
>>> from sympy import E1
>>> E1(0)
expint(1, 0)
>>> E1(5)
expint(1, 5)
See Also
========
Ei: Exponential integral.
expint: Generalised exponential integral.
li: Logarithmic integral.
Li: Offset logarithmic integral.
Si: Sine integral.
Ci: Cosine integral.
Shi: Hyperbolic sine integral.
Chi: Hyperbolic cosine integral.
"""
return expint(1, z)
class li(Function):
r"""
The classical logarithmic integral.
Explanation
===========
For use in SymPy, this function is defined as
.. math:: \operatorname{li}(x) = \int_0^x \frac{1}{\log(t)} \mathrm{d}t \,.
Examples
========
>>> from sympy import I, oo, li
>>> from sympy.abc import z
Several special values are known:
>>> li(0)
0
>>> li(1)
-oo
>>> li(oo)
oo
Differentiation with respect to $z$ is supported:
>>> from sympy import diff
>>> diff(li(z), z)
1/log(z)
Defining the ``li`` function via an integral:
>>> from sympy import integrate
>>> integrate(li(z))
z*li(z) - Ei(2*log(z))
>>> integrate(li(z),z)
z*li(z) - Ei(2*log(z))
The logarithmic integral can also be defined in terms of ``Ei``:
>>> from sympy import Ei
>>> li(z).rewrite(Ei)
Ei(log(z))
>>> diff(li(z).rewrite(Ei), z)
1/log(z)
We can numerically evaluate the logarithmic integral to arbitrary precision
on the whole complex plane (except the singular points):
>>> li(2).evalf(30)
1.04516378011749278484458888919
>>> li(2*I).evalf(30)
1.0652795784357498247001125598 + 3.08346052231061726610939702133*I
We can even compute Soldner's constant by the help of mpmath:
>>> from mpmath import findroot
>>> findroot(li, 2)
1.45136923488338
Further transformations include rewriting ``li`` in terms of
the trigonometric integrals ``Si``, ``Ci``, ``Shi`` and ``Chi``:
>>> from sympy import Si, Ci, Shi, Chi
>>> li(z).rewrite(Si)
-log(I*log(z)) - log(1/log(z))/2 + log(log(z))/2 + Ci(I*log(z)) + Shi(log(z))
>>> li(z).rewrite(Ci)
-log(I*log(z)) - log(1/log(z))/2 + log(log(z))/2 + Ci(I*log(z)) + Shi(log(z))
>>> li(z).rewrite(Shi)
-log(1/log(z))/2 + log(log(z))/2 + Chi(log(z)) - Shi(log(z))
>>> li(z).rewrite(Chi)
-log(1/log(z))/2 + log(log(z))/2 + Chi(log(z)) - Shi(log(z))
See Also
========
Li: Offset logarithmic integral.
Ei: Exponential integral.
expint: Generalised exponential integral.
E1: Special case of the generalised exponential integral.
Si: Sine integral.
Ci: Cosine integral.
Shi: Hyperbolic sine integral.
Chi: Hyperbolic cosine integral.
References
==========
.. [1] https://en.wikipedia.org/wiki/Logarithmic_integral
.. [2] http://mathworld.wolfram.com/LogarithmicIntegral.html
.. [3] http://dlmf.nist.gov/6
.. [4] http://mathworld.wolfram.com/SoldnersConstant.html
"""
@classmethod
def eval(cls, z):
if z.is_zero:
return S.Zero
elif z is S.One:
return S.NegativeInfinity
elif z is S.Infinity:
return S.Infinity
if z.is_zero:
return S.Zero
def fdiff(self, argindex=1):
arg = self.args[0]
if argindex == 1:
return S.One / log(arg)
else:
raise ArgumentIndexError(self, argindex)
def _eval_conjugate(self):
z = self.args[0]
# Exclude values on the branch cut (-oo, 0)
if not z.is_extended_negative:
return self.func(z.conjugate())
def _eval_rewrite_as_Li(self, z, **kwargs):
return Li(z) + li(2)
def _eval_rewrite_as_Ei(self, z, **kwargs):
return Ei(log(z))
def _eval_rewrite_as_uppergamma(self, z, **kwargs):
from sympy import uppergamma
return (-uppergamma(0, -log(z)) +
S.Half*(log(log(z)) - log(S.One/log(z))) - log(-log(z)))
def _eval_rewrite_as_Si(self, z, **kwargs):
return (Ci(I*log(z)) - I*Si(I*log(z)) -
S.Half*(log(S.One/log(z)) - log(log(z))) - log(I*log(z)))
_eval_rewrite_as_Ci = _eval_rewrite_as_Si
def _eval_rewrite_as_Shi(self, z, **kwargs):
return (Chi(log(z)) - Shi(log(z)) - S.Half*(log(S.One/log(z)) - log(log(z))))
_eval_rewrite_as_Chi = _eval_rewrite_as_Shi
def _eval_rewrite_as_hyper(self, z, **kwargs):
return (log(z)*hyper((1, 1), (2, 2), log(z)) +
S.Half*(log(log(z)) - log(S.One/log(z))) + S.EulerGamma)
def _eval_rewrite_as_meijerg(self, z, **kwargs):
return (-log(-log(z)) - S.Half*(log(S.One/log(z)) - log(log(z)))
- meijerg(((), (1,)), ((0, 0), ()), -log(z)))
def _eval_rewrite_as_tractable(self, z, **kwargs):
return z * _eis(log(z))
def _eval_is_zero(self):
z = self.args[0]
if z.is_zero:
return True
class Li(Function):
r"""
The offset logarithmic integral.
Explanation
===========
For use in SymPy, this function is defined as
.. math:: \operatorname{Li}(x) = \operatorname{li}(x) - \operatorname{li}(2)
Examples
========
>>> from sympy import Li
>>> from sympy.abc import z
The following special value is known:
>>> Li(2)
0
Differentiation with respect to $z$ is supported:
>>> from sympy import diff
>>> diff(Li(z), z)
1/log(z)
The shifted logarithmic integral can be written in terms of $li(z)$:
>>> from sympy import li
>>> Li(z).rewrite(li)
li(z) - li(2)
We can numerically evaluate the logarithmic integral to arbitrary precision
on the whole complex plane (except the singular points):
>>> Li(2).evalf(30)
0
>>> Li(4).evalf(30)
1.92242131492155809316615998938
See Also
========
li: Logarithmic integral.
Ei: Exponential integral.
expint: Generalised exponential integral.
E1: Special case of the generalised exponential integral.
Si: Sine integral.
Ci: Cosine integral.
Shi: Hyperbolic sine integral.
Chi: Hyperbolic cosine integral.
References
==========
.. [1] https://en.wikipedia.org/wiki/Logarithmic_integral
.. [2] http://mathworld.wolfram.com/LogarithmicIntegral.html
.. [3] http://dlmf.nist.gov/6
"""
@classmethod
def eval(cls, z):
if z is S.Infinity:
return S.Infinity
elif z == S(2):
return S.Zero
def fdiff(self, argindex=1):
arg = self.args[0]
if argindex == 1:
return S.One / log(arg)
else:
raise ArgumentIndexError(self, argindex)
def _eval_evalf(self, prec):
return self.rewrite(li).evalf(prec)
def _eval_rewrite_as_li(self, z, **kwargs):
return li(z) - li(2)
def _eval_rewrite_as_tractable(self, z, **kwargs):
return self.rewrite(li).rewrite("tractable", deep=True)
###############################################################################
#################### TRIGONOMETRIC INTEGRALS ##################################
###############################################################################
class TrigonometricIntegral(Function):
""" Base class for trigonometric integrals. """
@classmethod
def eval(cls, z):
if z is S.Zero:
return cls._atzero
elif z is S.Infinity:
return cls._atinf()
elif z is S.NegativeInfinity:
return cls._atneginf()
if z.is_zero:
return cls._atzero
nz = z.extract_multiplicatively(polar_lift(I))
if nz is None and cls._trigfunc(0) == 0:
nz = z.extract_multiplicatively(I)
if nz is not None:
return cls._Ifactor(nz, 1)
nz = z.extract_multiplicatively(polar_lift(-I))
if nz is not None:
return cls._Ifactor(nz, -1)
nz = z.extract_multiplicatively(polar_lift(-1))
if nz is None and cls._trigfunc(0) == 0:
nz = z.extract_multiplicatively(-1)
if nz is not None:
return cls._minusfactor(nz)
nz, n = z.extract_branch_factor()
if n == 0 and nz == z:
return
return 2*pi*I*n*cls._trigfunc(0) + cls(nz)
def fdiff(self, argindex=1):
from sympy import unpolarify
arg = unpolarify(self.args[0])
if argindex == 1:
return self._trigfunc(arg)/arg
else:
raise ArgumentIndexError(self, argindex)
def _eval_rewrite_as_Ei(self, z, **kwargs):
return self._eval_rewrite_as_expint(z).rewrite(Ei)
def _eval_rewrite_as_uppergamma(self, z, **kwargs):
from sympy import uppergamma
return self._eval_rewrite_as_expint(z).rewrite(uppergamma)
def _eval_nseries(self, x, n, logx, cdir=0):
# NOTE this is fairly inefficient
from sympy import log, EulerGamma, Pow
n += 1
if self.args[0].subs(x, 0) != 0:
return super()._eval_nseries(x, n, logx)
baseseries = self._trigfunc(x)._eval_nseries(x, n, logx)
if self._trigfunc(0) != 0:
baseseries -= 1
baseseries = baseseries.replace(Pow, lambda t, n: t**n/n, simultaneous=False)
if self._trigfunc(0) != 0:
baseseries += EulerGamma + log(x)
return baseseries.subs(x, self.args[0])._eval_nseries(x, n, logx)
class Si(TrigonometricIntegral):
r"""
Sine integral.
Explanation
===========
This function is defined by
.. math:: \operatorname{Si}(z) = \int_0^z \frac{\sin{t}}{t} \mathrm{d}t.
It is an entire function.
Examples
========
>>> from sympy import Si
>>> from sympy.abc import z
The sine integral is an antiderivative of $sin(z)/z$:
>>> Si(z).diff(z)
sin(z)/z
It is unbranched:
>>> from sympy import exp_polar, I, pi
>>> Si(z*exp_polar(2*I*pi))
Si(z)
Sine integral behaves much like ordinary sine under multiplication by ``I``:
>>> Si(I*z)
I*Shi(z)
>>> Si(-z)
-Si(z)
It can also be expressed in terms of exponential integrals, but beware
that the latter is branched:
>>> from sympy import expint
>>> Si(z).rewrite(expint)
-I*(-expint(1, z*exp_polar(-I*pi/2))/2 +
expint(1, z*exp_polar(I*pi/2))/2) + pi/2
It can be rewritten in the form of sinc function (by definition):
>>> from sympy import sinc
>>> Si(z).rewrite(sinc)
Integral(sinc(t), (t, 0, z))
See Also
========
Ci: Cosine integral.
Shi: Hyperbolic sine integral.
Chi: Hyperbolic cosine integral.
Ei: Exponential integral.
expint: Generalised exponential integral.
sinc: unnormalized sinc function
E1: Special case of the generalised exponential integral.
li: Logarithmic integral.
Li: Offset logarithmic integral.
References
==========
.. [1] https://en.wikipedia.org/wiki/Trigonometric_integral
"""
_trigfunc = sin
_atzero = S.Zero
@classmethod
def _atinf(cls):
return pi*S.Half
@classmethod
def _atneginf(cls):
return -pi*S.Half
@classmethod
def _minusfactor(cls, z):
return -Si(z)
@classmethod
def _Ifactor(cls, z, sign):
return I*Shi(z)*sign
def _eval_rewrite_as_expint(self, z, **kwargs):
# XXX should we polarify z?
return pi/2 + (E1(polar_lift(I)*z) - E1(polar_lift(-I)*z))/2/I
def _eval_rewrite_as_sinc(self, z, **kwargs):
from sympy import Integral
t = Symbol('t', Dummy=True)
return Integral(sinc(t), (t, 0, z))
def _eval_is_zero(self):
z = self.args[0]
if z.is_zero:
return True
def _sage_(self):
import sage.all as sage
return sage.sin_integral(self.args[0]._sage_())
class Ci(TrigonometricIntegral):
r"""
Cosine integral.
Explanation
===========
This function is defined for positive $x$ by
.. math:: \operatorname{Ci}(x) = \gamma + \log{x}
+ \int_0^x \frac{\cos{t} - 1}{t} \mathrm{d}t
= -\int_x^\infty \frac{\cos{t}}{t} \mathrm{d}t,
where $\gamma$ is the Euler-Mascheroni constant.
We have
.. math:: \operatorname{Ci}(z) =
-\frac{\operatorname{E}_1\left(e^{i\pi/2} z\right)
+ \operatorname{E}_1\left(e^{-i \pi/2} z\right)}{2}
which holds for all polar $z$ and thus provides an analytic
continuation to the Riemann surface of the logarithm.
The formula also holds as stated
for $z \in \mathbb{C}$ with $\Re(z) > 0$.
By lifting to the principal branch, we obtain an analytic function on the
cut complex plane.
Examples
========
>>> from sympy import Ci
>>> from sympy.abc import z
The cosine integral is a primitive of $\cos(z)/z$:
>>> Ci(z).diff(z)
cos(z)/z
It has a logarithmic branch point at the origin:
>>> from sympy import exp_polar, I, pi
>>> Ci(z*exp_polar(2*I*pi))
Ci(z) + 2*I*pi
The cosine integral behaves somewhat like ordinary $\cos$ under
multiplication by $i$:
>>> from sympy import polar_lift
>>> Ci(polar_lift(I)*z)
Chi(z) + I*pi/2
>>> Ci(polar_lift(-1)*z)
Ci(z) + I*pi
It can also be expressed in terms of exponential integrals:
>>> from sympy import expint
>>> Ci(z).rewrite(expint)
-expint(1, z*exp_polar(-I*pi/2))/2 - expint(1, z*exp_polar(I*pi/2))/2
See Also
========
Si: Sine integral.
Shi: Hyperbolic sine integral.
Chi: Hyperbolic cosine integral.
Ei: Exponential integral.
expint: Generalised exponential integral.
E1: Special case of the generalised exponential integral.
li: Logarithmic integral.
Li: Offset logarithmic integral.
References
==========
.. [1] https://en.wikipedia.org/wiki/Trigonometric_integral
"""
_trigfunc = cos
_atzero = S.ComplexInfinity
@classmethod
def _atinf(cls):
return S.Zero
@classmethod
def _atneginf(cls):
return I*pi
@classmethod
def _minusfactor(cls, z):
return Ci(z) + I*pi
@classmethod
def _Ifactor(cls, z, sign):
return Chi(z) + I*pi/2*sign
def _eval_rewrite_as_expint(self, z, **kwargs):
return -(E1(polar_lift(I)*z) + E1(polar_lift(-I)*z))/2
def _sage_(self):
import sage.all as sage
return sage.cos_integral(self.args[0]._sage_())
class Shi(TrigonometricIntegral):
r"""
Sinh integral.
Explanation
===========
This function is defined by
.. math:: \operatorname{Shi}(z) = \int_0^z \frac{\sinh{t}}{t} \mathrm{d}t.
It is an entire function.
Examples
========
>>> from sympy import Shi
>>> from sympy.abc import z
The Sinh integral is a primitive of $\sinh(z)/z$:
>>> Shi(z).diff(z)
sinh(z)/z
It is unbranched:
>>> from sympy import exp_polar, I, pi
>>> Shi(z*exp_polar(2*I*pi))
Shi(z)
The $\sinh$ integral behaves much like ordinary $\sinh$ under
multiplication by $i$:
>>> Shi(I*z)
I*Si(z)
>>> Shi(-z)
-Shi(z)
It can also be expressed in terms of exponential integrals, but beware
that the latter is branched:
>>> from sympy import expint
>>> Shi(z).rewrite(expint)
expint(1, z)/2 - expint(1, z*exp_polar(I*pi))/2 - I*pi/2
See Also
========
Si: Sine integral.
Ci: Cosine integral.
Chi: Hyperbolic cosine integral.
Ei: Exponential integral.
expint: Generalised exponential integral.
E1: Special case of the generalised exponential integral.
li: Logarithmic integral.
Li: Offset logarithmic integral.
References
==========
.. [1] https://en.wikipedia.org/wiki/Trigonometric_integral
"""
_trigfunc = sinh
_atzero = S.Zero
@classmethod
def _atinf(cls):
return S.Infinity
@classmethod
def _atneginf(cls):
return S.NegativeInfinity
@classmethod
def _minusfactor(cls, z):
return -Shi(z)
@classmethod
def _Ifactor(cls, z, sign):
return I*Si(z)*sign
def _eval_rewrite_as_expint(self, z, **kwargs):
from sympy import exp_polar
# XXX should we polarify z?
return (E1(z) - E1(exp_polar(I*pi)*z))/2 - I*pi/2
def _eval_is_zero(self):
z = self.args[0]
if z.is_zero:
return True
def _sage_(self):
import sage.all as sage
return sage.sinh_integral(self.args[0]._sage_())
class Chi(TrigonometricIntegral):
r"""
Cosh integral.
Explanation
===========
This function is defined for positive $x$ by
.. math:: \operatorname{Chi}(x) = \gamma + \log{x}
+ \int_0^x \frac{\cosh{t} - 1}{t} \mathrm{d}t,
where $\gamma$ is the Euler-Mascheroni constant.
We have
.. math:: \operatorname{Chi}(z) = \operatorname{Ci}\left(e^{i \pi/2}z\right)
- i\frac{\pi}{2},
which holds for all polar $z$ and thus provides an analytic
continuation to the Riemann surface of the logarithm.
By lifting to the principal branch we obtain an analytic function on the
cut complex plane.
Examples
========
>>> from sympy import Chi
>>> from sympy.abc import z
The $\cosh$ integral is a primitive of $\cosh(z)/z$:
>>> Chi(z).diff(z)
cosh(z)/z
It has a logarithmic branch point at the origin:
>>> from sympy import exp_polar, I, pi
>>> Chi(z*exp_polar(2*I*pi))
Chi(z) + 2*I*pi
The $\cosh$ integral behaves somewhat like ordinary $\cosh$ under
multiplication by $i$:
>>> from sympy import polar_lift
>>> Chi(polar_lift(I)*z)
Ci(z) + I*pi/2
>>> Chi(polar_lift(-1)*z)
Chi(z) + I*pi
It can also be expressed in terms of exponential integrals:
>>> from sympy import expint
>>> Chi(z).rewrite(expint)
-expint(1, z)/2 - expint(1, z*exp_polar(I*pi))/2 - I*pi/2
See Also
========
Si: Sine integral.
Ci: Cosine integral.
Shi: Hyperbolic sine integral.
Ei: Exponential integral.
expint: Generalised exponential integral.
E1: Special case of the generalised exponential integral.
li: Logarithmic integral.
Li: Offset logarithmic integral.
References
==========
.. [1] https://en.wikipedia.org/wiki/Trigonometric_integral
"""
_trigfunc = cosh
_atzero = S.ComplexInfinity
@classmethod
def _atinf(cls):
return S.Infinity
@classmethod
def _atneginf(cls):
return S.Infinity
@classmethod
def _minusfactor(cls, z):
return Chi(z) + I*pi
@classmethod
def _Ifactor(cls, z, sign):
return Ci(z) + I*pi/2*sign
def _eval_rewrite_as_expint(self, z, **kwargs):
from sympy import exp_polar
return -I*pi/2 - (E1(z) + E1(exp_polar(I*pi)*z))/2
def _sage_(self):
import sage.all as sage
return sage.cosh_integral(self.args[0]._sage_())
###############################################################################
#################### FRESNEL INTEGRALS ########################################
###############################################################################
class FresnelIntegral(Function):
""" Base class for the Fresnel integrals."""
unbranched = True
@classmethod
def eval(cls, z):
# Values at positive infinities signs
# if any were extracted automatically
if z is S.Infinity:
return S.Half
# Value at zero
if z.is_zero:
return S.Zero
# Try to pull out factors of -1 and I
prefact = S.One
newarg = z
changed = False
nz = newarg.extract_multiplicatively(-1)
if nz is not None:
prefact = -prefact
newarg = nz
changed = True
nz = newarg.extract_multiplicatively(I)
if nz is not None:
prefact = cls._sign*I*prefact
newarg = nz
changed = True
if changed:
return prefact*cls(newarg)
def fdiff(self, argindex=1):
if argindex == 1:
return self._trigfunc(S.Half*pi*self.args[0]**2)
else:
raise ArgumentIndexError(self, argindex)
def _eval_is_extended_real(self):
return self.args[0].is_extended_real
_eval_is_finite = _eval_is_extended_real
def _eval_is_zero(self):
z = self.args[0]
if z.is_zero:
return True
def _eval_conjugate(self):
return self.func(self.args[0].conjugate())
as_real_imag = real_to_real_as_real_imag
class fresnels(FresnelIntegral):
r"""
Fresnel integral S.
Explanation
===========
This function is defined by
.. math:: \operatorname{S}(z) = \int_0^z \sin{\frac{\pi}{2} t^2} \mathrm{d}t.
It is an entire function.
Examples
========
>>> from sympy import I, oo, fresnels
>>> from sympy.abc import z
Several special values are known:
>>> fresnels(0)
0
>>> fresnels(oo)
1/2
>>> fresnels(-oo)
-1/2
>>> fresnels(I*oo)
-I/2
>>> fresnels(-I*oo)
I/2
In general one can pull out factors of -1 and $i$ from the argument:
>>> fresnels(-z)
-fresnels(z)
>>> fresnels(I*z)
-I*fresnels(z)
The Fresnel S integral obeys the mirror symmetry
$\overline{S(z)} = S(\bar{z})$:
>>> from sympy import conjugate
>>> conjugate(fresnels(z))
fresnels(conjugate(z))
Differentiation with respect to $z$ is supported:
>>> from sympy import diff
>>> diff(fresnels(z), z)
sin(pi*z**2/2)
Defining the Fresnel functions via an integral:
>>> from sympy import integrate, pi, sin, expand_func
>>> integrate(sin(pi*z**2/2), z)
3*fresnels(z)*gamma(3/4)/(4*gamma(7/4))
>>> expand_func(integrate(sin(pi*z**2/2), z))
fresnels(z)
We can numerically evaluate the Fresnel integral to arbitrary precision
on the whole complex plane:
>>> fresnels(2).evalf(30)
0.343415678363698242195300815958
>>> fresnels(-2*I).evalf(30)
0.343415678363698242195300815958*I
See Also
========
fresnelc: Fresnel cosine integral.
References
==========
.. [1] https://en.wikipedia.org/wiki/Fresnel_integral
.. [2] http://dlmf.nist.gov/7
.. [3] http://mathworld.wolfram.com/FresnelIntegrals.html
.. [4] http://functions.wolfram.com/GammaBetaErf/FresnelS
.. [5] The converging factors for the fresnel integrals
by John W. Wrench Jr. and Vicki Alley
"""
_trigfunc = sin
_sign = -S.One
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n < 0:
return S.Zero
else:
x = sympify(x)
if len(previous_terms) > 1:
p = previous_terms[-1]
return (-pi**2*x**4*(4*n - 1)/(8*n*(2*n + 1)*(4*n + 3))) * p
else:
return x**3 * (-x**4)**n * (S(2)**(-2*n - 1)*pi**(2*n + 1)) / ((4*n + 3)*factorial(2*n + 1))
def _eval_rewrite_as_erf(self, z, **kwargs):
return (S.One + I)/4 * (erf((S.One + I)/2*sqrt(pi)*z) - I*erf((S.One - I)/2*sqrt(pi)*z))
def _eval_rewrite_as_hyper(self, z, **kwargs):
return pi*z**3/6 * hyper([Rational(3, 4)], [Rational(3, 2), Rational(7, 4)], -pi**2*z**4/16)
def _eval_rewrite_as_meijerg(self, z, **kwargs):
return (pi*z**Rational(9, 4) / (sqrt(2)*(z**2)**Rational(3, 4)*(-z)**Rational(3, 4))
* meijerg([], [1], [Rational(3, 4)], [Rational(1, 4), 0], -pi**2*z**4/16))
def _eval_aseries(self, n, args0, x, logx):
from sympy import Order
point = args0[0]
# Expansion at oo and -oo
if point in [S.Infinity, -S.Infinity]:
z = self.args[0]
# expansion of S(x) = S1(x*sqrt(pi/2)), see reference[5] page 1-8
# as only real infinities are dealt with, sin and cos are O(1)
p = [(-1)**k * factorial(4*k + 1) /
(2**(2*k + 2) * z**(4*k + 3) * 2**(2*k)*factorial(2*k))
for k in range(0, n) if 4*k + 3 < n]
q = [1/(2*z)] + [(-1)**k * factorial(4*k - 1) /
(2**(2*k + 1) * z**(4*k + 1) * 2**(2*k - 1)*factorial(2*k - 1))
for k in range(1, n) if 4*k + 1 < n]
p = [-sqrt(2/pi)*t for t in p]
q = [-sqrt(2/pi)*t for t in q]
s = 1 if point is S.Infinity else -1
# The expansion at oo is 1/2 + some odd powers of z
# To get the expansion at -oo, replace z by -z and flip the sign
# The result -1/2 + the same odd powers of z as before.
return s*S.Half + (sin(z**2)*Add(*p) + cos(z**2)*Add(*q)
).subs(x, sqrt(2/pi)*x) + Order(1/z**n, x)
# All other points are not handled
return super()._eval_aseries(n, args0, x, logx)
class fresnelc(FresnelIntegral):
r"""
Fresnel integral C.
Explanation
===========
This function is defined by
.. math:: \operatorname{C}(z) = \int_0^z \cos{\frac{\pi}{2} t^2} \mathrm{d}t.
It is an entire function.
Examples
========
>>> from sympy import I, oo, fresnelc
>>> from sympy.abc import z
Several special values are known:
>>> fresnelc(0)
0
>>> fresnelc(oo)
1/2
>>> fresnelc(-oo)
-1/2
>>> fresnelc(I*oo)
I/2
>>> fresnelc(-I*oo)
-I/2
In general one can pull out factors of -1 and $i$ from the argument:
>>> fresnelc(-z)
-fresnelc(z)
>>> fresnelc(I*z)
I*fresnelc(z)
The Fresnel C integral obeys the mirror symmetry
$\overline{C(z)} = C(\bar{z})$:
>>> from sympy import conjugate
>>> conjugate(fresnelc(z))
fresnelc(conjugate(z))
Differentiation with respect to $z$ is supported:
>>> from sympy import diff
>>> diff(fresnelc(z), z)
cos(pi*z**2/2)
Defining the Fresnel functions via an integral:
>>> from sympy import integrate, pi, cos, expand_func
>>> integrate(cos(pi*z**2/2), z)
fresnelc(z)*gamma(1/4)/(4*gamma(5/4))
>>> expand_func(integrate(cos(pi*z**2/2), z))
fresnelc(z)
We can numerically evaluate the Fresnel integral to arbitrary precision
on the whole complex plane:
>>> fresnelc(2).evalf(30)
0.488253406075340754500223503357
>>> fresnelc(-2*I).evalf(30)
-0.488253406075340754500223503357*I
See Also
========
fresnels: Fresnel sine integral.
References
==========
.. [1] https://en.wikipedia.org/wiki/Fresnel_integral
.. [2] http://dlmf.nist.gov/7
.. [3] http://mathworld.wolfram.com/FresnelIntegrals.html
.. [4] http://functions.wolfram.com/GammaBetaErf/FresnelC
.. [5] The converging factors for the fresnel integrals
by John W. Wrench Jr. and Vicki Alley
"""
_trigfunc = cos
_sign = S.One
@staticmethod
@cacheit
def taylor_term(n, x, *previous_terms):
if n < 0:
return S.Zero
else:
x = sympify(x)
if len(previous_terms) > 1:
p = previous_terms[-1]
return (-pi**2*x**4*(4*n - 3)/(8*n*(2*n - 1)*(4*n + 1))) * p
else:
return x * (-x**4)**n * (S(2)**(-2*n)*pi**(2*n)) / ((4*n + 1)*factorial(2*n))
def _eval_rewrite_as_erf(self, z, **kwargs):
return (S.One - I)/4 * (erf((S.One + I)/2*sqrt(pi)*z) + I*erf((S.One - I)/2*sqrt(pi)*z))
def _eval_rewrite_as_hyper(self, z, **kwargs):
return z * hyper([Rational(1, 4)], [S.Half, Rational(5, 4)], -pi**2*z**4/16)
def _eval_rewrite_as_meijerg(self, z, **kwargs):
return (pi*z**Rational(3, 4) / (sqrt(2)*root(z**2, 4)*root(-z, 4))
* meijerg([], [1], [Rational(1, 4)], [Rational(3, 4), 0], -pi**2*z**4/16))
def _eval_aseries(self, n, args0, x, logx):
from sympy import Order
point = args0[0]
# Expansion at oo
if point in [S.Infinity, -S.Infinity]:
z = self.args[0]
# expansion of C(x) = C1(x*sqrt(pi/2)), see reference[5] page 1-8
# as only real infinities are dealt with, sin and cos are O(1)
p = [(-1)**k * factorial(4*k + 1) /
(2**(2*k + 2) * z**(4*k + 3) * 2**(2*k)*factorial(2*k))
for k in range(0, n) if 4*k + 3 < n]
q = [1/(2*z)] + [(-1)**k * factorial(4*k - 1) /
(2**(2*k + 1) * z**(4*k + 1) * 2**(2*k - 1)*factorial(2*k - 1))
for k in range(1, n) if 4*k + 1 < n]
p = [-sqrt(2/pi)*t for t in p]
q = [ sqrt(2/pi)*t for t in q]
s = 1 if point is S.Infinity else -1
# The expansion at oo is 1/2 + some odd powers of z
# To get the expansion at -oo, replace z by -z and flip the sign
# The result -1/2 + the same odd powers of z as before.
return s*S.Half + (cos(z**2)*Add(*p) + sin(z**2)*Add(*q)
).subs(x, sqrt(2/pi)*x) + Order(1/z**n, x)
# All other points are not handled
return super()._eval_aseries(n, args0, x, logx)
###############################################################################
#################### HELPER FUNCTIONS #########################################
###############################################################################
class _erfs(Function):
"""
Helper function to make the $\\mathrm{erf}(z)$ function
tractable for the Gruntz algorithm.
"""
def _eval_aseries(self, n, args0, x, logx):
from sympy import Order
point = args0[0]
# Expansion at oo
if point is S.Infinity:
z = self.args[0]
l = [ 1/sqrt(S.Pi) * factorial(2*k)*(-S(
4))**(-k)/factorial(k) * (1/z)**(2*k + 1) for k in range(0, n) ]
o = Order(1/z**(2*n + 1), x)
# It is very inefficient to first add the order and then do the nseries
return (Add(*l))._eval_nseries(x, n, logx) + o
# Expansion at I*oo
t = point.extract_multiplicatively(S.ImaginaryUnit)
if t is S.Infinity:
z = self.args[0]
# TODO: is the series really correct?
l = [ 1/sqrt(S.Pi) * factorial(2*k)*(-S(
4))**(-k)/factorial(k) * (1/z)**(2*k + 1) for k in range(0, n) ]
o = Order(1/z**(2*n + 1), x)
# It is very inefficient to first add the order and then do the nseries
return (Add(*l))._eval_nseries(x, n, logx) + o
# All other points are not handled
return super()._eval_aseries(n, args0, x, logx)
def fdiff(self, argindex=1):
if argindex == 1:
z = self.args[0]
return -2/sqrt(S.Pi) + 2*z*_erfs(z)
else:
raise ArgumentIndexError(self, argindex)
def _eval_rewrite_as_intractable(self, z, **kwargs):
return (S.One - erf(z))*exp(z**2)
class _eis(Function):
"""
Helper function to make the $\\mathrm{Ei}(z)$ and $\\mathrm{li}(z)$
functions tractable for the Gruntz algorithm.
"""
def _eval_aseries(self, n, args0, x, logx):
from sympy import Order
if args0[0] != S.Infinity:
return super(_erfs, self)._eval_aseries(n, args0, x, logx)
z = self.args[0]
l = [ factorial(k) * (1/z)**(k + 1) for k in range(0, n) ]
o = Order(1/z**(n + 1), x)
# It is very inefficient to first add the order and then do the nseries
return (Add(*l))._eval_nseries(x, n, logx) + o
def fdiff(self, argindex=1):
if argindex == 1:
z = self.args[0]
return S.One / z - _eis(z)
else:
raise ArgumentIndexError(self, argindex)
def _eval_rewrite_as_intractable(self, z, **kwargs):
return exp(-z)*Ei(z)
def _eval_nseries(self, x, n, logx, cdir=0):
x0 = self.args[0].limit(x, 0)
if x0.is_zero:
f = self._eval_rewrite_as_intractable(*self.args)
return f._eval_nseries(x, n, logx)
return super()._eval_nseries(x, n, logx)
|
7c1476113f7ea29377e91d76e08574d60a94de1db09543af1bbae59f9f368cf4
|
"""
This module mainly implements special orthogonal polynomials.
See also functions.combinatorial.numbers which contains some
combinatorial polynomials.
"""
from sympy.core import Rational
from sympy.core.function import Function, ArgumentIndexError
from sympy.core.singleton import S
from sympy.core.symbol import Dummy
from sympy.functions.combinatorial.factorials import binomial, factorial, RisingFactorial
from sympy.functions.elementary.complexes import re
from sympy.functions.elementary.exponential import exp
from sympy.functions.elementary.integers import floor
from sympy.functions.elementary.miscellaneous import sqrt
from sympy.functions.elementary.trigonometric import cos, sec
from sympy.functions.special.gamma_functions import gamma
from sympy.functions.special.hyper import hyper
from sympy.polys.orthopolys import (
jacobi_poly,
gegenbauer_poly,
chebyshevt_poly,
chebyshevu_poly,
laguerre_poly,
hermite_poly,
legendre_poly
)
_x = Dummy('x')
class OrthogonalPolynomial(Function):
"""Base class for orthogonal polynomials.
"""
@classmethod
def _eval_at_order(cls, n, x):
if n.is_integer and n >= 0:
return cls._ortho_poly(int(n), _x).subs(_x, x)
def _eval_conjugate(self):
return self.func(self.args[0], self.args[1].conjugate())
#----------------------------------------------------------------------------
# Jacobi polynomials
#
class jacobi(OrthogonalPolynomial):
r"""
Jacobi polynomial $P_n^{\left(\alpha, \beta\right)}(x)$.
Explanation
===========
``jacobi(n, alpha, beta, x)`` gives the nth Jacobi polynomial
in x, $P_n^{\left(\alpha, \beta\right)}(x)$.
The Jacobi polynomials are orthogonal on $[-1, 1]$ with respect
to the weight $\left(1-x\right)^\alpha \left(1+x\right)^\beta$.
Examples
========
>>> from sympy import jacobi, S, conjugate, diff
>>> from sympy.abc import a, b, n, x
>>> jacobi(0, a, b, x)
1
>>> jacobi(1, a, b, x)
a/2 - b/2 + x*(a/2 + b/2 + 1)
>>> jacobi(2, a, b, x)
a**2/8 - a*b/4 - a/8 + b**2/8 - b/8 + x**2*(a**2/8 + a*b/4 + 7*a/8 + b**2/8 + 7*b/8 + 3/2) + x*(a**2/4 + 3*a/4 - b**2/4 - 3*b/4) - 1/2
>>> jacobi(n, a, b, x)
jacobi(n, a, b, x)
>>> jacobi(n, a, a, x)
RisingFactorial(a + 1, n)*gegenbauer(n,
a + 1/2, x)/RisingFactorial(2*a + 1, n)
>>> jacobi(n, 0, 0, x)
legendre(n, x)
>>> jacobi(n, S(1)/2, S(1)/2, x)
RisingFactorial(3/2, n)*chebyshevu(n, x)/factorial(n + 1)
>>> jacobi(n, -S(1)/2, -S(1)/2, x)
RisingFactorial(1/2, n)*chebyshevt(n, x)/factorial(n)
>>> jacobi(n, a, b, -x)
(-1)**n*jacobi(n, b, a, x)
>>> jacobi(n, a, b, 0)
2**(-n)*gamma(a + n + 1)*hyper((-b - n, -n), (a + 1,), -1)/(factorial(n)*gamma(a + 1))
>>> jacobi(n, a, b, 1)
RisingFactorial(a + 1, n)/factorial(n)
>>> conjugate(jacobi(n, a, b, x))
jacobi(n, conjugate(a), conjugate(b), conjugate(x))
>>> diff(jacobi(n,a,b,x), x)
(a/2 + b/2 + n/2 + 1/2)*jacobi(n - 1, a + 1, b + 1, x)
See Also
========
gegenbauer,
chebyshevt_root, chebyshevu, chebyshevu_root,
legendre, assoc_legendre,
hermite,
laguerre, assoc_laguerre,
sympy.polys.orthopolys.jacobi_poly,
sympy.polys.orthopolys.gegenbauer_poly
sympy.polys.orthopolys.chebyshevt_poly
sympy.polys.orthopolys.chebyshevu_poly
sympy.polys.orthopolys.hermite_poly
sympy.polys.orthopolys.legendre_poly
sympy.polys.orthopolys.laguerre_poly
References
==========
.. [1] https://en.wikipedia.org/wiki/Jacobi_polynomials
.. [2] http://mathworld.wolfram.com/JacobiPolynomial.html
.. [3] http://functions.wolfram.com/Polynomials/JacobiP/
"""
@classmethod
def eval(cls, n, a, b, x):
# Simplify to other polynomials
# P^{a, a}_n(x)
if a == b:
if a == Rational(-1, 2):
return RisingFactorial(S.Half, n) / factorial(n) * chebyshevt(n, x)
elif a.is_zero:
return legendre(n, x)
elif a == S.Half:
return RisingFactorial(3*S.Half, n) / factorial(n + 1) * chebyshevu(n, x)
else:
return RisingFactorial(a + 1, n) / RisingFactorial(2*a + 1, n) * gegenbauer(n, a + S.Half, x)
elif b == -a:
# P^{a, -a}_n(x)
return gamma(n + a + 1) / gamma(n + 1) * (1 + x)**(a/2) / (1 - x)**(a/2) * assoc_legendre(n, -a, x)
if not n.is_Number:
# Symbolic result P^{a,b}_n(x)
# P^{a,b}_n(-x) ---> (-1)**n * P^{b,a}_n(-x)
if x.could_extract_minus_sign():
return S.NegativeOne**n * jacobi(n, b, a, -x)
# We can evaluate for some special values of x
if x.is_zero:
return (2**(-n) * gamma(a + n + 1) / (gamma(a + 1) * factorial(n)) *
hyper([-b - n, -n], [a + 1], -1))
if x == S.One:
return RisingFactorial(a + 1, n) / factorial(n)
elif x is S.Infinity:
if n.is_positive:
# Make sure a+b+2*n \notin Z
if (a + b + 2*n).is_integer:
raise ValueError("Error. a + b + 2*n should not be an integer.")
return RisingFactorial(a + b + n + 1, n) * S.Infinity
else:
# n is a given fixed integer, evaluate into polynomial
return jacobi_poly(n, a, b, x)
def fdiff(self, argindex=4):
from sympy import Sum
if argindex == 1:
# Diff wrt n
raise ArgumentIndexError(self, argindex)
elif argindex == 2:
# Diff wrt a
n, a, b, x = self.args
k = Dummy("k")
f1 = 1 / (a + b + n + k + 1)
f2 = ((a + b + 2*k + 1) * RisingFactorial(b + k + 1, n - k) /
((n - k) * RisingFactorial(a + b + k + 1, n - k)))
return Sum(f1 * (jacobi(n, a, b, x) + f2*jacobi(k, a, b, x)), (k, 0, n - 1))
elif argindex == 3:
# Diff wrt b
n, a, b, x = self.args
k = Dummy("k")
f1 = 1 / (a + b + n + k + 1)
f2 = (-1)**(n - k) * ((a + b + 2*k + 1) * RisingFactorial(a + k + 1, n - k) /
((n - k) * RisingFactorial(a + b + k + 1, n - k)))
return Sum(f1 * (jacobi(n, a, b, x) + f2*jacobi(k, a, b, x)), (k, 0, n - 1))
elif argindex == 4:
# Diff wrt x
n, a, b, x = self.args
return S.Half * (a + b + n + 1) * jacobi(n - 1, a + 1, b + 1, x)
else:
raise ArgumentIndexError(self, argindex)
def _eval_rewrite_as_polynomial(self, n, a, b, x, **kwargs):
from sympy import Sum
# Make sure n \in N
if n.is_negative or n.is_integer is False:
raise ValueError("Error: n should be a non-negative integer.")
k = Dummy("k")
kern = (RisingFactorial(-n, k) * RisingFactorial(a + b + n + 1, k) * RisingFactorial(a + k + 1, n - k) /
factorial(k) * ((1 - x)/2)**k)
return 1 / factorial(n) * Sum(kern, (k, 0, n))
def _eval_conjugate(self):
n, a, b, x = self.args
return self.func(n, a.conjugate(), b.conjugate(), x.conjugate())
def jacobi_normalized(n, a, b, x):
r"""
Jacobi polynomial $P_n^{\left(\alpha, \beta\right)}(x)$.
Explanation
===========
``jacobi_normalized(n, alpha, beta, x)`` gives the nth
Jacobi polynomial in *x*, $P_n^{\left(\alpha, \beta\right)}(x)$.
The Jacobi polynomials are orthogonal on $[-1, 1]$ with respect
to the weight $\left(1-x\right)^\alpha \left(1+x\right)^\beta$.
This functions returns the polynomials normilzed:
.. math::
\int_{-1}^{1}
P_m^{\left(\alpha, \beta\right)}(x)
P_n^{\left(\alpha, \beta\right)}(x)
(1-x)^{\alpha} (1+x)^{\beta} \mathrm{d}x
= \delta_{m,n}
Examples
========
>>> from sympy import jacobi_normalized
>>> from sympy.abc import n,a,b,x
>>> jacobi_normalized(n, a, b, x)
jacobi(n, a, b, x)/sqrt(2**(a + b + 1)*gamma(a + n + 1)*gamma(b + n + 1)/((a + b + 2*n + 1)*factorial(n)*gamma(a + b + n + 1)))
Parameters
==========
n : integer degree of polynomial
a : alpha value
b : beta value
x : symbol
See Also
========
gegenbauer,
chebyshevt_root, chebyshevu, chebyshevu_root,
legendre, assoc_legendre,
hermite,
laguerre, assoc_laguerre,
sympy.polys.orthopolys.jacobi_poly,
sympy.polys.orthopolys.gegenbauer_poly
sympy.polys.orthopolys.chebyshevt_poly
sympy.polys.orthopolys.chebyshevu_poly
sympy.polys.orthopolys.hermite_poly
sympy.polys.orthopolys.legendre_poly
sympy.polys.orthopolys.laguerre_poly
References
==========
.. [1] https://en.wikipedia.org/wiki/Jacobi_polynomials
.. [2] http://mathworld.wolfram.com/JacobiPolynomial.html
.. [3] http://functions.wolfram.com/Polynomials/JacobiP/
"""
nfactor = (S(2)**(a + b + 1) * (gamma(n + a + 1) * gamma(n + b + 1))
/ (2*n + a + b + 1) / (factorial(n) * gamma(n + a + b + 1)))
return jacobi(n, a, b, x) / sqrt(nfactor)
#----------------------------------------------------------------------------
# Gegenbauer polynomials
#
class gegenbauer(OrthogonalPolynomial):
r"""
Gegenbauer polynomial $C_n^{\left(\alpha\right)}(x)$.
Explanation
===========
``gegenbauer(n, alpha, x)`` gives the nth Gegenbauer polynomial
in x, $C_n^{\left(\alpha\right)}(x)$.
The Gegenbauer polynomials are orthogonal on $[-1, 1]$ with
respect to the weight $\left(1-x^2\right)^{\alpha-\frac{1}{2}}$.
Examples
========
>>> from sympy import gegenbauer, conjugate, diff
>>> from sympy.abc import n,a,x
>>> gegenbauer(0, a, x)
1
>>> gegenbauer(1, a, x)
2*a*x
>>> gegenbauer(2, a, x)
-a + x**2*(2*a**2 + 2*a)
>>> gegenbauer(3, a, x)
x**3*(4*a**3/3 + 4*a**2 + 8*a/3) + x*(-2*a**2 - 2*a)
>>> gegenbauer(n, a, x)
gegenbauer(n, a, x)
>>> gegenbauer(n, a, -x)
(-1)**n*gegenbauer(n, a, x)
>>> gegenbauer(n, a, 0)
2**n*sqrt(pi)*gamma(a + n/2)/(gamma(a)*gamma(1/2 - n/2)*gamma(n + 1))
>>> gegenbauer(n, a, 1)
gamma(2*a + n)/(gamma(2*a)*gamma(n + 1))
>>> conjugate(gegenbauer(n, a, x))
gegenbauer(n, conjugate(a), conjugate(x))
>>> diff(gegenbauer(n, a, x), x)
2*a*gegenbauer(n - 1, a + 1, x)
See Also
========
jacobi,
chebyshevt_root, chebyshevu, chebyshevu_root,
legendre, assoc_legendre,
hermite,
laguerre, assoc_laguerre,
sympy.polys.orthopolys.jacobi_poly
sympy.polys.orthopolys.gegenbauer_poly
sympy.polys.orthopolys.chebyshevt_poly
sympy.polys.orthopolys.chebyshevu_poly
sympy.polys.orthopolys.hermite_poly
sympy.polys.orthopolys.legendre_poly
sympy.polys.orthopolys.laguerre_poly
References
==========
.. [1] https://en.wikipedia.org/wiki/Gegenbauer_polynomials
.. [2] http://mathworld.wolfram.com/GegenbauerPolynomial.html
.. [3] http://functions.wolfram.com/Polynomials/GegenbauerC3/
"""
@classmethod
def eval(cls, n, a, x):
# For negative n the polynomials vanish
# See http://functions.wolfram.com/Polynomials/GegenbauerC3/03/01/03/0012/
if n.is_negative:
return S.Zero
# Some special values for fixed a
if a == S.Half:
return legendre(n, x)
elif a == S.One:
return chebyshevu(n, x)
elif a == S.NegativeOne:
return S.Zero
if not n.is_Number:
# Handle this before the general sign extraction rule
if x == S.NegativeOne:
if (re(a) > S.Half) == True:
return S.ComplexInfinity
else:
return (cos(S.Pi*(a+n)) * sec(S.Pi*a) * gamma(2*a+n) /
(gamma(2*a) * gamma(n+1)))
# Symbolic result C^a_n(x)
# C^a_n(-x) ---> (-1)**n * C^a_n(x)
if x.could_extract_minus_sign():
return S.NegativeOne**n * gegenbauer(n, a, -x)
# We can evaluate for some special values of x
if x.is_zero:
return (2**n * sqrt(S.Pi) * gamma(a + S.Half*n) /
(gamma((1 - n)/2) * gamma(n + 1) * gamma(a)) )
if x == S.One:
return gamma(2*a + n) / (gamma(2*a) * gamma(n + 1))
elif x is S.Infinity:
if n.is_positive:
return RisingFactorial(a, n) * S.Infinity
else:
# n is a given fixed integer, evaluate into polynomial
return gegenbauer_poly(n, a, x)
def fdiff(self, argindex=3):
from sympy import Sum
if argindex == 1:
# Diff wrt n
raise ArgumentIndexError(self, argindex)
elif argindex == 2:
# Diff wrt a
n, a, x = self.args
k = Dummy("k")
factor1 = 2 * (1 + (-1)**(n - k)) * (k + a) / ((k +
n + 2*a) * (n - k))
factor2 = 2*(k + 1) / ((k + 2*a) * (2*k + 2*a + 1)) + \
2 / (k + n + 2*a)
kern = factor1*gegenbauer(k, a, x) + factor2*gegenbauer(n, a, x)
return Sum(kern, (k, 0, n - 1))
elif argindex == 3:
# Diff wrt x
n, a, x = self.args
return 2*a*gegenbauer(n - 1, a + 1, x)
else:
raise ArgumentIndexError(self, argindex)
def _eval_rewrite_as_polynomial(self, n, a, x, **kwargs):
from sympy import Sum
k = Dummy("k")
kern = ((-1)**k * RisingFactorial(a, n - k) * (2*x)**(n - 2*k) /
(factorial(k) * factorial(n - 2*k)))
return Sum(kern, (k, 0, floor(n/2)))
def _eval_conjugate(self):
n, a, x = self.args
return self.func(n, a.conjugate(), x.conjugate())
#----------------------------------------------------------------------------
# Chebyshev polynomials of first and second kind
#
class chebyshevt(OrthogonalPolynomial):
r"""
Chebyshev polynomial of the first kind, $T_n(x)$.
Explanation
===========
``chebyshevt(n, x)`` gives the nth Chebyshev polynomial (of the first
kind) in x, $T_n(x)$.
The Chebyshev polynomials of the first kind are orthogonal on
$[-1, 1]$ with respect to the weight $\frac{1}{\sqrt{1-x^2}}$.
Examples
========
>>> from sympy import chebyshevt, diff
>>> from sympy.abc import n,x
>>> chebyshevt(0, x)
1
>>> chebyshevt(1, x)
x
>>> chebyshevt(2, x)
2*x**2 - 1
>>> chebyshevt(n, x)
chebyshevt(n, x)
>>> chebyshevt(n, -x)
(-1)**n*chebyshevt(n, x)
>>> chebyshevt(-n, x)
chebyshevt(n, x)
>>> chebyshevt(n, 0)
cos(pi*n/2)
>>> chebyshevt(n, -1)
(-1)**n
>>> diff(chebyshevt(n, x), x)
n*chebyshevu(n - 1, x)
See Also
========
jacobi, gegenbauer,
chebyshevt_root, chebyshevu, chebyshevu_root,
legendre, assoc_legendre,
hermite,
laguerre, assoc_laguerre,
sympy.polys.orthopolys.jacobi_poly
sympy.polys.orthopolys.gegenbauer_poly
sympy.polys.orthopolys.chebyshevt_poly
sympy.polys.orthopolys.chebyshevu_poly
sympy.polys.orthopolys.hermite_poly
sympy.polys.orthopolys.legendre_poly
sympy.polys.orthopolys.laguerre_poly
References
==========
.. [1] https://en.wikipedia.org/wiki/Chebyshev_polynomial
.. [2] http://mathworld.wolfram.com/ChebyshevPolynomialoftheFirstKind.html
.. [3] http://mathworld.wolfram.com/ChebyshevPolynomialoftheSecondKind.html
.. [4] http://functions.wolfram.com/Polynomials/ChebyshevT/
.. [5] http://functions.wolfram.com/Polynomials/ChebyshevU/
"""
_ortho_poly = staticmethod(chebyshevt_poly)
@classmethod
def eval(cls, n, x):
if not n.is_Number:
# Symbolic result T_n(x)
# T_n(-x) ---> (-1)**n * T_n(x)
if x.could_extract_minus_sign():
return S.NegativeOne**n * chebyshevt(n, -x)
# T_{-n}(x) ---> T_n(x)
if n.could_extract_minus_sign():
return chebyshevt(-n, x)
# We can evaluate for some special values of x
if x.is_zero:
return cos(S.Half * S.Pi * n)
if x == S.One:
return S.One
elif x is S.Infinity:
return S.Infinity
else:
# n is a given fixed integer, evaluate into polynomial
if n.is_negative:
# T_{-n}(x) == T_n(x)
return cls._eval_at_order(-n, x)
else:
return cls._eval_at_order(n, x)
def fdiff(self, argindex=2):
if argindex == 1:
# Diff wrt n
raise ArgumentIndexError(self, argindex)
elif argindex == 2:
# Diff wrt x
n, x = self.args
return n * chebyshevu(n - 1, x)
else:
raise ArgumentIndexError(self, argindex)
def _eval_rewrite_as_polynomial(self, n, x, **kwargs):
from sympy import Sum
k = Dummy("k")
kern = binomial(n, 2*k) * (x**2 - 1)**k * x**(n - 2*k)
return Sum(kern, (k, 0, floor(n/2)))
class chebyshevu(OrthogonalPolynomial):
r"""
Chebyshev polynomial of the second kind, $U_n(x)$.
Explanation
===========
``chebyshevu(n, x)`` gives the nth Chebyshev polynomial of the second
kind in x, $U_n(x)$.
The Chebyshev polynomials of the second kind are orthogonal on
$[-1, 1]$ with respect to the weight $\sqrt{1-x^2}$.
Examples
========
>>> from sympy import chebyshevu, diff
>>> from sympy.abc import n,x
>>> chebyshevu(0, x)
1
>>> chebyshevu(1, x)
2*x
>>> chebyshevu(2, x)
4*x**2 - 1
>>> chebyshevu(n, x)
chebyshevu(n, x)
>>> chebyshevu(n, -x)
(-1)**n*chebyshevu(n, x)
>>> chebyshevu(-n, x)
-chebyshevu(n - 2, x)
>>> chebyshevu(n, 0)
cos(pi*n/2)
>>> chebyshevu(n, 1)
n + 1
>>> diff(chebyshevu(n, x), x)
(-x*chebyshevu(n, x) + (n + 1)*chebyshevt(n + 1, x))/(x**2 - 1)
See Also
========
jacobi, gegenbauer,
chebyshevt, chebyshevt_root, chebyshevu_root,
legendre, assoc_legendre,
hermite,
laguerre, assoc_laguerre,
sympy.polys.orthopolys.jacobi_poly
sympy.polys.orthopolys.gegenbauer_poly
sympy.polys.orthopolys.chebyshevt_poly
sympy.polys.orthopolys.chebyshevu_poly
sympy.polys.orthopolys.hermite_poly
sympy.polys.orthopolys.legendre_poly
sympy.polys.orthopolys.laguerre_poly
References
==========
.. [1] https://en.wikipedia.org/wiki/Chebyshev_polynomial
.. [2] http://mathworld.wolfram.com/ChebyshevPolynomialoftheFirstKind.html
.. [3] http://mathworld.wolfram.com/ChebyshevPolynomialoftheSecondKind.html
.. [4] http://functions.wolfram.com/Polynomials/ChebyshevT/
.. [5] http://functions.wolfram.com/Polynomials/ChebyshevU/
"""
_ortho_poly = staticmethod(chebyshevu_poly)
@classmethod
def eval(cls, n, x):
if not n.is_Number:
# Symbolic result U_n(x)
# U_n(-x) ---> (-1)**n * U_n(x)
if x.could_extract_minus_sign():
return S.NegativeOne**n * chebyshevu(n, -x)
# U_{-n}(x) ---> -U_{n-2}(x)
if n.could_extract_minus_sign():
if n == S.NegativeOne:
# n can not be -1 here
return S.Zero
elif not (-n - 2).could_extract_minus_sign():
return -chebyshevu(-n - 2, x)
# We can evaluate for some special values of x
if x.is_zero:
return cos(S.Half * S.Pi * n)
if x == S.One:
return S.One + n
elif x is S.Infinity:
return S.Infinity
else:
# n is a given fixed integer, evaluate into polynomial
if n.is_negative:
# U_{-n}(x) ---> -U_{n-2}(x)
if n == S.NegativeOne:
return S.Zero
else:
return -cls._eval_at_order(-n - 2, x)
else:
return cls._eval_at_order(n, x)
def fdiff(self, argindex=2):
if argindex == 1:
# Diff wrt n
raise ArgumentIndexError(self, argindex)
elif argindex == 2:
# Diff wrt x
n, x = self.args
return ((n + 1) * chebyshevt(n + 1, x) - x * chebyshevu(n, x)) / (x**2 - 1)
else:
raise ArgumentIndexError(self, argindex)
def _eval_rewrite_as_polynomial(self, n, x, **kwargs):
from sympy import Sum
k = Dummy("k")
kern = S.NegativeOne**k * factorial(
n - k) * (2*x)**(n - 2*k) / (factorial(k) * factorial(n - 2*k))
return Sum(kern, (k, 0, floor(n/2)))
class chebyshevt_root(Function):
r"""
``chebyshev_root(n, k)`` returns the kth root (indexed from zero) of
the nth Chebyshev polynomial of the first kind; that is, if
0 <= k < n, ``chebyshevt(n, chebyshevt_root(n, k)) == 0``.
Examples
========
>>> from sympy import chebyshevt, chebyshevt_root
>>> chebyshevt_root(3, 2)
-sqrt(3)/2
>>> chebyshevt(3, chebyshevt_root(3, 2))
0
See Also
========
jacobi, gegenbauer,
chebyshevt, chebyshevu, chebyshevu_root,
legendre, assoc_legendre,
hermite,
laguerre, assoc_laguerre,
sympy.polys.orthopolys.jacobi_poly
sympy.polys.orthopolys.gegenbauer_poly
sympy.polys.orthopolys.chebyshevt_poly
sympy.polys.orthopolys.chebyshevu_poly
sympy.polys.orthopolys.hermite_poly
sympy.polys.orthopolys.legendre_poly
sympy.polys.orthopolys.laguerre_poly
"""
@classmethod
def eval(cls, n, k):
if not ((0 <= k) and (k < n)):
raise ValueError("must have 0 <= k < n, "
"got k = %s and n = %s" % (k, n))
return cos(S.Pi*(2*k + 1)/(2*n))
class chebyshevu_root(Function):
r"""
``chebyshevu_root(n, k)`` returns the kth root (indexed from zero) of the
nth Chebyshev polynomial of the second kind; that is, if 0 <= k < n,
``chebyshevu(n, chebyshevu_root(n, k)) == 0``.
Examples
========
>>> from sympy import chebyshevu, chebyshevu_root
>>> chebyshevu_root(3, 2)
-sqrt(2)/2
>>> chebyshevu(3, chebyshevu_root(3, 2))
0
See Also
========
chebyshevt, chebyshevt_root, chebyshevu,
legendre, assoc_legendre,
hermite,
laguerre, assoc_laguerre,
sympy.polys.orthopolys.jacobi_poly
sympy.polys.orthopolys.gegenbauer_poly
sympy.polys.orthopolys.chebyshevt_poly
sympy.polys.orthopolys.chebyshevu_poly
sympy.polys.orthopolys.hermite_poly
sympy.polys.orthopolys.legendre_poly
sympy.polys.orthopolys.laguerre_poly
"""
@classmethod
def eval(cls, n, k):
if not ((0 <= k) and (k < n)):
raise ValueError("must have 0 <= k < n, "
"got k = %s and n = %s" % (k, n))
return cos(S.Pi*(k + 1)/(n + 1))
#----------------------------------------------------------------------------
# Legendre polynomials and Associated Legendre polynomials
#
class legendre(OrthogonalPolynomial):
r"""
``legendre(n, x)`` gives the nth Legendre polynomial of x, $P_n(x)$
Explanation
===========
The Legendre polynomials are orthogonal on [-1, 1] with respect to
the constant weight 1. They satisfy $P_n(1) = 1$ for all n; further,
$P_n$ is odd for odd n and even for even n.
Examples
========
>>> from sympy import legendre, diff
>>> from sympy.abc import x, n
>>> legendre(0, x)
1
>>> legendre(1, x)
x
>>> legendre(2, x)
3*x**2/2 - 1/2
>>> legendre(n, x)
legendre(n, x)
>>> diff(legendre(n,x), x)
n*(x*legendre(n, x) - legendre(n - 1, x))/(x**2 - 1)
See Also
========
jacobi, gegenbauer,
chebyshevt, chebyshevt_root, chebyshevu, chebyshevu_root,
assoc_legendre,
hermite,
laguerre, assoc_laguerre,
sympy.polys.orthopolys.jacobi_poly
sympy.polys.orthopolys.gegenbauer_poly
sympy.polys.orthopolys.chebyshevt_poly
sympy.polys.orthopolys.chebyshevu_poly
sympy.polys.orthopolys.hermite_poly
sympy.polys.orthopolys.legendre_poly
sympy.polys.orthopolys.laguerre_poly
References
==========
.. [1] https://en.wikipedia.org/wiki/Legendre_polynomial
.. [2] http://mathworld.wolfram.com/LegendrePolynomial.html
.. [3] http://functions.wolfram.com/Polynomials/LegendreP/
.. [4] http://functions.wolfram.com/Polynomials/LegendreP2/
"""
_ortho_poly = staticmethod(legendre_poly)
@classmethod
def eval(cls, n, x):
if not n.is_Number:
# Symbolic result L_n(x)
# L_n(-x) ---> (-1)**n * L_n(x)
if x.could_extract_minus_sign():
return S.NegativeOne**n * legendre(n, -x)
# L_{-n}(x) ---> L_{n-1}(x)
if n.could_extract_minus_sign() and not(-n - 1).could_extract_minus_sign():
return legendre(-n - S.One, x)
# We can evaluate for some special values of x
if x.is_zero:
return sqrt(S.Pi)/(gamma(S.Half - n/2)*gamma(S.One + n/2))
elif x == S.One:
return S.One
elif x is S.Infinity:
return S.Infinity
else:
# n is a given fixed integer, evaluate into polynomial;
# L_{-n}(x) ---> L_{n-1}(x)
if n.is_negative:
n = -n - S.One
return cls._eval_at_order(n, x)
def fdiff(self, argindex=2):
if argindex == 1:
# Diff wrt n
raise ArgumentIndexError(self, argindex)
elif argindex == 2:
# Diff wrt x
# Find better formula, this is unsuitable for x = +/-1
# http://www.autodiff.org/ad16/Oral/Buecker_Legendre.pdf says
# at x = 1:
# n*(n + 1)/2 , m = 0
# oo , m = 1
# -(n-1)*n*(n+1)*(n+2)/4 , m = 2
# 0 , m = 3, 4, ..., n
#
# at x = -1
# (-1)**(n+1)*n*(n + 1)/2 , m = 0
# (-1)**n*oo , m = 1
# (-1)**n*(n-1)*n*(n+1)*(n+2)/4 , m = 2
# 0 , m = 3, 4, ..., n
n, x = self.args
return n/(x**2 - 1)*(x*legendre(n, x) - legendre(n - 1, x))
else:
raise ArgumentIndexError(self, argindex)
def _eval_rewrite_as_polynomial(self, n, x, **kwargs):
from sympy import Sum
k = Dummy("k")
kern = (-1)**k*binomial(n, k)**2*((1 + x)/2)**(n - k)*((1 - x)/2)**k
return Sum(kern, (k, 0, n))
class assoc_legendre(Function):
r"""
``assoc_legendre(n, m, x)`` gives $P_n^m(x)$, where n and m are
the degree and order or an expression which is related to the nth
order Legendre polynomial, $P_n(x)$ in the following manner:
.. math::
P_n^m(x) = (-1)^m (1 - x^2)^{\frac{m}{2}}
\frac{\mathrm{d}^m P_n(x)}{\mathrm{d} x^m}
Explanation
===========
Associated Legendre polynomials are orthogonal on [-1, 1] with:
- weight = 1 for the same m, and different n.
- weight = 1/(1-x**2) for the same n, and different m.
Examples
========
>>> from sympy import assoc_legendre
>>> from sympy.abc import x, m, n
>>> assoc_legendre(0,0, x)
1
>>> assoc_legendre(1,0, x)
x
>>> assoc_legendre(1,1, x)
-sqrt(1 - x**2)
>>> assoc_legendre(n,m,x)
assoc_legendre(n, m, x)
See Also
========
jacobi, gegenbauer,
chebyshevt, chebyshevt_root, chebyshevu, chebyshevu_root,
legendre,
hermite,
laguerre, assoc_laguerre,
sympy.polys.orthopolys.jacobi_poly
sympy.polys.orthopolys.gegenbauer_poly
sympy.polys.orthopolys.chebyshevt_poly
sympy.polys.orthopolys.chebyshevu_poly
sympy.polys.orthopolys.hermite_poly
sympy.polys.orthopolys.legendre_poly
sympy.polys.orthopolys.laguerre_poly
References
==========
.. [1] https://en.wikipedia.org/wiki/Associated_Legendre_polynomials
.. [2] http://mathworld.wolfram.com/LegendrePolynomial.html
.. [3] http://functions.wolfram.com/Polynomials/LegendreP/
.. [4] http://functions.wolfram.com/Polynomials/LegendreP2/
"""
@classmethod
def _eval_at_order(cls, n, m):
P = legendre_poly(n, _x, polys=True).diff((_x, m))
return (-1)**m * (1 - _x**2)**Rational(m, 2) * P.as_expr()
@classmethod
def eval(cls, n, m, x):
if m.could_extract_minus_sign():
# P^{-m}_n ---> F * P^m_n
return S.NegativeOne**(-m) * (factorial(m + n)/factorial(n - m)) * assoc_legendre(n, -m, x)
if m == 0:
# P^0_n ---> L_n
return legendre(n, x)
if x == 0:
return 2**m*sqrt(S.Pi) / (gamma((1 - m - n)/2)*gamma(1 - (m - n)/2))
if n.is_Number and m.is_Number and n.is_integer and m.is_integer:
if n.is_negative:
raise ValueError("%s : 1st index must be nonnegative integer (got %r)" % (cls, n))
if abs(m) > n:
raise ValueError("%s : abs('2nd index') must be <= '1st index' (got %r, %r)" % (cls, n, m))
return cls._eval_at_order(int(n), abs(int(m))).subs(_x, x)
def fdiff(self, argindex=3):
if argindex == 1:
# Diff wrt n
raise ArgumentIndexError(self, argindex)
elif argindex == 2:
# Diff wrt m
raise ArgumentIndexError(self, argindex)
elif argindex == 3:
# Diff wrt x
# Find better formula, this is unsuitable for x = 1
n, m, x = self.args
return 1/(x**2 - 1)*(x*n*assoc_legendre(n, m, x) - (m + n)*assoc_legendre(n - 1, m, x))
else:
raise ArgumentIndexError(self, argindex)
def _eval_rewrite_as_polynomial(self, n, m, x, **kwargs):
from sympy import Sum
k = Dummy("k")
kern = factorial(2*n - 2*k)/(2**n*factorial(n - k)*factorial(
k)*factorial(n - 2*k - m))*(-1)**k*x**(n - m - 2*k)
return (1 - x**2)**(m/2) * Sum(kern, (k, 0, floor((n - m)*S.Half)))
def _eval_conjugate(self):
n, m, x = self.args
return self.func(n, m.conjugate(), x.conjugate())
#----------------------------------------------------------------------------
# Hermite polynomials
#
class hermite(OrthogonalPolynomial):
r"""
``hermite(n, x)`` gives the nth Hermite polynomial in x, $H_n(x)$
Explanation
===========
The Hermite polynomials are orthogonal on $(-\infty, \infty)$
with respect to the weight $\exp\left(-x^2\right)$.
Examples
========
>>> from sympy import hermite, diff
>>> from sympy.abc import x, n
>>> hermite(0, x)
1
>>> hermite(1, x)
2*x
>>> hermite(2, x)
4*x**2 - 2
>>> hermite(n, x)
hermite(n, x)
>>> diff(hermite(n,x), x)
2*n*hermite(n - 1, x)
>>> hermite(n, -x)
(-1)**n*hermite(n, x)
See Also
========
jacobi, gegenbauer,
chebyshevt, chebyshevt_root, chebyshevu, chebyshevu_root,
legendre, assoc_legendre,
laguerre, assoc_laguerre,
sympy.polys.orthopolys.jacobi_poly
sympy.polys.orthopolys.gegenbauer_poly
sympy.polys.orthopolys.chebyshevt_poly
sympy.polys.orthopolys.chebyshevu_poly
sympy.polys.orthopolys.hermite_poly
sympy.polys.orthopolys.legendre_poly
sympy.polys.orthopolys.laguerre_poly
References
==========
.. [1] https://en.wikipedia.org/wiki/Hermite_polynomial
.. [2] http://mathworld.wolfram.com/HermitePolynomial.html
.. [3] http://functions.wolfram.com/Polynomials/HermiteH/
"""
_ortho_poly = staticmethod(hermite_poly)
@classmethod
def eval(cls, n, x):
if not n.is_Number:
# Symbolic result H_n(x)
# H_n(-x) ---> (-1)**n * H_n(x)
if x.could_extract_minus_sign():
return S.NegativeOne**n * hermite(n, -x)
# We can evaluate for some special values of x
if x.is_zero:
return 2**n * sqrt(S.Pi) / gamma((S.One - n)/2)
elif x is S.Infinity:
return S.Infinity
else:
# n is a given fixed integer, evaluate into polynomial
if n.is_negative:
raise ValueError(
"The index n must be nonnegative integer (got %r)" % n)
else:
return cls._eval_at_order(n, x)
def fdiff(self, argindex=2):
if argindex == 1:
# Diff wrt n
raise ArgumentIndexError(self, argindex)
elif argindex == 2:
# Diff wrt x
n, x = self.args
return 2*n*hermite(n - 1, x)
else:
raise ArgumentIndexError(self, argindex)
def _eval_rewrite_as_polynomial(self, n, x, **kwargs):
from sympy import Sum
k = Dummy("k")
kern = (-1)**k / (factorial(k)*factorial(n - 2*k)) * (2*x)**(n - 2*k)
return factorial(n)*Sum(kern, (k, 0, floor(n/2)))
#----------------------------------------------------------------------------
# Laguerre polynomials
#
class laguerre(OrthogonalPolynomial):
r"""
Returns the nth Laguerre polynomial in x, $L_n(x)$.
Examples
========
>>> from sympy import laguerre, diff
>>> from sympy.abc import x, n
>>> laguerre(0, x)
1
>>> laguerre(1, x)
1 - x
>>> laguerre(2, x)
x**2/2 - 2*x + 1
>>> laguerre(3, x)
-x**3/6 + 3*x**2/2 - 3*x + 1
>>> laguerre(n, x)
laguerre(n, x)
>>> diff(laguerre(n, x), x)
-assoc_laguerre(n - 1, 1, x)
Parameters
==========
n : int
Degree of Laguerre polynomial. Must be ``n >= 0``.
See Also
========
jacobi, gegenbauer,
chebyshevt, chebyshevt_root, chebyshevu, chebyshevu_root,
legendre, assoc_legendre,
hermite,
assoc_laguerre,
sympy.polys.orthopolys.jacobi_poly
sympy.polys.orthopolys.gegenbauer_poly
sympy.polys.orthopolys.chebyshevt_poly
sympy.polys.orthopolys.chebyshevu_poly
sympy.polys.orthopolys.hermite_poly
sympy.polys.orthopolys.legendre_poly
sympy.polys.orthopolys.laguerre_poly
References
==========
.. [1] https://en.wikipedia.org/wiki/Laguerre_polynomial
.. [2] http://mathworld.wolfram.com/LaguerrePolynomial.html
.. [3] http://functions.wolfram.com/Polynomials/LaguerreL/
.. [4] http://functions.wolfram.com/Polynomials/LaguerreL3/
"""
_ortho_poly = staticmethod(laguerre_poly)
@classmethod
def eval(cls, n, x):
if n.is_integer is False:
raise ValueError("Error: n should be an integer.")
if not n.is_Number:
# Symbolic result L_n(x)
# L_{n}(-x) ---> exp(-x) * L_{-n-1}(x)
# L_{-n}(x) ---> exp(x) * L_{n-1}(-x)
if n.could_extract_minus_sign() and not(-n - 1).could_extract_minus_sign():
return exp(x)*laguerre(-n - 1, -x)
# We can evaluate for some special values of x
if x.is_zero:
return S.One
elif x is S.NegativeInfinity:
return S.Infinity
elif x is S.Infinity:
return S.NegativeOne**n * S.Infinity
else:
if n.is_negative:
return exp(x)*laguerre(-n - 1, -x)
else:
return cls._eval_at_order(n, x)
def fdiff(self, argindex=2):
if argindex == 1:
# Diff wrt n
raise ArgumentIndexError(self, argindex)
elif argindex == 2:
# Diff wrt x
n, x = self.args
return -assoc_laguerre(n - 1, 1, x)
else:
raise ArgumentIndexError(self, argindex)
def _eval_rewrite_as_polynomial(self, n, x, **kwargs):
from sympy import Sum
# Make sure n \in N_0
if n.is_negative:
return exp(x) * self._eval_rewrite_as_polynomial(-n - 1, -x, **kwargs)
if n.is_integer is False:
raise ValueError("Error: n should be an integer.")
k = Dummy("k")
kern = RisingFactorial(-n, k) / factorial(k)**2 * x**k
return Sum(kern, (k, 0, n))
class assoc_laguerre(OrthogonalPolynomial):
r"""
Returns the nth generalized Laguerre polynomial in x, $L_n(x)$.
Examples
========
>>> from sympy import assoc_laguerre, diff
>>> from sympy.abc import x, n, a
>>> assoc_laguerre(0, a, x)
1
>>> assoc_laguerre(1, a, x)
a - x + 1
>>> assoc_laguerre(2, a, x)
a**2/2 + 3*a/2 + x**2/2 + x*(-a - 2) + 1
>>> assoc_laguerre(3, a, x)
a**3/6 + a**2 + 11*a/6 - x**3/6 + x**2*(a/2 + 3/2) +
x*(-a**2/2 - 5*a/2 - 3) + 1
>>> assoc_laguerre(n, a, 0)
binomial(a + n, a)
>>> assoc_laguerre(n, a, x)
assoc_laguerre(n, a, x)
>>> assoc_laguerre(n, 0, x)
laguerre(n, x)
>>> diff(assoc_laguerre(n, a, x), x)
-assoc_laguerre(n - 1, a + 1, x)
>>> diff(assoc_laguerre(n, a, x), a)
Sum(assoc_laguerre(_k, a, x)/(-a + n), (_k, 0, n - 1))
Parameters
==========
n : int
Degree of Laguerre polynomial. Must be ``n >= 0``.
alpha : Expr
Arbitrary expression. For ``alpha=0`` regular Laguerre
polynomials will be generated.
See Also
========
jacobi, gegenbauer,
chebyshevt, chebyshevt_root, chebyshevu, chebyshevu_root,
legendre, assoc_legendre,
hermite,
laguerre,
sympy.polys.orthopolys.jacobi_poly
sympy.polys.orthopolys.gegenbauer_poly
sympy.polys.orthopolys.chebyshevt_poly
sympy.polys.orthopolys.chebyshevu_poly
sympy.polys.orthopolys.hermite_poly
sympy.polys.orthopolys.legendre_poly
sympy.polys.orthopolys.laguerre_poly
References
==========
.. [1] https://en.wikipedia.org/wiki/Laguerre_polynomial#Generalized_Laguerre_polynomials
.. [2] http://mathworld.wolfram.com/AssociatedLaguerrePolynomial.html
.. [3] http://functions.wolfram.com/Polynomials/LaguerreL/
.. [4] http://functions.wolfram.com/Polynomials/LaguerreL3/
"""
@classmethod
def eval(cls, n, alpha, x):
# L_{n}^{0}(x) ---> L_{n}(x)
if alpha.is_zero:
return laguerre(n, x)
if not n.is_Number:
# We can evaluate for some special values of x
if x.is_zero:
return binomial(n + alpha, alpha)
elif x is S.Infinity and n > 0:
return S.NegativeOne**n * S.Infinity
elif x is S.NegativeInfinity and n > 0:
return S.Infinity
else:
# n is a given fixed integer, evaluate into polynomial
if n.is_negative:
raise ValueError(
"The index n must be nonnegative integer (got %r)" % n)
else:
return laguerre_poly(n, x, alpha)
def fdiff(self, argindex=3):
from sympy import Sum
if argindex == 1:
# Diff wrt n
raise ArgumentIndexError(self, argindex)
elif argindex == 2:
# Diff wrt alpha
n, alpha, x = self.args
k = Dummy("k")
return Sum(assoc_laguerre(k, alpha, x) / (n - alpha), (k, 0, n - 1))
elif argindex == 3:
# Diff wrt x
n, alpha, x = self.args
return -assoc_laguerre(n - 1, alpha + 1, x)
else:
raise ArgumentIndexError(self, argindex)
def _eval_rewrite_as_polynomial(self, n, alpha, x, **kwargs):
from sympy import Sum
# Make sure n \in N_0
if n.is_negative or n.is_integer is False:
raise ValueError("Error: n should be a non-negative integer.")
k = Dummy("k")
kern = RisingFactorial(
-n, k) / (gamma(k + alpha + 1) * factorial(k)) * x**k
return gamma(n + alpha + 1) / factorial(n) * Sum(kern, (k, 0, n))
def _eval_conjugate(self):
n, alpha, x = self.args
return self.func(n, alpha.conjugate(), x.conjugate())
|
eb3ec70e75bbabd9ebbb1ca8e2dc4982f030f048ad2e0226838fcb431e7976a7
|
from sympy import (
symbols, log, ln, Float, nan, oo, zoo, I, pi, E, exp, Symbol,
LambertW, sqrt, Rational, expand_log, S, sign,
adjoint, conjugate, transpose, O, refine,
sin, cos, sinh, cosh, tanh, exp_polar, re, simplify,
AccumBounds, MatrixSymbol, Pow, gcd, Sum, Product)
from sympy.functions.elementary.exponential import match_real_imag
from sympy.abc import x, y, z
from sympy.core.expr import unchanged
from sympy.core.function import ArgumentIndexError
from sympy.testing.pytest import raises, XFAIL
def test_exp_values():
k = Symbol('k', integer=True)
assert exp(nan) is nan
assert exp(oo) is oo
assert exp(-oo) == 0
assert exp(0) == 1
assert exp(1) == E
assert exp(-1 + x).as_base_exp() == (S.Exp1, x - 1)
assert exp(1 + x).as_base_exp() == (S.Exp1, x + 1)
assert exp(pi*I/2) == I
assert exp(pi*I) == -1
assert exp(pi*I*Rational(3, 2)) == -I
assert exp(2*pi*I) == 1
assert refine(exp(pi*I*2*k)) == 1
assert refine(exp(pi*I*2*(k + S.Half))) == -1
assert refine(exp(pi*I*2*(k + Rational(1, 4)))) == I
assert refine(exp(pi*I*2*(k + Rational(3, 4)))) == -I
assert exp(log(x)) == x
assert exp(2*log(x)) == x**2
assert exp(pi*log(x)) == x**pi
assert exp(17*log(x) + E*log(y)) == x**17 * y**E
assert exp(x*log(x)) != x**x
assert exp(sin(x)*log(x)) != x
assert exp(3*log(x) + oo*x) == exp(oo*x) * x**3
assert exp(4*log(x)*log(y) + 3*log(x)) == x**3 * exp(4*log(x)*log(y))
assert exp(-oo, evaluate=False).is_finite is True
assert exp(oo, evaluate=False).is_finite is False
def test_exp_period():
assert exp(I*pi*Rational(9, 4)) == exp(I*pi/4)
assert exp(I*pi*Rational(46, 18)) == exp(I*pi*Rational(5, 9))
assert exp(I*pi*Rational(25, 7)) == exp(I*pi*Rational(-3, 7))
assert exp(I*pi*Rational(-19, 3)) == exp(-I*pi/3)
assert exp(I*pi*Rational(37, 8)) - exp(I*pi*Rational(-11, 8)) == 0
assert exp(I*pi*Rational(-5, 3)) / exp(I*pi*Rational(11, 5)) * exp(I*pi*Rational(148, 15)) == 1
assert exp(2 - I*pi*Rational(17, 5)) == exp(2 + I*pi*Rational(3, 5))
assert exp(log(3) + I*pi*Rational(29, 9)) == 3 * exp(I*pi*Rational(-7, 9))
n = Symbol('n', integer=True)
e = Symbol('e', even=True)
assert exp(e*I*pi) == 1
assert exp((e + 1)*I*pi) == -1
assert exp((1 + 4*n)*I*pi/2) == I
assert exp((-1 + 4*n)*I*pi/2) == -I
def test_exp_log():
x = Symbol("x", real=True)
assert log(exp(x)) == x
assert exp(log(x)) == x
assert log(x).inverse() == exp
assert exp(x).inverse() == log
y = Symbol("y", polar=True)
assert log(exp_polar(z)) == z
assert exp(log(y)) == y
def test_exp_expand():
e = exp(log(Rational(2))*(1 + x) - log(Rational(2))*x)
assert e.expand() == 2
assert exp(x + y) != exp(x)*exp(y)
assert exp(x + y).expand() == exp(x)*exp(y)
def test_exp__as_base_exp():
assert exp(x).as_base_exp() == (E, x)
assert exp(2*x).as_base_exp() == (E, 2*x)
assert exp(x*y).as_base_exp() == (E, x*y)
assert exp(-x).as_base_exp() == (E, -x)
# Pow( *expr.as_base_exp() ) == expr invariant should hold
assert E**x == exp(x)
assert E**(2*x) == exp(2*x)
assert E**(x*y) == exp(x*y)
assert exp(x).base is S.Exp1
assert exp(x).exp == x
def test_exp_infinity():
assert exp(I*y) != nan
assert refine(exp(I*oo)) is nan
assert refine(exp(-I*oo)) is nan
assert exp(y*I*oo) != nan
assert exp(zoo) is nan
x = Symbol('x', extended_real=True, finite=False)
assert exp(x).is_complex is None
def test_exp_subs():
x = Symbol('x')
e = (exp(3*log(x), evaluate=False)) # evaluates to x**3
assert e.subs(x**3, y**3) == e
assert e.subs(x**2, 5) == e
assert (x**3).subs(x**2, y) != y**Rational(3, 2)
assert exp(exp(x) + exp(x**2)).subs(exp(exp(x)), y) == y * exp(exp(x**2))
assert exp(x).subs(E, y) == y**x
x = symbols('x', real=True)
assert exp(5*x).subs(exp(7*x), y) == y**Rational(5, 7)
assert exp(2*x + 7).subs(exp(3*x), y) == y**Rational(2, 3) * exp(7)
x = symbols('x', positive=True)
assert exp(3*log(x)).subs(x**2, y) == y**Rational(3, 2)
# differentiate between E and exp
assert exp(exp(x + E)).subs(exp, 3) == 3**(3**(x + E))
assert exp(exp(x + E)).subs(E, 3) == 3**(3**(x + 3))
assert exp(3).subs(E, sin) == sin(3)
def test_exp_adjoint():
assert adjoint(exp(x)) == exp(adjoint(x))
def test_exp_conjugate():
assert conjugate(exp(x)) == exp(conjugate(x))
def test_exp_transpose():
assert transpose(exp(x)) == exp(transpose(x))
def test_exp_rewrite():
from sympy.concrete.summations import Sum
assert exp(x).rewrite(sin) == sinh(x) + cosh(x)
assert exp(x*I).rewrite(cos) == cos(x) + I*sin(x)
assert exp(1).rewrite(cos) == sinh(1) + cosh(1)
assert exp(1).rewrite(sin) == sinh(1) + cosh(1)
assert exp(1).rewrite(sin) == sinh(1) + cosh(1)
assert exp(x).rewrite(tanh) == (1 + tanh(x/2))/(1 - tanh(x/2))
assert exp(pi*I/4).rewrite(sqrt) == sqrt(2)/2 + sqrt(2)*I/2
assert exp(pi*I/3).rewrite(sqrt) == S.Half + sqrt(3)*I/2
assert exp(x*log(y)).rewrite(Pow) == y**x
assert exp(log(x)*log(y)).rewrite(Pow) in [x**log(y), y**log(x)]
assert exp(log(log(x))*y).rewrite(Pow) == log(x)**y
n = Symbol('n', integer=True)
assert Sum((exp(pi*I/2)/2)**n, (n, 0, oo)).rewrite(sqrt).doit() == Rational(4, 5) + I*Rational(2, 5)
assert Sum((exp(pi*I/4)/2)**n, (n, 0, oo)).rewrite(sqrt).doit() == 1/(1 - sqrt(2)*(1 + I)/4)
assert (Sum((exp(pi*I/3)/2)**n, (n, 0, oo)).rewrite(sqrt).doit().cancel()
== 4/(3 - sqrt(3)*I))
def test_exp_leading_term():
assert exp(x).as_leading_term(x) == 1
assert exp(2 + x).as_leading_term(x) == exp(2)
assert exp((2*x + 3) / (x+1)).as_leading_term(x) == exp(3)
# The following tests are commented, since now SymPy returns the
# original function when the leading term in the series expansion does
# not exist.
# raises(NotImplementedError, lambda: exp(1/x).as_leading_term(x))
# raises(NotImplementedError, lambda: exp((x + 1) / x**2).as_leading_term(x))
# raises(NotImplementedError, lambda: exp(x + 1/x).as_leading_term(x))
def test_exp_taylor_term():
x = symbols('x')
assert exp(x).taylor_term(1, x) == x
assert exp(x).taylor_term(3, x) == x**3/6
assert exp(x).taylor_term(4, x) == x**4/24
assert exp(x).taylor_term(-1, x) is S.Zero
def test_exp_MatrixSymbol():
A = MatrixSymbol("A", 2, 2)
assert exp(A).has(exp)
def test_exp_fdiff():
x = Symbol('x')
raises(ArgumentIndexError, lambda: exp(x).fdiff(2))
def test_log_values():
assert log(nan) is nan
assert log(oo) is oo
assert log(-oo) is oo
assert log(zoo) is zoo
assert log(-zoo) is zoo
assert log(0) is zoo
assert log(1) == 0
assert log(-1) == I*pi
assert log(E) == 1
assert log(-E).expand() == 1 + I*pi
assert unchanged(log, pi)
assert log(-pi).expand() == log(pi) + I*pi
assert unchanged(log, 17)
assert log(-17) == log(17) + I*pi
assert log(I) == I*pi/2
assert log(-I) == -I*pi/2
assert log(17*I) == I*pi/2 + log(17)
assert log(-17*I).expand() == -I*pi/2 + log(17)
assert log(oo*I) is oo
assert log(-oo*I) is oo
assert log(0, 2) is zoo
assert log(0, 5) is zoo
assert exp(-log(3))**(-1) == 3
assert log(S.Half) == -log(2)
assert log(2*3).func is log
assert log(2*3**2).func is log
def test_match_real_imag():
x, y = symbols('x,y', real=True)
i = Symbol('i', imaginary=True)
assert match_real_imag(S.One) == (1, 0)
assert match_real_imag(I) == (0, 1)
assert match_real_imag(3 - 5*I) == (3, -5)
assert match_real_imag(-sqrt(3) + S.Half*I) == (-sqrt(3), S.Half)
assert match_real_imag(x + y*I) == (x, y)
assert match_real_imag(x*I + y*I) == (0, x + y)
assert match_real_imag((x + y)*I) == (0, x + y)
assert match_real_imag(Rational(-2, 3)*i*I) == (None, None)
assert match_real_imag(1 - 2*i) == (None, None)
assert match_real_imag(sqrt(2)*(3 - 5*I)) == (None, None)
def test_log_exact():
# check for pi/2, pi/3, pi/4, pi/6, pi/8, pi/12; pi/5, pi/10:
for n in range(-23, 24):
if gcd(n, 24) != 1:
assert log(exp(n*I*pi/24).rewrite(sqrt)) == n*I*pi/24
for n in range(-9, 10):
assert log(exp(n*I*pi/10).rewrite(sqrt)) == n*I*pi/10
assert log(S.Half - I*sqrt(3)/2) == -I*pi/3
assert log(Rational(-1, 2) + I*sqrt(3)/2) == I*pi*Rational(2, 3)
assert log(-sqrt(2)/2 - I*sqrt(2)/2) == -I*pi*Rational(3, 4)
assert log(-sqrt(3)/2 - I*S.Half) == -I*pi*Rational(5, 6)
assert log(Rational(-1, 4) + sqrt(5)/4 - I*sqrt(sqrt(5)/8 + Rational(5, 8))) == -I*pi*Rational(2, 5)
assert log(sqrt(Rational(5, 8) - sqrt(5)/8) + I*(Rational(1, 4) + sqrt(5)/4)) == I*pi*Rational(3, 10)
assert log(-sqrt(sqrt(2)/4 + S.Half) + I*sqrt(S.Half - sqrt(2)/4)) == I*pi*Rational(7, 8)
assert log(-sqrt(6)/4 - sqrt(2)/4 + I*(-sqrt(6)/4 + sqrt(2)/4)) == -I*pi*Rational(11, 12)
assert log(-1 + I*sqrt(3)) == log(2) + I*pi*Rational(2, 3)
assert log(5 + 5*I) == log(5*sqrt(2)) + I*pi/4
assert log(sqrt(-12)) == log(2*sqrt(3)) + I*pi/2
assert log(-sqrt(6) + sqrt(2) - I*sqrt(6) - I*sqrt(2)) == log(4) - I*pi*Rational(7, 12)
assert log(-sqrt(6-3*sqrt(2)) - I*sqrt(6+3*sqrt(2))) == log(2*sqrt(3)) - I*pi*Rational(5, 8)
assert log(1 + I*sqrt(2-sqrt(2))/sqrt(2+sqrt(2))) == log(2/sqrt(sqrt(2) + 2)) + I*pi/8
assert log(cos(pi*Rational(7, 12)) + I*sin(pi*Rational(7, 12))) == I*pi*Rational(7, 12)
assert log(cos(pi*Rational(6, 5)) + I*sin(pi*Rational(6, 5))) == I*pi*Rational(-4, 5)
assert log(5*(1 + I)/sqrt(2)) == log(5) + I*pi/4
assert log(sqrt(2)*(-sqrt(3) + 1 - sqrt(3)*I - I)) == log(4) - I*pi*Rational(7, 12)
assert log(-sqrt(2)*(1 - I*sqrt(3))) == log(2*sqrt(2)) + I*pi*Rational(2, 3)
assert log(sqrt(3)*I*(-sqrt(6 - 3*sqrt(2)) - I*sqrt(3*sqrt(2) + 6))) == log(6) - I*pi/8
zero = (1 + sqrt(2))**2 - 3 - 2*sqrt(2)
assert log(zero - I*sqrt(3)) == log(sqrt(3)) - I*pi/2
assert unchanged(log, zero + I*zero) or log(zero + zero*I) is zoo
# bail quickly if no obvious simplification is possible:
assert unchanged(log, (sqrt(2)-1/sqrt(sqrt(3)+I))**1000)
# beware of non-real coefficients
assert unchanged(log, sqrt(2-sqrt(5))*(1 + I))
def test_log_base():
assert log(1, 2) == 0
assert log(2, 2) == 1
assert log(3, 2) == log(3)/log(2)
assert log(6, 2) == 1 + log(3)/log(2)
assert log(6, 3) == 1 + log(2)/log(3)
assert log(2**3, 2) == 3
assert log(3**3, 3) == 3
assert log(5, 1) is zoo
assert log(1, 1) is nan
assert log(Rational(2, 3), 10) == log(Rational(2, 3))/log(10)
assert log(Rational(2, 3), Rational(1, 3)) == -log(2)/log(3) + 1
assert log(Rational(2, 3), Rational(2, 5)) == \
log(Rational(2, 3))/log(Rational(2, 5))
# issue 17148
assert log(Rational(8, 3), 2) == -log(3)/log(2) + 3
def test_log_symbolic():
assert log(x, exp(1)) == log(x)
assert log(exp(x)) != x
assert log(x, exp(1)) == log(x)
assert log(x*y) != log(x) + log(y)
assert log(x/y).expand() != log(x) - log(y)
assert log(x/y).expand(force=True) == log(x) - log(y)
assert log(x**y).expand() != y*log(x)
assert log(x**y).expand(force=True) == y*log(x)
assert log(x, 2) == log(x)/log(2)
assert log(E, 2) == 1/log(2)
p, q = symbols('p,q', positive=True)
r = Symbol('r', real=True)
assert log(p**2) != 2*log(p)
assert log(p**2).expand() == 2*log(p)
assert log(x**2).expand() != 2*log(x)
assert log(p**q) != q*log(p)
assert log(exp(p)) == p
assert log(p*q) != log(p) + log(q)
assert log(p*q).expand() == log(p) + log(q)
assert log(-sqrt(3)) == log(sqrt(3)) + I*pi
assert log(-exp(p)) != p + I*pi
assert log(-exp(x)).expand() != x + I*pi
assert log(-exp(r)).expand() == r + I*pi
assert log(x**y) != y*log(x)
assert (log(x**-5)**-1).expand() != -1/log(x)/5
assert (log(p**-5)**-1).expand() == -1/log(p)/5
assert log(-x).func is log and log(-x).args[0] == -x
assert log(-p).func is log and log(-p).args[0] == -p
def test_log_exp():
assert log(exp(4*I*pi)) == 0 # exp evaluates
assert log(exp(-5*I*pi)) == I*pi # exp evaluates
assert log(exp(I*pi*Rational(19, 4))) == I*pi*Rational(3, 4)
assert log(exp(I*pi*Rational(25, 7))) == I*pi*Rational(-3, 7)
assert log(exp(-5*I)) == -5*I + 2*I*pi
def test_exp_assumptions():
r = Symbol('r', real=True)
i = Symbol('i', imaginary=True)
for e in exp, exp_polar:
assert e(x).is_real is None
assert e(x).is_imaginary is None
assert e(i).is_real is None
assert e(i).is_imaginary is None
assert e(r).is_real is True
assert e(r).is_imaginary is False
assert e(re(x)).is_extended_real is True
assert e(re(x)).is_imaginary is False
assert exp(0, evaluate=False).is_algebraic
a = Symbol('a', algebraic=True)
an = Symbol('an', algebraic=True, nonzero=True)
r = Symbol('r', rational=True)
rn = Symbol('rn', rational=True, nonzero=True)
assert exp(a).is_algebraic is None
assert exp(an).is_algebraic is False
assert exp(pi*r).is_algebraic is None
assert exp(pi*rn).is_algebraic is False
def test_exp_AccumBounds():
assert exp(AccumBounds(1, 2)) == AccumBounds(E, E**2)
def test_log_assumptions():
p = symbols('p', positive=True)
n = symbols('n', negative=True)
z = symbols('z', zero=True)
x = symbols('x', infinite=True, extended_positive=True)
assert log(z).is_positive is False
assert log(x).is_extended_positive is True
assert log(2) > 0
assert log(1, evaluate=False).is_zero
assert log(1 + z).is_zero
assert log(p).is_zero is None
assert log(n).is_zero is False
assert log(0.5).is_negative is True
assert log(exp(p) + 1).is_positive
assert log(1, evaluate=False).is_algebraic
assert log(42, evaluate=False).is_algebraic is False
assert log(1 + z).is_rational
def test_log_hashing():
assert x != log(log(x))
assert hash(x) != hash(log(log(x)))
assert log(x) != log(log(log(x)))
e = 1/log(log(x) + log(log(x)))
assert e.base.func is log
e = 1/log(log(x) + log(log(log(x))))
assert e.base.func is log
e = log(log(x))
assert e.func is log
assert not x.func is log
assert hash(log(log(x))) != hash(x)
assert e != x
def test_log_sign():
assert sign(log(2)) == 1
def test_log_expand_complex():
assert log(1 + I).expand(complex=True) == log(2)/2 + I*pi/4
assert log(1 - sqrt(2)).expand(complex=True) == log(sqrt(2) - 1) + I*pi
def test_log_apply_evalf():
value = (log(3)/log(2) - 1).evalf()
assert value.epsilon_eq(Float("0.58496250072115618145373"))
def test_log_nseries():
assert log(x - 1)._eval_nseries(x, 4, None, I) == I*pi - x - x**2/2 - x**3/3 + O(x**4)
assert log(x - 1)._eval_nseries(x, 4, None, -I) == -I*pi - x - x**2/2 - x**3/3 + O(x**4)
assert log(I*x + I*x**3 - 1)._eval_nseries(x, 3, None, 1) == I*pi - I*x + x**2/2 + O(x**3)
assert log(I*x + I*x**3 - 1)._eval_nseries(x, 3, None, -1) == -I*pi - I*x + x**2/2 + O(x**3)
assert log(I*x**2 + I*x**3 - 1)._eval_nseries(x, 3, None, 1) == I*pi - I*x**2 + O(x**3)
assert log(I*x**2 + I*x**3 - 1)._eval_nseries(x, 3, None, -1) == I*pi - I*x**2 + O(x**3)
def test_log_expand():
w = Symbol("w", positive=True)
e = log(w**(log(5)/log(3)))
assert e.expand() == log(5)/log(3) * log(w)
x, y, z = symbols('x,y,z', positive=True)
assert log(x*(y + z)).expand(mul=False) == log(x) + log(y + z)
assert log(log(x**2)*log(y*z)).expand() in [log(2*log(x)*log(y) +
2*log(x)*log(z)), log(log(x)*log(z) + log(y)*log(x)) + log(2),
log((log(y) + log(z))*log(x)) + log(2)]
assert log(x**log(x**2)).expand(deep=False) == log(x)*log(x**2)
assert log(x**log(x**2)).expand() == 2*log(x)**2
x, y = symbols('x,y')
assert log(x*y).expand(force=True) == log(x) + log(y)
assert log(x**y).expand(force=True) == y*log(x)
assert log(exp(x)).expand(force=True) == x
# there's generally no need to expand out logs since this requires
# factoring and if simplification is sought, it's cheaper to put
# logs together than it is to take them apart.
assert log(2*3**2).expand() != 2*log(3) + log(2)
@XFAIL
def test_log_expand_fail():
x, y, z = symbols('x,y,z', positive=True)
assert (log(x*(y + z))*(x + y)).expand(mul=True, log=True) == y*log(
x) + y*log(y + z) + z*log(x) + z*log(y + z)
def test_log_simplify():
x = Symbol("x", positive=True)
assert log(x**2).expand() == 2*log(x)
assert expand_log(log(x**(2 + log(2)))) == (2 + log(2))*log(x)
z = Symbol('z')
assert log(sqrt(z)).expand() == log(z)/2
assert expand_log(log(z**(log(2) - 1))) == (log(2) - 1)*log(z)
assert log(z**(-1)).expand() != -log(z)
assert log(z**(x/(x+1))).expand() == x*log(z)/(x + 1)
def test_log_AccumBounds():
assert log(AccumBounds(1, E)) == AccumBounds(0, 1)
def test_lambertw():
k = Symbol('k')
assert LambertW(x, 0) == LambertW(x)
assert LambertW(x, 0, evaluate=False) != LambertW(x)
assert LambertW(0) == 0
assert LambertW(E) == 1
assert LambertW(-1/E) == -1
assert LambertW(-log(2)/2) == -log(2)
assert LambertW(oo) is oo
assert LambertW(0, 1) is -oo
assert LambertW(0, 42) is -oo
assert LambertW(-pi/2, -1) == -I*pi/2
assert LambertW(-1/E, -1) == -1
assert LambertW(-2*exp(-2), -1) == -2
assert LambertW(2*log(2)) == log(2)
assert LambertW(-pi/2) == I*pi/2
assert LambertW(exp(1 + E)) == E
assert LambertW(x**2).diff(x) == 2*LambertW(x**2)/x/(1 + LambertW(x**2))
assert LambertW(x, k).diff(x) == LambertW(x, k)/x/(1 + LambertW(x, k))
assert LambertW(sqrt(2)).evalf(30).epsilon_eq(
Float("0.701338383413663009202120278965", 30), 1e-29)
assert re(LambertW(2, -1)).evalf().epsilon_eq(Float("-0.834310366631110"))
assert LambertW(-1).is_real is False # issue 5215
assert LambertW(2, evaluate=False).is_real
p = Symbol('p', positive=True)
assert LambertW(p, evaluate=False).is_real
assert LambertW(p - 1, evaluate=False).is_real is None
assert LambertW(-p - 2/S.Exp1, evaluate=False).is_real is False
assert LambertW(S.Half, -1, evaluate=False).is_real is False
assert LambertW(Rational(-1, 10), -1, evaluate=False).is_real
assert LambertW(-10, -1, evaluate=False).is_real is False
assert LambertW(-2, 2, evaluate=False).is_real is False
assert LambertW(0, evaluate=False).is_algebraic
na = Symbol('na', nonzero=True, algebraic=True)
assert LambertW(na).is_algebraic is False
def test_issue_5673():
e = LambertW(-1)
assert e.is_comparable is False
assert e.is_positive is not True
e2 = 1 - 1/(1 - exp(-1000))
assert e2.is_positive is not True
e3 = -2 + exp(exp(LambertW(log(2)))*LambertW(log(2)))
assert e3.is_nonzero is not True
def test_log_fdiff():
x = Symbol('x')
raises(ArgumentIndexError, lambda: log(x).fdiff(2))
def test_log_taylor_term():
x = symbols('x')
assert log(x).taylor_term(0, x) == x
assert log(x).taylor_term(1, x) == -x**2/2
assert log(x).taylor_term(4, x) == x**5/5
assert log(x).taylor_term(-1, x) is S.Zero
def test_exp_expand_NC():
A, B, C = symbols('A,B,C', commutative=False)
assert exp(A + B).expand() == exp(A + B)
assert exp(A + B + C).expand() == exp(A + B + C)
assert exp(x + y).expand() == exp(x)*exp(y)
assert exp(x + y + z).expand() == exp(x)*exp(y)*exp(z)
def test_as_numer_denom():
n = symbols('n', negative=True)
assert exp(x).as_numer_denom() == (exp(x), 1)
assert exp(-x).as_numer_denom() == (1, exp(x))
assert exp(-2*x).as_numer_denom() == (1, exp(2*x))
assert exp(-2).as_numer_denom() == (1, exp(2))
assert exp(n).as_numer_denom() == (1, exp(-n))
assert exp(-n).as_numer_denom() == (exp(-n), 1)
assert exp(-I*x).as_numer_denom() == (1, exp(I*x))
assert exp(-I*n).as_numer_denom() == (1, exp(I*n))
assert exp(-n).as_numer_denom() == (exp(-n), 1)
def test_polar():
x, y = symbols('x y', polar=True)
assert abs(exp_polar(I*4)) == 1
assert abs(exp_polar(0)) == 1
assert abs(exp_polar(2 + 3*I)) == exp(2)
assert exp_polar(I*10).n() == exp_polar(I*10)
assert log(exp_polar(z)) == z
assert log(x*y).expand() == log(x) + log(y)
assert log(x**z).expand() == z*log(x)
assert exp_polar(3).exp == 3
# Compare exp(1.0*pi*I).
assert (exp_polar(1.0*pi*I).n(n=5)).as_real_imag()[1] >= 0
assert exp_polar(0).is_rational is True # issue 8008
def test_exp_summation():
w = symbols("w")
m, n, i, j = symbols("m n i j")
expr = exp(Sum(w*i, (i, 0, n), (j, 0, m)))
assert expr.expand() == Product(exp(w*i), (i, 0, n), (j, 0, m))
def test_log_product():
from sympy.abc import n, m
from sympy.concrete import Product
i, j = symbols('i,j', positive=True, integer=True)
x, y = symbols('x,y', positive=True)
z = symbols('z', real=True)
w = symbols('w')
expr = log(Product(x**i, (i, 1, n)))
assert simplify(expr) == expr
assert expr.expand() == Sum(i*log(x), (i, 1, n))
expr = log(Product(x**i*y**j, (i, 1, n), (j, 1, m)))
assert simplify(expr) == expr
assert expr.expand() == Sum(i*log(x) + j*log(y), (i, 1, n), (j, 1, m))
expr = log(Product(-2, (n, 0, 4)))
assert simplify(expr) == expr
assert expr.expand() == expr
assert expr.expand(force=True) == Sum(log(-2), (n, 0, 4))
expr = log(Product(exp(z*i), (i, 0, n)))
assert expr.expand() == Sum(z*i, (i, 0, n))
expr = log(Product(exp(w*i), (i, 0, n)))
assert expr.expand() == expr
assert expr.expand(force=True) == Sum(w*i, (i, 0, n))
expr = log(Product(i**2*abs(j), (i, 1, n), (j, 1, m)))
assert expr.expand() == Sum(2*log(i) + log(j), (i, 1, n), (j, 1, m))
@XFAIL
def test_log_product_simplify_to_sum():
from sympy.abc import n, m
i, j = symbols('i,j', positive=True, integer=True)
x, y = symbols('x,y', positive=True)
from sympy.concrete import Product, Sum
assert simplify(log(Product(x**i, (i, 1, n)))) == Sum(i*log(x), (i, 1, n))
assert simplify(log(Product(x**i*y**j, (i, 1, n), (j, 1, m)))) == \
Sum(i*log(x) + j*log(y), (i, 1, n), (j, 1, m))
def test_issue_8866():
assert simplify(log(x, 10, evaluate=False)) == simplify(log(x, 10))
assert expand_log(log(x, 10, evaluate=False)) == expand_log(log(x, 10))
y = Symbol('y', positive=True)
l1 = log(exp(y), exp(10))
b1 = log(exp(y), exp(5))
l2 = log(exp(y), exp(10), evaluate=False)
b2 = log(exp(y), exp(5), evaluate=False)
assert simplify(log(l1, b1)) == simplify(log(l2, b2))
assert expand_log(log(l1, b1)) == expand_log(log(l2, b2))
def test_log_expand_factor():
assert (log(18)/log(3) - 2).expand(factor=True) == log(2)/log(3)
assert (log(12)/log(2)).expand(factor=True) == log(3)/log(2) + 2
assert (log(15)/log(3)).expand(factor=True) == 1 + log(5)/log(3)
assert (log(2)/(-log(12) + log(24))).expand(factor=True) == 1
assert expand_log(log(12), factor=True) == log(3) + 2*log(2)
assert expand_log(log(21)/log(7), factor=False) == log(3)/log(7) + 1
assert expand_log(log(45)/log(5) + log(20), factor=False) == \
1 + 2*log(3)/log(5) + log(20)
assert expand_log(log(45)/log(5) + log(26), factor=True) == \
log(2) + log(13) + (log(5) + 2*log(3))/log(5)
def test_issue_9116():
n = Symbol('n', positive=True, integer=True)
assert ln(n).is_nonnegative is True
assert log(n).is_nonnegative is True
|
e9262a5406ec49f55adf4522671e874a8c2ca4c51e2e043fc6fc1bed32c0bb46
|
from sympy import (symbols, Symbol, nan, oo, zoo, I, sinh, sin, pi, atan,
acos, Rational, sqrt, asin, acot, coth, E, S, tan, tanh, cos,
cosh, atan2, exp, log, asinh, acoth, atanh, O, cancel, Matrix, re, im,
Float, Pow, gcd, sec, csc, cot, diff, simplify, Heaviside, arg,
conjugate, series, FiniteSet, asec, acsc, Mul, sinc, jn,
AccumBounds, Interval, ImageSet, Lambda, besselj, Add)
from sympy.core.expr import unchanged
from sympy.core.function import ArgumentIndexError
from sympy.core.relational import Ne, Eq
from sympy.functions.elementary.piecewise import Piecewise
from sympy.sets.setexpr import SetExpr
from sympy.testing.pytest import XFAIL, slow, raises
x, y, z = symbols('x y z')
r = Symbol('r', real=True)
k = Symbol('k', integer=True)
p = Symbol('p', positive=True)
n = Symbol('n', negative=True)
np = Symbol('p', nonpositive=True)
nn = Symbol('n', nonnegative=True)
nz = Symbol('nz', nonzero=True)
ep = Symbol('ep', extended_positive=True)
en = Symbol('en', extended_negative=True)
enp = Symbol('ep', extended_nonpositive=True)
enn = Symbol('en', extended_nonnegative=True)
enz = Symbol('enz', extended_nonzero=True)
a = Symbol('a', algebraic=True)
na = Symbol('na', nonzero=True, algebraic=True)
def test_sin():
x, y = symbols('x y')
assert sin.nargs == FiniteSet(1)
assert sin(nan) is nan
assert sin(zoo) is nan
assert sin(oo) == AccumBounds(-1, 1)
assert sin(oo) - sin(oo) == AccumBounds(-2, 2)
assert sin(oo*I) == oo*I
assert sin(-oo*I) == -oo*I
assert 0*sin(oo) is S.Zero
assert 0/sin(oo) is S.Zero
assert 0 + sin(oo) == AccumBounds(-1, 1)
assert 5 + sin(oo) == AccumBounds(4, 6)
assert sin(0) == 0
assert sin(asin(x)) == x
assert sin(atan(x)) == x / sqrt(1 + x**2)
assert sin(acos(x)) == sqrt(1 - x**2)
assert sin(acot(x)) == 1 / (sqrt(1 + 1 / x**2) * x)
assert sin(acsc(x)) == 1 / x
assert sin(asec(x)) == sqrt(1 - 1 / x**2)
assert sin(atan2(y, x)) == y / sqrt(x**2 + y**2)
assert sin(pi*I) == sinh(pi)*I
assert sin(-pi*I) == -sinh(pi)*I
assert sin(-2*I) == -sinh(2)*I
assert sin(pi) == 0
assert sin(-pi) == 0
assert sin(2*pi) == 0
assert sin(-2*pi) == 0
assert sin(-3*10**73*pi) == 0
assert sin(7*10**103*pi) == 0
assert sin(pi/2) == 1
assert sin(-pi/2) == -1
assert sin(pi*Rational(5, 2)) == 1
assert sin(pi*Rational(7, 2)) == -1
ne = symbols('ne', integer=True, even=False)
e = symbols('e', even=True)
assert sin(pi*ne/2) == (-1)**(ne/2 - S.Half)
assert sin(pi*k/2).func == sin
assert sin(pi*e/2) == 0
assert sin(pi*k) == 0
assert sin(pi*k).subs(k, 3) == sin(pi*k/2).subs(k, 6) # issue 8298
assert sin(pi/3) == S.Half*sqrt(3)
assert sin(pi*Rational(-2, 3)) == Rational(-1, 2)*sqrt(3)
assert sin(pi/4) == S.Half*sqrt(2)
assert sin(-pi/4) == Rational(-1, 2)*sqrt(2)
assert sin(pi*Rational(17, 4)) == S.Half*sqrt(2)
assert sin(pi*Rational(-3, 4)) == Rational(-1, 2)*sqrt(2)
assert sin(pi/6) == S.Half
assert sin(-pi/6) == Rational(-1, 2)
assert sin(pi*Rational(7, 6)) == Rational(-1, 2)
assert sin(pi*Rational(-5, 6)) == Rational(-1, 2)
assert sin(pi*Rational(1, 5)) == sqrt((5 - sqrt(5)) / 8)
assert sin(pi*Rational(2, 5)) == sqrt((5 + sqrt(5)) / 8)
assert sin(pi*Rational(3, 5)) == sin(pi*Rational(2, 5))
assert sin(pi*Rational(4, 5)) == sin(pi*Rational(1, 5))
assert sin(pi*Rational(6, 5)) == -sin(pi*Rational(1, 5))
assert sin(pi*Rational(8, 5)) == -sin(pi*Rational(2, 5))
assert sin(pi*Rational(-1273, 5)) == -sin(pi*Rational(2, 5))
assert sin(pi/8) == sqrt((2 - sqrt(2))/4)
assert sin(pi/10) == Rational(-1, 4) + sqrt(5)/4
assert sin(pi/12) == -sqrt(2)/4 + sqrt(6)/4
assert sin(pi*Rational(5, 12)) == sqrt(2)/4 + sqrt(6)/4
assert sin(pi*Rational(-7, 12)) == -sqrt(2)/4 - sqrt(6)/4
assert sin(pi*Rational(-11, 12)) == sqrt(2)/4 - sqrt(6)/4
assert sin(pi*Rational(104, 105)) == sin(pi/105)
assert sin(pi*Rational(106, 105)) == -sin(pi/105)
assert sin(pi*Rational(-104, 105)) == -sin(pi/105)
assert sin(pi*Rational(-106, 105)) == sin(pi/105)
assert sin(x*I) == sinh(x)*I
assert sin(k*pi) == 0
assert sin(17*k*pi) == 0
assert sin(k*pi*I) == sinh(k*pi)*I
assert sin(r).is_real is True
assert sin(0, evaluate=False).is_algebraic
assert sin(a).is_algebraic is None
assert sin(na).is_algebraic is False
q = Symbol('q', rational=True)
assert sin(pi*q).is_algebraic
qn = Symbol('qn', rational=True, nonzero=True)
assert sin(qn).is_rational is False
assert sin(q).is_rational is None # issue 8653
assert isinstance(sin( re(x) - im(y)), sin) is True
assert isinstance(sin(-re(x) + im(y)), sin) is False
assert sin(SetExpr(Interval(0, 1))) == SetExpr(ImageSet(Lambda(x, sin(x)),
Interval(0, 1)))
for d in list(range(1, 22)) + [60, 85]:
for n in range(0, d*2 + 1):
x = n*pi/d
e = abs( float(sin(x)) - sin(float(x)) )
assert e < 1e-12
assert sin(0, evaluate=False).is_zero is True
assert sin(k*pi, evaluate=False).is_zero is None
assert sin(Add(1, -1, evaluate=False), evaluate=False).is_zero is True
def test_sin_cos():
for d in [1, 2, 3, 4, 5, 6, 10, 12, 15, 20, 24, 30, 40, 60, 120]: # list is not exhaustive...
for n in range(-2*d, d*2):
x = n*pi/d
assert sin(x + pi/2) == cos(x), "fails for %d*pi/%d" % (n, d)
assert sin(x - pi/2) == -cos(x), "fails for %d*pi/%d" % (n, d)
assert sin(x) == cos(x - pi/2), "fails for %d*pi/%d" % (n, d)
assert -sin(x) == cos(x + pi/2), "fails for %d*pi/%d" % (n, d)
def test_sin_series():
assert sin(x).series(x, 0, 9) == \
x - x**3/6 + x**5/120 - x**7/5040 + O(x**9)
def test_sin_rewrite():
assert sin(x).rewrite(exp) == -I*(exp(I*x) - exp(-I*x))/2
assert sin(x).rewrite(tan) == 2*tan(x/2)/(1 + tan(x/2)**2)
assert sin(x).rewrite(cot) == 2*cot(x/2)/(1 + cot(x/2)**2)
assert sin(sinh(x)).rewrite(
exp).subs(x, 3).n() == sin(x).rewrite(exp).subs(x, sinh(3)).n()
assert sin(cosh(x)).rewrite(
exp).subs(x, 3).n() == sin(x).rewrite(exp).subs(x, cosh(3)).n()
assert sin(tanh(x)).rewrite(
exp).subs(x, 3).n() == sin(x).rewrite(exp).subs(x, tanh(3)).n()
assert sin(coth(x)).rewrite(
exp).subs(x, 3).n() == sin(x).rewrite(exp).subs(x, coth(3)).n()
assert sin(sin(x)).rewrite(
exp).subs(x, 3).n() == sin(x).rewrite(exp).subs(x, sin(3)).n()
assert sin(cos(x)).rewrite(
exp).subs(x, 3).n() == sin(x).rewrite(exp).subs(x, cos(3)).n()
assert sin(tan(x)).rewrite(
exp).subs(x, 3).n() == sin(x).rewrite(exp).subs(x, tan(3)).n()
assert sin(cot(x)).rewrite(
exp).subs(x, 3).n() == sin(x).rewrite(exp).subs(x, cot(3)).n()
assert sin(log(x)).rewrite(Pow) == I*x**-I / 2 - I*x**I /2
assert sin(x).rewrite(csc) == 1/csc(x)
assert sin(x).rewrite(cos) == cos(x - pi / 2, evaluate=False)
assert sin(x).rewrite(sec) == 1 / sec(x - pi / 2, evaluate=False)
assert sin(cos(x)).rewrite(Pow) == sin(cos(x))
def test_sin_expansion():
# Note: these formulas are not unique. The ones here come from the
# Chebyshev formulas.
assert sin(x + y).expand(trig=True) == sin(x)*cos(y) + cos(x)*sin(y)
assert sin(x - y).expand(trig=True) == sin(x)*cos(y) - cos(x)*sin(y)
assert sin(y - x).expand(trig=True) == cos(x)*sin(y) - sin(x)*cos(y)
assert sin(2*x).expand(trig=True) == 2*sin(x)*cos(x)
assert sin(3*x).expand(trig=True) == -4*sin(x)**3 + 3*sin(x)
assert sin(4*x).expand(trig=True) == -8*sin(x)**3*cos(x) + 4*sin(x)*cos(x)
assert sin(2).expand(trig=True) == 2*sin(1)*cos(1)
assert sin(3).expand(trig=True) == -4*sin(1)**3 + 3*sin(1)
def test_sin_AccumBounds():
assert sin(AccumBounds(-oo, oo)) == AccumBounds(-1, 1)
assert sin(AccumBounds(0, oo)) == AccumBounds(-1, 1)
assert sin(AccumBounds(-oo, 0)) == AccumBounds(-1, 1)
assert sin(AccumBounds(0, 2*S.Pi)) == AccumBounds(-1, 1)
assert sin(AccumBounds(0, S.Pi*Rational(3, 4))) == AccumBounds(0, 1)
assert sin(AccumBounds(S.Pi*Rational(3, 4), S.Pi*Rational(7, 4))) == AccumBounds(-1, sin(S.Pi*Rational(3, 4)))
assert sin(AccumBounds(S.Pi/4, S.Pi/3)) == AccumBounds(sin(S.Pi/4), sin(S.Pi/3))
assert sin(AccumBounds(S.Pi*Rational(3, 4), S.Pi*Rational(5, 6))) == AccumBounds(sin(S.Pi*Rational(5, 6)), sin(S.Pi*Rational(3, 4)))
def test_sin_fdiff():
assert sin(x).fdiff() == cos(x)
raises(ArgumentIndexError, lambda: sin(x).fdiff(2))
def test_trig_symmetry():
assert sin(-x) == -sin(x)
assert cos(-x) == cos(x)
assert tan(-x) == -tan(x)
assert cot(-x) == -cot(x)
assert sin(x + pi) == -sin(x)
assert sin(x + 2*pi) == sin(x)
assert sin(x + 3*pi) == -sin(x)
assert sin(x + 4*pi) == sin(x)
assert sin(x - 5*pi) == -sin(x)
assert cos(x + pi) == -cos(x)
assert cos(x + 2*pi) == cos(x)
assert cos(x + 3*pi) == -cos(x)
assert cos(x + 4*pi) == cos(x)
assert cos(x - 5*pi) == -cos(x)
assert tan(x + pi) == tan(x)
assert tan(x - 3*pi) == tan(x)
assert cot(x + pi) == cot(x)
assert cot(x - 3*pi) == cot(x)
assert sin(pi/2 - x) == cos(x)
assert sin(pi*Rational(3, 2) - x) == -cos(x)
assert sin(pi*Rational(5, 2) - x) == cos(x)
assert cos(pi/2 - x) == sin(x)
assert cos(pi*Rational(3, 2) - x) == -sin(x)
assert cos(pi*Rational(5, 2) - x) == sin(x)
assert tan(pi/2 - x) == cot(x)
assert tan(pi*Rational(3, 2) - x) == cot(x)
assert tan(pi*Rational(5, 2) - x) == cot(x)
assert cot(pi/2 - x) == tan(x)
assert cot(pi*Rational(3, 2) - x) == tan(x)
assert cot(pi*Rational(5, 2) - x) == tan(x)
assert sin(pi/2 + x) == cos(x)
assert cos(pi/2 + x) == -sin(x)
assert tan(pi/2 + x) == -cot(x)
assert cot(pi/2 + x) == -tan(x)
def test_cos():
x, y = symbols('x y')
assert cos.nargs == FiniteSet(1)
assert cos(nan) is nan
assert cos(oo) == AccumBounds(-1, 1)
assert cos(oo) - cos(oo) == AccumBounds(-2, 2)
assert cos(oo*I) is oo
assert cos(-oo*I) is oo
assert cos(zoo) is nan
assert cos(0) == 1
assert cos(acos(x)) == x
assert cos(atan(x)) == 1 / sqrt(1 + x**2)
assert cos(asin(x)) == sqrt(1 - x**2)
assert cos(acot(x)) == 1 / sqrt(1 + 1 / x**2)
assert cos(acsc(x)) == sqrt(1 - 1 / x**2)
assert cos(asec(x)) == 1 / x
assert cos(atan2(y, x)) == x / sqrt(x**2 + y**2)
assert cos(pi*I) == cosh(pi)
assert cos(-pi*I) == cosh(pi)
assert cos(-2*I) == cosh(2)
assert cos(pi/2) == 0
assert cos(-pi/2) == 0
assert cos(pi/2) == 0
assert cos(-pi/2) == 0
assert cos((-3*10**73 + 1)*pi/2) == 0
assert cos((7*10**103 + 1)*pi/2) == 0
n = symbols('n', integer=True, even=False)
e = symbols('e', even=True)
assert cos(pi*n/2) == 0
assert cos(pi*e/2) == (-1)**(e/2)
assert cos(pi) == -1
assert cos(-pi) == -1
assert cos(2*pi) == 1
assert cos(5*pi) == -1
assert cos(8*pi) == 1
assert cos(pi/3) == S.Half
assert cos(pi*Rational(-2, 3)) == Rational(-1, 2)
assert cos(pi/4) == S.Half*sqrt(2)
assert cos(-pi/4) == S.Half*sqrt(2)
assert cos(pi*Rational(11, 4)) == Rational(-1, 2)*sqrt(2)
assert cos(pi*Rational(-3, 4)) == Rational(-1, 2)*sqrt(2)
assert cos(pi/6) == S.Half*sqrt(3)
assert cos(-pi/6) == S.Half*sqrt(3)
assert cos(pi*Rational(7, 6)) == Rational(-1, 2)*sqrt(3)
assert cos(pi*Rational(-5, 6)) == Rational(-1, 2)*sqrt(3)
assert cos(pi*Rational(1, 5)) == (sqrt(5) + 1)/4
assert cos(pi*Rational(2, 5)) == (sqrt(5) - 1)/4
assert cos(pi*Rational(3, 5)) == -cos(pi*Rational(2, 5))
assert cos(pi*Rational(4, 5)) == -cos(pi*Rational(1, 5))
assert cos(pi*Rational(6, 5)) == -cos(pi*Rational(1, 5))
assert cos(pi*Rational(8, 5)) == cos(pi*Rational(2, 5))
assert cos(pi*Rational(-1273, 5)) == -cos(pi*Rational(2, 5))
assert cos(pi/8) == sqrt((2 + sqrt(2))/4)
assert cos(pi/12) == sqrt(2)/4 + sqrt(6)/4
assert cos(pi*Rational(5, 12)) == -sqrt(2)/4 + sqrt(6)/4
assert cos(pi*Rational(7, 12)) == sqrt(2)/4 - sqrt(6)/4
assert cos(pi*Rational(11, 12)) == -sqrt(2)/4 - sqrt(6)/4
assert cos(pi*Rational(104, 105)) == -cos(pi/105)
assert cos(pi*Rational(106, 105)) == -cos(pi/105)
assert cos(pi*Rational(-104, 105)) == -cos(pi/105)
assert cos(pi*Rational(-106, 105)) == -cos(pi/105)
assert cos(x*I) == cosh(x)
assert cos(k*pi*I) == cosh(k*pi)
assert cos(r).is_real is True
assert cos(0, evaluate=False).is_algebraic
assert cos(a).is_algebraic is None
assert cos(na).is_algebraic is False
q = Symbol('q', rational=True)
assert cos(pi*q).is_algebraic
assert cos(pi*Rational(2, 7)).is_algebraic
assert cos(k*pi) == (-1)**k
assert cos(2*k*pi) == 1
for d in list(range(1, 22)) + [60, 85]:
for n in range(0, 2*d + 1):
x = n*pi/d
e = abs( float(cos(x)) - cos(float(x)) )
assert e < 1e-12
def test_issue_6190():
c = Float('123456789012345678901234567890.25', '')
for cls in [sin, cos, tan, cot]:
assert cls(c*pi) == cls(pi/4)
assert cls(4.125*pi) == cls(pi/8)
assert cls(4.7*pi) == cls((4.7 % 2)*pi)
def test_cos_series():
assert cos(x).series(x, 0, 9) == \
1 - x**2/2 + x**4/24 - x**6/720 + x**8/40320 + O(x**9)
def test_cos_rewrite():
assert cos(x).rewrite(exp) == exp(I*x)/2 + exp(-I*x)/2
assert cos(x).rewrite(tan) == (1 - tan(x/2)**2)/(1 + tan(x/2)**2)
assert cos(x).rewrite(cot) == -(1 - cot(x/2)**2)/(1 + cot(x/2)**2)
assert cos(sinh(x)).rewrite(
exp).subs(x, 3).n() == cos(x).rewrite(exp).subs(x, sinh(3)).n()
assert cos(cosh(x)).rewrite(
exp).subs(x, 3).n() == cos(x).rewrite(exp).subs(x, cosh(3)).n()
assert cos(tanh(x)).rewrite(
exp).subs(x, 3).n() == cos(x).rewrite(exp).subs(x, tanh(3)).n()
assert cos(coth(x)).rewrite(
exp).subs(x, 3).n() == cos(x).rewrite(exp).subs(x, coth(3)).n()
assert cos(sin(x)).rewrite(
exp).subs(x, 3).n() == cos(x).rewrite(exp).subs(x, sin(3)).n()
assert cos(cos(x)).rewrite(
exp).subs(x, 3).n() == cos(x).rewrite(exp).subs(x, cos(3)).n()
assert cos(tan(x)).rewrite(
exp).subs(x, 3).n() == cos(x).rewrite(exp).subs(x, tan(3)).n()
assert cos(cot(x)).rewrite(
exp).subs(x, 3).n() == cos(x).rewrite(exp).subs(x, cot(3)).n()
assert cos(log(x)).rewrite(Pow) == x**I/2 + x**-I/2
assert cos(x).rewrite(sec) == 1/sec(x)
assert cos(x).rewrite(sin) == sin(x + pi/2, evaluate=False)
assert cos(x).rewrite(csc) == 1/csc(-x + pi/2, evaluate=False)
assert cos(sin(x)).rewrite(Pow) == cos(sin(x))
def test_cos_expansion():
assert cos(x + y).expand(trig=True) == cos(x)*cos(y) - sin(x)*sin(y)
assert cos(x - y).expand(trig=True) == cos(x)*cos(y) + sin(x)*sin(y)
assert cos(y - x).expand(trig=True) == cos(x)*cos(y) + sin(x)*sin(y)
assert cos(2*x).expand(trig=True) == 2*cos(x)**2 - 1
assert cos(3*x).expand(trig=True) == 4*cos(x)**3 - 3*cos(x)
assert cos(4*x).expand(trig=True) == 8*cos(x)**4 - 8*cos(x)**2 + 1
assert cos(2).expand(trig=True) == 2*cos(1)**2 - 1
assert cos(3).expand(trig=True) == 4*cos(1)**3 - 3*cos(1)
def test_cos_AccumBounds():
assert cos(AccumBounds(-oo, oo)) == AccumBounds(-1, 1)
assert cos(AccumBounds(0, oo)) == AccumBounds(-1, 1)
assert cos(AccumBounds(-oo, 0)) == AccumBounds(-1, 1)
assert cos(AccumBounds(0, 2*S.Pi)) == AccumBounds(-1, 1)
assert cos(AccumBounds(-S.Pi/3, S.Pi/4)) == AccumBounds(cos(-S.Pi/3), 1)
assert cos(AccumBounds(S.Pi*Rational(3, 4), S.Pi*Rational(5, 4))) == AccumBounds(-1, cos(S.Pi*Rational(3, 4)))
assert cos(AccumBounds(S.Pi*Rational(5, 4), S.Pi*Rational(4, 3))) == AccumBounds(cos(S.Pi*Rational(5, 4)), cos(S.Pi*Rational(4, 3)))
assert cos(AccumBounds(S.Pi/4, S.Pi/3)) == AccumBounds(cos(S.Pi/3), cos(S.Pi/4))
def test_cos_fdiff():
assert cos(x).fdiff() == -sin(x)
raises(ArgumentIndexError, lambda: cos(x).fdiff(2))
def test_tan():
assert tan(nan) is nan
assert tan(zoo) is nan
assert tan(oo) == AccumBounds(-oo, oo)
assert tan(oo) - tan(oo) == AccumBounds(-oo, oo)
assert tan.nargs == FiniteSet(1)
assert tan(oo*I) == I
assert tan(-oo*I) == -I
assert tan(0) == 0
assert tan(atan(x)) == x
assert tan(asin(x)) == x / sqrt(1 - x**2)
assert tan(acos(x)) == sqrt(1 - x**2) / x
assert tan(acot(x)) == 1 / x
assert tan(acsc(x)) == 1 / (sqrt(1 - 1 / x**2) * x)
assert tan(asec(x)) == sqrt(1 - 1 / x**2) * x
assert tan(atan2(y, x)) == y/x
assert tan(pi*I) == tanh(pi)*I
assert tan(-pi*I) == -tanh(pi)*I
assert tan(-2*I) == -tanh(2)*I
assert tan(pi) == 0
assert tan(-pi) == 0
assert tan(2*pi) == 0
assert tan(-2*pi) == 0
assert tan(-3*10**73*pi) == 0
assert tan(pi/2) is zoo
assert tan(pi*Rational(3, 2)) is zoo
assert tan(pi/3) == sqrt(3)
assert tan(pi*Rational(-2, 3)) == sqrt(3)
assert tan(pi/4) is S.One
assert tan(-pi/4) is S.NegativeOne
assert tan(pi*Rational(17, 4)) is S.One
assert tan(pi*Rational(-3, 4)) is S.One
assert tan(pi/5) == sqrt(5 - 2*sqrt(5))
assert tan(pi*Rational(2, 5)) == sqrt(5 + 2*sqrt(5))
assert tan(pi*Rational(18, 5)) == -sqrt(5 + 2*sqrt(5))
assert tan(pi*Rational(-16, 5)) == -sqrt(5 - 2*sqrt(5))
assert tan(pi/6) == 1/sqrt(3)
assert tan(-pi/6) == -1/sqrt(3)
assert tan(pi*Rational(7, 6)) == 1/sqrt(3)
assert tan(pi*Rational(-5, 6)) == 1/sqrt(3)
assert tan(pi/8) == -1 + sqrt(2)
assert tan(pi*Rational(3, 8)) == 1 + sqrt(2) # issue 15959
assert tan(pi*Rational(5, 8)) == -1 - sqrt(2)
assert tan(pi*Rational(7, 8)) == 1 - sqrt(2)
assert tan(pi/10) == sqrt(1 - 2*sqrt(5)/5)
assert tan(pi*Rational(3, 10)) == sqrt(1 + 2*sqrt(5)/5)
assert tan(pi*Rational(17, 10)) == -sqrt(1 + 2*sqrt(5)/5)
assert tan(pi*Rational(-31, 10)) == -sqrt(1 - 2*sqrt(5)/5)
assert tan(pi/12) == -sqrt(3) + 2
assert tan(pi*Rational(5, 12)) == sqrt(3) + 2
assert tan(pi*Rational(7, 12)) == -sqrt(3) - 2
assert tan(pi*Rational(11, 12)) == sqrt(3) - 2
assert tan(pi/24).radsimp() == -2 - sqrt(3) + sqrt(2) + sqrt(6)
assert tan(pi*Rational(5, 24)).radsimp() == -2 + sqrt(3) - sqrt(2) + sqrt(6)
assert tan(pi*Rational(7, 24)).radsimp() == 2 - sqrt(3) - sqrt(2) + sqrt(6)
assert tan(pi*Rational(11, 24)).radsimp() == 2 + sqrt(3) + sqrt(2) + sqrt(6)
assert tan(pi*Rational(13, 24)).radsimp() == -2 - sqrt(3) - sqrt(2) - sqrt(6)
assert tan(pi*Rational(17, 24)).radsimp() == -2 + sqrt(3) + sqrt(2) - sqrt(6)
assert tan(pi*Rational(19, 24)).radsimp() == 2 - sqrt(3) + sqrt(2) - sqrt(6)
assert tan(pi*Rational(23, 24)).radsimp() == 2 + sqrt(3) - sqrt(2) - sqrt(6)
assert tan(x*I) == tanh(x)*I
assert tan(k*pi) == 0
assert tan(17*k*pi) == 0
assert tan(k*pi*I) == tanh(k*pi)*I
assert tan(r).is_real is None
assert tan(r).is_extended_real is True
assert tan(0, evaluate=False).is_algebraic
assert tan(a).is_algebraic is None
assert tan(na).is_algebraic is False
assert tan(pi*Rational(10, 7)) == tan(pi*Rational(3, 7))
assert tan(pi*Rational(11, 7)) == -tan(pi*Rational(3, 7))
assert tan(pi*Rational(-11, 7)) == tan(pi*Rational(3, 7))
assert tan(pi*Rational(15, 14)) == tan(pi/14)
assert tan(pi*Rational(-15, 14)) == -tan(pi/14)
assert tan(r).is_finite is None
assert tan(I*r).is_finite is True
def test_tan_series():
assert tan(x).series(x, 0, 9) == \
x + x**3/3 + 2*x**5/15 + 17*x**7/315 + O(x**9)
def test_tan_rewrite():
neg_exp, pos_exp = exp(-x*I), exp(x*I)
assert tan(x).rewrite(exp) == I*(neg_exp - pos_exp)/(neg_exp + pos_exp)
assert tan(x).rewrite(sin) == 2*sin(x)**2/sin(2*x)
assert tan(x).rewrite(cos) == cos(x - S.Pi/2, evaluate=False)/cos(x)
assert tan(x).rewrite(cot) == 1/cot(x)
assert tan(sinh(x)).rewrite(
exp).subs(x, 3).n() == tan(x).rewrite(exp).subs(x, sinh(3)).n()
assert tan(cosh(x)).rewrite(
exp).subs(x, 3).n() == tan(x).rewrite(exp).subs(x, cosh(3)).n()
assert tan(tanh(x)).rewrite(
exp).subs(x, 3).n() == tan(x).rewrite(exp).subs(x, tanh(3)).n()
assert tan(coth(x)).rewrite(
exp).subs(x, 3).n() == tan(x).rewrite(exp).subs(x, coth(3)).n()
assert tan(sin(x)).rewrite(
exp).subs(x, 3).n() == tan(x).rewrite(exp).subs(x, sin(3)).n()
assert tan(cos(x)).rewrite(
exp).subs(x, 3).n() == tan(x).rewrite(exp).subs(x, cos(3)).n()
assert tan(tan(x)).rewrite(
exp).subs(x, 3).n() == tan(x).rewrite(exp).subs(x, tan(3)).n()
assert tan(cot(x)).rewrite(
exp).subs(x, 3).n() == tan(x).rewrite(exp).subs(x, cot(3)).n()
assert tan(log(x)).rewrite(Pow) == I*(x**-I - x**I)/(x**-I + x**I)
assert 0 == (cos(pi/34)*tan(pi/34) - sin(pi/34)).rewrite(pow)
assert 0 == (cos(pi/17)*tan(pi/17) - sin(pi/17)).rewrite(pow)
assert tan(pi/19).rewrite(pow) == tan(pi/19)
assert tan(pi*Rational(8, 19)).rewrite(sqrt) == tan(pi*Rational(8, 19))
assert tan(x).rewrite(sec) == sec(x)/sec(x - pi/2, evaluate=False)
assert tan(x).rewrite(csc) == csc(-x + pi/2, evaluate=False)/csc(x)
assert tan(sin(x)).rewrite(Pow) == tan(sin(x))
assert tan(pi*Rational(2, 5), evaluate=False).rewrite(sqrt) == sqrt(sqrt(5)/8 +
Rational(5, 8))/(Rational(-1, 4) + sqrt(5)/4)
def test_tan_subs():
assert tan(x).subs(tan(x), y) == y
assert tan(x).subs(x, y) == tan(y)
assert tan(x).subs(x, S.Pi/2) is zoo
assert tan(x).subs(x, S.Pi*Rational(3, 2)) is zoo
def test_tan_expansion():
assert tan(x + y).expand(trig=True) == ((tan(x) + tan(y))/(1 - tan(x)*tan(y))).expand()
assert tan(x - y).expand(trig=True) == ((tan(x) - tan(y))/(1 + tan(x)*tan(y))).expand()
assert tan(x + y + z).expand(trig=True) == (
(tan(x) + tan(y) + tan(z) - tan(x)*tan(y)*tan(z))/
(1 - tan(x)*tan(y) - tan(x)*tan(z) - tan(y)*tan(z))).expand()
assert 0 == tan(2*x).expand(trig=True).rewrite(tan).subs([(tan(x), Rational(1, 7))])*24 - 7
assert 0 == tan(3*x).expand(trig=True).rewrite(tan).subs([(tan(x), Rational(1, 5))])*55 - 37
assert 0 == tan(4*x - pi/4).expand(trig=True).rewrite(tan).subs([(tan(x), Rational(1, 5))])*239 - 1
def test_tan_AccumBounds():
assert tan(AccumBounds(-oo, oo)) == AccumBounds(-oo, oo)
assert tan(AccumBounds(S.Pi/3, S.Pi*Rational(2, 3))) == AccumBounds(-oo, oo)
assert tan(AccumBounds(S.Pi/6, S.Pi/3)) == AccumBounds(tan(S.Pi/6), tan(S.Pi/3))
def test_tan_fdiff():
assert tan(x).fdiff() == tan(x)**2 + 1
raises(ArgumentIndexError, lambda: tan(x).fdiff(2))
def test_cot():
assert cot(nan) is nan
assert cot.nargs == FiniteSet(1)
assert cot(oo*I) == -I
assert cot(-oo*I) == I
assert cot(zoo) is nan
assert cot(0) is zoo
assert cot(2*pi) is zoo
assert cot(acot(x)) == x
assert cot(atan(x)) == 1 / x
assert cot(asin(x)) == sqrt(1 - x**2) / x
assert cot(acos(x)) == x / sqrt(1 - x**2)
assert cot(acsc(x)) == sqrt(1 - 1 / x**2) * x
assert cot(asec(x)) == 1 / (sqrt(1 - 1 / x**2) * x)
assert cot(atan2(y, x)) == x/y
assert cot(pi*I) == -coth(pi)*I
assert cot(-pi*I) == coth(pi)*I
assert cot(-2*I) == coth(2)*I
assert cot(pi) == cot(2*pi) == cot(3*pi)
assert cot(-pi) == cot(-2*pi) == cot(-3*pi)
assert cot(pi/2) == 0
assert cot(-pi/2) == 0
assert cot(pi*Rational(5, 2)) == 0
assert cot(pi*Rational(7, 2)) == 0
assert cot(pi/3) == 1/sqrt(3)
assert cot(pi*Rational(-2, 3)) == 1/sqrt(3)
assert cot(pi/4) is S.One
assert cot(-pi/4) is S.NegativeOne
assert cot(pi*Rational(17, 4)) is S.One
assert cot(pi*Rational(-3, 4)) is S.One
assert cot(pi/6) == sqrt(3)
assert cot(-pi/6) == -sqrt(3)
assert cot(pi*Rational(7, 6)) == sqrt(3)
assert cot(pi*Rational(-5, 6)) == sqrt(3)
assert cot(pi/8) == 1 + sqrt(2)
assert cot(pi*Rational(3, 8)) == -1 + sqrt(2)
assert cot(pi*Rational(5, 8)) == 1 - sqrt(2)
assert cot(pi*Rational(7, 8)) == -1 - sqrt(2)
assert cot(pi/12) == sqrt(3) + 2
assert cot(pi*Rational(5, 12)) == -sqrt(3) + 2
assert cot(pi*Rational(7, 12)) == sqrt(3) - 2
assert cot(pi*Rational(11, 12)) == -sqrt(3) - 2
assert cot(pi/24).radsimp() == sqrt(2) + sqrt(3) + 2 + sqrt(6)
assert cot(pi*Rational(5, 24)).radsimp() == -sqrt(2) - sqrt(3) + 2 + sqrt(6)
assert cot(pi*Rational(7, 24)).radsimp() == -sqrt(2) + sqrt(3) - 2 + sqrt(6)
assert cot(pi*Rational(11, 24)).radsimp() == sqrt(2) - sqrt(3) - 2 + sqrt(6)
assert cot(pi*Rational(13, 24)).radsimp() == -sqrt(2) + sqrt(3) + 2 - sqrt(6)
assert cot(pi*Rational(17, 24)).radsimp() == sqrt(2) - sqrt(3) + 2 - sqrt(6)
assert cot(pi*Rational(19, 24)).radsimp() == sqrt(2) + sqrt(3) - 2 - sqrt(6)
assert cot(pi*Rational(23, 24)).radsimp() == -sqrt(2) - sqrt(3) - 2 - sqrt(6)
assert cot(x*I) == -coth(x)*I
assert cot(k*pi*I) == -coth(k*pi)*I
assert cot(r).is_real is None
assert cot(r).is_extended_real is True
assert cot(a).is_algebraic is None
assert cot(na).is_algebraic is False
assert cot(pi*Rational(10, 7)) == cot(pi*Rational(3, 7))
assert cot(pi*Rational(11, 7)) == -cot(pi*Rational(3, 7))
assert cot(pi*Rational(-11, 7)) == cot(pi*Rational(3, 7))
assert cot(pi*Rational(39, 34)) == cot(pi*Rational(5, 34))
assert cot(pi*Rational(-41, 34)) == -cot(pi*Rational(7, 34))
assert cot(x).is_finite is None
assert cot(r).is_finite is None
i = Symbol('i', imaginary=True)
assert cot(i).is_finite is True
assert cot(x).subs(x, 3*pi) is zoo
def test_tan_cot_sin_cos_evalf():
assert abs((tan(pi*Rational(8, 15))*cos(pi*Rational(8, 15))/sin(pi*Rational(8, 15)) - 1).evalf()) < 1e-14
assert abs((cot(pi*Rational(4, 15))*sin(pi*Rational(4, 15))/cos(pi*Rational(4, 15)) - 1).evalf()) < 1e-14
@XFAIL
def test_tan_cot_sin_cos_ratsimp():
assert 1 == (tan(pi*Rational(8, 15))*cos(pi*Rational(8, 15))/sin(pi*Rational(8, 15))).ratsimp()
assert 1 == (cot(pi*Rational(4, 15))*sin(pi*Rational(4, 15))/cos(pi*Rational(4, 15))).ratsimp()
def test_cot_series():
assert cot(x).series(x, 0, 9) == \
1/x - x/3 - x**3/45 - 2*x**5/945 - x**7/4725 + O(x**9)
# issue 6210
assert cot(x**4 + x**5).series(x, 0, 1) == \
x**(-4) - 1/x**3 + x**(-2) - 1/x + 1 + O(x)
assert cot(pi*(1-x)).series(x, 0, 3) == -1/(pi*x) + pi*x/3 + O(x**3)
assert cot(x).taylor_term(0, x) == 1/x
assert cot(x).taylor_term(2, x) is S.Zero
assert cot(x).taylor_term(3, x) == -x**3/45
def test_cot_rewrite():
neg_exp, pos_exp = exp(-x*I), exp(x*I)
assert cot(x).rewrite(exp) == I*(pos_exp + neg_exp)/(pos_exp - neg_exp)
assert cot(x).rewrite(sin) == sin(2*x)/(2*(sin(x)**2))
assert cot(x).rewrite(cos) == cos(x)/cos(x - pi/2, evaluate=False)
assert cot(x).rewrite(tan) == 1/tan(x)
assert cot(sinh(x)).rewrite(
exp).subs(x, 3).n() == cot(x).rewrite(exp).subs(x, sinh(3)).n()
assert cot(cosh(x)).rewrite(
exp).subs(x, 3).n() == cot(x).rewrite(exp).subs(x, cosh(3)).n()
assert cot(tanh(x)).rewrite(
exp).subs(x, 3).n() == cot(x).rewrite(exp).subs(x, tanh(3)).n()
assert cot(coth(x)).rewrite(
exp).subs(x, 3).n() == cot(x).rewrite(exp).subs(x, coth(3)).n()
assert cot(sin(x)).rewrite(
exp).subs(x, 3).n() == cot(x).rewrite(exp).subs(x, sin(3)).n()
assert cot(tan(x)).rewrite(
exp).subs(x, 3).n() == cot(x).rewrite(exp).subs(x, tan(3)).n()
assert cot(log(x)).rewrite(Pow) == -I*(x**-I + x**I)/(x**-I - x**I)
assert cot(pi*Rational(4, 34)).rewrite(pow).ratsimp() == (cos(pi*Rational(4, 34))/sin(pi*Rational(4, 34))).rewrite(pow).ratsimp()
assert cot(pi*Rational(4, 17)).rewrite(pow) == (cos(pi*Rational(4, 17))/sin(pi*Rational(4, 17))).rewrite(pow)
assert cot(pi/19).rewrite(pow) == cot(pi/19)
assert cot(pi/19).rewrite(sqrt) == cot(pi/19)
assert cot(x).rewrite(sec) == sec(x - pi / 2, evaluate=False) / sec(x)
assert cot(x).rewrite(csc) == csc(x) / csc(- x + pi / 2, evaluate=False)
assert cot(sin(x)).rewrite(Pow) == cot(sin(x))
assert cot(pi*Rational(2, 5), evaluate=False).rewrite(sqrt) == (Rational(-1, 4) + sqrt(5)/4)/\
sqrt(sqrt(5)/8 + Rational(5, 8))
def test_cot_subs():
assert cot(x).subs(cot(x), y) == y
assert cot(x).subs(x, y) == cot(y)
assert cot(x).subs(x, 0) is zoo
assert cot(x).subs(x, S.Pi) is zoo
def test_cot_expansion():
assert cot(x + y).expand(trig=True) == ((cot(x)*cot(y) - 1)/(cot(x) + cot(y))).expand()
assert cot(x - y).expand(trig=True) == (-(cot(x)*cot(y) + 1)/(cot(x) - cot(y))).expand()
assert cot(x + y + z).expand(trig=True) == (
(cot(x)*cot(y)*cot(z) - cot(x) - cot(y) - cot(z))/
(-1 + cot(x)*cot(y) + cot(x)*cot(z) + cot(y)*cot(z))).expand()
assert cot(3*x).expand(trig=True) == ((cot(x)**3 - 3*cot(x))/(3*cot(x)**2 - 1)).expand()
assert 0 == cot(2*x).expand(trig=True).rewrite(cot).subs([(cot(x), Rational(1, 3))])*3 + 4
assert 0 == cot(3*x).expand(trig=True).rewrite(cot).subs([(cot(x), Rational(1, 5))])*55 - 37
assert 0 == cot(4*x - pi/4).expand(trig=True).rewrite(cot).subs([(cot(x), Rational(1, 7))])*863 + 191
def test_cot_AccumBounds():
assert cot(AccumBounds(-oo, oo)) == AccumBounds(-oo, oo)
assert cot(AccumBounds(-S.Pi/3, S.Pi/3)) == AccumBounds(-oo, oo)
assert cot(AccumBounds(S.Pi/6, S.Pi/3)) == AccumBounds(cot(S.Pi/3), cot(S.Pi/6))
def test_cot_fdiff():
assert cot(x).fdiff() == -cot(x)**2 - 1
raises(ArgumentIndexError, lambda: cot(x).fdiff(2))
def test_sinc():
assert isinstance(sinc(x), sinc)
s = Symbol('s', zero=True)
assert sinc(s) is S.One
assert sinc(S.Infinity) is S.Zero
assert sinc(S.NegativeInfinity) is S.Zero
assert sinc(S.NaN) is S.NaN
assert sinc(S.ComplexInfinity) is S.NaN
n = Symbol('n', integer=True, nonzero=True)
assert sinc(n*pi) is S.Zero
assert sinc(-n*pi) is S.Zero
assert sinc(pi/2) == 2 / pi
assert sinc(-pi/2) == 2 / pi
assert sinc(pi*Rational(5, 2)) == 2 / (5*pi)
assert sinc(pi*Rational(7, 2)) == -2 / (7*pi)
assert sinc(-x) == sinc(x)
assert sinc(x).diff() == Piecewise(((x*cos(x) - sin(x)) / x**2, Ne(x, 0)), (0, True))
assert sinc(x).diff(x).equals(sinc(x).rewrite(sin).diff(x))
assert sinc(x).diff().subs(x, 0) is S.Zero
assert sinc(x).series() == 1 - x**2/6 + x**4/120 + O(x**6)
assert sinc(x).rewrite(jn) == jn(0, x)
assert sinc(x).rewrite(sin) == Piecewise((sin(x)/x, Ne(x, 0)), (1, True))
def test_asin():
assert asin(nan) is nan
assert asin.nargs == FiniteSet(1)
assert asin(oo) == -I*oo
assert asin(-oo) == I*oo
assert asin(zoo) is zoo
# Note: asin(-x) = - asin(x)
assert asin(0) == 0
assert asin(1) == pi/2
assert asin(-1) == -pi/2
assert asin(sqrt(3)/2) == pi/3
assert asin(-sqrt(3)/2) == -pi/3
assert asin(sqrt(2)/2) == pi/4
assert asin(-sqrt(2)/2) == -pi/4
assert asin(sqrt((5 - sqrt(5))/8)) == pi/5
assert asin(-sqrt((5 - sqrt(5))/8)) == -pi/5
assert asin(S.Half) == pi/6
assert asin(Rational(-1, 2)) == -pi/6
assert asin((sqrt(2 - sqrt(2)))/2) == pi/8
assert asin(-(sqrt(2 - sqrt(2)))/2) == -pi/8
assert asin((sqrt(5) - 1)/4) == pi/10
assert asin(-(sqrt(5) - 1)/4) == -pi/10
assert asin((sqrt(3) - 1)/sqrt(2**3)) == pi/12
assert asin(-(sqrt(3) - 1)/sqrt(2**3)) == -pi/12
# check round-trip for exact values:
for d in [5, 6, 8, 10, 12]:
for n in range(-(d//2), d//2 + 1):
if gcd(n, d) == 1:
assert asin(sin(n*pi/d)) == n*pi/d
assert asin(x).diff(x) == 1/sqrt(1 - x**2)
assert asin(1/x).as_leading_term(x) == I*log(1/x)
assert asin(0.2).is_real is True
assert asin(-2).is_real is False
assert asin(r).is_real is None
assert asin(-2*I) == -I*asinh(2)
assert asin(Rational(1, 7), evaluate=False).is_positive is True
assert asin(Rational(-1, 7), evaluate=False).is_positive is False
assert asin(p).is_positive is None
assert asin(sin(Rational(7, 2))) == Rational(-7, 2) + pi
assert asin(sin(Rational(-7, 4))) == Rational(7, 4) - pi
assert unchanged(asin, cos(x))
def test_asin_series():
assert asin(x).series(x, 0, 9) == \
x + x**3/6 + 3*x**5/40 + 5*x**7/112 + O(x**9)
t5 = asin(x).taylor_term(5, x)
assert t5 == 3*x**5/40
assert asin(x).taylor_term(7, x, t5, 0) == 5*x**7/112
def test_asin_rewrite():
assert asin(x).rewrite(log) == -I*log(I*x + sqrt(1 - x**2))
assert asin(x).rewrite(atan) == 2*atan(x/(1 + sqrt(1 - x**2)))
assert asin(x).rewrite(acos) == S.Pi/2 - acos(x)
assert asin(x).rewrite(acot) == 2*acot((sqrt(-x**2 + 1) + 1)/x)
assert asin(x).rewrite(asec) == -asec(1/x) + pi/2
assert asin(x).rewrite(acsc) == acsc(1/x)
def test_asin_fdiff():
assert asin(x).fdiff() == 1/sqrt(1 - x**2)
raises(ArgumentIndexError, lambda: asin(x).fdiff(2))
def test_acos():
assert acos(nan) is nan
assert acos(zoo) is zoo
assert acos.nargs == FiniteSet(1)
assert acos(oo) == I*oo
assert acos(-oo) == -I*oo
# Note: acos(-x) = pi - acos(x)
assert acos(0) == pi/2
assert acos(S.Half) == pi/3
assert acos(Rational(-1, 2)) == pi*Rational(2, 3)
assert acos(1) == 0
assert acos(-1) == pi
assert acos(sqrt(2)/2) == pi/4
assert acos(-sqrt(2)/2) == pi*Rational(3, 4)
# check round-trip for exact values:
for d in [5, 6, 8, 10, 12]:
for num in range(d):
if gcd(num, d) == 1:
assert acos(cos(num*pi/d)) == num*pi/d
assert acos(2*I) == pi/2 - asin(2*I)
assert acos(x).diff(x) == -1/sqrt(1 - x**2)
assert acos(1/x).as_leading_term(x) == I*log(1/x)
assert acos(0.2).is_real is True
assert acos(-2).is_real is False
assert acos(r).is_real is None
assert acos(Rational(1, 7), evaluate=False).is_positive is True
assert acos(Rational(-1, 7), evaluate=False).is_positive is True
assert acos(Rational(3, 2), evaluate=False).is_positive is False
assert acos(p).is_positive is None
assert acos(2 + p).conjugate() != acos(10 + p)
assert acos(-3 + n).conjugate() != acos(-3 + n)
assert acos(Rational(1, 3)).conjugate() == acos(Rational(1, 3))
assert acos(Rational(-1, 3)).conjugate() == acos(Rational(-1, 3))
assert acos(p + n*I).conjugate() == acos(p - n*I)
assert acos(z).conjugate() != acos(conjugate(z))
def test_acos_series():
assert acos(x).series(x, 0, 8) == \
pi/2 - x - x**3/6 - 3*x**5/40 - 5*x**7/112 + O(x**8)
assert acos(x).series(x, 0, 8) == pi/2 - asin(x).series(x, 0, 8)
t5 = acos(x).taylor_term(5, x)
assert t5 == -3*x**5/40
assert acos(x).taylor_term(7, x, t5, 0) == -5*x**7/112
assert acos(x).taylor_term(0, x) == pi/2
assert acos(x).taylor_term(2, x) is S.Zero
def test_acos_rewrite():
assert acos(x).rewrite(log) == pi/2 + I*log(I*x + sqrt(1 - x**2))
assert acos(x).rewrite(atan) == \
atan(sqrt(1 - x**2)/x) + (pi/2)*(1 - x*sqrt(1/x**2))
assert acos(0).rewrite(atan) == S.Pi/2
assert acos(0.5).rewrite(atan) == acos(0.5).rewrite(log)
assert acos(x).rewrite(asin) == S.Pi/2 - asin(x)
assert acos(x).rewrite(acot) == -2*acot((sqrt(-x**2 + 1) + 1)/x) + pi/2
assert acos(x).rewrite(asec) == asec(1/x)
assert acos(x).rewrite(acsc) == -acsc(1/x) + pi/2
def test_acos_fdiff():
assert acos(x).fdiff() == -1/sqrt(1 - x**2)
raises(ArgumentIndexError, lambda: acos(x).fdiff(2))
def test_atan():
assert atan(nan) is nan
assert atan.nargs == FiniteSet(1)
assert atan(oo) == pi/2
assert atan(-oo) == -pi/2
assert atan(zoo) == AccumBounds(-pi/2, pi/2)
assert atan(0) == 0
assert atan(1) == pi/4
assert atan(sqrt(3)) == pi/3
assert atan(-(1 + sqrt(2))) == pi*Rational(-3, 8)
assert atan(sqrt(5 - 2 * sqrt(5))) == pi/5
assert atan(-sqrt(1 - 2 * sqrt(5)/ 5)) == -pi/10
assert atan(sqrt(1 + 2 * sqrt(5) / 5)) == pi*Rational(3, 10)
assert atan(-2 + sqrt(3)) == -pi/12
assert atan(2 + sqrt(3)) == pi*Rational(5, 12)
assert atan(-2 - sqrt(3)) == pi*Rational(-5, 12)
# check round-trip for exact values:
for d in [5, 6, 8, 10, 12]:
for num in range(-(d//2), d//2 + 1):
if gcd(num, d) == 1:
assert atan(tan(num*pi/d)) == num*pi/d
assert atan(oo) == pi/2
assert atan(x).diff(x) == 1/(1 + x**2)
assert atan(1/x).as_leading_term(x) == pi/2
assert atan(r).is_real is True
assert atan(-2*I) == -I*atanh(2)
assert unchanged(atan, cot(x))
assert atan(cot(Rational(1, 4))) == Rational(-1, 4) + pi/2
assert acot(Rational(1, 4)).is_rational is False
for s in (x, p, n, np, nn, nz, ep, en, enp, enn, enz):
if s.is_real or s.is_extended_real is None:
assert s.is_nonzero is atan(s).is_nonzero
assert s.is_positive is atan(s).is_positive
assert s.is_negative is atan(s).is_negative
assert s.is_nonpositive is atan(s).is_nonpositive
assert s.is_nonnegative is atan(s).is_nonnegative
else:
assert s.is_extended_nonzero is atan(s).is_nonzero
assert s.is_extended_positive is atan(s).is_positive
assert s.is_extended_negative is atan(s).is_negative
assert s.is_extended_nonpositive is atan(s).is_nonpositive
assert s.is_extended_nonnegative is atan(s).is_nonnegative
assert s.is_extended_nonzero is atan(s).is_extended_nonzero
assert s.is_extended_positive is atan(s).is_extended_positive
assert s.is_extended_negative is atan(s).is_extended_negative
assert s.is_extended_nonpositive is atan(s).is_extended_nonpositive
assert s.is_extended_nonnegative is atan(s).is_extended_nonnegative
def test_atan_rewrite():
assert atan(x).rewrite(log) == I*(log(1 - I*x)-log(1 + I*x))/2
assert atan(x).rewrite(asin) == (-asin(1/sqrt(x**2 + 1)) + pi/2)*sqrt(x**2)/x
assert atan(x).rewrite(acos) == sqrt(x**2)*acos(1/sqrt(x**2 + 1))/x
assert atan(x).rewrite(acot) == acot(1/x)
assert atan(x).rewrite(asec) == sqrt(x**2)*asec(sqrt(x**2 + 1))/x
assert atan(x).rewrite(acsc) == (-acsc(sqrt(x**2 + 1)) + pi/2)*sqrt(x**2)/x
assert atan(-5*I).evalf() == atan(x).rewrite(log).evalf(subs={x:-5*I})
assert atan(5*I).evalf() == atan(x).rewrite(log).evalf(subs={x:5*I})
def test_atan_fdiff():
assert atan(x).fdiff() == 1/(x**2 + 1)
raises(ArgumentIndexError, lambda: atan(x).fdiff(2))
def test_atan2():
assert atan2.nargs == FiniteSet(2)
assert atan2(0, 0) is S.NaN
assert atan2(0, 1) == 0
assert atan2(1, 1) == pi/4
assert atan2(1, 0) == pi/2
assert atan2(1, -1) == pi*Rational(3, 4)
assert atan2(0, -1) == pi
assert atan2(-1, -1) == pi*Rational(-3, 4)
assert atan2(-1, 0) == -pi/2
assert atan2(-1, 1) == -pi/4
i = symbols('i', imaginary=True)
r = symbols('r', real=True)
eq = atan2(r, i)
ans = -I*log((i + I*r)/sqrt(i**2 + r**2))
reps = ((r, 2), (i, I))
assert eq.subs(reps) == ans.subs(reps)
x = Symbol('x', negative=True)
y = Symbol('y', negative=True)
assert atan2(y, x) == atan(y/x) - pi
y = Symbol('y', nonnegative=True)
assert atan2(y, x) == atan(y/x) + pi
y = Symbol('y')
assert atan2(y, x) == atan2(y, x, evaluate=False)
u = Symbol("u", positive=True)
assert atan2(0, u) == 0
u = Symbol("u", negative=True)
assert atan2(0, u) == pi
assert atan2(y, oo) == 0
assert atan2(y, -oo)== 2*pi*Heaviside(re(y)) - pi
assert atan2(y, x).rewrite(log) == -I*log((x + I*y)/sqrt(x**2 + y**2))
assert atan2(0, 0) is S.NaN
ex = atan2(y, x) - arg(x + I*y)
assert ex.subs({x:2, y:3}).rewrite(arg) == 0
assert ex.subs({x:2, y:3*I}).rewrite(arg) == -pi - I*log(sqrt(5)*I/5)
assert ex.subs({x:2*I, y:3}).rewrite(arg) == -pi/2 - I*log(sqrt(5)*I)
assert ex.subs({x:2*I, y:3*I}).rewrite(arg) == -pi + atan(Rational(2, 3)) + atan(Rational(3, 2))
i = symbols('i', imaginary=True)
r = symbols('r', real=True)
e = atan2(i, r)
rewrite = e.rewrite(arg)
reps = {i: I, r: -2}
assert rewrite == -I*log(abs(I*i + r)/sqrt(abs(i**2 + r**2))) + arg((I*i + r)/sqrt(i**2 + r**2))
assert (e - rewrite).subs(reps).equals(0)
assert atan2(0, x).rewrite(atan) == Piecewise((pi, re(x) < 0),
(0, Ne(x, 0)),
(nan, True))
assert atan2(0, r).rewrite(atan) == Piecewise((pi, r < 0), (0, Ne(r, 0)), (S.NaN, True))
assert atan2(0, i),rewrite(atan) == 0
assert atan2(0, r + i).rewrite(atan) == Piecewise((pi, r < 0), (0, True))
assert atan2(y, x).rewrite(atan) == Piecewise(
(2*atan(y/(x + sqrt(x**2 + y**2))), Ne(y, 0)),
(pi, re(x) < 0),
(0, (re(x) > 0) | Ne(im(x), 0)),
(nan, True))
assert conjugate(atan2(x, y)) == atan2(conjugate(x), conjugate(y))
assert diff(atan2(y, x), x) == -y/(x**2 + y**2)
assert diff(atan2(y, x), y) == x/(x**2 + y**2)
assert simplify(diff(atan2(y, x).rewrite(log), x)) == -y/(x**2 + y**2)
assert simplify(diff(atan2(y, x).rewrite(log), y)) == x/(x**2 + y**2)
assert str(atan2(1, 2).evalf(5)) == '0.46365'
raises(ArgumentIndexError, lambda: atan2(x, y).fdiff(3))
def test_issue_17461():
class A(Symbol):
is_extended_real = True
def _eval_evalf(self, prec):
return Float(5.0)
x = A('X')
y = A('Y')
assert abs(atan2(x, y).evalf() - 0.785398163397448) <= 1e-10
def test_acot():
assert acot(nan) is nan
assert acot.nargs == FiniteSet(1)
assert acot(-oo) == 0
assert acot(oo) == 0
assert acot(zoo) == 0
assert acot(1) == pi/4
assert acot(0) == pi/2
assert acot(sqrt(3)/3) == pi/3
assert acot(1/sqrt(3)) == pi/3
assert acot(-1/sqrt(3)) == -pi/3
assert acot(x).diff(x) == -1/(1 + x**2)
assert acot(1/x).as_leading_term(x) == x
assert acot(r).is_extended_real is True
assert acot(I*pi) == -I*acoth(pi)
assert acot(-2*I) == I*acoth(2)
assert acot(x).is_positive is None
assert acot(n).is_positive is False
assert acot(p).is_positive is True
assert acot(I).is_positive is False
assert acot(Rational(1, 4)).is_rational is False
assert unchanged(acot, cot(x))
assert unchanged(acot, tan(x))
assert acot(cot(Rational(1, 4))) == Rational(1, 4)
assert acot(tan(Rational(-1, 4))) == Rational(1, 4) - pi/2
def test_acot_rewrite():
assert acot(x).rewrite(log) == I*(log(1 - I/x)-log(1 + I/x))/2
assert acot(x).rewrite(asin) == x*(-asin(sqrt(-x**2)/sqrt(-x**2 - 1)) + pi/2)*sqrt(x**(-2))
assert acot(x).rewrite(acos) == x*sqrt(x**(-2))*acos(sqrt(-x**2)/sqrt(-x**2 - 1))
assert acot(x).rewrite(atan) == atan(1/x)
assert acot(x).rewrite(asec) == x*sqrt(x**(-2))*asec(sqrt((x**2 + 1)/x**2))
assert acot(x).rewrite(acsc) == x*(-acsc(sqrt((x**2 + 1)/x**2)) + pi/2)*sqrt(x**(-2))
assert acot(-I/5).evalf() == acot(x).rewrite(log).evalf(subs={x:-I/5})
assert acot(I/5).evalf() == acot(x).rewrite(log).evalf(subs={x:I/5})
def test_acot_fdiff():
assert acot(x).fdiff() == -1/(x**2 + 1)
raises(ArgumentIndexError, lambda: acot(x).fdiff(2))
def test_attributes():
assert sin(x).args == (x,)
def test_sincos_rewrite():
assert sin(pi/2 - x) == cos(x)
assert sin(pi - x) == sin(x)
assert cos(pi/2 - x) == sin(x)
assert cos(pi - x) == -cos(x)
def _check_even_rewrite(func, arg):
"""Checks that the expr has been rewritten using f(-x) -> f(x)
arg : -x
"""
return func(arg).args[0] == -arg
def _check_odd_rewrite(func, arg):
"""Checks that the expr has been rewritten using f(-x) -> -f(x)
arg : -x
"""
return func(arg).func.is_Mul
def _check_no_rewrite(func, arg):
"""Checks that the expr is not rewritten"""
return func(arg).args[0] == arg
def test_evenodd_rewrite():
a = cos(2) # negative
b = sin(1) # positive
even = [cos]
odd = [sin, tan, cot, asin, atan, acot]
with_minus = [-1, -2**1024 * E, -pi/105, -x*y, -x - y]
for func in even:
for expr in with_minus:
assert _check_even_rewrite(func, expr)
assert _check_no_rewrite(func, a*b)
assert func(
x - y) == func(y - x) # it doesn't matter which form is canonical
for func in odd:
for expr in with_minus:
assert _check_odd_rewrite(func, expr)
assert _check_no_rewrite(func, a*b)
assert func(
x - y) == -func(y - x) # it doesn't matter which form is canonical
def test_issue_4547():
assert sin(x).rewrite(cot) == 2*cot(x/2)/(1 + cot(x/2)**2)
assert cos(x).rewrite(cot) == -(1 - cot(x/2)**2)/(1 + cot(x/2)**2)
assert tan(x).rewrite(cot) == 1/cot(x)
assert cot(x).fdiff() == -1 - cot(x)**2
def test_as_leading_term_issue_5272():
assert sin(x).as_leading_term(x) == x
assert cos(x).as_leading_term(x) == 1
assert tan(x).as_leading_term(x) == x
assert cot(x).as_leading_term(x) == 1/x
assert asin(x).as_leading_term(x) == x
assert acos(x).as_leading_term(x) == pi/2
assert atan(x).as_leading_term(x) == x
assert acot(x).as_leading_term(x) == pi/2
def test_leading_terms():
for func in [sin, cos, tan, cot]:
for a in (1/x, S.Half):
eq = func(a)
assert eq.as_leading_term(x) == eq
def test_atan2_expansion():
assert cancel(atan2(x**2, x + 1).diff(x) - atan(x**2/(x + 1)).diff(x)) == 0
assert cancel(atan(y/x).series(y, 0, 5) - atan2(y, x).series(y, 0, 5)
+ atan2(0, x) - atan(0)) == O(y**5)
assert cancel(atan(y/x).series(x, 1, 4) - atan2(y, x).series(x, 1, 4)
+ atan2(y, 1) - atan(y)) == O((x - 1)**4, (x, 1))
assert cancel(atan((y + x)/x).series(x, 1, 3) - atan2(y + x, x).series(x, 1, 3)
+ atan2(1 + y, 1) - atan(1 + y)) == O((x - 1)**3, (x, 1))
assert Matrix([atan2(y, x)]).jacobian([y, x]) == \
Matrix([[x/(y**2 + x**2), -y/(y**2 + x**2)]])
def test_aseries():
def t(n, v, d, e):
assert abs(
n(1/v).evalf() - n(1/x).series(x, dir=d).removeO().subs(x, v)) < e
t(atan, 0.1, '+', 1e-5)
t(atan, -0.1, '-', 1e-5)
t(acot, 0.1, '+', 1e-5)
t(acot, -0.1, '-', 1e-5)
def test_issue_4420():
i = Symbol('i', integer=True)
e = Symbol('e', even=True)
o = Symbol('o', odd=True)
# unknown parity for variable
assert cos(4*i*pi) == 1
assert sin(4*i*pi) == 0
assert tan(4*i*pi) == 0
assert cot(4*i*pi) is zoo
assert cos(3*i*pi) == cos(pi*i) # +/-1
assert sin(3*i*pi) == 0
assert tan(3*i*pi) == 0
assert cot(3*i*pi) is zoo
assert cos(4.0*i*pi) == 1
assert sin(4.0*i*pi) == 0
assert tan(4.0*i*pi) == 0
assert cot(4.0*i*pi) is zoo
assert cos(3.0*i*pi) == cos(pi*i) # +/-1
assert sin(3.0*i*pi) == 0
assert tan(3.0*i*pi) == 0
assert cot(3.0*i*pi) is zoo
assert cos(4.5*i*pi) == cos(0.5*pi*i)
assert sin(4.5*i*pi) == sin(0.5*pi*i)
assert tan(4.5*i*pi) == tan(0.5*pi*i)
assert cot(4.5*i*pi) == cot(0.5*pi*i)
# parity of variable is known
assert cos(4*e*pi) == 1
assert sin(4*e*pi) == 0
assert tan(4*e*pi) == 0
assert cot(4*e*pi) is zoo
assert cos(3*e*pi) == 1
assert sin(3*e*pi) == 0
assert tan(3*e*pi) == 0
assert cot(3*e*pi) is zoo
assert cos(4.0*e*pi) == 1
assert sin(4.0*e*pi) == 0
assert tan(4.0*e*pi) == 0
assert cot(4.0*e*pi) is zoo
assert cos(3.0*e*pi) == 1
assert sin(3.0*e*pi) == 0
assert tan(3.0*e*pi) == 0
assert cot(3.0*e*pi) is zoo
assert cos(4.5*e*pi) == cos(0.5*pi*e)
assert sin(4.5*e*pi) == sin(0.5*pi*e)
assert tan(4.5*e*pi) == tan(0.5*pi*e)
assert cot(4.5*e*pi) == cot(0.5*pi*e)
assert cos(4*o*pi) == 1
assert sin(4*o*pi) == 0
assert tan(4*o*pi) == 0
assert cot(4*o*pi) is zoo
assert cos(3*o*pi) == -1
assert sin(3*o*pi) == 0
assert tan(3*o*pi) == 0
assert cot(3*o*pi) is zoo
assert cos(4.0*o*pi) == 1
assert sin(4.0*o*pi) == 0
assert tan(4.0*o*pi) == 0
assert cot(4.0*o*pi) is zoo
assert cos(3.0*o*pi) == -1
assert sin(3.0*o*pi) == 0
assert tan(3.0*o*pi) == 0
assert cot(3.0*o*pi) is zoo
assert cos(4.5*o*pi) == cos(0.5*pi*o)
assert sin(4.5*o*pi) == sin(0.5*pi*o)
assert tan(4.5*o*pi) == tan(0.5*pi*o)
assert cot(4.5*o*pi) == cot(0.5*pi*o)
# x could be imaginary
assert cos(4*x*pi) == cos(4*pi*x)
assert sin(4*x*pi) == sin(4*pi*x)
assert tan(4*x*pi) == tan(4*pi*x)
assert cot(4*x*pi) == cot(4*pi*x)
assert cos(3*x*pi) == cos(3*pi*x)
assert sin(3*x*pi) == sin(3*pi*x)
assert tan(3*x*pi) == tan(3*pi*x)
assert cot(3*x*pi) == cot(3*pi*x)
assert cos(4.0*x*pi) == cos(4.0*pi*x)
assert sin(4.0*x*pi) == sin(4.0*pi*x)
assert tan(4.0*x*pi) == tan(4.0*pi*x)
assert cot(4.0*x*pi) == cot(4.0*pi*x)
assert cos(3.0*x*pi) == cos(3.0*pi*x)
assert sin(3.0*x*pi) == sin(3.0*pi*x)
assert tan(3.0*x*pi) == tan(3.0*pi*x)
assert cot(3.0*x*pi) == cot(3.0*pi*x)
assert cos(4.5*x*pi) == cos(4.5*pi*x)
assert sin(4.5*x*pi) == sin(4.5*pi*x)
assert tan(4.5*x*pi) == tan(4.5*pi*x)
assert cot(4.5*x*pi) == cot(4.5*pi*x)
def test_inverses():
raises(AttributeError, lambda: sin(x).inverse())
raises(AttributeError, lambda: cos(x).inverse())
assert tan(x).inverse() == atan
assert cot(x).inverse() == acot
raises(AttributeError, lambda: csc(x).inverse())
raises(AttributeError, lambda: sec(x).inverse())
assert asin(x).inverse() == sin
assert acos(x).inverse() == cos
assert atan(x).inverse() == tan
assert acot(x).inverse() == cot
def test_real_imag():
a, b = symbols('a b', real=True)
z = a + b*I
for deep in [True, False]:
assert sin(
z).as_real_imag(deep=deep) == (sin(a)*cosh(b), cos(a)*sinh(b))
assert cos(
z).as_real_imag(deep=deep) == (cos(a)*cosh(b), -sin(a)*sinh(b))
assert tan(z).as_real_imag(deep=deep) == (sin(2*a)/(cos(2*a) +
cosh(2*b)), sinh(2*b)/(cos(2*a) + cosh(2*b)))
assert cot(z).as_real_imag(deep=deep) == (-sin(2*a)/(cos(2*a) -
cosh(2*b)), sinh(2*b)/(cos(2*a) - cosh(2*b)))
assert sin(a).as_real_imag(deep=deep) == (sin(a), 0)
assert cos(a).as_real_imag(deep=deep) == (cos(a), 0)
assert tan(a).as_real_imag(deep=deep) == (tan(a), 0)
assert cot(a).as_real_imag(deep=deep) == (cot(a), 0)
@XFAIL
def test_sin_cos_with_infinity():
# Test for issue 5196
# https://github.com/sympy/sympy/issues/5196
assert sin(oo) is S.NaN
assert cos(oo) is S.NaN
@slow
def test_sincos_rewrite_sqrt():
# equivalent to testing rewrite(pow)
for p in [1, 3, 5, 17]:
for t in [1, 8]:
n = t*p
# The vertices `exp(i*pi/n)` of a regular `n`-gon can
# be expressed by means of nested square roots if and
# only if `n` is a product of Fermat primes, `p`, and
# powers of 2, `t'. The code aims to check all vertices
# not belonging to an `m`-gon for `m < n`(`gcd(i, n) == 1`).
# For large `n` this makes the test too slow, therefore
# the vertices are limited to those of index `i < 10`.
for i in range(1, min((n + 1)//2 + 1, 10)):
if 1 == gcd(i, n):
x = i*pi/n
s1 = sin(x).rewrite(sqrt)
c1 = cos(x).rewrite(sqrt)
assert not s1.has(cos, sin), "fails for %d*pi/%d" % (i, n)
assert not c1.has(cos, sin), "fails for %d*pi/%d" % (i, n)
assert 1e-3 > abs(sin(x.evalf(5)) - s1.evalf(2)), "fails for %d*pi/%d" % (i, n)
assert 1e-3 > abs(cos(x.evalf(5)) - c1.evalf(2)), "fails for %d*pi/%d" % (i, n)
assert cos(pi/14).rewrite(sqrt) == sqrt(cos(pi/7)/2 + S.Half)
assert cos(pi/257).rewrite(sqrt).evalf(64) == cos(pi/257).evalf(64)
assert cos(pi*Rational(-15, 2)/11, evaluate=False).rewrite(
sqrt) == -sqrt(-cos(pi*Rational(4, 11))/2 + S.Half)
assert cos(Mul(2, pi, S.Half, evaluate=False), evaluate=False).rewrite(
sqrt) == -1
e = cos(pi/3/17) # don't use pi/15 since that is caught at instantiation
a = (
-3*sqrt(-sqrt(17) + 17)*sqrt(sqrt(17) + 17)/64 -
3*sqrt(34)*sqrt(sqrt(17) + 17)/128 - sqrt(sqrt(17) +
17)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) + 17)
+ sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/64 - sqrt(-sqrt(17)
+ 17)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) +
17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/128 - Rational(1, 32) +
sqrt(2)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) +
17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/64 +
3*sqrt(2)*sqrt(sqrt(17) + 17)/128 + sqrt(34)*sqrt(-sqrt(17) + 17)/128
+ 13*sqrt(2)*sqrt(-sqrt(17) + 17)/128 + sqrt(17)*sqrt(-sqrt(17) +
17)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) + 17)
+ sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/128 + 5*sqrt(17)/32
+ sqrt(3)*sqrt(-sqrt(2)*sqrt(sqrt(17) + 17)*sqrt(sqrt(17)/32 +
sqrt(2)*sqrt(-sqrt(17) + 17)/32 +
sqrt(2)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) +
17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/32 + Rational(15, 32))/8 -
5*sqrt(2)*sqrt(sqrt(17)/32 + sqrt(2)*sqrt(-sqrt(17) + 17)/32 +
sqrt(2)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) +
17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/32 +
Rational(15, 32))*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) +
17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/64 -
3*sqrt(2)*sqrt(-sqrt(17) + 17)*sqrt(sqrt(17)/32 +
sqrt(2)*sqrt(-sqrt(17) + 17)/32 +
sqrt(2)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) +
17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/32 + Rational(15, 32))/32
+ sqrt(34)*sqrt(sqrt(17)/32 + sqrt(2)*sqrt(-sqrt(17) + 17)/32 +
sqrt(2)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) +
17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/32 +
Rational(15, 32))*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) +
17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/64 +
sqrt(sqrt(17)/32 + sqrt(2)*sqrt(-sqrt(17) + 17)/32 +
sqrt(2)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) +
17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/32 + Rational(15, 32))/2 +
S.Half + sqrt(-sqrt(17) + 17)*sqrt(sqrt(17)/32 + sqrt(2)*sqrt(-sqrt(17) +
17)/32 + sqrt(2)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) -
sqrt(2)*sqrt(-sqrt(17) + 17) + sqrt(34)*sqrt(-sqrt(17) + 17) +
6*sqrt(17) + 34)/32 + Rational(15, 32))*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) -
sqrt(2)*sqrt(-sqrt(17) + 17) + sqrt(34)*sqrt(-sqrt(17) + 17) +
6*sqrt(17) + 34)/32 + sqrt(34)*sqrt(-sqrt(17) + 17)*sqrt(sqrt(17)/32 +
sqrt(2)*sqrt(-sqrt(17) + 17)/32 +
sqrt(2)*sqrt(-8*sqrt(2)*sqrt(sqrt(17) + 17) - sqrt(2)*sqrt(-sqrt(17) +
17) + sqrt(34)*sqrt(-sqrt(17) + 17) + 6*sqrt(17) + 34)/32 +
Rational(15, 32))/32)/2)
assert e.rewrite(sqrt) == a
assert e.n() == a.n()
# coverage of fermatCoords: multiplicity > 1; the following could be
# different but that portion of the code should be tested in some way
assert cos(pi/9/17).rewrite(sqrt) == \
sin(pi/9)*sin(pi*Rational(2, 17)) + cos(pi/9)*cos(pi*Rational(2, 17))
@slow
def test_tancot_rewrite_sqrt():
# equivalent to testing rewrite(pow)
for p in [1, 3, 5, 17]:
for t in [1, 8]:
n = t*p
for i in range(1, min((n + 1)//2 + 1, 10)):
if 1 == gcd(i, n):
x = i*pi/n
if 2*i != n and 3*i != 2*n:
t1 = tan(x).rewrite(sqrt)
assert not t1.has(cot, tan), "fails for %d*pi/%d" % (i, n)
assert 1e-3 > abs( tan(x.evalf(7)) - t1.evalf(4) ), "fails for %d*pi/%d" % (i, n)
if i != 0 and i != n:
c1 = cot(x).rewrite(sqrt)
assert not c1.has(cot, tan), "fails for %d*pi/%d" % (i, n)
assert 1e-3 > abs( cot(x.evalf(7)) - c1.evalf(4) ), "fails for %d*pi/%d" % (i, n)
def test_sec():
x = symbols('x', real=True)
z = symbols('z')
assert sec.nargs == FiniteSet(1)
assert sec(zoo) is nan
assert sec(0) == 1
assert sec(pi) == -1
assert sec(pi/2) is zoo
assert sec(-pi/2) is zoo
assert sec(pi/6) == 2*sqrt(3)/3
assert sec(pi/3) == 2
assert sec(pi*Rational(5, 2)) is zoo
assert sec(pi*Rational(9, 7)) == -sec(pi*Rational(2, 7))
assert sec(pi*Rational(3, 4)) == -sqrt(2) # issue 8421
assert sec(I) == 1/cosh(1)
assert sec(x*I) == 1/cosh(x)
assert sec(-x) == sec(x)
assert sec(asec(x)) == x
assert sec(z).conjugate() == sec(conjugate(z))
assert (sec(z).as_real_imag() ==
(cos(re(z))*cosh(im(z))/(sin(re(z))**2*sinh(im(z))**2 +
cos(re(z))**2*cosh(im(z))**2),
sin(re(z))*sinh(im(z))/(sin(re(z))**2*sinh(im(z))**2 +
cos(re(z))**2*cosh(im(z))**2)))
assert sec(x).expand(trig=True) == 1/cos(x)
assert sec(2*x).expand(trig=True) == 1/(2*cos(x)**2 - 1)
assert sec(x).is_extended_real == True
assert sec(z).is_real == None
assert sec(a).is_algebraic is None
assert sec(na).is_algebraic is False
assert sec(x).as_leading_term() == sec(x)
assert sec(0).is_finite == True
assert sec(x).is_finite == None
assert sec(pi/2).is_finite == False
assert series(sec(x), x, x0=0, n=6) == 1 + x**2/2 + 5*x**4/24 + O(x**6)
# https://github.com/sympy/sympy/issues/7166
assert series(sqrt(sec(x))) == 1 + x**2/4 + 7*x**4/96 + O(x**6)
# https://github.com/sympy/sympy/issues/7167
assert (series(sqrt(sec(x)), x, x0=pi*3/2, n=4) ==
1/sqrt(x - pi*Rational(3, 2)) + (x - pi*Rational(3, 2))**Rational(3, 2)/12 +
(x - pi*Rational(3, 2))**Rational(7, 2)/160 + O((x - pi*Rational(3, 2))**4, (x, pi*Rational(3, 2))))
assert sec(x).diff(x) == tan(x)*sec(x)
# Taylor Term checks
assert sec(z).taylor_term(4, z) == 5*z**4/24
assert sec(z).taylor_term(6, z) == 61*z**6/720
assert sec(z).taylor_term(5, z) == 0
def test_sec_rewrite():
assert sec(x).rewrite(exp) == 1/(exp(I*x)/2 + exp(-I*x)/2)
assert sec(x).rewrite(cos) == 1/cos(x)
assert sec(x).rewrite(tan) == (tan(x/2)**2 + 1)/(-tan(x/2)**2 + 1)
assert sec(x).rewrite(pow) == sec(x)
assert sec(x).rewrite(sqrt) == sec(x)
assert sec(z).rewrite(cot) == (cot(z/2)**2 + 1)/(cot(z/2)**2 - 1)
assert sec(x).rewrite(sin) == 1 / sin(x + pi / 2, evaluate=False)
assert sec(x).rewrite(tan) == (tan(x / 2)**2 + 1) / (-tan(x / 2)**2 + 1)
assert sec(x).rewrite(csc) == csc(-x + pi/2, evaluate=False)
def test_sec_fdiff():
assert sec(x).fdiff() == tan(x)*sec(x)
raises(ArgumentIndexError, lambda: sec(x).fdiff(2))
def test_csc():
x = symbols('x', real=True)
z = symbols('z')
# https://github.com/sympy/sympy/issues/6707
cosecant = csc('x')
alternate = 1/sin('x')
assert cosecant.equals(alternate) == True
assert alternate.equals(cosecant) == True
assert csc.nargs == FiniteSet(1)
assert csc(0) is zoo
assert csc(pi) is zoo
assert csc(zoo) is nan
assert csc(pi/2) == 1
assert csc(-pi/2) == -1
assert csc(pi/6) == 2
assert csc(pi/3) == 2*sqrt(3)/3
assert csc(pi*Rational(5, 2)) == 1
assert csc(pi*Rational(9, 7)) == -csc(pi*Rational(2, 7))
assert csc(pi*Rational(3, 4)) == sqrt(2) # issue 8421
assert csc(I) == -I/sinh(1)
assert csc(x*I) == -I/sinh(x)
assert csc(-x) == -csc(x)
assert csc(acsc(x)) == x
assert csc(z).conjugate() == csc(conjugate(z))
assert (csc(z).as_real_imag() ==
(sin(re(z))*cosh(im(z))/(sin(re(z))**2*cosh(im(z))**2 +
cos(re(z))**2*sinh(im(z))**2),
-cos(re(z))*sinh(im(z))/(sin(re(z))**2*cosh(im(z))**2 +
cos(re(z))**2*sinh(im(z))**2)))
assert csc(x).expand(trig=True) == 1/sin(x)
assert csc(2*x).expand(trig=True) == 1/(2*sin(x)*cos(x))
assert csc(x).is_extended_real == True
assert csc(z).is_real == None
assert csc(a).is_algebraic is None
assert csc(na).is_algebraic is False
assert csc(x).as_leading_term() == csc(x)
assert csc(0).is_finite == False
assert csc(x).is_finite == None
assert csc(pi/2).is_finite == True
assert series(csc(x), x, x0=pi/2, n=6) == \
1 + (x - pi/2)**2/2 + 5*(x - pi/2)**4/24 + O((x - pi/2)**6, (x, pi/2))
assert series(csc(x), x, x0=0, n=6) == \
1/x + x/6 + 7*x**3/360 + 31*x**5/15120 + O(x**6)
assert csc(x).diff(x) == -cot(x)*csc(x)
assert csc(x).taylor_term(2, x) == 0
assert csc(x).taylor_term(3, x) == 7*x**3/360
assert csc(x).taylor_term(5, x) == 31*x**5/15120
raises(ArgumentIndexError, lambda: csc(x).fdiff(2))
def test_asec():
z = Symbol('z', zero=True)
assert asec(z) is zoo
assert asec(nan) is nan
assert asec(1) == 0
assert asec(-1) == pi
assert asec(oo) == pi/2
assert asec(-oo) == pi/2
assert asec(zoo) == pi/2
assert asec(sec(pi*Rational(13, 4))) == pi*Rational(3, 4)
assert asec(1 + sqrt(5)) == pi*Rational(2, 5)
assert asec(2/sqrt(3)) == pi/6
assert asec(sqrt(4 - 2*sqrt(2))) == pi/8
assert asec(-sqrt(4 + 2*sqrt(2))) == pi*Rational(5, 8)
assert asec(sqrt(2 + 2*sqrt(5)/5)) == pi*Rational(3, 10)
assert asec(-sqrt(2 + 2*sqrt(5)/5)) == pi*Rational(7, 10)
assert asec(sqrt(2) - sqrt(6)) == pi*Rational(11, 12)
assert asec(x).diff(x) == 1/(x**2*sqrt(1 - 1/x**2))
assert asec(x).as_leading_term(x) == I*log(x)
assert asec(x).rewrite(log) == I*log(sqrt(1 - 1/x**2) + I/x) + pi/2
assert asec(x).rewrite(asin) == -asin(1/x) + pi/2
assert asec(x).rewrite(acos) == acos(1/x)
assert asec(x).rewrite(atan) == (2*atan(x + sqrt(x**2 - 1)) - pi/2)*sqrt(x**2)/x
assert asec(x).rewrite(acot) == (2*acot(x - sqrt(x**2 - 1)) - pi/2)*sqrt(x**2)/x
assert asec(x).rewrite(acsc) == -acsc(x) + pi/2
raises(ArgumentIndexError, lambda: asec(x).fdiff(2))
def test_asec_is_real():
assert asec(S.Half).is_real is False
n = Symbol('n', positive=True, integer=True)
assert asec(n).is_extended_real is True
assert asec(x).is_real is None
assert asec(r).is_real is None
t = Symbol('t', real=False, finite=True)
assert asec(t).is_real is False
def test_acsc():
assert acsc(nan) is nan
assert acsc(1) == pi/2
assert acsc(-1) == -pi/2
assert acsc(oo) == 0
assert acsc(-oo) == 0
assert acsc(zoo) == 0
assert acsc(0) is zoo
assert acsc(csc(3)) == -3 + pi
assert acsc(csc(4)) == -4 + pi
assert acsc(csc(6)) == 6 - 2*pi
assert unchanged(acsc, csc(x))
assert unchanged(acsc, sec(x))
assert acsc(2/sqrt(3)) == pi/3
assert acsc(csc(pi*Rational(13, 4))) == -pi/4
assert acsc(sqrt(2 + 2*sqrt(5)/5)) == pi/5
assert acsc(-sqrt(2 + 2*sqrt(5)/5)) == -pi/5
assert acsc(-2) == -pi/6
assert acsc(-sqrt(4 + 2*sqrt(2))) == -pi/8
assert acsc(sqrt(4 - 2*sqrt(2))) == pi*Rational(3, 8)
assert acsc(1 + sqrt(5)) == pi/10
assert acsc(sqrt(2) - sqrt(6)) == pi*Rational(-5, 12)
assert acsc(x).diff(x) == -1/(x**2*sqrt(1 - 1/x**2))
assert acsc(x).as_leading_term(x) == I*log(x)
assert acsc(x).rewrite(log) == -I*log(sqrt(1 - 1/x**2) + I/x)
assert acsc(x).rewrite(asin) == asin(1/x)
assert acsc(x).rewrite(acos) == -acos(1/x) + pi/2
assert acsc(x).rewrite(atan) == (-atan(sqrt(x**2 - 1)) + pi/2)*sqrt(x**2)/x
assert acsc(x).rewrite(acot) == (-acot(1/sqrt(x**2 - 1)) + pi/2)*sqrt(x**2)/x
assert acsc(x).rewrite(asec) == -asec(x) + pi/2
raises(ArgumentIndexError, lambda: acsc(x).fdiff(2))
def test_csc_rewrite():
assert csc(x).rewrite(pow) == csc(x)
assert csc(x).rewrite(sqrt) == csc(x)
assert csc(x).rewrite(exp) == 2*I/(exp(I*x) - exp(-I*x))
assert csc(x).rewrite(sin) == 1/sin(x)
assert csc(x).rewrite(tan) == (tan(x/2)**2 + 1)/(2*tan(x/2))
assert csc(x).rewrite(cot) == (cot(x/2)**2 + 1)/(2*cot(x/2))
assert csc(x).rewrite(cos) == 1/cos(x - pi/2, evaluate=False)
assert csc(x).rewrite(sec) == sec(-x + pi/2, evaluate=False)
# issue 17349
assert csc(1 - exp(-besselj(I, I))).rewrite(cos) == \
-1/cos(-pi/2 - 1 + cos(I*besselj(I, I)) +
I*cos(-pi/2 + I*besselj(I, I), evaluate=False), evaluate=False)
def test_inverses_nseries():
assert asin(x + 2)._eval_nseries(x, 4, None, I) == -asin(2) + pi + sqrt(3)*I*x/3 - sqrt(3)*I*x**2/9 + \
sqrt(3)*I*x**3/18 + O(x**4)
assert asin(x + 2)._eval_nseries(x, 4, None, -I) == asin(2) - sqrt(3)*I*x/3 + sqrt(3)*I*x**2/9 - sqrt(3)*I*x**3/18 + O(x**4)
assert asin(x - 2)._eval_nseries(x, 4, None, I) == -asin(2) - sqrt(3)*I*x/3 - sqrt(3)*I*x**2/9 - sqrt(3)*I*x**3/18 + O(x**4)
assert asin(x - 2)._eval_nseries(x, 4, None, -I) == asin(2) - pi + sqrt(3)*I*x/3 + sqrt(3)*I*x**2/9 + \
sqrt(3)*I*x**3/18 + O(x**4)
assert asin(I*x + I*x**3 + 2)._eval_nseries(x, 3, None, 1) == -asin(2) + pi - sqrt(3)*x/3 + sqrt(3)*I*x**2/9 + O(x**3)
assert asin(I*x + I*x**3 + 2)._eval_nseries(x, 3, None, -1) == asin(2) + sqrt(3)*x/3 - sqrt(3)*I*x**2/9 + O(x**3)
assert asin(I*x + I*x**3 - 2)._eval_nseries(x, 3, None, 1) == -asin(2) + sqrt(3)*x/3 + sqrt(3)*I*x**2/9 + O(x**3)
assert asin(I*x + I*x**3 - 2)._eval_nseries(x, 3, None, -1) == asin(2) - pi - sqrt(3)*x/3 - sqrt(3)*I*x**2/9 + O(x**3)
assert asin(I*x**2 + I*x**3 + 2)._eval_nseries(x, 3, None, 1) == -asin(2) + pi - sqrt(3)*x**2/3 + O(x**3)
assert asin(I*x**2 + I*x**3 + 2)._eval_nseries(x, 3, None, -1) == -asin(2) + pi - sqrt(3)*x**2/3 + O(x**3)
assert asin(I*x**2 + I*x**3 - 2)._eval_nseries(x, 3, None, 1) == -asin(2) + sqrt(3)*x**2/3 + O(x**3)
assert asin(I*x**2 + I*x**3 - 2)._eval_nseries(x, 3, None, -1) == -asin(2) + sqrt(3)*x**2/3 + O(x**3)
assert asin(1 + x)._eval_nseries(x, 3, None) == pi/2 - sqrt(2)*sqrt(-x) - \
sqrt(2)*(-x)**(S(3)/2)/12 - 3*sqrt(2)*(-x)**(S(5)/2)/160 + O(x**3)
assert asin(-1 + x)._eval_nseries(x, 3, None) == -pi/2 + sqrt(2)*sqrt(x) + \
sqrt(2)*x**(S(3)/2)/12 + 3*sqrt(2)*x**(S(5)/2)/160 + O(x**3)
assert asin(exp(x))._eval_nseries(x, 3, None) == pi/2 - sqrt(2)*sqrt(-x) + \
sqrt(2)*(-x)**(S(3)/2)/6 - sqrt(2)*(-x)**(S(5)/2)/120 + O(x**3)
assert asin(-exp(x))._eval_nseries(x, 3, None) == -pi/2 + sqrt(2)*sqrt(-x) - \
sqrt(2)*(-x)**(S(3)/2)/6 + sqrt(2)*(-x)**(S(5)/2)/120 + O(x**3)
assert acos(x + 2)._eval_nseries(x, 4, None, I) == -acos(2) - sqrt(3)*I*x/3 + sqrt(3)*I*x**2/9 - sqrt(3)*I*x**3/18 + O(x**4)
assert acos(x + 2)._eval_nseries(x, 4, None, -I) == acos(2) + sqrt(3)*I*x/3 - sqrt(3)*I*x**2/9 + sqrt(3)*I*x**3/18 + O(x**4)
assert acos(x - 2)._eval_nseries(x, 4, None, I) == acos(-2) + sqrt(3)*I*x/3 + sqrt(3)*I*x**2/9 + sqrt(3)*I*x**3/18 + O(x**4)
assert acos(x - 2)._eval_nseries(x, 4, None, -I) == -acos(-2) + 2*pi - sqrt(3)*I*x/3 - \
sqrt(3)*I*x**2/9 - sqrt(3)*I*x**3/18 + O(x**4)
# assert acos(I*x + I*x**3 + 2)._eval_nseries(x, 3, None, 1) == -acos(2) + sqrt(3)*x/3 - sqrt(3)*I*x**2/9 + O(x**3)
# assert acos(I*x + I*x**3 + 2)._eval_nseries(x, 3, None, -1) == acos(2) - sqrt(3)*x/3 + sqrt(3)*I*x**2/9 + O(x**3)
# assert acos(I*x + I*x**3 - 2)._eval_nseries(x, 3, None, 1) == acos(-2) - sqrt(3)*x/3 - sqrt(3)*I*x**2/9 + O(x**3)
# assert acos(I*x + I*x**3 - 2)._eval_nseries(x, 3, None, -1) == -acos(-2) + 2*pi + sqrt(3)*x/3 + sqrt(3)*I*x**2/9 + O(x**3)
# assert acos(I*x**2 + I*x**3 + 2)._eval_nseries(x, 3, None, 1) == -acos(2) + sqrt(3)*x**2/3 + O(x**3)
# assert acos(I*x**2 + I*x**3 + 2)._eval_nseries(x, 3, None, -1) == -acos(2) + sqrt(3)*x**2/3 + O(x**3)
# assert acos(I*x**2 + I*x**3 - 2)._eval_nseries(x, 3, None, 1) == acos(-2) - sqrt(3)*x**2/3 + O(x**3)
# assert acos(I*x**2 + I*x**3 - 2)._eval_nseries(x, 3, None, -1) == acos(-2) - sqrt(3)*x**2/3 + O(x**3)
# assert acos(1 + x)._eval_nseries(x, 3, None) == sqrt(2)*sqrt(-x) + sqrt(2)*(-x)**(S(3)/2)/12 + 3*sqrt(2)*(-x)**(S(5)/2)/160 + O(x**3)
# assert acos(-1 + x)._eval_nseries(x, 3, None) == pi - sqrt(2)*sqrt(x) - sqrt(2)*x**(S(3)/2)/12 - 3*sqrt(2)*x**(S(5)/2)/160 + O(x**3)
# assert acos(exp(x))._eval_nseries(x, 3, None) == sqrt(2)*sqrt(-x) - sqrt(2)*(-x)**(S(3)/2)/6 + sqrt(2)*(-x)**(S(5)/2)/120 + O(x**3)
# assert acos(-exp(x))._eval_nseries(x, 3, None) == pi - sqrt(2)*sqrt(-x) + sqrt(2)*(-x)**(S(3)/2)/6 - sqrt(2)*(-x)**(S(5)/2)/120 + O(x**3)
assert atan(x + 2*I)._eval_nseries(x, 4, None, 1) == I*atanh(2) - x/3 - 2*I*x**2/9 + 13*x**3/81 + O(x**4)
assert atan(x + 2*I)._eval_nseries(x, 4, None, -1) == I*atanh(2) - pi - x/3 - 2*I*x**2/9 + 13*x**3/81 + O(x**4)
assert atan(x - 2*I)._eval_nseries(x, 4, None, 1) == -I*atanh(2) + pi - x/3 + 2*I*x**2/9 + 13*x**3/81 + O(x**4)
assert atan(x - 2*I)._eval_nseries(x, 4, None, -1) == -I*atanh(2) - x/3 + 2*I*x**2/9 + 13*x**3/81 + O(x**4)
# assert atan(x**2 + 2*I)._eval_nseries(x, 3, None, 1) == I*atanh(2) - x**2/3 + O(x**3)
# assert atan(x**2 + 2*I)._eval_nseries(x, 3, None, -1) == I*atanh(2) - x**2/3 + O(x**3)
# assert atan(x**2 - 2*I)._eval_nseries(x, 3, None, 1) == -I*atanh(2) + pi - x**2/3 + O(x**3)
# assert atan(x**2 - 2*I)._eval_nseries(x, 3, None, -1) == -I*atanh(2) + pi - x**2/3 + O(x**3)
assert atan(1/x)._eval_nseries(x, 2, None, 1) == pi/2 - x + O(x**2)
assert atan(1/x)._eval_nseries(x, 2, None, -1) == -pi/2 - x + O(x**2)
assert acot(x + S(1)/2*I)._eval_nseries(x, 4, None, 1) == -I*acoth(S(1)/2) + pi - 4*x/3 + 8*I*x**2/9 + 112*x**3/81 + O(x**4)
assert acot(x + S(1)/2*I)._eval_nseries(x, 4, None, -1) == -I*acoth(S(1)/2) - 4*x/3 + 8*I*x**2/9 + 112*x**3/81 + O(x**4)
assert acot(x - S(1)/2*I)._eval_nseries(x, 4, None, 1) == I*acoth(S(1)/2) - 4*x/3 - 8*I*x**2/9 + 112*x**3/81 + O(x**4)
assert acot(x - S(1)/2*I)._eval_nseries(x, 4, None, -1) == I*acoth(S(1)/2) - pi - 4*x/3 - 8*I*x**2/9 + 112*x**3/81 + O(x**4)
# assert acot(x**2 + S(1)/2*I)._eval_nseries(x, 3, None, 1) == -I*acoth(S(1)/2) + pi - 4*x**2/3 + O(x**3)
# assert acot(x**2 + S(1)/2*I)._eval_nseries(x, 3, None, -1) == -I*acoth(S(1)/2) + pi - 4*x**2/3 + O(x**3)
# assert acot(x**2 - S(1)/2*I)._eval_nseries(x, 3, None, 1) == I*acoth(S(1)/2) - 4*x**2/3 + O(x**3)
# assert acot(x**2 - S(1)/2*I)._eval_nseries(x, 3, None, -1) == I*acoth(S(1)/2) - 4*x**2/3 + O(x**3)
# assert acot(x)._eval_nseries(x, 2, None, 1) == pi/2 - x + O(x**2)
# assert acot(x)._eval_nseries(x, 2, None, -1) == -pi/2 - x + O(x**2)
assert asec(x + S(1)/2)._eval_nseries(x, 4, None, I) == asec(S(1)/2) - 4*sqrt(3)*I*x/3 + \
8*sqrt(3)*I*x**2/9 - 16*sqrt(3)*I*x**3/9 + O(x**4)
assert asec(x + S(1)/2)._eval_nseries(x, 4, None, -I) == -asec(S(1)/2) + 4*sqrt(3)*I*x/3 - \
8*sqrt(3)*I*x**2/9 + 16*sqrt(3)*I*x**3/9 + O(x**4)
assert asec(x - S(1)/2)._eval_nseries(x, 4, None, I) == -asec(-S(1)/2) + 2*pi + 4*sqrt(3)*I*x/3 + \
8*sqrt(3)*I*x**2/9 + 16*sqrt(3)*I*x**3/9 + O(x**4)
assert asec(x - S(1)/2)._eval_nseries(x, 4, None, -I) == asec(-S(1)/2) - 4*sqrt(3)*I*x/3 - \
8*sqrt(3)*I*x**2/9 - 16*sqrt(3)*I*x**3/9 + O(x**4)
# assert asec(I*x + I*x**3 + S(1)/2)._eval_nseries(x, 3, None, 1) == asec(S(1)/2) + 4*sqrt(3)*x/3 - 8*sqrt(3)*I*x**2/9 + O(x**3)
# assert asec(I*x + I*x**3 + S(1)/2)._eval_nseries(x, 3, None, -1) == -asec(S(1)/2) - 4*sqrt(3)*x/3 + 8*sqrt(3)*I*x**2/9 + O(x**3)
# assert asec(I*x + I*x**3 - S(1)/2)._eval_nseries(x, 3, None, 1) == -asec(-S(1)/2) + 2*pi - 4*sqrt(3)*x/3 - 8*sqrt(3)*I*x**2/9 + O(x**3)
# assert asec(I*x + I*x**3 - S(1)/2)._eval_nseries(x, 3, None, -1) == asec(-S(1)/2) + 4*sqrt(3)*x/3 + 8*sqrt(3)*I*x**2/9 + O(x**3)
# assert asec(I*x**2 + I*x**3 + S(1)/2)._eval_nseries(x, 3, None, 1) == asec(S(1)/2) + 4*sqrt(3)*x**2/3 + O(x**3)
# assert asec(I*x**2 + I*x**3 + S(1)/2)._eval_nseries(x, 3, None, -1) == asec(S(1)/2) + 4*sqrt(3)*x**2/3 + O(x**3)
# assert asec(I*x**2 + I*x**3 - S(1)/2)._eval_nseries(x, 3, None, 1) == -asec(-S(1)/2) + 2*pi - 4*sqrt(3)*x**2/3 + O(x**3)
# assert asec(I*x**2 + I*x**3 - S(1)/2)._eval_nseries(x, 3, None, -1) == -asec(-S(1)/2) + 2*pi - 4*sqrt(3)*x**2/3 + O(x**3)
# assert asec(1 + x)._eval_nseries(x, 3, None) == sqrt(2)*sqrt(x) - 5*sqrt(2)*x**(S(3)/2)/12 + 43*sqrt(2)*x**(S(5)/2)/160 + O(x**3)
# assert asec(-1 + x)._eval_nseries(x, 3, None) == pi - sqrt(2)*sqrt(-x) + 5*sqrt(2)*(-x)**(S(3)/2)/12 - 43*sqrt(2)*(-x)**(S(5)/2)/160 + O(x**3)
# assert asec(exp(x))._eval_nseries(x, 3, None) == sqrt(2)*sqrt(x) - sqrt(2)*x**(S(3)/2)/6 + sqrt(2)*x**(S(5)/2)/120 + O(x**3)
# assert asec(-exp(x))._eval_nseries(x, 3, None) == pi - sqrt(2)*sqrt(x) + sqrt(2)*x**(S(3)/2)/6 - sqrt(2)*x**(S(5)/2)/120 + O(x**3)
assert acsc(x + S(1)/2)._eval_nseries(x, 4, None, I) == acsc(S(1)/2) + 4*sqrt(3)*I*x/3 - \
8*sqrt(3)*I*x**2/9 + 16*sqrt(3)*I*x**3/9 + O(x**4)
assert acsc(x + S(1)/2)._eval_nseries(x, 4, None, -I) == -acsc(S(1)/2) + pi - 4*sqrt(3)*I*x/3 + \
8*sqrt(3)*I*x**2/9 - 16*sqrt(3)*I*x**3/9 + O(x**4)
assert acsc(x - S(1)/2)._eval_nseries(x, 4, None, I) == acsc(S(1)/2) - pi - 4*sqrt(3)*I*x/3 - \
8*sqrt(3)*I*x**2/9 - 16*sqrt(3)*I*x**3/9 + O(x**4)
assert acsc(x - S(1)/2)._eval_nseries(x, 4, None, -I) == -acsc(S(1)/2) + 4*sqrt(3)*I*x/3 + \
8*sqrt(3)*I*x**2/9 + 16*sqrt(3)*I*x**3/9 + O(x**4)
# assert acsc(I*x + I*x**3 + S(1)/2)._eval_nseries(x, 3, None, 1) == acsc(S(1)/2) - 4*sqrt(3)*x/3 + 8*sqrt(3)*I*x**2/9 + O(x**3)
# assert acsc(I*x + I*x**3 + S(1)/2)._eval_nseries(x, 3, None, -1) == -acsc(S(1)/2) + pi + 4*sqrt(3)*x/3 - 8*sqrt(3)*I*x**2/9 + O(x**3)
# assert acsc(I*x + I*x**3 - S(1)/2)._eval_nseries(x, 3, None, 1) == acsc(S(1)/2) - pi + 4*sqrt(3)*x/3 + 8*sqrt(3)*I*x**2/9 + O(x**3)
# assert acsc(I*x + I*x**3 - S(1)/2)._eval_nseries(x, 3, None, -1) == -acsc(S(1)/2) - 4*sqrt(3)*x/3 - 8*sqrt(3)*I*x**2/9 + O(x**3)
# assert acsc(I*x**2 + I*x**3 + S(1)/2)._eval_nseries(x, 3, None, 1) == acsc(S(1)/2) - 4*sqrt(3)*x**2/3 + O(x**3)
# assert acsc(I*x**2 + I*x**3 + S(1)/2)._eval_nseries(x, 3, None, -1) == acsc(S(1)/2) - 4*sqrt(3)*x**2/3 + O(x**3)
# assert acsc(I*x**2 + I*x**3 - S(1)/2)._eval_nseries(x, 3, None, 1) == acsc(S(1)/2) - pi + 4*sqrt(3)*x**2/3 + O(x**3)
# assert acsc(I*x**2 + I*x**3 - S(1)/2)._eval_nseries(x, 3, None, -1) == acsc(S(1)/2) - pi + 4*sqrt(3)*x**2/3 + O(x**3)
# assert acsc(1 + x)._eval_nseries(x, 3, None) == pi/2 - sqrt(2)*sqrt(x) + 5*sqrt(2)*x**(S(3)/2)/12 - 43*sqrt(2)*x**(S(5)/2)/160 + O(x**3)
# assert acsc(-1 + x)._eval_nseries(x, 3, None) == -pi/2 + sqrt(2)*sqrt(-x) - 5*sqrt(2)*(-x)**(S(3)/2)/12 + 43*sqrt(2)*(-x)**(S(5)/2)/160 + O(x**3)
# assert acsc(exp(x))._eval_nseries(x, 3, None) == pi/2 - sqrt(2)*sqrt(x) + sqrt(2)*x**(S(3)/2)/6 - sqrt(2)*x**(S(5)/2)/120 + O(x**3)
# assert acsc(-exp(x))._eval_nseries(x, 3, None) == -pi/2 + sqrt(2)*sqrt(x) - sqrt(2)*x**(S(3)/2)/6 + sqrt(2)*x**(S(5)/2)/120 + O(x**3)
def test_issue_8653():
n = Symbol('n', integer=True)
assert sin(n).is_irrational is None
assert cos(n).is_irrational is None
assert tan(n).is_irrational is None
def test_issue_9157():
n = Symbol('n', integer=True, positive=True)
assert atan(n - 1).is_nonnegative is True
def test_trig_period():
x, y = symbols('x, y')
assert sin(x).period() == 2*pi
assert cos(x).period() == 2*pi
assert tan(x).period() == pi
assert cot(x).period() == pi
assert sec(x).period() == 2*pi
assert csc(x).period() == 2*pi
assert sin(2*x).period() == pi
assert cot(4*x - 6).period() == pi/4
assert cos((-3)*x).period() == pi*Rational(2, 3)
assert cos(x*y).period(x) == 2*pi/abs(y)
assert sin(3*x*y + 2*pi).period(y) == 2*pi/abs(3*x)
assert tan(3*x).period(y) is S.Zero
raises(NotImplementedError, lambda: sin(x**2).period(x))
def test_issue_7171():
assert sin(x).rewrite(sqrt) == sin(x)
assert sin(x).rewrite(pow) == sin(x)
def test_issue_11864():
w, k = symbols('w, k', real=True)
F = Piecewise((1, Eq(2*pi*k, 0)), (sin(pi*k)/(pi*k), True))
soln = Piecewise((1, Eq(2*pi*k, 0)), (sinc(pi*k), True))
assert F.rewrite(sinc) == soln
def test_real_assumptions():
z = Symbol('z', real=False, finite=True)
assert sin(z).is_real is None
assert cos(z).is_real is None
assert tan(z).is_real is False
assert sec(z).is_real is None
assert csc(z).is_real is None
assert cot(z).is_real is False
assert asin(p).is_real is None
assert asin(n).is_real is None
assert asec(p).is_real is None
assert asec(n).is_real is None
assert acos(p).is_real is None
assert acos(n).is_real is None
assert acsc(p).is_real is None
assert acsc(n).is_real is None
assert atan(p).is_positive is True
assert atan(n).is_negative is True
assert acot(p).is_positive is True
assert acot(n).is_negative is True
def test_issue_14320():
assert asin(sin(2)) == -2 + pi and (-pi/2 <= -2 + pi <= pi/2) and sin(2) == sin(-2 + pi)
assert asin(cos(2)) == -2 + pi/2 and (-pi/2 <= -2 + pi/2 <= pi/2) and cos(2) == sin(-2 + pi/2)
assert acos(sin(2)) == -pi/2 + 2 and (0 <= -pi/2 + 2 <= pi) and sin(2) == cos(-pi/2 + 2)
assert acos(cos(20)) == -6*pi + 20 and (0 <= -6*pi + 20 <= pi) and cos(20) == cos(-6*pi + 20)
assert acos(cos(30)) == -30 + 10*pi and (0 <= -30 + 10*pi <= pi) and cos(30) == cos(-30 + 10*pi)
assert atan(tan(17)) == -5*pi + 17 and (-pi/2 < -5*pi + 17 < pi/2) and tan(17) == tan(-5*pi + 17)
assert atan(tan(15)) == -5*pi + 15 and (-pi/2 < -5*pi + 15 < pi/2) and tan(15) == tan(-5*pi + 15)
assert atan(cot(12)) == -12 + pi*Rational(7, 2) and (-pi/2 < -12 + pi*Rational(7, 2) < pi/2) and cot(12) == tan(-12 + pi*Rational(7, 2))
assert acot(cot(15)) == -5*pi + 15 and (-pi/2 < -5*pi + 15 <= pi/2) and cot(15) == cot(-5*pi + 15)
assert acot(tan(19)) == -19 + pi*Rational(13, 2) and (-pi/2 < -19 + pi*Rational(13, 2) <= pi/2) and tan(19) == cot(-19 + pi*Rational(13, 2))
assert asec(sec(11)) == -11 + 4*pi and (0 <= -11 + 4*pi <= pi) and cos(11) == cos(-11 + 4*pi)
assert asec(csc(13)) == -13 + pi*Rational(9, 2) and (0 <= -13 + pi*Rational(9, 2) <= pi) and sin(13) == cos(-13 + pi*Rational(9, 2))
assert acsc(csc(14)) == -4*pi + 14 and (-pi/2 <= -4*pi + 14 <= pi/2) and sin(14) == sin(-4*pi + 14)
assert acsc(sec(10)) == pi*Rational(-7, 2) + 10 and (-pi/2 <= pi*Rational(-7, 2) + 10 <= pi/2) and cos(10) == sin(pi*Rational(-7, 2) + 10)
def test_issue_14543():
assert sec(2*pi + 11) == sec(11)
assert sec(2*pi - 11) == sec(11)
assert sec(pi + 11) == -sec(11)
assert sec(pi - 11) == -sec(11)
assert csc(2*pi + 17) == csc(17)
assert csc(2*pi - 17) == -csc(17)
assert csc(pi + 17) == -csc(17)
assert csc(pi - 17) == csc(17)
x = Symbol('x')
assert csc(pi/2 + x) == sec(x)
assert csc(pi/2 - x) == sec(x)
assert csc(pi*Rational(3, 2) + x) == -sec(x)
assert csc(pi*Rational(3, 2) - x) == -sec(x)
assert sec(pi/2 - x) == csc(x)
assert sec(pi/2 + x) == -csc(x)
assert sec(pi*Rational(3, 2) + x) == csc(x)
assert sec(pi*Rational(3, 2) - x) == -csc(x)
def test_as_real_imag():
# This is for https://github.com/sympy/sympy/issues/17142
# If it start failing again in irrelevant builds or in the master
# please open up the issue again.
expr = atan(I/(I + I*tan(1)))
assert expr.as_real_imag() == (expr, 0)
def test_issue_18746():
e3 = cos(S.Pi*(x/4 + 1/4))
assert e3.period() == 8
|
6a6d2337a22d743fe68e8b71af9277bb0cfa78fc02957ce6767f3e594d178b9e
|
from sympy import (
Symbol, Dummy, gamma, I, oo, nan, zoo, factorial, sqrt, Rational,
multigamma, log, polygamma, digamma, trigamma, EulerGamma, pi, uppergamma, S, expand_func,
loggamma, sin, cos, O, lowergamma, exp, erf, erfc, exp_polar, harmonic,
zeta, conjugate, Ei, im, re, tanh, Abs)
from sympy.core.expr import unchanged
from sympy.core.function import ArgumentIndexError
from sympy.testing.pytest import raises
from sympy.testing.randtest import (test_derivative_numerically as td,
random_complex_number as randcplx,
verify_numerically as tn)
x = Symbol('x')
y = Symbol('y')
n = Symbol('n', integer=True)
w = Symbol('w', real=True)
def test_gamma():
assert gamma(nan) is nan
assert gamma(oo) is oo
assert gamma(-100) is zoo
assert gamma(0) is zoo
assert gamma(-100.0) is zoo
assert gamma(1) == 1
assert gamma(2) == 1
assert gamma(3) == 2
assert gamma(102) == factorial(101)
assert gamma(S.Half) == sqrt(pi)
assert gamma(Rational(3, 2)) == sqrt(pi)*S.Half
assert gamma(Rational(5, 2)) == sqrt(pi)*Rational(3, 4)
assert gamma(Rational(7, 2)) == sqrt(pi)*Rational(15, 8)
assert gamma(Rational(-1, 2)) == -2*sqrt(pi)
assert gamma(Rational(-3, 2)) == sqrt(pi)*Rational(4, 3)
assert gamma(Rational(-5, 2)) == sqrt(pi)*Rational(-8, 15)
assert gamma(Rational(-15, 2)) == sqrt(pi)*Rational(256, 2027025)
assert gamma(Rational(
-11, 8)).expand(func=True) == Rational(64, 33)*gamma(Rational(5, 8))
assert gamma(Rational(
-10, 3)).expand(func=True) == Rational(81, 280)*gamma(Rational(2, 3))
assert gamma(Rational(
14, 3)).expand(func=True) == Rational(880, 81)*gamma(Rational(2, 3))
assert gamma(Rational(
17, 7)).expand(func=True) == Rational(30, 49)*gamma(Rational(3, 7))
assert gamma(Rational(
19, 8)).expand(func=True) == Rational(33, 64)*gamma(Rational(3, 8))
assert gamma(x).diff(x) == gamma(x)*polygamma(0, x)
assert gamma(x - 1).expand(func=True) == gamma(x)/(x - 1)
assert gamma(x + 2).expand(func=True, mul=False) == x*(x + 1)*gamma(x)
assert conjugate(gamma(x)) == gamma(conjugate(x))
assert expand_func(gamma(x + Rational(3, 2))) == \
(x + S.Half)*gamma(x + S.Half)
assert expand_func(gamma(x - S.Half)) == \
gamma(S.Half + x)/(x - S.Half)
# Test a bug:
assert expand_func(gamma(x + Rational(3, 4))) == gamma(x + Rational(3, 4))
# XXX: Not sure about these tests. I can fix them by defining e.g.
# exp_polar.is_integer but I'm not sure if that makes sense.
assert gamma(3*exp_polar(I*pi)/4).is_nonnegative is False
assert gamma(3*exp_polar(I*pi)/4).is_extended_nonpositive is True
y = Symbol('y', nonpositive=True, integer=True)
assert gamma(y).is_real == False
y = Symbol('y', positive=True, noninteger=True)
assert gamma(y).is_real == True
assert gamma(-1.0, evaluate=False).is_real == False
assert gamma(0, evaluate=False).is_real == False
assert gamma(-2, evaluate=False).is_real == False
def test_gamma_rewrite():
assert gamma(n).rewrite(factorial) == factorial(n - 1)
def test_gamma_series():
assert gamma(x + 1).series(x, 0, 3) == \
1 - EulerGamma*x + x**2*(EulerGamma**2/2 + pi**2/12) + O(x**3)
assert gamma(x).series(x, -1, 3) == \
-1/(x + 1) + EulerGamma - 1 + (x + 1)*(-1 - pi**2/12 - EulerGamma**2/2 + \
EulerGamma) + (x + 1)**2*(-1 - pi**2/12 - EulerGamma**2/2 + EulerGamma**3/6 - \
polygamma(2, 1)/6 + EulerGamma*pi**2/12 + EulerGamma) + O((x + 1)**3, (x, -1))
def tn_branch(s, func):
from sympy import I, pi, exp_polar
from random import uniform
c = uniform(1, 5)
expr = func(s, c*exp_polar(I*pi)) - func(s, c*exp_polar(-I*pi))
eps = 1e-15
expr2 = func(s + eps, -c + eps*I) - func(s + eps, -c - eps*I)
return abs(expr.n() - expr2.n()).n() < 1e-10
def test_lowergamma():
from sympy import meijerg, exp_polar, I, expint
assert lowergamma(x, 0) == 0
assert lowergamma(x, y).diff(y) == y**(x - 1)*exp(-y)
assert td(lowergamma(randcplx(), y), y)
assert td(lowergamma(x, randcplx()), x)
assert lowergamma(x, y).diff(x) == \
gamma(x)*digamma(x) - uppergamma(x, y)*log(y) \
- meijerg([], [1, 1], [0, 0, x], [], y)
assert lowergamma(S.Half, x) == sqrt(pi)*erf(sqrt(x))
assert not lowergamma(S.Half - 3, x).has(lowergamma)
assert not lowergamma(S.Half + 3, x).has(lowergamma)
assert lowergamma(S.Half, x, evaluate=False).has(lowergamma)
assert tn(lowergamma(S.Half + 3, x, evaluate=False),
lowergamma(S.Half + 3, x), x)
assert tn(lowergamma(S.Half - 3, x, evaluate=False),
lowergamma(S.Half - 3, x), x)
assert tn_branch(-3, lowergamma)
assert tn_branch(-4, lowergamma)
assert tn_branch(Rational(1, 3), lowergamma)
assert tn_branch(pi, lowergamma)
assert lowergamma(3, exp_polar(4*pi*I)*x) == lowergamma(3, x)
assert lowergamma(y, exp_polar(5*pi*I)*x) == \
exp(4*I*pi*y)*lowergamma(y, x*exp_polar(pi*I))
assert lowergamma(-2, exp_polar(5*pi*I)*x) == \
lowergamma(-2, x*exp_polar(I*pi)) + 2*pi*I
assert conjugate(lowergamma(x, y)) == lowergamma(conjugate(x), conjugate(y))
assert conjugate(lowergamma(x, 0)) == 0
assert unchanged(conjugate, lowergamma(x, -oo))
assert lowergamma(
x, y).rewrite(expint) == -y**x*expint(-x + 1, y) + gamma(x)
k = Symbol('k', integer=True)
assert lowergamma(
k, y).rewrite(expint) == -y**k*expint(-k + 1, y) + gamma(k)
k = Symbol('k', integer=True, positive=False)
assert lowergamma(k, y).rewrite(expint) == lowergamma(k, y)
assert lowergamma(x, y).rewrite(uppergamma) == gamma(x) - uppergamma(x, y)
assert lowergamma(70, 6) == factorial(69) - 69035724522603011058660187038367026272747334489677105069435923032634389419656200387949342530805432320 * exp(-6)
assert (lowergamma(S(77) / 2, 6) - lowergamma(S(77) / 2, 6, evaluate=False)).evalf() < 1e-16
assert (lowergamma(-S(77) / 2, 6) - lowergamma(-S(77) / 2, 6, evaluate=False)).evalf() < 1e-16
def test_uppergamma():
from sympy import meijerg, exp_polar, I, expint
assert uppergamma(4, 0) == 6
assert uppergamma(x, y).diff(y) == -y**(x - 1)*exp(-y)
assert td(uppergamma(randcplx(), y), y)
assert uppergamma(x, y).diff(x) == \
uppergamma(x, y)*log(y) + meijerg([], [1, 1], [0, 0, x], [], y)
assert td(uppergamma(x, randcplx()), x)
p = Symbol('p', positive=True)
assert uppergamma(0, p) == -Ei(-p)
assert uppergamma(p, 0) == gamma(p)
assert uppergamma(S.Half, x) == sqrt(pi)*erfc(sqrt(x))
assert not uppergamma(S.Half - 3, x).has(uppergamma)
assert not uppergamma(S.Half + 3, x).has(uppergamma)
assert uppergamma(S.Half, x, evaluate=False).has(uppergamma)
assert tn(uppergamma(S.Half + 3, x, evaluate=False),
uppergamma(S.Half + 3, x), x)
assert tn(uppergamma(S.Half - 3, x, evaluate=False),
uppergamma(S.Half - 3, x), x)
assert unchanged(uppergamma, x, -oo)
assert unchanged(uppergamma, x, 0)
assert tn_branch(-3, uppergamma)
assert tn_branch(-4, uppergamma)
assert tn_branch(Rational(1, 3), uppergamma)
assert tn_branch(pi, uppergamma)
assert uppergamma(3, exp_polar(4*pi*I)*x) == uppergamma(3, x)
assert uppergamma(y, exp_polar(5*pi*I)*x) == \
exp(4*I*pi*y)*uppergamma(y, x*exp_polar(pi*I)) + \
gamma(y)*(1 - exp(4*pi*I*y))
assert uppergamma(-2, exp_polar(5*pi*I)*x) == \
uppergamma(-2, x*exp_polar(I*pi)) - 2*pi*I
assert uppergamma(-2, x) == expint(3, x)/x**2
assert conjugate(uppergamma(x, y)) == uppergamma(conjugate(x), conjugate(y))
assert unchanged(conjugate, uppergamma(x, -oo))
assert uppergamma(x, y).rewrite(expint) == y**x*expint(-x + 1, y)
assert uppergamma(x, y).rewrite(lowergamma) == gamma(x) - lowergamma(x, y)
assert uppergamma(70, 6) == 69035724522603011058660187038367026272747334489677105069435923032634389419656200387949342530805432320*exp(-6)
assert (uppergamma(S(77) / 2, 6) - uppergamma(S(77) / 2, 6, evaluate=False)).evalf() < 1e-16
assert (uppergamma(-S(77) / 2, 6) - uppergamma(-S(77) / 2, 6, evaluate=False)).evalf() < 1e-16
def test_polygamma():
from sympy import I
assert polygamma(n, nan) is nan
assert polygamma(0, oo) is oo
assert polygamma(0, -oo) is oo
assert polygamma(0, I*oo) is oo
assert polygamma(0, -I*oo) is oo
assert polygamma(1, oo) == 0
assert polygamma(5, oo) == 0
assert polygamma(0, -9) is zoo
assert polygamma(0, -9) is zoo
assert polygamma(0, -1) is zoo
assert polygamma(0, 0) is zoo
assert polygamma(0, 1) == -EulerGamma
assert polygamma(0, 7) == Rational(49, 20) - EulerGamma
assert polygamma(1, 1) == pi**2/6
assert polygamma(1, 2) == pi**2/6 - 1
assert polygamma(1, 3) == pi**2/6 - Rational(5, 4)
assert polygamma(3, 1) == pi**4 / 15
assert polygamma(3, 5) == 6*(Rational(-22369, 20736) + pi**4/90)
assert polygamma(5, 1) == 8 * pi**6 / 63
assert polygamma(1, S.Half) == pi**2 / 2
assert polygamma(2, S.Half) == -14*zeta(3)
assert polygamma(11, S.Half) == 176896*pi**12
def t(m, n):
x = S(m)/n
r = polygamma(0, x)
if r.has(polygamma):
return False
return abs(polygamma(0, x.n()).n() - r.n()).n() < 1e-10
assert t(1, 2)
assert t(3, 2)
assert t(-1, 2)
assert t(1, 4)
assert t(-3, 4)
assert t(1, 3)
assert t(4, 3)
assert t(3, 4)
assert t(2, 3)
assert t(123, 5)
assert polygamma(0, x).rewrite(zeta) == polygamma(0, x)
assert polygamma(1, x).rewrite(zeta) == zeta(2, x)
assert polygamma(2, x).rewrite(zeta) == -2*zeta(3, x)
assert polygamma(I, 2).rewrite(zeta) == polygamma(I, 2)
n1 = Symbol('n1')
n2 = Symbol('n2', real=True)
n3 = Symbol('n3', integer=True)
n4 = Symbol('n4', positive=True)
n5 = Symbol('n5', positive=True, integer=True)
assert polygamma(n1, x).rewrite(zeta) == polygamma(n1, x)
assert polygamma(n2, x).rewrite(zeta) == polygamma(n2, x)
assert polygamma(n3, x).rewrite(zeta) == polygamma(n3, x)
assert polygamma(n4, x).rewrite(zeta) == polygamma(n4, x)
assert polygamma(n5, x).rewrite(zeta) == (-1)**(n5 + 1) * factorial(n5) * zeta(n5 + 1, x)
assert polygamma(3, 7*x).diff(x) == 7*polygamma(4, 7*x)
assert polygamma(0, x).rewrite(harmonic) == harmonic(x - 1) - EulerGamma
assert polygamma(2, x).rewrite(harmonic) == 2*harmonic(x - 1, 3) - 2*zeta(3)
ni = Symbol("n", integer=True)
assert polygamma(ni, x).rewrite(harmonic) == (-1)**(ni + 1)*(-harmonic(x - 1, ni + 1)
+ zeta(ni + 1))*factorial(ni)
# Polygamma of non-negative integer order is unbranched:
from sympy import exp_polar
k = Symbol('n', integer=True, nonnegative=True)
assert polygamma(k, exp_polar(2*I*pi)*x) == polygamma(k, x)
# but negative integers are branched!
k = Symbol('n', integer=True)
assert polygamma(k, exp_polar(2*I*pi)*x).args == (k, exp_polar(2*I*pi)*x)
# Polygamma of order -1 is loggamma:
assert polygamma(-1, x) == loggamma(x)
# But smaller orders are iterated integrals and don't have a special name
assert polygamma(-2, x).func is polygamma
# Test a bug
assert polygamma(0, -x).expand(func=True) == polygamma(0, -x)
assert polygamma(2, 2.5).is_positive == False
assert polygamma(2, -2.5).is_positive == False
assert polygamma(3, 2.5).is_positive == True
assert polygamma(3, -2.5).is_positive is True
assert polygamma(-2, -2.5).is_positive is None
assert polygamma(-3, -2.5).is_positive is None
assert polygamma(2, 2.5).is_negative == True
assert polygamma(3, 2.5).is_negative == False
assert polygamma(3, -2.5).is_negative == False
assert polygamma(2, -2.5).is_negative is True
assert polygamma(-2, -2.5).is_negative is None
assert polygamma(-3, -2.5).is_negative is None
assert polygamma(I, 2).is_positive is None
assert polygamma(I, 3).is_negative is None
# issue 17350
assert polygamma(pi, 3).evalf() == polygamma(pi, 3)
assert (I*polygamma(I, pi)).as_real_imag() == \
(-im(polygamma(I, pi)), re(polygamma(I, pi)))
assert (tanh(polygamma(I, 1))).rewrite(exp) == \
(exp(polygamma(I, 1)) - exp(-polygamma(I, 1)))/(exp(polygamma(I, 1)) + exp(-polygamma(I, 1)))
assert (I / polygamma(I, 4)).rewrite(exp) == \
I*sqrt(re(polygamma(I, 4))**2 + im(polygamma(I, 4))**2)\
/((re(polygamma(I, 4)) + I*im(polygamma(I, 4)))*Abs(polygamma(I, 4)))
assert unchanged(polygamma, 2.3, 1.0)
# issue 12569
assert unchanged(im, polygamma(0, I))
assert polygamma(Symbol('a', positive=True), Symbol('b', positive=True)).is_real is True
assert polygamma(0, I).is_real is None
def test_polygamma_expand_func():
assert polygamma(0, x).expand(func=True) == polygamma(0, x)
assert polygamma(0, 2*x).expand(func=True) == \
polygamma(0, x)/2 + polygamma(0, S.Half + x)/2 + log(2)
assert polygamma(1, 2*x).expand(func=True) == \
polygamma(1, x)/4 + polygamma(1, S.Half + x)/4
assert polygamma(2, x).expand(func=True) == \
polygamma(2, x)
assert polygamma(0, -1 + x).expand(func=True) == \
polygamma(0, x) - 1/(x - 1)
assert polygamma(0, 1 + x).expand(func=True) == \
1/x + polygamma(0, x )
assert polygamma(0, 2 + x).expand(func=True) == \
1/x + 1/(1 + x) + polygamma(0, x)
assert polygamma(0, 3 + x).expand(func=True) == \
polygamma(0, x) + 1/x + 1/(1 + x) + 1/(2 + x)
assert polygamma(0, 4 + x).expand(func=True) == \
polygamma(0, x) + 1/x + 1/(1 + x) + 1/(2 + x) + 1/(3 + x)
assert polygamma(1, 1 + x).expand(func=True) == \
polygamma(1, x) - 1/x**2
assert polygamma(1, 2 + x).expand(func=True, multinomial=False) == \
polygamma(1, x) - 1/x**2 - 1/(1 + x)**2
assert polygamma(1, 3 + x).expand(func=True, multinomial=False) == \
polygamma(1, x) - 1/x**2 - 1/(1 + x)**2 - 1/(2 + x)**2
assert polygamma(1, 4 + x).expand(func=True, multinomial=False) == \
polygamma(1, x) - 1/x**2 - 1/(1 + x)**2 - \
1/(2 + x)**2 - 1/(3 + x)**2
assert polygamma(0, x + y).expand(func=True) == \
polygamma(0, x + y)
assert polygamma(1, x + y).expand(func=True) == \
polygamma(1, x + y)
assert polygamma(1, 3 + 4*x + y).expand(func=True, multinomial=False) == \
polygamma(1, y + 4*x) - 1/(y + 4*x)**2 - \
1/(1 + y + 4*x)**2 - 1/(2 + y + 4*x)**2
assert polygamma(3, 3 + 4*x + y).expand(func=True, multinomial=False) == \
polygamma(3, y + 4*x) - 6/(y + 4*x)**4 - \
6/(1 + y + 4*x)**4 - 6/(2 + y + 4*x)**4
assert polygamma(3, 4*x + y + 1).expand(func=True, multinomial=False) == \
polygamma(3, y + 4*x) - 6/(y + 4*x)**4
e = polygamma(3, 4*x + y + Rational(3, 2))
assert e.expand(func=True) == e
e = polygamma(3, x + y + Rational(3, 4))
assert e.expand(func=True, basic=False) == e
def test_digamma():
from sympy import I
assert digamma(nan) == nan
assert digamma(oo) == oo
assert digamma(-oo) == oo
assert digamma(I*oo) == oo
assert digamma(-I*oo) == oo
assert digamma(-9) == zoo
assert digamma(-9) == zoo
assert digamma(-1) == zoo
assert digamma(0) == zoo
assert digamma(1) == -EulerGamma
assert digamma(7) == Rational(49, 20) - EulerGamma
def t(m, n):
x = S(m)/n
r = digamma(x)
if r.has(digamma):
return False
return abs(digamma(x.n()).n() - r.n()).n() < 1e-10
assert t(1, 2)
assert t(3, 2)
assert t(-1, 2)
assert t(1, 4)
assert t(-3, 4)
assert t(1, 3)
assert t(4, 3)
assert t(3, 4)
assert t(2, 3)
assert t(123, 5)
assert digamma(x).rewrite(zeta) == polygamma(0, x)
assert digamma(x).rewrite(harmonic) == harmonic(x - 1) - EulerGamma
assert digamma(I).is_real is None
assert digamma(x,evaluate=False).fdiff() == polygamma(1, x)
assert digamma(x,evaluate=False).is_real is None
assert digamma(x,evaluate=False).is_positive is None
assert digamma(x,evaluate=False).is_negative is None
assert digamma(x,evaluate=False).rewrite(polygamma) == polygamma(0, x)
def test_digamma_expand_func():
assert digamma(x).expand(func=True) == polygamma(0, x)
assert digamma(2*x).expand(func=True) == \
polygamma(0, x)/2 + polygamma(0, Rational(1, 2) + x)/2 + log(2)
assert digamma(-1 + x).expand(func=True) == \
polygamma(0, x) - 1/(x - 1)
assert digamma(1 + x).expand(func=True) == \
1/x + polygamma(0, x )
assert digamma(2 + x).expand(func=True) == \
1/x + 1/(1 + x) + polygamma(0, x)
assert digamma(3 + x).expand(func=True) == \
polygamma(0, x) + 1/x + 1/(1 + x) + 1/(2 + x)
assert digamma(4 + x).expand(func=True) == \
polygamma(0, x) + 1/x + 1/(1 + x) + 1/(2 + x) + 1/(3 + x)
assert digamma(x + y).expand(func=True) == \
polygamma(0, x + y)
def test_trigamma():
assert trigamma(nan) == nan
assert trigamma(oo) == 0
assert trigamma(1) == pi**2/6
assert trigamma(2) == pi**2/6 - 1
assert trigamma(3) == pi**2/6 - Rational(5, 4)
assert trigamma(x, evaluate=False).rewrite(zeta) == zeta(2, x)
assert trigamma(x, evaluate=False).rewrite(harmonic) == \
trigamma(x).rewrite(polygamma).rewrite(harmonic)
assert trigamma(x,evaluate=False).fdiff() == polygamma(2, x)
assert trigamma(x,evaluate=False).is_real is None
assert trigamma(x,evaluate=False).is_positive is None
assert trigamma(x,evaluate=False).is_negative is None
assert trigamma(x,evaluate=False).rewrite(polygamma) == polygamma(1, x)
def test_trigamma_expand_func():
assert trigamma(2*x).expand(func=True) == \
polygamma(1, x)/4 + polygamma(1, Rational(1, 2) + x)/4
assert trigamma(1 + x).expand(func=True) == \
polygamma(1, x) - 1/x**2
assert trigamma(2 + x).expand(func=True, multinomial=False) == \
polygamma(1, x) - 1/x**2 - 1/(1 + x)**2
assert trigamma(3 + x).expand(func=True, multinomial=False) == \
polygamma(1, x) - 1/x**2 - 1/(1 + x)**2 - 1/(2 + x)**2
assert trigamma(4 + x).expand(func=True, multinomial=False) == \
polygamma(1, x) - 1/x**2 - 1/(1 + x)**2 - \
1/(2 + x)**2 - 1/(3 + x)**2
assert trigamma(x + y).expand(func=True) == \
polygamma(1, x + y)
assert trigamma(3 + 4*x + y).expand(func=True, multinomial=False) == \
polygamma(1, y + 4*x) - 1/(y + 4*x)**2 - \
1/(1 + y + 4*x)**2 - 1/(2 + y + 4*x)**2
def test_loggamma():
raises(TypeError, lambda: loggamma(2, 3))
raises(ArgumentIndexError, lambda: loggamma(x).fdiff(2))
assert loggamma(-1) is oo
assert loggamma(-2) is oo
assert loggamma(0) is oo
assert loggamma(1) == 0
assert loggamma(2) == 0
assert loggamma(3) == log(2)
assert loggamma(4) == log(6)
n = Symbol("n", integer=True, positive=True)
assert loggamma(n) == log(gamma(n))
assert loggamma(-n) is oo
assert loggamma(n/2) == log(2**(-n + 1)*sqrt(pi)*gamma(n)/gamma(n/2 + S.Half))
from sympy import I
assert loggamma(oo) is oo
assert loggamma(-oo) is zoo
assert loggamma(I*oo) is zoo
assert loggamma(-I*oo) is zoo
assert loggamma(zoo) is zoo
assert loggamma(nan) is nan
L = loggamma(Rational(16, 3))
E = -5*log(3) + loggamma(Rational(1, 3)) + log(4) + log(7) + log(10) + log(13)
assert expand_func(L).doit() == E
assert L.n() == E.n()
L = loggamma(Rational(19, 4))
E = -4*log(4) + loggamma(Rational(3, 4)) + log(3) + log(7) + log(11) + log(15)
assert expand_func(L).doit() == E
assert L.n() == E.n()
L = loggamma(Rational(23, 7))
E = -3*log(7) + log(2) + loggamma(Rational(2, 7)) + log(9) + log(16)
assert expand_func(L).doit() == E
assert L.n() == E.n()
L = loggamma(Rational(19, 4) - 7)
E = -log(9) - log(5) + loggamma(Rational(3, 4)) + 3*log(4) - 3*I*pi
assert expand_func(L).doit() == E
assert L.n() == E.n()
L = loggamma(Rational(23, 7) - 6)
E = -log(19) - log(12) - log(5) + loggamma(Rational(2, 7)) + 3*log(7) - 3*I*pi
assert expand_func(L).doit() == E
assert L.n() == E.n()
assert loggamma(x).diff(x) == polygamma(0, x)
s1 = loggamma(1/(x + sin(x)) + cos(x)).nseries(x, n=4)
s2 = (-log(2*x) - 1)/(2*x) - log(x/pi)/2 + (4 - log(2*x))*x/24 + O(x**2) + \
log(x)*x**2/2
assert (s1 - s2).expand(force=True).removeO() == 0
s1 = loggamma(1/x).series(x)
s2 = (1/x - S.Half)*log(1/x) - 1/x + log(2*pi)/2 + \
x/12 - x**3/360 + x**5/1260 + O(x**7)
assert ((s1 - s2).expand(force=True)).removeO() == 0
assert loggamma(x).rewrite('intractable') == log(gamma(x))
s1 = loggamma(x).series(x).cancel()
assert s1 == -log(x) - EulerGamma*x + pi**2*x**2/12 + x**3*polygamma(2, 1)/6 + \
pi**4*x**4/360 + x**5*polygamma(4, 1)/120 + O(x**6)
assert s1 == loggamma(x).rewrite('intractable').series(x).cancel()
assert conjugate(loggamma(x)) == loggamma(conjugate(x))
assert conjugate(loggamma(0)) is oo
assert conjugate(loggamma(1)) == loggamma(conjugate(1))
assert conjugate(loggamma(-oo)) == conjugate(zoo)
assert loggamma(Symbol('v', positive=True)).is_real is True
assert loggamma(Symbol('v', zero=True)).is_real is False
assert loggamma(Symbol('v', negative=True)).is_real is False
assert loggamma(Symbol('v', nonpositive=True)).is_real is False
assert loggamma(Symbol('v', nonnegative=True)).is_real is None
assert loggamma(Symbol('v', imaginary=True)).is_real is None
assert loggamma(Symbol('v', real=True)).is_real is None
assert loggamma(Symbol('v')).is_real is None
assert loggamma(S.Half).is_real is True
assert loggamma(0).is_real is False
assert loggamma(Rational(-1, 2)).is_real is False
assert loggamma(I).is_real is None
assert loggamma(2 + 3*I).is_real is None
def tN(N, M):
assert loggamma(1/x)._eval_nseries(x, n=N).getn() == M
tN(0, 0)
tN(1, 1)
tN(2, 2)
tN(3, 3)
tN(4, 4)
tN(5, 5)
def test_polygamma_expansion():
# A. & S., pa. 259 and 260
assert polygamma(0, 1/x).nseries(x, n=3) == \
-log(x) - x/2 - x**2/12 + O(x**3)
assert polygamma(1, 1/x).series(x, n=5) == \
x + x**2/2 + x**3/6 + O(x**5)
assert polygamma(3, 1/x).nseries(x, n=11) == \
2*x**3 + 3*x**4 + 2*x**5 - x**7 + 4*x**9/3 + O(x**11)
def test_issue_8657():
n = Symbol('n', negative=True, integer=True)
m = Symbol('m', integer=True)
o = Symbol('o', positive=True)
p = Symbol('p', negative=True, integer=False)
assert gamma(n).is_real is False
assert gamma(m).is_real is None
assert gamma(o).is_real is True
assert gamma(p).is_real is True
assert gamma(w).is_real is None
def test_issue_8524():
x = Symbol('x', positive=True)
y = Symbol('y', negative=True)
z = Symbol('z', positive=False)
p = Symbol('p', negative=False)
q = Symbol('q', integer=True)
r = Symbol('r', integer=False)
e = Symbol('e', even=True, negative=True)
assert gamma(x).is_positive is True
assert gamma(y).is_positive is None
assert gamma(z).is_positive is None
assert gamma(p).is_positive is None
assert gamma(q).is_positive is None
assert gamma(r).is_positive is None
assert gamma(e + S.Half).is_positive is True
assert gamma(e - S.Half).is_positive is False
def test_issue_14450():
assert uppergamma(Rational(3, 8), x).evalf() == uppergamma(Rational(3, 8), x)
assert lowergamma(x, Rational(3, 8)).evalf() == lowergamma(x, Rational(3, 8))
# some values from Wolfram Alpha for comparison
assert abs(uppergamma(Rational(3, 8), 2).evalf() - 0.07105675881) < 1e-9
assert abs(lowergamma(Rational(3, 8), 2).evalf() - 2.2993794256) < 1e-9
def test_issue_14528():
k = Symbol('k', integer=True, nonpositive=True)
assert isinstance(gamma(k), gamma)
def test_multigamma():
from sympy import Product
p = Symbol('p')
_k = Dummy('_k')
assert multigamma(x, p).dummy_eq(pi**(p*(p - 1)/4)*\
Product(gamma(x + (1 - _k)/2), (_k, 1, p)))
assert conjugate(multigamma(x, p)).dummy_eq(pi**((conjugate(p) - 1)*\
conjugate(p)/4)*Product(gamma(conjugate(x) + (1-conjugate(_k))/2), (_k, 1, p)))
assert conjugate(multigamma(x, 1)) == gamma(conjugate(x))
p = Symbol('p', positive=True)
assert conjugate(multigamma(x, p)).dummy_eq(pi**((p - 1)*p/4)*\
Product(gamma(conjugate(x) + (1-conjugate(_k))/2), (_k, 1, p)))
assert multigamma(nan, 1) is nan
assert multigamma(oo, 1).doit() is oo
assert multigamma(1, 1) == 1
assert multigamma(2, 1) == 1
assert multigamma(3, 1) == 2
assert multigamma(102, 1) == factorial(101)
assert multigamma(S.Half, 1) == sqrt(pi)
assert multigamma(1, 2) == pi
assert multigamma(2, 2) == pi/2
assert multigamma(1, 3) is zoo
assert multigamma(2, 3) == pi**2/2
assert multigamma(3, 3) == 3*pi**2/2
assert multigamma(x, 1).diff(x) == gamma(x)*polygamma(0, x)
assert multigamma(x, 2).diff(x) == sqrt(pi)*gamma(x)*gamma(x - S.Half)*\
polygamma(0, x) + sqrt(pi)*gamma(x)*gamma(x - S.Half)*polygamma(0, x - S.Half)
assert multigamma(x - 1, 1).expand(func=True) == gamma(x)/(x - 1)
assert multigamma(x + 2, 1).expand(func=True, mul=False) == x*(x + 1)*\
gamma(x)
assert multigamma(x - 1, 2).expand(func=True) == sqrt(pi)*gamma(x)*\
gamma(x + S.Half)/(x**3 - 3*x**2 + x*Rational(11, 4) - Rational(3, 4))
assert multigamma(x - 1, 3).expand(func=True) == pi**Rational(3, 2)*gamma(x)**2*\
gamma(x + S.Half)/(x**5 - 6*x**4 + 55*x**3/4 - 15*x**2 + x*Rational(31, 4) - Rational(3, 2))
assert multigamma(n, 1).rewrite(factorial) == factorial(n - 1)
assert multigamma(n, 2).rewrite(factorial) == sqrt(pi)*\
factorial(n - Rational(3, 2))*factorial(n - 1)
assert multigamma(n, 3).rewrite(factorial) == pi**Rational(3, 2)*\
factorial(n - 2)*factorial(n - Rational(3, 2))*factorial(n - 1)
assert multigamma(Rational(-1, 2), 3, evaluate=False).is_real == False
assert multigamma(S.Half, 3, evaluate=False).is_real == False
assert multigamma(0, 1, evaluate=False).is_real == False
assert multigamma(1, 3, evaluate=False).is_real == False
assert multigamma(-1.0, 3, evaluate=False).is_real == False
assert multigamma(0.7, 3, evaluate=False).is_real == True
assert multigamma(3, 3, evaluate=False).is_real == True
def test_gamma_as_leading_term():
assert gamma(x).as_leading_term(x) == 1/x
assert gamma(2 + x).as_leading_term(x) == S(1)
assert gamma(cos(x)).as_leading_term(x) == S(1)
assert gamma(sin(x)).as_leading_term(x) == 1/x
|
a6bd044050383bc13be6ac240ae9f715650dd35d789961707d6a0a9d6c79b170
|
r"""
This module contains :py:meth:`~sympy.solvers.ode.dsolve` and different helper
functions that it uses.
:py:meth:`~sympy.solvers.ode.dsolve` solves ordinary differential equations.
See the docstring on the various functions for their uses. Note that partial
differential equations support is in ``pde.py``. Note that hint functions
have docstrings describing their various methods, but they are intended for
internal use. Use ``dsolve(ode, func, hint=hint)`` to solve an ODE using a
specific hint. See also the docstring on
:py:meth:`~sympy.solvers.ode.dsolve`.
**Functions in this module**
These are the user functions in this module:
- :py:meth:`~sympy.solvers.ode.dsolve` - Solves ODEs.
- :py:meth:`~sympy.solvers.ode.classify_ode` - Classifies ODEs into
possible hints for :py:meth:`~sympy.solvers.ode.dsolve`.
- :py:meth:`~sympy.solvers.ode.checkodesol` - Checks if an equation is the
solution to an ODE.
- :py:meth:`~sympy.solvers.ode.homogeneous_order` - Returns the
homogeneous order of an expression.
- :py:meth:`~sympy.solvers.ode.infinitesimals` - Returns the infinitesimals
of the Lie group of point transformations of an ODE, such that it is
invariant.
- :py:meth:`~sympy.solvers.ode.checkinfsol` - Checks if the given infinitesimals
are the actual infinitesimals of a first order ODE.
These are the non-solver helper functions that are for internal use. The
user should use the various options to
:py:meth:`~sympy.solvers.ode.dsolve` to obtain the functionality provided
by these functions:
- :py:meth:`~sympy.solvers.ode.ode.odesimp` - Does all forms of ODE
simplification.
- :py:meth:`~sympy.solvers.ode.ode.ode_sol_simplicity` - A key function for
comparing solutions by simplicity.
- :py:meth:`~sympy.solvers.ode.constantsimp` - Simplifies arbitrary
constants.
- :py:meth:`~sympy.solvers.ode.ode.constant_renumber` - Renumber arbitrary
constants.
- :py:meth:`~sympy.solvers.ode.ode._handle_Integral` - Evaluate unevaluated
Integrals.
See also the docstrings of these functions.
**Currently implemented solver methods**
The following methods are implemented for solving ordinary differential
equations. See the docstrings of the various hint functions for more
information on each (run ``help(ode)``):
- 1st order separable differential equations.
- 1st order differential equations whose coefficients or `dx` and `dy` are
functions homogeneous of the same order.
- 1st order exact differential equations.
- 1st order linear differential equations.
- 1st order Bernoulli differential equations.
- Power series solutions for first order differential equations.
- Lie Group method of solving first order differential equations.
- 2nd order Liouville differential equations.
- Power series solutions for second order differential equations
at ordinary and regular singular points.
- `n`\th order differential equation that can be solved with algebraic
rearrangement and integration.
- `n`\th order linear homogeneous differential equation with constant
coefficients.
- `n`\th order linear inhomogeneous differential equation with constant
coefficients using the method of undetermined coefficients.
- `n`\th order linear inhomogeneous differential equation with constant
coefficients using the method of variation of parameters.
**Philosophy behind this module**
This module is designed to make it easy to add new ODE solving methods without
having to mess with the solving code for other methods. The idea is that
there is a :py:meth:`~sympy.solvers.ode.classify_ode` function, which takes in
an ODE and tells you what hints, if any, will solve the ODE. It does this
without attempting to solve the ODE, so it is fast. Each solving method is a
hint, and it has its own function, named ``ode_<hint>``. That function takes
in the ODE and any match expression gathered by
:py:meth:`~sympy.solvers.ode.classify_ode` and returns a solved result. If
this result has any integrals in it, the hint function will return an
unevaluated :py:class:`~sympy.integrals.integrals.Integral` class.
:py:meth:`~sympy.solvers.ode.dsolve`, which is the user wrapper function
around all of this, will then call :py:meth:`~sympy.solvers.ode.ode.odesimp` on
the result, which, among other things, will attempt to solve the equation for
the dependent variable (the function we are solving for), simplify the
arbitrary constants in the expression, and evaluate any integrals, if the hint
allows it.
**How to add new solution methods**
If you have an ODE that you want :py:meth:`~sympy.solvers.ode.dsolve` to be
able to solve, try to avoid adding special case code here. Instead, try
finding a general method that will solve your ODE, as well as others. This
way, the :py:mod:`~sympy.solvers.ode` module will become more robust, and
unhindered by special case hacks. WolphramAlpha and Maple's
DETools[odeadvisor] function are two resources you can use to classify a
specific ODE. It is also better for a method to work with an `n`\th order ODE
instead of only with specific orders, if possible.
To add a new method, there are a few things that you need to do. First, you
need a hint name for your method. Try to name your hint so that it is
unambiguous with all other methods, including ones that may not be implemented
yet. If your method uses integrals, also include a ``hint_Integral`` hint.
If there is more than one way to solve ODEs with your method, include a hint
for each one, as well as a ``<hint>_best`` hint. Your ``ode_<hint>_best()``
function should choose the best using min with ``ode_sol_simplicity`` as the
key argument. See
:py:meth:`~sympy.solvers.ode.ode.ode_1st_homogeneous_coeff_best`, for example.
The function that uses your method will be called ``ode_<hint>()``, so the
hint must only use characters that are allowed in a Python function name
(alphanumeric characters and the underscore '``_``' character). Include a
function for every hint, except for ``_Integral`` hints
(:py:meth:`~sympy.solvers.ode.dsolve` takes care of those automatically).
Hint names should be all lowercase, unless a word is commonly capitalized
(such as Integral or Bernoulli). If you have a hint that you do not want to
run with ``all_Integral`` that doesn't have an ``_Integral`` counterpart (such
as a best hint that would defeat the purpose of ``all_Integral``), you will
need to remove it manually in the :py:meth:`~sympy.solvers.ode.dsolve` code.
See also the :py:meth:`~sympy.solvers.ode.classify_ode` docstring for
guidelines on writing a hint name.
Determine *in general* how the solutions returned by your method compare with
other methods that can potentially solve the same ODEs. Then, put your hints
in the :py:data:`~sympy.solvers.ode.allhints` tuple in the order that they
should be called. The ordering of this tuple determines which hints are
default. Note that exceptions are ok, because it is easy for the user to
choose individual hints with :py:meth:`~sympy.solvers.ode.dsolve`. In
general, ``_Integral`` variants should go at the end of the list, and
``_best`` variants should go before the various hints they apply to. For
example, the ``undetermined_coefficients`` hint comes before the
``variation_of_parameters`` hint because, even though variation of parameters
is more general than undetermined coefficients, undetermined coefficients
generally returns cleaner results for the ODEs that it can solve than
variation of parameters does, and it does not require integration, so it is
much faster.
Next, you need to have a match expression or a function that matches the type
of the ODE, which you should put in :py:meth:`~sympy.solvers.ode.classify_ode`
(if the match function is more than just a few lines, like
:py:meth:`~sympy.solvers.ode.ode._undetermined_coefficients_match`, it should go
outside of :py:meth:`~sympy.solvers.ode.classify_ode`). It should match the
ODE without solving for it as much as possible, so that
:py:meth:`~sympy.solvers.ode.classify_ode` remains fast and is not hindered by
bugs in solving code. Be sure to consider corner cases. For example, if your
solution method involves dividing by something, make sure you exclude the case
where that division will be 0.
In most cases, the matching of the ODE will also give you the various parts
that you need to solve it. You should put that in a dictionary (``.match()``
will do this for you), and add that as ``matching_hints['hint'] = matchdict``
in the relevant part of :py:meth:`~sympy.solvers.ode.classify_ode`.
:py:meth:`~sympy.solvers.ode.classify_ode` will then send this to
:py:meth:`~sympy.solvers.ode.dsolve`, which will send it to your function as
the ``match`` argument. Your function should be named ``ode_<hint>(eq, func,
order, match)`. If you need to send more information, put it in the ``match``
dictionary. For example, if you had to substitute in a dummy variable in
:py:meth:`~sympy.solvers.ode.classify_ode` to match the ODE, you will need to
pass it to your function using the `match` dict to access it. You can access
the independent variable using ``func.args[0]``, and the dependent variable
(the function you are trying to solve for) as ``func.func``. If, while trying
to solve the ODE, you find that you cannot, raise ``NotImplementedError``.
:py:meth:`~sympy.solvers.ode.dsolve` will catch this error with the ``all``
meta-hint, rather than causing the whole routine to fail.
Add a docstring to your function that describes the method employed. Like
with anything else in SymPy, you will need to add a doctest to the docstring,
in addition to real tests in ``test_ode.py``. Try to maintain consistency
with the other hint functions' docstrings. Add your method to the list at the
top of this docstring. Also, add your method to ``ode.rst`` in the
``docs/src`` directory, so that the Sphinx docs will pull its docstring into
the main SymPy documentation. Be sure to make the Sphinx documentation by
running ``make html`` from within the doc directory to verify that the
docstring formats correctly.
If your solution method involves integrating, use :py:obj:`~.Integral` instead of
:py:meth:`~sympy.core.expr.Expr.integrate`. This allows the user to bypass
hard/slow integration by using the ``_Integral`` variant of your hint. In
most cases, calling :py:meth:`sympy.core.basic.Basic.doit` will integrate your
solution. If this is not the case, you will need to write special code in
:py:meth:`~sympy.solvers.ode.ode._handle_Integral`. Arbitrary constants should be
symbols named ``C1``, ``C2``, and so on. All solution methods should return
an equality instance. If you need an arbitrary number of arbitrary constants,
you can use ``constants = numbered_symbols(prefix='C', cls=Symbol, start=1)``.
If it is possible to solve for the dependent function in a general way, do so.
Otherwise, do as best as you can, but do not call solve in your
``ode_<hint>()`` function. :py:meth:`~sympy.solvers.ode.ode.odesimp` will attempt
to solve the solution for you, so you do not need to do that. Lastly, if your
ODE has a common simplification that can be applied to your solutions, you can
add a special case in :py:meth:`~sympy.solvers.ode.ode.odesimp` for it. For
example, solutions returned from the ``1st_homogeneous_coeff`` hints often
have many :obj:`~sympy.functions.elementary.exponential.log` terms, so
:py:meth:`~sympy.solvers.ode.ode.odesimp` calls
:py:meth:`~sympy.simplify.simplify.logcombine` on them (it also helps to write
the arbitrary constant as ``log(C1)`` instead of ``C1`` in this case). Also
consider common ways that you can rearrange your solution to have
:py:meth:`~sympy.solvers.ode.constantsimp` take better advantage of it. It is
better to put simplification in :py:meth:`~sympy.solvers.ode.ode.odesimp` than in
your method, because it can then be turned off with the simplify flag in
:py:meth:`~sympy.solvers.ode.dsolve`. If you have any extraneous
simplification in your function, be sure to only run it using ``if
match.get('simplify', True):``, especially if it can be slow or if it can
reduce the domain of the solution.
Finally, as with every contribution to SymPy, your method will need to be
tested. Add a test for each method in ``test_ode.py``. Follow the
conventions there, i.e., test the solver using ``dsolve(eq, f(x),
hint=your_hint)``, and also test the solution using
:py:meth:`~sympy.solvers.ode.checkodesol` (you can put these in a separate
tests and skip/XFAIL if it runs too slow/doesn't work). Be sure to call your
hint specifically in :py:meth:`~sympy.solvers.ode.dsolve`, that way the test
won't be broken simply by the introduction of another matching hint. If your
method works for higher order (>1) ODEs, you will need to run ``sol =
constant_renumber(sol, 'C', 1, order)`` for each solution, where ``order`` is
the order of the ODE. This is because ``constant_renumber`` renumbers the
arbitrary constants by printing order, which is platform dependent. Try to
test every corner case of your solver, including a range of orders if it is a
`n`\th order solver, but if your solver is slow, such as if it involves hard
integration, try to keep the test run time down.
Feel free to refactor existing hints to avoid duplicating code or creating
inconsistencies. If you can show that your method exactly duplicates an
existing method, including in the simplicity and speed of obtaining the
solutions, then you can remove the old, less general method. The existing
code is tested extensively in ``test_ode.py``, so if anything is broken, one
of those tests will surely fail.
"""
from __future__ import print_function, division
from collections import defaultdict
from itertools import islice
from sympy.functions import hyper
from sympy.core import Add, S, Mul, Pow, oo, Rational
from sympy.core.compatibility import ordered, iterable
from sympy.core.containers import Tuple
from sympy.core.exprtools import factor_terms
from sympy.core.expr import AtomicExpr, Expr
from sympy.core.function import (Function, Derivative, AppliedUndef, diff,
expand, expand_mul, Subs, _mexpand)
from sympy.core.multidimensional import vectorize
from sympy.core.numbers import NaN, zoo, I, Number
from sympy.core.relational import Equality, Eq
from sympy.core.symbol import Symbol, Wild, Dummy, symbols
from sympy.core.sympify import sympify
from sympy.logic.boolalg import (BooleanAtom, BooleanTrue,
BooleanFalse)
from sympy.functions import cos, cosh, exp, im, log, re, sin, sinh, sqrt, \
atan2, conjugate, cbrt, besselj, bessely, airyai, airybi
from sympy.functions.combinatorial.factorials import factorial
from sympy.integrals.integrals import Integral, integrate
from sympy.matrices import wronskian
from sympy.polys import (Poly, RootOf, rootof, terms_gcd,
PolynomialError, lcm, roots, gcd)
from sympy.polys.polyroots import roots_quartic
from sympy.polys.polytools import cancel, degree, div
from sympy.series import Order
from sympy.series.series import series
from sympy.simplify import (collect, logcombine, powsimp, # type: ignore
separatevars, simplify, trigsimp, posify, cse)
from sympy.simplify.powsimp import powdenest
from sympy.simplify.radsimp import collect_const
from sympy.solvers import checksol, solve
from sympy.solvers.pde import pdsolve
from sympy.utilities import numbered_symbols, default_sort_key, sift
from sympy.solvers.deutils import _preprocess, ode_order, _desolve
from .subscheck import sub_func_doit
#: This is a list of hints in the order that they should be preferred by
#: :py:meth:`~sympy.solvers.ode.classify_ode`. In general, hints earlier in the
#: list should produce simpler solutions than those later in the list (for
#: ODEs that fit both). For now, the order of this list is based on empirical
#: observations by the developers of SymPy.
#:
#: The hint used by :py:meth:`~sympy.solvers.ode.dsolve` for a specific ODE
#: can be overridden (see the docstring).
#:
#: In general, ``_Integral`` hints are grouped at the end of the list, unless
#: there is a method that returns an unevaluable integral most of the time
#: (which go near the end of the list anyway). ``default``, ``all``,
#: ``best``, and ``all_Integral`` meta-hints should not be included in this
#: list, but ``_best`` and ``_Integral`` hints should be included.
allhints = (
"factorable",
"nth_algebraic",
"separable",
"1st_exact",
"1st_linear",
"Bernoulli",
"Riccati_special_minus2",
"1st_homogeneous_coeff_best",
"1st_homogeneous_coeff_subs_indep_div_dep",
"1st_homogeneous_coeff_subs_dep_div_indep",
"almost_linear",
"linear_coefficients",
"separable_reduced",
"1st_power_series",
"lie_group",
"nth_linear_constant_coeff_homogeneous",
"nth_linear_euler_eq_homogeneous",
"nth_linear_constant_coeff_undetermined_coefficients",
"nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients",
"nth_linear_constant_coeff_variation_of_parameters",
"nth_linear_euler_eq_nonhomogeneous_variation_of_parameters",
"Liouville",
"2nd_linear_airy",
"2nd_linear_bessel",
"2nd_hypergeometric",
"2nd_hypergeometric_Integral",
"nth_order_reducible",
"2nd_power_series_ordinary",
"2nd_power_series_regular",
"nth_algebraic_Integral",
"separable_Integral",
"1st_exact_Integral",
"1st_linear_Integral",
"Bernoulli_Integral",
"1st_homogeneous_coeff_subs_indep_div_dep_Integral",
"1st_homogeneous_coeff_subs_dep_div_indep_Integral",
"almost_linear_Integral",
"linear_coefficients_Integral",
"separable_reduced_Integral",
"nth_linear_constant_coeff_variation_of_parameters_Integral",
"nth_linear_euler_eq_nonhomogeneous_variation_of_parameters_Integral",
"Liouville_Integral",
)
lie_heuristics = (
"abaco1_simple",
"abaco1_product",
"abaco2_similar",
"abaco2_unique_unknown",
"abaco2_unique_general",
"linear",
"function_sum",
"bivariate",
"chi"
)
def get_numbered_constants(eq, num=1, start=1, prefix='C'):
"""
Returns a list of constants that do not occur
in eq already.
"""
ncs = iter_numbered_constants(eq, start, prefix)
Cs = [next(ncs) for i in range(num)]
return (Cs[0] if num == 1 else tuple(Cs))
def iter_numbered_constants(eq, start=1, prefix='C'):
"""
Returns an iterator of constants that do not occur
in eq already.
"""
if isinstance(eq, (Expr, Eq)):
eq = [eq]
elif not iterable(eq):
raise ValueError("Expected Expr or iterable but got %s" % eq)
atom_set = set().union(*[i.free_symbols for i in eq])
func_set = set().union(*[i.atoms(Function) for i in eq])
if func_set:
atom_set |= {Symbol(str(f.func)) for f in func_set}
return numbered_symbols(start=start, prefix=prefix, exclude=atom_set)
def dsolve(eq, func=None, hint="default", simplify=True,
ics= None, xi=None, eta=None, x0=0, n=6, **kwargs):
r"""
Solves any (supported) kind of ordinary differential equation and
system of ordinary differential equations.
For single ordinary differential equation
=========================================
It is classified under this when number of equation in ``eq`` is one.
**Usage**
``dsolve(eq, f(x), hint)`` -> Solve ordinary differential equation
``eq`` for function ``f(x)``, using method ``hint``.
**Details**
``eq`` can be any supported ordinary differential equation (see the
:py:mod:`~sympy.solvers.ode` docstring for supported methods).
This can either be an :py:class:`~sympy.core.relational.Equality`,
or an expression, which is assumed to be equal to ``0``.
``f(x)`` is a function of one variable whose derivatives in that
variable make up the ordinary differential equation ``eq``. In
many cases it is not necessary to provide this; it will be
autodetected (and an error raised if it couldn't be detected).
``hint`` is the solving method that you want dsolve to use. Use
``classify_ode(eq, f(x))`` to get all of the possible hints for an
ODE. The default hint, ``default``, will use whatever hint is
returned first by :py:meth:`~sympy.solvers.ode.classify_ode`. See
Hints below for more options that you can use for hint.
``simplify`` enables simplification by
:py:meth:`~sympy.solvers.ode.ode.odesimp`. See its docstring for more
information. Turn this off, for example, to disable solving of
solutions for ``func`` or simplification of arbitrary constants.
It will still integrate with this hint. Note that the solution may
contain more arbitrary constants than the order of the ODE with
this option enabled.
``xi`` and ``eta`` are the infinitesimal functions of an ordinary
differential equation. They are the infinitesimals of the Lie group
of point transformations for which the differential equation is
invariant. The user can specify values for the infinitesimals. If
nothing is specified, ``xi`` and ``eta`` are calculated using
:py:meth:`~sympy.solvers.ode.infinitesimals` with the help of various
heuristics.
``ics`` is the set of initial/boundary conditions for the differential equation.
It should be given in the form of ``{f(x0): x1, f(x).diff(x).subs(x, x2):
x3}`` and so on. For power series solutions, if no initial
conditions are specified ``f(0)`` is assumed to be ``C0`` and the power
series solution is calculated about 0.
``x0`` is the point about which the power series solution of a differential
equation is to be evaluated.
``n`` gives the exponent of the dependent variable up to which the power series
solution of a differential equation is to be evaluated.
**Hints**
Aside from the various solving methods, there are also some meta-hints
that you can pass to :py:meth:`~sympy.solvers.ode.dsolve`:
``default``:
This uses whatever hint is returned first by
:py:meth:`~sympy.solvers.ode.classify_ode`. This is the
default argument to :py:meth:`~sympy.solvers.ode.dsolve`.
``all``:
To make :py:meth:`~sympy.solvers.ode.dsolve` apply all
relevant classification hints, use ``dsolve(ODE, func,
hint="all")``. This will return a dictionary of
``hint:solution`` terms. If a hint causes dsolve to raise the
``NotImplementedError``, value of that hint's key will be the
exception object raised. The dictionary will also include
some special keys:
- ``order``: The order of the ODE. See also
:py:meth:`~sympy.solvers.deutils.ode_order` in
``deutils.py``.
- ``best``: The simplest hint; what would be returned by
``best`` below.
- ``best_hint``: The hint that would produce the solution
given by ``best``. If more than one hint produces the best
solution, the first one in the tuple returned by
:py:meth:`~sympy.solvers.ode.classify_ode` is chosen.
- ``default``: The solution that would be returned by default.
This is the one produced by the hint that appears first in
the tuple returned by
:py:meth:`~sympy.solvers.ode.classify_ode`.
``all_Integral``:
This is the same as ``all``, except if a hint also has a
corresponding ``_Integral`` hint, it only returns the
``_Integral`` hint. This is useful if ``all`` causes
:py:meth:`~sympy.solvers.ode.dsolve` to hang because of a
difficult or impossible integral. This meta-hint will also be
much faster than ``all``, because
:py:meth:`~sympy.core.expr.Expr.integrate` is an expensive
routine.
``best``:
To have :py:meth:`~sympy.solvers.ode.dsolve` try all methods
and return the simplest one. This takes into account whether
the solution is solvable in the function, whether it contains
any Integral classes (i.e. unevaluatable integrals), and
which one is the shortest in size.
See also the :py:meth:`~sympy.solvers.ode.classify_ode` docstring for
more info on hints, and the :py:mod:`~sympy.solvers.ode` docstring for
a list of all supported hints.
**Tips**
- You can declare the derivative of an unknown function this way:
>>> from sympy import Function, Derivative
>>> from sympy.abc import x # x is the independent variable
>>> f = Function("f")(x) # f is a function of x
>>> # f_ will be the derivative of f with respect to x
>>> f_ = Derivative(f, x)
- See ``test_ode.py`` for many tests, which serves also as a set of
examples for how to use :py:meth:`~sympy.solvers.ode.dsolve`.
- :py:meth:`~sympy.solvers.ode.dsolve` always returns an
:py:class:`~sympy.core.relational.Equality` class (except for the
case when the hint is ``all`` or ``all_Integral``). If possible, it
solves the solution explicitly for the function being solved for.
Otherwise, it returns an implicit solution.
- Arbitrary constants are symbols named ``C1``, ``C2``, and so on.
- Because all solutions should be mathematically equivalent, some
hints may return the exact same result for an ODE. Often, though,
two different hints will return the same solution formatted
differently. The two should be equivalent. Also note that sometimes
the values of the arbitrary constants in two different solutions may
not be the same, because one constant may have "absorbed" other
constants into it.
- Do ``help(ode.ode_<hintname>)`` to get help more information on a
specific hint, where ``<hintname>`` is the name of a hint without
``_Integral``.
For system of ordinary differential equations
=============================================
**Usage**
``dsolve(eq, func)`` -> Solve a system of ordinary differential
equations ``eq`` for ``func`` being list of functions including
`x(t)`, `y(t)`, `z(t)` where number of functions in the list depends
upon the number of equations provided in ``eq``.
**Details**
``eq`` can be any supported system of ordinary differential equations
This can either be an :py:class:`~sympy.core.relational.Equality`,
or an expression, which is assumed to be equal to ``0``.
``func`` holds ``x(t)`` and ``y(t)`` being functions of one variable which
together with some of their derivatives make up the system of ordinary
differential equation ``eq``. It is not necessary to provide this; it
will be autodetected (and an error raised if it couldn't be detected).
**Hints**
The hints are formed by parameters returned by classify_sysode, combining
them give hints name used later for forming method name.
Examples
========
>>> from sympy import Function, dsolve, Eq, Derivative, sin, cos, symbols
>>> from sympy.abc import x
>>> f = Function('f')
>>> dsolve(Derivative(f(x), x, x) + 9*f(x), f(x))
Eq(f(x), C1*sin(3*x) + C2*cos(3*x))
>>> eq = sin(x)*cos(f(x)) + cos(x)*sin(f(x))*f(x).diff(x)
>>> dsolve(eq, hint='1st_exact')
[Eq(f(x), -acos(C1/cos(x)) + 2*pi), Eq(f(x), acos(C1/cos(x)))]
>>> dsolve(eq, hint='almost_linear')
[Eq(f(x), -acos(C1/cos(x)) + 2*pi), Eq(f(x), acos(C1/cos(x)))]
>>> t = symbols('t')
>>> x, y = symbols('x, y', cls=Function)
>>> eq = (Eq(Derivative(x(t),t), 12*t*x(t) + 8*y(t)), Eq(Derivative(y(t),t), 21*x(t) + 7*t*y(t)))
>>> dsolve(eq)
[Eq(x(t), C1*x0(t) + C2*x0(t)*Integral(8*exp(Integral(7*t, t))*exp(Integral(12*t, t))/x0(t)**2, t)),
Eq(y(t), C1*y0(t) + C2*(y0(t)*Integral(8*exp(Integral(7*t, t))*exp(Integral(12*t, t))/x0(t)**2, t) +
exp(Integral(7*t, t))*exp(Integral(12*t, t))/x0(t)))]
>>> eq = (Eq(Derivative(x(t),t),x(t)*y(t)*sin(t)), Eq(Derivative(y(t),t),y(t)**2*sin(t)))
>>> dsolve(eq)
{Eq(x(t), -exp(C1)/(C2*exp(C1) - cos(t))), Eq(y(t), -1/(C1 - cos(t)))}
"""
if iterable(eq):
match = classify_sysode(eq, func)
eq = match['eq']
order = match['order']
func = match['func']
t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0]
# keep highest order term coefficient positive
for i in range(len(eq)):
for func_ in func:
if isinstance(func_, list):
pass
else:
if eq[i].coeff(diff(func[i],t,ode_order(eq[i], func[i]))).is_negative:
eq[i] = -eq[i]
match['eq'] = eq
if len(set(order.values()))!=1:
raise ValueError("It solves only those systems of equations whose orders are equal")
match['order'] = list(order.values())[0]
def recur_len(l):
return sum(recur_len(item) if isinstance(item,list) else 1 for item in l)
if recur_len(func) != len(eq):
raise ValueError("dsolve() and classify_sysode() work with "
"number of functions being equal to number of equations")
if match['type_of_equation'] is None:
raise NotImplementedError
else:
if match['is_linear'] == True:
# These conditions have to be improved upon in future for the new solvers
# added in systems.py
if match.get('is_general', False):
solvefunc = globals()['sysode_linear_neq_order%(order)s' % match]
else:
solvefunc = globals()['sysode_linear_%(no_of_equation)seq_order%(order)s' % match]
else:
solvefunc = globals()['sysode_nonlinear_%(no_of_equation)seq_order%(order)s' % match]
sols = solvefunc(match)
if ics:
constants = Tuple(*sols).free_symbols - Tuple(*eq).free_symbols
solved_constants = solve_ics(sols, func, constants, ics)
return [sol.subs(solved_constants) for sol in sols]
return sols
else:
given_hint = hint # hint given by the user
# See the docstring of _desolve for more details.
hints = _desolve(eq, func=func,
hint=hint, simplify=True, xi=xi, eta=eta, type='ode', ics=ics,
x0=x0, n=n, **kwargs)
eq = hints.pop('eq', eq)
all_ = hints.pop('all', False)
if all_:
retdict = {}
failed_hints = {}
gethints = classify_ode(eq, dict=True)
orderedhints = gethints['ordered_hints']
for hint in hints:
try:
rv = _helper_simplify(eq, hint, hints[hint], simplify)
except NotImplementedError as detail:
failed_hints[hint] = detail
else:
retdict[hint] = rv
func = hints[hint]['func']
retdict['best'] = min(list(retdict.values()), key=lambda x:
ode_sol_simplicity(x, func, trysolving=not simplify))
if given_hint == 'best':
return retdict['best']
for i in orderedhints:
if retdict['best'] == retdict.get(i, None):
retdict['best_hint'] = i
break
retdict['default'] = gethints['default']
retdict['order'] = gethints['order']
retdict.update(failed_hints)
return retdict
else:
# The key 'hint' stores the hint needed to be solved for.
hint = hints['hint']
return _helper_simplify(eq, hint, hints, simplify, ics=ics)
def _helper_simplify(eq, hint, match, simplify=True, ics=None, **kwargs):
r"""
Helper function of dsolve that calls the respective
:py:mod:`~sympy.solvers.ode` functions to solve for the ordinary
differential equations. This minimizes the computation in calling
:py:meth:`~sympy.solvers.deutils._desolve` multiple times.
"""
r = match
func = r['func']
order = r['order']
match = r[hint]
if isinstance(match, SingleODESolver):
solvefunc = match
elif hint.endswith('_Integral'):
solvefunc = globals()['ode_' + hint[:-len('_Integral')]]
else:
solvefunc = globals()['ode_' + hint]
free = eq.free_symbols
cons = lambda s: s.free_symbols.difference(free)
if simplify:
# odesimp() will attempt to integrate, if necessary, apply constantsimp(),
# attempt to solve for func, and apply any other hint specific
# simplifications
if isinstance(solvefunc, SingleODESolver):
sols = solvefunc.get_general_solution()
else:
sols = solvefunc(eq, func, order, match)
if iterable(sols):
rv = [odesimp(eq, s, func, hint) for s in sols]
else:
rv = odesimp(eq, sols, func, hint)
else:
# We still want to integrate (you can disable it separately with the hint)
if isinstance(solvefunc, SingleODESolver):
exprs = solvefunc.get_general_solution(simplify=False)
else:
match['simplify'] = False # Some hints can take advantage of this option
exprs = solvefunc(eq, func, order, match)
if isinstance(exprs, list):
rv = [_handle_Integral(expr, func, hint) for expr in exprs]
else:
rv = _handle_Integral(exprs, func, hint)
if isinstance(rv, list):
rv = _remove_redundant_solutions(eq, rv, order, func.args[0])
if len(rv) == 1:
rv = rv[0]
if ics and not 'power_series' in hint:
if isinstance(rv, (Expr, Eq)):
solved_constants = solve_ics([rv], [r['func']], cons(rv), ics)
rv = rv.subs(solved_constants)
else:
rv1 = []
for s in rv:
try:
solved_constants = solve_ics([s], [r['func']], cons(s), ics)
except ValueError:
continue
rv1.append(s.subs(solved_constants))
if len(rv1) == 1:
return rv1[0]
rv = rv1
return rv
def solve_ics(sols, funcs, constants, ics):
"""
Solve for the constants given initial conditions
``sols`` is a list of solutions.
``funcs`` is a list of functions.
``constants`` is a list of constants.
``ics`` is the set of initial/boundary conditions for the differential
equation. It should be given in the form of ``{f(x0): x1,
f(x).diff(x).subs(x, x2): x3}`` and so on.
Returns a dictionary mapping constants to values.
``solution.subs(constants)`` will replace the constants in ``solution``.
Example
=======
>>> # From dsolve(f(x).diff(x) - f(x), f(x))
>>> from sympy import symbols, Eq, exp, Function
>>> from sympy.solvers.ode.ode import solve_ics
>>> f = Function('f')
>>> x, C1 = symbols('x C1')
>>> sols = [Eq(f(x), C1*exp(x))]
>>> funcs = [f(x)]
>>> constants = [C1]
>>> ics = {f(0): 2}
>>> solved_constants = solve_ics(sols, funcs, constants, ics)
>>> solved_constants
{C1: 2}
>>> sols[0].subs(solved_constants)
Eq(f(x), 2*exp(x))
"""
# Assume ics are of the form f(x0): value or Subs(diff(f(x), x, n), (x,
# x0)): value (currently checked by classify_ode). To solve, replace x
# with x0, f(x0) with value, then solve for constants. For f^(n)(x0),
# differentiate the solution n times, so that f^(n)(x) appears.
x = funcs[0].args[0]
diff_sols = []
subs_sols = []
diff_variables = set()
for funcarg, value in ics.items():
if isinstance(funcarg, AppliedUndef):
x0 = funcarg.args[0]
matching_func = [f for f in funcs if f.func == funcarg.func][0]
S = sols
elif isinstance(funcarg, (Subs, Derivative)):
if isinstance(funcarg, Subs):
# Make sure it stays a subs. Otherwise subs below will produce
# a different looking term.
funcarg = funcarg.doit()
if isinstance(funcarg, Subs):
deriv = funcarg.expr
x0 = funcarg.point[0]
variables = funcarg.expr.variables
matching_func = deriv
elif isinstance(funcarg, Derivative):
deriv = funcarg
x0 = funcarg.variables[0]
variables = (x,)*len(funcarg.variables)
matching_func = deriv.subs(x0, x)
if variables not in diff_variables:
for sol in sols:
if sol.has(deriv.expr.func):
diff_sols.append(Eq(sol.lhs.diff(*variables), sol.rhs.diff(*variables)))
diff_variables.add(variables)
S = diff_sols
else:
raise NotImplementedError("Unrecognized initial condition")
for sol in S:
if sol.has(matching_func):
sol2 = sol
sol2 = sol2.subs(x, x0)
sol2 = sol2.subs(funcarg, value)
# This check is necessary because of issue #15724
if not isinstance(sol2, BooleanAtom) or not subs_sols:
subs_sols = [s for s in subs_sols if not isinstance(s, BooleanAtom)]
subs_sols.append(sol2)
# TODO: Use solveset here
try:
solved_constants = solve(subs_sols, constants, dict=True)
except NotImplementedError:
solved_constants = []
# XXX: We can't differentiate between the solution not existing because of
# invalid initial conditions, and not existing because solve is not smart
# enough. If we could use solveset, this might be improvable, but for now,
# we use NotImplementedError in this case.
if not solved_constants:
raise ValueError("Couldn't solve for initial conditions")
if solved_constants == True:
raise ValueError("Initial conditions did not produce any solutions for constants. Perhaps they are degenerate.")
if len(solved_constants) > 1:
raise NotImplementedError("Initial conditions produced too many solutions for constants")
return solved_constants[0]
def classify_ode(eq, func=None, dict=False, ics=None, **kwargs):
r"""
Returns a tuple of possible :py:meth:`~sympy.solvers.ode.dsolve`
classifications for an ODE.
The tuple is ordered so that first item is the classification that
:py:meth:`~sympy.solvers.ode.dsolve` uses to solve the ODE by default. In
general, classifications at the near the beginning of the list will
produce better solutions faster than those near the end, thought there are
always exceptions. To make :py:meth:`~sympy.solvers.ode.dsolve` use a
different classification, use ``dsolve(ODE, func,
hint=<classification>)``. See also the
:py:meth:`~sympy.solvers.ode.dsolve` docstring for different meta-hints
you can use.
If ``dict`` is true, :py:meth:`~sympy.solvers.ode.classify_ode` will
return a dictionary of ``hint:match`` expression terms. This is intended
for internal use by :py:meth:`~sympy.solvers.ode.dsolve`. Note that
because dictionaries are ordered arbitrarily, this will most likely not be
in the same order as the tuple.
You can get help on different hints by executing
``help(ode.ode_hintname)``, where ``hintname`` is the name of the hint
without ``_Integral``.
See :py:data:`~sympy.solvers.ode.allhints` or the
:py:mod:`~sympy.solvers.ode` docstring for a list of all supported hints
that can be returned from :py:meth:`~sympy.solvers.ode.classify_ode`.
Notes
=====
These are remarks on hint names.
``_Integral``
If a classification has ``_Integral`` at the end, it will return the
expression with an unevaluated :py:class:`~.Integral`
class in it. Note that a hint may do this anyway if
:py:meth:`~sympy.core.expr.Expr.integrate` cannot do the integral,
though just using an ``_Integral`` will do so much faster. Indeed, an
``_Integral`` hint will always be faster than its corresponding hint
without ``_Integral`` because
:py:meth:`~sympy.core.expr.Expr.integrate` is an expensive routine.
If :py:meth:`~sympy.solvers.ode.dsolve` hangs, it is probably because
:py:meth:`~sympy.core.expr.Expr.integrate` is hanging on a tough or
impossible integral. Try using an ``_Integral`` hint or
``all_Integral`` to get it return something.
Note that some hints do not have ``_Integral`` counterparts. This is
because :py:func:`~sympy.integrals.integrals.integrate` is not used in
solving the ODE for those method. For example, `n`\th order linear
homogeneous ODEs with constant coefficients do not require integration
to solve, so there is no
``nth_linear_homogeneous_constant_coeff_Integrate`` hint. You can
easily evaluate any unevaluated
:py:class:`~sympy.integrals.integrals.Integral`\s in an expression by
doing ``expr.doit()``.
Ordinals
Some hints contain an ordinal such as ``1st_linear``. This is to help
differentiate them from other hints, as well as from other methods
that may not be implemented yet. If a hint has ``nth`` in it, such as
the ``nth_linear`` hints, this means that the method used to applies
to ODEs of any order.
``indep`` and ``dep``
Some hints contain the words ``indep`` or ``dep``. These reference
the independent variable and the dependent function, respectively. For
example, if an ODE is in terms of `f(x)`, then ``indep`` will refer to
`x` and ``dep`` will refer to `f`.
``subs``
If a hints has the word ``subs`` in it, it means the the ODE is solved
by substituting the expression given after the word ``subs`` for a
single dummy variable. This is usually in terms of ``indep`` and
``dep`` as above. The substituted expression will be written only in
characters allowed for names of Python objects, meaning operators will
be spelled out. For example, ``indep``/``dep`` will be written as
``indep_div_dep``.
``coeff``
The word ``coeff`` in a hint refers to the coefficients of something
in the ODE, usually of the derivative terms. See the docstring for
the individual methods for more info (``help(ode)``). This is
contrast to ``coefficients``, as in ``undetermined_coefficients``,
which refers to the common name of a method.
``_best``
Methods that have more than one fundamental way to solve will have a
hint for each sub-method and a ``_best`` meta-classification. This
will evaluate all hints and return the best, using the same
considerations as the normal ``best`` meta-hint.
Examples
========
>>> from sympy import Function, classify_ode, Eq
>>> from sympy.abc import x
>>> f = Function('f')
>>> classify_ode(Eq(f(x).diff(x), 0), f(x))
('nth_algebraic',
'separable',
'1st_linear',
'Bernoulli',
'1st_homogeneous_coeff_best',
'1st_homogeneous_coeff_subs_indep_div_dep',
'1st_homogeneous_coeff_subs_dep_div_indep',
'1st_power_series', 'lie_group', 'nth_linear_constant_coeff_homogeneous',
'nth_linear_euler_eq_homogeneous',
'nth_algebraic_Integral', 'separable_Integral',
'1st_linear_Integral', 'Bernoulli_Integral',
'1st_homogeneous_coeff_subs_indep_div_dep_Integral',
'1st_homogeneous_coeff_subs_dep_div_indep_Integral')
>>> classify_ode(f(x).diff(x, 2) + 3*f(x).diff(x) + 2*f(x) - 4)
('nth_linear_constant_coeff_undetermined_coefficients',
'nth_linear_constant_coeff_variation_of_parameters',
'nth_linear_constant_coeff_variation_of_parameters_Integral')
"""
ics = sympify(ics)
prep = kwargs.pop('prep', True)
if func and len(func.args) != 1:
raise ValueError("dsolve() and classify_ode() only "
"work with functions of one variable, not %s" % func)
if isinstance(eq, Equality):
eq = eq.lhs - eq.rhs
# Some methods want the unprocessed equation
eq_orig = eq
if prep or func is None:
eq, func_ = _preprocess(eq, func)
if func is None:
func = func_
x = func.args[0]
f = func.func
y = Dummy('y')
xi = kwargs.get('xi')
eta = kwargs.get('eta')
terms = kwargs.get('n')
order = ode_order(eq, f(x))
# hint:matchdict or hint:(tuple of matchdicts)
# Also will contain "default":<default hint> and "order":order items.
matching_hints = {"order": order}
df = f(x).diff(x)
a = Wild('a', exclude=[f(x)])
d = Wild('d', exclude=[df, f(x).diff(x, 2)])
e = Wild('e', exclude=[df])
k = Wild('k', exclude=[df])
n = Wild('n', exclude=[x, f(x), df])
c1 = Wild('c1', exclude=[x])
a3 = Wild('a3', exclude=[f(x), df, f(x).diff(x, 2)])
b3 = Wild('b3', exclude=[f(x), df, f(x).diff(x, 2)])
c3 = Wild('c3', exclude=[f(x), df, f(x).diff(x, 2)])
r3 = {'xi': xi, 'eta': eta} # Used for the lie_group hint
boundary = {} # Used to extract initial conditions
C1 = Symbol("C1")
# Preprocessing to get the initial conditions out
if ics is not None:
for funcarg in ics:
# Separating derivatives
if isinstance(funcarg, (Subs, Derivative)):
# f(x).diff(x).subs(x, 0) is a Subs, but f(x).diff(x).subs(x,
# y) is a Derivative
if isinstance(funcarg, Subs):
deriv = funcarg.expr
old = funcarg.variables[0]
new = funcarg.point[0]
elif isinstance(funcarg, Derivative):
deriv = funcarg
# No information on this. Just assume it was x
old = x
new = funcarg.variables[0]
if (isinstance(deriv, Derivative) and isinstance(deriv.args[0],
AppliedUndef) and deriv.args[0].func == f and
len(deriv.args[0].args) == 1 and old == x and not
new.has(x) and all(i == deriv.variables[0] for i in
deriv.variables) and not ics[funcarg].has(f)):
dorder = ode_order(deriv, x)
temp = 'f' + str(dorder)
boundary.update({temp: new, temp + 'val': ics[funcarg]})
else:
raise ValueError("Enter valid boundary conditions for Derivatives")
# Separating functions
elif isinstance(funcarg, AppliedUndef):
if (funcarg.func == f and len(funcarg.args) == 1 and
not funcarg.args[0].has(x) and not ics[funcarg].has(f)):
boundary.update({'f0': funcarg.args[0], 'f0val': ics[funcarg]})
else:
raise ValueError("Enter valid boundary conditions for Function")
else:
raise ValueError("Enter boundary conditions of the form ics={f(point}: value, f(x).diff(x, order).subs(x, point): value}")
# Any ODE that can be solved with a combination of algebra and
# integrals e.g.:
# d^3/dx^3(x y) = F(x)
ode = SingleODEProblem(eq_orig, func, x, prep=prep)
solvers = {
NthAlgebraic: ('nth_algebraic',),
FirstLinear: ('1st_linear',),
AlmostLinear: ('almost_linear',),
Bernoulli: ('Bernoulli',),
Factorable: ('factorable',),
RiccatiSpecial: ('Riccati_special_minus2',),
}
for solvercls in solvers:
solver = solvercls(ode)
if solver.matches():
for hints in solvers[solvercls]:
matching_hints[hints] = solver
if solvercls.has_integral:
matching_hints[hints + "_Integral"] = solver
eq = expand(eq)
# Precondition to try remove f(x) from highest order derivative
reduced_eq = None
if eq.is_Add:
deriv_coef = eq.coeff(f(x).diff(x, order))
if deriv_coef not in (1, 0):
r = deriv_coef.match(a*f(x)**c1)
if r and r[c1]:
den = f(x)**r[c1]
reduced_eq = Add(*[arg/den for arg in eq.args])
if not reduced_eq:
reduced_eq = eq
if order == 1:
# NON-REDUCED FORM OF EQUATION matches
r = collect(eq, df, exact=True).match(d + e * df)
if r:
r['d'] = d
r['e'] = e
r['y'] = y
r[d] = r[d].subs(f(x), y)
r[e] = r[e].subs(f(x), y)
# FIRST ORDER POWER SERIES WHICH NEEDS INITIAL CONDITIONS
# TODO: Hint first order series should match only if d/e is analytic.
# For now, only d/e and (d/e).diff(arg) is checked for existence at
# at a given point.
# This is currently done internally in ode_1st_power_series.
point = boundary.get('f0', 0)
value = boundary.get('f0val', C1)
check = cancel(r[d]/r[e])
check1 = check.subs({x: point, y: value})
if not check1.has(oo) and not check1.has(zoo) and \
not check1.has(NaN) and not check1.has(-oo):
check2 = (check1.diff(x)).subs({x: point, y: value})
if not check2.has(oo) and not check2.has(zoo) and \
not check2.has(NaN) and not check2.has(-oo):
rseries = r.copy()
rseries.update({'terms': terms, 'f0': point, 'f0val': value})
matching_hints["1st_power_series"] = rseries
r3.update(r)
## Exact Differential Equation: P(x, y) + Q(x, y)*y' = 0 where
# dP/dy == dQ/dx
try:
if r[d] != 0:
numerator = simplify(r[d].diff(y) - r[e].diff(x))
# The following few conditions try to convert a non-exact
# differential equation into an exact one.
# References : Differential equations with applications
# and historical notes - George E. Simmons
if numerator:
# If (dP/dy - dQ/dx) / Q = f(x)
# then exp(integral(f(x))*equation becomes exact
factor = simplify(numerator/r[e])
variables = factor.free_symbols
if len(variables) == 1 and x == variables.pop():
factor = exp(Integral(factor).doit())
r[d] *= factor
r[e] *= factor
matching_hints["1st_exact"] = r
matching_hints["1st_exact_Integral"] = r
else:
# If (dP/dy - dQ/dx) / -P = f(y)
# then exp(integral(f(y))*equation becomes exact
factor = simplify(-numerator/r[d])
variables = factor.free_symbols
if len(variables) == 1 and y == variables.pop():
factor = exp(Integral(factor).doit())
r[d] *= factor
r[e] *= factor
matching_hints["1st_exact"] = r
matching_hints["1st_exact_Integral"] = r
else:
matching_hints["1st_exact"] = r
matching_hints["1st_exact_Integral"] = r
except NotImplementedError:
# Differentiating the coefficients might fail because of things
# like f(2*x).diff(x). See issue 4624 and issue 4719.
pass
# Any first order ODE can be ideally solved by the Lie Group
# method
matching_hints["lie_group"] = r3
# This match is used for several cases below; we now collect on
# f(x) so the matching works.
r = collect(reduced_eq, df, exact=True).match(d + e*df)
if r:
# Using r[d] and r[e] without any modification for hints
# linear-coefficients and separable-reduced.
num, den = r[d], r[e] # ODE = d/e + df
r['d'] = d
r['e'] = e
r['y'] = y
r[d] = num.subs(f(x), y)
r[e] = den.subs(f(x), y)
## Separable Case: y' == P(y)*Q(x)
r[d] = separatevars(r[d])
r[e] = separatevars(r[e])
# m1[coeff]*m1[x]*m1[y] + m2[coeff]*m2[x]*m2[y]*y'
m1 = separatevars(r[d], dict=True, symbols=(x, y))
m2 = separatevars(r[e], dict=True, symbols=(x, y))
if m1 and m2:
r1 = {'m1': m1, 'm2': m2, 'y': y}
matching_hints["separable"] = r1
matching_hints["separable_Integral"] = r1
## First order equation with homogeneous coefficients:
# dy/dx == F(y/x) or dy/dx == F(x/y)
ordera = homogeneous_order(r[d], x, y)
if ordera is not None:
orderb = homogeneous_order(r[e], x, y)
if ordera == orderb:
# u1=y/x and u2=x/y
u1 = Dummy('u1')
u2 = Dummy('u2')
s = "1st_homogeneous_coeff_subs"
s1 = s + "_dep_div_indep"
s2 = s + "_indep_div_dep"
if simplify((r[d] + u1*r[e]).subs({x: 1, y: u1})) != 0:
matching_hints[s1] = r
matching_hints[s1 + "_Integral"] = r
if simplify((r[e] + u2*r[d]).subs({x: u2, y: 1})) != 0:
matching_hints[s2] = r
matching_hints[s2 + "_Integral"] = r
if s1 in matching_hints and s2 in matching_hints:
matching_hints["1st_homogeneous_coeff_best"] = r
## Linear coefficients of the form
# y'+ F((a*x + b*y + c)/(a'*x + b'y + c')) = 0
# that can be reduced to homogeneous form.
F = num/den
params = _linear_coeff_match(F, func)
if params:
xarg, yarg = params
u = Dummy('u')
t = Dummy('t')
# Dummy substitution for df and f(x).
dummy_eq = reduced_eq.subs(((df, t), (f(x), u)))
reps = ((x, x + xarg), (u, u + yarg), (t, df), (u, f(x)))
dummy_eq = simplify(dummy_eq.subs(reps))
# get the re-cast values for e and d
r2 = collect(expand(dummy_eq), [df, f(x)]).match(e*df + d)
if r2:
orderd = homogeneous_order(r2[d], x, f(x))
if orderd is not None:
ordere = homogeneous_order(r2[e], x, f(x))
if orderd == ordere:
# Match arguments are passed in such a way that it
# is coherent with the already existing homogeneous
# functions.
r2[d] = r2[d].subs(f(x), y)
r2[e] = r2[e].subs(f(x), y)
r2.update({'xarg': xarg, 'yarg': yarg,
'd': d, 'e': e, 'y': y})
matching_hints["linear_coefficients"] = r2
matching_hints["linear_coefficients_Integral"] = r2
## Equation of the form y' + (y/x)*H(x^n*y) = 0
# that can be reduced to separable form
factor = simplify(x/f(x)*num/den)
# Try representing factor in terms of x^n*y
# where n is lowest power of x in factor;
# first remove terms like sqrt(2)*3 from factor.atoms(Mul)
num, dem = factor.as_numer_denom()
num = expand(num)
dem = expand(dem)
def _degree(expr, x):
# Made this function to calculate the degree of
# x in an expression. If expr will be of form
# x**p*y, (wheare p can be variables/rationals) then it
# will return p.
for val in expr:
if val.has(x):
if isinstance(val, Pow) and val.as_base_exp()[0] == x:
return (val.as_base_exp()[1])
elif val == x:
return (val.as_base_exp()[1])
else:
return _degree(val.args, x)
return 0
def _powers(expr):
# this function will return all the different relative power of x w.r.t f(x).
# expr = x**p * f(x)**q then it will return {p/q}.
pows = set()
if isinstance(expr, Add):
exprs = expr.atoms(Add)
elif isinstance(expr, Mul):
exprs = expr.atoms(Mul)
elif isinstance(expr, Pow):
exprs = expr.atoms(Pow)
else:
exprs = {expr}
for arg in exprs:
if arg.has(x):
_, u = arg.as_independent(x, f(x))
pow = _degree((u.subs(f(x), y), ), x)/_degree((u.subs(f(x), y), ), y)
pows.add(pow)
return pows
pows = _powers(num)
pows.update(_powers(dem))
pows = list(pows)
if(len(pows)==1) and pows[0]!=zoo:
t = Dummy('t')
r2 = {'t': t}
num = num.subs(x**pows[0]*f(x), t)
dem = dem.subs(x**pows[0]*f(x), t)
test = num/dem
free = test.free_symbols
if len(free) == 1 and free.pop() == t:
r2.update({'power' : pows[0], 'u' : test})
matching_hints['separable_reduced'] = r2
matching_hints["separable_reduced_Integral"] = r2
elif order == 2:
# Liouville ODE in the form
# f(x).diff(x, 2) + g(f(x))*(f(x).diff(x))**2 + h(x)*f(x).diff(x)
# See Goldstein and Braun, "Advanced Methods for the Solution of
# Differential Equations", pg. 98
s = d*f(x).diff(x, 2) + e*df**2 + k*df
r = reduced_eq.match(s)
if r and r[d] != 0:
y = Dummy('y')
g = simplify(r[e]/r[d]).subs(f(x), y)
h = simplify(r[k]/r[d]).subs(f(x), y)
if y in h.free_symbols or x in g.free_symbols:
pass
else:
r = {'g': g, 'h': h, 'y': y}
matching_hints["Liouville"] = r
matching_hints["Liouville_Integral"] = r
# Homogeneous second order differential equation of the form
# a3*f(x).diff(x, 2) + b3*f(x).diff(x) + c3
# It has a definite power series solution at point x0 if, b3/a3 and c3/a3
# are analytic at x0.
deq = a3*(f(x).diff(x, 2)) + b3*df + c3*f(x)
r = collect(reduced_eq,
[f(x).diff(x, 2), f(x).diff(x), f(x)]).match(deq)
ordinary = False
if r:
if not all([r[key].is_polynomial() for key in r]):
n, d = reduced_eq.as_numer_denom()
reduced_eq = expand(n)
r = collect(reduced_eq,
[f(x).diff(x, 2), f(x).diff(x), f(x)]).match(deq)
if r and r[a3] != 0:
p = cancel(r[b3]/r[a3]) # Used below
q = cancel(r[c3]/r[a3]) # Used below
point = kwargs.get('x0', 0)
check = p.subs(x, point)
if not check.has(oo, NaN, zoo, -oo):
check = q.subs(x, point)
if not check.has(oo, NaN, zoo, -oo):
ordinary = True
r.update({'a3': a3, 'b3': b3, 'c3': c3, 'x0': point, 'terms': terms})
matching_hints["2nd_power_series_ordinary"] = r
# Checking if the differential equation has a regular singular point
# at x0. It has a regular singular point at x0, if (b3/a3)*(x - x0)
# and (c3/a3)*((x - x0)**2) are analytic at x0.
if not ordinary:
p = cancel((x - point)*p)
check = p.subs(x, point)
if not check.has(oo, NaN, zoo, -oo):
q = cancel(((x - point)**2)*q)
check = q.subs(x, point)
if not check.has(oo, NaN, zoo, -oo):
coeff_dict = {'p': p, 'q': q, 'x0': point, 'terms': terms}
matching_hints["2nd_power_series_regular"] = coeff_dict
# For Hypergeometric solutions.
_r = {}
_r.update(r)
rn = match_2nd_hypergeometric(_r, func)
if rn:
matching_hints["2nd_hypergeometric"] = rn
matching_hints["2nd_hypergeometric_Integral"] = rn
# If the ODE has regular singular point at x0 and is of the form
# Eq((x)**2*Derivative(y(x), x, x) + x*Derivative(y(x), x) +
# (a4**2*x**(2*p)-n**2)*y(x) thus Bessel's equation
rn = match_2nd_linear_bessel(r, f(x))
if rn:
matching_hints["2nd_linear_bessel"] = rn
# If the ODE is ordinary and is of the form of Airy's Equation
# Eq(x**2*Derivative(y(x),x,x)-(ax+b)*y(x))
if p.is_zero:
a4 = Wild('a4', exclude=[x,f(x),df])
b4 = Wild('b4', exclude=[x,f(x),df])
rn = q.match(a4+b4*x)
if rn and rn[b4] != 0:
rn = {'b':rn[a4],'m':rn[b4]}
matching_hints["2nd_linear_airy"] = rn
if order > 0:
# Any ODE that can be solved with a substitution and
# repeated integration e.g.:
# `d^2/dx^2(y) + x*d/dx(y) = constant
#f'(x) must be finite for this to work
r = _nth_order_reducible_match(reduced_eq, func)
if r:
matching_hints['nth_order_reducible'] = r
# nth order linear ODE
# a_n(x)y^(n) + ... + a_1(x)y' + a_0(x)y = F(x) = b
r = _nth_linear_match(reduced_eq, func, order)
# Constant coefficient case (a_i is constant for all i)
if r and not any(r[i].has(x) for i in r if i >= 0):
# Inhomogeneous case: F(x) is not identically 0
if r[-1]:
eq_homogeneous = Add(eq,-r[-1])
undetcoeff = _undetermined_coefficients_match(r[-1], x, func, eq_homogeneous)
s = "nth_linear_constant_coeff_variation_of_parameters"
matching_hints[s] = r
matching_hints[s + "_Integral"] = r
if undetcoeff['test']:
r['trialset'] = undetcoeff['trialset']
matching_hints[
"nth_linear_constant_coeff_undetermined_coefficients"
] = r
# Homogeneous case: F(x) is identically 0
else:
matching_hints["nth_linear_constant_coeff_homogeneous"] = r
# nth order Euler equation a_n*x**n*y^(n) + ... + a_1*x*y' + a_0*y = F(x)
#In case of Homogeneous euler equation F(x) = 0
def _test_term(coeff, order):
r"""
Linear Euler ODEs have the form K*x**order*diff(y(x),x,order) = F(x),
where K is independent of x and y(x), order>= 0.
So we need to check that for each term, coeff == K*x**order from
some K. We have a few cases, since coeff may have several
different types.
"""
if order < 0:
raise ValueError("order should be greater than 0")
if coeff == 0:
return True
if order == 0:
if x in coeff.free_symbols:
return False
return True
if coeff.is_Mul:
if coeff.has(f(x)):
return False
return x**order in coeff.args
elif coeff.is_Pow:
return coeff.as_base_exp() == (x, order)
elif order == 1:
return x == coeff
return False
# Find coefficient for highest derivative, multiply coefficients to
# bring the equation into Euler form if possible
r_rescaled = None
if r is not None:
coeff = r[order]
factor = x**order / coeff
r_rescaled = {i: factor*r[i] for i in r if i != 'trialset'}
# XXX: Mixing up the trialset with the coefficients is error-prone.
# These should be separated as something like r['coeffs'] and
# r['trialset']
if r_rescaled and not any(not _test_term(r_rescaled[i], i) for i in
r_rescaled if i != 'trialset' and i >= 0):
if not r_rescaled[-1]:
matching_hints["nth_linear_euler_eq_homogeneous"] = r_rescaled
else:
matching_hints["nth_linear_euler_eq_nonhomogeneous_variation_of_parameters"] = r_rescaled
matching_hints["nth_linear_euler_eq_nonhomogeneous_variation_of_parameters_Integral"] = r_rescaled
e, re = posify(r_rescaled[-1].subs(x, exp(x)))
undetcoeff = _undetermined_coefficients_match(e.subs(re), x)
if undetcoeff['test']:
r_rescaled['trialset'] = undetcoeff['trialset']
matching_hints["nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients"] = r_rescaled
# Order keys based on allhints.
retlist = [i for i in allhints if i in matching_hints]
if dict:
# Dictionaries are ordered arbitrarily, so make note of which
# hint would come first for dsolve(). Use an ordered dict in Py 3.
matching_hints["default"] = retlist[0] if retlist else None
matching_hints["ordered_hints"] = tuple(retlist)
return matching_hints
else:
return tuple(retlist)
def equivalence(max_num_pow, dem_pow):
# this function is made for checking the equivalence with 2F1 type of equation.
# max_num_pow is the value of maximum power of x in numerator
# and dem_pow is list of powers of different factor of form (a*x b).
# reference from table 1 in paper - "Non-Liouvillian solutions for second order
# linear ODEs" by L. Chan, E.S. Cheb-Terrab.
# We can extend it for 1F1 and 0F1 type also.
if max_num_pow == 2:
if dem_pow in [[2, 2], [2, 2, 2]]:
return "2F1"
elif max_num_pow == 1:
if dem_pow in [[1, 2, 2], [2, 2, 2], [1, 2], [2, 2]]:
return "2F1"
elif max_num_pow == 0:
if dem_pow in [[1, 1, 2], [2, 2], [1 ,2, 2], [1, 1], [2], [1, 2], [2, 2]]:
return "2F1"
return None
def equivalence_hypergeometric(A, B, func):
from sympy import factor
# This method for finding the equivalence is only for 2F1 type.
# We can extend it for 1F1 and 0F1 type also.
x = func.args[0]
# making given equation in normal form
I1 = factor(cancel(A.diff(x)/2 + A**2/4 - B))
# computing shifted invariant(J1) of the equation
J1 = factor(cancel(x**2*I1 + S(1)/4))
num, dem = J1.as_numer_denom()
num = powdenest(expand(num))
dem = powdenest(expand(dem))
pow_num = set()
pow_dem = set()
# this function will compute the different powers of variable(x) in J1.
# then it will help in finding value of k. k is power of x such that we can express
# J1 = x**k * J0(x**k) then all the powers in J0 become integers.
def _power_counting(num):
_pow = {0}
for val in num:
if val.has(x):
if isinstance(val, Pow) and val.as_base_exp()[0] == x:
_pow.add(val.as_base_exp()[1])
elif val == x:
_pow.add(val.as_base_exp()[1])
else:
_pow.update(_power_counting(val.args))
return _pow
pow_num = _power_counting((num, ))
pow_dem = _power_counting((dem, ))
pow_dem.update(pow_num)
_pow = pow_dem
k = gcd(_pow)
# computing I0 of the given equation
I0 = powdenest(simplify(factor(((J1/k**2) - S(1)/4)/((x**k)**2))), force=True)
I0 = factor(cancel(powdenest(I0.subs(x, x**(S(1)/k)), force=True)))
num, dem = I0.as_numer_denom()
max_num_pow = max(_power_counting((num, )))
dem_args = dem.args
sing_point = []
dem_pow = []
# calculating singular point of I0.
for arg in dem_args:
if arg.has(x):
if isinstance(arg, Pow):
# (x-a)**n
dem_pow.append(arg.as_base_exp()[1])
sing_point.append(list(roots(arg.as_base_exp()[0], x).keys())[0])
else:
# (x-a) type
dem_pow.append(arg.as_base_exp()[1])
sing_point.append(list(roots(arg, x).keys())[0])
dem_pow.sort()
# checking if equivalence is exists or not.
if equivalence(max_num_pow, dem_pow) == "2F1":
return {'I0':I0, 'k':k, 'sing_point':sing_point, 'type':"2F1"}
else:
return None
def ode_2nd_hypergeometric(eq, func, order, match):
from sympy.simplify.hyperexpand import hyperexpand
from sympy import factor
x = func.args[0]
C0, C1 = get_numbered_constants(eq, num=2)
a = match['a']
b = match['b']
c = match['c']
A = match['A']
# B = match['B']
sol = None
if match['type'] == "2F1":
if c.is_integer == False:
sol = C0*hyper([a, b], [c], x) + C1*hyper([a-c+1, b-c+1], [2-c], x)*x**(1-c)
elif c == 1:
y2 = Integral(exp(Integral((-(a+b+1)*x + c)/(x**2-x), x))/(hyperexpand(hyper([a, b], [c], x))**2), x)*hyper([a, b], [c], x)
sol = C0*hyper([a, b], [c], x) + C1*y2
elif (c-a-b).is_integer == False:
sol = C0*hyper([a, b], [1+a+b-c], 1-x) + C1*hyper([c-a, c-b], [1+c-a-b], 1-x)*(1-x)**(c-a-b)
if sol is None:
raise NotImplementedError("The given ODE " + str(eq) + " cannot be solved by"
+ " the hypergeometric method")
# applying transformation in the solution
subs = match['mobius']
dtdx = simplify(1/(subs.diff(x)))
_B = ((a + b + 1)*x - c).subs(x, subs)*dtdx
_B = factor(_B + ((x**2 -x).subs(x, subs))*(dtdx.diff(x)*dtdx))
_A = factor((x**2 - x).subs(x, subs)*(dtdx**2))
e = exp(logcombine(Integral(cancel(_B/(2*_A)), x), force=True))
sol = sol.subs(x, match['mobius'])
sol = sol.subs(x, x**match['k'])
e = e.subs(x, x**match['k'])
if not A.is_zero:
e1 = Integral(A/2, x)
e1 = exp(logcombine(e1, force=True))
sol = cancel((e/e1)*x**((-match['k']+1)/2))*sol
sol = Eq(func, sol)
return sol
sol = cancel((e)*x**((-match['k']+1)/2))*sol
sol = Eq(func, sol)
return sol
def match_2nd_2F1_hypergeometric(I, k, sing_point, func):
from sympy import factor
x = func.args[0]
a = Wild("a")
b = Wild("b")
c = Wild("c")
t = Wild("t")
s = Wild("s")
r = Wild("r")
alpha = Wild("alpha")
beta = Wild("beta")
gamma = Wild("gamma")
delta = Wild("delta")
rn = {'type':None}
# I0 of the standerd 2F1 equation.
I0 = ((a-b+1)*(a-b-1)*x**2 + 2*((1-a-b)*c + 2*a*b)*x + c*(c-2))/(4*x**2*(x-1)**2)
if sing_point != [0, 1]:
# If singular point is [0, 1] then we have standerd equation.
eqs = []
sing_eqs = [-beta/alpha, -delta/gamma, (delta-beta)/(alpha-gamma)]
# making equations for the finding the mobius transformation
for i in range(3):
if i<len(sing_point):
eqs.append(Eq(sing_eqs[i], sing_point[i]))
else:
eqs.append(Eq(1/sing_eqs[i], 0))
# solving above equations for the mobius transformation
_beta = -alpha*sing_point[0]
_delta = -gamma*sing_point[1]
_gamma = alpha
if len(sing_point) == 3:
_gamma = (_beta + sing_point[2]*alpha)/(sing_point[2] - sing_point[1])
mob = (alpha*x + beta)/(gamma*x + delta)
mob = mob.subs(beta, _beta)
mob = mob.subs(delta, _delta)
mob = mob.subs(gamma, _gamma)
mob = cancel(mob)
t = (beta - delta*x)/(gamma*x - alpha)
t = cancel(((t.subs(beta, _beta)).subs(delta, _delta)).subs(gamma, _gamma))
else:
mob = x
t = x
# applying mobius transformation in I to make it into I0.
I = I.subs(x, t)
I = I*(t.diff(x))**2
I = factor(I)
dict_I = {x**2:0, x:0, 1:0}
I0_num, I0_dem = I0.as_numer_denom()
# collecting coeff of (x**2, x), of the standerd equation.
# substituting (a-b) = s, (a+b) = r
dict_I0 = {x**2:s**2 - 1, x:(2*(1-r)*c + (r+s)*(r-s)), 1:c*(c-2)}
# collecting coeff of (x**2, x) from I0 of the given equation.
dict_I.update(collect(expand(cancel(I*I0_dem)), [x**2, x], evaluate=False))
eqs = []
# We are comparing the coeff of powers of different x, for finding the values of
# parameters of standerd equation.
for key in [x**2, x, 1]:
eqs.append(Eq(dict_I[key], dict_I0[key]))
# We can have many possible roots for the equation.
# I am selecting the root on the basis that when we have
# standard equation eq = x*(x-1)*f(x).diff(x, 2) + ((a+b+1)*x-c)*f(x).diff(x) + a*b*f(x)
# then root should be a, b, c.
_c = 1 - factor(sqrt(1+eqs[2].lhs))
if not _c.has(Symbol):
_c = min(list(roots(eqs[2], c)))
_s = factor(sqrt(eqs[0].lhs + 1))
_r = _c - factor(sqrt(_c**2 + _s**2 + eqs[1].lhs - 2*_c))
_a = (_r + _s)/2
_b = (_r - _s)/2
rn = {'a':simplify(_a), 'b':simplify(_b), 'c':simplify(_c), 'k':k, 'mobius':mob, 'type':"2F1"}
return rn
def match_2nd_hypergeometric(r, func):
x = func.args[0]
a3 = Wild('a3', exclude=[func, func.diff(x), func.diff(x, 2)])
b3 = Wild('b3', exclude=[func, func.diff(x), func.diff(x, 2)])
c3 = Wild('c3', exclude=[func, func.diff(x), func.diff(x, 2)])
A = cancel(r[b3]/r[a3])
B = cancel(r[c3]/r[a3])
d = equivalence_hypergeometric(A, B, func)
rn = None
if d:
if d['type'] == "2F1":
rn = match_2nd_2F1_hypergeometric(d['I0'], d['k'], d['sing_point'], func)
if rn is not None:
rn.update({'A':A, 'B':B})
# We can extend it for 1F1 and 0F1 type also.
return rn
def match_2nd_linear_bessel(r, func):
from sympy.polys.polytools import factor
# eq = a3*f(x).diff(x, 2) + b3*f(x).diff(x) + c3*f(x)
f = func
x = func.args[0]
df = f.diff(x)
a = Wild('a', exclude=[f,df])
b = Wild('b', exclude=[x, f,df])
a4 = Wild('a4', exclude=[x,f,df])
b4 = Wild('b4', exclude=[x,f,df])
c4 = Wild('c4', exclude=[x,f,df])
d4 = Wild('d4', exclude=[x,f,df])
a3 = Wild('a3', exclude=[f, df, f.diff(x, 2)])
b3 = Wild('b3', exclude=[f, df, f.diff(x, 2)])
c3 = Wild('c3', exclude=[f, df, f.diff(x, 2)])
# leading coeff of f(x).diff(x, 2)
coeff = factor(r[a3]).match(a4*(x-b)**b4)
if coeff:
# if coeff[b4] = 0 means constant coefficient
if coeff[b4] == 0:
return None
point = coeff[b]
else:
return None
if point:
r[a3] = simplify(r[a3].subs(x, x+point))
r[b3] = simplify(r[b3].subs(x, x+point))
r[c3] = simplify(r[c3].subs(x, x+point))
# making a3 in the form of x**2
r[a3] = cancel(r[a3]/(coeff[a4]*(x)**(-2+coeff[b4])))
r[b3] = cancel(r[b3]/(coeff[a4]*(x)**(-2+coeff[b4])))
r[c3] = cancel(r[c3]/(coeff[a4]*(x)**(-2+coeff[b4])))
# checking if b3 is of form c*(x-b)
coeff1 = factor(r[b3]).match(a4*(x))
if coeff1 is None:
return None
# c3 maybe of very complex form so I am simply checking (a - b) form
# if yes later I will match with the standerd form of bessel in a and b
# a, b are wild variable defined above.
_coeff2 = r[c3].match(a - b)
if _coeff2 is None:
return None
# matching with standerd form for c3
coeff2 = factor(_coeff2[a]).match(c4**2*(x)**(2*a4))
if coeff2 is None:
return None
if _coeff2[b] == 0:
coeff2[d4] = 0
else:
coeff2[d4] = factor(_coeff2[b]).match(d4**2)[d4]
rn = {'n':coeff2[d4], 'a4':coeff2[c4], 'd4':coeff2[a4]}
rn['c4'] = coeff1[a4]
rn['b4'] = point
return rn
def classify_sysode(eq, funcs=None, **kwargs):
r"""
Returns a dictionary of parameter names and values that define the system
of ordinary differential equations in ``eq``.
The parameters are further used in
:py:meth:`~sympy.solvers.ode.dsolve` for solving that system.
Some parameter names and values are:
'is_linear' (boolean), which tells whether the given system is linear.
Note that "linear" here refers to the operator: terms such as ``x*diff(x,t)`` are
nonlinear, whereas terms like ``sin(t)*diff(x,t)`` are still linear operators.
'func' (list) contains the :py:class:`~sympy.core.function.Function`s that
appear with a derivative in the ODE, i.e. those that we are trying to solve
the ODE for.
'order' (dict) with the maximum derivative for each element of the 'func'
parameter.
'func_coeff' (dict or Matrix) with the coefficient for each triple ``(equation number,
function, order)```. The coefficients are those subexpressions that do not
appear in 'func', and hence can be considered constant for purposes of ODE
solving. The value of this parameter can also be a Matrix if the system of ODEs are
linear first order of the form X' = AX where X is the vector of dependent variables.
Here, this function returns the coefficient matrix A.
'eq' (list) with the equations from ``eq``, sympified and transformed into
expressions (we are solving for these expressions to be zero).
'no_of_equations' (int) is the number of equations (same as ``len(eq)``).
'type_of_equation' (string) is an internal classification of the type of
ODE.
'is_constant' (boolean), which tells if the system of ODEs is constant coefficient
or not. This key is temporary addition for now and is in the match dict only when
the system of ODEs is linear first order constant coefficient homogeneous. So, this
key's value is True for now if it is available else it doesn't exist.
'is_homogeneous' (boolean), which tells if the system of ODEs is homogeneous. Like the
key 'is_constant', this key is a temporary addition and it is True since this key value
is available only when the system is linear first order constant coefficient homogeneous.
References
==========
-http://eqworld.ipmnet.ru/en/solutions/sysode/sode-toc1.htm
-A. D. Polyanin and A. V. Manzhirov, Handbook of Mathematics for Engineers and Scientists
Examples
========
>>> from sympy import Function, Eq, symbols, diff
>>> from sympy.solvers.ode.ode import classify_sysode
>>> from sympy.abc import t
>>> f, x, y = symbols('f, x, y', cls=Function)
>>> k, l, m, n = symbols('k, l, m, n', Integer=True)
>>> x1 = diff(x(t), t) ; y1 = diff(y(t), t)
>>> x2 = diff(x(t), t, t) ; y2 = diff(y(t), t, t)
>>> eq = (Eq(x1, 12*x(t) - 6*y(t)), Eq(y1, 11*x(t) + 3*y(t)))
>>> classify_sysode(eq)
{'eq': [-12*x(t) + 6*y(t) + Derivative(x(t), t), -11*x(t) - 3*y(t) + Derivative(y(t), t)], 'func': [x(t), y(t)], 'func_coeff': Matrix([
[-12, 6],
[-11, -3]]), 'is_constant': True, 'is_general': True, 'is_homogeneous': True, 'is_linear': True, 'no_of_equation': 2, 'order': {x(t): 1, y(t): 1}, 'type_of_equation': 'type1'}
>>> eq = (Eq(diff(x(t),t), 5*t*x(t) + t**2*y(t) + 2), Eq(diff(y(t),t), -t**2*x(t) + 5*t*y(t)))
>>> classify_sysode(eq)
{'eq': [-t**2*y(t) - 5*t*x(t) + Derivative(x(t), t) - 2, t**2*x(t) - 5*t*y(t) + Derivative(y(t), t)],
'func': [x(t), y(t)], 'func_coeff': {(0, x(t), 0): -5*t, (0, x(t), 1): 1, (0, y(t), 0): -t**2,
(0, y(t), 1): 0, (1, x(t), 0): t**2, (1, x(t), 1): 0, (1, y(t), 0): -5*t, (1, y(t), 1): 1},
'is_linear': True, 'no_of_equation': 2, 'order': {x(t): 1, y(t): 1}, 'type_of_equation': None}
"""
from sympy.solvers.ode.systems import neq_nth_linear_constant_coeff_match
# Sympify equations and convert iterables of equations into
# a list of equations
def _sympify(eq):
return list(map(sympify, eq if iterable(eq) else [eq]))
eq, funcs = (_sympify(w) for w in [eq, funcs])
for i, fi in enumerate(eq):
if isinstance(fi, Equality):
eq[i] = fi.lhs - fi.rhs
t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0]
matching_hints = {"no_of_equation":i+1}
matching_hints['eq'] = eq
if i==0:
raise ValueError("classify_sysode() works for systems of ODEs. "
"For scalar ODEs, classify_ode should be used")
# find all the functions if not given
order = dict()
if funcs==[None]:
funcs = []
for eqs in eq:
derivs = eqs.atoms(Derivative)
func = set().union(*[d.atoms(AppliedUndef) for d in derivs])
for func_ in func:
funcs.append(func_)
temp_eqs = eq
match = neq_nth_linear_constant_coeff_match(temp_eqs, funcs, t)
if match is not None:
return match
funcs = list(set(funcs))
if len(funcs) != len(eq):
raise ValueError("Number of functions given is not equal to the number of equations %s" % funcs)
func_dict = dict()
for func in funcs:
if not order.get(func, False):
max_order = 0
for i, eqs_ in enumerate(eq):
order_ = ode_order(eqs_,func)
if max_order < order_:
max_order = order_
eq_no = i
if eq_no in func_dict:
func_dict[eq_no] = [func_dict[eq_no], func]
else:
func_dict[eq_no] = func
order[func] = max_order
funcs = [func_dict[i] for i in range(len(func_dict))]
matching_hints['func'] = funcs
for func in funcs:
if isinstance(func, list):
for func_elem in func:
if len(func_elem.args) != 1:
raise ValueError("dsolve() and classify_sysode() work with "
"functions of one variable only, not %s" % func)
else:
if func and len(func.args) != 1:
raise ValueError("dsolve() and classify_sysode() work with "
"functions of one variable only, not %s" % func)
# find the order of all equation in system of odes
matching_hints["order"] = order
# find coefficients of terms f(t), diff(f(t),t) and higher derivatives
# and similarly for other functions g(t), diff(g(t),t) in all equations.
# Here j denotes the equation number, funcs[l] denotes the function about
# which we are talking about and k denotes the order of function funcs[l]
# whose coefficient we are calculating.
def linearity_check(eqs, j, func, is_linear_):
for k in range(order[func] + 1):
func_coef[j, func, k] = collect(eqs.expand(), [diff(func, t, k)]).coeff(diff(func, t, k))
if is_linear_ == True:
if func_coef[j, func, k] == 0:
if k == 0:
coef = eqs.as_independent(func, as_Add=True)[1]
for xr in range(1, ode_order(eqs,func) + 1):
coef -= eqs.as_independent(diff(func, t, xr), as_Add=True)[1]
if coef != 0:
is_linear_ = False
else:
if eqs.as_independent(diff(func, t, k), as_Add=True)[1]:
is_linear_ = False
else:
for func_ in funcs:
if isinstance(func_, list):
for elem_func_ in func_:
dep = func_coef[j, func, k].as_independent(elem_func_, as_Add=True)[1]
if dep != 0:
is_linear_ = False
else:
dep = func_coef[j, func, k].as_independent(func_, as_Add=True)[1]
if dep != 0:
is_linear_ = False
return is_linear_
func_coef = {}
is_linear = True
for j, eqs in enumerate(eq):
for func in funcs:
if isinstance(func, list):
for func_elem in func:
is_linear = linearity_check(eqs, j, func_elem, is_linear)
else:
is_linear = linearity_check(eqs, j, func, is_linear)
matching_hints['func_coeff'] = func_coef
matching_hints['is_linear'] = is_linear
if len(set(order.values())) == 1:
order_eq = list(matching_hints['order'].values())[0]
if matching_hints['is_linear'] == True:
if matching_hints['no_of_equation'] == 2:
if order_eq == 1:
type_of_equation = check_linear_2eq_order1(eq, funcs, func_coef)
elif order_eq == 2:
type_of_equation = check_linear_2eq_order2(eq, funcs, func_coef)
# If the equation doesn't match up with any of the
# general case solvers in systems.py and the number
# of equations is greater than 2, then NotImplementedError
# should be raised.
else:
type_of_equation = None
else:
if matching_hints['no_of_equation'] == 2:
if order_eq == 1:
type_of_equation = check_nonlinear_2eq_order1(eq, funcs, func_coef)
else:
type_of_equation = None
elif matching_hints['no_of_equation'] == 3:
if order_eq == 1:
type_of_equation = check_nonlinear_3eq_order1(eq, funcs, func_coef)
else:
type_of_equation = None
else:
type_of_equation = None
else:
type_of_equation = None
matching_hints['type_of_equation'] = type_of_equation
return matching_hints
def check_linear_2eq_order1(eq, func, func_coef):
x = func[0].func
y = func[1].func
fc = func_coef
t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0]
r = dict()
# for equations Eq(a1*diff(x(t),t), b1*x(t) + c1*y(t) + d1)
# and Eq(a2*diff(y(t),t), b2*x(t) + c2*y(t) + d2)
r['a1'] = fc[0,x(t),1] ; r['a2'] = fc[1,y(t),1]
r['b1'] = -fc[0,x(t),0]/fc[0,x(t),1] ; r['b2'] = -fc[1,x(t),0]/fc[1,y(t),1]
r['c1'] = -fc[0,y(t),0]/fc[0,x(t),1] ; r['c2'] = -fc[1,y(t),0]/fc[1,y(t),1]
forcing = [S.Zero,S.Zero]
for i in range(2):
for j in Add.make_args(eq[i]):
if not j.has(x(t), y(t)):
forcing[i] += j
if not (forcing[0].has(t) or forcing[1].has(t)):
# We can handle homogeneous case and simple constant forcings
r['d1'] = forcing[0]
r['d2'] = forcing[1]
else:
# Issue #9244: nonhomogeneous linear systems are not supported
return None
# Conditions to check for type 6 whose equations are Eq(diff(x(t),t), f(t)*x(t) + g(t)*y(t)) and
# Eq(diff(y(t),t), a*[f(t) + a*h(t)]x(t) + a*[g(t) - h(t)]*y(t))
p = 0
q = 0
p1 = cancel(r['b2']/(cancel(r['b2']/r['c2']).as_numer_denom()[0]))
p2 = cancel(r['b1']/(cancel(r['b1']/r['c1']).as_numer_denom()[0]))
for n, i in enumerate([p1, p2]):
for j in Mul.make_args(collect_const(i)):
if not j.has(t):
q = j
if q and n==0:
if ((r['b2']/j - r['b1'])/(r['c1'] - r['c2']/j)) == j:
p = 1
elif q and n==1:
if ((r['b1']/j - r['b2'])/(r['c2'] - r['c1']/j)) == j:
p = 2
# End of condition for type 6
if r['d1']!=0 or r['d2']!=0:
return None
else:
if all(not r[k].has(t) for k in 'a1 a2 b1 b2 c1 c2'.split()):
return None
else:
r['b1'] = r['b1']/r['a1'] ; r['b2'] = r['b2']/r['a2']
r['c1'] = r['c1']/r['a1'] ; r['c2'] = r['c2']/r['a2']
if p:
return "type6"
else:
# Equations for type 7 are Eq(diff(x(t),t), f(t)*x(t) + g(t)*y(t)) and Eq(diff(y(t),t), h(t)*x(t) + p(t)*y(t))
return "type7"
def check_linear_2eq_order2(eq, func, func_coef):
x = func[0].func
y = func[1].func
fc = func_coef
t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0]
r = dict()
a = Wild('a', exclude=[1/t])
b = Wild('b', exclude=[1/t**2])
u = Wild('u', exclude=[t, t**2])
v = Wild('v', exclude=[t, t**2])
w = Wild('w', exclude=[t, t**2])
p = Wild('p', exclude=[t, t**2])
r['a1'] = fc[0,x(t),2] ; r['a2'] = fc[1,y(t),2]
r['b1'] = fc[0,x(t),1] ; r['b2'] = fc[1,x(t),1]
r['c1'] = fc[0,y(t),1] ; r['c2'] = fc[1,y(t),1]
r['d1'] = fc[0,x(t),0] ; r['d2'] = fc[1,x(t),0]
r['e1'] = fc[0,y(t),0] ; r['e2'] = fc[1,y(t),0]
const = [S.Zero, S.Zero]
for i in range(2):
for j in Add.make_args(eq[i]):
if not (j.has(x(t)) or j.has(y(t))):
const[i] += j
r['f1'] = const[0]
r['f2'] = const[1]
if r['f1']!=0 or r['f2']!=0:
if all(not r[k].has(t) for k in 'a1 a2 d1 d2 e1 e2 f1 f2'.split()) \
and r['b1']==r['c1']==r['b2']==r['c2']==0:
return "type2"
elif all(not r[k].has(t) for k in 'a1 a2 b1 b2 c1 c2 d1 d2 e1 e1'.split()):
p = [S.Zero, S.Zero] ; q = [S.Zero, S.Zero]
for n, e in enumerate([r['f1'], r['f2']]):
if e.has(t):
tpart = e.as_independent(t, Mul)[1]
for i in Mul.make_args(tpart):
if i.has(exp):
b, e = i.as_base_exp()
co = e.coeff(t)
if co and not co.has(t) and co.has(I):
p[n] = 1
else:
q[n] = 1
else:
q[n] = 1
else:
q[n] = 1
if p[0]==1 and p[1]==1 and q[0]==0 and q[1]==0:
return "type4"
else:
return None
else:
return None
else:
if r['b1']==r['b2']==r['c1']==r['c2']==0 and all(not r[k].has(t) \
for k in 'a1 a2 d1 d2 e1 e2'.split()):
return "type1"
elif r['b1']==r['e1']==r['c2']==r['d2']==0 and all(not r[k].has(t) \
for k in 'a1 a2 b2 c1 d1 e2'.split()) and r['c1'] == -r['b2'] and \
r['d1'] == r['e2']:
return "type3"
elif cancel(-r['b2']/r['d2'])==t and cancel(-r['c1']/r['e1'])==t and not \
(r['d2']/r['a2']).has(t) and not (r['e1']/r['a1']).has(t) and \
r['b1']==r['d1']==r['c2']==r['e2']==0:
return "type5"
elif ((r['a1']/r['d1']).expand()).match((p*(u*t**2+v*t+w)**2).expand()) and not \
(cancel(r['a1']*r['d2']/(r['a2']*r['d1']))).has(t) and not (r['d1']/r['e1']).has(t) and not \
(r['d2']/r['e2']).has(t) and r['b1'] == r['b2'] == r['c1'] == r['c2'] == 0:
return "type10"
elif not cancel(r['d1']/r['e1']).has(t) and not cancel(r['d2']/r['e2']).has(t) and not \
cancel(r['d1']*r['a2']/(r['d2']*r['a1'])).has(t) and r['b1']==r['b2']==r['c1']==r['c2']==0:
return "type6"
elif not cancel(r['b1']/r['c1']).has(t) and not cancel(r['b2']/r['c2']).has(t) and not \
cancel(r['b1']*r['a2']/(r['b2']*r['a1'])).has(t) and r['d1']==r['d2']==r['e1']==r['e2']==0:
return "type7"
elif cancel(-r['b2']/r['d2'])==t and cancel(-r['c1']/r['e1'])==t and not \
cancel(r['e1']*r['a2']/(r['d2']*r['a1'])).has(t) and r['e1'].has(t) \
and r['b1']==r['d1']==r['c2']==r['e2']==0:
return "type8"
elif (r['b1']/r['a1']).match(a/t) and (r['b2']/r['a2']).match(a/t) and not \
(r['b1']/r['c1']).has(t) and not (r['b2']/r['c2']).has(t) and \
(r['d1']/r['a1']).match(b/t**2) and (r['d2']/r['a2']).match(b/t**2) \
and not (r['d1']/r['e1']).has(t) and not (r['d2']/r['e2']).has(t):
return "type9"
elif -r['b1']/r['d1']==-r['c1']/r['e1']==-r['b2']/r['d2']==-r['c2']/r['e2']==t:
return "type11"
else:
return None
def check_nonlinear_2eq_order1(eq, func, func_coef):
t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0]
f = Wild('f')
g = Wild('g')
u, v = symbols('u, v', cls=Dummy)
def check_type(x, y):
r1 = eq[0].match(t*diff(x(t),t) - x(t) + f)
r2 = eq[1].match(t*diff(y(t),t) - y(t) + g)
if not (r1 and r2):
r1 = eq[0].match(diff(x(t),t) - x(t)/t + f/t)
r2 = eq[1].match(diff(y(t),t) - y(t)/t + g/t)
if not (r1 and r2):
r1 = (-eq[0]).match(t*diff(x(t),t) - x(t) + f)
r2 = (-eq[1]).match(t*diff(y(t),t) - y(t) + g)
if not (r1 and r2):
r1 = (-eq[0]).match(diff(x(t),t) - x(t)/t + f/t)
r2 = (-eq[1]).match(diff(y(t),t) - y(t)/t + g/t)
if r1 and r2 and not (r1[f].subs(diff(x(t),t),u).subs(diff(y(t),t),v).has(t) \
or r2[g].subs(diff(x(t),t),u).subs(diff(y(t),t),v).has(t)):
return 'type5'
else:
return None
for func_ in func:
if isinstance(func_, list):
x = func[0][0].func
y = func[0][1].func
eq_type = check_type(x, y)
if not eq_type:
eq_type = check_type(y, x)
return eq_type
x = func[0].func
y = func[1].func
fc = func_coef
n = Wild('n', exclude=[x(t),y(t)])
f1 = Wild('f1', exclude=[v,t])
f2 = Wild('f2', exclude=[v,t])
g1 = Wild('g1', exclude=[u,t])
g2 = Wild('g2', exclude=[u,t])
for i in range(2):
eqs = 0
for terms in Add.make_args(eq[i]):
eqs += terms/fc[i,func[i],1]
eq[i] = eqs
r = eq[0].match(diff(x(t),t) - x(t)**n*f)
if r:
g = (diff(y(t),t) - eq[1])/r[f]
if r and not (g.has(x(t)) or g.subs(y(t),v).has(t) or r[f].subs(x(t),u).subs(y(t),v).has(t)):
return 'type1'
r = eq[0].match(diff(x(t),t) - exp(n*x(t))*f)
if r:
g = (diff(y(t),t) - eq[1])/r[f]
if r and not (g.has(x(t)) or g.subs(y(t),v).has(t) or r[f].subs(x(t),u).subs(y(t),v).has(t)):
return 'type2'
g = Wild('g')
r1 = eq[0].match(diff(x(t),t) - f)
r2 = eq[1].match(diff(y(t),t) - g)
if r1 and r2 and not (r1[f].subs(x(t),u).subs(y(t),v).has(t) or \
r2[g].subs(x(t),u).subs(y(t),v).has(t)):
return 'type3'
r1 = eq[0].match(diff(x(t),t) - f)
r2 = eq[1].match(diff(y(t),t) - g)
num, den = (
(r1[f].subs(x(t),u).subs(y(t),v))/
(r2[g].subs(x(t),u).subs(y(t),v))).as_numer_denom()
R1 = num.match(f1*g1)
R2 = den.match(f2*g2)
# phi = (r1[f].subs(x(t),u).subs(y(t),v))/num
if R1 and R2:
return 'type4'
return None
def check_nonlinear_2eq_order2(eq, func, func_coef):
return None
def check_nonlinear_3eq_order1(eq, func, func_coef):
x = func[0].func
y = func[1].func
z = func[2].func
fc = func_coef
t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0]
u, v, w = symbols('u, v, w', cls=Dummy)
a = Wild('a', exclude=[x(t), y(t), z(t), t])
b = Wild('b', exclude=[x(t), y(t), z(t), t])
c = Wild('c', exclude=[x(t), y(t), z(t), t])
f = Wild('f')
F1 = Wild('F1')
F2 = Wild('F2')
F3 = Wild('F3')
for i in range(3):
eqs = 0
for terms in Add.make_args(eq[i]):
eqs += terms/fc[i,func[i],1]
eq[i] = eqs
r1 = eq[0].match(diff(x(t),t) - a*y(t)*z(t))
r2 = eq[1].match(diff(y(t),t) - b*z(t)*x(t))
r3 = eq[2].match(diff(z(t),t) - c*x(t)*y(t))
if r1 and r2 and r3:
num1, den1 = r1[a].as_numer_denom()
num2, den2 = r2[b].as_numer_denom()
num3, den3 = r3[c].as_numer_denom()
if solve([num1*u-den1*(v-w), num2*v-den2*(w-u), num3*w-den3*(u-v)],[u, v]):
return 'type1'
r = eq[0].match(diff(x(t),t) - y(t)*z(t)*f)
if r:
r1 = collect_const(r[f]).match(a*f)
r2 = ((diff(y(t),t) - eq[1])/r1[f]).match(b*z(t)*x(t))
r3 = ((diff(z(t),t) - eq[2])/r1[f]).match(c*x(t)*y(t))
if r1 and r2 and r3:
num1, den1 = r1[a].as_numer_denom()
num2, den2 = r2[b].as_numer_denom()
num3, den3 = r3[c].as_numer_denom()
if solve([num1*u-den1*(v-w), num2*v-den2*(w-u), num3*w-den3*(u-v)],[u, v]):
return 'type2'
r = eq[0].match(diff(x(t),t) - (F2-F3))
if r:
r1 = collect_const(r[F2]).match(c*F2)
r1.update(collect_const(r[F3]).match(b*F3))
if r1:
if eq[1].has(r1[F2]) and not eq[1].has(r1[F3]):
r1[F2], r1[F3] = r1[F3], r1[F2]
r1[c], r1[b] = -r1[b], -r1[c]
r2 = eq[1].match(diff(y(t),t) - a*r1[F3] + r1[c]*F1)
if r2:
r3 = (eq[2] == diff(z(t),t) - r1[b]*r2[F1] + r2[a]*r1[F2])
if r1 and r2 and r3:
return 'type3'
r = eq[0].match(diff(x(t),t) - z(t)*F2 + y(t)*F3)
if r:
r1 = collect_const(r[F2]).match(c*F2)
r1.update(collect_const(r[F3]).match(b*F3))
if r1:
if eq[1].has(r1[F2]) and not eq[1].has(r1[F3]):
r1[F2], r1[F3] = r1[F3], r1[F2]
r1[c], r1[b] = -r1[b], -r1[c]
r2 = (diff(y(t),t) - eq[1]).match(a*x(t)*r1[F3] - r1[c]*z(t)*F1)
if r2:
r3 = (diff(z(t),t) - eq[2] == r1[b]*y(t)*r2[F1] - r2[a]*x(t)*r1[F2])
if r1 and r2 and r3:
return 'type4'
r = (diff(x(t),t) - eq[0]).match(x(t)*(F2 - F3))
if r:
r1 = collect_const(r[F2]).match(c*F2)
r1.update(collect_const(r[F3]).match(b*F3))
if r1:
if eq[1].has(r1[F2]) and not eq[1].has(r1[F3]):
r1[F2], r1[F3] = r1[F3], r1[F2]
r1[c], r1[b] = -r1[b], -r1[c]
r2 = (diff(y(t),t) - eq[1]).match(y(t)*(a*r1[F3] - r1[c]*F1))
if r2:
r3 = (diff(z(t),t) - eq[2] == z(t)*(r1[b]*r2[F1] - r2[a]*r1[F2]))
if r1 and r2 and r3:
return 'type5'
return None
def check_nonlinear_3eq_order2(eq, func, func_coef):
return None
@vectorize(0)
def odesimp(ode, eq, func, hint):
r"""
Simplifies solutions of ODEs, including trying to solve for ``func`` and
running :py:meth:`~sympy.solvers.ode.constantsimp`.
It may use knowledge of the type of solution that the hint returns to
apply additional simplifications.
It also attempts to integrate any :py:class:`~sympy.integrals.integrals.Integral`\s
in the expression, if the hint is not an ``_Integral`` hint.
This function should have no effect on expressions returned by
:py:meth:`~sympy.solvers.ode.dsolve`, as
:py:meth:`~sympy.solvers.ode.dsolve` already calls
:py:meth:`~sympy.solvers.ode.ode.odesimp`, but the individual hint functions
do not call :py:meth:`~sympy.solvers.ode.ode.odesimp` (because the
:py:meth:`~sympy.solvers.ode.dsolve` wrapper does). Therefore, this
function is designed for mainly internal use.
Examples
========
>>> from sympy import sin, symbols, dsolve, pprint, Function
>>> from sympy.solvers.ode.ode import odesimp
>>> x , u2, C1= symbols('x,u2,C1')
>>> f = Function('f')
>>> eq = dsolve(x*f(x).diff(x) - f(x) - x*sin(f(x)/x), f(x),
... hint='1st_homogeneous_coeff_subs_indep_div_dep_Integral',
... simplify=False)
>>> pprint(eq, wrap_line=False)
x
----
f(x)
/
|
| / 1 \
| -|u2 + -------|
| | /1 \|
| | sin|--||
| \ \u2//
log(f(x)) = log(C1) + | ---------------- d(u2)
| 2
| u2
|
/
>>> pprint(odesimp(eq, f(x), 1, {C1},
... hint='1st_homogeneous_coeff_subs_indep_div_dep'
... )) #doctest: +SKIP
x
--------- = C1
/f(x)\
tan|----|
\2*x /
"""
x = func.args[0]
f = func.func
C1 = get_numbered_constants(eq, num=1)
constants = eq.free_symbols - ode.free_symbols
# First, integrate if the hint allows it.
eq = _handle_Integral(eq, func, hint)
if hint.startswith("nth_linear_euler_eq_nonhomogeneous"):
eq = simplify(eq)
if not isinstance(eq, Equality):
raise TypeError("eq should be an instance of Equality")
# Second, clean up the arbitrary constants.
# Right now, nth linear hints can put as many as 2*order constants in an
# expression. If that number grows with another hint, the third argument
# here should be raised accordingly, or constantsimp() rewritten to handle
# an arbitrary number of constants.
eq = constantsimp(eq, constants)
# Lastly, now that we have cleaned up the expression, try solving for func.
# When CRootOf is implemented in solve(), we will want to return a CRootOf
# every time instead of an Equality.
# Get the f(x) on the left if possible.
if eq.rhs == func and not eq.lhs.has(func):
eq = [Eq(eq.rhs, eq.lhs)]
# make sure we are working with lists of solutions in simplified form.
if eq.lhs == func and not eq.rhs.has(func):
# The solution is already solved
eq = [eq]
# special simplification of the rhs
if hint.startswith("nth_linear_constant_coeff"):
# Collect terms to make the solution look nice.
# This is also necessary for constantsimp to remove unnecessary
# terms from the particular solution from variation of parameters
#
# Collect is not behaving reliably here. The results for
# some linear constant-coefficient equations with repeated
# roots do not properly simplify all constants sometimes.
# 'collectterms' gives different orders sometimes, and results
# differ in collect based on that order. The
# sort-reverse trick fixes things, but may fail in the
# future. In addition, collect is splitting exponentials with
# rational powers for no reason. We have to do a match
# to fix this using Wilds.
#
# XXX: This global collectterms hack should be removed.
global collectterms
collectterms.sort(key=default_sort_key)
collectterms.reverse()
assert len(eq) == 1 and eq[0].lhs == f(x)
sol = eq[0].rhs
sol = expand_mul(sol)
for i, reroot, imroot in collectterms:
sol = collect(sol, x**i*exp(reroot*x)*sin(abs(imroot)*x))
sol = collect(sol, x**i*exp(reroot*x)*cos(imroot*x))
for i, reroot, imroot in collectterms:
sol = collect(sol, x**i*exp(reroot*x))
del collectterms
# Collect is splitting exponentials with rational powers for
# no reason. We call powsimp to fix.
sol = powsimp(sol)
eq[0] = Eq(f(x), sol)
else:
# The solution is not solved, so try to solve it
try:
floats = any(i.is_Float for i in eq.atoms(Number))
eqsol = solve(eq, func, force=True, rational=False if floats else None)
if not eqsol:
raise NotImplementedError
except (NotImplementedError, PolynomialError):
eq = [eq]
else:
def _expand(expr):
numer, denom = expr.as_numer_denom()
if denom.is_Add:
return expr
else:
return powsimp(expr.expand(), combine='exp', deep=True)
# XXX: the rest of odesimp() expects each ``t`` to be in a
# specific normal form: rational expression with numerator
# expanded, but with combined exponential functions (at
# least in this setup all tests pass).
eq = [Eq(f(x), _expand(t)) for t in eqsol]
# special simplification of the lhs.
if hint.startswith("1st_homogeneous_coeff"):
for j, eqi in enumerate(eq):
newi = logcombine(eqi, force=True)
if isinstance(newi.lhs, log) and newi.rhs == 0:
newi = Eq(newi.lhs.args[0]/C1, C1)
eq[j] = newi
# We cleaned up the constants before solving to help the solve engine with
# a simpler expression, but the solved expression could have introduced
# things like -C1, so rerun constantsimp() one last time before returning.
for i, eqi in enumerate(eq):
eq[i] = constantsimp(eqi, constants)
eq[i] = constant_renumber(eq[i], ode.free_symbols)
# If there is only 1 solution, return it;
# otherwise return the list of solutions.
if len(eq) == 1:
eq = eq[0]
return eq
def ode_sol_simplicity(sol, func, trysolving=True):
r"""
Returns an extended integer representing how simple a solution to an ODE
is.
The following things are considered, in order from most simple to least:
- ``sol`` is solved for ``func``.
- ``sol`` is not solved for ``func``, but can be if passed to solve (e.g.,
a solution returned by ``dsolve(ode, func, simplify=False``).
- If ``sol`` is not solved for ``func``, then base the result on the
length of ``sol``, as computed by ``len(str(sol))``.
- If ``sol`` has any unevaluated :py:class:`~sympy.integrals.integrals.Integral`\s,
this will automatically be considered less simple than any of the above.
This function returns an integer such that if solution A is simpler than
solution B by above metric, then ``ode_sol_simplicity(sola, func) <
ode_sol_simplicity(solb, func)``.
Currently, the following are the numbers returned, but if the heuristic is
ever improved, this may change. Only the ordering is guaranteed.
+----------------------------------------------+-------------------+
| Simplicity | Return |
+==============================================+===================+
| ``sol`` solved for ``func`` | ``-2`` |
+----------------------------------------------+-------------------+
| ``sol`` not solved for ``func`` but can be | ``-1`` |
+----------------------------------------------+-------------------+
| ``sol`` is not solved nor solvable for | ``len(str(sol))`` |
| ``func`` | |
+----------------------------------------------+-------------------+
| ``sol`` contains an | ``oo`` |
| :obj:`~sympy.integrals.integrals.Integral` | |
+----------------------------------------------+-------------------+
``oo`` here means the SymPy infinity, which should compare greater than
any integer.
If you already know :py:meth:`~sympy.solvers.solvers.solve` cannot solve
``sol``, you can use ``trysolving=False`` to skip that step, which is the
only potentially slow step. For example,
:py:meth:`~sympy.solvers.ode.dsolve` with the ``simplify=False`` flag
should do this.
If ``sol`` is a list of solutions, if the worst solution in the list
returns ``oo`` it returns that, otherwise it returns ``len(str(sol))``,
that is, the length of the string representation of the whole list.
Examples
========
This function is designed to be passed to ``min`` as the key argument,
such as ``min(listofsolutions, key=lambda i: ode_sol_simplicity(i,
f(x)))``.
>>> from sympy import symbols, Function, Eq, tan, Integral
>>> from sympy.solvers.ode.ode import ode_sol_simplicity
>>> x, C1, C2 = symbols('x, C1, C2')
>>> f = Function('f')
>>> ode_sol_simplicity(Eq(f(x), C1*x**2), f(x))
-2
>>> ode_sol_simplicity(Eq(x**2 + f(x), C1), f(x))
-1
>>> ode_sol_simplicity(Eq(f(x), C1*Integral(2*x, x)), f(x))
oo
>>> eq1 = Eq(f(x)/tan(f(x)/(2*x)), C1)
>>> eq2 = Eq(f(x)/tan(f(x)/(2*x) + f(x)), C2)
>>> [ode_sol_simplicity(eq, f(x)) for eq in [eq1, eq2]]
[28, 35]
>>> min([eq1, eq2], key=lambda i: ode_sol_simplicity(i, f(x)))
Eq(f(x)/tan(f(x)/(2*x)), C1)
"""
# TODO: if two solutions are solved for f(x), we still want to be
# able to get the simpler of the two
# See the docstring for the coercion rules. We check easier (faster)
# things here first, to save time.
if iterable(sol):
# See if there are Integrals
for i in sol:
if ode_sol_simplicity(i, func, trysolving=trysolving) == oo:
return oo
return len(str(sol))
if sol.has(Integral):
return oo
# Next, try to solve for func. This code will change slightly when CRootOf
# is implemented in solve(). Probably a CRootOf solution should fall
# somewhere between a normal solution and an unsolvable expression.
# First, see if they are already solved
if sol.lhs == func and not sol.rhs.has(func) or \
sol.rhs == func and not sol.lhs.has(func):
return -2
# We are not so lucky, try solving manually
if trysolving:
try:
sols = solve(sol, func)
if not sols:
raise NotImplementedError
except NotImplementedError:
pass
else:
return -1
# Finally, a naive computation based on the length of the string version
# of the expression. This may favor combined fractions because they
# will not have duplicate denominators, and may slightly favor expressions
# with fewer additions and subtractions, as those are separated by spaces
# by the printer.
# Additional ideas for simplicity heuristics are welcome, like maybe
# checking if a equation has a larger domain, or if constantsimp has
# introduced arbitrary constants numbered higher than the order of a
# given ODE that sol is a solution of.
return len(str(sol))
def _get_constant_subexpressions(expr, Cs):
Cs = set(Cs)
Ces = []
def _recursive_walk(expr):
expr_syms = expr.free_symbols
if expr_syms and expr_syms.issubset(Cs):
Ces.append(expr)
else:
if expr.func == exp:
expr = expr.expand(mul=True)
if expr.func in (Add, Mul):
d = sift(expr.args, lambda i : i.free_symbols.issubset(Cs))
if len(d[True]) > 1:
x = expr.func(*d[True])
if not x.is_number:
Ces.append(x)
elif isinstance(expr, Integral):
if expr.free_symbols.issubset(Cs) and \
all(len(x) == 3 for x in expr.limits):
Ces.append(expr)
for i in expr.args:
_recursive_walk(i)
return
_recursive_walk(expr)
return Ces
def __remove_linear_redundancies(expr, Cs):
cnts = {i: expr.count(i) for i in Cs}
Cs = [i for i in Cs if cnts[i] > 0]
def _linear(expr):
if isinstance(expr, Add):
xs = [i for i in Cs if expr.count(i)==cnts[i] \
and 0 == expr.diff(i, 2)]
d = {}
for x in xs:
y = expr.diff(x)
if y not in d:
d[y]=[]
d[y].append(x)
for y in d:
if len(d[y]) > 1:
d[y].sort(key=str)
for x in d[y][1:]:
expr = expr.subs(x, 0)
return expr
def _recursive_walk(expr):
if len(expr.args) != 0:
expr = expr.func(*[_recursive_walk(i) for i in expr.args])
expr = _linear(expr)
return expr
if isinstance(expr, Equality):
lhs, rhs = [_recursive_walk(i) for i in expr.args]
f = lambda i: isinstance(i, Number) or i in Cs
if isinstance(lhs, Symbol) and lhs in Cs:
rhs, lhs = lhs, rhs
if lhs.func in (Add, Symbol) and rhs.func in (Add, Symbol):
dlhs = sift([lhs] if isinstance(lhs, AtomicExpr) else lhs.args, f)
drhs = sift([rhs] if isinstance(rhs, AtomicExpr) else rhs.args, f)
for i in [True, False]:
for hs in [dlhs, drhs]:
if i not in hs:
hs[i] = [0]
# this calculation can be simplified
lhs = Add(*dlhs[False]) - Add(*drhs[False])
rhs = Add(*drhs[True]) - Add(*dlhs[True])
elif lhs.func in (Mul, Symbol) and rhs.func in (Mul, Symbol):
dlhs = sift([lhs] if isinstance(lhs, AtomicExpr) else lhs.args, f)
if True in dlhs:
if False not in dlhs:
dlhs[False] = [1]
lhs = Mul(*dlhs[False])
rhs = rhs/Mul(*dlhs[True])
return Eq(lhs, rhs)
else:
return _recursive_walk(expr)
@vectorize(0)
def constantsimp(expr, constants):
r"""
Simplifies an expression with arbitrary constants in it.
This function is written specifically to work with
:py:meth:`~sympy.solvers.ode.dsolve`, and is not intended for general use.
Simplification is done by "absorbing" the arbitrary constants into other
arbitrary constants, numbers, and symbols that they are not independent
of.
The symbols must all have the same name with numbers after it, for
example, ``C1``, ``C2``, ``C3``. The ``symbolname`` here would be
'``C``', the ``startnumber`` would be 1, and the ``endnumber`` would be 3.
If the arbitrary constants are independent of the variable ``x``, then the
independent symbol would be ``x``. There is no need to specify the
dependent function, such as ``f(x)``, because it already has the
independent symbol, ``x``, in it.
Because terms are "absorbed" into arbitrary constants and because
constants are renumbered after simplifying, the arbitrary constants in
expr are not necessarily equal to the ones of the same name in the
returned result.
If two or more arbitrary constants are added, multiplied, or raised to the
power of each other, they are first absorbed together into a single
arbitrary constant. Then the new constant is combined into other terms if
necessary.
Absorption of constants is done with limited assistance:
1. terms of :py:class:`~sympy.core.add.Add`\s are collected to try join
constants so `e^x (C_1 \cos(x) + C_2 \cos(x))` will simplify to `e^x
C_1 \cos(x)`;
2. powers with exponents that are :py:class:`~sympy.core.add.Add`\s are
expanded so `e^{C_1 + x}` will be simplified to `C_1 e^x`.
Use :py:meth:`~sympy.solvers.ode.ode.constant_renumber` to renumber constants
after simplification or else arbitrary numbers on constants may appear,
e.g. `C_1 + C_3 x`.
In rare cases, a single constant can be "simplified" into two constants.
Every differential equation solution should have as many arbitrary
constants as the order of the differential equation. The result here will
be technically correct, but it may, for example, have `C_1` and `C_2` in
an expression, when `C_1` is actually equal to `C_2`. Use your discretion
in such situations, and also take advantage of the ability to use hints in
:py:meth:`~sympy.solvers.ode.dsolve`.
Examples
========
>>> from sympy import symbols
>>> from sympy.solvers.ode.ode import constantsimp
>>> C1, C2, C3, x, y = symbols('C1, C2, C3, x, y')
>>> constantsimp(2*C1*x, {C1, C2, C3})
C1*x
>>> constantsimp(C1 + 2 + x, {C1, C2, C3})
C1 + x
>>> constantsimp(C1*C2 + 2 + C2 + C3*x, {C1, C2, C3})
C1 + C3*x
"""
# This function works recursively. The idea is that, for Mul,
# Add, Pow, and Function, if the class has a constant in it, then
# we can simplify it, which we do by recursing down and
# simplifying up. Otherwise, we can skip that part of the
# expression.
Cs = constants
orig_expr = expr
constant_subexprs = _get_constant_subexpressions(expr, Cs)
for xe in constant_subexprs:
xes = list(xe.free_symbols)
if not xes:
continue
if all([expr.count(c) == xe.count(c) for c in xes]):
xes.sort(key=str)
expr = expr.subs(xe, xes[0])
# try to perform common sub-expression elimination of constant terms
try:
commons, rexpr = cse(expr)
commons.reverse()
rexpr = rexpr[0]
for s in commons:
cs = list(s[1].atoms(Symbol))
if len(cs) == 1 and cs[0] in Cs and \
cs[0] not in rexpr.atoms(Symbol) and \
not any(cs[0] in ex for ex in commons if ex != s):
rexpr = rexpr.subs(s[0], cs[0])
else:
rexpr = rexpr.subs(*s)
expr = rexpr
except IndexError:
pass
expr = __remove_linear_redundancies(expr, Cs)
def _conditional_term_factoring(expr):
new_expr = terms_gcd(expr, clear=False, deep=True, expand=False)
# we do not want to factor exponentials, so handle this separately
if new_expr.is_Mul:
infac = False
asfac = False
for m in new_expr.args:
if isinstance(m, exp):
asfac = True
elif m.is_Add:
infac = any(isinstance(fi, exp) for t in m.args
for fi in Mul.make_args(t))
if asfac and infac:
new_expr = expr
break
return new_expr
expr = _conditional_term_factoring(expr)
# call recursively if more simplification is possible
if orig_expr != expr:
return constantsimp(expr, Cs)
return expr
def constant_renumber(expr, variables=None, newconstants=None):
r"""
Renumber arbitrary constants in ``expr`` to use the symbol names as given
in ``newconstants``. In the process, this reorders expression terms in a
standard way.
If ``newconstants`` is not provided then the new constant names will be
``C1``, ``C2`` etc. Otherwise ``newconstants`` should be an iterable
giving the new symbols to use for the constants in order.
The ``variables`` argument is a list of non-constant symbols. All other
free symbols found in ``expr`` are assumed to be constants and will be
renumbered. If ``variables`` is not given then any numbered symbol
beginning with ``C`` (e.g. ``C1``) is assumed to be a constant.
Symbols are renumbered based on ``.sort_key()``, so they should be
numbered roughly in the order that they appear in the final, printed
expression. Note that this ordering is based in part on hashes, so it can
produce different results on different machines.
The structure of this function is very similar to that of
:py:meth:`~sympy.solvers.ode.constantsimp`.
Examples
========
>>> from sympy import symbols
>>> from sympy.solvers.ode.ode import constant_renumber
>>> x, C1, C2, C3 = symbols('x,C1:4')
>>> expr = C3 + C2*x + C1*x**2
>>> expr
C1*x**2 + C2*x + C3
>>> constant_renumber(expr)
C1 + C2*x + C3*x**2
The ``variables`` argument specifies which are constants so that the
other symbols will not be renumbered:
>>> constant_renumber(expr, [C1, x])
C1*x**2 + C2 + C3*x
The ``newconstants`` argument is used to specify what symbols to use when
replacing the constants:
>>> constant_renumber(expr, [x], newconstants=symbols('E1:4'))
E1 + E2*x + E3*x**2
"""
if type(expr) in (set, list, tuple):
renumbered = [constant_renumber(e, variables, newconstants) for e in expr]
return type(expr)(renumbered)
# Symbols in solution but not ODE are constants
if variables is not None:
variables = set(variables)
constantsymbols = list(expr.free_symbols - variables)
# Any Cn is a constant...
else:
variables = set()
isconstant = lambda s: s.startswith('C') and s[1:].isdigit()
constantsymbols = [sym for sym in expr.free_symbols if isconstant(sym.name)]
# Find new constants checking that they aren't already in the ODE
if newconstants is None:
iter_constants = numbered_symbols(start=1, prefix='C', exclude=variables)
else:
iter_constants = (sym for sym in newconstants if sym not in variables)
# XXX: This global newstartnumber hack should be removed
global newstartnumber
newstartnumber = 1
endnumber = len(constantsymbols)
constants_found = [None]*(endnumber + 2)
# make a mapping to send all constantsymbols to S.One and use
# that to make sure that term ordering is not dependent on
# the indexed value of C
C_1 = [(ci, S.One) for ci in constantsymbols]
sort_key=lambda arg: default_sort_key(arg.subs(C_1))
def _constant_renumber(expr):
r"""
We need to have an internal recursive function so that
newstartnumber maintains its values throughout recursive calls.
"""
# FIXME: Use nonlocal here when support for Py2 is dropped:
global newstartnumber
if isinstance(expr, Equality):
return Eq(
_constant_renumber(expr.lhs),
_constant_renumber(expr.rhs))
if type(expr) not in (Mul, Add, Pow) and not expr.is_Function and \
not expr.has(*constantsymbols):
# Base case, as above. Hope there aren't constants inside
# of some other class, because they won't be renumbered.
return expr
elif expr.is_Piecewise:
return expr
elif expr in constantsymbols:
if expr not in constants_found:
constants_found[newstartnumber] = expr
newstartnumber += 1
return expr
elif expr.is_Function or expr.is_Pow or isinstance(expr, Tuple):
return expr.func(
*[_constant_renumber(x) for x in expr.args])
else:
sortedargs = list(expr.args)
sortedargs.sort(key=sort_key)
return expr.func(*[_constant_renumber(x) for x in sortedargs])
expr = _constant_renumber(expr)
# Don't renumber symbols present in the ODE.
constants_found = [c for c in constants_found if c not in variables]
# Renumbering happens here
expr = expr.subs(zip(constants_found[1:], iter_constants), simultaneous=True)
return expr
def _handle_Integral(expr, func, hint):
r"""
Converts a solution with Integrals in it into an actual solution.
For most hints, this simply runs ``expr.doit()``.
"""
# XXX: This global y hack should be removed
global y
x = func.args[0]
f = func.func
if hint == "1st_exact":
sol = (expr.doit()).subs(y, f(x))
del y
elif hint == "1st_exact_Integral":
sol = Eq(Subs(expr.lhs, y, f(x)), expr.rhs)
del y
elif hint == "nth_linear_constant_coeff_homogeneous":
sol = expr
elif not hint.endswith("_Integral"):
sol = expr.doit()
else:
sol = expr
return sol
# FIXME: replace the general solution in the docstring with
# dsolve(equation, hint='1st_exact_Integral'). You will need to be able
# to have assumptions on P and Q that dP/dy = dQ/dx.
def ode_1st_exact(eq, func, order, match):
r"""
Solves 1st order exact ordinary differential equations.
A 1st order differential equation is called exact if it is the total
differential of a function. That is, the differential equation
.. math:: P(x, y) \,\partial{}x + Q(x, y) \,\partial{}y = 0
is exact if there is some function `F(x, y)` such that `P(x, y) =
\partial{}F/\partial{}x` and `Q(x, y) = \partial{}F/\partial{}y`. It can
be shown that a necessary and sufficient condition for a first order ODE
to be exact is that `\partial{}P/\partial{}y = \partial{}Q/\partial{}x`.
Then, the solution will be as given below::
>>> from sympy import Function, Eq, Integral, symbols, pprint
>>> x, y, t, x0, y0, C1= symbols('x,y,t,x0,y0,C1')
>>> P, Q, F= map(Function, ['P', 'Q', 'F'])
>>> pprint(Eq(Eq(F(x, y), Integral(P(t, y), (t, x0, x)) +
... Integral(Q(x0, t), (t, y0, y))), C1))
x y
/ /
| |
F(x, y) = | P(t, y) dt + | Q(x0, t) dt = C1
| |
/ /
x0 y0
Where the first partials of `P` and `Q` exist and are continuous in a
simply connected region.
A note: SymPy currently has no way to represent inert substitution on an
expression, so the hint ``1st_exact_Integral`` will return an integral
with `dy`. This is supposed to represent the function that you are
solving for.
Examples
========
>>> from sympy import Function, dsolve, cos, sin
>>> from sympy.abc import x
>>> f = Function('f')
>>> dsolve(cos(f(x)) - (x*sin(f(x)) - f(x)**2)*f(x).diff(x),
... f(x), hint='1st_exact')
Eq(x*cos(f(x)) + f(x)**3/3, C1)
References
==========
- https://en.wikipedia.org/wiki/Exact_differential_equation
- M. Tenenbaum & H. Pollard, "Ordinary Differential Equations",
Dover 1963, pp. 73
# indirect doctest
"""
x = func.args[0]
r = match # d+e*diff(f(x),x)
e = r[r['e']]
d = r[r['d']]
# XXX: This global y hack should be removed
global y # This is the only way to pass dummy y to _handle_Integral
y = r['y']
C1 = get_numbered_constants(eq, num=1)
# Refer Joel Moses, "Symbolic Integration - The Stormy Decade",
# Communications of the ACM, Volume 14, Number 8, August 1971, pp. 558
# which gives the method to solve an exact differential equation.
sol = Integral(d, x) + Integral((e - (Integral(d, x).diff(y))), y)
return Eq(sol, C1)
def ode_1st_homogeneous_coeff_best(eq, func, order, match):
r"""
Returns the best solution to an ODE from the two hints
``1st_homogeneous_coeff_subs_dep_div_indep`` and
``1st_homogeneous_coeff_subs_indep_div_dep``.
This is as determined by :py:meth:`~sympy.solvers.ode.ode.ode_sol_simplicity`.
See the
:py:meth:`~sympy.solvers.ode.ode.ode_1st_homogeneous_coeff_subs_indep_div_dep`
and
:py:meth:`~sympy.solvers.ode.ode.ode_1st_homogeneous_coeff_subs_dep_div_indep`
docstrings for more information on these hints. Note that there is no
``ode_1st_homogeneous_coeff_best_Integral`` hint.
Examples
========
>>> from sympy import Function, dsolve, pprint
>>> from sympy.abc import x
>>> f = Function('f')
>>> pprint(dsolve(2*x*f(x) + (x**2 + f(x)**2)*f(x).diff(x), f(x),
... hint='1st_homogeneous_coeff_best', simplify=False))
/ 2 \
| 3*x |
log|----- + 1|
| 2 |
\f (x) /
log(f(x)) = log(C1) - --------------
3
References
==========
- https://en.wikipedia.org/wiki/Homogeneous_differential_equation
- M. Tenenbaum & H. Pollard, "Ordinary Differential Equations",
Dover 1963, pp. 59
# indirect doctest
"""
# There are two substitutions that solve the equation, u1=y/x and u2=x/y
# They produce different integrals, so try them both and see which
# one is easier.
sol1 = ode_1st_homogeneous_coeff_subs_indep_div_dep(eq,
func, order, match)
sol2 = ode_1st_homogeneous_coeff_subs_dep_div_indep(eq,
func, order, match)
simplify = match.get('simplify', True)
if simplify:
# why is odesimp called here? Should it be at the usual spot?
sol1 = odesimp(eq, sol1, func, "1st_homogeneous_coeff_subs_indep_div_dep")
sol2 = odesimp(eq, sol2, func, "1st_homogeneous_coeff_subs_dep_div_indep")
return min([sol1, sol2], key=lambda x: ode_sol_simplicity(x, func,
trysolving=not simplify))
def ode_1st_homogeneous_coeff_subs_dep_div_indep(eq, func, order, match):
r"""
Solves a 1st order differential equation with homogeneous coefficients
using the substitution `u_1 = \frac{\text{<dependent
variable>}}{\text{<independent variable>}}`.
This is a differential equation
.. math:: P(x, y) + Q(x, y) dy/dx = 0
such that `P` and `Q` are homogeneous and of the same order. A function
`F(x, y)` is homogeneous of order `n` if `F(x t, y t) = t^n F(x, y)`.
Equivalently, `F(x, y)` can be rewritten as `G(y/x)` or `H(x/y)`. See
also the docstring of :py:meth:`~sympy.solvers.ode.homogeneous_order`.
If the coefficients `P` and `Q` in the differential equation above are
homogeneous functions of the same order, then it can be shown that the
substitution `y = u_1 x` (i.e. `u_1 = y/x`) will turn the differential
equation into an equation separable in the variables `x` and `u`. If
`h(u_1)` is the function that results from making the substitution `u_1 =
f(x)/x` on `P(x, f(x))` and `g(u_2)` is the function that results from the
substitution on `Q(x, f(x))` in the differential equation `P(x, f(x)) +
Q(x, f(x)) f'(x) = 0`, then the general solution is::
>>> from sympy import Function, dsolve, pprint
>>> from sympy.abc import x
>>> f, g, h = map(Function, ['f', 'g', 'h'])
>>> genform = g(f(x)/x) + h(f(x)/x)*f(x).diff(x)
>>> pprint(genform)
/f(x)\ /f(x)\ d
g|----| + h|----|*--(f(x))
\ x / \ x / dx
>>> pprint(dsolve(genform, f(x),
... hint='1st_homogeneous_coeff_subs_dep_div_indep_Integral'))
f(x)
----
x
/
|
| -h(u1)
log(x) = C1 + | ---------------- d(u1)
| u1*h(u1) + g(u1)
|
/
Where `u_1 h(u_1) + g(u_1) \ne 0` and `x \ne 0`.
See also the docstrings of
:py:meth:`~sympy.solvers.ode.ode.ode_1st_homogeneous_coeff_best` and
:py:meth:`~sympy.solvers.ode.ode.ode_1st_homogeneous_coeff_subs_indep_div_dep`.
Examples
========
>>> from sympy import Function, dsolve
>>> from sympy.abc import x
>>> f = Function('f')
>>> pprint(dsolve(2*x*f(x) + (x**2 + f(x)**2)*f(x).diff(x), f(x),
... hint='1st_homogeneous_coeff_subs_dep_div_indep', simplify=False))
/ 3 \
|3*f(x) f (x)|
log|------ + -----|
| x 3 |
\ x /
log(x) = log(C1) - -------------------
3
References
==========
- https://en.wikipedia.org/wiki/Homogeneous_differential_equation
- M. Tenenbaum & H. Pollard, "Ordinary Differential Equations",
Dover 1963, pp. 59
# indirect doctest
"""
x = func.args[0]
f = func.func
u = Dummy('u')
u1 = Dummy('u1') # u1 == f(x)/x
r = match # d+e*diff(f(x),x)
C1 = get_numbered_constants(eq, num=1)
xarg = match.get('xarg', 0)
yarg = match.get('yarg', 0)
int = Integral(
(-r[r['e']]/(r[r['d']] + u1*r[r['e']])).subs({x: 1, r['y']: u1}),
(u1, None, f(x)/x))
sol = logcombine(Eq(log(x), int + log(C1)), force=True)
sol = sol.subs(f(x), u).subs(((u, u - yarg), (x, x - xarg), (u, f(x))))
return sol
def ode_1st_homogeneous_coeff_subs_indep_div_dep(eq, func, order, match):
r"""
Solves a 1st order differential equation with homogeneous coefficients
using the substitution `u_2 = \frac{\text{<independent
variable>}}{\text{<dependent variable>}}`.
This is a differential equation
.. math:: P(x, y) + Q(x, y) dy/dx = 0
such that `P` and `Q` are homogeneous and of the same order. A function
`F(x, y)` is homogeneous of order `n` if `F(x t, y t) = t^n F(x, y)`.
Equivalently, `F(x, y)` can be rewritten as `G(y/x)` or `H(x/y)`. See
also the docstring of :py:meth:`~sympy.solvers.ode.homogeneous_order`.
If the coefficients `P` and `Q` in the differential equation above are
homogeneous functions of the same order, then it can be shown that the
substitution `x = u_2 y` (i.e. `u_2 = x/y`) will turn the differential
equation into an equation separable in the variables `y` and `u_2`. If
`h(u_2)` is the function that results from making the substitution `u_2 =
x/f(x)` on `P(x, f(x))` and `g(u_2)` is the function that results from the
substitution on `Q(x, f(x))` in the differential equation `P(x, f(x)) +
Q(x, f(x)) f'(x) = 0`, then the general solution is:
>>> from sympy import Function, dsolve, pprint
>>> from sympy.abc import x
>>> f, g, h = map(Function, ['f', 'g', 'h'])
>>> genform = g(x/f(x)) + h(x/f(x))*f(x).diff(x)
>>> pprint(genform)
/ x \ / x \ d
g|----| + h|----|*--(f(x))
\f(x)/ \f(x)/ dx
>>> pprint(dsolve(genform, f(x),
... hint='1st_homogeneous_coeff_subs_indep_div_dep_Integral'))
x
----
f(x)
/
|
| -g(u2)
| ---------------- d(u2)
| u2*g(u2) + h(u2)
|
/
<BLANKLINE>
f(x) = C1*e
Where `u_2 g(u_2) + h(u_2) \ne 0` and `f(x) \ne 0`.
See also the docstrings of
:py:meth:`~sympy.solvers.ode.ode.ode_1st_homogeneous_coeff_best` and
:py:meth:`~sympy.solvers.ode.ode.ode_1st_homogeneous_coeff_subs_dep_div_indep`.
Examples
========
>>> from sympy import Function, pprint, dsolve
>>> from sympy.abc import x
>>> f = Function('f')
>>> pprint(dsolve(2*x*f(x) + (x**2 + f(x)**2)*f(x).diff(x), f(x),
... hint='1st_homogeneous_coeff_subs_indep_div_dep',
... simplify=False))
/ 2 \
| 3*x |
log|----- + 1|
| 2 |
\f (x) /
log(f(x)) = log(C1) - --------------
3
References
==========
- https://en.wikipedia.org/wiki/Homogeneous_differential_equation
- M. Tenenbaum & H. Pollard, "Ordinary Differential Equations",
Dover 1963, pp. 59
# indirect doctest
"""
x = func.args[0]
f = func.func
u = Dummy('u')
u2 = Dummy('u2') # u2 == x/f(x)
r = match # d+e*diff(f(x),x)
C1 = get_numbered_constants(eq, num=1)
xarg = match.get('xarg', 0) # If xarg present take xarg, else zero
yarg = match.get('yarg', 0) # If yarg present take yarg, else zero
int = Integral(
simplify(
(-r[r['d']]/(r[r['e']] + u2*r[r['d']])).subs({x: u2, r['y']: 1})),
(u2, None, x/f(x)))
sol = logcombine(Eq(log(f(x)), int + log(C1)), force=True)
sol = sol.subs(f(x), u).subs(((u, u - yarg), (x, x - xarg), (u, f(x))))
return sol
# XXX: Should this function maybe go somewhere else?
def homogeneous_order(eq, *symbols):
r"""
Returns the order `n` if `g` is homogeneous and ``None`` if it is not
homogeneous.
Determines if a function is homogeneous and if so of what order. A
function `f(x, y, \cdots)` is homogeneous of order `n` if `f(t x, t y,
\cdots) = t^n f(x, y, \cdots)`.
If the function is of two variables, `F(x, y)`, then `f` being homogeneous
of any order is equivalent to being able to rewrite `F(x, y)` as `G(x/y)`
or `H(y/x)`. This fact is used to solve 1st order ordinary differential
equations whose coefficients are homogeneous of the same order (see the
docstrings of
:py:meth:`~sympy.solvers.ode.ode.ode_1st_homogeneous_coeff_subs_dep_div_indep` and
:py:meth:`~sympy.solvers.ode.ode.ode_1st_homogeneous_coeff_subs_indep_div_dep`).
Symbols can be functions, but every argument of the function must be a
symbol, and the arguments of the function that appear in the expression
must match those given in the list of symbols. If a declared function
appears with different arguments than given in the list of symbols,
``None`` is returned.
Examples
========
>>> from sympy import Function, homogeneous_order, sqrt
>>> from sympy.abc import x, y
>>> f = Function('f')
>>> homogeneous_order(f(x), f(x)) is None
True
>>> homogeneous_order(f(x,y), f(y, x), x, y) is None
True
>>> homogeneous_order(f(x), f(x), x)
1
>>> homogeneous_order(x**2*f(x)/sqrt(x**2+f(x)**2), x, f(x))
2
>>> homogeneous_order(x**2+f(x), x, f(x)) is None
True
"""
if not symbols:
raise ValueError("homogeneous_order: no symbols were given.")
symset = set(symbols)
eq = sympify(eq)
# The following are not supported
if eq.has(Order, Derivative):
return None
# These are all constants
if (eq.is_Number or
eq.is_NumberSymbol or
eq.is_number
):
return S.Zero
# Replace all functions with dummy variables
dum = numbered_symbols(prefix='d', cls=Dummy)
newsyms = set()
for i in [j for j in symset if getattr(j, 'is_Function')]:
iargs = set(i.args)
if iargs.difference(symset):
return None
else:
dummyvar = next(dum)
eq = eq.subs(i, dummyvar)
symset.remove(i)
newsyms.add(dummyvar)
symset.update(newsyms)
if not eq.free_symbols & symset:
return None
# assuming order of a nested function can only be equal to zero
if isinstance(eq, Function):
return None if homogeneous_order(
eq.args[0], *tuple(symset)) != 0 else S.Zero
# make the replacement of x with x*t and see if t can be factored out
t = Dummy('t', positive=True) # It is sufficient that t > 0
eqs = separatevars(eq.subs([(i, t*i) for i in symset]), [t], dict=True)[t]
if eqs is S.One:
return S.Zero # there was no term with only t
i, d = eqs.as_independent(t, as_Add=False)
b, e = d.as_base_exp()
if b == t:
return e
def ode_Liouville(eq, func, order, match):
r"""
Solves 2nd order Liouville differential equations.
The general form of a Liouville ODE is
.. math:: \frac{d^2 y}{dx^2} + g(y) \left(\!
\frac{dy}{dx}\!\right)^2 + h(x)
\frac{dy}{dx}\text{.}
The general solution is:
>>> from sympy import Function, dsolve, Eq, pprint, diff
>>> from sympy.abc import x
>>> f, g, h = map(Function, ['f', 'g', 'h'])
>>> genform = Eq(diff(f(x),x,x) + g(f(x))*diff(f(x),x)**2 +
... h(x)*diff(f(x),x), 0)
>>> pprint(genform)
2 2
/d \ d d
g(f(x))*|--(f(x))| + h(x)*--(f(x)) + ---(f(x)) = 0
\dx / dx 2
dx
>>> pprint(dsolve(genform, f(x), hint='Liouville_Integral'))
f(x)
/ /
| |
| / | /
| | | |
| - | h(x) dx | | g(y) dy
| | | |
| / | /
C1 + C2* | e dx + | e dy = 0
| |
/ /
Examples
========
>>> from sympy import Function, dsolve, Eq, pprint
>>> from sympy.abc import x
>>> f = Function('f')
>>> pprint(dsolve(diff(f(x), x, x) + diff(f(x), x)**2/f(x) +
... diff(f(x), x)/x, f(x), hint='Liouville'))
________________ ________________
[f(x) = -\/ C1 + C2*log(x) , f(x) = \/ C1 + C2*log(x) ]
References
==========
- Goldstein and Braun, "Advanced Methods for the Solution of Differential
Equations", pp. 98
- http://www.maplesoft.com/support/help/Maple/view.aspx?path=odeadvisor/Liouville
# indirect doctest
"""
# Liouville ODE:
# f(x).diff(x, 2) + g(f(x))*(f(x).diff(x, 2))**2 + h(x)*f(x).diff(x)
# See Goldstein and Braun, "Advanced Methods for the Solution of
# Differential Equations", pg. 98, as well as
# http://www.maplesoft.com/support/help/view.aspx?path=odeadvisor/Liouville
x = func.args[0]
f = func.func
r = match # f(x).diff(x, 2) + g*f(x).diff(x)**2 + h*f(x).diff(x)
y = r['y']
C1, C2 = get_numbered_constants(eq, num=2)
int = Integral(exp(Integral(r['g'], y)), (y, None, f(x)))
sol = Eq(int + C1*Integral(exp(-Integral(r['h'], x)), x) + C2, 0)
return sol
def ode_2nd_power_series_ordinary(eq, func, order, match):
r"""
Gives a power series solution to a second order homogeneous differential
equation with polynomial coefficients at an ordinary point. A homogeneous
differential equation is of the form
.. math :: P(x)\frac{d^2y}{dx^2} + Q(x)\frac{dy}{dx} + R(x) = 0
For simplicity it is assumed that `P(x)`, `Q(x)` and `R(x)` are polynomials,
it is sufficient that `\frac{Q(x)}{P(x)}` and `\frac{R(x)}{P(x)}` exists at
`x_{0}`. A recurrence relation is obtained by substituting `y` as `\sum_{n=0}^\infty a_{n}x^{n}`,
in the differential equation, and equating the nth term. Using this relation
various terms can be generated.
Examples
========
>>> from sympy import dsolve, Function, pprint
>>> from sympy.abc import x
>>> f = Function("f")
>>> eq = f(x).diff(x, 2) + f(x)
>>> pprint(dsolve(eq, hint='2nd_power_series_ordinary'))
/ 4 2 \ / 2\
|x x | | x | / 6\
f(x) = C2*|-- - -- + 1| + C1*x*|1 - --| + O\x /
\24 2 / \ 6 /
References
==========
- http://tutorial.math.lamar.edu/Classes/DE/SeriesSolutions.aspx
- George E. Simmons, "Differential Equations with Applications and
Historical Notes", p.p 176 - 184
"""
x = func.args[0]
f = func.func
C0, C1 = get_numbered_constants(eq, num=2)
n = Dummy("n", integer=True)
s = Wild("s")
k = Wild("k", exclude=[x])
x0 = match.get('x0')
terms = match.get('terms', 5)
p = match[match['a3']]
q = match[match['b3']]
r = match[match['c3']]
seriesdict = {}
recurr = Function("r")
# Generating the recurrence relation which works this way:
# for the second order term the summation begins at n = 2. The coefficients
# p is multiplied with an*(n - 1)*(n - 2)*x**n-2 and a substitution is made such that
# the exponent of x becomes n.
# For example, if p is x, then the second degree recurrence term is
# an*(n - 1)*(n - 2)*x**n-1, substituting (n - 1) as n, it transforms to
# an+1*n*(n - 1)*x**n.
# A similar process is done with the first order and zeroth order term.
coefflist = [(recurr(n), r), (n*recurr(n), q), (n*(n - 1)*recurr(n), p)]
for index, coeff in enumerate(coefflist):
if coeff[1]:
f2 = powsimp(expand((coeff[1]*(x - x0)**(n - index)).subs(x, x + x0)))
if f2.is_Add:
addargs = f2.args
else:
addargs = [f2]
for arg in addargs:
powm = arg.match(s*x**k)
term = coeff[0]*powm[s]
if not powm[k].is_Symbol:
term = term.subs(n, n - powm[k].as_independent(n)[0])
startind = powm[k].subs(n, index)
# Seeing if the startterm can be reduced further.
# If it vanishes for n lesser than startind, it is
# equal to summation from n.
if startind:
for i in reversed(range(startind)):
if not term.subs(n, i):
seriesdict[term] = i
else:
seriesdict[term] = i + 1
break
else:
seriesdict[term] = S.Zero
# Stripping of terms so that the sum starts with the same number.
teq = S.Zero
suminit = seriesdict.values()
rkeys = seriesdict.keys()
req = Add(*rkeys)
if any(suminit):
maxval = max(suminit)
for term in seriesdict:
val = seriesdict[term]
if val != maxval:
for i in range(val, maxval):
teq += term.subs(n, val)
finaldict = {}
if teq:
fargs = teq.atoms(AppliedUndef)
if len(fargs) == 1:
finaldict[fargs.pop()] = 0
else:
maxf = max(fargs, key = lambda x: x.args[0])
sol = solve(teq, maxf)
if isinstance(sol, list):
sol = sol[0]
finaldict[maxf] = sol
# Finding the recurrence relation in terms of the largest term.
fargs = req.atoms(AppliedUndef)
maxf = max(fargs, key = lambda x: x.args[0])
minf = min(fargs, key = lambda x: x.args[0])
if minf.args[0].is_Symbol:
startiter = 0
else:
startiter = -minf.args[0].as_independent(n)[0]
lhs = maxf
rhs = solve(req, maxf)
if isinstance(rhs, list):
rhs = rhs[0]
# Checking how many values are already present
tcounter = len([t for t in finaldict.values() if t])
for _ in range(tcounter, terms - 3): # Assuming c0 and c1 to be arbitrary
check = rhs.subs(n, startiter)
nlhs = lhs.subs(n, startiter)
nrhs = check.subs(finaldict)
finaldict[nlhs] = nrhs
startiter += 1
# Post processing
series = C0 + C1*(x - x0)
for term in finaldict:
if finaldict[term]:
fact = term.args[0]
series += (finaldict[term].subs([(recurr(0), C0), (recurr(1), C1)])*(
x - x0)**fact)
series = collect(expand_mul(series), [C0, C1]) + Order(x**terms)
return Eq(f(x), series)
def ode_2nd_linear_airy(eq, func, order, match):
r"""
Gives solution of the Airy differential equation
.. math :: \frac{d^2y}{dx^2} + (a + b x) y(x) = 0
in terms of Airy special functions airyai and airybi.
Examples
========
>>> from sympy import dsolve, Function
>>> from sympy.abc import x
>>> f = Function("f")
>>> eq = f(x).diff(x, 2) - x*f(x)
>>> dsolve(eq)
Eq(f(x), C1*airyai(x) + C2*airybi(x))
"""
x = func.args[0]
f = func.func
C0, C1 = get_numbered_constants(eq, num=2)
b = match['b']
m = match['m']
if m.is_positive:
arg = - b/cbrt(m)**2 - cbrt(m)*x
elif m.is_negative:
arg = - b/cbrt(-m)**2 + cbrt(-m)*x
else:
arg = - b/cbrt(-m)**2 + cbrt(-m)*x
return Eq(f(x), C0*airyai(arg) + C1*airybi(arg))
def ode_2nd_power_series_regular(eq, func, order, match):
r"""
Gives a power series solution to a second order homogeneous differential
equation with polynomial coefficients at a regular point. A second order
homogeneous differential equation is of the form
.. math :: P(x)\frac{d^2y}{dx^2} + Q(x)\frac{dy}{dx} + R(x) = 0
A point is said to regular singular at `x0` if `x - x0\frac{Q(x)}{P(x)}`
and `(x - x0)^{2}\frac{R(x)}{P(x)}` are analytic at `x0`. For simplicity
`P(x)`, `Q(x)` and `R(x)` are assumed to be polynomials. The algorithm for
finding the power series solutions is:
1. Try expressing `(x - x0)P(x)` and `((x - x0)^{2})Q(x)` as power series
solutions about x0. Find `p0` and `q0` which are the constants of the
power series expansions.
2. Solve the indicial equation `f(m) = m(m - 1) + m*p0 + q0`, to obtain the
roots `m1` and `m2` of the indicial equation.
3. If `m1 - m2` is a non integer there exists two series solutions. If
`m1 = m2`, there exists only one solution. If `m1 - m2` is an integer,
then the existence of one solution is confirmed. The other solution may
or may not exist.
The power series solution is of the form `x^{m}\sum_{n=0}^\infty a_{n}x^{n}`. The
coefficients are determined by the following recurrence relation.
`a_{n} = -\frac{\sum_{k=0}^{n-1} q_{n-k} + (m + k)p_{n-k}}{f(m + n)}`. For the case
in which `m1 - m2` is an integer, it can be seen from the recurrence relation
that for the lower root `m`, when `n` equals the difference of both the
roots, the denominator becomes zero. So if the numerator is not equal to zero,
a second series solution exists.
Examples
========
>>> from sympy import dsolve, Function, pprint
>>> from sympy.abc import x
>>> f = Function("f")
>>> eq = x*(f(x).diff(x, 2)) + 2*(f(x).diff(x)) + x*f(x)
>>> pprint(dsolve(eq, hint='2nd_power_series_regular'))
/ 6 4 2 \
| x x x |
/ 4 2 \ C1*|- --- + -- - -- + 1|
| x x | \ 720 24 2 / / 6\
f(x) = C2*|--- - -- + 1| + ------------------------ + O\x /
\120 6 / x
References
==========
- George E. Simmons, "Differential Equations with Applications and
Historical Notes", p.p 176 - 184
"""
x = func.args[0]
f = func.func
C0, C1 = get_numbered_constants(eq, num=2)
m = Dummy("m") # for solving the indicial equation
x0 = match.get('x0')
terms = match.get('terms', 5)
p = match['p']
q = match['q']
# Generating the indicial equation
indicial = []
for term in [p, q]:
if not term.has(x):
indicial.append(term)
else:
term = series(term, n=1, x0=x0)
if isinstance(term, Order):
indicial.append(S.Zero)
else:
for arg in term.args:
if not arg.has(x):
indicial.append(arg)
break
p0, q0 = indicial
sollist = solve(m*(m - 1) + m*p0 + q0, m)
if sollist and isinstance(sollist, list) and all(
[sol.is_real for sol in sollist]):
serdict1 = {}
serdict2 = {}
if len(sollist) == 1:
# Only one series solution exists in this case.
m1 = m2 = sollist.pop()
if terms-m1-1 <= 0:
return Eq(f(x), Order(terms))
serdict1 = _frobenius(terms-m1-1, m1, p0, q0, p, q, x0, x, C0)
else:
m1 = sollist[0]
m2 = sollist[1]
if m1 < m2:
m1, m2 = m2, m1
# Irrespective of whether m1 - m2 is an integer or not, one
# Frobenius series solution exists.
serdict1 = _frobenius(terms-m1-1, m1, p0, q0, p, q, x0, x, C0)
if not (m1 - m2).is_integer:
# Second frobenius series solution exists.
serdict2 = _frobenius(terms-m2-1, m2, p0, q0, p, q, x0, x, C1)
else:
# Check if second frobenius series solution exists.
serdict2 = _frobenius(terms-m2-1, m2, p0, q0, p, q, x0, x, C1, check=m1)
if serdict1:
finalseries1 = C0
for key in serdict1:
power = int(key.name[1:])
finalseries1 += serdict1[key]*(x - x0)**power
finalseries1 = (x - x0)**m1*finalseries1
finalseries2 = S.Zero
if serdict2:
for key in serdict2:
power = int(key.name[1:])
finalseries2 += serdict2[key]*(x - x0)**power
finalseries2 += C1
finalseries2 = (x - x0)**m2*finalseries2
return Eq(f(x), collect(finalseries1 + finalseries2,
[C0, C1]) + Order(x**terms))
def ode_2nd_linear_bessel(eq, func, order, match):
r"""
Gives solution of the Bessel differential equation
.. math :: x^2 \frac{d^2y}{dx^2} + x \frac{dy}{dx} y(x) + (x^2-n^2) y(x)
if n is integer then the solution is of the form Eq(f(x), C0 besselj(n,x)
+ C1 bessely(n,x)) as both the solutions are linearly independent else if
n is a fraction then the solution is of the form Eq(f(x), C0 besselj(n,x)
+ C1 besselj(-n,x)) which can also transform into Eq(f(x), C0 besselj(n,x)
+ C1 bessely(n,x)).
Examples
========
>>> from sympy.abc import x
>>> from sympy import Symbol
>>> v = Symbol('v', positive=True)
>>> from sympy.solvers.ode import dsolve
>>> from sympy import Function
>>> f = Function('f')
>>> y = f(x)
>>> genform = x**2*y.diff(x, 2) + x*y.diff(x) + (x**2 - v**2)*y
>>> dsolve(genform)
Eq(f(x), C1*besselj(v, x) + C2*bessely(v, x))
References
==========
https://www.math24.net/bessel-differential-equation/
"""
x = func.args[0]
f = func.func
C0, C1 = get_numbered_constants(eq, num=2)
n = match['n']
a4 = match['a4']
c4 = match['c4']
d4 = match['d4']
b4 = match['b4']
n = sqrt(n**2 + Rational(1, 4)*(c4 - 1)**2)
return Eq(f(x), ((x**(Rational(1-c4,2)))*(C0*besselj(n/d4,a4*x**d4/d4)
+ C1*bessely(n/d4,a4*x**d4/d4))).subs(x, x-b4))
def _frobenius(n, m, p0, q0, p, q, x0, x, c, check=None):
r"""
Returns a dict with keys as coefficients and values as their values in terms of C0
"""
n = int(n)
# In cases where m1 - m2 is not an integer
m2 = check
d = Dummy("d")
numsyms = numbered_symbols("C", start=0)
numsyms = [next(numsyms) for i in range(n + 1)]
serlist = []
for ser in [p, q]:
# Order term not present
if ser.is_polynomial(x) and Poly(ser, x).degree() <= n:
if x0:
ser = ser.subs(x, x + x0)
dict_ = Poly(ser, x).as_dict()
# Order term present
else:
tseries = series(ser, x=x0, n=n+1)
# Removing order
dict_ = Poly(list(ordered(tseries.args))[: -1], x).as_dict()
# Fill in with zeros, if coefficients are zero.
for i in range(n + 1):
if (i,) not in dict_:
dict_[(i,)] = S.Zero
serlist.append(dict_)
pseries = serlist[0]
qseries = serlist[1]
indicial = d*(d - 1) + d*p0 + q0
frobdict = {}
for i in range(1, n + 1):
num = c*(m*pseries[(i,)] + qseries[(i,)])
for j in range(1, i):
sym = Symbol("C" + str(j))
num += frobdict[sym]*((m + j)*pseries[(i - j,)] + qseries[(i - j,)])
# Checking for cases when m1 - m2 is an integer. If num equals zero
# then a second Frobenius series solution cannot be found. If num is not zero
# then set constant as zero and proceed.
if m2 is not None and i == m2 - m:
if num:
return False
else:
frobdict[numsyms[i]] = S.Zero
else:
frobdict[numsyms[i]] = -num/(indicial.subs(d, m+i))
return frobdict
def _nth_order_reducible_match(eq, func):
r"""
Matches any differential equation that can be rewritten with a smaller
order. Only derivatives of ``func`` alone, wrt a single variable,
are considered, and only in them should ``func`` appear.
"""
# ODE only handles functions of 1 variable so this affirms that state
assert len(func.args) == 1
x = func.args[0]
vc = [d.variable_count[0] for d in eq.atoms(Derivative)
if d.expr == func and len(d.variable_count) == 1]
ords = [c for v, c in vc if v == x]
if len(ords) < 2:
return
smallest = min(ords)
# make sure func does not appear outside of derivatives
D = Dummy()
if eq.subs(func.diff(x, smallest), D).has(func):
return
return {'n': smallest}
def ode_nth_order_reducible(eq, func, order, match):
r"""
Solves ODEs that only involve derivatives of the dependent variable using
a substitution of the form `f^n(x) = g(x)`.
For example any second order ODE of the form `f''(x) = h(f'(x), x)` can be
transformed into a pair of 1st order ODEs `g'(x) = h(g(x), x)` and
`f'(x) = g(x)`. Usually the 1st order ODE for `g` is easier to solve. If
that gives an explicit solution for `g` then `f` is found simply by
integration.
Examples
========
>>> from sympy import Function, dsolve, Eq
>>> from sympy.abc import x
>>> f = Function('f')
>>> eq = Eq(x*f(x).diff(x)**2 + f(x).diff(x, 2), 0)
>>> dsolve(eq, f(x), hint='nth_order_reducible')
... # doctest: +NORMALIZE_WHITESPACE
Eq(f(x), C1 - sqrt(-1/C2)*log(-C2*sqrt(-1/C2) + x) + sqrt(-1/C2)*log(C2*sqrt(-1/C2) + x))
"""
x = func.args[0]
f = func.func
n = match['n']
# get a unique function name for g
names = [a.name for a in eq.atoms(AppliedUndef)]
while True:
name = Dummy().name
if name not in names:
g = Function(name)
break
w = f(x).diff(x, n)
geq = eq.subs(w, g(x))
gsol = dsolve(geq, g(x))
if not isinstance(gsol, list):
gsol = [gsol]
# Might be multiple solutions to the reduced ODE:
fsol = []
for gsoli in gsol:
fsoli = dsolve(gsoli.subs(g(x), w), f(x)) # or do integration n times
fsol.append(fsoli)
if len(fsol) == 1:
fsol = fsol[0]
return fsol
def _remove_redundant_solutions(eq, solns, order, var):
r"""
Remove redundant solutions from the set of solutions.
This function is needed because otherwise dsolve can return
redundant solutions. As an example consider:
eq = Eq((f(x).diff(x, 2))*f(x).diff(x), 0)
There are two ways to find solutions to eq. The first is to solve f(x).diff(x, 2) = 0
leading to solution f(x)=C1 + C2*x. The second is to solve the equation f(x).diff(x) = 0
leading to the solution f(x) = C1. In this particular case we then see
that the second solution is a special case of the first and we don't
want to return it.
This does not always happen. If we have
eq = Eq((f(x)**2-4)*(f(x).diff(x)-4), 0)
then we get the algebraic solution f(x) = [-2, 2] and the integral solution
f(x) = x + C1 and in this case the two solutions are not equivalent wrt
initial conditions so both should be returned.
"""
def is_special_case_of(soln1, soln2):
return _is_special_case_of(soln1, soln2, eq, order, var)
unique_solns = []
for soln1 in solns:
for soln2 in unique_solns[:]:
if is_special_case_of(soln1, soln2):
break
elif is_special_case_of(soln2, soln1):
unique_solns.remove(soln2)
else:
unique_solns.append(soln1)
return unique_solns
def _is_special_case_of(soln1, soln2, eq, order, var):
r"""
True if soln1 is found to be a special case of soln2 wrt some value of the
constants that appear in soln2. False otherwise.
"""
# The solutions returned by dsolve may be given explicitly or implicitly.
# We will equate the sol1=(soln1.rhs - soln1.lhs), sol2=(soln2.rhs - soln2.lhs)
# of the two solutions.
#
# Since this is supposed to hold for all x it also holds for derivatives.
# For an order n ode we should be able to differentiate
# each solution n times to get n+1 equations.
#
# We then try to solve those n+1 equations for the integrations constants
# in sol2. If we can find a solution that doesn't depend on x then it
# means that some value of the constants in sol1 is a special case of
# sol2 corresponding to a particular choice of the integration constants.
# In case the solution is in implicit form we subtract the sides
soln1 = soln1.rhs - soln1.lhs
soln2 = soln2.rhs - soln2.lhs
# Work for the series solution
if soln1.has(Order) and soln2.has(Order):
if soln1.getO() == soln2.getO():
soln1 = soln1.removeO()
soln2 = soln2.removeO()
else:
return False
elif soln1.has(Order) or soln2.has(Order):
return False
constants1 = soln1.free_symbols.difference(eq.free_symbols)
constants2 = soln2.free_symbols.difference(eq.free_symbols)
constants1_new = get_numbered_constants(Tuple(soln1, soln2), len(constants1))
if len(constants1) == 1:
constants1_new = {constants1_new}
for c_old, c_new in zip(constants1, constants1_new):
soln1 = soln1.subs(c_old, c_new)
# n equations for sol1 = sol2, sol1'=sol2', ...
lhs = soln1
rhs = soln2
eqns = [Eq(lhs, rhs)]
for n in range(1, order):
lhs = lhs.diff(var)
rhs = rhs.diff(var)
eq = Eq(lhs, rhs)
eqns.append(eq)
# BooleanTrue/False awkwardly show up for trivial equations
if any(isinstance(eq, BooleanFalse) for eq in eqns):
return False
eqns = [eq for eq in eqns if not isinstance(eq, BooleanTrue)]
try:
constant_solns = solve(eqns, constants2)
except NotImplementedError:
return False
# Sometimes returns a dict and sometimes a list of dicts
if isinstance(constant_solns, dict):
constant_solns = [constant_solns]
# after solving the issue 17418, maybe we don't need the following checksol code.
for constant_soln in constant_solns:
for eq in eqns:
eq=eq.rhs-eq.lhs
if checksol(eq, constant_soln) is not True:
return False
# If any solution gives all constants as expressions that don't depend on
# x then there exists constants for soln2 that give soln1
for constant_soln in constant_solns:
if not any(c.has(var) for c in constant_soln.values()):
return True
return False
def _nth_linear_match(eq, func, order):
r"""
Matches a differential equation to the linear form:
.. math:: a_n(x) y^{(n)} + \cdots + a_1(x)y' + a_0(x) y + B(x) = 0
Returns a dict of order:coeff terms, where order is the order of the
derivative on each term, and coeff is the coefficient of that derivative.
The key ``-1`` holds the function `B(x)`. Returns ``None`` if the ODE is
not linear. This function assumes that ``func`` has already been checked
to be good.
Examples
========
>>> from sympy import Function, cos, sin
>>> from sympy.abc import x
>>> from sympy.solvers.ode.ode import _nth_linear_match
>>> f = Function('f')
>>> _nth_linear_match(f(x).diff(x, 3) + 2*f(x).diff(x) +
... x*f(x).diff(x, 2) + cos(x)*f(x).diff(x) + x - f(x) -
... sin(x), f(x), 3)
{-1: x - sin(x), 0: -1, 1: cos(x) + 2, 2: x, 3: 1}
>>> _nth_linear_match(f(x).diff(x, 3) + 2*f(x).diff(x) +
... x*f(x).diff(x, 2) + cos(x)*f(x).diff(x) + x - f(x) -
... sin(f(x)), f(x), 3) == None
True
"""
x = func.args[0]
one_x = {x}
terms = {i: S.Zero for i in range(-1, order + 1)}
for i in Add.make_args(eq):
if not i.has(func):
terms[-1] += i
else:
c, f = i.as_independent(func)
if (isinstance(f, Derivative)
and set(f.variables) == one_x
and f.args[0] == func):
terms[f.derivative_count] += c
elif f == func:
terms[len(f.args[1:])] += c
else:
return None
return terms
def ode_nth_linear_euler_eq_homogeneous(eq, func, order, match, returns='sol'):
r"""
Solves an `n`\th order linear homogeneous variable-coefficient
Cauchy-Euler equidimensional ordinary differential equation.
This is an equation with form `0 = a_0 f(x) + a_1 x f'(x) + a_2 x^2 f''(x)
\cdots`.
These equations can be solved in a general manner, by substituting
solutions of the form `f(x) = x^r`, and deriving a characteristic equation
for `r`. When there are repeated roots, we include extra terms of the
form `C_{r k} \ln^k(x) x^r`, where `C_{r k}` is an arbitrary integration
constant, `r` is a root of the characteristic equation, and `k` ranges
over the multiplicity of `r`. In the cases where the roots are complex,
solutions of the form `C_1 x^a \sin(b \log(x)) + C_2 x^a \cos(b \log(x))`
are returned, based on expansions with Euler's formula. The general
solution is the sum of the terms found. If SymPy cannot find exact roots
to the characteristic equation, a
:py:obj:`~.ComplexRootOf` instance will be returned
instead.
>>> from sympy import Function, dsolve
>>> from sympy.abc import x
>>> f = Function('f')
>>> dsolve(4*x**2*f(x).diff(x, 2) + f(x), f(x),
... hint='nth_linear_euler_eq_homogeneous')
... # doctest: +NORMALIZE_WHITESPACE
Eq(f(x), sqrt(x)*(C1 + C2*log(x)))
Note that because this method does not involve integration, there is no
``nth_linear_euler_eq_homogeneous_Integral`` hint.
The following is for internal use:
- ``returns = 'sol'`` returns the solution to the ODE.
- ``returns = 'list'`` returns a list of linearly independent solutions,
corresponding to the fundamental solution set, for use with non
homogeneous solution methods like variation of parameters and
undetermined coefficients. Note that, though the solutions should be
linearly independent, this function does not explicitly check that. You
can do ``assert simplify(wronskian(sollist)) != 0`` to check for linear
independence. Also, ``assert len(sollist) == order`` will need to pass.
- ``returns = 'both'``, return a dictionary ``{'sol': <solution to ODE>,
'list': <list of linearly independent solutions>}``.
Examples
========
>>> from sympy import Function, dsolve, pprint
>>> from sympy.abc import x
>>> f = Function('f')
>>> eq = f(x).diff(x, 2)*x**2 - 4*f(x).diff(x)*x + 6*f(x)
>>> pprint(dsolve(eq, f(x),
... hint='nth_linear_euler_eq_homogeneous'))
2
f(x) = x *(C1 + C2*x)
References
==========
- https://en.wikipedia.org/wiki/Cauchy%E2%80%93Euler_equation
- C. Bender & S. Orszag, "Advanced Mathematical Methods for Scientists and
Engineers", Springer 1999, pp. 12
# indirect doctest
"""
# XXX: This global collectterms hack should be removed.
global collectterms
collectterms = []
x = func.args[0]
f = func.func
r = match
# First, set up characteristic equation.
chareq, symbol = S.Zero, Dummy('x')
for i in r.keys():
if not isinstance(i, str) and i >= 0:
chareq += (r[i]*diff(x**symbol, x, i)*x**-symbol).expand()
chareq = Poly(chareq, symbol)
chareqroots = [rootof(chareq, k) for k in range(chareq.degree())]
# A generator of constants
constants = list(get_numbered_constants(eq, num=chareq.degree()*2))
constants.reverse()
# Create a dict root: multiplicity or charroots
charroots = defaultdict(int)
for root in chareqroots:
charroots[root] += 1
gsol = S.Zero
# We need keep track of terms so we can run collect() at the end.
# This is necessary for constantsimp to work properly.
ln = log
for root, multiplicity in charroots.items():
for i in range(multiplicity):
if isinstance(root, RootOf):
gsol += (x**root) * constants.pop()
if multiplicity != 1:
raise ValueError("Value should be 1")
collectterms = [(0, root, 0)] + collectterms
elif root.is_real:
gsol += ln(x)**i*(x**root) * constants.pop()
collectterms = [(i, root, 0)] + collectterms
else:
reroot = re(root)
imroot = im(root)
gsol += ln(x)**i * (x**reroot) * (
constants.pop() * sin(abs(imroot)*ln(x))
+ constants.pop() * cos(imroot*ln(x)))
# Preserve ordering (multiplicity, real part, imaginary part)
# It will be assumed implicitly when constructing
# fundamental solution sets.
collectterms = [(i, reroot, imroot)] + collectterms
if returns == 'sol':
return Eq(f(x), gsol)
elif returns in ('list' 'both'):
# HOW TO TEST THIS CODE? (dsolve does not pass 'returns' through)
# Create a list of (hopefully) linearly independent solutions
gensols = []
# Keep track of when to use sin or cos for nonzero imroot
for i, reroot, imroot in collectterms:
if imroot == 0:
gensols.append(ln(x)**i*x**reroot)
else:
sin_form = ln(x)**i*x**reroot*sin(abs(imroot)*ln(x))
if sin_form in gensols:
cos_form = ln(x)**i*x**reroot*cos(imroot*ln(x))
gensols.append(cos_form)
else:
gensols.append(sin_form)
if returns == 'list':
return gensols
else:
return {'sol': Eq(f(x), gsol), 'list': gensols}
else:
raise ValueError('Unknown value for key "returns".')
def ode_nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients(eq, func, order, match, returns='sol'):
r"""
Solves an `n`\th order linear non homogeneous Cauchy-Euler equidimensional
ordinary differential equation using undetermined coefficients.
This is an equation with form `g(x) = a_0 f(x) + a_1 x f'(x) + a_2 x^2 f''(x)
\cdots`.
These equations can be solved in a general manner, by substituting
solutions of the form `x = exp(t)`, and deriving a characteristic equation
of form `g(exp(t)) = b_0 f(t) + b_1 f'(t) + b_2 f''(t) \cdots` which can
be then solved by nth_linear_constant_coeff_undetermined_coefficients if
g(exp(t)) has finite number of linearly independent derivatives.
Functions that fit this requirement are finite sums functions of the form
`a x^i e^{b x} \sin(c x + d)` or `a x^i e^{b x} \cos(c x + d)`, where `i`
is a non-negative integer and `a`, `b`, `c`, and `d` are constants. For
example any polynomial in `x`, functions like `x^2 e^{2 x}`, `x \sin(x)`,
and `e^x \cos(x)` can all be used. Products of `\sin`'s and `\cos`'s have
a finite number of derivatives, because they can be expanded into `\sin(a
x)` and `\cos(b x)` terms. However, SymPy currently cannot do that
expansion, so you will need to manually rewrite the expression in terms of
the above to use this method. So, for example, you will need to manually
convert `\sin^2(x)` into `(1 + \cos(2 x))/2` to properly apply the method
of undetermined coefficients on it.
After replacement of x by exp(t), this method works by creating a trial function
from the expression and all of its linear independent derivatives and
substituting them into the original ODE. The coefficients for each term
will be a system of linear equations, which are be solved for and
substituted, giving the solution. If any of the trial functions are linearly
dependent on the solution to the homogeneous equation, they are multiplied
by sufficient `x` to make them linearly independent.
Examples
========
>>> from sympy import dsolve, Function, Derivative, log
>>> from sympy.abc import x
>>> f = Function('f')
>>> eq = x**2*Derivative(f(x), x, x) - 2*x*Derivative(f(x), x) + 2*f(x) - log(x)
>>> dsolve(eq, f(x),
... hint='nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients').expand()
Eq(f(x), C1*x + C2*x**2 + log(x)/2 + 3/4)
"""
x = func.args[0]
f = func.func
r = match
chareq, eq, symbol = S.Zero, S.Zero, Dummy('x')
for i in r.keys():
if not isinstance(i, str) and i >= 0:
chareq += (r[i]*diff(x**symbol, x, i)*x**-symbol).expand()
for i in range(1,degree(Poly(chareq, symbol))+1):
eq += chareq.coeff(symbol**i)*diff(f(x), x, i)
if chareq.as_coeff_add(symbol)[0]:
eq += chareq.as_coeff_add(symbol)[0]*f(x)
e, re = posify(r[-1].subs(x, exp(x)))
eq += e.subs(re)
match = _nth_linear_match(eq, f(x), ode_order(eq, f(x)))
eq_homogeneous = Add(eq,-match[-1])
match['trialset'] = _undetermined_coefficients_match(match[-1], x, func, eq_homogeneous)['trialset']
return ode_nth_linear_constant_coeff_undetermined_coefficients(eq, func, order, match).subs(x, log(x)).subs(f(log(x)), f(x)).expand()
def ode_nth_linear_euler_eq_nonhomogeneous_variation_of_parameters(eq, func, order, match, returns='sol'):
r"""
Solves an `n`\th order linear non homogeneous Cauchy-Euler equidimensional
ordinary differential equation using variation of parameters.
This is an equation with form `g(x) = a_0 f(x) + a_1 x f'(x) + a_2 x^2 f''(x)
\cdots`.
This method works by assuming that the particular solution takes the form
.. math:: \sum_{x=1}^{n} c_i(x) y_i(x) {a_n} {x^n} \text{,}
where `y_i` is the `i`\th solution to the homogeneous equation. The
solution is then solved using Wronskian's and Cramer's Rule. The
particular solution is given by multiplying eq given below with `a_n x^{n}`
.. math:: \sum_{x=1}^n \left( \int \frac{W_i(x)}{W(x)} \,dx
\right) y_i(x) \text{,}
where `W(x)` is the Wronskian of the fundamental system (the system of `n`
linearly independent solutions to the homogeneous equation), and `W_i(x)`
is the Wronskian of the fundamental system with the `i`\th column replaced
with `[0, 0, \cdots, 0, \frac{x^{- n}}{a_n} g{\left(x \right)}]`.
This method is general enough to solve any `n`\th order inhomogeneous
linear differential equation, but sometimes SymPy cannot simplify the
Wronskian well enough to integrate it. If this method hangs, try using the
``nth_linear_constant_coeff_variation_of_parameters_Integral`` hint and
simplifying the integrals manually. Also, prefer using
``nth_linear_constant_coeff_undetermined_coefficients`` when it
applies, because it doesn't use integration, making it faster and more
reliable.
Warning, using simplify=False with
'nth_linear_constant_coeff_variation_of_parameters' in
:py:meth:`~sympy.solvers.ode.dsolve` may cause it to hang, because it will
not attempt to simplify the Wronskian before integrating. It is
recommended that you only use simplify=False with
'nth_linear_constant_coeff_variation_of_parameters_Integral' for this
method, especially if the solution to the homogeneous equation has
trigonometric functions in it.
Examples
========
>>> from sympy import Function, dsolve, Derivative
>>> from sympy.abc import x
>>> f = Function('f')
>>> eq = x**2*Derivative(f(x), x, x) - 2*x*Derivative(f(x), x) + 2*f(x) - x**4
>>> dsolve(eq, f(x),
... hint='nth_linear_euler_eq_nonhomogeneous_variation_of_parameters').expand()
Eq(f(x), C1*x + C2*x**2 + x**4/6)
"""
x = func.args[0]
f = func.func
r = match
gensol = ode_nth_linear_euler_eq_homogeneous(eq, func, order, match, returns='both')
match.update(gensol)
r[-1] = r[-1]/r[ode_order(eq, f(x))]
sol = _solve_variation_of_parameters(eq, func, order, match)
return Eq(f(x), r['sol'].rhs + (sol.rhs - r['sol'].rhs)*r[ode_order(eq, f(x))])
def _linear_coeff_match(expr, func):
r"""
Helper function to match hint ``linear_coefficients``.
Matches the expression to the form `(a_1 x + b_1 f(x) + c_1)/(a_2 x + b_2
f(x) + c_2)` where the following conditions hold:
1. `a_1`, `b_1`, `c_1`, `a_2`, `b_2`, `c_2` are Rationals;
2. `c_1` or `c_2` are not equal to zero;
3. `a_2 b_1 - a_1 b_2` is not equal to zero.
Return ``xarg``, ``yarg`` where
1. ``xarg`` = `(b_2 c_1 - b_1 c_2)/(a_2 b_1 - a_1 b_2)`
2. ``yarg`` = `(a_1 c_2 - a_2 c_1)/(a_2 b_1 - a_1 b_2)`
Examples
========
>>> from sympy import Function
>>> from sympy.abc import x
>>> from sympy.solvers.ode.ode import _linear_coeff_match
>>> from sympy.functions.elementary.trigonometric import sin
>>> f = Function('f')
>>> _linear_coeff_match((
... (-25*f(x) - 8*x + 62)/(4*f(x) + 11*x - 11)), f(x))
(1/9, 22/9)
>>> _linear_coeff_match(
... sin((-5*f(x) - 8*x + 6)/(4*f(x) + x - 1)), f(x))
(19/27, 2/27)
>>> _linear_coeff_match(sin(f(x)/x), f(x))
"""
f = func.func
x = func.args[0]
def abc(eq):
r'''
Internal function of _linear_coeff_match
that returns Rationals a, b, c
if eq is a*x + b*f(x) + c, else None.
'''
eq = _mexpand(eq)
c = eq.as_independent(x, f(x), as_Add=True)[0]
if not c.is_Rational:
return
a = eq.coeff(x)
if not a.is_Rational:
return
b = eq.coeff(f(x))
if not b.is_Rational:
return
if eq == a*x + b*f(x) + c:
return a, b, c
def match(arg):
r'''
Internal function of _linear_coeff_match that returns Rationals a1,
b1, c1, a2, b2, c2 and a2*b1 - a1*b2 of the expression (a1*x + b1*f(x)
+ c1)/(a2*x + b2*f(x) + c2) if one of c1 or c2 and a2*b1 - a1*b2 is
non-zero, else None.
'''
n, d = arg.together().as_numer_denom()
m = abc(n)
if m is not None:
a1, b1, c1 = m
m = abc(d)
if m is not None:
a2, b2, c2 = m
d = a2*b1 - a1*b2
if (c1 or c2) and d:
return a1, b1, c1, a2, b2, c2, d
m = [fi.args[0] for fi in expr.atoms(Function) if fi.func != f and
len(fi.args) == 1 and not fi.args[0].is_Function] or {expr}
m1 = match(m.pop())
if m1 and all(match(mi) == m1 for mi in m):
a1, b1, c1, a2, b2, c2, denom = m1
return (b2*c1 - b1*c2)/denom, (a1*c2 - a2*c1)/denom
def ode_linear_coefficients(eq, func, order, match):
r"""
Solves a differential equation with linear coefficients.
The general form of a differential equation with linear coefficients is
.. math:: y' + F\left(\!\frac{a_1 x + b_1 y + c_1}{a_2 x + b_2 y +
c_2}\!\right) = 0\text{,}
where `a_1`, `b_1`, `c_1`, `a_2`, `b_2`, `c_2` are constants and `a_1 b_2
- a_2 b_1 \ne 0`.
This can be solved by substituting:
.. math:: x = x' + \frac{b_2 c_1 - b_1 c_2}{a_2 b_1 - a_1 b_2}
y = y' + \frac{a_1 c_2 - a_2 c_1}{a_2 b_1 - a_1
b_2}\text{.}
This substitution reduces the equation to a homogeneous differential
equation.
See Also
========
:meth:`sympy.solvers.ode.ode.ode_1st_homogeneous_coeff_best`
:meth:`sympy.solvers.ode.ode.ode_1st_homogeneous_coeff_subs_indep_div_dep`
:meth:`sympy.solvers.ode.ode.ode_1st_homogeneous_coeff_subs_dep_div_indep`
Examples
========
>>> from sympy import Function, pprint
>>> from sympy.solvers.ode.ode import dsolve
>>> from sympy.abc import x
>>> f = Function('f')
>>> df = f(x).diff(x)
>>> eq = (x + f(x) + 1)*df + (f(x) - 6*x + 1)
>>> dsolve(eq, hint='linear_coefficients')
[Eq(f(x), -x - sqrt(C1 + 7*x**2) - 1), Eq(f(x), -x + sqrt(C1 + 7*x**2) - 1)]
>>> pprint(dsolve(eq, hint='linear_coefficients'))
___________ ___________
/ 2 / 2
[f(x) = -x - \/ C1 + 7*x - 1, f(x) = -x + \/ C1 + 7*x - 1]
References
==========
- Joel Moses, "Symbolic Integration - The Stormy Decade", Communications
of the ACM, Volume 14, Number 8, August 1971, pp. 558
"""
return ode_1st_homogeneous_coeff_best(eq, func, order, match)
def ode_separable_reduced(eq, func, order, match):
r"""
Solves a differential equation that can be reduced to the separable form.
The general form of this equation is
.. math:: y' + (y/x) H(x^n y) = 0\text{}.
This can be solved by substituting `u(y) = x^n y`. The equation then
reduces to the separable form `\frac{u'}{u (\mathrm{power} - H(u))} -
\frac{1}{x} = 0`.
The general solution is:
>>> from sympy import Function, dsolve, pprint
>>> from sympy.abc import x, n
>>> f, g = map(Function, ['f', 'g'])
>>> genform = f(x).diff(x) + (f(x)/x)*g(x**n*f(x))
>>> pprint(genform)
/ n \
d f(x)*g\x *f(x)/
--(f(x)) + ---------------
dx x
>>> pprint(dsolve(genform, hint='separable_reduced'))
n
x *f(x)
/
|
| 1
| ------------ dy = C1 + log(x)
| y*(n - g(y))
|
/
See Also
========
:meth:`sympy.solvers.ode.ode.ode_separable`
Examples
========
>>> from sympy import Function, pprint
>>> from sympy.solvers.ode.ode import dsolve
>>> from sympy.abc import x
>>> f = Function('f')
>>> d = f(x).diff(x)
>>> eq = (x - x**2*f(x))*d - f(x)
>>> dsolve(eq, hint='separable_reduced')
[Eq(f(x), (1 - sqrt(C1*x**2 + 1))/x), Eq(f(x), (sqrt(C1*x**2 + 1) + 1)/x)]
>>> pprint(dsolve(eq, hint='separable_reduced'))
___________ ___________
/ 2 / 2
1 - \/ C1*x + 1 \/ C1*x + 1 + 1
[f(x) = ------------------, f(x) = ------------------]
x x
References
==========
- Joel Moses, "Symbolic Integration - The Stormy Decade", Communications
of the ACM, Volume 14, Number 8, August 1971, pp. 558
"""
# Arguments are passed in a way so that they are coherent with the
# ode_separable function
x = func.args[0]
f = func.func
y = Dummy('y')
u = match['u'].subs(match['t'], y)
ycoeff = 1/(y*(match['power'] - u))
m1 = {y: 1, x: -1/x, 'coeff': 1}
m2 = {y: ycoeff, x: 1, 'coeff': 1}
r = {'m1': m1, 'm2': m2, 'y': y, 'hint': x**match['power']*f(x)}
return ode_separable(eq, func, order, r)
def ode_1st_power_series(eq, func, order, match):
r"""
The power series solution is a method which gives the Taylor series expansion
to the solution of a differential equation.
For a first order differential equation `\frac{dy}{dx} = h(x, y)`, a power
series solution exists at a point `x = x_{0}` if `h(x, y)` is analytic at `x_{0}`.
The solution is given by
.. math:: y(x) = y(x_{0}) + \sum_{n = 1}^{\infty} \frac{F_{n}(x_{0},b)(x - x_{0})^n}{n!},
where `y(x_{0}) = b` is the value of y at the initial value of `x_{0}`.
To compute the values of the `F_{n}(x_{0},b)` the following algorithm is
followed, until the required number of terms are generated.
1. `F_1 = h(x_{0}, b)`
2. `F_{n+1} = \frac{\partial F_{n}}{\partial x} + \frac{\partial F_{n}}{\partial y}F_{1}`
Examples
========
>>> from sympy import Function, pprint, exp
>>> from sympy.solvers.ode.ode import dsolve
>>> from sympy.abc import x
>>> f = Function('f')
>>> eq = exp(x)*(f(x).diff(x)) - f(x)
>>> pprint(dsolve(eq, hint='1st_power_series'))
3 4 5
C1*x C1*x C1*x / 6\
f(x) = C1 + C1*x - ----- + ----- + ----- + O\x /
6 24 60
References
==========
- Travis W. Walker, Analytic power series technique for solving first-order
differential equations, p.p 17, 18
"""
x = func.args[0]
y = match['y']
f = func.func
h = -match[match['d']]/match[match['e']]
point = match.get('f0')
value = match.get('f0val')
terms = match.get('terms')
# First term
F = h
if not h:
return Eq(f(x), value)
# Initialization
series = value
if terms > 1:
hc = h.subs({x: point, y: value})
if hc.has(oo) or hc.has(NaN) or hc.has(zoo):
# Derivative does not exist, not analytic
return Eq(f(x), oo)
elif hc:
series += hc*(x - point)
for factcount in range(2, terms):
Fnew = F.diff(x) + F.diff(y)*h
Fnewc = Fnew.subs({x: point, y: value})
# Same logic as above
if Fnewc.has(oo) or Fnewc.has(NaN) or Fnewc.has(-oo) or Fnewc.has(zoo):
return Eq(f(x), oo)
series += Fnewc*((x - point)**factcount)/factorial(factcount)
F = Fnew
series += Order(x**terms)
return Eq(f(x), series)
def ode_nth_linear_constant_coeff_homogeneous(eq, func, order, match,
returns='sol'):
r"""
Solves an `n`\th order linear homogeneous differential equation with
constant coefficients.
This is an equation of the form
.. math:: a_n f^{(n)}(x) + a_{n-1} f^{(n-1)}(x) + \cdots + a_1 f'(x)
+ a_0 f(x) = 0\text{.}
These equations can be solved in a general manner, by taking the roots of
the characteristic equation `a_n m^n + a_{n-1} m^{n-1} + \cdots + a_1 m +
a_0 = 0`. The solution will then be the sum of `C_n x^i e^{r x}` terms,
for each where `C_n` is an arbitrary constant, `r` is a root of the
characteristic equation and `i` is one of each from 0 to the multiplicity
of the root - 1 (for example, a root 3 of multiplicity 2 would create the
terms `C_1 e^{3 x} + C_2 x e^{3 x}`). The exponential is usually expanded
for complex roots using Euler's equation `e^{I x} = \cos(x) + I \sin(x)`.
Complex roots always come in conjugate pairs in polynomials with real
coefficients, so the two roots will be represented (after simplifying the
constants) as `e^{a x} \left(C_1 \cos(b x) + C_2 \sin(b x)\right)`.
If SymPy cannot find exact roots to the characteristic equation, a
:py:class:`~sympy.polys.rootoftools.ComplexRootOf` instance will be return
instead.
>>> from sympy import Function, dsolve
>>> from sympy.abc import x
>>> f = Function('f')
>>> dsolve(f(x).diff(x, 5) + 10*f(x).diff(x) - 2*f(x), f(x),
... hint='nth_linear_constant_coeff_homogeneous')
... # doctest: +NORMALIZE_WHITESPACE
Eq(f(x), C5*exp(x*CRootOf(_x**5 + 10*_x - 2, 0))
+ (C1*sin(x*im(CRootOf(_x**5 + 10*_x - 2, 1)))
+ C2*cos(x*im(CRootOf(_x**5 + 10*_x - 2, 1))))*exp(x*re(CRootOf(_x**5 + 10*_x - 2, 1)))
+ (C3*sin(x*im(CRootOf(_x**5 + 10*_x - 2, 3)))
+ C4*cos(x*im(CRootOf(_x**5 + 10*_x - 2, 3))))*exp(x*re(CRootOf(_x**5 + 10*_x - 2, 3))))
Note that because this method does not involve integration, there is no
``nth_linear_constant_coeff_homogeneous_Integral`` hint.
The following is for internal use:
- ``returns = 'sol'`` returns the solution to the ODE.
- ``returns = 'list'`` returns a list of linearly independent solutions,
for use with non homogeneous solution methods like variation of
parameters and undetermined coefficients. Note that, though the
solutions should be linearly independent, this function does not
explicitly check that. You can do ``assert simplify(wronskian(sollist))
!= 0`` to check for linear independence. Also, ``assert len(sollist) ==
order`` will need to pass.
- ``returns = 'both'``, return a dictionary ``{'sol': <solution to ODE>,
'list': <list of linearly independent solutions>}``.
Examples
========
>>> from sympy import Function, dsolve, pprint
>>> from sympy.abc import x
>>> f = Function('f')
>>> pprint(dsolve(f(x).diff(x, 4) + 2*f(x).diff(x, 3) -
... 2*f(x).diff(x, 2) - 6*f(x).diff(x) + 5*f(x), f(x),
... hint='nth_linear_constant_coeff_homogeneous'))
x -2*x
f(x) = (C1 + C2*x)*e + (C3*sin(x) + C4*cos(x))*e
References
==========
- https://en.wikipedia.org/wiki/Linear_differential_equation section:
Nonhomogeneous_equation_with_constant_coefficients
- M. Tenenbaum & H. Pollard, "Ordinary Differential Equations",
Dover 1963, pp. 211
# indirect doctest
"""
x = func.args[0]
f = func.func
r = match
# First, set up characteristic equation.
chareq, symbol = S.Zero, Dummy('x')
for i in r.keys():
if type(i) == str or i < 0:
pass
else:
chareq += r[i]*symbol**i
chareq = Poly(chareq, symbol)
# Can't just call roots because it doesn't return rootof for unsolveable
# polynomials.
chareqroots = roots(chareq, multiple=True)
if len(chareqroots) != order:
chareqroots = [rootof(chareq, k) for k in range(chareq.degree())]
chareq_is_complex = not all([i.is_real for i in chareq.all_coeffs()])
# A generator of constants
constants = list(get_numbered_constants(eq, num=chareq.degree()*2))
# Create a dict root: multiplicity or charroots
charroots = defaultdict(int)
for root in chareqroots:
charroots[root] += 1
# We need to keep track of terms so we can run collect() at the end.
# This is necessary for constantsimp to work properly.
#
# XXX: This global collectterms hack should be removed.
global collectterms
collectterms = []
gensols = []
conjugate_roots = [] # used to prevent double-use of conjugate roots
# Loop over roots in theorder provided by roots/rootof...
for root in chareqroots:
# but don't repoeat multiple roots.
if root not in charroots:
continue
multiplicity = charroots.pop(root)
for i in range(multiplicity):
if chareq_is_complex:
gensols.append(x**i*exp(root*x))
collectterms = [(i, root, 0)] + collectterms
continue
reroot = re(root)
imroot = im(root)
if imroot.has(atan2) and reroot.has(atan2):
# Remove this condition when re and im stop returning
# circular atan2 usages.
gensols.append(x**i*exp(root*x))
collectterms = [(i, root, 0)] + collectterms
else:
if root in conjugate_roots:
collectterms = [(i, reroot, imroot)] + collectterms
continue
if imroot == 0:
gensols.append(x**i*exp(reroot*x))
collectterms = [(i, reroot, 0)] + collectterms
continue
conjugate_roots.append(conjugate(root))
gensols.append(x**i*exp(reroot*x) * sin(abs(imroot) * x))
gensols.append(x**i*exp(reroot*x) * cos( imroot * x))
# This ordering is important
collectterms = [(i, reroot, imroot)] + collectterms
if returns == 'list':
return gensols
elif returns in ('sol' 'both'):
gsol = Add(*[i*j for (i, j) in zip(constants, gensols)])
if returns == 'sol':
return Eq(f(x), gsol)
else:
return {'sol': Eq(f(x), gsol), 'list': gensols}
else:
raise ValueError('Unknown value for key "returns".')
def ode_nth_linear_constant_coeff_undetermined_coefficients(eq, func, order, match):
r"""
Solves an `n`\th order linear differential equation with constant
coefficients using the method of undetermined coefficients.
This method works on differential equations of the form
.. math:: a_n f^{(n)}(x) + a_{n-1} f^{(n-1)}(x) + \cdots + a_1 f'(x)
+ a_0 f(x) = P(x)\text{,}
where `P(x)` is a function that has a finite number of linearly
independent derivatives.
Functions that fit this requirement are finite sums functions of the form
`a x^i e^{b x} \sin(c x + d)` or `a x^i e^{b x} \cos(c x + d)`, where `i`
is a non-negative integer and `a`, `b`, `c`, and `d` are constants. For
example any polynomial in `x`, functions like `x^2 e^{2 x}`, `x \sin(x)`,
and `e^x \cos(x)` can all be used. Products of `\sin`'s and `\cos`'s have
a finite number of derivatives, because they can be expanded into `\sin(a
x)` and `\cos(b x)` terms. However, SymPy currently cannot do that
expansion, so you will need to manually rewrite the expression in terms of
the above to use this method. So, for example, you will need to manually
convert `\sin^2(x)` into `(1 + \cos(2 x))/2` to properly apply the method
of undetermined coefficients on it.
This method works by creating a trial function from the expression and all
of its linear independent derivatives and substituting them into the
original ODE. The coefficients for each term will be a system of linear
equations, which are be solved for and substituted, giving the solution.
If any of the trial functions are linearly dependent on the solution to
the homogeneous equation, they are multiplied by sufficient `x` to make
them linearly independent.
Examples
========
>>> from sympy import Function, dsolve, pprint, exp, cos
>>> from sympy.abc import x
>>> f = Function('f')
>>> pprint(dsolve(f(x).diff(x, 2) + 2*f(x).diff(x) + f(x) -
... 4*exp(-x)*x**2 + cos(2*x), f(x),
... hint='nth_linear_constant_coeff_undetermined_coefficients'))
/ / 3\\
| | x || -x 4*sin(2*x) 3*cos(2*x)
f(x) = |C1 + x*|C2 + --||*e - ---------- + ----------
\ \ 3 // 25 25
References
==========
- https://en.wikipedia.org/wiki/Method_of_undetermined_coefficients
- M. Tenenbaum & H. Pollard, "Ordinary Differential Equations",
Dover 1963, pp. 221
# indirect doctest
"""
gensol = ode_nth_linear_constant_coeff_homogeneous(eq, func, order, match,
returns='both')
match.update(gensol)
return _solve_undetermined_coefficients(eq, func, order, match)
def _solve_undetermined_coefficients(eq, func, order, match):
r"""
Helper function for the method of undetermined coefficients.
See the
:py:meth:`~sympy.solvers.ode.ode.ode_nth_linear_constant_coeff_undetermined_coefficients`
docstring for more information on this method.
The parameter ``match`` should be a dictionary that has the following
keys:
``list``
A list of solutions to the homogeneous equation, such as the list
returned by
``ode_nth_linear_constant_coeff_homogeneous(returns='list')``.
``sol``
The general solution, such as the solution returned by
``ode_nth_linear_constant_coeff_homogeneous(returns='sol')``.
``trialset``
The set of trial functions as returned by
``_undetermined_coefficients_match()['trialset']``.
"""
x = func.args[0]
f = func.func
r = match
coeffs = numbered_symbols('a', cls=Dummy)
coefflist = []
gensols = r['list']
gsol = r['sol']
trialset = r['trialset']
if len(gensols) != order:
raise NotImplementedError("Cannot find " + str(order) +
" solutions to the homogeneous equation necessary to apply" +
" undetermined coefficients to " + str(eq) +
" (number of terms != order)")
trialfunc = 0
for i in trialset:
c = next(coeffs)
coefflist.append(c)
trialfunc += c*i
eqs = sub_func_doit(eq, f(x), trialfunc)
coeffsdict = dict(list(zip(trialset, [0]*(len(trialset) + 1))))
eqs = _mexpand(eqs)
for i in Add.make_args(eqs):
s = separatevars(i, dict=True, symbols=[x])
if coeffsdict.get(s[x]):
coeffsdict[s[x]] += s['coeff']
else:
coeffsdict[s[x]] = s['coeff']
coeffvals = solve(list(coeffsdict.values()), coefflist)
if not coeffvals:
raise NotImplementedError(
"Could not solve `%s` using the "
"method of undetermined coefficients "
"(unable to solve for coefficients)." % eq)
psol = trialfunc.subs(coeffvals)
return Eq(f(x), gsol.rhs + psol)
def _undetermined_coefficients_match(expr, x, func=None, eq_homogeneous=S.Zero):
r"""
Returns a trial function match if undetermined coefficients can be applied
to ``expr``, and ``None`` otherwise.
A trial expression can be found for an expression for use with the method
of undetermined coefficients if the expression is an
additive/multiplicative combination of constants, polynomials in `x` (the
independent variable of expr), `\sin(a x + b)`, `\cos(a x + b)`, and
`e^{a x}` terms (in other words, it has a finite number of linearly
independent derivatives).
Note that you may still need to multiply each term returned here by
sufficient `x` to make it linearly independent with the solutions to the
homogeneous equation.
This is intended for internal use by ``undetermined_coefficients`` hints.
SymPy currently has no way to convert `\sin^n(x) \cos^m(y)` into a sum of
only `\sin(a x)` and `\cos(b x)` terms, so these are not implemented. So,
for example, you will need to manually convert `\sin^2(x)` into `[1 +
\cos(2 x)]/2` to properly apply the method of undetermined coefficients on
it.
Examples
========
>>> from sympy import log, exp
>>> from sympy.solvers.ode.ode import _undetermined_coefficients_match
>>> from sympy.abc import x
>>> _undetermined_coefficients_match(9*x*exp(x) + exp(-x), x)
{'test': True, 'trialset': {x*exp(x), exp(-x), exp(x)}}
>>> _undetermined_coefficients_match(log(x), x)
{'test': False}
"""
a = Wild('a', exclude=[x])
b = Wild('b', exclude=[x])
expr = powsimp(expr, combine='exp') # exp(x)*exp(2*x + 1) => exp(3*x + 1)
retdict = {}
def _test_term(expr, x):
r"""
Test if ``expr`` fits the proper form for undetermined coefficients.
"""
if not expr.has(x):
return True
elif expr.is_Add:
return all(_test_term(i, x) for i in expr.args)
elif expr.is_Mul:
if expr.has(sin, cos):
foundtrig = False
# Make sure that there is only one trig function in the args.
# See the docstring.
for i in expr.args:
if i.has(sin, cos):
if foundtrig:
return False
else:
foundtrig = True
return all(_test_term(i, x) for i in expr.args)
elif expr.is_Function:
if expr.func in (sin, cos, exp, sinh, cosh):
if expr.args[0].match(a*x + b):
return True
else:
return False
else:
return False
elif expr.is_Pow and expr.base.is_Symbol and expr.exp.is_Integer and \
expr.exp >= 0:
return True
elif expr.is_Pow and expr.base.is_number:
if expr.exp.match(a*x + b):
return True
else:
return False
elif expr.is_Symbol or expr.is_number:
return True
else:
return False
def _get_trial_set(expr, x, exprs=set([])):
r"""
Returns a set of trial terms for undetermined coefficients.
The idea behind undetermined coefficients is that the terms expression
repeat themselves after a finite number of derivatives, except for the
coefficients (they are linearly dependent). So if we collect these,
we should have the terms of our trial function.
"""
def _remove_coefficient(expr, x):
r"""
Returns the expression without a coefficient.
Similar to expr.as_independent(x)[1], except it only works
multiplicatively.
"""
term = S.One
if expr.is_Mul:
for i in expr.args:
if i.has(x):
term *= i
elif expr.has(x):
term = expr
return term
expr = expand_mul(expr)
if expr.is_Add:
for term in expr.args:
if _remove_coefficient(term, x) in exprs:
pass
else:
exprs.add(_remove_coefficient(term, x))
exprs = exprs.union(_get_trial_set(term, x, exprs))
else:
term = _remove_coefficient(expr, x)
tmpset = exprs.union({term})
oldset = set([])
while tmpset != oldset:
# If you get stuck in this loop, then _test_term is probably
# broken
oldset = tmpset.copy()
expr = expr.diff(x)
term = _remove_coefficient(expr, x)
if term.is_Add:
tmpset = tmpset.union(_get_trial_set(term, x, tmpset))
else:
tmpset.add(term)
exprs = tmpset
return exprs
def is_homogeneous_solution(term):
r""" This function checks whether the given trialset contains any root
of homogenous equation"""
return expand(sub_func_doit(eq_homogeneous, func, term)).is_zero
retdict['test'] = _test_term(expr, x)
if retdict['test']:
# Try to generate a list of trial solutions that will have the
# undetermined coefficients. Note that if any of these are not linearly
# independent with any of the solutions to the homogeneous equation,
# then they will need to be multiplied by sufficient x to make them so.
# This function DOES NOT do that (it doesn't even look at the
# homogeneous equation).
temp_set = set([])
for i in Add.make_args(expr):
act = _get_trial_set(i,x)
if eq_homogeneous is not S.Zero:
while any(is_homogeneous_solution(ts) for ts in act):
act = {x*ts for ts in act}
temp_set = temp_set.union(act)
retdict['trialset'] = temp_set
return retdict
def ode_nth_linear_constant_coeff_variation_of_parameters(eq, func, order, match):
r"""
Solves an `n`\th order linear differential equation with constant
coefficients using the method of variation of parameters.
This method works on any differential equations of the form
.. math:: f^{(n)}(x) + a_{n-1} f^{(n-1)}(x) + \cdots + a_1 f'(x) + a_0
f(x) = P(x)\text{.}
This method works by assuming that the particular solution takes the form
.. math:: \sum_{x=1}^{n} c_i(x) y_i(x)\text{,}
where `y_i` is the `i`\th solution to the homogeneous equation. The
solution is then solved using Wronskian's and Cramer's Rule. The
particular solution is given by
.. math:: \sum_{x=1}^n \left( \int \frac{W_i(x)}{W(x)} \,dx
\right) y_i(x) \text{,}
where `W(x)` is the Wronskian of the fundamental system (the system of `n`
linearly independent solutions to the homogeneous equation), and `W_i(x)`
is the Wronskian of the fundamental system with the `i`\th column replaced
with `[0, 0, \cdots, 0, P(x)]`.
This method is general enough to solve any `n`\th order inhomogeneous
linear differential equation with constant coefficients, but sometimes
SymPy cannot simplify the Wronskian well enough to integrate it. If this
method hangs, try using the
``nth_linear_constant_coeff_variation_of_parameters_Integral`` hint and
simplifying the integrals manually. Also, prefer using
``nth_linear_constant_coeff_undetermined_coefficients`` when it
applies, because it doesn't use integration, making it faster and more
reliable.
Warning, using simplify=False with
'nth_linear_constant_coeff_variation_of_parameters' in
:py:meth:`~sympy.solvers.ode.dsolve` may cause it to hang, because it will
not attempt to simplify the Wronskian before integrating. It is
recommended that you only use simplify=False with
'nth_linear_constant_coeff_variation_of_parameters_Integral' for this
method, especially if the solution to the homogeneous equation has
trigonometric functions in it.
Examples
========
>>> from sympy import Function, dsolve, pprint, exp, log
>>> from sympy.abc import x
>>> f = Function('f')
>>> pprint(dsolve(f(x).diff(x, 3) - 3*f(x).diff(x, 2) +
... 3*f(x).diff(x) - f(x) - exp(x)*log(x), f(x),
... hint='nth_linear_constant_coeff_variation_of_parameters'))
/ / / x*log(x) 11*x\\\ x
f(x) = |C1 + x*|C2 + x*|C3 + -------- - ----|||*e
\ \ \ 6 36 ///
References
==========
- https://en.wikipedia.org/wiki/Variation_of_parameters
- http://planetmath.org/VariationOfParameters
- M. Tenenbaum & H. Pollard, "Ordinary Differential Equations",
Dover 1963, pp. 233
# indirect doctest
"""
gensol = ode_nth_linear_constant_coeff_homogeneous(eq, func, order, match,
returns='both')
match.update(gensol)
return _solve_variation_of_parameters(eq, func, order, match)
def _solve_variation_of_parameters(eq, func, order, match):
r"""
Helper function for the method of variation of parameters and nonhomogeneous euler eq.
See the
:py:meth:`~sympy.solvers.ode.ode.ode_nth_linear_constant_coeff_variation_of_parameters`
docstring for more information on this method.
The parameter ``match`` should be a dictionary that has the following
keys:
``list``
A list of solutions to the homogeneous equation, such as the list
returned by
``ode_nth_linear_constant_coeff_homogeneous(returns='list')``.
``sol``
The general solution, such as the solution returned by
``ode_nth_linear_constant_coeff_homogeneous(returns='sol')``.
"""
x = func.args[0]
f = func.func
r = match
psol = 0
gensols = r['list']
gsol = r['sol']
wr = wronskian(gensols, x)
if r.get('simplify', True):
wr = simplify(wr) # We need much better simplification for
# some ODEs. See issue 4662, for example.
# To reduce commonly occurring sin(x)**2 + cos(x)**2 to 1
wr = trigsimp(wr, deep=True, recursive=True)
if not wr:
# The wronskian will be 0 iff the solutions are not linearly
# independent.
raise NotImplementedError("Cannot find " + str(order) +
" solutions to the homogeneous equation necessary to apply " +
"variation of parameters to " + str(eq) + " (Wronskian == 0)")
if len(gensols) != order:
raise NotImplementedError("Cannot find " + str(order) +
" solutions to the homogeneous equation necessary to apply " +
"variation of parameters to " +
str(eq) + " (number of terms != order)")
negoneterm = (-1)**(order)
for i in gensols:
psol += negoneterm*Integral(wronskian([sol for sol in gensols if sol != i], x)*r[-1]/wr, x)*i/r[order]
negoneterm *= -1
if r.get('simplify', True):
psol = simplify(psol)
psol = trigsimp(psol, deep=True)
return Eq(f(x), gsol.rhs + psol)
def ode_separable(eq, func, order, match):
r"""
Solves separable 1st order differential equations.
This is any differential equation that can be written as `P(y)
\tfrac{dy}{dx} = Q(x)`. The solution can then just be found by
rearranging terms and integrating: `\int P(y) \,dy = \int Q(x) \,dx`.
This hint uses :py:meth:`sympy.simplify.simplify.separatevars` as its back
end, so if a separable equation is not caught by this solver, it is most
likely the fault of that function.
:py:meth:`~sympy.simplify.simplify.separatevars` is
smart enough to do most expansion and factoring necessary to convert a
separable equation `F(x, y)` into the proper form `P(x)\cdot{}Q(y)`. The
general solution is::
>>> from sympy import Function, dsolve, Eq, pprint
>>> from sympy.abc import x
>>> a, b, c, d, f = map(Function, ['a', 'b', 'c', 'd', 'f'])
>>> genform = Eq(a(x)*b(f(x))*f(x).diff(x), c(x)*d(f(x)))
>>> pprint(genform)
d
a(x)*b(f(x))*--(f(x)) = c(x)*d(f(x))
dx
>>> pprint(dsolve(genform, f(x), hint='separable_Integral'))
f(x)
/ /
| |
| b(y) | c(x)
| ---- dy = C1 + | ---- dx
| d(y) | a(x)
| |
/ /
Examples
========
>>> from sympy import Function, dsolve, Eq
>>> from sympy.abc import x
>>> f = Function('f')
>>> pprint(dsolve(Eq(f(x)*f(x).diff(x) + x, 3*x*f(x)**2), f(x),
... hint='separable', simplify=False))
/ 2 \ 2
log\3*f (x) - 1/ x
---------------- = C1 + --
6 2
References
==========
- M. Tenenbaum & H. Pollard, "Ordinary Differential Equations",
Dover 1963, pp. 52
# indirect doctest
"""
x = func.args[0]
f = func.func
C1 = get_numbered_constants(eq, num=1)
r = match # {'m1':m1, 'm2':m2, 'y':y}
u = r.get('hint', f(x)) # get u from separable_reduced else get f(x)
return Eq(Integral(r['m2']['coeff']*r['m2'][r['y']]/r['m1'][r['y']],
(r['y'], None, u)), Integral(-r['m1']['coeff']*r['m1'][x]/
r['m2'][x], x) + C1)
def checkinfsol(eq, infinitesimals, func=None, order=None):
r"""
This function is used to check if the given infinitesimals are the
actual infinitesimals of the given first order differential equation.
This method is specific to the Lie Group Solver of ODEs.
As of now, it simply checks, by substituting the infinitesimals in the
partial differential equation.
.. math:: \frac{\partial \eta}{\partial x} + \left(\frac{\partial \eta}{\partial y}
- \frac{\partial \xi}{\partial x}\right)*h
- \frac{\partial \xi}{\partial y}*h^{2}
- \xi\frac{\partial h}{\partial x} - \eta\frac{\partial h}{\partial y} = 0
where `\eta`, and `\xi` are the infinitesimals and `h(x,y) = \frac{dy}{dx}`
The infinitesimals should be given in the form of a list of dicts
``[{xi(x, y): inf, eta(x, y): inf}]``, corresponding to the
output of the function infinitesimals. It returns a list
of values of the form ``[(True/False, sol)]`` where ``sol`` is the value
obtained after substituting the infinitesimals in the PDE. If it
is ``True``, then ``sol`` would be 0.
"""
if isinstance(eq, Equality):
eq = eq.lhs - eq.rhs
if not func:
eq, func = _preprocess(eq)
variables = func.args
if len(variables) != 1:
raise ValueError("ODE's have only one independent variable")
else:
x = variables[0]
if not order:
order = ode_order(eq, func)
if order != 1:
raise NotImplementedError("Lie groups solver has been implemented "
"only for first order differential equations")
else:
df = func.diff(x)
a = Wild('a', exclude = [df])
b = Wild('b', exclude = [df])
match = collect(expand(eq), df).match(a*df + b)
if match:
h = -simplify(match[b]/match[a])
else:
try:
sol = solve(eq, df)
except NotImplementedError:
raise NotImplementedError("Infinitesimals for the "
"first order ODE could not be found")
else:
h = sol[0] # Find infinitesimals for one solution
y = Dummy('y')
h = h.subs(func, y)
xi = Function('xi')(x, y)
eta = Function('eta')(x, y)
dxi = Function('xi')(x, func)
deta = Function('eta')(x, func)
pde = (eta.diff(x) + (eta.diff(y) - xi.diff(x))*h -
(xi.diff(y))*h**2 - xi*(h.diff(x)) - eta*(h.diff(y)))
soltup = []
for sol in infinitesimals:
tsol = {xi: S(sol[dxi]).subs(func, y),
eta: S(sol[deta]).subs(func, y)}
sol = simplify(pde.subs(tsol).doit())
if sol:
soltup.append((False, sol.subs(y, func)))
else:
soltup.append((True, 0))
return soltup
def _ode_lie_group_try_heuristic(eq, heuristic, func, match, inf):
xi = Function("xi")
eta = Function("eta")
f = func.func
x = func.args[0]
y = match['y']
h = match['h']
tempsol = []
if not inf:
try:
inf = infinitesimals(eq, hint=heuristic, func=func, order=1, match=match)
except ValueError:
return None
for infsim in inf:
xiinf = (infsim[xi(x, func)]).subs(func, y)
etainf = (infsim[eta(x, func)]).subs(func, y)
# This condition creates recursion while using pdsolve.
# Since the first step while solving a PDE of form
# a*(f(x, y).diff(x)) + b*(f(x, y).diff(y)) + c = 0
# is to solve the ODE dy/dx = b/a
if simplify(etainf/xiinf) == h:
continue
rpde = f(x, y).diff(x)*xiinf + f(x, y).diff(y)*etainf
r = pdsolve(rpde, func=f(x, y)).rhs
s = pdsolve(rpde - 1, func=f(x, y)).rhs
newcoord = [_lie_group_remove(coord) for coord in [r, s]]
r = Dummy("r")
s = Dummy("s")
C1 = Symbol("C1")
rcoord = newcoord[0]
scoord = newcoord[-1]
try:
sol = solve([r - rcoord, s - scoord], x, y, dict=True)
if sol == []:
continue
except NotImplementedError:
continue
else:
sol = sol[0]
xsub = sol[x]
ysub = sol[y]
num = simplify(scoord.diff(x) + scoord.diff(y)*h)
denom = simplify(rcoord.diff(x) + rcoord.diff(y)*h)
if num and denom:
diffeq = simplify((num/denom).subs([(x, xsub), (y, ysub)]))
sep = separatevars(diffeq, symbols=[r, s], dict=True)
if sep:
# Trying to separate, r and s coordinates
deq = integrate((1/sep[s]), s) + C1 - integrate(sep['coeff']*sep[r], r)
# Substituting and reverting back to original coordinates
deq = deq.subs([(r, rcoord), (s, scoord)])
try:
sdeq = solve(deq, y)
except NotImplementedError:
tempsol.append(deq)
else:
return [Eq(f(x), sol) for sol in sdeq]
elif denom: # (ds/dr) is zero which means s is constant
return [Eq(f(x), solve(scoord - C1, y)[0])]
elif num: # (dr/ds) is zero which means r is constant
return [Eq(f(x), solve(rcoord - C1, y)[0])]
# If nothing works, return solution as it is, without solving for y
if tempsol:
return [Eq(sol.subs(y, f(x)), 0) for sol in tempsol]
return None
def _ode_lie_group( s, func, order, match):
heuristics = lie_heuristics
inf = {}
f = func.func
x = func.args[0]
df = func.diff(x)
xi = Function("xi")
eta = Function("eta")
xis = match['xi']
etas = match['eta']
y = match.pop('y', None)
if y:
h = -simplify(match[match['d']]/match[match['e']])
y = y
else:
y = Dummy("y")
h = s.subs(func, y)
if xis is not None and etas is not None:
inf = [{xi(x, f(x)): S(xis), eta(x, f(x)): S(etas)}]
if checkinfsol(Eq(df, s), inf, func=f(x), order=1)[0][0]:
heuristics = ["user_defined"] + list(heuristics)
match = {'h': h, 'y': y}
# This is done so that if any heuristic raises a ValueError
# another heuristic can be used.
sol = None
for heuristic in heuristics:
sol = _ode_lie_group_try_heuristic(Eq(df, s), heuristic, func, match, inf)
if sol:
return sol
return sol
def ode_lie_group(eq, func, order, match):
r"""
This hint implements the Lie group method of solving first order differential
equations. The aim is to convert the given differential equation from the
given coordinate system into another coordinate system where it becomes
invariant under the one-parameter Lie group of translations. The converted
ODE can be easily solved by quadrature. It makes use of the
:py:meth:`sympy.solvers.ode.infinitesimals` function which returns the
infinitesimals of the transformation.
The coordinates `r` and `s` can be found by solving the following Partial
Differential Equations.
.. math :: \xi\frac{\partial r}{\partial x} + \eta\frac{\partial r}{\partial y}
= 0
.. math :: \xi\frac{\partial s}{\partial x} + \eta\frac{\partial s}{\partial y}
= 1
The differential equation becomes separable in the new coordinate system
.. math :: \frac{ds}{dr} = \frac{\frac{\partial s}{\partial x} +
h(x, y)\frac{\partial s}{\partial y}}{
\frac{\partial r}{\partial x} + h(x, y)\frac{\partial r}{\partial y}}
After finding the solution by integration, it is then converted back to the original
coordinate system by substituting `r` and `s` in terms of `x` and `y` again.
Examples
========
>>> from sympy import Function, dsolve, exp, pprint
>>> from sympy.abc import x
>>> f = Function('f')
>>> pprint(dsolve(f(x).diff(x) + 2*x*f(x) - x*exp(-x**2), f(x),
... hint='lie_group'))
/ 2\ 2
| x | -x
f(x) = |C1 + --|*e
\ 2 /
References
==========
- Solving differential equations by Symmetry Groups,
John Starrett, pp. 1 - pp. 14
"""
x = func.args[0]
df = func.diff(x)
try:
eqsol = solve(eq, df)
except NotImplementedError:
eqsol = []
desols = []
for s in eqsol:
sol = _ode_lie_group(s, func, order, match=match)
if sol:
desols.extend(sol)
if desols == []:
raise NotImplementedError("The given ODE " + str(eq) + " cannot be solved by"
+ " the lie group method")
return desols
def _lie_group_remove(coords):
r"""
This function is strictly meant for internal use by the Lie group ODE solving
method. It replaces arbitrary functions returned by pdsolve as follows:
1] If coords is an arbitrary function, then its argument is returned.
2] An arbitrary function in an Add object is replaced by zero.
3] An arbitrary function in a Mul object is replaced by one.
4] If there is no arbitrary function coords is returned unchanged.
Examples
========
>>> from sympy.solvers.ode.ode import _lie_group_remove
>>> from sympy import Function
>>> from sympy.abc import x, y
>>> F = Function("F")
>>> eq = x**2*y
>>> _lie_group_remove(eq)
x**2*y
>>> eq = F(x**2*y)
>>> _lie_group_remove(eq)
x**2*y
>>> eq = x*y**2 + F(x**3)
>>> _lie_group_remove(eq)
x*y**2
>>> eq = (F(x**3) + y)*x**4
>>> _lie_group_remove(eq)
x**4*y
"""
if isinstance(coords, AppliedUndef):
return coords.args[0]
elif coords.is_Add:
subfunc = coords.atoms(AppliedUndef)
if subfunc:
for func in subfunc:
coords = coords.subs(func, 0)
return coords
elif coords.is_Pow:
base, expr = coords.as_base_exp()
base = _lie_group_remove(base)
expr = _lie_group_remove(expr)
return base**expr
elif coords.is_Mul:
mulargs = []
coordargs = coords.args
for arg in coordargs:
if not isinstance(coords, AppliedUndef):
mulargs.append(_lie_group_remove(arg))
return Mul(*mulargs)
return coords
def infinitesimals(eq, func=None, order=None, hint='default', match=None):
r"""
The infinitesimal functions of an ordinary differential equation, `\xi(x,y)`
and `\eta(x,y)`, are the infinitesimals of the Lie group of point transformations
for which the differential equation is invariant. So, the ODE `y'=f(x,y)`
would admit a Lie group `x^*=X(x,y;\varepsilon)=x+\varepsilon\xi(x,y)`,
`y^*=Y(x,y;\varepsilon)=y+\varepsilon\eta(x,y)` such that `(y^*)'=f(x^*, y^*)`.
A change of coordinates, to `r(x,y)` and `s(x,y)`, can be performed so this Lie group
becomes the translation group, `r^*=r` and `s^*=s+\varepsilon`.
They are tangents to the coordinate curves of the new system.
Consider the transformation `(x, y) \to (X, Y)` such that the
differential equation remains invariant. `\xi` and `\eta` are the tangents to
the transformed coordinates `X` and `Y`, at `\varepsilon=0`.
.. math:: \left(\frac{\partial X(x,y;\varepsilon)}{\partial\varepsilon
}\right)|_{\varepsilon=0} = \xi,
\left(\frac{\partial Y(x,y;\varepsilon)}{\partial\varepsilon
}\right)|_{\varepsilon=0} = \eta,
The infinitesimals can be found by solving the following PDE:
>>> from sympy import Function, Eq, pprint
>>> from sympy.abc import x, y
>>> xi, eta, h = map(Function, ['xi', 'eta', 'h'])
>>> h = h(x, y) # dy/dx = h
>>> eta = eta(x, y)
>>> xi = xi(x, y)
>>> genform = Eq(eta.diff(x) + (eta.diff(y) - xi.diff(x))*h
... - (xi.diff(y))*h**2 - xi*(h.diff(x)) - eta*(h.diff(y)), 0)
>>> pprint(genform)
/d d \ d 2 d
|--(eta(x, y)) - --(xi(x, y))|*h(x, y) - eta(x, y)*--(h(x, y)) - h (x, y)*--(x
\dy dx / dy dy
<BLANKLINE>
d d
i(x, y)) - xi(x, y)*--(h(x, y)) + --(eta(x, y)) = 0
dx dx
Solving the above mentioned PDE is not trivial, and can be solved only by
making intelligent assumptions for `\xi` and `\eta` (heuristics). Once an
infinitesimal is found, the attempt to find more heuristics stops. This is done to
optimise the speed of solving the differential equation. If a list of all the
infinitesimals is needed, ``hint`` should be flagged as ``all``, which gives
the complete list of infinitesimals. If the infinitesimals for a particular
heuristic needs to be found, it can be passed as a flag to ``hint``.
Examples
========
>>> from sympy import Function
>>> from sympy.solvers.ode.ode import infinitesimals
>>> from sympy.abc import x
>>> f = Function('f')
>>> eq = f(x).diff(x) - x**2*f(x)
>>> infinitesimals(eq)
[{eta(x, f(x)): exp(x**3/3), xi(x, f(x)): 0}]
References
==========
- Solving differential equations by Symmetry Groups,
John Starrett, pp. 1 - pp. 14
"""
if isinstance(eq, Equality):
eq = eq.lhs - eq.rhs
if not func:
eq, func = _preprocess(eq)
variables = func.args
if len(variables) != 1:
raise ValueError("ODE's have only one independent variable")
else:
x = variables[0]
if not order:
order = ode_order(eq, func)
if order != 1:
raise NotImplementedError("Infinitesimals for only "
"first order ODE's have been implemented")
else:
df = func.diff(x)
# Matching differential equation of the form a*df + b
a = Wild('a', exclude = [df])
b = Wild('b', exclude = [df])
if match: # Used by lie_group hint
h = match['h']
y = match['y']
else:
match = collect(expand(eq), df).match(a*df + b)
if match:
h = -simplify(match[b]/match[a])
else:
try:
sol = solve(eq, df)
except NotImplementedError:
raise NotImplementedError("Infinitesimals for the "
"first order ODE could not be found")
else:
h = sol[0] # Find infinitesimals for one solution
y = Dummy("y")
h = h.subs(func, y)
u = Dummy("u")
hx = h.diff(x)
hy = h.diff(y)
hinv = ((1/h).subs([(x, u), (y, x)])).subs(u, y) # Inverse ODE
match = {'h': h, 'func': func, 'hx': hx, 'hy': hy, 'y': y, 'hinv': hinv}
if hint == 'all':
xieta = []
for heuristic in lie_heuristics:
function = globals()['lie_heuristic_' + heuristic]
inflist = function(match, comp=True)
if inflist:
xieta.extend([inf for inf in inflist if inf not in xieta])
if xieta:
return xieta
else:
raise NotImplementedError("Infinitesimals could not be found for "
"the given ODE")
elif hint == 'default':
for heuristic in lie_heuristics:
function = globals()['lie_heuristic_' + heuristic]
xieta = function(match, comp=False)
if xieta:
return xieta
raise NotImplementedError("Infinitesimals could not be found for"
" the given ODE")
elif hint not in lie_heuristics:
raise ValueError("Heuristic not recognized: " + hint)
else:
function = globals()['lie_heuristic_' + hint]
xieta = function(match, comp=True)
if xieta:
return xieta
else:
raise ValueError("Infinitesimals could not be found using the"
" given heuristic")
def lie_heuristic_abaco1_simple(match, comp=False):
r"""
The first heuristic uses the following four sets of
assumptions on `\xi` and `\eta`
.. math:: \xi = 0, \eta = f(x)
.. math:: \xi = 0, \eta = f(y)
.. math:: \xi = f(x), \eta = 0
.. math:: \xi = f(y), \eta = 0
The success of this heuristic is determined by algebraic factorisation.
For the first assumption `\xi = 0` and `\eta` to be a function of `x`, the PDE
.. math:: \frac{\partial \eta}{\partial x} + (\frac{\partial \eta}{\partial y}
- \frac{\partial \xi}{\partial x})*h
- \frac{\partial \xi}{\partial y}*h^{2}
- \xi*\frac{\partial h}{\partial x} - \eta*\frac{\partial h}{\partial y} = 0
reduces to `f'(x) - f\frac{\partial h}{\partial y} = 0`
If `\frac{\partial h}{\partial y}` is a function of `x`, then this can usually
be integrated easily. A similar idea is applied to the other 3 assumptions as well.
References
==========
- E.S Cheb-Terrab, L.G.S Duarte and L.A,C.P da Mota, Computer Algebra
Solving of First Order ODEs Using Symmetry Methods, pp. 8
"""
xieta = []
y = match['y']
h = match['h']
func = match['func']
x = func.args[0]
hx = match['hx']
hy = match['hy']
xi = Function('xi')(x, func)
eta = Function('eta')(x, func)
hysym = hy.free_symbols
if y not in hysym:
try:
fx = exp(integrate(hy, x))
except NotImplementedError:
pass
else:
inf = {xi: S.Zero, eta: fx}
if not comp:
return [inf]
if comp and inf not in xieta:
xieta.append(inf)
factor = hy/h
facsym = factor.free_symbols
if x not in facsym:
try:
fy = exp(integrate(factor, y))
except NotImplementedError:
pass
else:
inf = {xi: S.Zero, eta: fy.subs(y, func)}
if not comp:
return [inf]
if comp and inf not in xieta:
xieta.append(inf)
factor = -hx/h
facsym = factor.free_symbols
if y not in facsym:
try:
fx = exp(integrate(factor, x))
except NotImplementedError:
pass
else:
inf = {xi: fx, eta: S.Zero}
if not comp:
return [inf]
if comp and inf not in xieta:
xieta.append(inf)
factor = -hx/(h**2)
facsym = factor.free_symbols
if x not in facsym:
try:
fy = exp(integrate(factor, y))
except NotImplementedError:
pass
else:
inf = {xi: fy.subs(y, func), eta: S.Zero}
if not comp:
return [inf]
if comp and inf not in xieta:
xieta.append(inf)
if xieta:
return xieta
def lie_heuristic_abaco1_product(match, comp=False):
r"""
The second heuristic uses the following two assumptions on `\xi` and `\eta`
.. math:: \eta = 0, \xi = f(x)*g(y)
.. math:: \eta = f(x)*g(y), \xi = 0
The first assumption of this heuristic holds good if
`\frac{1}{h^{2}}\frac{\partial^2}{\partial x \partial y}\log(h)` is
separable in `x` and `y`, then the separated factors containing `x`
is `f(x)`, and `g(y)` is obtained by
.. math:: e^{\int f\frac{\partial}{\partial x}\left(\frac{1}{f*h}\right)\,dy}
provided `f\frac{\partial}{\partial x}\left(\frac{1}{f*h}\right)` is a function
of `y` only.
The second assumption holds good if `\frac{dy}{dx} = h(x, y)` is rewritten as
`\frac{dy}{dx} = \frac{1}{h(y, x)}` and the same properties of the first assumption
satisfies. After obtaining `f(x)` and `g(y)`, the coordinates are again
interchanged, to get `\eta` as `f(x)*g(y)`
References
==========
- E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order
ODE Patterns, pp. 7 - pp. 8
"""
xieta = []
y = match['y']
h = match['h']
hinv = match['hinv']
func = match['func']
x = func.args[0]
xi = Function('xi')(x, func)
eta = Function('eta')(x, func)
inf = separatevars(((log(h).diff(y)).diff(x))/h**2, dict=True, symbols=[x, y])
if inf and inf['coeff']:
fx = inf[x]
gy = simplify(fx*((1/(fx*h)).diff(x)))
gysyms = gy.free_symbols
if x not in gysyms:
gy = exp(integrate(gy, y))
inf = {eta: S.Zero, xi: (fx*gy).subs(y, func)}
if not comp:
return [inf]
if comp and inf not in xieta:
xieta.append(inf)
u1 = Dummy("u1")
inf = separatevars(((log(hinv).diff(y)).diff(x))/hinv**2, dict=True, symbols=[x, y])
if inf and inf['coeff']:
fx = inf[x]
gy = simplify(fx*((1/(fx*hinv)).diff(x)))
gysyms = gy.free_symbols
if x not in gysyms:
gy = exp(integrate(gy, y))
etaval = fx*gy
etaval = (etaval.subs([(x, u1), (y, x)])).subs(u1, y)
inf = {eta: etaval.subs(y, func), xi: S.Zero}
if not comp:
return [inf]
if comp and inf not in xieta:
xieta.append(inf)
if xieta:
return xieta
def lie_heuristic_bivariate(match, comp=False):
r"""
The third heuristic assumes the infinitesimals `\xi` and `\eta`
to be bi-variate polynomials in `x` and `y`. The assumption made here
for the logic below is that `h` is a rational function in `x` and `y`
though that may not be necessary for the infinitesimals to be
bivariate polynomials. The coefficients of the infinitesimals
are found out by substituting them in the PDE and grouping similar terms
that are polynomials and since they form a linear system, solve and check
for non trivial solutions. The degree of the assumed bivariates
are increased till a certain maximum value.
References
==========
- Lie Groups and Differential Equations
pp. 327 - pp. 329
"""
h = match['h']
hx = match['hx']
hy = match['hy']
func = match['func']
x = func.args[0]
y = match['y']
xi = Function('xi')(x, func)
eta = Function('eta')(x, func)
if h.is_rational_function():
# The maximum degree that the infinitesimals can take is
# calculated by this technique.
etax, etay, etad, xix, xiy, xid = symbols("etax etay etad xix xiy xid")
ipde = etax + (etay - xix)*h - xiy*h**2 - xid*hx - etad*hy
num, denom = cancel(ipde).as_numer_denom()
deg = Poly(num, x, y).total_degree()
deta = Function('deta')(x, y)
dxi = Function('dxi')(x, y)
ipde = (deta.diff(x) + (deta.diff(y) - dxi.diff(x))*h - (dxi.diff(y))*h**2
- dxi*hx - deta*hy)
xieq = Symbol("xi0")
etaeq = Symbol("eta0")
for i in range(deg + 1):
if i:
xieq += Add(*[
Symbol("xi_" + str(power) + "_" + str(i - power))*x**power*y**(i - power)
for power in range(i + 1)])
etaeq += Add(*[
Symbol("eta_" + str(power) + "_" + str(i - power))*x**power*y**(i - power)
for power in range(i + 1)])
pden, denom = (ipde.subs({dxi: xieq, deta: etaeq}).doit()).as_numer_denom()
pden = expand(pden)
# If the individual terms are monomials, the coefficients
# are grouped
if pden.is_polynomial(x, y) and pden.is_Add:
polyy = Poly(pden, x, y).as_dict()
if polyy:
symset = xieq.free_symbols.union(etaeq.free_symbols) - {x, y}
soldict = solve(polyy.values(), *symset)
if isinstance(soldict, list):
soldict = soldict[0]
if any(soldict.values()):
xired = xieq.subs(soldict)
etared = etaeq.subs(soldict)
# Scaling is done by substituting one for the parameters
# This can be any number except zero.
dict_ = dict((sym, 1) for sym in symset)
inf = {eta: etared.subs(dict_).subs(y, func),
xi: xired.subs(dict_).subs(y, func)}
return [inf]
def lie_heuristic_chi(match, comp=False):
r"""
The aim of the fourth heuristic is to find the function `\chi(x, y)`
that satisfies the PDE `\frac{d\chi}{dx} + h\frac{d\chi}{dx}
- \frac{\partial h}{\partial y}\chi = 0`.
This assumes `\chi` to be a bivariate polynomial in `x` and `y`. By intuition,
`h` should be a rational function in `x` and `y`. The method used here is
to substitute a general binomial for `\chi` up to a certain maximum degree
is reached. The coefficients of the polynomials, are calculated by by collecting
terms of the same order in `x` and `y`.
After finding `\chi`, the next step is to use `\eta = \xi*h + \chi`, to
determine `\xi` and `\eta`. This can be done by dividing `\chi` by `h`
which would give `-\xi` as the quotient and `\eta` as the remainder.
References
==========
- E.S Cheb-Terrab, L.G.S Duarte and L.A,C.P da Mota, Computer Algebra
Solving of First Order ODEs Using Symmetry Methods, pp. 8
"""
h = match['h']
hy = match['hy']
func = match['func']
x = func.args[0]
y = match['y']
xi = Function('xi')(x, func)
eta = Function('eta')(x, func)
if h.is_rational_function():
schi, schix, schiy = symbols("schi, schix, schiy")
cpde = schix + h*schiy - hy*schi
num, denom = cancel(cpde).as_numer_denom()
deg = Poly(num, x, y).total_degree()
chi = Function('chi')(x, y)
chix = chi.diff(x)
chiy = chi.diff(y)
cpde = chix + h*chiy - hy*chi
chieq = Symbol("chi")
for i in range(1, deg + 1):
chieq += Add(*[
Symbol("chi_" + str(power) + "_" + str(i - power))*x**power*y**(i - power)
for power in range(i + 1)])
cnum, cden = cancel(cpde.subs({chi : chieq}).doit()).as_numer_denom()
cnum = expand(cnum)
if cnum.is_polynomial(x, y) and cnum.is_Add:
cpoly = Poly(cnum, x, y).as_dict()
if cpoly:
solsyms = chieq.free_symbols - {x, y}
soldict = solve(cpoly.values(), *solsyms)
if isinstance(soldict, list):
soldict = soldict[0]
if any(soldict.values()):
chieq = chieq.subs(soldict)
dict_ = dict((sym, 1) for sym in solsyms)
chieq = chieq.subs(dict_)
# After finding chi, the main aim is to find out
# eta, xi by the equation eta = xi*h + chi
# One method to set xi, would be rearranging it to
# (eta/h) - xi = (chi/h). This would mean dividing
# chi by h would give -xi as the quotient and eta
# as the remainder. Thanks to Sean Vig for suggesting
# this method.
xic, etac = div(chieq, h)
inf = {eta: etac.subs(y, func), xi: -xic.subs(y, func)}
return [inf]
def lie_heuristic_function_sum(match, comp=False):
r"""
This heuristic uses the following two assumptions on `\xi` and `\eta`
.. math:: \eta = 0, \xi = f(x) + g(y)
.. math:: \eta = f(x) + g(y), \xi = 0
The first assumption of this heuristic holds good if
.. math:: \frac{\partial}{\partial y}[(h\frac{\partial^{2}}{
\partial x^{2}}(h^{-1}))^{-1}]
is separable in `x` and `y`,
1. The separated factors containing `y` is `\frac{\partial g}{\partial y}`.
From this `g(y)` can be determined.
2. The separated factors containing `x` is `f''(x)`.
3. `h\frac{\partial^{2}}{\partial x^{2}}(h^{-1})` equals
`\frac{f''(x)}{f(x) + g(y)}`. From this `f(x)` can be determined.
The second assumption holds good if `\frac{dy}{dx} = h(x, y)` is rewritten as
`\frac{dy}{dx} = \frac{1}{h(y, x)}` and the same properties of the first
assumption satisfies. After obtaining `f(x)` and `g(y)`, the coordinates
are again interchanged, to get `\eta` as `f(x) + g(y)`.
For both assumptions, the constant factors are separated among `g(y)`
and `f''(x)`, such that `f''(x)` obtained from 3] is the same as that
obtained from 2]. If not possible, then this heuristic fails.
References
==========
- E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order
ODE Patterns, pp. 7 - pp. 8
"""
xieta = []
h = match['h']
func = match['func']
hinv = match['hinv']
x = func.args[0]
y = match['y']
xi = Function('xi')(x, func)
eta = Function('eta')(x, func)
for odefac in [h, hinv]:
factor = odefac*((1/odefac).diff(x, 2))
sep = separatevars((1/factor).diff(y), dict=True, symbols=[x, y])
if sep and sep['coeff'] and sep[x].has(x) and sep[y].has(y):
k = Dummy("k")
try:
gy = k*integrate(sep[y], y)
except NotImplementedError:
pass
else:
fdd = 1/(k*sep[x]*sep['coeff'])
fx = simplify(fdd/factor - gy)
check = simplify(fx.diff(x, 2) - fdd)
if fx:
if not check:
fx = fx.subs(k, 1)
gy = (gy/k)
else:
sol = solve(check, k)
if sol:
sol = sol[0]
fx = fx.subs(k, sol)
gy = (gy/k)*sol
else:
continue
if odefac == hinv: # Inverse ODE
fx = fx.subs(x, y)
gy = gy.subs(y, x)
etaval = factor_terms(fx + gy)
if etaval.is_Mul:
etaval = Mul(*[arg for arg in etaval.args if arg.has(x, y)])
if odefac == hinv: # Inverse ODE
inf = {eta: etaval.subs(y, func), xi : S.Zero}
else:
inf = {xi: etaval.subs(y, func), eta : S.Zero}
if not comp:
return [inf]
else:
xieta.append(inf)
if xieta:
return xieta
def lie_heuristic_abaco2_similar(match, comp=False):
r"""
This heuristic uses the following two assumptions on `\xi` and `\eta`
.. math:: \eta = g(x), \xi = f(x)
.. math:: \eta = f(y), \xi = g(y)
For the first assumption,
1. First `\frac{\frac{\partial h}{\partial y}}{\frac{\partial^{2} h}{
\partial yy}}` is calculated. Let us say this value is A
2. If this is constant, then `h` is matched to the form `A(x) + B(x)e^{
\frac{y}{C}}` then, `\frac{e^{\int \frac{A(x)}{C} \,dx}}{B(x)}` gives `f(x)`
and `A(x)*f(x)` gives `g(x)`
3. Otherwise `\frac{\frac{\partial A}{\partial X}}{\frac{\partial A}{
\partial Y}} = \gamma` is calculated. If
a] `\gamma` is a function of `x` alone
b] `\frac{\gamma\frac{\partial h}{\partial y} - \gamma'(x) - \frac{
\partial h}{\partial x}}{h + \gamma} = G` is a function of `x` alone.
then, `e^{\int G \,dx}` gives `f(x)` and `-\gamma*f(x)` gives `g(x)`
The second assumption holds good if `\frac{dy}{dx} = h(x, y)` is rewritten as
`\frac{dy}{dx} = \frac{1}{h(y, x)}` and the same properties of the first assumption
satisfies. After obtaining `f(x)` and `g(x)`, the coordinates are again
interchanged, to get `\xi` as `f(x^*)` and `\eta` as `g(y^*)`
References
==========
- E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order
ODE Patterns, pp. 10 - pp. 12
"""
h = match['h']
hx = match['hx']
hy = match['hy']
func = match['func']
hinv = match['hinv']
x = func.args[0]
y = match['y']
xi = Function('xi')(x, func)
eta = Function('eta')(x, func)
factor = cancel(h.diff(y)/h.diff(y, 2))
factorx = factor.diff(x)
factory = factor.diff(y)
if not factor.has(x) and not factor.has(y):
A = Wild('A', exclude=[y])
B = Wild('B', exclude=[y])
C = Wild('C', exclude=[x, y])
match = h.match(A + B*exp(y/C))
try:
tau = exp(-integrate(match[A]/match[C]), x)/match[B]
except NotImplementedError:
pass
else:
gx = match[A]*tau
return [{xi: tau, eta: gx}]
else:
gamma = cancel(factorx/factory)
if not gamma.has(y):
tauint = cancel((gamma*hy - gamma.diff(x) - hx)/(h + gamma))
if not tauint.has(y):
try:
tau = exp(integrate(tauint, x))
except NotImplementedError:
pass
else:
gx = -tau*gamma
return [{xi: tau, eta: gx}]
factor = cancel(hinv.diff(y)/hinv.diff(y, 2))
factorx = factor.diff(x)
factory = factor.diff(y)
if not factor.has(x) and not factor.has(y):
A = Wild('A', exclude=[y])
B = Wild('B', exclude=[y])
C = Wild('C', exclude=[x, y])
match = h.match(A + B*exp(y/C))
try:
tau = exp(-integrate(match[A]/match[C]), x)/match[B]
except NotImplementedError:
pass
else:
gx = match[A]*tau
return [{eta: tau.subs(x, func), xi: gx.subs(x, func)}]
else:
gamma = cancel(factorx/factory)
if not gamma.has(y):
tauint = cancel((gamma*hinv.diff(y) - gamma.diff(x) - hinv.diff(x))/(
hinv + gamma))
if not tauint.has(y):
try:
tau = exp(integrate(tauint, x))
except NotImplementedError:
pass
else:
gx = -tau*gamma
return [{eta: tau.subs(x, func), xi: gx.subs(x, func)}]
def lie_heuristic_abaco2_unique_unknown(match, comp=False):
r"""
This heuristic assumes the presence of unknown functions or known functions
with non-integer powers.
1. A list of all functions and non-integer powers containing x and y
2. Loop over each element `f` in the list, find `\frac{\frac{\partial f}{\partial x}}{
\frac{\partial f}{\partial x}} = R`
If it is separable in `x` and `y`, let `X` be the factors containing `x`. Then
a] Check if `\xi = X` and `\eta = -\frac{X}{R}` satisfy the PDE. If yes, then return
`\xi` and `\eta`
b] Check if `\xi = \frac{-R}{X}` and `\eta = -\frac{1}{X}` satisfy the PDE.
If yes, then return `\xi` and `\eta`
If not, then check if
a] :math:`\xi = -R,\eta = 1`
b] :math:`\xi = 1, \eta = -\frac{1}{R}`
are solutions.
References
==========
- E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order
ODE Patterns, pp. 10 - pp. 12
"""
h = match['h']
hx = match['hx']
hy = match['hy']
func = match['func']
x = func.args[0]
y = match['y']
xi = Function('xi')(x, func)
eta = Function('eta')(x, func)
funclist = []
for atom in h.atoms(Pow):
base, exp = atom.as_base_exp()
if base.has(x) and base.has(y):
if not exp.is_Integer:
funclist.append(atom)
for function in h.atoms(AppliedUndef):
syms = function.free_symbols
if x in syms and y in syms:
funclist.append(function)
for f in funclist:
frac = cancel(f.diff(y)/f.diff(x))
sep = separatevars(frac, dict=True, symbols=[x, y])
if sep and sep['coeff']:
xitry1 = sep[x]
etatry1 = -1/(sep[y]*sep['coeff'])
pde1 = etatry1.diff(y)*h - xitry1.diff(x)*h - xitry1*hx - etatry1*hy
if not simplify(pde1):
return [{xi: xitry1, eta: etatry1.subs(y, func)}]
xitry2 = 1/etatry1
etatry2 = 1/xitry1
pde2 = etatry2.diff(x) - (xitry2.diff(y))*h**2 - xitry2*hx - etatry2*hy
if not simplify(expand(pde2)):
return [{xi: xitry2.subs(y, func), eta: etatry2}]
else:
etatry = -1/frac
pde = etatry.diff(x) + etatry.diff(y)*h - hx - etatry*hy
if not simplify(pde):
return [{xi: S.One, eta: etatry.subs(y, func)}]
xitry = -frac
pde = -xitry.diff(x)*h -xitry.diff(y)*h**2 - xitry*hx -hy
if not simplify(expand(pde)):
return [{xi: xitry.subs(y, func), eta: S.One}]
def lie_heuristic_abaco2_unique_general(match, comp=False):
r"""
This heuristic finds if infinitesimals of the form `\eta = f(x)`, `\xi = g(y)`
without making any assumptions on `h`.
The complete sequence of steps is given in the paper mentioned below.
References
==========
- E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order
ODE Patterns, pp. 10 - pp. 12
"""
hx = match['hx']
hy = match['hy']
func = match['func']
x = func.args[0]
y = match['y']
xi = Function('xi')(x, func)
eta = Function('eta')(x, func)
A = hx.diff(y)
B = hy.diff(y) + hy**2
C = hx.diff(x) - hx**2
if not (A and B and C):
return
Ax = A.diff(x)
Ay = A.diff(y)
Axy = Ax.diff(y)
Axx = Ax.diff(x)
Ayy = Ay.diff(y)
D = simplify(2*Axy + hx*Ay - Ax*hy + (hx*hy + 2*A)*A)*A - 3*Ax*Ay
if not D:
E1 = simplify(3*Ax**2 + ((hx**2 + 2*C)*A - 2*Axx)*A)
if E1:
E2 = simplify((2*Ayy + (2*B - hy**2)*A)*A - 3*Ay**2)
if not E2:
E3 = simplify(
E1*((28*Ax + 4*hx*A)*A**3 - E1*(hy*A + Ay)) - E1.diff(x)*8*A**4)
if not E3:
etaval = cancel((4*A**3*(Ax - hx*A) + E1*(hy*A - Ay))/(S(2)*A*E1))
if x not in etaval:
try:
etaval = exp(integrate(etaval, y))
except NotImplementedError:
pass
else:
xival = -4*A**3*etaval/E1
if y not in xival:
return [{xi: xival, eta: etaval.subs(y, func)}]
else:
E1 = simplify((2*Ayy + (2*B - hy**2)*A)*A - 3*Ay**2)
if E1:
E2 = simplify(
4*A**3*D - D**2 + E1*((2*Axx - (hx**2 + 2*C)*A)*A - 3*Ax**2))
if not E2:
E3 = simplify(
-(A*D)*E1.diff(y) + ((E1.diff(x) - hy*D)*A + 3*Ay*D +
(A*hx - 3*Ax)*E1)*E1)
if not E3:
etaval = cancel(((A*hx - Ax)*E1 - (Ay + A*hy)*D)/(S(2)*A*D))
if x not in etaval:
try:
etaval = exp(integrate(etaval, y))
except NotImplementedError:
pass
else:
xival = -E1*etaval/D
if y not in xival:
return [{xi: xival, eta: etaval.subs(y, func)}]
def lie_heuristic_linear(match, comp=False):
r"""
This heuristic assumes
1. `\xi = ax + by + c` and
2. `\eta = fx + gy + h`
After substituting the following assumptions in the determining PDE, it
reduces to
.. math:: f + (g - a)h - bh^{2} - (ax + by + c)\frac{\partial h}{\partial x}
- (fx + gy + c)\frac{\partial h}{\partial y}
Solving the reduced PDE obtained, using the method of characteristics, becomes
impractical. The method followed is grouping similar terms and solving the system
of linear equations obtained. The difference between the bivariate heuristic is that
`h` need not be a rational function in this case.
References
==========
- E.S. Cheb-Terrab, A.D. Roche, Symmetries and First Order
ODE Patterns, pp. 10 - pp. 12
"""
h = match['h']
hx = match['hx']
hy = match['hy']
func = match['func']
x = func.args[0]
y = match['y']
xi = Function('xi')(x, func)
eta = Function('eta')(x, func)
coeffdict = {}
symbols = numbered_symbols("c", cls=Dummy)
symlist = [next(symbols) for _ in islice(symbols, 6)]
C0, C1, C2, C3, C4, C5 = symlist
pde = C3 + (C4 - C0)*h - (C0*x + C1*y + C2)*hx - (C3*x + C4*y + C5)*hy - C1*h**2
pde, denom = pde.as_numer_denom()
pde = powsimp(expand(pde))
if pde.is_Add:
terms = pde.args
for term in terms:
if term.is_Mul:
rem = Mul(*[m for m in term.args if not m.has(x, y)])
xypart = term/rem
if xypart not in coeffdict:
coeffdict[xypart] = rem
else:
coeffdict[xypart] += rem
else:
if term not in coeffdict:
coeffdict[term] = S.One
else:
coeffdict[term] += S.One
sollist = coeffdict.values()
soldict = solve(sollist, symlist)
if soldict:
if isinstance(soldict, list):
soldict = soldict[0]
subval = soldict.values()
if any(t for t in subval):
onedict = dict(zip(symlist, [1]*6))
xival = C0*x + C1*func + C2
etaval = C3*x + C4*func + C5
xival = xival.subs(soldict)
etaval = etaval.subs(soldict)
xival = xival.subs(onedict)
etaval = etaval.subs(onedict)
return [{xi: xival, eta: etaval}]
def sysode_linear_2eq_order1(match_):
x = match_['func'][0].func
y = match_['func'][1].func
func = match_['func']
fc = match_['func_coeff']
eq = match_['eq']
r = dict()
t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0]
for i in range(2):
eqs = 0
for terms in Add.make_args(eq[i]):
eqs += terms/fc[i,func[i],1]
eq[i] = eqs
# for equations Eq(a1*diff(x(t),t), a*x(t) + b*y(t) + k1)
# and Eq(a2*diff(x(t),t), c*x(t) + d*y(t) + k2)
r['a'] = -fc[0,x(t),0]/fc[0,x(t),1]
r['c'] = -fc[1,x(t),0]/fc[1,y(t),1]
r['b'] = -fc[0,y(t),0]/fc[0,x(t),1]
r['d'] = -fc[1,y(t),0]/fc[1,y(t),1]
forcing = [S.Zero,S.Zero]
for i in range(2):
for j in Add.make_args(eq[i]):
if not j.has(x(t), y(t)):
forcing[i] += j
if not (forcing[0].has(t) or forcing[1].has(t)):
r['k1'] = forcing[0]
r['k2'] = forcing[1]
else:
raise NotImplementedError("Only homogeneous problems are supported" +
" (and constant inhomogeneity)")
if match_['type_of_equation'] == 'type6':
sol = _linear_2eq_order1_type6(x, y, t, r, eq)
if match_['type_of_equation'] == 'type7':
sol = _linear_2eq_order1_type7(x, y, t, r, eq)
return sol
def _linear_2eq_order1_type6(x, y, t, r, eq):
r"""
The equations of this type of ode are .
.. math:: x' = f(t) x + g(t) y
.. math:: y' = a [f(t) + a h(t)] x + a [g(t) - h(t)] y
This is solved by first multiplying the first equation by `-a` and adding
it to the second equation to obtain
.. math:: y' - a x' = -a h(t) (y - a x)
Setting `U = y - ax` and integrating the equation we arrive at
.. math:: y - ax = C_1 e^{-a \int h(t) \,dt}
and on substituting the value of y in first equation give rise to first order ODEs. After solving for
`x`, we can obtain `y` by substituting the value of `x` in second equation.
"""
C1, C2, C3, C4 = get_numbered_constants(eq, num=4)
p = 0
q = 0
p1 = cancel(r['c']/cancel(r['c']/r['d']).as_numer_denom()[0])
p2 = cancel(r['a']/cancel(r['a']/r['b']).as_numer_denom()[0])
for n, i in enumerate([p1, p2]):
for j in Mul.make_args(collect_const(i)):
if not j.has(t):
q = j
if q!=0 and n==0:
if ((r['c']/j - r['a'])/(r['b'] - r['d']/j)) == j:
p = 1
s = j
break
if q!=0 and n==1:
if ((r['a']/j - r['c'])/(r['d'] - r['b']/j)) == j:
p = 2
s = j
break
if p == 1:
equ = diff(x(t),t) - r['a']*x(t) - r['b']*(s*x(t) + C1*exp(-s*Integral(r['b'] - r['d']/s, t)))
hint1 = classify_ode(equ)[1]
sol1 = dsolve(equ, hint=hint1+'_Integral').rhs
sol2 = s*sol1 + C1*exp(-s*Integral(r['b'] - r['d']/s, t))
elif p ==2:
equ = diff(y(t),t) - r['c']*y(t) - r['d']*s*y(t) + C1*exp(-s*Integral(r['d'] - r['b']/s, t))
hint1 = classify_ode(equ)[1]
sol2 = dsolve(equ, hint=hint1+'_Integral').rhs
sol1 = s*sol2 + C1*exp(-s*Integral(r['d'] - r['b']/s, t))
return [Eq(x(t), sol1), Eq(y(t), sol2)]
def _linear_2eq_order1_type7(x, y, t, r, eq):
r"""
The equations of this type of ode are .
.. math:: x' = f(t) x + g(t) y
.. math:: y' = h(t) x + p(t) y
Differentiating the first equation and substituting the value of `y`
from second equation will give a second-order linear equation
.. math:: g x'' - (fg + gp + g') x' + (fgp - g^{2} h + f g' - f' g) x = 0
This above equation can be easily integrated if following conditions are satisfied.
1. `fgp - g^{2} h + f g' - f' g = 0`
2. `fgp - g^{2} h + f g' - f' g = ag, fg + gp + g' = bg`
If first condition is satisfied then it is solved by current dsolve solver and in second case it becomes
a constant coefficient differential equation which is also solved by current solver.
Otherwise if the above condition fails then,
a particular solution is assumed as `x = x_0(t)` and `y = y_0(t)`
Then the general solution is expressed as
.. math:: x = C_1 x_0(t) + C_2 x_0(t) \int \frac{g(t) F(t) P(t)}{x_0^{2}(t)} \,dt
.. math:: y = C_1 y_0(t) + C_2 [\frac{F(t) P(t)}{x_0(t)} + y_0(t) \int \frac{g(t) F(t) P(t)}{x_0^{2}(t)} \,dt]
where C1 and C2 are arbitrary constants and
.. math:: F(t) = e^{\int f(t) \,dt} , P(t) = e^{\int p(t) \,dt}
"""
C1, C2, C3, C4 = get_numbered_constants(eq, num=4)
e1 = r['a']*r['b']*r['c'] - r['b']**2*r['c'] + r['a']*diff(r['b'],t) - diff(r['a'],t)*r['b']
e2 = r['a']*r['c']*r['d'] - r['b']*r['c']**2 + diff(r['c'],t)*r['d'] - r['c']*diff(r['d'],t)
m1 = r['a']*r['b'] + r['b']*r['d'] + diff(r['b'],t)
m2 = r['a']*r['c'] + r['c']*r['d'] + diff(r['c'],t)
if e1 == 0:
sol1 = dsolve(r['b']*diff(x(t),t,t) - m1*diff(x(t),t)).rhs
sol2 = dsolve(diff(y(t),t) - r['c']*sol1 - r['d']*y(t)).rhs
elif e2 == 0:
sol2 = dsolve(r['c']*diff(y(t),t,t) - m2*diff(y(t),t)).rhs
sol1 = dsolve(diff(x(t),t) - r['a']*x(t) - r['b']*sol2).rhs
elif not (e1/r['b']).has(t) and not (m1/r['b']).has(t):
sol1 = dsolve(diff(x(t),t,t) - (m1/r['b'])*diff(x(t),t) - (e1/r['b'])*x(t)).rhs
sol2 = dsolve(diff(y(t),t) - r['c']*sol1 - r['d']*y(t)).rhs
elif not (e2/r['c']).has(t) and not (m2/r['c']).has(t):
sol2 = dsolve(diff(y(t),t,t) - (m2/r['c'])*diff(y(t),t) - (e2/r['c'])*y(t)).rhs
sol1 = dsolve(diff(x(t),t) - r['a']*x(t) - r['b']*sol2).rhs
else:
x0 = Function('x0')(t) # x0 and y0 being particular solutions
y0 = Function('y0')(t)
F = exp(Integral(r['a'],t))
P = exp(Integral(r['d'],t))
sol1 = C1*x0 + C2*x0*Integral(r['b']*F*P/x0**2, t)
sol2 = C1*y0 + C2*(F*P/x0 + y0*Integral(r['b']*F*P/x0**2, t))
return [Eq(x(t), sol1), Eq(y(t), sol2)]
def sysode_linear_2eq_order2(match_):
x = match_['func'][0].func
y = match_['func'][1].func
func = match_['func']
fc = match_['func_coeff']
eq = match_['eq']
r = dict()
t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0]
for i in range(2):
eqs = []
for terms in Add.make_args(eq[i]):
eqs.append(terms/fc[i,func[i],2])
eq[i] = Add(*eqs)
# for equations Eq(diff(x(t),t,t), a1*diff(x(t),t)+b1*diff(y(t),t)+c1*x(t)+d1*y(t)+e1)
# and Eq(a2*diff(y(t),t,t), a2*diff(x(t),t)+b2*diff(y(t),t)+c2*x(t)+d2*y(t)+e2)
r['a1'] = -fc[0,x(t),1]/fc[0,x(t),2] ; r['a2'] = -fc[1,x(t),1]/fc[1,y(t),2]
r['b1'] = -fc[0,y(t),1]/fc[0,x(t),2] ; r['b2'] = -fc[1,y(t),1]/fc[1,y(t),2]
r['c1'] = -fc[0,x(t),0]/fc[0,x(t),2] ; r['c2'] = -fc[1,x(t),0]/fc[1,y(t),2]
r['d1'] = -fc[0,y(t),0]/fc[0,x(t),2] ; r['d2'] = -fc[1,y(t),0]/fc[1,y(t),2]
const = [S.Zero, S.Zero]
for i in range(2):
for j in Add.make_args(eq[i]):
if not (j.has(x(t)) or j.has(y(t))):
const[i] += j
r['e1'] = -const[0]
r['e2'] = -const[1]
if match_['type_of_equation'] == 'type1':
sol = _linear_2eq_order2_type1(x, y, t, r, eq)
elif match_['type_of_equation'] == 'type2':
gsol = _linear_2eq_order2_type1(x, y, t, r, eq)
psol = _linear_2eq_order2_type2(x, y, t, r, eq)
sol = [Eq(x(t), gsol[0].rhs+psol[0]), Eq(y(t), gsol[1].rhs+psol[1])]
elif match_['type_of_equation'] == 'type3':
sol = _linear_2eq_order2_type3(x, y, t, r, eq)
elif match_['type_of_equation'] == 'type4':
sol = _linear_2eq_order2_type4(x, y, t, r, eq)
elif match_['type_of_equation'] == 'type5':
sol = _linear_2eq_order2_type5(x, y, t, r, eq)
elif match_['type_of_equation'] == 'type6':
sol = _linear_2eq_order2_type6(x, y, t, r, eq)
elif match_['type_of_equation'] == 'type7':
sol = _linear_2eq_order2_type7(x, y, t, r, eq)
elif match_['type_of_equation'] == 'type8':
sol = _linear_2eq_order2_type8(x, y, t, r, eq)
elif match_['type_of_equation'] == 'type9':
sol = _linear_2eq_order2_type9(x, y, t, r, eq)
elif match_['type_of_equation'] == 'type10':
sol = _linear_2eq_order2_type10(x, y, t, r, eq)
elif match_['type_of_equation'] == 'type11':
sol = _linear_2eq_order2_type11(x, y, t, r, eq)
return sol
def _linear_2eq_order2_type1(x, y, t, r, eq):
r"""
System of two constant-coefficient second-order linear homogeneous differential equations
.. math:: x'' = ax + by
.. math:: y'' = cx + dy
The characteristic equation for above equations
.. math:: \lambda^4 - (a + d) \lambda^2 + ad - bc = 0
whose discriminant is `D = (a - d)^2 + 4bc \neq 0`
1. When `ad - bc \neq 0`
1.1. If `D \neq 0`. The characteristic equation has four distinct roots, `\lambda_1, \lambda_2, \lambda_3, \lambda_4`.
The general solution of the system is
.. math:: x = C_1 b e^{\lambda_1 t} + C_2 b e^{\lambda_2 t} + C_3 b e^{\lambda_3 t} + C_4 b e^{\lambda_4 t}
.. math:: y = C_1 (\lambda_1^{2} - a) e^{\lambda_1 t} + C_2 (\lambda_2^{2} - a) e^{\lambda_2 t} + C_3 (\lambda_3^{2} - a) e^{\lambda_3 t} + C_4 (\lambda_4^{2} - a) e^{\lambda_4 t}
where `C_1,..., C_4` are arbitrary constants.
1.2. If `D = 0` and `a \neq d`:
.. math:: x = 2 C_1 (bt + \frac{2bk}{a - d}) e^{\frac{kt}{2}} + 2 C_2 (bt + \frac{2bk}{a - d}) e^{\frac{-kt}{2}} + 2b C_3 t e^{\frac{kt}{2}} + 2b C_4 t e^{\frac{-kt}{2}}
.. math:: y = C_1 (d - a) t e^{\frac{kt}{2}} + C_2 (d - a) t e^{\frac{-kt}{2}} + C_3 [(d - a) t + 2k] e^{\frac{kt}{2}} + C_4 [(d - a) t - 2k] e^{\frac{-kt}{2}}
where `C_1,..., C_4` are arbitrary constants and `k = \sqrt{2 (a + d)}`
1.3. If `D = 0` and `a = d \neq 0` and `b = 0`:
.. math:: x = 2 \sqrt{a} C_1 e^{\sqrt{a} t} + 2 \sqrt{a} C_2 e^{-\sqrt{a} t}
.. math:: y = c C_1 t e^{\sqrt{a} t} - c C_2 t e^{-\sqrt{a} t} + C_3 e^{\sqrt{a} t} + C_4 e^{-\sqrt{a} t}
1.4. If `D = 0` and `a = d \neq 0` and `c = 0`:
.. math:: x = b C_1 t e^{\sqrt{a} t} - b C_2 t e^{-\sqrt{a} t} + C_3 e^{\sqrt{a} t} + C_4 e^{-\sqrt{a} t}
.. math:: y = 2 \sqrt{a} C_1 e^{\sqrt{a} t} + 2 \sqrt{a} C_2 e^{-\sqrt{a} t}
2. When `ad - bc = 0` and `a^2 + b^2 > 0`. Then the original system becomes
.. math:: x'' = ax + by
.. math:: y'' = k (ax + by)
2.1. If `a + bk \neq 0`:
.. math:: x = C_1 e^{t \sqrt{a + bk}} + C_2 e^{-t \sqrt{a + bk}} + C_3 bt + C_4 b
.. math:: y = C_1 k e^{t \sqrt{a + bk}} + C_2 k e^{-t \sqrt{a + bk}} - C_3 at - C_4 a
2.2. If `a + bk = 0`:
.. math:: x = C_1 b t^3 + C_2 b t^2 + C_3 t + C_4
.. math:: y = kx + 6 C_1 t + 2 C_2
"""
r['a'] = r['c1']
r['b'] = r['d1']
r['c'] = r['c2']
r['d'] = r['d2']
l = Symbol('l')
C1, C2, C3, C4 = get_numbered_constants(eq, num=4)
chara_eq = l**4 - (r['a']+r['d'])*l**2 + r['a']*r['d'] - r['b']*r['c']
l1 = rootof(chara_eq, 0)
l2 = rootof(chara_eq, 1)
l3 = rootof(chara_eq, 2)
l4 = rootof(chara_eq, 3)
D = (r['a'] - r['d'])**2 + 4*r['b']*r['c']
if (r['a']*r['d'] - r['b']*r['c']) != 0:
if D != 0:
gsol1 = C1*r['b']*exp(l1*t) + C2*r['b']*exp(l2*t) + C3*r['b']*exp(l3*t) \
+ C4*r['b']*exp(l4*t)
gsol2 = C1*(l1**2-r['a'])*exp(l1*t) + C2*(l2**2-r['a'])*exp(l2*t) + \
C3*(l3**2-r['a'])*exp(l3*t) + C4*(l4**2-r['a'])*exp(l4*t)
else:
if r['a'] != r['d']:
k = sqrt(2*(r['a']+r['d']))
mid = r['b']*t+2*r['b']*k/(r['a']-r['d'])
gsol1 = 2*C1*mid*exp(k*t/2) + 2*C2*mid*exp(-k*t/2) + \
2*r['b']*C3*t*exp(k*t/2) + 2*r['b']*C4*t*exp(-k*t/2)
gsol2 = C1*(r['d']-r['a'])*t*exp(k*t/2) + C2*(r['d']-r['a'])*t*exp(-k*t/2) + \
C3*((r['d']-r['a'])*t+2*k)*exp(k*t/2) + C4*((r['d']-r['a'])*t-2*k)*exp(-k*t/2)
elif r['a'] == r['d'] != 0 and r['b'] == 0:
sa = sqrt(r['a'])
gsol1 = 2*sa*C1*exp(sa*t) + 2*sa*C2*exp(-sa*t)
gsol2 = r['c']*C1*t*exp(sa*t)-r['c']*C2*t*exp(-sa*t)+C3*exp(sa*t)+C4*exp(-sa*t)
elif r['a'] == r['d'] != 0 and r['c'] == 0:
sa = sqrt(r['a'])
gsol1 = r['b']*C1*t*exp(sa*t)-r['b']*C2*t*exp(-sa*t)+C3*exp(sa*t)+C4*exp(-sa*t)
gsol2 = 2*sa*C1*exp(sa*t) + 2*sa*C2*exp(-sa*t)
elif (r['a']*r['d'] - r['b']*r['c']) == 0 and (r['a']**2 + r['b']**2) > 0:
k = r['c']/r['a']
if r['a'] + r['b']*k != 0:
mid = sqrt(r['a'] + r['b']*k)
gsol1 = C1*exp(mid*t) + C2*exp(-mid*t) + C3*r['b']*t + C4*r['b']
gsol2 = C1*k*exp(mid*t) + C2*k*exp(-mid*t) - C3*r['a']*t - C4*r['a']
else:
gsol1 = C1*r['b']*t**3 + C2*r['b']*t**2 + C3*t + C4
gsol2 = k*gsol1 + 6*C1*t + 2*C2
return [Eq(x(t), gsol1), Eq(y(t), gsol2)]
def _linear_2eq_order2_type2(x, y, t, r, eq):
r"""
The equations in this type are
.. math:: x'' = a_1 x + b_1 y + c_1
.. math:: y'' = a_2 x + b_2 y + c_2
The general solution of this system is given by the sum of its particular solution
and the general solution of the homogeneous system. The general solution is given
by the linear system of 2 equation of order 2 and type 1
1. If `a_1 b_2 - a_2 b_1 \neq 0`. A particular solution will be `x = x_0` and `y = y_0`
where the constants `x_0` and `y_0` are determined by solving the linear algebraic system
.. math:: a_1 x_0 + b_1 y_0 + c_1 = 0, a_2 x_0 + b_2 y_0 + c_2 = 0
2. If `a_1 b_2 - a_2 b_1 = 0` and `a_1^2 + b_1^2 > 0`. In this case, the system in question becomes
.. math:: x'' = ax + by + c_1, y'' = k (ax + by) + c_2
2.1. If `\sigma = a + bk \neq 0`, the particular solution will be
.. math:: x = \frac{1}{2} b \sigma^{-1} (c_1 k - c_2) t^2 - \sigma^{-2} (a c_1 + b c_2)
.. math:: y = kx + \frac{1}{2} (c_2 - c_1 k) t^2
2.2. If `\sigma = a + bk = 0`, the particular solution will be
.. math:: x = \frac{1}{24} b (c_2 - c_1 k) t^4 + \frac{1}{2} c_1 t^2
.. math:: y = kx + \frac{1}{2} (c_2 - c_1 k) t^2
"""
x0, y0 = symbols('x0, y0')
if r['c1']*r['d2'] - r['c2']*r['d1'] != 0:
sol = solve((r['c1']*x0+r['d1']*y0+r['e1'], r['c2']*x0+r['d2']*y0+r['e2']), x0, y0)
psol = [sol[x0], sol[y0]]
elif r['c1']*r['d2'] - r['c2']*r['d1'] == 0 and (r['c1']**2 + r['d1']**2) > 0:
k = r['c2']/r['c1']
sig = r['c1'] + r['d1']*k
if sig != 0:
psol1 = r['d1']*sig**-1*(r['e1']*k-r['e2'])*t**2/2 - \
sig**-2*(r['c1']*r['e1']+r['d1']*r['e2'])
psol2 = k*psol1 + (r['e2'] - r['e1']*k)*t**2/2
psol = [psol1, psol2]
else:
psol1 = r['d1']*(r['e2']-r['e1']*k)*t**4/24 + r['e1']*t**2/2
psol2 = k*psol1 + (r['e2']-r['e1']*k)*t**2/2
psol = [psol1, psol2]
return psol
def _linear_2eq_order2_type3(x, y, t, r, eq):
r"""
These type of equation is used for describing the horizontal motion of a pendulum
taking into account the Earth rotation.
The solution is given with `a^2 + 4b > 0`:
.. math:: x = C_1 \cos(\alpha t) + C_2 \sin(\alpha t) + C_3 \cos(\beta t) + C_4 \sin(\beta t)
.. math:: y = -C_1 \sin(\alpha t) + C_2 \cos(\alpha t) - C_3 \sin(\beta t) + C_4 \cos(\beta t)
where `C_1,...,C_4` and
.. math:: \alpha = \frac{1}{2} a + \frac{1}{2} \sqrt{a^2 + 4b}, \beta = \frac{1}{2} a - \frac{1}{2} \sqrt{a^2 + 4b}
"""
C1, C2, C3, C4 = get_numbered_constants(eq, num=4)
if r['b1']**2 - 4*r['c1'] > 0:
r['a'] = r['b1'] ; r['b'] = -r['c1']
alpha = r['a']/2 + sqrt(r['a']**2 + 4*r['b'])/2
beta = r['a']/2 - sqrt(r['a']**2 + 4*r['b'])/2
sol1 = C1*cos(alpha*t) + C2*sin(alpha*t) + C3*cos(beta*t) + C4*sin(beta*t)
sol2 = -C1*sin(alpha*t) + C2*cos(alpha*t) - C3*sin(beta*t) + C4*cos(beta*t)
return [Eq(x(t), sol1), Eq(y(t), sol2)]
def _linear_2eq_order2_type4(x, y, t, r, eq):
r"""
These equations are found in the theory of oscillations
.. math:: x'' + a_1 x' + b_1 y' + c_1 x + d_1 y = k_1 e^{i \omega t}
.. math:: y'' + a_2 x' + b_2 y' + c_2 x + d_2 y = k_2 e^{i \omega t}
The general solution of this linear nonhomogeneous system of constant-coefficient
differential equations is given by the sum of its particular solution and the
general solution of the corresponding homogeneous system (with `k_1 = k_2 = 0`)
1. A particular solution is obtained by the method of undetermined coefficients:
.. math:: x = A_* e^{i \omega t}, y = B_* e^{i \omega t}
On substituting these expressions into the original system of differential equations,
one arrive at a linear nonhomogeneous system of algebraic equations for the
coefficients `A` and `B`.
2. The general solution of the homogeneous system of differential equations is determined
by a linear combination of linearly independent particular solutions determined by
the method of undetermined coefficients in the form of exponentials:
.. math:: x = A e^{\lambda t}, y = B e^{\lambda t}
On substituting these expressions into the original system and collecting the
coefficients of the unknown `A` and `B`, one obtains
.. math:: (\lambda^{2} + a_1 \lambda + c_1) A + (b_1 \lambda + d_1) B = 0
.. math:: (a_2 \lambda + c_2) A + (\lambda^{2} + b_2 \lambda + d_2) B = 0
The determinant of this system must vanish for nontrivial solutions A, B to exist.
This requirement results in the following characteristic equation for `\lambda`
.. math:: (\lambda^2 + a_1 \lambda + c_1) (\lambda^2 + b_2 \lambda + d_2) - (b_1 \lambda + d_1) (a_2 \lambda + c_2) = 0
If all roots `k_1,...,k_4` of this equation are distinct, the general solution of the original
system of the differential equations has the form
.. math:: x = C_1 (b_1 \lambda_1 + d_1) e^{\lambda_1 t} - C_2 (b_1 \lambda_2 + d_1) e^{\lambda_2 t} - C_3 (b_1 \lambda_3 + d_1) e^{\lambda_3 t} - C_4 (b_1 \lambda_4 + d_1) e^{\lambda_4 t}
.. math:: y = C_1 (\lambda_1^{2} + a_1 \lambda_1 + c_1) e^{\lambda_1 t} + C_2 (\lambda_2^{2} + a_1 \lambda_2 + c_1) e^{\lambda_2 t} + C_3 (\lambda_3^{2} + a_1 \lambda_3 + c_1) e^{\lambda_3 t} + C_4 (\lambda_4^{2} + a_1 \lambda_4 + c_1) e^{\lambda_4 t}
"""
C1, C2, C3, C4 = get_numbered_constants(eq, num=4)
k = Symbol('k')
Ra, Ca, Rb, Cb = symbols('Ra, Ca, Rb, Cb')
a1 = r['a1'] ; a2 = r['a2']
b1 = r['b1'] ; b2 = r['b2']
c1 = r['c1'] ; c2 = r['c2']
d1 = r['d1'] ; d2 = r['d2']
k1 = r['e1'].expand().as_independent(t)[0]
k2 = r['e2'].expand().as_independent(t)[0]
ew1 = r['e1'].expand().as_independent(t)[1]
ew2 = powdenest(ew1).as_base_exp()[1]
ew3 = collect(ew2, t).coeff(t)
w = cancel(ew3/I)
# The particular solution is assumed to be (Ra+I*Ca)*exp(I*w*t) and
# (Rb+I*Cb)*exp(I*w*t) for x(t) and y(t) respectively
# peq1, peq2, peq3, peq4 unused
# peq1 = (-w**2+c1)*Ra - a1*w*Ca + d1*Rb - b1*w*Cb - k1
# peq2 = a1*w*Ra + (-w**2+c1)*Ca + b1*w*Rb + d1*Cb
# peq3 = c2*Ra - a2*w*Ca + (-w**2+d2)*Rb - b2*w*Cb - k2
# peq4 = a2*w*Ra + c2*Ca + b2*w*Rb + (-w**2+d2)*Cb
# FIXME: solve for what in what? Ra, Rb, etc I guess
# but then psol not used for anything?
# psol = solve([peq1, peq2, peq3, peq4])
chareq = (k**2+a1*k+c1)*(k**2+b2*k+d2) - (b1*k+d1)*(a2*k+c2)
[k1, k2, k3, k4] = roots_quartic(Poly(chareq))
sol1 = -C1*(b1*k1+d1)*exp(k1*t) - C2*(b1*k2+d1)*exp(k2*t) - \
C3*(b1*k3+d1)*exp(k3*t) - C4*(b1*k4+d1)*exp(k4*t) + (Ra+I*Ca)*exp(I*w*t)
a1_ = (a1-1)
sol2 = C1*(k1**2+a1_*k1+c1)*exp(k1*t) + C2*(k2**2+a1_*k2+c1)*exp(k2*t) + \
C3*(k3**2+a1_*k3+c1)*exp(k3*t) + C4*(k4**2+a1_*k4+c1)*exp(k4*t) + (Rb+I*Cb)*exp(I*w*t)
return [Eq(x(t), sol1), Eq(y(t), sol2)]
def _linear_2eq_order2_type5(x, y, t, r, eq):
r"""
The equation which come under this category are
.. math:: x'' = a (t y' - y)
.. math:: y'' = b (t x' - x)
The transformation
.. math:: u = t x' - x, b = t y' - y
leads to the first-order system
.. math:: u' = atv, v' = btu
The general solution of this system is given by
If `ab > 0`:
.. math:: u = C_1 a e^{\frac{1}{2} \sqrt{ab} t^2} + C_2 a e^{-\frac{1}{2} \sqrt{ab} t^2}
.. math:: v = C_1 \sqrt{ab} e^{\frac{1}{2} \sqrt{ab} t^2} - C_2 \sqrt{ab} e^{-\frac{1}{2} \sqrt{ab} t^2}
If `ab < 0`:
.. math:: u = C_1 a \cos(\frac{1}{2} \sqrt{\left|ab\right|} t^2) + C_2 a \sin(-\frac{1}{2} \sqrt{\left|ab\right|} t^2)
.. math:: v = C_1 \sqrt{\left|ab\right|} \sin(\frac{1}{2} \sqrt{\left|ab\right|} t^2) + C_2 \sqrt{\left|ab\right|} \cos(-\frac{1}{2} \sqrt{\left|ab\right|} t^2)
where `C_1` and `C_2` are arbitrary constants. On substituting the value of `u` and `v`
in above equations and integrating the resulting expressions, the general solution will become
.. math:: x = C_3 t + t \int \frac{u}{t^2} \,dt, y = C_4 t + t \int \frac{u}{t^2} \,dt
where `C_3` and `C_4` are arbitrary constants.
"""
C1, C2, C3, C4 = get_numbered_constants(eq, num=4)
r['a'] = -r['d1'] ; r['b'] = -r['c2']
mul = sqrt(abs(r['a']*r['b']))
if r['a']*r['b'] > 0:
u = C1*r['a']*exp(mul*t**2/2) + C2*r['a']*exp(-mul*t**2/2)
v = C1*mul*exp(mul*t**2/2) - C2*mul*exp(-mul*t**2/2)
else:
u = C1*r['a']*cos(mul*t**2/2) + C2*r['a']*sin(mul*t**2/2)
v = -C1*mul*sin(mul*t**2/2) + C2*mul*cos(mul*t**2/2)
sol1 = C3*t + t*Integral(u/t**2, t)
sol2 = C4*t + t*Integral(v/t**2, t)
return [Eq(x(t), sol1), Eq(y(t), sol2)]
def _linear_2eq_order2_type6(x, y, t, r, eq):
r"""
The equations are
.. math:: x'' = f(t) (a_1 x + b_1 y)
.. math:: y'' = f(t) (a_2 x + b_2 y)
If `k_1` and `k_2` are roots of the quadratic equation
.. math:: k^2 - (a_1 + b_2) k + a_1 b_2 - a_2 b_1 = 0
Then by multiplying appropriate constants and adding together original equations
we obtain two independent equations:
.. math:: z_1'' = k_1 f(t) z_1, z_1 = a_2 x + (k_1 - a_1) y
.. math:: z_2'' = k_2 f(t) z_2, z_2 = a_2 x + (k_2 - a_1) y
Solving the equations will give the values of `x` and `y` after obtaining the value
of `z_1` and `z_2` by solving the differential equation and substituting the result.
"""
k = Symbol('k')
z = Function('z')
num, den = cancel(
(r['c1']*x(t) + r['d1']*y(t))/
(r['c2']*x(t) + r['d2']*y(t))).as_numer_denom()
f = r['c1']/num.coeff(x(t))
a1 = num.coeff(x(t))
b1 = num.coeff(y(t))
a2 = den.coeff(x(t))
b2 = den.coeff(y(t))
chareq = k**2 - (a1 + b2)*k + a1*b2 - a2*b1
k1, k2 = [rootof(chareq, k) for k in range(Poly(chareq).degree())]
z1 = dsolve(diff(z(t),t,t) - k1*f*z(t)).rhs
z2 = dsolve(diff(z(t),t,t) - k2*f*z(t)).rhs
sol1 = (k1*z2 - k2*z1 + a1*(z1 - z2))/(a2*(k1-k2))
sol2 = (z1 - z2)/(k1 - k2)
return [Eq(x(t), sol1), Eq(y(t), sol2)]
def _linear_2eq_order2_type7(x, y, t, r, eq):
r"""
The equations are given as
.. math:: x'' = f(t) (a_1 x' + b_1 y')
.. math:: y'' = f(t) (a_2 x' + b_2 y')
If `k_1` and 'k_2` are roots of the quadratic equation
.. math:: k^2 - (a_1 + b_2) k + a_1 b_2 - a_2 b_1 = 0
Then the system can be reduced by adding together the two equations multiplied
by appropriate constants give following two independent equations:
.. math:: z_1'' = k_1 f(t) z_1', z_1 = a_2 x + (k_1 - a_1) y
.. math:: z_2'' = k_2 f(t) z_2', z_2 = a_2 x + (k_2 - a_1) y
Integrating these and returning to the original variables, one arrives at a linear
algebraic system for the unknowns `x` and `y`:
.. math:: a_2 x + (k_1 - a_1) y = C_1 \int e^{k_1 F(t)} \,dt + C_2
.. math:: a_2 x + (k_2 - a_1) y = C_3 \int e^{k_2 F(t)} \,dt + C_4
where `C_1,...,C_4` are arbitrary constants and `F(t) = \int f(t) \,dt`
"""
C1, C2, C3, C4 = get_numbered_constants(eq, num=4)
k = Symbol('k')
num, den = cancel(
(r['a1']*x(t) + r['b1']*y(t))/
(r['a2']*x(t) + r['b2']*y(t))).as_numer_denom()
f = r['a1']/num.coeff(x(t))
a1 = num.coeff(x(t))
b1 = num.coeff(y(t))
a2 = den.coeff(x(t))
b2 = den.coeff(y(t))
chareq = k**2 - (a1 + b2)*k + a1*b2 - a2*b1
[k1, k2] = [rootof(chareq, k) for k in range(Poly(chareq).degree())]
F = Integral(f, t)
z1 = C1*Integral(exp(k1*F), t) + C2
z2 = C3*Integral(exp(k2*F), t) + C4
sol1 = (k1*z2 - k2*z1 + a1*(z1 - z2))/(a2*(k1-k2))
sol2 = (z1 - z2)/(k1 - k2)
return [Eq(x(t), sol1), Eq(y(t), sol2)]
def _linear_2eq_order2_type8(x, y, t, r, eq):
r"""
The equation of this category are
.. math:: x'' = a f(t) (t y' - y)
.. math:: y'' = b f(t) (t x' - x)
The transformation
.. math:: u = t x' - x, v = t y' - y
leads to the system of first-order equations
.. math:: u' = a t f(t) v, v' = b t f(t) u
The general solution of this system has the form
If `ab > 0`:
.. math:: u = C_1 a e^{\sqrt{ab} \int t f(t) \,dt} + C_2 a e^{-\sqrt{ab} \int t f(t) \,dt}
.. math:: v = C_1 \sqrt{ab} e^{\sqrt{ab} \int t f(t) \,dt} - C_2 \sqrt{ab} e^{-\sqrt{ab} \int t f(t) \,dt}
If `ab < 0`:
.. math:: u = C_1 a \cos(\sqrt{\left|ab\right|} \int t f(t) \,dt) + C_2 a \sin(-\sqrt{\left|ab\right|} \int t f(t) \,dt)
.. math:: v = C_1 \sqrt{\left|ab\right|} \sin(\sqrt{\left|ab\right|} \int t f(t) \,dt) + C_2 \sqrt{\left|ab\right|} \cos(-\sqrt{\left|ab\right|} \int t f(t) \,dt)
where `C_1` and `C_2` are arbitrary constants. On substituting the value of `u` and `v`
in above equations and integrating the resulting expressions, the general solution will become
.. math:: x = C_3 t + t \int \frac{u}{t^2} \,dt, y = C_4 t + t \int \frac{u}{t^2} \,dt
where `C_3` and `C_4` are arbitrary constants.
"""
C1, C2, C3, C4 = get_numbered_constants(eq, num=4)
num, den = cancel(r['d1']/r['c2']).as_numer_denom()
f = -r['d1']/num
a = num
b = den
mul = sqrt(abs(a*b))
Igral = Integral(t*f, t)
if a*b > 0:
u = C1*a*exp(mul*Igral) + C2*a*exp(-mul*Igral)
v = C1*mul*exp(mul*Igral) - C2*mul*exp(-mul*Igral)
else:
u = C1*a*cos(mul*Igral) + C2*a*sin(mul*Igral)
v = -C1*mul*sin(mul*Igral) + C2*mul*cos(mul*Igral)
sol1 = C3*t + t*Integral(u/t**2, t)
sol2 = C4*t + t*Integral(v/t**2, t)
return [Eq(x(t), sol1), Eq(y(t), sol2)]
def _linear_2eq_order2_type9(x, y, t, r, eq):
r"""
.. math:: t^2 x'' + a_1 t x' + b_1 t y' + c_1 x + d_1 y = 0
.. math:: t^2 y'' + a_2 t x' + b_2 t y' + c_2 x + d_2 y = 0
These system of equations are euler type.
The substitution of `t = \sigma e^{\tau} (\sigma \neq 0)` leads to the system of constant
coefficient linear differential equations
.. math:: x'' + (a_1 - 1) x' + b_1 y' + c_1 x + d_1 y = 0
.. math:: y'' + a_2 x' + (b_2 - 1) y' + c_2 x + d_2 y = 0
The general solution of the homogeneous system of differential equations is determined
by a linear combination of linearly independent particular solutions determined by
the method of undetermined coefficients in the form of exponentials
.. math:: x = A e^{\lambda t}, y = B e^{\lambda t}
On substituting these expressions into the original system and collecting the
coefficients of the unknown `A` and `B`, one obtains
.. math:: (\lambda^{2} + (a_1 - 1) \lambda + c_1) A + (b_1 \lambda + d_1) B = 0
.. math:: (a_2 \lambda + c_2) A + (\lambda^{2} + (b_2 - 1) \lambda + d_2) B = 0
The determinant of this system must vanish for nontrivial solutions A, B to exist.
This requirement results in the following characteristic equation for `\lambda`
.. math:: (\lambda^2 + (a_1 - 1) \lambda + c_1) (\lambda^2 + (b_2 - 1) \lambda + d_2) - (b_1 \lambda + d_1) (a_2 \lambda + c_2) = 0
If all roots `k_1,...,k_4` of this equation are distinct, the general solution of the original
system of the differential equations has the form
.. math:: x = C_1 (b_1 \lambda_1 + d_1) e^{\lambda_1 t} - C_2 (b_1 \lambda_2 + d_1) e^{\lambda_2 t} - C_3 (b_1 \lambda_3 + d_1) e^{\lambda_3 t} - C_4 (b_1 \lambda_4 + d_1) e^{\lambda_4 t}
.. math:: y = C_1 (\lambda_1^{2} + (a_1 - 1) \lambda_1 + c_1) e^{\lambda_1 t} + C_2 (\lambda_2^{2} + (a_1 - 1) \lambda_2 + c_1) e^{\lambda_2 t} + C_3 (\lambda_3^{2} + (a_1 - 1) \lambda_3 + c_1) e^{\lambda_3 t} + C_4 (\lambda_4^{2} + (a_1 - 1) \lambda_4 + c_1) e^{\lambda_4 t}
"""
C1, C2, C3, C4 = get_numbered_constants(eq, num=4)
k = Symbol('k')
a1 = -r['a1']*t; a2 = -r['a2']*t
b1 = -r['b1']*t; b2 = -r['b2']*t
c1 = -r['c1']*t**2; c2 = -r['c2']*t**2
d1 = -r['d1']*t**2; d2 = -r['d2']*t**2
eq = (k**2+(a1-1)*k+c1)*(k**2+(b2-1)*k+d2)-(b1*k+d1)*(a2*k+c2)
[k1, k2, k3, k4] = roots_quartic(Poly(eq))
sol1 = -C1*(b1*k1+d1)*exp(k1*log(t)) - C2*(b1*k2+d1)*exp(k2*log(t)) - \
C3*(b1*k3+d1)*exp(k3*log(t)) - C4*(b1*k4+d1)*exp(k4*log(t))
a1_ = (a1-1)
sol2 = C1*(k1**2+a1_*k1+c1)*exp(k1*log(t)) + C2*(k2**2+a1_*k2+c1)*exp(k2*log(t)) \
+ C3*(k3**2+a1_*k3+c1)*exp(k3*log(t)) + C4*(k4**2+a1_*k4+c1)*exp(k4*log(t))
return [Eq(x(t), sol1), Eq(y(t), sol2)]
def _linear_2eq_order2_type10(x, y, t, r, eq):
r"""
The equation of this category are
.. math:: (\alpha t^2 + \beta t + \gamma)^{2} x'' = ax + by
.. math:: (\alpha t^2 + \beta t + \gamma)^{2} y'' = cx + dy
The transformation
.. math:: \tau = \int \frac{1}{\alpha t^2 + \beta t + \gamma} \,dt , u = \frac{x}{\sqrt{\left|\alpha t^2 + \beta t + \gamma\right|}} , v = \frac{y}{\sqrt{\left|\alpha t^2 + \beta t + \gamma\right|}}
leads to a constant coefficient linear system of equations
.. math:: u'' = (a - \alpha \gamma + \frac{1}{4} \beta^{2}) u + b v
.. math:: v'' = c u + (d - \alpha \gamma + \frac{1}{4} \beta^{2}) v
These system of equations obtained can be solved by type1 of System of two
constant-coefficient second-order linear homogeneous differential equations.
"""
# FIXME: This function is equivalent to type6 (and broken). Should be removed...
C1, C2, C3, C4 = get_numbered_constants(eq, num=4)
u, v = symbols('u, v', cls=Function)
assert False
p = Wild('p', exclude=[t, t**2])
q = Wild('q', exclude=[t, t**2])
s = Wild('s', exclude=[t, t**2])
n = Wild('n', exclude=[t, t**2])
num, den = r['c1'].as_numer_denom()
dic = den.match((n*(p*t**2+q*t+s)**2).expand())
eqz = dic[p]*t**2 + dic[q]*t + dic[s]
a = num/dic[n]
b = cancel(r['d1']*eqz**2)
c = cancel(r['c2']*eqz**2)
d = cancel(r['d2']*eqz**2)
[msol1, msol2] = dsolve([Eq(diff(u(t), t, t), (a - dic[p]*dic[s] + dic[q]**2/4)*u(t) \
+ b*v(t)), Eq(diff(v(t),t,t), c*u(t) + (d - dic[p]*dic[s] + dic[q]**2/4)*v(t))])
sol1 = (msol1.rhs*sqrt(abs(eqz))).subs(t, Integral(1/eqz, t))
sol2 = (msol2.rhs*sqrt(abs(eqz))).subs(t, Integral(1/eqz, t))
return [Eq(x(t), sol1), Eq(y(t), sol2)]
def _linear_2eq_order2_type11(x, y, t, r, eq):
r"""
The equations which comes under this type are
.. math:: x'' = f(t) (t x' - x) + g(t) (t y' - y)
.. math:: y'' = h(t) (t x' - x) + p(t) (t y' - y)
The transformation
.. math:: u = t x' - x, v = t y' - y
leads to the linear system of first-order equations
.. math:: u' = t f(t) u + t g(t) v, v' = t h(t) u + t p(t) v
On substituting the value of `u` and `v` in transformed equation gives value of `x` and `y` as
.. math:: x = C_3 t + t \int \frac{u}{t^2} \,dt , y = C_4 t + t \int \frac{v}{t^2} \,dt.
where `C_3` and `C_4` are arbitrary constants.
"""
C1, C2, C3, C4 = get_numbered_constants(eq, num=4)
u, v = symbols('u, v', cls=Function)
f = -r['c1'] ; g = -r['d1']
h = -r['c2'] ; p = -r['d2']
[msol1, msol2] = dsolve([Eq(diff(u(t),t), t*f*u(t) + t*g*v(t)), Eq(diff(v(t),t), t*h*u(t) + t*p*v(t))])
sol1 = C3*t + t*Integral(msol1.rhs/t**2, t)
sol2 = C4*t + t*Integral(msol2.rhs/t**2, t)
return [Eq(x(t), sol1), Eq(y(t), sol2)]
def sysode_linear_neq_order1(match):
from sympy.solvers.ode.systems import (_linear_neq_order1_type1,
_linear_neq_order1_type3, _linear_neq_order1_type2)
if match['type_of_equation'] == 'type1':
sol = _linear_neq_order1_type1(match)
elif match['type_of_equation'] == 'type2':
sol = _linear_neq_order1_type2(match)
elif match['type_of_equation'] == 'type3':
sol = _linear_neq_order1_type3(match)
return sol
def sysode_nonlinear_2eq_order1(match_):
func = match_['func']
eq = match_['eq']
fc = match_['func_coeff']
t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0]
if match_['type_of_equation'] == 'type5':
sol = _nonlinear_2eq_order1_type5(func, t, eq)
return sol
x = func[0].func
y = func[1].func
for i in range(2):
eqs = 0
for terms in Add.make_args(eq[i]):
eqs += terms/fc[i,func[i],1]
eq[i] = eqs
if match_['type_of_equation'] == 'type1':
sol = _nonlinear_2eq_order1_type1(x, y, t, eq)
elif match_['type_of_equation'] == 'type2':
sol = _nonlinear_2eq_order1_type2(x, y, t, eq)
elif match_['type_of_equation'] == 'type3':
sol = _nonlinear_2eq_order1_type3(x, y, t, eq)
elif match_['type_of_equation'] == 'type4':
sol = _nonlinear_2eq_order1_type4(x, y, t, eq)
return sol
def _nonlinear_2eq_order1_type1(x, y, t, eq):
r"""
Equations:
.. math:: x' = x^n F(x,y)
.. math:: y' = g(y) F(x,y)
Solution:
.. math:: x = \varphi(y), \int \frac{1}{g(y) F(\varphi(y),y)} \,dy = t + C_2
where
if `n \neq 1`
.. math:: \varphi = [C_1 + (1-n) \int \frac{1}{g(y)} \,dy]^{\frac{1}{1-n}}
if `n = 1`
.. math:: \varphi = C_1 e^{\int \frac{1}{g(y)} \,dy}
where `C_1` and `C_2` are arbitrary constants.
"""
C1, C2 = get_numbered_constants(eq, num=2)
n = Wild('n', exclude=[x(t),y(t)])
f = Wild('f')
u, v = symbols('u, v')
r = eq[0].match(diff(x(t),t) - x(t)**n*f)
g = ((diff(y(t),t) - eq[1])/r[f]).subs(y(t),v)
F = r[f].subs(x(t),u).subs(y(t),v)
n = r[n]
if n!=1:
phi = (C1 + (1-n)*Integral(1/g, v))**(1/(1-n))
else:
phi = C1*exp(Integral(1/g, v))
phi = phi.doit()
sol2 = solve(Integral(1/(g*F.subs(u,phi)), v).doit() - t - C2, v)
sol = []
for sols in sol2:
sol.append(Eq(x(t),phi.subs(v, sols)))
sol.append(Eq(y(t), sols))
return sol
def _nonlinear_2eq_order1_type2(x, y, t, eq):
r"""
Equations:
.. math:: x' = e^{\lambda x} F(x,y)
.. math:: y' = g(y) F(x,y)
Solution:
.. math:: x = \varphi(y), \int \frac{1}{g(y) F(\varphi(y),y)} \,dy = t + C_2
where
if `\lambda \neq 0`
.. math:: \varphi = -\frac{1}{\lambda} log(C_1 - \lambda \int \frac{1}{g(y)} \,dy)
if `\lambda = 0`
.. math:: \varphi = C_1 + \int \frac{1}{g(y)} \,dy
where `C_1` and `C_2` are arbitrary constants.
"""
C1, C2 = get_numbered_constants(eq, num=2)
n = Wild('n', exclude=[x(t),y(t)])
f = Wild('f')
u, v = symbols('u, v')
r = eq[0].match(diff(x(t),t) - exp(n*x(t))*f)
g = ((diff(y(t),t) - eq[1])/r[f]).subs(y(t),v)
F = r[f].subs(x(t),u).subs(y(t),v)
n = r[n]
if n:
phi = -1/n*log(C1 - n*Integral(1/g, v))
else:
phi = C1 + Integral(1/g, v)
phi = phi.doit()
sol2 = solve(Integral(1/(g*F.subs(u,phi)), v).doit() - t - C2, v)
sol = []
for sols in sol2:
sol.append(Eq(x(t),phi.subs(v, sols)))
sol.append(Eq(y(t), sols))
return sol
def _nonlinear_2eq_order1_type3(x, y, t, eq):
r"""
Autonomous system of general form
.. math:: x' = F(x,y)
.. math:: y' = G(x,y)
Assuming `y = y(x, C_1)` where `C_1` is an arbitrary constant is the general
solution of the first-order equation
.. math:: F(x,y) y'_x = G(x,y)
Then the general solution of the original system of equations has the form
.. math:: \int \frac{1}{F(x,y(x,C_1))} \,dx = t + C_1
"""
C1, C2, C3, C4 = get_numbered_constants(eq, num=4)
v = Function('v')
u = Symbol('u')
f = Wild('f')
g = Wild('g')
r1 = eq[0].match(diff(x(t),t) - f)
r2 = eq[1].match(diff(y(t),t) - g)
F = r1[f].subs(x(t), u).subs(y(t), v(u))
G = r2[g].subs(x(t), u).subs(y(t), v(u))
sol2r = dsolve(Eq(diff(v(u), u), G/F))
if isinstance(sol2r, Expr):
sol2r = [sol2r]
for sol2s in sol2r:
sol1 = solve(Integral(1/F.subs(v(u), sol2s.rhs), u).doit() - t - C2, u)
sol = []
for sols in sol1:
sol.append(Eq(x(t), sols))
sol.append(Eq(y(t), (sol2s.rhs).subs(u, sols)))
return sol
def _nonlinear_2eq_order1_type4(x, y, t, eq):
r"""
Equation:
.. math:: x' = f_1(x) g_1(y) \phi(x,y,t)
.. math:: y' = f_2(x) g_2(y) \phi(x,y,t)
First integral:
.. math:: \int \frac{f_2(x)}{f_1(x)} \,dx - \int \frac{g_1(y)}{g_2(y)} \,dy = C
where `C` is an arbitrary constant.
On solving the first integral for `x` (resp., `y` ) and on substituting the
resulting expression into either equation of the original solution, one
arrives at a first-order equation for determining `y` (resp., `x` ).
"""
C1, C2 = get_numbered_constants(eq, num=2)
u, v = symbols('u, v')
U, V = symbols('U, V', cls=Function)
f = Wild('f')
g = Wild('g')
f1 = Wild('f1', exclude=[v,t])
f2 = Wild('f2', exclude=[v,t])
g1 = Wild('g1', exclude=[u,t])
g2 = Wild('g2', exclude=[u,t])
r1 = eq[0].match(diff(x(t),t) - f)
r2 = eq[1].match(diff(y(t),t) - g)
num, den = (
(r1[f].subs(x(t),u).subs(y(t),v))/
(r2[g].subs(x(t),u).subs(y(t),v))).as_numer_denom()
R1 = num.match(f1*g1)
R2 = den.match(f2*g2)
phi = (r1[f].subs(x(t),u).subs(y(t),v))/num
F1 = R1[f1]; F2 = R2[f2]
G1 = R1[g1]; G2 = R2[g2]
sol1r = solve(Integral(F2/F1, u).doit() - Integral(G1/G2,v).doit() - C1, u)
sol2r = solve(Integral(F2/F1, u).doit() - Integral(G1/G2,v).doit() - C1, v)
sol = []
for sols in sol1r:
sol.append(Eq(y(t), dsolve(diff(V(t),t) - F2.subs(u,sols).subs(v,V(t))*G2.subs(v,V(t))*phi.subs(u,sols).subs(v,V(t))).rhs))
for sols in sol2r:
sol.append(Eq(x(t), dsolve(diff(U(t),t) - F1.subs(u,U(t))*G1.subs(v,sols).subs(u,U(t))*phi.subs(v,sols).subs(u,U(t))).rhs))
return set(sol)
def _nonlinear_2eq_order1_type5(func, t, eq):
r"""
Clairaut system of ODEs
.. math:: x = t x' + F(x',y')
.. math:: y = t y' + G(x',y')
The following are solutions of the system
`(i)` straight lines:
.. math:: x = C_1 t + F(C_1, C_2), y = C_2 t + G(C_1, C_2)
where `C_1` and `C_2` are arbitrary constants;
`(ii)` envelopes of the above lines;
`(iii)` continuously differentiable lines made up from segments of the lines
`(i)` and `(ii)`.
"""
C1, C2 = get_numbered_constants(eq, num=2)
f = Wild('f')
g = Wild('g')
def check_type(x, y):
r1 = eq[0].match(t*diff(x(t),t) - x(t) + f)
r2 = eq[1].match(t*diff(y(t),t) - y(t) + g)
if not (r1 and r2):
r1 = eq[0].match(diff(x(t),t) - x(t)/t + f/t)
r2 = eq[1].match(diff(y(t),t) - y(t)/t + g/t)
if not (r1 and r2):
r1 = (-eq[0]).match(t*diff(x(t),t) - x(t) + f)
r2 = (-eq[1]).match(t*diff(y(t),t) - y(t) + g)
if not (r1 and r2):
r1 = (-eq[0]).match(diff(x(t),t) - x(t)/t + f/t)
r2 = (-eq[1]).match(diff(y(t),t) - y(t)/t + g/t)
return [r1, r2]
for func_ in func:
if isinstance(func_, list):
x = func[0][0].func
y = func[0][1].func
[r1, r2] = check_type(x, y)
if not (r1 and r2):
[r1, r2] = check_type(y, x)
x, y = y, x
x1 = diff(x(t),t); y1 = diff(y(t),t)
return {Eq(x(t), C1*t + r1[f].subs(x1,C1).subs(y1,C2)), Eq(y(t), C2*t + r2[g].subs(x1,C1).subs(y1,C2))}
def sysode_nonlinear_3eq_order1(match_):
x = match_['func'][0].func
y = match_['func'][1].func
z = match_['func'][2].func
eq = match_['eq']
t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0]
if match_['type_of_equation'] == 'type1':
sol = _nonlinear_3eq_order1_type1(x, y, z, t, eq)
if match_['type_of_equation'] == 'type2':
sol = _nonlinear_3eq_order1_type2(x, y, z, t, eq)
if match_['type_of_equation'] == 'type3':
sol = _nonlinear_3eq_order1_type3(x, y, z, t, eq)
if match_['type_of_equation'] == 'type4':
sol = _nonlinear_3eq_order1_type4(x, y, z, t, eq)
if match_['type_of_equation'] == 'type5':
sol = _nonlinear_3eq_order1_type5(x, y, z, t, eq)
return sol
def _nonlinear_3eq_order1_type1(x, y, z, t, eq):
r"""
Equations:
.. math:: a x' = (b - c) y z, \enspace b y' = (c - a) z x, \enspace c z' = (a - b) x y
First Integrals:
.. math:: a x^{2} + b y^{2} + c z^{2} = C_1
.. math:: a^{2} x^{2} + b^{2} y^{2} + c^{2} z^{2} = C_2
where `C_1` and `C_2` are arbitrary constants. On solving the integrals for `y` and
`z` and on substituting the resulting expressions into the first equation of the
system, we arrives at a separable first-order equation on `x`. Similarly doing that
for other two equations, we will arrive at first order equation on `y` and `z` too.
References
==========
-http://eqworld.ipmnet.ru/en/solutions/sysode/sode0401.pdf
"""
C1, C2 = get_numbered_constants(eq, num=2)
u, v, w = symbols('u, v, w')
p = Wild('p', exclude=[x(t), y(t), z(t), t])
q = Wild('q', exclude=[x(t), y(t), z(t), t])
s = Wild('s', exclude=[x(t), y(t), z(t), t])
r = (diff(x(t),t) - eq[0]).match(p*y(t)*z(t))
r.update((diff(y(t),t) - eq[1]).match(q*z(t)*x(t)))
r.update((diff(z(t),t) - eq[2]).match(s*x(t)*y(t)))
n1, d1 = r[p].as_numer_denom()
n2, d2 = r[q].as_numer_denom()
n3, d3 = r[s].as_numer_denom()
val = solve([n1*u-d1*v+d1*w, d2*u+n2*v-d2*w, d3*u-d3*v-n3*w],[u,v])
vals = [val[v], val[u]]
c = lcm(vals[0].as_numer_denom()[1], vals[1].as_numer_denom()[1])
b = vals[0].subs(w, c)
a = vals[1].subs(w, c)
y_x = sqrt(((c*C1-C2) - a*(c-a)*x(t)**2)/(b*(c-b)))
z_x = sqrt(((b*C1-C2) - a*(b-a)*x(t)**2)/(c*(b-c)))
z_y = sqrt(((a*C1-C2) - b*(a-b)*y(t)**2)/(c*(a-c)))
x_y = sqrt(((c*C1-C2) - b*(c-b)*y(t)**2)/(a*(c-a)))
x_z = sqrt(((b*C1-C2) - c*(b-c)*z(t)**2)/(a*(b-a)))
y_z = sqrt(((a*C1-C2) - c*(a-c)*z(t)**2)/(b*(a-b)))
sol1 = dsolve(a*diff(x(t),t) - (b-c)*y_x*z_x)
sol2 = dsolve(b*diff(y(t),t) - (c-a)*z_y*x_y)
sol3 = dsolve(c*diff(z(t),t) - (a-b)*x_z*y_z)
return [sol1, sol2, sol3]
def _nonlinear_3eq_order1_type2(x, y, z, t, eq):
r"""
Equations:
.. math:: a x' = (b - c) y z f(x, y, z, t)
.. math:: b y' = (c - a) z x f(x, y, z, t)
.. math:: c z' = (a - b) x y f(x, y, z, t)
First Integrals:
.. math:: a x^{2} + b y^{2} + c z^{2} = C_1
.. math:: a^{2} x^{2} + b^{2} y^{2} + c^{2} z^{2} = C_2
where `C_1` and `C_2` are arbitrary constants. On solving the integrals for `y` and
`z` and on substituting the resulting expressions into the first equation of the
system, we arrives at a first-order differential equations on `x`. Similarly doing
that for other two equations we will arrive at first order equation on `y` and `z`.
References
==========
-http://eqworld.ipmnet.ru/en/solutions/sysode/sode0402.pdf
"""
C1, C2 = get_numbered_constants(eq, num=2)
u, v, w = symbols('u, v, w')
p = Wild('p', exclude=[x(t), y(t), z(t), t])
q = Wild('q', exclude=[x(t), y(t), z(t), t])
s = Wild('s', exclude=[x(t), y(t), z(t), t])
f = Wild('f')
r1 = (diff(x(t),t) - eq[0]).match(y(t)*z(t)*f)
r = collect_const(r1[f]).match(p*f)
r.update(((diff(y(t),t) - eq[1])/r[f]).match(q*z(t)*x(t)))
r.update(((diff(z(t),t) - eq[2])/r[f]).match(s*x(t)*y(t)))
n1, d1 = r[p].as_numer_denom()
n2, d2 = r[q].as_numer_denom()
n3, d3 = r[s].as_numer_denom()
val = solve([n1*u-d1*v+d1*w, d2*u+n2*v-d2*w, -d3*u+d3*v+n3*w],[u,v])
vals = [val[v], val[u]]
c = lcm(vals[0].as_numer_denom()[1], vals[1].as_numer_denom()[1])
a = vals[0].subs(w, c)
b = vals[1].subs(w, c)
y_x = sqrt(((c*C1-C2) - a*(c-a)*x(t)**2)/(b*(c-b)))
z_x = sqrt(((b*C1-C2) - a*(b-a)*x(t)**2)/(c*(b-c)))
z_y = sqrt(((a*C1-C2) - b*(a-b)*y(t)**2)/(c*(a-c)))
x_y = sqrt(((c*C1-C2) - b*(c-b)*y(t)**2)/(a*(c-a)))
x_z = sqrt(((b*C1-C2) - c*(b-c)*z(t)**2)/(a*(b-a)))
y_z = sqrt(((a*C1-C2) - c*(a-c)*z(t)**2)/(b*(a-b)))
sol1 = dsolve(a*diff(x(t),t) - (b-c)*y_x*z_x*r[f])
sol2 = dsolve(b*diff(y(t),t) - (c-a)*z_y*x_y*r[f])
sol3 = dsolve(c*diff(z(t),t) - (a-b)*x_z*y_z*r[f])
return [sol1, sol2, sol3]
def _nonlinear_3eq_order1_type3(x, y, z, t, eq):
r"""
Equations:
.. math:: x' = c F_2 - b F_3, \enspace y' = a F_3 - c F_1, \enspace z' = b F_1 - a F_2
where `F_n = F_n(x, y, z, t)`.
1. First Integral:
.. math:: a x + b y + c z = C_1,
where C is an arbitrary constant.
2. If we assume function `F_n` to be independent of `t`,i.e, `F_n` = `F_n (x, y, z)`
Then, on eliminating `t` and `z` from the first two equation of the system, one
arrives at the first-order equation
.. math:: \frac{dy}{dx} = \frac{a F_3 (x, y, z) - c F_1 (x, y, z)}{c F_2 (x, y, z) -
b F_3 (x, y, z)}
where `z = \frac{1}{c} (C_1 - a x - b y)`
References
==========
-http://eqworld.ipmnet.ru/en/solutions/sysode/sode0404.pdf
"""
C1 = get_numbered_constants(eq, num=1)
u, v, w = symbols('u, v, w')
fu, fv, fw = symbols('u, v, w', cls=Function)
p = Wild('p', exclude=[x(t), y(t), z(t), t])
q = Wild('q', exclude=[x(t), y(t), z(t), t])
s = Wild('s', exclude=[x(t), y(t), z(t), t])
F1, F2, F3 = symbols('F1, F2, F3', cls=Wild)
r1 = (diff(x(t), t) - eq[0]).match(F2-F3)
r = collect_const(r1[F2]).match(s*F2)
r.update(collect_const(r1[F3]).match(q*F3))
if eq[1].has(r[F2]) and not eq[1].has(r[F3]):
r[F2], r[F3] = r[F3], r[F2]
r[s], r[q] = -r[q], -r[s]
r.update((diff(y(t), t) - eq[1]).match(p*r[F3] - r[s]*F1))
a = r[p]; b = r[q]; c = r[s]
F1 = r[F1].subs(x(t), u).subs(y(t),v).subs(z(t), w)
F2 = r[F2].subs(x(t), u).subs(y(t),v).subs(z(t), w)
F3 = r[F3].subs(x(t), u).subs(y(t),v).subs(z(t), w)
z_xy = (C1-a*u-b*v)/c
y_zx = (C1-a*u-c*w)/b
x_yz = (C1-b*v-c*w)/a
y_x = dsolve(diff(fv(u),u) - ((a*F3-c*F1)/(c*F2-b*F3)).subs(w,z_xy).subs(v,fv(u))).rhs
z_x = dsolve(diff(fw(u),u) - ((b*F1-a*F2)/(c*F2-b*F3)).subs(v,y_zx).subs(w,fw(u))).rhs
z_y = dsolve(diff(fw(v),v) - ((b*F1-a*F2)/(a*F3-c*F1)).subs(u,x_yz).subs(w,fw(v))).rhs
x_y = dsolve(diff(fu(v),v) - ((c*F2-b*F3)/(a*F3-c*F1)).subs(w,z_xy).subs(u,fu(v))).rhs
y_z = dsolve(diff(fv(w),w) - ((a*F3-c*F1)/(b*F1-a*F2)).subs(u,x_yz).subs(v,fv(w))).rhs
x_z = dsolve(diff(fu(w),w) - ((c*F2-b*F3)/(b*F1-a*F2)).subs(v,y_zx).subs(u,fu(w))).rhs
sol1 = dsolve(diff(fu(t),t) - (c*F2 - b*F3).subs(v,y_x).subs(w,z_x).subs(u,fu(t))).rhs
sol2 = dsolve(diff(fv(t),t) - (a*F3 - c*F1).subs(u,x_y).subs(w,z_y).subs(v,fv(t))).rhs
sol3 = dsolve(diff(fw(t),t) - (b*F1 - a*F2).subs(u,x_z).subs(v,y_z).subs(w,fw(t))).rhs
return [sol1, sol2, sol3]
def _nonlinear_3eq_order1_type4(x, y, z, t, eq):
r"""
Equations:
.. math:: x' = c z F_2 - b y F_3, \enspace y' = a x F_3 - c z F_1, \enspace z' = b y F_1 - a x F_2
where `F_n = F_n (x, y, z, t)`
1. First integral:
.. math:: a x^{2} + b y^{2} + c z^{2} = C_1
where `C` is an arbitrary constant.
2. Assuming the function `F_n` is independent of `t`: `F_n = F_n (x, y, z)`. Then on
eliminating `t` and `z` from the first two equations of the system, one arrives at
the first-order equation
.. math:: \frac{dy}{dx} = \frac{a x F_3 (x, y, z) - c z F_1 (x, y, z)}
{c z F_2 (x, y, z) - b y F_3 (x, y, z)}
where `z = \pm \sqrt{\frac{1}{c} (C_1 - a x^{2} - b y^{2})}`
References
==========
-http://eqworld.ipmnet.ru/en/solutions/sysode/sode0405.pdf
"""
C1 = get_numbered_constants(eq, num=1)
u, v, w = symbols('u, v, w')
p = Wild('p', exclude=[x(t), y(t), z(t), t])
q = Wild('q', exclude=[x(t), y(t), z(t), t])
s = Wild('s', exclude=[x(t), y(t), z(t), t])
F1, F2, F3 = symbols('F1, F2, F3', cls=Wild)
r1 = eq[0].match(diff(x(t),t) - z(t)*F2 + y(t)*F3)
r = collect_const(r1[F2]).match(s*F2)
r.update(collect_const(r1[F3]).match(q*F3))
if eq[1].has(r[F2]) and not eq[1].has(r[F3]):
r[F2], r[F3] = r[F3], r[F2]
r[s], r[q] = -r[q], -r[s]
r.update((diff(y(t),t) - eq[1]).match(p*x(t)*r[F3] - r[s]*z(t)*F1))
a = r[p]; b = r[q]; c = r[s]
F1 = r[F1].subs(x(t),u).subs(y(t),v).subs(z(t),w)
F2 = r[F2].subs(x(t),u).subs(y(t),v).subs(z(t),w)
F3 = r[F3].subs(x(t),u).subs(y(t),v).subs(z(t),w)
x_yz = sqrt((C1 - b*v**2 - c*w**2)/a)
y_zx = sqrt((C1 - c*w**2 - a*u**2)/b)
z_xy = sqrt((C1 - a*u**2 - b*v**2)/c)
y_x = dsolve(diff(v(u),u) - ((a*u*F3-c*w*F1)/(c*w*F2-b*v*F3)).subs(w,z_xy).subs(v,v(u))).rhs
z_x = dsolve(diff(w(u),u) - ((b*v*F1-a*u*F2)/(c*w*F2-b*v*F3)).subs(v,y_zx).subs(w,w(u))).rhs
z_y = dsolve(diff(w(v),v) - ((b*v*F1-a*u*F2)/(a*u*F3-c*w*F1)).subs(u,x_yz).subs(w,w(v))).rhs
x_y = dsolve(diff(u(v),v) - ((c*w*F2-b*v*F3)/(a*u*F3-c*w*F1)).subs(w,z_xy).subs(u,u(v))).rhs
y_z = dsolve(diff(v(w),w) - ((a*u*F3-c*w*F1)/(b*v*F1-a*u*F2)).subs(u,x_yz).subs(v,v(w))).rhs
x_z = dsolve(diff(u(w),w) - ((c*w*F2-b*v*F3)/(b*v*F1-a*u*F2)).subs(v,y_zx).subs(u,u(w))).rhs
sol1 = dsolve(diff(u(t),t) - (c*w*F2 - b*v*F3).subs(v,y_x).subs(w,z_x).subs(u,u(t))).rhs
sol2 = dsolve(diff(v(t),t) - (a*u*F3 - c*w*F1).subs(u,x_y).subs(w,z_y).subs(v,v(t))).rhs
sol3 = dsolve(diff(w(t),t) - (b*v*F1 - a*u*F2).subs(u,x_z).subs(v,y_z).subs(w,w(t))).rhs
return [sol1, sol2, sol3]
def _nonlinear_3eq_order1_type5(x, y, z, t, eq):
r"""
.. math:: x' = x (c F_2 - b F_3), \enspace y' = y (a F_3 - c F_1), \enspace z' = z (b F_1 - a F_2)
where `F_n = F_n (x, y, z, t)` and are arbitrary functions.
First Integral:
.. math:: \left|x\right|^{a} \left|y\right|^{b} \left|z\right|^{c} = C_1
where `C` is an arbitrary constant. If the function `F_n` is independent of `t`,
then, by eliminating `t` and `z` from the first two equations of the system, one
arrives at a first-order equation.
References
==========
-http://eqworld.ipmnet.ru/en/solutions/sysode/sode0406.pdf
"""
C1 = get_numbered_constants(eq, num=1)
u, v, w = symbols('u, v, w')
fu, fv, fw = symbols('u, v, w', cls=Function)
p = Wild('p', exclude=[x(t), y(t), z(t), t])
q = Wild('q', exclude=[x(t), y(t), z(t), t])
s = Wild('s', exclude=[x(t), y(t), z(t), t])
F1, F2, F3 = symbols('F1, F2, F3', cls=Wild)
r1 = eq[0].match(diff(x(t), t) - x(t)*F2 + x(t)*F3)
r = collect_const(r1[F2]).match(s*F2)
r.update(collect_const(r1[F3]).match(q*F3))
if eq[1].has(r[F2]) and not eq[1].has(r[F3]):
r[F2], r[F3] = r[F3], r[F2]
r[s], r[q] = -r[q], -r[s]
r.update((diff(y(t), t) - eq[1]).match(y(t)*(p*r[F3] - r[s]*F1)))
a = r[p]; b = r[q]; c = r[s]
F1 = r[F1].subs(x(t), u).subs(y(t), v).subs(z(t), w)
F2 = r[F2].subs(x(t), u).subs(y(t), v).subs(z(t), w)
F3 = r[F3].subs(x(t), u).subs(y(t), v).subs(z(t), w)
x_yz = (C1*v**-b*w**-c)**-a
y_zx = (C1*w**-c*u**-a)**-b
z_xy = (C1*u**-a*v**-b)**-c
y_x = dsolve(diff(fv(u), u) - ((v*(a*F3 - c*F1))/(u*(c*F2 - b*F3))).subs(w, z_xy).subs(v, fv(u))).rhs
z_x = dsolve(diff(fw(u), u) - ((w*(b*F1 - a*F2))/(u*(c*F2 - b*F3))).subs(v, y_zx).subs(w, fw(u))).rhs
z_y = dsolve(diff(fw(v), v) - ((w*(b*F1 - a*F2))/(v*(a*F3 - c*F1))).subs(u, x_yz).subs(w, fw(v))).rhs
x_y = dsolve(diff(fu(v), v) - ((u*(c*F2 - b*F3))/(v*(a*F3 - c*F1))).subs(w, z_xy).subs(u, fu(v))).rhs
y_z = dsolve(diff(fv(w), w) - ((v*(a*F3 - c*F1))/(w*(b*F1 - a*F2))).subs(u, x_yz).subs(v, fv(w))).rhs
x_z = dsolve(diff(fu(w), w) - ((u*(c*F2 - b*F3))/(w*(b*F1 - a*F2))).subs(v, y_zx).subs(u, fu(w))).rhs
sol1 = dsolve(diff(fu(t), t) - (u*(c*F2 - b*F3)).subs(v, y_x).subs(w, z_x).subs(u, fu(t))).rhs
sol2 = dsolve(diff(fv(t), t) - (v*(a*F3 - c*F1)).subs(u, x_y).subs(w, z_y).subs(v, fv(t))).rhs
sol3 = dsolve(diff(fw(t), t) - (w*(b*F1 - a*F2)).subs(u, x_z).subs(v, y_z).subs(w, fw(t))).rhs
return [sol1, sol2, sol3]
#This import is written at the bottom to avoid circular imports.
from .single import (NthAlgebraic, Factorable, FirstLinear, AlmostLinear,
Bernoulli, SingleODEProblem, SingleODESolver, RiccatiSpecial)
|
33fe674f25f982b4965a50aef9760a9b40bbf29359f048eb207b98d01e7754c0
|
from sympy import (Derivative, Symbol, expand, factor_terms, powsimp, Poly,
Mul, ratsimp, Add, Piecewise, piecewise_fold)
from sympy.core.numbers import I
from sympy.core.relational import Eq
from sympy.core.symbol import Dummy
from sympy.core.function import expand_mul
from sympy.functions import exp, im, cos, sin, re
from sympy.functions.combinatorial.factorials import factorial
from sympy.matrices import zeros, Matrix
from sympy.simplify import simplify, collect
from sympy.solvers.deutils import ode_order
from sympy.solvers.solveset import NonlinearError
from sympy.utilities import numbered_symbols, default_sort_key
from sympy.utilities.iterables import ordered, uniq
from sympy.integrals.integrals import Integral, integrate
def _get_func_order(eqs, funcs):
return {func: max(ode_order(eq, func) for eq in eqs) for func in funcs}
class ODEOrderError(ValueError):
"""Raised by linear_ode_to_matrix if the system has the wrong order"""
pass
class ODENonlinearError(NonlinearError):
"""Raised by linear_ode_to_matrix if the system is nonlinear"""
pass
def _simpsol(soleq):
lhs = soleq.lhs
sol = soleq.rhs
sol = powsimp(sol)
gens = list(sol.atoms(exp))
p = Poly(sol, *gens, expand=False)
gens = [factor_terms(g) for g in gens]
if not gens:
gens = p.gens
syms = [Symbol('C1'), Symbol('C2')]
terms = []
for coeff, monom in zip(p.coeffs(), p.monoms()):
coeff = piecewise_fold(coeff)
if type(coeff) is Piecewise:
coeff = Piecewise(*((ratsimp(coef).collect(syms), cond) for coef, cond in coeff.args))
else:
coeff = ratsimp(coeff).collect(syms)
monom = Mul(*(g ** i for g, i in zip(gens, monom)))
terms.append(coeff * monom)
return Eq(lhs, Add(*terms))
def _solsimp(e, t):
no_t, has_t = powsimp(expand_mul(e)).as_independent(t)
no_t = ratsimp(no_t)
has_t = has_t.replace(exp, lambda a: exp(factor_terms(a)))
return no_t + has_t
def linear_ode_to_matrix(eqs, funcs, t, order):
r"""
Convert a linear system of ODEs to matrix form
Explanation
===========
Express a system of linear ordinary differential equations as a single
matrix differential equation [1]. For example the system $x' = x + y + 1$
and $y' = x - y$ can be represented as
.. math:: A_1 X' + A_0 X = b
where $A_1$ and $A_0$ are $2 \times 2$ matrices and $b$, $X$ and $X'$ are
$2 \times 1$ matrices with $X = [x, y]^T$.
Higher-order systems are represented with additional matrices e.g. a
second-order system would look like
.. math:: A_2 X'' + A_1 X' + A_0 X = b
Examples
========
>>> from sympy import (Function, Symbol, Matrix, Eq)
>>> from sympy.solvers.ode.systems import linear_ode_to_matrix
>>> t = Symbol('t')
>>> x = Function('x')
>>> y = Function('y')
We can create a system of linear ODEs like
>>> eqs = [
... Eq(x(t).diff(t), x(t) + y(t) + 1),
... Eq(y(t).diff(t), x(t) - y(t)),
... ]
>>> funcs = [x(t), y(t)]
>>> order = 1 # 1st order system
Now ``linear_ode_to_matrix`` can represent this as a matrix
differential equation.
>>> (A1, A0), b = linear_ode_to_matrix(eqs, funcs, t, order)
>>> A1
Matrix([
[1, 0],
[0, 1]])
>>> A0
Matrix([
[-1, -1],
[-1, 1]])
>>> b
Matrix([
[1],
[0]])
The original equations can be recovered from these matrices:
>>> eqs_mat = Matrix([eq.lhs - eq.rhs for eq in eqs])
>>> X = Matrix(funcs)
>>> A1 * X.diff(t) + A0 * X - b == eqs_mat
True
If the system of equations has a maximum order greater than the
order of the system specified, a ODEOrderError exception is raised.
>>> eqs = [Eq(x(t).diff(t, 2), x(t).diff(t) + x(t)), Eq(y(t).diff(t), y(t) + x(t))]
>>> linear_ode_to_matrix(eqs, funcs, t, 1)
Traceback (most recent call last):
...
ODEOrderError: Cannot represent system in 1-order form
If the system of equations is nonlinear, then ODENonlinearError is
raised.
>>> eqs = [Eq(x(t).diff(t), x(t) + y(t)), Eq(y(t).diff(t), y(t)**2 + x(t))]
>>> linear_ode_to_matrix(eqs, funcs, t, 1)
Traceback (most recent call last):
...
ODENonlinearError: The system of ODEs is nonlinear.
Parameters
==========
eqs : list of sympy expressions or equalities
The equations as expressions (assumed equal to zero).
funcs : list of applied functions
The dependent variables of the system of ODEs.
t : symbol
The independent variable.
order : int
The order of the system of ODEs.
Returns
=======
The tuple ``(As, b)`` where ``As`` is a tuple of matrices and ``b`` is the
the matrix representing the rhs of the matrix equation.
Raises
======
ODEOrderError
When the system of ODEs have an order greater than what was specified
ODENonlinearError
When the system of ODEs is nonlinear
See Also
========
linear_eq_to_matrix: for systems of linear algebraic equations.
References
==========
.. [1] https://en.wikipedia.org/wiki/Matrix_differential_equation
"""
from sympy.solvers.solveset import linear_eq_to_matrix
if any(ode_order(eq, func) > order for eq in eqs for func in funcs):
msg = "Cannot represent system in {}-order form"
raise ODEOrderError(msg.format(order))
As = []
for o in range(order, -1, -1):
# Work from the highest derivative down
funcs_deriv = [func.diff(t, o) for func in funcs]
# linear_eq_to_matrix expects a proper symbol so substitute e.g.
# Derivative(x(t), t) for a Dummy.
rep = {func_deriv: Dummy() for func_deriv in funcs_deriv}
eqs = [eq.subs(rep) for eq in eqs]
syms = [rep[func_deriv] for func_deriv in funcs_deriv]
# Ai is the matrix for X(t).diff(t, o)
# eqs is minus the remainder of the equations.
try:
Ai, b = linear_eq_to_matrix(eqs, syms)
except NonlinearError:
raise ODENonlinearError("The system of ODEs is nonlinear.")
Ai = Ai.applyfunc(expand_mul)
As.append(Ai)
if o:
eqs = [-eq for eq in b]
else:
rhs = b
return As, rhs
def matrix_exp(A, t):
r"""
Matrix exponential $\exp(A*t)$ for the matrix ``A`` and scalar ``t``.
Explanation
===========
This functions returns the $\exp(A*t)$ by doing a simple
matrix multiplication:
.. math:: \exp(A*t) = P * expJ * P^{-1}
where $expJ$ is $\exp(J*t)$. $J$ is the Jordan normal
form of $A$ and $P$ is matrix such that:
.. math:: A = P * J * P^{-1}
The matrix exponential $\exp(A*t)$ appears in the solution of linear
differential equations. For example if $x$ is a vector and $A$ is a matrix
then the initial value problem
.. math:: \frac{dx(t)}{dt} = A \times x(t), x(0) = x0
has the unique solution
.. math:: x(t) = \exp(A t) x0
Examples
========
>>> from sympy import Symbol, Matrix, pprint
>>> from sympy.solvers.ode.systems import matrix_exp
>>> t = Symbol('t')
We will consider a 2x2 matrix for comupting the exponential
>>> A = Matrix([[2, -5], [2, -4]])
>>> pprint(A)
[2 -5]
[ ]
[2 -4]
Now, exp(A*t) is given as follows:
>>> pprint(matrix_exp(A, t))
[ -t -t -t ]
[3*e *sin(t) + e *cos(t) -5*e *sin(t) ]
[ ]
[ -t -t -t ]
[ 2*e *sin(t) - 3*e *sin(t) + e *cos(t)]
Parameters
==========
A : Matrix
The matrix $A$ in the expression $\exp(A*t)$
t : Symbol
The independent variable
See Also
========
matrix_exp_jordan_form: For exponential of Jordan normal form
References
==========
.. [1] https://en.wikipedia.org/wiki/Jordan_normal_form
.. [2] https://en.wikipedia.org/wiki/Matrix_exponential
"""
P, expJ = matrix_exp_jordan_form(A, t)
return P * expJ * P.inv()
def matrix_exp_jordan_form(A, t):
r"""
Matrix exponential $\exp(A*t)$ for the matrix *A* and scalar *t*.
Explanation
===========
Returns the Jordan form of the $\exp(A*t)$ along with the matrix $P$ such that:
.. math::
\exp(A*t) = P * expJ * P^{-1}
Examples
========
>>> from sympy import Matrix, Symbol
>>> from sympy.solvers.ode.systems import matrix_exp, matrix_exp_jordan_form
>>> t = Symbol('t')
We will consider a 2x2 defective matrix. This shows that our method
works even for defective matrices.
>>> A = Matrix([[1, 1], [0, 1]])
It can be observed that this function gives us the Jordan normal form
and the required invertible matrix P.
>>> P, expJ = matrix_exp_jordan_form(A, t)
Here, it is shown that P and expJ returned by this function is correct
as they satisfy the formula: P * expJ * P_inverse = exp(A*t).
>>> P * expJ * P.inv() == matrix_exp(A, t)
True
Parameters
==========
A : Matrix
The matrix $A$ in the expression $\exp(A*t)$
t : Symbol
The independent variable
References
==========
.. [1] https://en.wikipedia.org/wiki/Defective_matrix
.. [2] https://en.wikipedia.org/wiki/Jordan_matrix
.. [3] https://en.wikipedia.org/wiki/Jordan_normal_form
"""
N, M = A.shape
if N != M:
raise ValueError('Needed square matrix but got shape (%s, %s)' % (N, M))
elif A.has(t):
raise ValueError('Matrix A should not depend on t')
def jordan_chains(A):
'''Chains from Jordan normal form analogous to M.eigenvects().
Returns a dict with eignevalues as keys like:
{e1: [[v111,v112,...], [v121, v122,...]], e2:...}
where vijk is the kth vector in the jth chain for eigenvalue i.
'''
P, blocks = A.jordan_cells()
basis = [P[:,i] for i in range(P.shape[1])]
n = 0
chains = {}
for b in blocks:
eigval = b[0, 0]
size = b.shape[0]
if eigval not in chains:
chains[eigval] = []
chains[eigval].append(basis[n:n+size])
n += size
return chains
eigenchains = jordan_chains(A)
# Needed for consistency across Python versions:
eigenchains_iter = sorted(eigenchains.items(), key=default_sort_key)
isreal = not A.has(I)
blocks = []
vectors = []
seen_conjugate = set()
for e, chains in eigenchains_iter:
for chain in chains:
n = len(chain)
if isreal and e != e.conjugate() and e.conjugate() in eigenchains:
if e in seen_conjugate:
continue
seen_conjugate.add(e.conjugate())
exprt = exp(re(e) * t)
imrt = im(e) * t
imblock = Matrix([[cos(imrt), sin(imrt)],
[-sin(imrt), cos(imrt)]])
expJblock2 = Matrix(n, n, lambda i,j:
imblock * t**(j-i) / factorial(j-i) if j >= i
else zeros(2, 2))
expJblock = Matrix(2*n, 2*n, lambda i,j: expJblock2[i//2,j//2][i%2,j%2])
blocks.append(exprt * expJblock)
for i in range(n):
vectors.append(re(chain[i]))
vectors.append(im(chain[i]))
else:
vectors.extend(chain)
fun = lambda i,j: t**(j-i)/factorial(j-i) if j >= i else 0
expJblock = Matrix(n, n, fun)
blocks.append(exp(e * t) * expJblock)
expJ = Matrix.diag(*blocks)
P = Matrix(N, N, lambda i,j: vectors[j][i])
return P, expJ
def _linear_neq_order1_type1(match_):
r"""
System of n first-order constant-coefficient linear homogeneous differential equations
.. math:: y'_k = a_{k1} y_1 + a_{k2} y_2 +...+ a_{kn} y_n; k = 1,2,...,n
or that can be written as `\vec{y'} = A . \vec{y}`
where `\vec{y}` is matrix of `y_k` for `k = 1,2,...n` and `A` is a `n \times n` matrix.
These equations are equivalent to a first order homogeneous linear
differential equation.
The system of ODEs described above has a unique solution, namely:
.. math ::
\vec{y} = \exp(A t) C
where $t$ is the independent variable and $C$ is a vector of n constants. These are constants
from the integration.
"""
eq = match_['eq']
func = match_['func']
fc = match_['func_coeff']
n = len(eq)
t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0]
constants = numbered_symbols(prefix='C', cls=Symbol, start=1)
# This needs to be modified in future so that fc is only of type Matrix
M = -fc if type(fc) is Matrix else Matrix(n, n, lambda i,j:-fc[i,func[j],0])
P, J = matrix_exp_jordan_form(M, t)
P = simplify(P)
Cvect = Matrix(list(next(constants) for _ in range(n)))
sol_vector = P * (J * Cvect)
gens = sol_vector.atoms(exp)
sol_vector = [collect(s, ordered(gens), exact=True) for s in sol_vector]
sol_dict = [Eq(func[i], sol_vector[i]) for i in range(n)]
return sol_dict
def _linear_neq_order1_type2(match_):
r"""
System of n first-order coefficient linear non-homogeneous differential equations
.. math::
X' = A X + b(t)
where $X$ is the vector of $n$ dependent variables, $t$ is the dependent variable, $X'$
is the first order differential of $X$ with respect to $t$, $A$ is a $n \times n$
constant coefficient matrix and $b(t)$ is the non-homogeneous term.
The solution of the above system is:
.. math::
X = e^{A t} ( \int e^{- A t} b \,dt + C)
where $C$ is the vector of constants.
"""
eq = match_['eq']
func = match_['func']
fc = match_['func_coeff']
b = match_['rhs']
n = len(eq)
t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0]
constants = numbered_symbols(prefix='C', cls=Symbol, start=1)
# This needs to be modified in future so that fc is only of type Matrix
M = -fc if type(fc) is Matrix else Matrix(n, n, lambda i,j:-fc[i,func[j],0])
P, J = matrix_exp_jordan_form(M, t)
P = simplify(P)
Cvect = Matrix(list(next(constants) for _ in range(n)))
sol_vector = P * J * ((J.inv() * P.inv() * b).applyfunc(lambda x: Integral(x, t)) + Cvect)
# sol_vector = sol_vector.applyfunc(_solsimp)
# Removing the expand_mul can simplify the solutions of the ODEs
# with symbolic coeffs. To be addressed in the future.
sol_vector = [collect(expand_mul(s), sol_vector.atoms(exp), exact=True) for s in sol_vector]
sol_dict = [Eq(func[i], sol_vector[i]) for i in range(n)]
# sol_dict = [simpsol(eq) for eq in sol_dict]
return sol_dict
def _matrix_is_constant(M, t):
"""Checks if the matrix M is independent of t or not."""
return all(coef.as_independent(t, as_Add=True)[1] == 0 for coef in M)
def _canonical_equations(eqs, funcs, t):
"""Helper function that solves for first order derivatives in a system"""
from sympy.solvers.solvers import solve
# For now the system of ODEs dealt by this function can have a
# maximum order of 1.
if any(ode_order(eq, func) > 1 for eq in eqs for func in funcs):
msg = "Cannot represent system in {}-order canonical form"
raise ODEOrderError(msg.format(1))
canon_eqs = solve(eqs, *[func.diff(t) for func in funcs], dict=True)
if len(canon_eqs) != 1:
raise ODENonlinearError("System of ODEs is nonlinear")
canon_eqs = canon_eqs[0]
canon_eqs = [Eq(func.diff(t), canon_eqs[func.diff(t)]) for func in funcs]
return canon_eqs
def _is_commutative_anti_derivative(A, t):
B = integrate(A, t)
is_commuting = (B*A - A*B).applyfunc(expand).applyfunc(factor_terms).is_zero_matrix
return B, is_commuting
def _linear_neq_order1_type3(match_):
r"""
System of n first-order nonconstant-coefficient linear homogeneous differential equations
.. math::
X' = A(t) X
where $X$ is the vector of $n$ dependent variables, $t$ is the dependent variable, $X'$
is the first order differential of $X$ with respect to $t$ and $A(t)$ is a $n \times n$
coefficient matrix.
Let us define $B$ as antiderivative of coefficient matrix $A$:
.. math::
B(t) = \int A(t) dt
If the system of ODEs defined above is such that its antiderivative $B(t)$ commutes with
$A(t)$ itself, then, the solution of the above system is given as:
.. math::
X = \exp(B(t)) C
where $C$ is the vector of constants.
"""
# Some parts of code is repeated, this needs to be taken care of
# The constant vector obtained here can be done so in the match
# function itself.
eq = match_['eq']
func = match_['func']
fc = match_['func_coeff']
n = len(eq)
t = list(list(eq[0].atoms(Derivative))[0].atoms(Symbol))[0]
constants = numbered_symbols(prefix='C', cls=Symbol, start=1)
# This needs to be modified in future so that fc is only of type Matrix
M = -fc if type(fc) is Matrix else Matrix(n, n, lambda i,j:-fc[i,func[j],0])
Cvect = Matrix(list(next(constants) for _ in range(n)))
# The code in if block will be removed when it is made sure
# that the code works without the statements in if block.
if "commutative_antiderivative" not in match_:
B, is_commuting = _is_commutative_anti_derivative(M, t)
# This course is subject to change
if not is_commuting:
return None
else:
B = match_['commutative_antiderivative']
sol_vector = B.exp() * Cvect
# The expand_mul is added to handle the solutions so that
# the exponential terms are collected properly.
sol_vector = [collect(expand_mul(s), ordered(s.atoms(exp)), exact=True) for s in sol_vector]
sol_dict = [Eq(func[i], sol_vector[i]) for i in range(n)]
return sol_dict
def neq_nth_linear_constant_coeff_match(eqs, funcs, t):
r"""
Returns a dictionary with details of the eqs if every equation is constant coefficient
and linear else returns None
Explanation
===========
This function takes the eqs, converts it into a form Ax = b where x is a vector of terms
containing dependent variables and their derivatives till their maximum order. If it is
possible to convert eqs into Ax = b, then all the equations in eqs are linear otherwise
they are non-linear.
To check if the equations are constant coefficient, we need to check if all the terms in
A obtained above are constant or not.
To check if the equations are homogeneous or not, we need to check if b is a zero matrix
or not.
Parameters
==========
eqs: List
List of ODEs
funcs: List
List of dependent variables
t: Symbol
Independent variable of the equations in eqs
Returns
=======
match = {
'no_of_equation': len(eqs),
'eq': eqs,
'func': funcs,
'order': order,
'is_linear': is_linear,
'is_constant': is_constant,
'is_homogeneous': is_homogeneous,
}
Dict or None
Dict with values for keys:
1. no_of_equation: Number of equations
2. eq: The set of equations
3. func: List of dependent variables
4. order: A dictionary that gives the order of the
dependent variable in eqs
5. is_linear: Boolean value indicating if the set of
equations are linear or not.
6. is_constant: Boolean value indicating if the set of
equations have constant coefficients or not.
7. is_homogeneous: Boolean value indicating if the set of
equations are homogeneous or not.
8. commutative_antiderivative: Antiderivative of the coefficient
matrix if the coefficient matrix is non-constant
and commutative with its antiderivative. This key
may or may not exist.
9. is_general: Boolean value indicating if the system of ODEs is
solvable using one of the general case solvers or not.
10. rhs: rhs of the non-homogeneous system of ODEs in Matrix form. This
key may or may not exist.
This Dict is the answer returned if the eqs are linear and constant
coefficient. Otherwise, None is returned.
"""
# Error for i == 0 can be added but isn't for now
# Removing the duplicates from the list of funcs
# meanwhile maintaining the order. This is done
# since the line in classify_sysode: list(set(funcs)
# cause some test cases to fail when gives different
# results in different versions of Python.
funcs = list(uniq(funcs))
# Check for len(funcs) == len(eqs)
if len(funcs) != len(eqs):
raise ValueError("Number of functions given is not equal to the number of equations %s" % funcs)
# ValueError when functions have more than one arguments
for func in funcs:
if len(func.args) != 1:
raise ValueError("dsolve() and classify_sysode() work with "
"functions of one variable only, not %s" % func)
# Getting the func_dict and order using the helper
# function
order = _get_func_order(eqs, funcs)
if not all(order[func] == 1 for func in funcs):
return None
else:
# TO be changed when this function is updated.
# This will in future be updated as the maximum
# order in the system found.
system_order = 1
# Not adding the check if the len(func.args) for
# every func in funcs is 1
# Linearity check
try:
canon_eqs = _canonical_equations(eqs, funcs, t)
As, b = linear_ode_to_matrix(canon_eqs, funcs, t, system_order)
# When the system of ODEs is non-linear, an ODENonlinearError is raised.
# When system has an order greater than what is specified in system_order,
# ODEOrderError is raised.
# This function catches these errors and None is returned
except (ODEOrderError, ODENonlinearError):
return None
A = As[1]
is_linear = True
# Constant coefficient check
is_constant = _matrix_is_constant(A, t)
# Homogeneous check
is_homogeneous = True if b.is_zero_matrix else False
# Is general key is used to identify if the system of ODEs can be solved by
# one of the general case solvers or not.
match = {
'no_of_equation': len(eqs),
'eq': eqs,
'func': funcs,
'order': order,
'is_linear': is_linear,
'is_constant': is_constant,
'is_homogeneous': is_homogeneous,
'is_general': True
}
# The match['is_linear'] check will be added in the future when this
# function becomes ready to deal with non-linear systems of ODEs
# Converting the equation into canonical form if the
# equation is first order. There will be a separate
# function for this in the future.
if all([order[func] == 1 for func in funcs]):
match['func_coeff'] = A
if match['is_constant']:
if is_homogeneous:
match['type_of_equation'] = "type1"
else:
match['rhs'] = b
match['type_of_equation'] = "type2"
else:
B, is_commuting = _is_commutative_anti_derivative(-A, t)
if not is_commuting or not is_homogeneous:
return None
match['commutative_antiderivative'] = B
match['type_of_equation'] = "type3"
return match
return None
|
6eafb9351c6660b98ece3aaa48d922171c479a8cd40a037369725b6d6bb9bcfd
|
from sympy.core.containers import Tuple
from sympy.core.function import (Function, Lambda, nfloat, diff)
from sympy.core.mod import Mod
from sympy.core.numbers import (E, I, Rational, oo, pi)
from sympy.core.relational import (Eq, Gt,
Ne)
from sympy.core.singleton import S
from sympy.core.symbol import (Dummy, Symbol, symbols)
from sympy.functions.elementary.complexes import (Abs, arg, im, re, sign)
from sympy.functions.elementary.exponential import (LambertW, exp, log)
from sympy.functions.elementary.hyperbolic import (HyperbolicFunction,
sinh, tanh, cosh, sech, coth)
from sympy.functions.elementary.miscellaneous import sqrt, Min, Max
from sympy.functions.elementary.piecewise import Piecewise
from sympy.functions.elementary.trigonometric import (
TrigonometricFunction, acos, acot, acsc, asec, asin, atan, atan2,
cos, cot, csc, sec, sin, tan)
from sympy.functions.special.error_functions import (erf, erfc,
erfcinv, erfinv)
from sympy.logic.boolalg import And
from sympy.matrices.dense import MutableDenseMatrix as Matrix
from sympy.matrices.immutable import ImmutableDenseMatrix
from sympy.polys.polytools import Poly
from sympy.polys.rootoftools import CRootOf
from sympy.sets.contains import Contains
from sympy.sets.conditionset import ConditionSet
from sympy.sets.fancysets import ImageSet
from sympy.sets.sets import (Complement, EmptySet, FiniteSet,
Intersection, Interval, Union, imageset, ProductSet)
from sympy.simplify import simplify
from sympy.tensor.indexed import Indexed
from sympy.utilities.iterables import numbered_symbols
from sympy.testing.pytest import (XFAIL, raises, skip, slow, SKIP)
from sympy.testing.randtest import verify_numerically as tn
from sympy.physics.units import cm
from sympy.solvers.solveset import (
solveset_real, domain_check, solveset_complex, linear_eq_to_matrix,
linsolve, _is_function_class_equation, invert_real, invert_complex,
solveset, solve_decomposition, substitution, nonlinsolve, solvify,
_is_finite_with_finite_vars, _transolve, _is_exponential,
_solve_exponential, _is_logarithmic,
_solve_logarithm, _term_factors, _is_modular, NonlinearError)
from sympy.abc import (a, b, c, d, e, f, g, h, i, j, k, l, m, n, q, r,
t, w, x, y, z)
def dumeq(i, j):
if type(i) in (list, tuple):
return all(dumeq(i, j) for i, j in zip(i, j))
return i == j or i.dummy_eq(j)
def test_invert_real():
x = Symbol('x', real=True)
def ireal(x, s=S.Reals):
return Intersection(s, x)
# issue 14223
assert invert_real(x, 0, x, Interval(1, 2)) == (x, S.EmptySet)
assert invert_real(exp(x), z, x) == (x, ireal(FiniteSet(log(z))))
y = Symbol('y', positive=True)
n = Symbol('n', real=True)
assert invert_real(x + 3, y, x) == (x, FiniteSet(y - 3))
assert invert_real(x*3, y, x) == (x, FiniteSet(y / 3))
assert invert_real(exp(x), y, x) == (x, FiniteSet(log(y)))
assert invert_real(exp(3*x), y, x) == (x, FiniteSet(log(y) / 3))
assert invert_real(exp(x + 3), y, x) == (x, FiniteSet(log(y) - 3))
assert invert_real(exp(x) + 3, y, x) == (x, ireal(FiniteSet(log(y - 3))))
assert invert_real(exp(x)*3, y, x) == (x, FiniteSet(log(y / 3)))
assert invert_real(log(x), y, x) == (x, FiniteSet(exp(y)))
assert invert_real(log(3*x), y, x) == (x, FiniteSet(exp(y) / 3))
assert invert_real(log(x + 3), y, x) == (x, FiniteSet(exp(y) - 3))
assert invert_real(Abs(x), y, x) == (x, FiniteSet(y, -y))
assert invert_real(2**x, y, x) == (x, FiniteSet(log(y)/log(2)))
assert invert_real(2**exp(x), y, x) == (x, ireal(FiniteSet(log(log(y)/log(2)))))
assert invert_real(x**2, y, x) == (x, FiniteSet(sqrt(y), -sqrt(y)))
assert invert_real(x**S.Half, y, x) == (x, FiniteSet(y**2))
raises(ValueError, lambda: invert_real(x, x, x))
raises(ValueError, lambda: invert_real(x**pi, y, x))
raises(ValueError, lambda: invert_real(S.One, y, x))
assert invert_real(x**31 + x, y, x) == (x**31 + x, FiniteSet(y))
lhs = x**31 + x
base_values = FiniteSet(y - 1, -y - 1)
assert invert_real(Abs(x**31 + x + 1), y, x) == (lhs, base_values)
assert dumeq(invert_real(sin(x), y, x),
(x, imageset(Lambda(n, n*pi + (-1)**n*asin(y)), S.Integers)))
assert dumeq(invert_real(sin(exp(x)), y, x),
(x, imageset(Lambda(n, log((-1)**n*asin(y) + n*pi)), S.Integers)))
assert dumeq(invert_real(csc(x), y, x),
(x, imageset(Lambda(n, n*pi + (-1)**n*acsc(y)), S.Integers)))
assert dumeq(invert_real(csc(exp(x)), y, x),
(x, imageset(Lambda(n, log((-1)**n*acsc(y) + n*pi)), S.Integers)))
assert dumeq(invert_real(cos(x), y, x),
(x, Union(imageset(Lambda(n, 2*n*pi + acos(y)), S.Integers), \
imageset(Lambda(n, 2*n*pi - acos(y)), S.Integers))))
assert dumeq(invert_real(cos(exp(x)), y, x),
(x, Union(imageset(Lambda(n, log(2*n*pi + acos(y))), S.Integers), \
imageset(Lambda(n, log(2*n*pi - acos(y))), S.Integers))))
assert dumeq(invert_real(sec(x), y, x),
(x, Union(imageset(Lambda(n, 2*n*pi + asec(y)), S.Integers), \
imageset(Lambda(n, 2*n*pi - asec(y)), S.Integers))))
assert dumeq(invert_real(sec(exp(x)), y, x),
(x, Union(imageset(Lambda(n, log(2*n*pi + asec(y))), S.Integers), \
imageset(Lambda(n, log(2*n*pi - asec(y))), S.Integers))))
assert dumeq(invert_real(tan(x), y, x),
(x, imageset(Lambda(n, n*pi + atan(y)), S.Integers)))
assert dumeq(invert_real(tan(exp(x)), y, x),
(x, imageset(Lambda(n, log(n*pi + atan(y))), S.Integers)))
assert dumeq(invert_real(cot(x), y, x),
(x, imageset(Lambda(n, n*pi + acot(y)), S.Integers)))
assert dumeq(invert_real(cot(exp(x)), y, x),
(x, imageset(Lambda(n, log(n*pi + acot(y))), S.Integers)))
assert dumeq(invert_real(tan(tan(x)), y, x),
(tan(x), imageset(Lambda(n, n*pi + atan(y)), S.Integers)))
x = Symbol('x', positive=True)
assert invert_real(x**pi, y, x) == (x, FiniteSet(y**(1/pi)))
def test_invert_complex():
assert invert_complex(x + 3, y, x) == (x, FiniteSet(y - 3))
assert invert_complex(x*3, y, x) == (x, FiniteSet(y / 3))
assert dumeq(invert_complex(exp(x), y, x),
(x, imageset(Lambda(n, I*(2*pi*n + arg(y)) + log(Abs(y))), S.Integers)))
assert invert_complex(log(x), y, x) == (x, FiniteSet(exp(y)))
raises(ValueError, lambda: invert_real(1, y, x))
raises(ValueError, lambda: invert_complex(x, x, x))
raises(ValueError, lambda: invert_complex(x, x, 1))
# https://github.com/skirpichev/omg/issues/16
assert invert_complex(sinh(x), 0, x) != (x, FiniteSet(0))
def test_domain_check():
assert domain_check(1/(1 + (1/(x+1))**2), x, -1) is False
assert domain_check(x**2, x, 0) is True
assert domain_check(x, x, oo) is False
assert domain_check(0, x, oo) is False
def test_issue_11536():
assert solveset(0**x - 100, x, S.Reals) == S.EmptySet
assert solveset(0**x - 1, x, S.Reals) == FiniteSet(0)
def test_issue_17479():
from sympy.solvers.solveset import nonlinsolve
f = (x**2 + y**2)**2 + (x**2 + z**2)**2 - 2*(2*x**2 + y**2 + z**2)
fx = f.diff(x)
fy = f.diff(y)
fz = f.diff(z)
sol = nonlinsolve([fx, fy, fz], [x, y, z])
assert len(sol) >= 4 and len(sol) <= 20
# nonlinsolve has been giving a varying number of solutions
# (originally 18, then 20, now 19) due to various internal changes.
# Unfortunately not all the solutions are actually valid and some are
# redundant. Since the original issue was that an exception was raised,
# this first test only checks that nonlinsolve returns a "plausible"
# solution set. The next test checks the result for correctness.
@XFAIL
def test_issue_18449():
x, y, z = symbols("x, y, z")
f = (x**2 + y**2)**2 + (x**2 + z**2)**2 - 2*(2*x**2 + y**2 + z**2)
fx = diff(f, x)
fy = diff(f, y)
fz = diff(f, z)
sol = nonlinsolve([fx, fy, fz], [x, y, z])
for (xs, ys, zs) in sol:
d = {x: xs, y: ys, z: zs}
assert tuple(_.subs(d).simplify() for _ in (fx, fy, fz)) == (0, 0, 0)
# After simplification and removal of duplicate elements, there should
# only be 4 parametric solutions left:
# simplifiedsolutions = FiniteSet((sqrt(1 - z**2), z, z),
# (-sqrt(1 - z**2), z, z),
# (sqrt(1 - z**2), -z, z),
# (-sqrt(1 - z**2), -z, z))
# TODO: Is the above solution set definitely complete?
def test_is_function_class_equation():
from sympy.abc import x, a
assert _is_function_class_equation(TrigonometricFunction,
tan(x), x) is True
assert _is_function_class_equation(TrigonometricFunction,
tan(x) - 1, x) is True
assert _is_function_class_equation(TrigonometricFunction,
tan(x) + sin(x), x) is True
assert _is_function_class_equation(TrigonometricFunction,
tan(x) + sin(x) - a, x) is True
assert _is_function_class_equation(TrigonometricFunction,
sin(x)*tan(x) + sin(x), x) is True
assert _is_function_class_equation(TrigonometricFunction,
sin(x)*tan(x + a) + sin(x), x) is True
assert _is_function_class_equation(TrigonometricFunction,
sin(x)*tan(x*a) + sin(x), x) is True
assert _is_function_class_equation(TrigonometricFunction,
a*tan(x) - 1, x) is True
assert _is_function_class_equation(TrigonometricFunction,
tan(x)**2 + sin(x) - 1, x) is True
assert _is_function_class_equation(TrigonometricFunction,
tan(x) + x, x) is False
assert _is_function_class_equation(TrigonometricFunction,
tan(x**2), x) is False
assert _is_function_class_equation(TrigonometricFunction,
tan(x**2) + sin(x), x) is False
assert _is_function_class_equation(TrigonometricFunction,
tan(x)**sin(x), x) is False
assert _is_function_class_equation(TrigonometricFunction,
tan(sin(x)) + sin(x), x) is False
assert _is_function_class_equation(HyperbolicFunction,
tanh(x), x) is True
assert _is_function_class_equation(HyperbolicFunction,
tanh(x) - 1, x) is True
assert _is_function_class_equation(HyperbolicFunction,
tanh(x) + sinh(x), x) is True
assert _is_function_class_equation(HyperbolicFunction,
tanh(x) + sinh(x) - a, x) is True
assert _is_function_class_equation(HyperbolicFunction,
sinh(x)*tanh(x) + sinh(x), x) is True
assert _is_function_class_equation(HyperbolicFunction,
sinh(x)*tanh(x + a) + sinh(x), x) is True
assert _is_function_class_equation(HyperbolicFunction,
sinh(x)*tanh(x*a) + sinh(x), x) is True
assert _is_function_class_equation(HyperbolicFunction,
a*tanh(x) - 1, x) is True
assert _is_function_class_equation(HyperbolicFunction,
tanh(x)**2 + sinh(x) - 1, x) is True
assert _is_function_class_equation(HyperbolicFunction,
tanh(x) + x, x) is False
assert _is_function_class_equation(HyperbolicFunction,
tanh(x**2), x) is False
assert _is_function_class_equation(HyperbolicFunction,
tanh(x**2) + sinh(x), x) is False
assert _is_function_class_equation(HyperbolicFunction,
tanh(x)**sinh(x), x) is False
assert _is_function_class_equation(HyperbolicFunction,
tanh(sinh(x)) + sinh(x), x) is False
def test_garbage_input():
raises(ValueError, lambda: solveset_real([y], y))
x = Symbol('x', real=True)
assert solveset_real(x, 1) == S.EmptySet
assert solveset_real(x - 1, 1) == FiniteSet(x)
assert solveset_real(x, pi) == S.EmptySet
assert solveset_real(x, x**2) == S.EmptySet
raises(ValueError, lambda: solveset_complex([x], x))
assert solveset_complex(x, pi) == S.EmptySet
raises(ValueError, lambda: solveset((x, y), x))
raises(ValueError, lambda: solveset(x + 1, S.Reals))
raises(ValueError, lambda: solveset(x + 1, x, 2))
def test_solve_mul():
assert solveset_real((a*x + b)*(exp(x) - 3), x) == \
Union({log(3)}, Intersection({-b/a}, S.Reals))
anz = Symbol('anz', nonzero=True)
bb = Symbol('bb', real=True)
assert solveset_real((anz*x + bb)*(exp(x) - 3), x) == \
FiniteSet(-bb/anz, log(3))
assert solveset_real((2*x + 8)*(8 + exp(x)), x) == FiniteSet(S(-4))
assert solveset_real(x/log(x), x) == EmptySet()
def test_solve_invert():
assert solveset_real(exp(x) - 3, x) == FiniteSet(log(3))
assert solveset_real(log(x) - 3, x) == FiniteSet(exp(3))
assert solveset_real(3**(x + 2), x) == FiniteSet()
assert solveset_real(3**(2 - x), x) == FiniteSet()
assert solveset_real(y - b*exp(a/x), x) == Intersection(
S.Reals, FiniteSet(a/log(y/b)))
# issue 4504
assert solveset_real(2**x - 10, x) == FiniteSet(1 + log(5)/log(2))
def test_errorinverses():
assert solveset_real(erf(x) - S.Half, x) == \
FiniteSet(erfinv(S.Half))
assert solveset_real(erfinv(x) - 2, x) == \
FiniteSet(erf(2))
assert solveset_real(erfc(x) - S.One, x) == \
FiniteSet(erfcinv(S.One))
assert solveset_real(erfcinv(x) - 2, x) == FiniteSet(erfc(2))
def test_solve_polynomial():
x = Symbol('x', real=True)
y = Symbol('y', real=True)
assert solveset_real(3*x - 2, x) == FiniteSet(Rational(2, 3))
assert solveset_real(x**2 - 1, x) == FiniteSet(-S.One, S.One)
assert solveset_real(x - y**3, x) == FiniteSet(y ** 3)
a11, a12, a21, a22, b1, b2 = symbols('a11, a12, a21, a22, b1, b2')
assert solveset_real(x**3 - 15*x - 4, x) == FiniteSet(
-2 + 3 ** S.Half,
S(4),
-2 - 3 ** S.Half)
assert solveset_real(sqrt(x) - 1, x) == FiniteSet(1)
assert solveset_real(sqrt(x) - 2, x) == FiniteSet(4)
assert solveset_real(x**Rational(1, 4) - 2, x) == FiniteSet(16)
assert solveset_real(x**Rational(1, 3) - 3, x) == FiniteSet(27)
assert len(solveset_real(x**5 + x**3 + 1, x)) == 1
assert len(solveset_real(-2*x**3 + 4*x**2 - 2*x + 6, x)) > 0
assert solveset_real(x**6 + x**4 + I, x) is S.EmptySet
def test_return_root_of():
f = x**5 - 15*x**3 - 5*x**2 + 10*x + 20
s = list(solveset_complex(f, x))
for root in s:
assert root.func == CRootOf
# if one uses solve to get the roots of a polynomial that has a CRootOf
# solution, make sure that the use of nfloat during the solve process
# doesn't fail. Note: if you want numerical solutions to a polynomial
# it is *much* faster to use nroots to get them than to solve the
# equation only to get CRootOf solutions which are then numerically
# evaluated. So for eq = x**5 + 3*x + 7 do Poly(eq).nroots() rather
# than [i.n() for i in solve(eq)] to get the numerical roots of eq.
assert nfloat(list(solveset_complex(x**5 + 3*x**3 + 7, x))[0],
exponent=False) == CRootOf(x**5 + 3*x**3 + 7, 0).n()
sol = list(solveset_complex(x**6 - 2*x + 2, x))
assert all(isinstance(i, CRootOf) for i in sol) and len(sol) == 6
f = x**5 - 15*x**3 - 5*x**2 + 10*x + 20
s = list(solveset_complex(f, x))
for root in s:
assert root.func == CRootOf
s = x**5 + 4*x**3 + 3*x**2 + Rational(7, 4)
assert solveset_complex(s, x) == \
FiniteSet(*Poly(s*4, domain='ZZ').all_roots())
# Refer issue #7876
eq = x*(x - 1)**2*(x + 1)*(x**6 - x + 1)
assert solveset_complex(eq, x) == \
FiniteSet(-1, 0, 1, CRootOf(x**6 - x + 1, 0),
CRootOf(x**6 - x + 1, 1),
CRootOf(x**6 - x + 1, 2),
CRootOf(x**6 - x + 1, 3),
CRootOf(x**6 - x + 1, 4),
CRootOf(x**6 - x + 1, 5))
def test__has_rational_power():
from sympy.solvers.solveset import _has_rational_power
assert _has_rational_power(sqrt(2), x)[0] is False
assert _has_rational_power(x*sqrt(2), x)[0] is False
assert _has_rational_power(x**2*sqrt(x), x) == (True, 2)
assert _has_rational_power(sqrt(2)*x**Rational(1, 3), x) == (True, 3)
assert _has_rational_power(sqrt(x)*x**Rational(1, 3), x) == (True, 6)
def test_solveset_sqrt_1():
assert solveset_real(sqrt(5*x + 6) - 2 - x, x) == \
FiniteSet(-S.One, S(2))
assert solveset_real(sqrt(x - 1) - x + 7, x) == FiniteSet(10)
assert solveset_real(sqrt(x - 2) - 5, x) == FiniteSet(27)
assert solveset_real(sqrt(x) - 2 - 5, x) == FiniteSet(49)
assert solveset_real(sqrt(x**3), x) == FiniteSet(0)
assert solveset_real(sqrt(x - 1), x) == FiniteSet(1)
def test_solveset_sqrt_2():
x = Symbol('x', real=True)
y = Symbol('y', real=True)
# http://tutorial.math.lamar.edu/Classes/Alg/SolveRadicalEqns.aspx#Solve_Rad_Ex2_a
assert solveset_real(sqrt(2*x - 1) - sqrt(x - 4) - 2, x) == \
FiniteSet(S(5), S(13))
assert solveset_real(sqrt(x + 7) + 2 - sqrt(3 - x), x) == \
FiniteSet(-6)
# http://www.purplemath.com/modules/solverad.htm
assert solveset_real(sqrt(17*x - sqrt(x**2 - 5)) - 7, x) == \
FiniteSet(3)
eq = x + 1 - (x**4 + 4*x**3 - x)**Rational(1, 4)
assert solveset_real(eq, x) == FiniteSet(Rational(-1, 2), Rational(-1, 3))
eq = sqrt(2*x + 9) - sqrt(x + 1) - sqrt(x + 4)
assert solveset_real(eq, x) == FiniteSet(0)
eq = sqrt(x + 4) + sqrt(2*x - 1) - 3*sqrt(x - 1)
assert solveset_real(eq, x) == FiniteSet(5)
eq = sqrt(x)*sqrt(x - 7) - 12
assert solveset_real(eq, x) == FiniteSet(16)
eq = sqrt(x - 3) + sqrt(x) - 3
assert solveset_real(eq, x) == FiniteSet(4)
eq = sqrt(2*x**2 - 7) - (3 - x)
assert solveset_real(eq, x) == FiniteSet(-S(8), S(2))
# others
eq = sqrt(9*x**2 + 4) - (3*x + 2)
assert solveset_real(eq, x) == FiniteSet(0)
assert solveset_real(sqrt(x - 3) - sqrt(x) - 3, x) == FiniteSet()
eq = (2*x - 5)**Rational(1, 3) - 3
assert solveset_real(eq, x) == FiniteSet(16)
assert solveset_real(sqrt(x) + sqrt(sqrt(x)) - 4, x) == \
FiniteSet((Rational(-1, 2) + sqrt(17)/2)**4)
eq = sqrt(x) - sqrt(x - 1) + sqrt(sqrt(x))
assert solveset_real(eq, x) == FiniteSet()
eq = (sqrt(x) + sqrt(x + 1) + sqrt(1 - x) - 6*sqrt(5)/5)
ans = solveset_real(eq, x)
ra = S('''-1484/375 - 4*(-1/2 + sqrt(3)*I/2)*(-12459439/52734375 +
114*sqrt(12657)/78125)**(1/3) - 172564/(140625*(-1/2 +
sqrt(3)*I/2)*(-12459439/52734375 + 114*sqrt(12657)/78125)**(1/3))''')
rb = Rational(4, 5)
assert all(abs(eq.subs(x, i).n()) < 1e-10 for i in (ra, rb)) and \
len(ans) == 2 and \
set([i.n(chop=True) for i in ans]) == \
set([i.n(chop=True) for i in (ra, rb)])
assert solveset_real(sqrt(x) + x**Rational(1, 3) +
x**Rational(1, 4), x) == FiniteSet(0)
assert solveset_real(x/sqrt(x**2 + 1), x) == FiniteSet(0)
eq = (x - y**3)/((y**2)*sqrt(1 - y**2))
assert solveset_real(eq, x) == FiniteSet(y**3)
# issue 4497
assert solveset_real(1/(5 + x)**Rational(1, 5) - 9, x) == \
FiniteSet(Rational(-295244, 59049))
@XFAIL
def test_solve_sqrt_fail():
# this only works if we check real_root(eq.subs(x, Rational(1, 3)))
# but checksol doesn't work like that
eq = (x**3 - 3*x**2)**Rational(1, 3) + 1 - x
assert solveset_real(eq, x) == FiniteSet(Rational(1, 3))
@slow
def test_solve_sqrt_3():
R = Symbol('R')
eq = sqrt(2)*R*sqrt(1/(R + 1)) + (R + 1)*(sqrt(2)*sqrt(1/(R + 1)) - 1)
sol = solveset_complex(eq, R)
fset = [Rational(5, 3) + 4*sqrt(10)*cos(atan(3*sqrt(111)/251)/3)/3,
-sqrt(10)*cos(atan(3*sqrt(111)/251)/3)/3 +
40*re(1/((Rational(-1, 2) - sqrt(3)*I/2)*(Rational(251, 27) + sqrt(111)*I/9)**Rational(1, 3)))/9 +
sqrt(30)*sin(atan(3*sqrt(111)/251)/3)/3 + Rational(5, 3) +
I*(-sqrt(30)*cos(atan(3*sqrt(111)/251)/3)/3 -
sqrt(10)*sin(atan(3*sqrt(111)/251)/3)/3 +
40*im(1/((Rational(-1, 2) - sqrt(3)*I/2)*(Rational(251, 27) + sqrt(111)*I/9)**Rational(1, 3)))/9)]
cset = [40*re(1/((Rational(-1, 2) + sqrt(3)*I/2)*(Rational(251, 27) + sqrt(111)*I/9)**Rational(1, 3)))/9 -
sqrt(10)*cos(atan(3*sqrt(111)/251)/3)/3 - sqrt(30)*sin(atan(3*sqrt(111)/251)/3)/3 +
Rational(5, 3) +
I*(40*im(1/((Rational(-1, 2) + sqrt(3)*I/2)*(Rational(251, 27) + sqrt(111)*I/9)**Rational(1, 3)))/9 -
sqrt(10)*sin(atan(3*sqrt(111)/251)/3)/3 +
sqrt(30)*cos(atan(3*sqrt(111)/251)/3)/3)]
assert sol._args[0] == FiniteSet(*fset)
assert sol._args[1] == ConditionSet(
R,
Eq(sqrt(2)*R*sqrt(1/(R + 1)) + (R + 1)*(sqrt(2)*sqrt(1/(R + 1)) - 1), 0),
FiniteSet(*cset))
# the number of real roots will depend on the value of m: for m=1 there are 4
# and for m=-1 there are none.
eq = -sqrt((m - q)**2 + (-m/(2*q) + S.Half)**2) + sqrt((-m**2/2 - sqrt(
4*m**4 - 4*m**2 + 8*m + 1)/4 - Rational(1, 4))**2 + (m**2/2 - m - sqrt(
4*m**4 - 4*m**2 + 8*m + 1)/4 - Rational(1, 4))**2)
unsolved_object = ConditionSet(q, Eq(sqrt((m - q)**2 + (-m/(2*q) + S.Half)**2) -
sqrt((-m**2/2 - sqrt(4*m**4 - 4*m**2 + 8*m + 1)/4 - Rational(1, 4))**2 + (m**2/2 - m -
sqrt(4*m**4 - 4*m**2 + 8*m + 1)/4 - Rational(1, 4))**2), 0), S.Reals)
assert solveset_real(eq, q) == unsolved_object
def test_solve_polynomial_symbolic_param():
assert solveset_complex((x**2 - 1)**2 - a, x) == \
FiniteSet(sqrt(1 + sqrt(a)), -sqrt(1 + sqrt(a)),
sqrt(1 - sqrt(a)), -sqrt(1 - sqrt(a)))
# issue 4507
assert solveset_complex(y - b/(1 + a*x), x) == \
FiniteSet((b/y - 1)/a) - FiniteSet(-1/a)
# issue 4508
assert solveset_complex(y - b*x/(a + x), x) == \
FiniteSet(-a*y/(y - b)) - FiniteSet(-a)
def test_solve_rational():
assert solveset_real(1/x + 1, x) == FiniteSet(-S.One)
assert solveset_real(1/exp(x) - 1, x) == FiniteSet(0)
assert solveset_real(x*(1 - 5/x), x) == FiniteSet(5)
assert solveset_real(2*x/(x + 2) - 1, x) == FiniteSet(2)
assert solveset_real((x**2/(7 - x)).diff(x), x) == \
FiniteSet(S.Zero, S(14))
def test_solveset_real_gen_is_pow():
assert solveset_real(sqrt(1) + 1, x) == EmptySet()
def test_no_sol():
assert solveset(1 - oo*x) == EmptySet()
assert solveset(oo*x, x) == EmptySet()
assert solveset(oo*x - oo, x) == EmptySet()
assert solveset_real(4, x) == EmptySet()
assert solveset_real(exp(x), x) == EmptySet()
assert solveset_real(x**2 + 1, x) == EmptySet()
assert solveset_real(-3*a/sqrt(x), x) == EmptySet()
assert solveset_real(1/x, x) == EmptySet()
assert solveset_real(-(1 + x)/(2 + x)**2 + 1/(2 + x), x) == \
EmptySet()
def test_sol_zero_real():
assert solveset_real(0, x) == S.Reals
assert solveset(0, x, Interval(1, 2)) == Interval(1, 2)
assert solveset_real(-x**2 - 2*x + (x + 1)**2 - 1, x) == S.Reals
def test_no_sol_rational_extragenous():
assert solveset_real((x/(x + 1) + 3)**(-2), x) == EmptySet()
assert solveset_real((x - 1)/(1 + 1/(x - 1)), x) == EmptySet()
def test_solve_polynomial_cv_1a():
"""
Test for solving on equations that can be converted to
a polynomial equation using the change of variable y -> x**Rational(p, q)
"""
assert solveset_real(sqrt(x) - 1, x) == FiniteSet(1)
assert solveset_real(sqrt(x) - 2, x) == FiniteSet(4)
assert solveset_real(x**Rational(1, 4) - 2, x) == FiniteSet(16)
assert solveset_real(x**Rational(1, 3) - 3, x) == FiniteSet(27)
assert solveset_real(x*(x**(S.One / 3) - 3), x) == \
FiniteSet(S.Zero, S(27))
def test_solveset_real_rational():
"""Test solveset_real for rational functions"""
x = Symbol('x', real=True)
y = Symbol('y', real=True)
assert solveset_real((x - y**3) / ((y**2)*sqrt(1 - y**2)), x) \
== FiniteSet(y**3)
# issue 4486
assert solveset_real(2*x/(x + 2) - 1, x) == FiniteSet(2)
def test_solveset_real_log():
assert solveset_real(log((x-1)*(x+1)), x) == \
FiniteSet(sqrt(2), -sqrt(2))
def test_poly_gens():
assert solveset_real(4**(2*(x**2) + 2*x) - 8, x) == \
FiniteSet(Rational(-3, 2), S.Half)
def test_solve_abs():
n = Dummy('n')
raises(ValueError, lambda: solveset(Abs(x) - 1, x))
assert solveset(Abs(x) - n, x, S.Reals).dummy_eq(
ConditionSet(x, Contains(n, Interval(0, oo)), {-n, n}))
assert solveset_real(Abs(x) - 2, x) == FiniteSet(-2, 2)
assert solveset_real(Abs(x) + 2, x) is S.EmptySet
assert solveset_real(Abs(x + 3) - 2*Abs(x - 3), x) == \
FiniteSet(1, 9)
assert solveset_real(2*Abs(x) - Abs(x - 1), x) == \
FiniteSet(-1, Rational(1, 3))
sol = ConditionSet(
x,
And(
Contains(b, Interval(0, oo)),
Contains(a + b, Interval(0, oo)),
Contains(a - b, Interval(0, oo))),
FiniteSet(-a - b - 3, -a + b - 3, a - b - 3, a + b - 3))
eq = Abs(Abs(x + 3) - a) - b
assert invert_real(eq, 0, x)[1] == sol
reps = {a: 3, b: 1}
eqab = eq.subs(reps)
for si in sol.subs(reps):
assert not eqab.subs(x, si)
assert dumeq(solveset(Eq(sin(Abs(x)), 1), x, domain=S.Reals), Union(
Intersection(Interval(0, oo),
ImageSet(Lambda(n, (-1)**n*pi/2 + n*pi), S.Integers)),
Intersection(Interval(-oo, 0),
ImageSet(Lambda(n, n*pi - (-1)**(-n)*pi/2), S.Integers))))
def test_issue_9824():
assert dumeq(solveset(sin(x)**2 - 2*sin(x) + 1, x), ImageSet(Lambda(n, 2*n*pi + pi/2), S.Integers))
assert dumeq(solveset(cos(x)**2 - 2*cos(x) + 1, x), ImageSet(Lambda(n, 2*n*pi), S.Integers))
def test_issue_9565():
assert solveset_real(Abs((x - 1)/(x - 5)) <= Rational(1, 3), x) == Interval(-1, 2)
def test_issue_10069():
eq = abs(1/(x - 1)) - 1 > 0
assert solveset_real(eq, x) == Union(
Interval.open(0, 1), Interval.open(1, 2))
def test_real_imag_splitting():
a, b = symbols('a b', real=True)
assert solveset_real(sqrt(a**2 - b**2) - 3, a) == \
FiniteSet(-sqrt(b**2 + 9), sqrt(b**2 + 9))
assert solveset_real(sqrt(a**2 + b**2) - 3, a) != \
S.EmptySet
def test_units():
assert solveset_real(1/x - 1/(2*cm), x) == FiniteSet(2*cm)
def test_solve_only_exp_1():
y = Symbol('y', positive=True)
assert solveset_real(exp(x) - y, x) == FiniteSet(log(y))
assert solveset_real(exp(x) + exp(-x) - 4, x) == \
FiniteSet(log(-sqrt(3) + 2), log(sqrt(3) + 2))
assert solveset_real(exp(x) + exp(-x) - y, x) != S.EmptySet
def test_atan2():
# The .inverse() method on atan2 works only if x.is_real is True and the
# second argument is a real constant
assert solveset_real(atan2(x, 2) - pi/3, x) == FiniteSet(2*sqrt(3))
def test_piecewise_solveset():
eq = Piecewise((x - 2, Gt(x, 2)), (2 - x, True)) - 3
assert set(solveset_real(eq, x)) == set(FiniteSet(-1, 5))
absxm3 = Piecewise(
(x - 3, 0 <= x - 3),
(3 - x, 0 > x - 3))
y = Symbol('y', positive=True)
assert solveset_real(absxm3 - y, x) == FiniteSet(-y + 3, y + 3)
f = Piecewise(((x - 2)**2, x >= 0), (0, True))
assert solveset(f, x, domain=S.Reals) == Union(FiniteSet(2), Interval(-oo, 0, True, True))
assert solveset(
Piecewise((x + 1, x > 0), (I, True)) - I, x, S.Reals
) == Interval(-oo, 0)
assert solveset(Piecewise((x - 1, Ne(x, I)), (x, True)), x) == FiniteSet(1)
def test_solveset_complex_polynomial():
assert solveset_complex(a*x**2 + b*x + c, x) == \
FiniteSet(-b/(2*a) - sqrt(-4*a*c + b**2)/(2*a),
-b/(2*a) + sqrt(-4*a*c + b**2)/(2*a))
assert solveset_complex(x - y**3, y) == FiniteSet(
(-x**Rational(1, 3))/2 + I*sqrt(3)*x**Rational(1, 3)/2,
x**Rational(1, 3),
(-x**Rational(1, 3))/2 - I*sqrt(3)*x**Rational(1, 3)/2)
assert solveset_complex(x + 1/x - 1, x) == \
FiniteSet(S.Half + I*sqrt(3)/2, S.Half - I*sqrt(3)/2)
def test_sol_zero_complex():
assert solveset_complex(0, x) == S.Complexes
def test_solveset_complex_rational():
assert solveset_complex((x - 1)*(x - I)/(x - 3), x) == \
FiniteSet(1, I)
assert solveset_complex((x - y**3)/((y**2)*sqrt(1 - y**2)), x) == \
FiniteSet(y**3)
assert solveset_complex(-x**2 - I, x) == \
FiniteSet(-sqrt(2)/2 + sqrt(2)*I/2, sqrt(2)/2 - sqrt(2)*I/2)
def test_solve_quintics():
skip("This test is too slow")
f = x**5 - 110*x**3 - 55*x**2 + 2310*x + 979
s = solveset_complex(f, x)
for root in s:
res = f.subs(x, root.n()).n()
assert tn(res, 0)
f = x**5 + 15*x + 12
s = solveset_complex(f, x)
for root in s:
res = f.subs(x, root.n()).n()
assert tn(res, 0)
def test_solveset_complex_exp():
from sympy.abc import x, n
assert dumeq(solveset_complex(exp(x) - 1, x),
imageset(Lambda(n, I*2*n*pi), S.Integers))
assert dumeq(solveset_complex(exp(x) - I, x),
imageset(Lambda(n, I*(2*n*pi + pi/2)), S.Integers))
assert solveset_complex(1/exp(x), x) == S.EmptySet
assert dumeq(solveset_complex(sinh(x).rewrite(exp), x),
imageset(Lambda(n, n*pi*I), S.Integers))
def test_solveset_real_exp():
from sympy.abc import x, y
assert solveset(Eq((-2)**x, 4), x, S.Reals) == FiniteSet(2)
assert solveset(Eq(-2**x, 4), x, S.Reals) == S.EmptySet
assert solveset(Eq((-3)**x, 27), x, S.Reals) == S.EmptySet
assert solveset(Eq((-5)**(x+1), 625), x, S.Reals) == FiniteSet(3)
assert solveset(Eq(2**(x-3), -16), x, S.Reals) == S.EmptySet
assert solveset(Eq((-3)**(x - 3), -3**39), x, S.Reals) == FiniteSet(42)
assert solveset(Eq(2**x, y), x, S.Reals) == Intersection(S.Reals, FiniteSet(log(y)/log(2)))
assert invert_real((-2)**(2*x) - 16, 0, x) == (x, FiniteSet(2))
def test_solve_complex_log():
assert solveset_complex(log(x), x) == FiniteSet(1)
assert solveset_complex(1 - log(a + 4*x**2), x) == \
FiniteSet(-sqrt(-a + E)/2, sqrt(-a + E)/2)
def test_solve_complex_sqrt():
assert solveset_complex(sqrt(5*x + 6) - 2 - x, x) == \
FiniteSet(-S.One, S(2))
assert solveset_complex(sqrt(5*x + 6) - (2 + 2*I) - x, x) == \
FiniteSet(-S(2), 3 - 4*I)
assert solveset_complex(4*x*(1 - a * sqrt(x)), x) == \
FiniteSet(S.Zero, 1 / a ** 2)
def test_solveset_complex_tan():
s = solveset_complex(tan(x).rewrite(exp), x)
assert dumeq(s, imageset(Lambda(n, pi*n), S.Integers) - \
imageset(Lambda(n, pi*n + pi/2), S.Integers))
def test_solve_trig():
from sympy.abc import n
assert dumeq(solveset_real(sin(x), x),
Union(imageset(Lambda(n, 2*pi*n), S.Integers),
imageset(Lambda(n, 2*pi*n + pi), S.Integers)))
assert dumeq(solveset_real(sin(x) - 1, x),
imageset(Lambda(n, 2*pi*n + pi/2), S.Integers))
assert dumeq(solveset_real(cos(x), x),
Union(imageset(Lambda(n, 2*pi*n + pi/2), S.Integers),
imageset(Lambda(n, 2*pi*n + pi*Rational(3, 2)), S.Integers)))
assert dumeq(solveset_real(sin(x) + cos(x), x),
Union(imageset(Lambda(n, 2*n*pi + pi*Rational(3, 4)), S.Integers),
imageset(Lambda(n, 2*n*pi + pi*Rational(7, 4)), S.Integers)))
assert solveset_real(sin(x)**2 + cos(x)**2, x) == S.EmptySet
assert dumeq(solveset_complex(cos(x) - S.Half, x),
Union(imageset(Lambda(n, 2*n*pi + pi*Rational(5, 3)), S.Integers),
imageset(Lambda(n, 2*n*pi + pi/3), S.Integers)))
assert dumeq(solveset(sin(y + a) - sin(y), a, domain=S.Reals),
Union(ImageSet(Lambda(n, 2*n*pi), S.Integers),
Intersection(ImageSet(Lambda(n, -I*(I*(
2*n*pi + arg(-exp(-2*I*y))) +
2*im(y))), S.Integers), S.Reals)))
assert dumeq(solveset_real(sin(2*x)*cos(x) + cos(2*x)*sin(x)-1, x),
ImageSet(Lambda(n, n*pi*Rational(2, 3) + pi/6), S.Integers))
assert dumeq(solveset_real(2*tan(x)*sin(x) + 1, x), Union(
ImageSet(Lambda(n, 2*n*pi + atan(sqrt(2)*sqrt(-1 + sqrt(17))/
(1 - sqrt(17))) + pi), S.Integers),
ImageSet(Lambda(n, 2*n*pi - atan(sqrt(2)*sqrt(-1 + sqrt(17))/
(1 - sqrt(17))) + pi), S.Integers)))
assert dumeq(solveset_real(cos(2*x)*cos(4*x) - 1, x),
ImageSet(Lambda(n, n*pi), S.Integers))
assert dumeq(solveset(sin(x/10) + Rational(3, 4)), Union(
ImageSet(Lambda(n, 20*n*pi + 10*atan(3*sqrt(7)/7) + 10*pi), S.Integers),
ImageSet(Lambda(n, 20*n*pi - 10*atan(3*sqrt(7)/7) + 20*pi), S.Integers)))
assert dumeq(solveset(cos(x/15) + cos(x/5)), Union(
ImageSet(Lambda(n, 30*n*pi + 15*pi/2), S.Integers),
ImageSet(Lambda(n, 30*n*pi + 45*pi/2), S.Integers),
ImageSet(Lambda(n, 30*n*pi + 75*pi/4), S.Integers),
ImageSet(Lambda(n, 30*n*pi + 45*pi/4), S.Integers),
ImageSet(Lambda(n, 30*n*pi + 105*pi/4), S.Integers),
ImageSet(Lambda(n, 30*n*pi + 15*pi/4), S.Integers)))
assert dumeq(solveset(sec(sqrt(2)*x/3) + 5), Union(
ImageSet(Lambda(n, 3*sqrt(2)*(2*n*pi - pi + atan(2*sqrt(6)))/2), S.Integers),
ImageSet(Lambda(n, 3*sqrt(2)*(2*n*pi - atan(2*sqrt(6)) + pi)/2), S.Integers)))
assert dumeq(simplify(solveset(tan(pi*x) - cot(pi/2*x))), Union(
ImageSet(Lambda(n, 4*n + 1), S.Integers),
ImageSet(Lambda(n, 4*n + 3), S.Integers),
ImageSet(Lambda(n, 4*n + Rational(7, 3)), S.Integers),
ImageSet(Lambda(n, 4*n + Rational(5, 3)), S.Integers),
ImageSet(Lambda(n, 4*n + Rational(11, 3)), S.Integers),
ImageSet(Lambda(n, 4*n + Rational(1, 3)), S.Integers)))
assert dumeq(solveset(cos(9*x)), Union(
ImageSet(Lambda(n, 2*n*pi/9 + pi/18), S.Integers),
ImageSet(Lambda(n, 2*n*pi/9 + pi/6), S.Integers)))
assert dumeq(solveset(sin(8*x) + cot(12*x), x, S.Reals), Union(
ImageSet(Lambda(n, n*pi/2 + pi/8), S.Integers),
ImageSet(Lambda(n, n*pi/2 + 3*pi/8), S.Integers),
ImageSet(Lambda(n, n*pi/2 + 5*pi/16), S.Integers),
ImageSet(Lambda(n, n*pi/2 + 3*pi/16), S.Integers),
ImageSet(Lambda(n, n*pi/2 + 7*pi/16), S.Integers),
ImageSet(Lambda(n, n*pi/2 + pi/16), S.Integers)))
# This is the only remaining solveset test that actually ends up being solved
# by _solve_trig2(). All others are handled by the improved _solve_trig1.
assert dumeq(solveset_real(2*cos(x)*cos(2*x) - 1, x),
Union(ImageSet(Lambda(n, 2*n*pi + 2*atan(sqrt(-2*2**Rational(1, 3)*(67 +
9*sqrt(57))**Rational(2, 3) + 8*2**Rational(2, 3) + 11*(67 +
9*sqrt(57))**Rational(1, 3))/(3*(67 + 9*sqrt(57))**Rational(1, 6)))), S.Integers),
ImageSet(Lambda(n, 2*n*pi - 2*atan(sqrt(-2*2**Rational(1, 3)*(67 +
9*sqrt(57))**Rational(2, 3) + 8*2**Rational(2, 3) + 11*(67 +
9*sqrt(57))**Rational(1, 3))/(3*(67 + 9*sqrt(57))**Rational(1, 6))) +
2*pi), S.Integers)))
# issue #16870
assert dumeq(simplify(solveset(sin(x/180*pi) - S.Half, x, S.Reals)), Union(
ImageSet(Lambda(n, 360*n + 150), S.Integers),
ImageSet(Lambda(n, 360*n + 30), S.Integers)))
def test_solve_hyperbolic():
# actual solver: _solve_trig1
n = Dummy('n')
assert solveset(sinh(x) + cosh(x), x) == S.EmptySet
assert solveset(sinh(x) + cos(x), x) == ConditionSet(x,
Eq(cos(x) + sinh(x), 0), S.Complexes)
assert solveset_real(sinh(x) + sech(x), x) == FiniteSet(
log(sqrt(sqrt(5) - 2)))
assert solveset_real(3*cosh(2*x) - 5, x) == FiniteSet(
-log(3)/2, log(3)/2)
assert solveset_real(sinh(x - 3) - 2, x) == FiniteSet(
log((2 + sqrt(5))*exp(3)))
assert solveset_real(cosh(2*x) + 2*sinh(x) - 5, x) == FiniteSet(
log(-2 + sqrt(5)), log(1 + sqrt(2)))
assert solveset_real((coth(x) + sinh(2*x))/cosh(x) - 3, x) == FiniteSet(
log(S.Half + sqrt(5)/2), log(1 + sqrt(2)))
assert solveset_real(cosh(x)*sinh(x) - 2, x) == FiniteSet(
log(4 + sqrt(17))/2)
assert solveset_real(sinh(x) + tanh(x) - 1, x) == FiniteSet(
log(sqrt(2)/2 + sqrt(-S(1)/2 + sqrt(2))))
assert dumeq(solveset_complex(sinh(x) - I/2, x), Union(
ImageSet(Lambda(n, I*(2*n*pi + 5*pi/6)), S.Integers),
ImageSet(Lambda(n, I*(2*n*pi + pi/6)), S.Integers)))
assert dumeq(solveset_complex(sinh(x) + sech(x), x), Union(
ImageSet(Lambda(n, 2*n*I*pi + log(sqrt(-2 + sqrt(5)))), S.Integers),
ImageSet(Lambda(n, I*(2*n*pi + pi/2) + log(sqrt(2 + sqrt(5)))), S.Integers),
ImageSet(Lambda(n, I*(2*n*pi + pi) + log(sqrt(-2 + sqrt(5)))), S.Integers),
ImageSet(Lambda(n, I*(2*n*pi - pi/2) + log(sqrt(2 + sqrt(5)))), S.Integers)))
assert dumeq(solveset(sinh(x/10) + Rational(3, 4)), Union(
ImageSet(Lambda(n, 10*I*(2*n*pi + pi) + 10*log(2)), S.Integers),
ImageSet(Lambda(n, 20*n*I*pi - 10*log(2)), S.Integers)))
assert dumeq(solveset(cosh(x/15) + cosh(x/5)), Union(
ImageSet(Lambda(n, 15*I*(2*n*pi + pi/2)), S.Integers),
ImageSet(Lambda(n, 15*I*(2*n*pi - pi/2)), S.Integers),
ImageSet(Lambda(n, 15*I*(2*n*pi - 3*pi/4)), S.Integers),
ImageSet(Lambda(n, 15*I*(2*n*pi + 3*pi/4)), S.Integers),
ImageSet(Lambda(n, 15*I*(2*n*pi - pi/4)), S.Integers),
ImageSet(Lambda(n, 15*I*(2*n*pi + pi/4)), S.Integers)))
assert dumeq(solveset(sech(sqrt(2)*x/3) + 5), Union(
ImageSet(Lambda(n, 3*sqrt(2)*I*(2*n*pi - pi + atan(2*sqrt(6)))/2), S.Integers),
ImageSet(Lambda(n, 3*sqrt(2)*I*(2*n*pi - atan(2*sqrt(6)) + pi)/2), S.Integers)))
assert dumeq(solveset(tanh(pi*x) - coth(pi/2*x)), Union(
ImageSet(Lambda(n, 2*I*(2*n*pi + pi/2)/pi), S.Integers),
ImageSet(Lambda(n, 2*I*(2*n*pi - pi/2)/pi), S.Integers)))
assert dumeq(solveset(cosh(9*x)), Union(
ImageSet(Lambda(n, I*(2*n*pi + pi/2)/9), S.Integers),
ImageSet(Lambda(n, I*(2*n*pi - pi/2)/9), S.Integers)))
# issues #9606 / #9531:
assert solveset(sinh(x), x, S.Reals) == FiniteSet(0)
assert dumeq(solveset(sinh(x), x, S.Complexes), Union(
ImageSet(Lambda(n, I*(2*n*pi + pi)), S.Integers),
ImageSet(Lambda(n, 2*n*I*pi), S.Integers)))
# issues #11218 / #18427
assert dumeq(solveset(sin(pi*x), x, S.Reals), Union(
ImageSet(Lambda(n, (2*n*pi + pi)/pi), S.Integers),
ImageSet(Lambda(n, 2*n), S.Integers)))
assert dumeq(solveset(sin(pi*x), x), Union(
ImageSet(Lambda(n, (2*n*pi + pi)/pi), S.Integers),
ImageSet(Lambda(n, 2*n), S.Integers)))
# issue #17543
assert dumeq(simplify(solveset(I*cot(8*x - 8*E), x)), Union(
ImageSet(Lambda(n, n*pi/4 - 13*pi/16 + E), S.Integers),
ImageSet(Lambda(n, n*pi/4 - 11*pi/16 + E), S.Integers)))
# issues #18490 / #19489
assert solveset(cosh(x) + cosh(3*x) - cosh(5*x), x, S.Reals
).dummy_eq(ConditionSet(x,
Eq(cosh(x) + cosh(3*x) - cosh(5*x), 0), S.Reals))
assert solveset(sinh(8*x) + coth(12*x)).dummy_eq(
ConditionSet(x, Eq(sinh(8*x) + coth(12*x), 0), S.Complexes))
def test_solve_trig_hyp_symbolic():
# actual solver: _solve_trig1
assert dumeq(solveset(sin(a*x), x), ConditionSet(x, Ne(a, 0), Union(
ImageSet(Lambda(n, (2*n*pi + pi)/a), S.Integers),
ImageSet(Lambda(n, 2*n*pi/a), S.Integers))))
assert dumeq(solveset(cosh(x/a), x), ConditionSet(x, Ne(a, 0), Union(
ImageSet(Lambda(n, I*a*(2*n*pi + pi/2)), S.Integers),
ImageSet(Lambda(n, I*a*(2*n*pi - pi/2)), S.Integers))))
assert dumeq(solveset(sin(2*sqrt(3)/3*a**2/(b*pi)*x)
+ cos(4*sqrt(3)/3*a**2/(b*pi)*x), x),
ConditionSet(x, Ne(b, 0) & Ne(a**2, 0), Union(
ImageSet(Lambda(n, sqrt(3)*pi*b*(2*n*pi + pi/2)/(2*a**2)), S.Integers),
ImageSet(Lambda(n, sqrt(3)*pi*b*(2*n*pi - 5*pi/6)/(2*a**2)), S.Integers),
ImageSet(Lambda(n, sqrt(3)*pi*b*(2*n*pi - pi/6)/(2*a**2)), S.Integers))))
assert dumeq(simplify(solveset(cot((1 + I)*x) - cot((3 + 3*I)*x), x)), Union(
ImageSet(Lambda(n, pi*(1 - I)*(4*n + 1)/4), S.Integers),
ImageSet(Lambda(n, pi*(1 - I)*(4*n - 1)/4), S.Integers)))
assert dumeq(solveset(cosh((a**2 + 1)*x) - 3, x),
ConditionSet(x, Ne(a**2 + 1, 0), Union(
ImageSet(Lambda(n, (2*n*I*pi + log(3 - 2*sqrt(2)))/(a**2 + 1)), S.Integers),
ImageSet(Lambda(n, (2*n*I*pi + log(2*sqrt(2) + 3))/(a**2 + 1)), S.Integers))))
ar = Symbol('ar', real=True)
assert solveset(cosh((ar**2 + 1)*x) - 2, x, S.Reals) == FiniteSet(
log(sqrt(3) + 2)/(ar**2 + 1), log(2 - sqrt(3))/(ar**2 + 1))
def test_issue_9616():
assert dumeq(solveset(sinh(x) + tanh(x) - 1, x), Union(
ImageSet(Lambda(n, 2*n*I*pi + log(sqrt(2)/2 + sqrt(-S.Half + sqrt(2)))), S.Integers),
ImageSet(Lambda(n, I*(2*n*pi - atan(sqrt(2)*sqrt(S.Half + sqrt(2))) + pi)
+ log(sqrt(1 + sqrt(2)))), S.Integers),
ImageSet(Lambda(n, I*(2*n*pi + pi) + log(-sqrt(2)/2 + sqrt(-S.Half + sqrt(2)))), S.Integers),
ImageSet(Lambda(n, I*(2*n*pi - pi + atan(sqrt(2)*sqrt(S.Half + sqrt(2))))
+ log(sqrt(1 + sqrt(2)))), S.Integers)))
f1 = (sinh(x)).rewrite(exp)
f2 = (tanh(x)).rewrite(exp)
assert dumeq(solveset(f1 + f2 - 1, x), Union(
Complement(ImageSet(
Lambda(n, I*(2*n*pi + pi) + log(-sqrt(2)/2 + sqrt(-S.Half + sqrt(2)))), S.Integers),
ImageSet(Lambda(n, I*(2*n*pi + pi)/2), S.Integers)),
Complement(ImageSet(Lambda(n, I*(2*n*pi - pi + atan(sqrt(2)*sqrt(S.Half + sqrt(2))))
+ log(sqrt(1 + sqrt(2)))), S.Integers),
ImageSet(Lambda(n, I*(2*n*pi + pi)/2), S.Integers)),
Complement(ImageSet(Lambda(n, I*(2*n*pi - atan(sqrt(2)*sqrt(S.Half + sqrt(2))) + pi)
+ log(sqrt(1 + sqrt(2)))), S.Integers),
ImageSet(Lambda(n, I*(2*n*pi + pi)/2), S.Integers)),
Complement(
ImageSet(Lambda(n, 2*n*I*pi + log(sqrt(2)/2 + sqrt(-S.Half + sqrt(2)))), S.Integers),
ImageSet(Lambda(n, I*(2*n*pi + pi)/2), S.Integers))))
def test_solve_invalid_sol():
assert 0 not in solveset_real(sin(x)/x, x)
assert 0 not in solveset_complex((exp(x) - 1)/x, x)
@XFAIL
def test_solve_trig_simplified():
from sympy.abc import n
assert dumeq(solveset_real(sin(x), x),
imageset(Lambda(n, n*pi), S.Integers))
assert dumeq(solveset_real(cos(x), x),
imageset(Lambda(n, n*pi + pi/2), S.Integers))
assert dumeq(solveset_real(cos(x) + sin(x), x),
imageset(Lambda(n, n*pi - pi/4), S.Integers))
@XFAIL
def test_solve_lambert():
assert solveset_real(x*exp(x) - 1, x) == FiniteSet(LambertW(1))
assert solveset_real(exp(x) + x, x) == FiniteSet(-LambertW(1))
assert solveset_real(x + 2**x, x) == \
FiniteSet(-LambertW(log(2))/log(2))
# issue 4739
ans = solveset_real(3*x + 5 + 2**(-5*x + 3), x)
assert ans == FiniteSet(Rational(-5, 3) +
LambertW(-10240*2**Rational(1, 3)*log(2)/3)/(5*log(2)))
eq = 2*(3*x + 4)**5 - 6*7**(3*x + 9)
result = solveset_real(eq, x)
ans = FiniteSet((log(2401) +
5*LambertW(-log(7**(7*3**Rational(1, 5)/5))))/(3*log(7))/-1)
assert result == ans
assert solveset_real(eq.expand(), x) == result
assert solveset_real(5*x - 1 + 3*exp(2 - 7*x), x) == \
FiniteSet(Rational(1, 5) + LambertW(-21*exp(Rational(3, 5))/5)/7)
assert solveset_real(2*x + 5 + log(3*x - 2), x) == \
FiniteSet(Rational(2, 3) + LambertW(2*exp(Rational(-19, 3))/3)/2)
assert solveset_real(3*x + log(4*x), x) == \
FiniteSet(LambertW(Rational(3, 4))/3)
assert solveset_real(x**x - 2) == FiniteSet(exp(LambertW(log(2))))
a = Symbol('a')
assert solveset_real(-a*x + 2*x*log(x), x) == FiniteSet(exp(a/2))
a = Symbol('a', real=True)
assert solveset_real(a/x + exp(x/2), x) == \
FiniteSet(2*LambertW(-a/2))
assert solveset_real((a/x + exp(x/2)).diff(x), x) == \
FiniteSet(4*LambertW(sqrt(2)*sqrt(a)/4))
# coverage test
assert solveset_real(tanh(x + 3)*tanh(x - 3) - 1, x) == EmptySet()
assert solveset_real((x**2 - 2*x + 1).subs(x, log(x) + 3*x), x) == \
FiniteSet(LambertW(3*S.Exp1)/3)
assert solveset_real((x**2 - 2*x + 1).subs(x, (log(x) + 3*x)**2 - 1), x) == \
FiniteSet(LambertW(3*exp(-sqrt(2)))/3, LambertW(3*exp(sqrt(2)))/3)
assert solveset_real((x**2 - 2*x - 2).subs(x, log(x) + 3*x), x) == \
FiniteSet(LambertW(3*exp(1 + sqrt(3)))/3, LambertW(3*exp(-sqrt(3) + 1))/3)
assert solveset_real(x*log(x) + 3*x + 1, x) == \
FiniteSet(exp(-3 + LambertW(-exp(3))))
eq = (x*exp(x) - 3).subs(x, x*exp(x))
assert solveset_real(eq, x) == \
FiniteSet(LambertW(3*exp(-LambertW(3))))
assert solveset_real(3*log(a**(3*x + 5)) + a**(3*x + 5), x) == \
FiniteSet(-((log(a**5) + LambertW(Rational(1, 3)))/(3*log(a))))
p = symbols('p', positive=True)
assert solveset_real(3*log(p**(3*x + 5)) + p**(3*x + 5), x) == \
FiniteSet(
log((-3**Rational(1, 3) - 3**Rational(5, 6)*I)*LambertW(Rational(1, 3))**Rational(1, 3)/(2*p**Rational(5, 3)))/log(p),
log((-3**Rational(1, 3) + 3**Rational(5, 6)*I)*LambertW(Rational(1, 3))**Rational(1, 3)/(2*p**Rational(5, 3)))/log(p),
log((3*LambertW(Rational(1, 3))/p**5)**(1/(3*log(p)))),) # checked numerically
# check collection
b = Symbol('b')
eq = 3*log(a**(3*x + 5)) + b*log(a**(3*x + 5)) + a**(3*x + 5)
assert solveset_real(eq, x) == FiniteSet(
-((log(a**5) + LambertW(1/(b + 3)))/(3*log(a))))
# issue 4271
assert solveset_real((a/x + exp(x/2)).diff(x, 2), x) == FiniteSet(
6*LambertW((-1)**Rational(1, 3)*a**Rational(1, 3)/3))
assert solveset_real(x**3 - 3**x, x) == \
FiniteSet(-3/log(3)*LambertW(-log(3)/3))
assert solveset_real(3**cos(x) - cos(x)**3) == FiniteSet(
acos(-3*LambertW(-log(3)/3)/log(3)))
assert solveset_real(x**2 - 2**x, x) == \
solveset_real(-x**2 + 2**x, x)
assert solveset_real(3*log(x) - x*log(3)) == FiniteSet(
-3*LambertW(-log(3)/3)/log(3),
-3*LambertW(-log(3)/3, -1)/log(3))
assert solveset_real(LambertW(2*x) - y) == FiniteSet(
y*exp(y)/2)
@XFAIL
def test_other_lambert():
a = Rational(6, 5)
assert solveset_real(x**a - a**x, x) == FiniteSet(
a, -a*LambertW(-log(a)/a)/log(a))
def test_solveset():
f = Function('f')
raises(ValueError, lambda: solveset(x + y))
assert solveset(x, 1) == S.EmptySet
assert solveset(f(1)**2 + y + 1, f(1)
) == FiniteSet(-sqrt(-y - 1), sqrt(-y - 1))
assert solveset(f(1)**2 - 1, f(1), S.Reals) == FiniteSet(-1, 1)
assert solveset(f(1)**2 + 1, f(1)) == FiniteSet(-I, I)
assert solveset(x - 1, 1) == FiniteSet(x)
assert solveset(sin(x) - cos(x), sin(x)) == FiniteSet(cos(x))
assert solveset(0, domain=S.Reals) == S.Reals
assert solveset(1) == S.EmptySet
assert solveset(True, domain=S.Reals) == S.Reals # issue 10197
assert solveset(False, domain=S.Reals) == S.EmptySet
assert solveset(exp(x) - 1, domain=S.Reals) == FiniteSet(0)
assert solveset(exp(x) - 1, x, S.Reals) == FiniteSet(0)
assert solveset(Eq(exp(x), 1), x, S.Reals) == FiniteSet(0)
assert solveset(exp(x) - 1, exp(x), S.Reals) == FiniteSet(1)
A = Indexed('A', x)
assert solveset(A - 1, A, S.Reals) == FiniteSet(1)
assert solveset(x - 1 >= 0, x, S.Reals) == Interval(1, oo)
assert solveset(exp(x) - 1 >= 0, x, S.Reals) == Interval(0, oo)
assert dumeq(solveset(exp(x) - 1, x), imageset(Lambda(n, 2*I*pi*n), S.Integers))
assert dumeq(solveset(Eq(exp(x), 1), x), imageset(Lambda(n, 2*I*pi*n),
S.Integers))
# issue 13825
assert solveset(x**2 + f(0) + 1, x) == {-sqrt(-f(0) - 1), sqrt(-f(0) - 1)}
def test__solveset_multi():
from sympy.solvers.solveset import _solveset_multi
from sympy import Reals
# Basic univariate case:
from sympy.abc import x
assert _solveset_multi([x**2-1], [x], [S.Reals]) == FiniteSet((1,), (-1,))
# Linear systems of two equations
from sympy.abc import x, y
assert _solveset_multi([x+y, x+1], [x, y], [Reals, Reals]) == FiniteSet((-1, 1))
assert _solveset_multi([x+y, x+1], [y, x], [Reals, Reals]) == FiniteSet((1, -1))
assert _solveset_multi([x+y, x-y-1], [x, y], [Reals, Reals]) == FiniteSet((S(1)/2, -S(1)/2))
assert _solveset_multi([x-1, y-2], [x, y], [Reals, Reals]) == FiniteSet((1, 2))
# assert dumeq(_solveset_multi([x+y], [x, y], [Reals, Reals]), ImageSet(Lambda(x, (x, -x)), Reals))
assert dumeq(_solveset_multi([x+y], [x, y], [Reals, Reals]), Union(
ImageSet(Lambda(((x,),), (x, -x)), ProductSet(Reals)),
ImageSet(Lambda(((y,),), (-y, y)), ProductSet(Reals))))
assert _solveset_multi([x+y, x+y+1], [x, y], [Reals, Reals]) == S.EmptySet
assert _solveset_multi([x+y, x-y, x-1], [x, y], [Reals, Reals]) == S.EmptySet
assert _solveset_multi([x+y, x-y, x-1], [y, x], [Reals, Reals]) == S.EmptySet
# Systems of three equations:
from sympy.abc import x, y, z
assert _solveset_multi([x+y+z-1, x+y-z-2, x-y-z-3], [x, y, z], [Reals,
Reals, Reals]) == FiniteSet((2, -S.Half, -S.Half))
# Nonlinear systems:
from sympy.abc import r, theta, z, x, y
assert _solveset_multi([x**2+y**2-2, x+y], [x, y], [Reals, Reals]) == FiniteSet((-1, 1), (1, -1))
assert _solveset_multi([x**2-1, y], [x, y], [Reals, Reals]) == FiniteSet((1, 0), (-1, 0))
#assert _solveset_multi([x**2-y**2], [x, y], [Reals, Reals]) == Union(
# ImageSet(Lambda(x, (x, -x)), Reals), ImageSet(Lambda(x, (x, x)), Reals))
assert dumeq(_solveset_multi([x**2-y**2], [x, y], [Reals, Reals]), Union(
ImageSet(Lambda(((x,),), (x, -Abs(x))), ProductSet(Reals)),
ImageSet(Lambda(((x,),), (x, Abs(x))), ProductSet(Reals)),
ImageSet(Lambda(((y,),), (-Abs(y), y)), ProductSet(Reals)),
ImageSet(Lambda(((y,),), (Abs(y), y)), ProductSet(Reals))))
assert _solveset_multi([r*cos(theta)-1, r*sin(theta)], [theta, r],
[Interval(0, pi), Interval(-1, 1)]) == FiniteSet((0, 1), (pi, -1))
assert _solveset_multi([r*cos(theta)-1, r*sin(theta)], [r, theta],
[Interval(0, 1), Interval(0, pi)]) == FiniteSet((1, 0))
#assert _solveset_multi([r*cos(theta)-r, r*sin(theta)], [r, theta],
# [Interval(0, 1), Interval(0, pi)]) == ?
assert dumeq(_solveset_multi([r*cos(theta)-r, r*sin(theta)], [r, theta],
[Interval(0, 1), Interval(0, pi)]), Union(
ImageSet(Lambda(((r,),), (r, 0)), ImageSet(Lambda(r, (r,)), Interval(0, 1))),
ImageSet(Lambda(((theta,),), (0, theta)), ImageSet(Lambda(theta, (theta,)), Interval(0, pi)))))
def test_conditionset():
assert solveset(Eq(sin(x)**2 + cos(x)**2, 1), x, domain=S.Reals
) is S.Reals
assert solveset(Eq(x**2 + x*sin(x), 1), x, domain=S.Reals
).dummy_eq(ConditionSet(x, Eq(x**2 + x*sin(x) - 1, 0), S.Reals))
assert dumeq(solveset(Eq(-I*(exp(I*x) - exp(-I*x))/2, 1), x
), imageset(Lambda(n, 2*n*pi + pi/2), S.Integers))
assert solveset(x + sin(x) > 1, x, domain=S.Reals
).dummy_eq(ConditionSet(x, x + sin(x) > 1, S.Reals))
assert solveset(Eq(sin(Abs(x)), x), x, domain=S.Reals
).dummy_eq(ConditionSet(x, Eq(-x + sin(Abs(x)), 0), S.Reals))
assert solveset(y**x-z, x, S.Reals
).dummy_eq(ConditionSet(x, Eq(y**x - z, 0), S.Reals))
@XFAIL
def test_conditionset_equality():
''' Checking equality of different representations of ConditionSet'''
assert solveset(Eq(tan(x), y), x) == ConditionSet(x, Eq(tan(x), y), S.Complexes)
def test_solveset_domain():
assert solveset(x**2 - x - 6, x, Interval(0, oo)) == FiniteSet(3)
assert solveset(x**2 - 1, x, Interval(0, oo)) == FiniteSet(1)
assert solveset(x**4 - 16, x, Interval(0, 10)) == FiniteSet(2)
def test_improve_coverage():
from sympy.solvers.solveset import _has_rational_power
solution = solveset(exp(x) + sin(x), x, S.Reals)
unsolved_object = ConditionSet(x, Eq(exp(x) + sin(x), 0), S.Reals)
assert solution.dummy_eq(unsolved_object)
assert _has_rational_power(sin(x)*exp(x) + 1, x) == (False, S.One)
assert _has_rational_power((sin(x)**2)*(exp(x) + 1)**3, x) == (False, S.One)
def test_issue_9522():
expr1 = Eq(1/(x**2 - 4) + x, 1/(x**2 - 4) + 2)
expr2 = Eq(1/x + x, 1/x)
assert solveset(expr1, x, S.Reals) == EmptySet()
assert solveset(expr2, x, S.Reals) == EmptySet()
def test_solvify():
assert solvify(x**2 + 10, x, S.Reals) == []
assert solvify(x**3 + 1, x, S.Complexes) == [-1, S.Half - sqrt(3)*I/2,
S.Half + sqrt(3)*I/2]
assert solvify(log(x), x, S.Reals) == [1]
assert solvify(cos(x), x, S.Reals) == [pi/2, pi*Rational(3, 2)]
assert solvify(sin(x) + 1, x, S.Reals) == [pi*Rational(3, 2)]
raises(NotImplementedError, lambda: solvify(sin(exp(x)), x, S.Complexes))
def test_abs_invert_solvify():
assert solvify(sin(Abs(x)), x, S.Reals) is None
def test_linear_eq_to_matrix():
eqns1 = [2*x + y - 2*z - 3, x - y - z, x + y + 3*z - 12]
eqns2 = [Eq(3*x + 2*y - z, 1), Eq(2*x - 2*y + 4*z, -2), -2*x + y - 2*z]
A, B = linear_eq_to_matrix(eqns1, x, y, z)
assert A == Matrix([[2, 1, -2], [1, -1, -1], [1, 1, 3]])
assert B == Matrix([[3], [0], [12]])
A, B = linear_eq_to_matrix(eqns2, x, y, z)
assert A == Matrix([[3, 2, -1], [2, -2, 4], [-2, 1, -2]])
assert B == Matrix([[1], [-2], [0]])
# Pure symbolic coefficients
eqns3 = [a*b*x + b*y + c*z - d, e*x + d*x + f*y + g*z - h, i*x + j*y + k*z - l]
A, B = linear_eq_to_matrix(eqns3, x, y, z)
assert A == Matrix([[a*b, b, c], [d + e, f, g], [i, j, k]])
assert B == Matrix([[d], [h], [l]])
# raise ValueError if
# 1) no symbols are given
raises(ValueError, lambda: linear_eq_to_matrix(eqns3))
# 2) there are duplicates
raises(ValueError, lambda: linear_eq_to_matrix(eqns3, [x, x, y]))
# 3) there are non-symbols
raises(ValueError, lambda: linear_eq_to_matrix(eqns3, [x, 1/a, y]))
# 4) a nonlinear term is detected in the original expression
raises(NonlinearError, lambda: linear_eq_to_matrix(Eq(1/x + x, 1/x), [x]))
assert linear_eq_to_matrix(1, x) == (Matrix([[0]]), Matrix([[-1]]))
# issue 15195
assert linear_eq_to_matrix(x + y*(z*(3*x + 2) + 3), x) == (
Matrix([[3*y*z + 1]]), Matrix([[-y*(2*z + 3)]]))
assert linear_eq_to_matrix(Matrix(
[[a*x + b*y - 7], [5*x + 6*y - c]]), x, y) == (
Matrix([[a, b], [5, 6]]), Matrix([[7], [c]]))
# issue 15312
assert linear_eq_to_matrix(Eq(x + 2, 1), x) == (
Matrix([[1]]), Matrix([[-1]]))
def test_issue_16577():
assert linear_eq_to_matrix(Eq(a*(2*x + 3*y) + 4*y, 5), x, y) == (
Matrix([[2*a, 3*a + 4]]), Matrix([[5]]))
def test_linsolve():
x1, x2, x3, x4 = symbols('x1, x2, x3, x4')
# Test for different input forms
M = Matrix([[1, 2, 1, 1, 7], [1, 2, 2, -1, 12], [2, 4, 0, 6, 4]])
system1 = A, B = M[:, :-1], M[:, -1]
Eqns = [x1 + 2*x2 + x3 + x4 - 7, x1 + 2*x2 + 2*x3 - x4 - 12,
2*x1 + 4*x2 + 6*x4 - 4]
sol = FiniteSet((-2*x2 - 3*x4 + 2, x2, 2*x4 + 5, x4))
assert linsolve(Eqns, (x1, x2, x3, x4)) == sol
assert linsolve(Eqns, *(x1, x2, x3, x4)) == sol
assert linsolve(system1, (x1, x2, x3, x4)) == sol
assert linsolve(system1, *(x1, x2, x3, x4)) == sol
# issue 9667 - symbols can be Dummy symbols
x1, x2, x3, x4 = symbols('x:4', cls=Dummy)
assert linsolve(system1, x1, x2, x3, x4) == FiniteSet(
(-2*x2 - 3*x4 + 2, x2, 2*x4 + 5, x4))
# raise ValueError for garbage value
raises(ValueError, lambda: linsolve(Eqns))
raises(ValueError, lambda: linsolve(x1))
raises(ValueError, lambda: linsolve(x1, x2))
raises(ValueError, lambda: linsolve((A,), x1, x2))
raises(ValueError, lambda: linsolve(A, B, x1, x2))
#raise ValueError if equations are non-linear in given variables
raises(NonlinearError, lambda: linsolve([x + y - 1, x ** 2 + y - 3], [x, y]))
raises(NonlinearError, lambda: linsolve([cos(x) + y, x + y], [x, y]))
assert linsolve([x + z - 1, x ** 2 + y - 3], [z, y]) == {(-x + 1, -x**2 + 3)}
# Fully symbolic test
A = Matrix([[a, b], [c, d]])
B = Matrix([[e], [g]])
system2 = (A, B)
sol = FiniteSet(((-b*g + d*e)/(a*d - b*c), (a*g - c*e)/(a*d - b*c)))
assert linsolve(system2, [x, y]) == sol
# No solution
A = Matrix([[1, 2, 3], [2, 4, 6], [3, 6, 9]])
B = Matrix([0, 0, 1])
assert linsolve((A, B), (x, y, z)) == EmptySet()
# Issue #10056
A, B, J1, J2 = symbols('A B J1 J2')
Augmatrix = Matrix([
[2*I*J1, 2*I*J2, -2/J1],
[-2*I*J2, -2*I*J1, 2/J2],
[0, 2, 2*I/(J1*J2)],
[2, 0, 0],
])
assert linsolve(Augmatrix, A, B) == FiniteSet((0, I/(J1*J2)))
# Issue #10121 - Assignment of free variables
Augmatrix = Matrix([[0, 1, 0, 0, 0, 0], [0, 0, 0, 1, 0, 0]])
assert linsolve(Augmatrix, a, b, c, d, e) == FiniteSet((a, 0, c, 0, e))
raises(IndexError, lambda: linsolve(Augmatrix, a, b, c))
x0, x1, x2, _x0 = symbols('tau0 tau1 tau2 _tau0')
assert linsolve(Matrix([[0, 1, 0, 0, 0, 0], [0, 0, 0, 1, 0, _x0]])
) == FiniteSet((x0, 0, x1, _x0, x2))
x0, x1, x2, _x0 = symbols('_tau0 _tau1 _tau2 tau0')
assert linsolve(Matrix([[0, 1, 0, 0, 0, 0], [0, 0, 0, 1, 0, _x0]])
) == FiniteSet((x0, 0, x1, _x0, x2))
x0, x1, x2, _x0 = symbols('_tau0 _tau1 _tau2 tau1')
assert linsolve(Matrix([[0, 1, 0, 0, 0, 0], [0, 0, 0, 1, 0, _x0]])
) == FiniteSet((x0, 0, x1, _x0, x2))
# symbols can be given as generators
x0, x2, x4 = symbols('x0, x2, x4')
assert linsolve(Augmatrix, numbered_symbols('x')
) == FiniteSet((x0, 0, x2, 0, x4))
Augmatrix[-1, -1] = x0
# use Dummy to avoid clash; the names may clash but the symbols
# will not
Augmatrix[-1, -1] = symbols('_x0')
assert len(linsolve(
Augmatrix, numbered_symbols('x', cls=Dummy)).free_symbols) == 4
# Issue #12604
f = Function('f')
assert linsolve([f(x) - 5], f(x)) == FiniteSet((5,))
# Issue #14860
from sympy.physics.units import meter, newton, kilo
Eqns = [8*kilo*newton + x + y, 28*kilo*newton*meter + 3*x*meter]
assert linsolve(Eqns, x, y) == {(newton*Rational(-28000, 3), newton*Rational(4000, 3))}
# linsolve fully expands expressions, so removable singularities
# and other nonlinearity does not raise an error
assert linsolve([Eq(x, x + y)], [x, y]) == {(x, 0)}
assert linsolve([Eq(1/x, 1/x + y)], [x, y]) == {(x, 0)}
assert linsolve([Eq(y/x, y/x + y)], [x, y]) == {(x, 0)}
assert linsolve([Eq(x*(x + 1), x**2 + y)], [x, y]) == {(y, y)}
def test_linsolve_immutable():
A = ImmutableDenseMatrix([[1, 1, 2], [0, 1, 2], [0, 0, 1]])
B = ImmutableDenseMatrix([2, 1, -1])
assert linsolve([A, B], (x, y, z)) == FiniteSet((1, 3, -1))
A = ImmutableDenseMatrix([[1, 1, 7], [1, -1, 3]])
assert linsolve(A) == FiniteSet((5, 2))
def test_solve_decomposition():
n = Dummy('n')
f1 = exp(3*x) - 6*exp(2*x) + 11*exp(x) - 6
f2 = sin(x)**2 - 2*sin(x) + 1
f3 = sin(x)**2 - sin(x)
f4 = sin(x + 1)
f5 = exp(x + 2) - 1
f6 = 1/log(x)
f7 = 1/x
s1 = ImageSet(Lambda(n, 2*n*pi), S.Integers)
s2 = ImageSet(Lambda(n, 2*n*pi + pi), S.Integers)
s3 = ImageSet(Lambda(n, 2*n*pi + pi/2), S.Integers)
s4 = ImageSet(Lambda(n, 2*n*pi - 1), S.Integers)
s5 = ImageSet(Lambda(n, 2*n*pi - 1 + pi), S.Integers)
assert solve_decomposition(f1, x, S.Reals) == FiniteSet(0, log(2), log(3))
assert dumeq(solve_decomposition(f2, x, S.Reals), s3)
assert dumeq(solve_decomposition(f3, x, S.Reals), Union(s1, s2, s3))
assert dumeq(solve_decomposition(f4, x, S.Reals), Union(s4, s5))
assert solve_decomposition(f5, x, S.Reals) == FiniteSet(-2)
assert solve_decomposition(f6, x, S.Reals) == S.EmptySet
assert solve_decomposition(f7, x, S.Reals) == S.EmptySet
assert solve_decomposition(x, x, Interval(1, 2)) == S.EmptySet
# nonlinsolve testcases
def test_nonlinsolve_basic():
assert nonlinsolve([],[]) == S.EmptySet
assert nonlinsolve([],[x, y]) == S.EmptySet
system = [x, y - x - 5]
assert nonlinsolve([x],[x, y]) == FiniteSet((0, y))
assert nonlinsolve(system, [y]) == FiniteSet((x + 5,))
soln = (ImageSet(Lambda(n, 2*n*pi + pi/2), S.Integers),)
assert dumeq(nonlinsolve([sin(x) - 1], [x]), FiniteSet(tuple(soln)))
assert nonlinsolve([x**2 - 1], [x]) == FiniteSet((-1,), (1,))
soln = FiniteSet((y, y))
assert nonlinsolve([x - y, 0], x, y) == soln
assert nonlinsolve([0, x - y], x, y) == soln
assert nonlinsolve([x - y, x - y], x, y) == soln
assert nonlinsolve([x, 0], x, y) == FiniteSet((0, y))
f = Function('f')
assert nonlinsolve([f(x), 0], f(x), y) == FiniteSet((0, y))
assert nonlinsolve([f(x), 0], f(x), f(y)) == FiniteSet((0, f(y)))
A = Indexed('A', x)
assert nonlinsolve([A, 0], A, y) == FiniteSet((0, y))
assert nonlinsolve([x**2 -1], [sin(x)]) == FiniteSet((S.EmptySet,))
assert nonlinsolve([x**2 -1], sin(x)) == FiniteSet((S.EmptySet,))
assert nonlinsolve([x**2 -1], 1) == FiniteSet((x**2,))
assert nonlinsolve([x**2 -1], x + y) == FiniteSet((S.EmptySet,))
def test_nonlinsolve_abs():
soln = FiniteSet((x, Abs(x)))
assert nonlinsolve([Abs(x) - y], x, y) == soln
def test_raise_exception_nonlinsolve():
raises(IndexError, lambda: nonlinsolve([x**2 -1], []))
raises(ValueError, lambda: nonlinsolve([x**2 -1]))
raises(NotImplementedError, lambda: nonlinsolve([(x+y)**2 - 9, x**2 - y**2 - 0.75], (x, y)))
def test_trig_system():
# TODO: add more simple testcases when solveset returns
# simplified soln for Trig eq
assert nonlinsolve([sin(x) - 1, cos(x) -1 ], x) == S.EmptySet
soln1 = (ImageSet(Lambda(n, 2*n*pi + pi/2), S.Integers),)
soln = FiniteSet(soln1)
assert dumeq(nonlinsolve([sin(x) - 1, cos(x)], x), soln)
@XFAIL
def test_trig_system_fail():
# fails because solveset trig solver is not much smart.
sys = [x + y - pi/2, sin(x) + sin(y) - 1]
# solveset returns conditionset for sin(x) + sin(y) - 1
soln_1 = (ImageSet(Lambda(n, n*pi + pi/2), S.Integers),
ImageSet(Lambda(n, n*pi)), S.Integers)
soln_1 = FiniteSet(soln_1)
soln_2 = (ImageSet(Lambda(n, n*pi), S.Integers),
ImageSet(Lambda(n, n*pi+ pi/2), S.Integers))
soln_2 = FiniteSet(soln_2)
soln = soln_1 + soln_2
assert dumeq(nonlinsolve(sys, [x, y]), soln)
# Add more cases from here
# http://www.vitutor.com/geometry/trigonometry/equations_systems.html#uno
sys = [sin(x) + sin(y) - (sqrt(3)+1)/2, sin(x) - sin(y) - (sqrt(3) - 1)/2]
soln_x = Union(ImageSet(Lambda(n, 2*n*pi + pi/3), S.Integers),
ImageSet(Lambda(n, 2*n*pi + pi*Rational(2, 3)), S.Integers))
soln_y = Union(ImageSet(Lambda(n, 2*n*pi + pi/6), S.Integers),
ImageSet(Lambda(n, 2*n*pi + pi*Rational(5, 6)), S.Integers))
assert dumeq(nonlinsolve(sys, [x, y]), FiniteSet((soln_x, soln_y)))
def test_nonlinsolve_positive_dimensional():
x, y, z, a, b, c, d = symbols('x, y, z, a, b, c, d', extended_real=True)
assert nonlinsolve([x*y, x*y - x], [x, y]) == FiniteSet((0, y))
system = [a**2 + a*c, a - b]
assert nonlinsolve(system, [a, b]) == FiniteSet((0, 0), (-c, -c))
# here (a= 0, b = 0) is independent soln so both is printed.
# if symbols = [a, b, c] then only {a : -c ,b : -c}
eq1 = a + b + c + d
eq2 = a*b + b*c + c*d + d*a
eq3 = a*b*c + b*c*d + c*d*a + d*a*b
eq4 = a*b*c*d - 1
system = [eq1, eq2, eq3, eq4]
sol1 = (-1/d, -d, 1/d, FiniteSet(d) - FiniteSet(0))
sol2 = (1/d, -d, -1/d, FiniteSet(d) - FiniteSet(0))
soln = FiniteSet(sol1, sol2)
assert nonlinsolve(system, [a, b, c, d]) == soln
def test_nonlinsolve_polysys():
x, y, z = symbols('x, y, z', real=True)
assert nonlinsolve([x**2 + y - 2, x**2 + y], [x, y]) == S.EmptySet
s = (-y + 2, y)
assert nonlinsolve([(x + y)**2 - 4, x + y - 2], [x, y]) == FiniteSet(s)
system = [x**2 - y**2]
soln_real = FiniteSet((-y, y), (y, y))
soln_complex = FiniteSet((-Abs(y), y), (Abs(y), y))
soln =soln_real + soln_complex
assert nonlinsolve(system, [x, y]) == soln
system = [x**2 - y**2]
soln_real= FiniteSet((y, -y), (y, y))
soln_complex = FiniteSet((y, -Abs(y)), (y, Abs(y)))
soln = soln_real + soln_complex
assert nonlinsolve(system, [y, x]) == soln
system = [x**2 + y - 3, x - y - 4]
assert nonlinsolve(system, (x, y)) != nonlinsolve(system, (y, x))
def test_nonlinsolve_using_substitution():
x, y, z, n = symbols('x, y, z, n', real = True)
system = [(x + y)*n - y**2 + 2]
s_x = (n*y - y**2 + 2)/n
soln = (-s_x, y)
assert nonlinsolve(system, [x, y]) == FiniteSet(soln)
system = [z**2*x**2 - z**2*y**2/exp(x)]
soln_real_1 = (y, x, 0)
soln_real_2 = (-exp(x/2)*Abs(x), x, z)
soln_real_3 = (exp(x/2)*Abs(x), x, z)
soln_complex_1 = (-x*exp(x/2), x, z)
soln_complex_2 = (x*exp(x/2), x, z)
syms = [y, x, z]
soln = FiniteSet(soln_real_1, soln_complex_1, soln_complex_2,\
soln_real_2, soln_real_3)
assert nonlinsolve(system,syms) == soln
def test_nonlinsolve_complex():
n = Dummy('n')
assert dumeq(nonlinsolve([exp(x) - sin(y), 1/y - 3], [x, y]), {
(ImageSet(Lambda(n, 2*n*I*pi + log(sin(Rational(1, 3)))), S.Integers), Rational(1, 3))})
system = [exp(x) - sin(y), 1/exp(y) - 3]
assert dumeq(nonlinsolve(system, [x, y]), {
(ImageSet(Lambda(n, I*(2*n*pi + pi)
+ log(sin(log(3)))), S.Integers), -log(3)),
(ImageSet(Lambda(n, I*(2*n*pi + arg(sin(2*n*I*pi - log(3))))
+ log(Abs(sin(2*n*I*pi - log(3))))), S.Integers),
ImageSet(Lambda(n, 2*n*I*pi - log(3)), S.Integers))})
system = [exp(x) - sin(y), y**2 - 4]
assert dumeq(nonlinsolve(system, [x, y]), {
(ImageSet(Lambda(n, I*(2*n*pi + pi) + log(sin(2))), S.Integers), -2),
(ImageSet(Lambda(n, 2*n*I*pi + log(sin(2))), S.Integers), 2)})
@XFAIL
def test_solve_nonlinear_trans():
# After the transcendental equation solver these will work
x, y, z = symbols('x, y, z', real=True)
soln1 = FiniteSet((2*LambertW(y/2), y))
soln2 = FiniteSet((-x*sqrt(exp(x)), y), (x*sqrt(exp(x)), y))
soln3 = FiniteSet((x*exp(x/2), x))
soln4 = FiniteSet(2*LambertW(y/2), y)
assert nonlinsolve([x**2 - y**2/exp(x)], [x, y]) == soln1
assert nonlinsolve([x**2 - y**2/exp(x)], [y, x]) == soln2
assert nonlinsolve([x**2 - y**2/exp(x)], [y, x]) == soln3
assert nonlinsolve([x**2 - y**2/exp(x)], [x, y]) == soln4
def test_issue_5132_1():
system = [sqrt(x**2 + y**2) - sqrt(10), x + y - 4]
assert nonlinsolve(system, [x, y]) == FiniteSet((1, 3), (3, 1))
n = Dummy('n')
eqs = [exp(x)**2 - sin(y) + z**2, 1/exp(y) - 3]
s_real_y = -log(3)
s_real_z = sqrt(-exp(2*x) - sin(log(3)))
soln_real = FiniteSet((s_real_y, s_real_z), (s_real_y, -s_real_z))
lam = Lambda(n, 2*n*I*pi + -log(3))
s_complex_y = ImageSet(lam, S.Integers)
lam = Lambda(n, sqrt(-exp(2*x) + sin(2*n*I*pi + -log(3))))
s_complex_z_1 = ImageSet(lam, S.Integers)
lam = Lambda(n, -sqrt(-exp(2*x) + sin(2*n*I*pi + -log(3))))
s_complex_z_2 = ImageSet(lam, S.Integers)
soln_complex = FiniteSet(
(s_complex_y, s_complex_z_1),
(s_complex_y, s_complex_z_2)
)
soln = soln_real + soln_complex
assert dumeq(nonlinsolve(eqs, [y, z]), soln)
def test_issue_5132_2():
x, y = symbols('x, y', real=True)
eqs = [exp(x)**2 - sin(y) + z**2, 1/exp(y) - 3]
n = Dummy('n')
soln_real = (log(-z**2 + sin(y))/2, z)
lam = Lambda( n, I*(2*n*pi + arg(-z**2 + sin(y)))/2 + log(Abs(z**2 - sin(y)))/2)
img = ImageSet(lam, S.Integers)
# not sure about the complex soln. But it looks correct.
soln_complex = (img, z)
soln = FiniteSet(soln_real, soln_complex)
assert dumeq(nonlinsolve(eqs, [x, z]), soln)
system = [r - x**2 - y**2, tan(t) - y/x]
s_x = sqrt(r/(tan(t)**2 + 1))
s_y = sqrt(r/(tan(t)**2 + 1))*tan(t)
soln = FiniteSet((s_x, s_y), (-s_x, -s_y))
assert nonlinsolve(system, [x, y]) == soln
def test_issue_6752():
a,b,c,d = symbols('a, b, c, d', real=True)
assert nonlinsolve([a**2 + a, a - b], [a, b]) == {(-1, -1), (0, 0)}
@SKIP("slow")
def test_issue_5114_solveset():
# slow testcase
from sympy.abc import d, e, f, g, h, i, j, k, l, o, p, q, r
# there is no 'a' in the equation set but this is how the
# problem was originally posed
syms = [a, b, c, f, h, k, n]
eqs = [b + r/d - c/d,
c*(1/d + 1/e + 1/g) - f/g - r/d,
f*(1/g + 1/i + 1/j) - c/g - h/i,
h*(1/i + 1/l + 1/m) - f/i - k/m,
k*(1/m + 1/o + 1/p) - h/m - n/p,
n*(1/p + 1/q) - k/p]
assert len(nonlinsolve(eqs, syms)) == 1
@SKIP("Hangs")
def _test_issue_5335():
# Not able to check zero dimensional system.
# is_zero_dimensional Hangs
lam, a0, conc = symbols('lam a0 conc')
eqs = [lam + 2*y - a0*(1 - x/2)*x - 0.005*x/2*x,
a0*(1 - x/2)*x - 1*y - 0.743436700916726*y,
x + y - conc]
sym = [x, y, a0]
# there are 4 solutions but only two are valid
assert len(nonlinsolve(eqs, sym)) == 2
# float
eqs = [lam + 2*y - a0*(1 - x/2)*x - 0.005*x/2*x,
a0*(1 - x/2)*x - 1*y - 0.743436700916726*y,
x + y - conc]
sym = [x, y, a0]
assert len(nonlinsolve(eqs, sym)) == 2
def test_issue_2777():
# the equations represent two circles
x, y = symbols('x y', real=True)
e1, e2 = sqrt(x**2 + y**2) - 10, sqrt(y**2 + (-x + 10)**2) - 3
a, b = Rational(191, 20), 3*sqrt(391)/20
ans = {(a, -b), (a, b)}
assert nonlinsolve((e1, e2), (x, y)) == ans
assert nonlinsolve((e1, e2/(x - a)), (x, y)) == S.EmptySet
# make the 2nd circle's radius be -3
e2 += 6
assert nonlinsolve((e1, e2), (x, y)) == S.EmptySet
def test_issue_8828():
x1 = 0
y1 = -620
r1 = 920
x2 = 126
y2 = 276
x3 = 51
y3 = 205
r3 = 104
v = [x, y, z]
f1 = (x - x1)**2 + (y - y1)**2 - (r1 - z)**2
f2 = (x2 - x)**2 + (y2 - y)**2 - z**2
f3 = (x - x3)**2 + (y - y3)**2 - (r3 - z)**2
F = [f1, f2, f3]
g1 = sqrt((x - x1)**2 + (y - y1)**2) + z - r1
g2 = f2
g3 = sqrt((x - x3)**2 + (y - y3)**2) + z - r3
G = [g1, g2, g3]
# both soln same
A = nonlinsolve(F, v)
B = nonlinsolve(G, v)
assert A == B
def test_nonlinsolve_conditionset():
# when solveset failed to solve all the eq
# return conditionset
f = Function('f')
f1 = f(x) - pi/2
f2 = f(y) - pi*Rational(3, 2)
intermediate_system = Eq(2*f(x) - pi, 0) & Eq(2*f(y) - 3*pi, 0)
symbols = Tuple(x, y)
soln = ConditionSet(
symbols,
intermediate_system,
S.Complexes**2)
assert nonlinsolve([f1, f2], [x, y]) == soln
def test_substitution_basic():
assert substitution([], [x, y]) == S.EmptySet
assert substitution([], []) == S.EmptySet
system = [2*x**2 + 3*y**2 - 30, 3*x**2 - 2*y**2 - 19]
soln = FiniteSet((-3, -2), (-3, 2), (3, -2), (3, 2))
assert substitution(system, [x, y]) == soln
soln = FiniteSet((-1, 1))
assert substitution([x + y], [x], [{y: 1}], [y], set([]), [x, y]) == soln
assert substitution(
[x + y], [x], [{y: 1}], [y],
set([x + 1]), [y, x]) == S.EmptySet
def test_issue_5132_substitution():
x, y, z, r, t = symbols('x, y, z, r, t', real=True)
system = [r - x**2 - y**2, tan(t) - y/x]
s_x_1 = Complement(FiniteSet(-sqrt(r/(tan(t)**2 + 1))), FiniteSet(0))
s_x_2 = Complement(FiniteSet(sqrt(r/(tan(t)**2 + 1))), FiniteSet(0))
s_y = sqrt(r/(tan(t)**2 + 1))*tan(t)
soln = FiniteSet((s_x_2, s_y)) + FiniteSet((s_x_1, -s_y))
assert substitution(system, [x, y]) == soln
n = Dummy('n')
eqs = [exp(x)**2 - sin(y) + z**2, 1/exp(y) - 3]
s_real_y = -log(3)
s_real_z = sqrt(-exp(2*x) - sin(log(3)))
soln_real = FiniteSet((s_real_y, s_real_z), (s_real_y, -s_real_z))
lam = Lambda(n, 2*n*I*pi + -log(3))
s_complex_y = ImageSet(lam, S.Integers)
lam = Lambda(n, sqrt(-exp(2*x) + sin(2*n*I*pi + -log(3))))
s_complex_z_1 = ImageSet(lam, S.Integers)
lam = Lambda(n, -sqrt(-exp(2*x) + sin(2*n*I*pi + -log(3))))
s_complex_z_2 = ImageSet(lam, S.Integers)
soln_complex = FiniteSet(
(s_complex_y, s_complex_z_1),
(s_complex_y, s_complex_z_2))
soln = soln_real + soln_complex
assert dumeq(substitution(eqs, [y, z]), soln)
def test_raises_substitution():
raises(ValueError, lambda: substitution([x**2 -1], []))
raises(TypeError, lambda: substitution([x**2 -1]))
raises(ValueError, lambda: substitution([x**2 -1], [sin(x)]))
raises(TypeError, lambda: substitution([x**2 -1], x))
raises(TypeError, lambda: substitution([x**2 -1], 1))
# end of tests for nonlinsolve
def test_issue_9556():
b = Symbol('b', positive=True)
assert solveset(Abs(x) + 1, x, S.Reals) == EmptySet()
assert solveset(Abs(x) + b, x, S.Reals) == EmptySet()
assert solveset(Eq(b, -1), b, S.Reals) == EmptySet()
def test_issue_9611():
assert solveset(Eq(x - x + a, a), x, S.Reals) == S.Reals
assert solveset(Eq(y - y + a, a), y) == S.Complexes
def test_issue_9557():
assert solveset(x**2 + a, x, S.Reals) == Intersection(S.Reals,
FiniteSet(-sqrt(-a), sqrt(-a)))
def test_issue_9778():
x = Symbol('x', real=True)
y = Symbol('y', real=True)
assert solveset(x**3 + 1, x, S.Reals) == FiniteSet(-1)
assert solveset(x**Rational(3, 5) + 1, x, S.Reals) == S.EmptySet
assert solveset(x**3 + y, x, S.Reals) == \
FiniteSet(-Abs(y)**Rational(1, 3)*sign(y))
def test_issue_10214():
assert solveset(x**Rational(3, 2) + 4, x, S.Reals) == S.EmptySet
assert solveset(x**(Rational(-3, 2)) + 4, x, S.Reals) == S.EmptySet
ans = FiniteSet(-2**Rational(2, 3))
assert solveset(x**(S(3)) + 4, x, S.Reals) == ans
assert (x**(S(3)) + 4).subs(x,list(ans)[0]) == 0 # substituting ans and verifying the result.
assert (x**(S(3)) + 4).subs(x,-(-2)**Rational(2, 3)) == 0
def test_issue_9849():
assert solveset(Abs(sin(x)) + 1, x, S.Reals) == S.EmptySet
def test_issue_9953():
assert linsolve([ ], x) == S.EmptySet
def test_issue_9913():
assert solveset(2*x + 1/(x - 10)**2, x, S.Reals) == \
FiniteSet(-(3*sqrt(24081)/4 + Rational(4027, 4))**Rational(1, 3)/3 - 100/
(3*(3*sqrt(24081)/4 + Rational(4027, 4))**Rational(1, 3)) + Rational(20, 3))
def test_issue_10397():
assert solveset(sqrt(x), x, S.Complexes) == FiniteSet(0)
def test_issue_14987():
raises(ValueError, lambda: linear_eq_to_matrix(
[x**2], x))
raises(ValueError, lambda: linear_eq_to_matrix(
[x*(-3/x + 1) + 2*y - a], [x, y]))
raises(ValueError, lambda: linear_eq_to_matrix(
[(x**2 - 3*x)/(x - 3) - 3], x))
raises(ValueError, lambda: linear_eq_to_matrix(
[(x + 1)**3 - x**3 - 3*x**2 + 7], x))
raises(ValueError, lambda: linear_eq_to_matrix(
[x*(1/x + 1) + y], [x, y]))
raises(ValueError, lambda: linear_eq_to_matrix(
[(x + 1)*y], [x, y]))
raises(ValueError, lambda: linear_eq_to_matrix(
[Eq(1/x, 1/x + y)], [x, y]))
raises(ValueError, lambda: linear_eq_to_matrix(
[Eq(y/x, y/x + y)], [x, y]))
raises(ValueError, lambda: linear_eq_to_matrix(
[Eq(x*(x + 1), x**2 + y)], [x, y]))
def test_simplification():
eq = x + (a - b)/(-2*a + 2*b)
assert solveset(eq, x) == FiniteSet(S.Half)
assert solveset(eq, x, S.Reals) == Intersection({-((a - b)/(-2*a + 2*b))}, S.Reals)
# So that ap - bn is not zero:
ap = Symbol('ap', positive=True)
bn = Symbol('bn', negative=True)
eq = x + (ap - bn)/(-2*ap + 2*bn)
assert solveset(eq, x) == FiniteSet(S.Half)
assert solveset(eq, x, S.Reals) == FiniteSet(S.Half)
def test_issue_10555():
f = Function('f')
g = Function('g')
assert solveset(f(x) - pi/2, x, S.Reals).dummy_eq(
ConditionSet(x, Eq(f(x) - pi/2, 0), S.Reals))
assert solveset(f(g(x)) - pi/2, g(x), S.Reals).dummy_eq(
ConditionSet(g(x), Eq(f(g(x)) - pi/2, 0), S.Reals))
def test_issue_8715():
eq = x + 1/x > -2 + 1/x
assert solveset(eq, x, S.Reals) == \
(Interval.open(-2, oo) - FiniteSet(0))
assert solveset(eq.subs(x,log(x)), x, S.Reals) == \
Interval.open(exp(-2), oo) - FiniteSet(1)
def test_issue_11174():
eq = z**2 + exp(2*x) - sin(y)
soln = Intersection(S.Reals, FiniteSet(log(-z**2 + sin(y))/2))
assert solveset(eq, x, S.Reals) == soln
eq = sqrt(r)*Abs(tan(t))/sqrt(tan(t)**2 + 1) + x*tan(t)
s = -sqrt(r)*Abs(tan(t))/(sqrt(tan(t)**2 + 1)*tan(t))
soln = Intersection(S.Reals, FiniteSet(s))
assert solveset(eq, x, S.Reals) == soln
def test_issue_11534():
# eq and eq2 should give the same solution as a Complement
x = Symbol('x', real=True)
y = Symbol('y', real=True)
eq = -y + x/sqrt(-x**2 + 1)
eq2 = -y**2 + x**2/(-x**2 + 1)
soln = Complement(FiniteSet(-y/sqrt(y**2 + 1), y/sqrt(y**2 + 1)), FiniteSet(-1, 1))
assert solveset(eq, x, S.Reals) == soln
assert solveset(eq2, x, S.Reals) == soln
def test_issue_10477():
assert solveset((x**2 + 4*x - 3)/x < 2, x, S.Reals) == \
Union(Interval.open(-oo, -3), Interval.open(0, 1))
def test_issue_10671():
assert solveset(sin(y), y, Interval(0, pi)) == FiniteSet(0, pi)
i = Interval(1, 10)
assert solveset((1/x).diff(x) < 0, x, i) == i
def test_issue_11064():
eq = x + sqrt(x**2 - 5)
assert solveset(eq > 0, x, S.Reals) == \
Interval(sqrt(5), oo)
assert solveset(eq < 0, x, S.Reals) == \
Interval(-oo, -sqrt(5))
assert solveset(eq > sqrt(5), x, S.Reals) == \
Interval.Lopen(sqrt(5), oo)
def test_issue_12478():
eq = sqrt(x - 2) + 2
soln = solveset_real(eq, x)
assert soln is S.EmptySet
assert solveset(eq < 0, x, S.Reals) is S.EmptySet
assert solveset(eq > 0, x, S.Reals) == Interval(2, oo)
def test_issue_12429():
eq = solveset(log(x)/x <= 0, x, S.Reals)
sol = Interval.Lopen(0, 1)
assert eq == sol
def test_solveset_arg():
assert solveset(arg(x), x, S.Reals) == Interval.open(0, oo)
assert solveset(arg(4*x -3), x) == Interval.open(Rational(3, 4), oo)
def test__is_finite_with_finite_vars():
f = _is_finite_with_finite_vars
# issue 12482
assert all(f(1/x) is None for x in (
Dummy(), Dummy(real=True), Dummy(complex=True)))
assert f(1/Dummy(real=False)) is True # b/c it's finite but not 0
def test_issue_13550():
assert solveset(x**2 - 2*x - 15, symbol = x, domain = Interval(-oo, 0)) == FiniteSet(-3)
def test_issue_13849():
assert nonlinsolve((t*(sqrt(5) + sqrt(2)) - sqrt(2), t), t) == EmptySet()
def test_issue_14223():
assert solveset((Abs(x + Min(x, 2)) - 2).rewrite(Piecewise), x,
S.Reals) == FiniteSet(-1, 1)
assert solveset((Abs(x + Min(x, 2)) - 2).rewrite(Piecewise), x,
Interval(0, 2)) == FiniteSet(1)
def test_issue_10158():
dom = S.Reals
assert solveset(x*Max(x, 15) - 10, x, dom) == FiniteSet(Rational(2, 3))
assert solveset(x*Min(x, 15) - 10, x, dom) == FiniteSet(-sqrt(10), sqrt(10))
assert solveset(Max(Abs(x - 3) - 1, x + 2) - 3, x, dom) == FiniteSet(-1, 1)
assert solveset(Abs(x - 1) - Abs(y), x, dom) == FiniteSet(-Abs(y) + 1, Abs(y) + 1)
assert solveset(Abs(x + 4*Abs(x + 1)), x, dom) == FiniteSet(Rational(-4, 3), Rational(-4, 5))
assert solveset(2*Abs(x + Abs(x + Max(3, x))) - 2, x, S.Reals) == FiniteSet(-1, -2)
dom = S.Complexes
raises(ValueError, lambda: solveset(x*Max(x, 15) - 10, x, dom))
raises(ValueError, lambda: solveset(x*Min(x, 15) - 10, x, dom))
raises(ValueError, lambda: solveset(Max(Abs(x - 3) - 1, x + 2) - 3, x, dom))
raises(ValueError, lambda: solveset(Abs(x - 1) - Abs(y), x, dom))
raises(ValueError, lambda: solveset(Abs(x + 4*Abs(x + 1)), x, dom))
def test_issue_14300():
f = 1 - exp(-18000000*x) - y
a1 = FiniteSet(-log(-y + 1)/18000000)
assert solveset(f, x, S.Reals) == \
Intersection(S.Reals, a1)
assert dumeq(solveset(f, x),
ImageSet(Lambda(n, -I*(2*n*pi + arg(-y + 1))/18000000 -
log(Abs(y - 1))/18000000), S.Integers))
def test_issue_14454():
number = CRootOf(x**4 + x - 1, 2)
raises(ValueError, lambda: invert_real(number, 0, x, S.Reals))
assert invert_real(x**2, number, x, S.Reals) # no error
def test_issue_17882():
assert solveset(-8*x**2/(9*(x**2 - 1)**(S(4)/3)) + 4/(3*(x**2 - 1)**(S(1)/3)), x, S.Complexes) == \
FiniteSet(sqrt(3), -sqrt(3))
def test_term_factors():
assert list(_term_factors(3**x - 2)) == [-2, 3**x]
expr = 4**(x + 1) + 4**(x + 2) + 4**(x - 1) - 3**(x + 2) - 3**(x + 3)
assert set(_term_factors(expr)) == set([
3**(x + 2), 4**(x + 2), 3**(x + 3), 4**(x - 1), -1, 4**(x + 1)])
#################### tests for transolve and its helpers ###############
def test_transolve():
assert _transolve(3**x, x, S.Reals) == S.EmptySet
assert _transolve(3**x - 9**(x + 5), x, S.Reals) == FiniteSet(-10)
# exponential tests
def test_exponential_real():
from sympy.abc import x, y, z
e1 = 3**(2*x) - 2**(x + 3)
e2 = 4**(5 - 9*x) - 8**(2 - x)
e3 = 2**x + 4**x
e4 = exp(log(5)*x) - 2**x
e5 = exp(x/y)*exp(-z/y) - 2
e6 = 5**(x/2) - 2**(x/3)
e7 = 4**(x + 1) + 4**(x + 2) + 4**(x - 1) - 3**(x + 2) - 3**(x + 3)
e8 = -9*exp(-2*x + 5) + 4*exp(3*x + 1)
e9 = 2**x + 4**x + 8**x - 84
assert solveset(e1, x, S.Reals) == FiniteSet(
-3*log(2)/(-2*log(3) + log(2)))
assert solveset(e2, x, S.Reals) == FiniteSet(Rational(4, 15))
assert solveset(e3, x, S.Reals) == S.EmptySet
assert solveset(e4, x, S.Reals) == FiniteSet(0)
assert solveset(e5, x, S.Reals) == Intersection(
S.Reals, FiniteSet(y*log(2*exp(z/y))))
assert solveset(e6, x, S.Reals) == FiniteSet(0)
assert solveset(e7, x, S.Reals) == FiniteSet(2)
assert solveset(e8, x, S.Reals) == FiniteSet(-2*log(2)/5 + 2*log(3)/5 + Rational(4, 5))
assert solveset(e9, x, S.Reals) == FiniteSet(2)
assert solveset_real(-9*exp(-2*x + 5) + 2**(x + 1), x) == FiniteSet(
-((-5 - 2*log(3) + log(2))/(log(2) + 2)))
assert solveset_real(4**(x/2) - 2**(x/3), x) == FiniteSet(0)
b = sqrt(6)*sqrt(log(2))/sqrt(log(5))
assert solveset_real(5**(x/2) - 2**(3/x), x) == FiniteSet(-b, b)
# coverage test
C1, C2 = symbols('C1 C2')
f = Function('f')
assert solveset_real(C1 + C2/x**2 - exp(-f(x)), f(x)) == Intersection(
S.Reals, FiniteSet(-log(C1 + C2/x**2)))
y = symbols('y', positive=True)
assert solveset_real(x**2 - y**2/exp(x), y) == Intersection(
S.Reals, FiniteSet(-sqrt(x**2*exp(x)), sqrt(x**2*exp(x))))
p = Symbol('p', positive=True)
assert solveset_real((1/p + 1)**(p + 1), p).dummy_eq(
ConditionSet(x, Eq((1 + 1/x)**(x + 1), 0), S.Reals))
@XFAIL
def test_exponential_complex():
from sympy.abc import x
from sympy import Dummy
n = Dummy('n')
assert dumeq(solveset_complex(2**x + 4**x, x),imageset(
Lambda(n, I*(2*n*pi + pi)/log(2)), S.Integers))
assert solveset_complex(x**z*y**z - 2, z) == FiniteSet(
log(2)/(log(x) + log(y)))
assert dumeq(solveset_complex(4**(x/2) - 2**(x/3), x), imageset(
Lambda(n, 3*n*I*pi/log(2)), S.Integers))
assert dumeq(solveset(2**x + 32, x), imageset(
Lambda(n, (I*(2*n*pi + pi) + 5*log(2))/log(2)), S.Integers))
eq = (2**exp(y**2/x) + 2)/(x**2 + 15)
a = sqrt(x)*sqrt(-log(log(2)) + log(log(2) + 2*n*I*pi))
assert solveset_complex(eq, y) == FiniteSet(-a, a)
union1 = imageset(Lambda(n, I*(2*n*pi - pi*Rational(2, 3))/log(2)), S.Integers)
union2 = imageset(Lambda(n, I*(2*n*pi + pi*Rational(2, 3))/log(2)), S.Integers)
assert dumeq(solveset(2**x + 4**x + 8**x, x), Union(union1, union2))
eq = 4**(x + 1) + 4**(x + 2) + 4**(x - 1) - 3**(x + 2) - 3**(x + 3)
res = solveset(eq, x)
num = 2*n*I*pi - 4*log(2) + 2*log(3)
den = -2*log(2) + log(3)
ans = imageset(Lambda(n, num/den), S.Integers)
assert dumeq(res, ans)
def test_expo_conditionset():
f1 = (exp(x) + 1)**x - 2
f2 = (x + 2)**y*x - 3
f3 = 2**x - exp(x) - 3
f4 = log(x) - exp(x)
f5 = 2**x + 3**x - 5**x
assert solveset(f1, x, S.Reals).dummy_eq(ConditionSet(
x, Eq((exp(x) + 1)**x - 2, 0), S.Reals))
assert solveset(f2, x, S.Reals).dummy_eq(ConditionSet(
x, Eq(x*(x + 2)**y - 3, 0), S.Reals))
assert solveset(f3, x, S.Reals).dummy_eq(ConditionSet(
x, Eq(2**x - exp(x) - 3, 0), S.Reals))
assert solveset(f4, x, S.Reals).dummy_eq(ConditionSet(
x, Eq(-exp(x) + log(x), 0), S.Reals))
assert solveset(f5, x, S.Reals).dummy_eq(ConditionSet(
x, Eq(2**x + 3**x - 5**x, 0), S.Reals))
def test_exponential_symbols():
x, y, z = symbols('x y z', positive=True)
assert solveset(z**x - y, x, S.Reals) == Intersection(
S.Reals, FiniteSet(log(y)/log(z)))
f1 = 2*x**w - 4*y**w
f2 = (x/y)**w - 2
sol1 = Intersection({log(2)/(log(x) - log(y))}, S.Reals)
sol2 = Intersection({log(2)/log(x/y)}, S.Reals)
assert solveset(f1, w, S.Reals) == sol1, solveset(f1, w, S.Reals)
assert solveset(f2, w, S.Reals) == sol2, solveset(f2, w, S.Reals)
assert solveset(x**x, x, Interval.Lopen(0,oo)).dummy_eq(
ConditionSet(w, Eq(w**w, 0), Interval.open(0, oo)))
assert solveset(x**y - 1, y, S.Reals) == FiniteSet(0)
assert solveset(exp(x/y)*exp(-z/y) - 2, y, S.Reals) == FiniteSet(
(x - z)/log(2)) - FiniteSet(0)
assert solveset(a**x - b**x, x).dummy_eq(ConditionSet(
w, Ne(a, 0) & Ne(b, 0), FiniteSet(0)))
def test_ignore_assumptions():
# make sure assumptions are ignored
xpos = symbols('x', positive=True)
x = symbols('x')
assert solveset_complex(xpos**2 - 4, xpos
) == solveset_complex(x**2 - 4, x)
@XFAIL
def test_issue_10864():
assert solveset(x**(y*z) - x, x, S.Reals) == FiniteSet(1)
@XFAIL
def test_solve_only_exp_2():
assert solveset_real(sqrt(exp(x)) + sqrt(exp(-x)) - 4, x) == \
FiniteSet(2*log(-sqrt(3) + 2), 2*log(sqrt(3) + 2))
def test_is_exponential():
assert _is_exponential(y, x) is False
assert _is_exponential(3**x - 2, x) is True
assert _is_exponential(5**x - 7**(2 - x), x) is True
assert _is_exponential(sin(2**x) - 4*x, x) is False
assert _is_exponential(x**y - z, y) is True
assert _is_exponential(x**y - z, x) is False
assert _is_exponential(2**x + 4**x - 1, x) is True
assert _is_exponential(x**(y*z) - x, x) is False
assert _is_exponential(x**(2*x) - 3**x, x) is False
assert _is_exponential(x**y - y*z, y) is False
assert _is_exponential(x**y - x*z, y) is True
def test_solve_exponential():
assert _solve_exponential(3**(2*x) - 2**(x + 3), 0, x, S.Reals) == \
FiniteSet(-3*log(2)/(-2*log(3) + log(2)))
assert _solve_exponential(2**y + 4**y, 1, y, S.Reals) == \
FiniteSet(log(Rational(-1, 2) + sqrt(5)/2)/log(2))
assert _solve_exponential(2**y + 4**y, 0, y, S.Reals) == \
S.EmptySet
assert _solve_exponential(2**x + 3**x - 5**x, 0, x, S.Reals) == \
ConditionSet(x, Eq(2**x + 3**x - 5**x, 0), S.Reals)
# end of exponential tests
# logarithmic tests
def test_logarithmic():
assert solveset_real(log(x - 3) + log(x + 3), x) == FiniteSet(
-sqrt(10), sqrt(10))
assert solveset_real(log(x + 1) - log(2*x - 1), x) == FiniteSet(2)
assert solveset_real(log(x + 3) + log(1 + 3/x) - 3, x) == FiniteSet(
-3 + sqrt(-12 + exp(3))*exp(Rational(3, 2))/2 + exp(3)/2,
-sqrt(-12 + exp(3))*exp(Rational(3, 2))/2 - 3 + exp(3)/2)
eq = z - log(x) + log(y/(x*(-1 + y**2/x**2)))
assert solveset_real(eq, x) == \
Intersection(S.Reals, FiniteSet(-sqrt(y**2 - y*exp(z)),
sqrt(y**2 - y*exp(z)))) - \
Intersection(S.Reals, FiniteSet(-sqrt(y**2), sqrt(y**2)))
assert solveset_real(
log(3*x) - log(-x + 1) - log(4*x + 1), x) == FiniteSet(Rational(-1, 2), S.Half)
assert solveset(log(x**y) - y*log(x), x, S.Reals) == S.Reals
@XFAIL
def test_uselogcombine_2():
eq = log(exp(2*x) + 1) + log(-tanh(x) + 1) - log(2)
assert solveset_real(eq, x) == EmptySet()
eq = log(8*x) - log(sqrt(x) + 1) - 2
assert solveset_real(eq, x) == EmptySet()
def test_is_logarithmic():
assert _is_logarithmic(y, x) is False
assert _is_logarithmic(log(x), x) is True
assert _is_logarithmic(log(x) - 3, x) is True
assert _is_logarithmic(log(x)*log(y), x) is True
assert _is_logarithmic(log(x)**2, x) is False
assert _is_logarithmic(log(x - 3) + log(x + 3), x) is True
assert _is_logarithmic(log(x**y) - y*log(x), x) is True
assert _is_logarithmic(sin(log(x)), x) is False
assert _is_logarithmic(x + y, x) is False
assert _is_logarithmic(log(3*x) - log(1 - x) + 4, x) is True
assert _is_logarithmic(log(x) + log(y) + x, x) is False
assert _is_logarithmic(log(log(x - 3)) + log(x - 3), x) is True
assert _is_logarithmic(log(log(3) + x) + log(x), x) is True
assert _is_logarithmic(log(x)*(y + 3) + log(x), y) is False
def test_solve_logarithm():
y = Symbol('y')
assert _solve_logarithm(log(x**y) - y*log(x), 0, x, S.Reals) == S.Reals
y = Symbol('y', positive=True)
assert _solve_logarithm(log(x)*log(y), 0, x, S.Reals) == FiniteSet(1)
# end of logarithmic tests
def test_linear_coeffs():
from sympy.solvers.solveset import linear_coeffs
assert linear_coeffs(0, x) == [0, 0]
assert all(i is S.Zero for i in linear_coeffs(0, x))
assert linear_coeffs(x + 2*y + 3, x, y) == [1, 2, 3]
assert linear_coeffs(x + 2*y + 3, y, x) == [2, 1, 3]
assert linear_coeffs(x + 2*x**2 + 3, x, x**2) == [1, 2, 3]
raises(ValueError, lambda:
linear_coeffs(x + 2*x**2 + x**3, x, x**2))
raises(ValueError, lambda:
linear_coeffs(1/x*(x - 1) + 1/x, x))
assert linear_coeffs(a*(x + y), x, y) == [a, a, 0]
assert linear_coeffs(1.0, x, y) == [0, 0, 1.0]
# modular tests
def test_is_modular():
assert _is_modular(y, x) is False
assert _is_modular(Mod(x, 3) - 1, x) is True
assert _is_modular(Mod(x**3 - 3*x**2 - x + 1, 3) - 1, x) is True
assert _is_modular(Mod(exp(x + y), 3) - 2, x) is True
assert _is_modular(Mod(exp(x + y), 3) - log(x), x) is True
assert _is_modular(Mod(x, 3) - 1, y) is False
assert _is_modular(Mod(x, 3)**2 - 5, x) is False
assert _is_modular(Mod(x, 3)**2 - y, x) is False
assert _is_modular(exp(Mod(x, 3)) - 1, x) is False
assert _is_modular(Mod(3, y) - 1, y) is False
def test_invert_modular():
n = Dummy('n', integer=True)
from sympy.solvers.solveset import _invert_modular as invert_modular
# non invertible cases
assert invert_modular(Mod(sin(x), 7), S(5), n, x) == (Mod(sin(x), 7), 5)
assert invert_modular(Mod(exp(x), 7), S(5), n, x) == (Mod(exp(x), 7), 5)
assert invert_modular(Mod(log(x), 7), S(5), n, x) == (Mod(log(x), 7), 5)
# a is symbol
assert dumeq(invert_modular(Mod(x, 7), S(5), n, x),
(x, ImageSet(Lambda(n, 7*n + 5), S.Integers)))
# a.is_Add
assert dumeq(invert_modular(Mod(x + 8, 7), S(5), n, x),
(x, ImageSet(Lambda(n, 7*n + 4), S.Integers)))
assert invert_modular(Mod(x**2 + x, 7), S(5), n, x) == \
(Mod(x**2 + x, 7), 5)
# a.is_Mul
assert dumeq(invert_modular(Mod(3*x, 7), S(5), n, x),
(x, ImageSet(Lambda(n, 7*n + 4), S.Integers)))
assert invert_modular(Mod((x + 1)*(x + 2), 7), S(5), n, x) == \
(Mod((x + 1)*(x + 2), 7), 5)
# a.is_Pow
assert invert_modular(Mod(x**4, 7), S(5), n, x) == \
(x, EmptySet())
assert dumeq(invert_modular(Mod(3**x, 4), S(3), n, x),
(x, ImageSet(Lambda(n, 2*n + 1), S.Naturals0)))
assert dumeq(invert_modular(Mod(2**(x**2 + x + 1), 7), S(2), n, x),
(x**2 + x + 1, ImageSet(Lambda(n, 3*n + 1), S.Naturals0)))
assert invert_modular(Mod(sin(x)**4, 7), S(5), n, x) == (x, EmptySet())
def test_solve_modular():
n = Dummy('n', integer=True)
# if rhs has symbol (need to be implemented in future).
assert solveset(Mod(x, 4) - x, x, S.Integers
).dummy_eq(
ConditionSet(x, Eq(-x + Mod(x, 4), 0),
S.Integers))
# when _invert_modular fails to invert
assert solveset(3 - Mod(sin(x), 7), x, S.Integers
).dummy_eq(
ConditionSet(x, Eq(Mod(sin(x), 7) - 3, 0), S.Integers))
assert solveset(3 - Mod(log(x), 7), x, S.Integers
).dummy_eq(
ConditionSet(x, Eq(Mod(log(x), 7) - 3, 0), S.Integers))
assert solveset(3 - Mod(exp(x), 7), x, S.Integers
).dummy_eq(ConditionSet(x, Eq(Mod(exp(x), 7) - 3, 0),
S.Integers))
# EmptySet solution definitely
assert solveset(7 - Mod(x, 5), x, S.Integers) == EmptySet()
assert solveset(5 - Mod(x, 5), x, S.Integers) == EmptySet()
# Negative m
assert dumeq(solveset(2 + Mod(x, -3), x, S.Integers),
ImageSet(Lambda(n, -3*n - 2), S.Integers))
assert solveset(4 + Mod(x, -3), x, S.Integers) == EmptySet()
# linear expression in Mod
assert dumeq(solveset(3 - Mod(x, 5), x, S.Integers),
ImageSet(Lambda(n, 5*n + 3), S.Integers))
assert dumeq(solveset(3 - Mod(5*x - 8, 7), x, S.Integers),
ImageSet(Lambda(n, 7*n + 5), S.Integers))
assert dumeq(solveset(3 - Mod(5*x, 7), x, S.Integers),
ImageSet(Lambda(n, 7*n + 2), S.Integers))
# higher degree expression in Mod
assert dumeq(solveset(Mod(x**2, 160) - 9, x, S.Integers),
Union(ImageSet(Lambda(n, 160*n + 3), S.Integers),
ImageSet(Lambda(n, 160*n + 13), S.Integers),
ImageSet(Lambda(n, 160*n + 67), S.Integers),
ImageSet(Lambda(n, 160*n + 77), S.Integers),
ImageSet(Lambda(n, 160*n + 83), S.Integers),
ImageSet(Lambda(n, 160*n + 93), S.Integers),
ImageSet(Lambda(n, 160*n + 147), S.Integers),
ImageSet(Lambda(n, 160*n + 157), S.Integers)))
assert solveset(3 - Mod(x**4, 7), x, S.Integers) == EmptySet()
assert dumeq(solveset(Mod(x**4, 17) - 13, x, S.Integers),
Union(ImageSet(Lambda(n, 17*n + 3), S.Integers),
ImageSet(Lambda(n, 17*n + 5), S.Integers),
ImageSet(Lambda(n, 17*n + 12), S.Integers),
ImageSet(Lambda(n, 17*n + 14), S.Integers)))
# a.is_Pow tests
assert dumeq(solveset(Mod(7**x, 41) - 15, x, S.Integers),
ImageSet(Lambda(n, 40*n + 3), S.Naturals0))
assert dumeq(solveset(Mod(12**x, 21) - 18, x, S.Integers),
ImageSet(Lambda(n, 6*n + 2), S.Naturals0))
assert dumeq(solveset(Mod(3**x, 4) - 3, x, S.Integers),
ImageSet(Lambda(n, 2*n + 1), S.Naturals0))
assert dumeq(solveset(Mod(2**x, 7) - 2 , x, S.Integers),
ImageSet(Lambda(n, 3*n + 1), S.Naturals0))
assert dumeq(solveset(Mod(3**(3**x), 4) - 3, x, S.Integers),
Intersection(ImageSet(Lambda(n, Intersection({log(2*n + 1)/log(3)},
S.Integers)), S.Naturals0), S.Integers))
# Implemented for m without primitive root
assert solveset(Mod(x**3, 7) - 2, x, S.Integers) == EmptySet()
assert dumeq(solveset(Mod(x**3, 8) - 1, x, S.Integers),
ImageSet(Lambda(n, 8*n + 1), S.Integers))
assert dumeq(solveset(Mod(x**4, 9) - 4, x, S.Integers),
Union(ImageSet(Lambda(n, 9*n + 4), S.Integers),
ImageSet(Lambda(n, 9*n + 5), S.Integers)))
# domain intersection
assert dumeq(solveset(3 - Mod(5*x - 8, 7), x, S.Naturals0),
Intersection(ImageSet(Lambda(n, 7*n + 5), S.Integers), S.Naturals0))
# Complex args
assert solveset(Mod(x, 3) - I, x, S.Integers) == \
EmptySet()
assert solveset(Mod(I*x, 3) - 2, x, S.Integers
).dummy_eq(
ConditionSet(x, Eq(Mod(I*x, 3) - 2, 0), S.Integers))
assert solveset(Mod(I + x, 3) - 2, x, S.Integers
).dummy_eq(
ConditionSet(x, Eq(Mod(x + I, 3) - 2, 0), S.Integers))
# issue 17373 (https://github.com/sympy/sympy/issues/17373)
assert dumeq(solveset(Mod(x**4, 14) - 11, x, S.Integers),
Union(ImageSet(Lambda(n, 14*n + 3), S.Integers),
ImageSet(Lambda(n, 14*n + 11), S.Integers)))
assert dumeq(solveset(Mod(x**31, 74) - 43, x, S.Integers),
ImageSet(Lambda(n, 74*n + 31), S.Integers))
# issue 13178
n = symbols('n', integer=True)
a = 742938285
b = 1898888478
m = 2**31 - 1
c = 20170816
assert dumeq(solveset(c - Mod(a**n*b, m), n, S.Integers),
ImageSet(Lambda(n, 2147483646*n + 100), S.Naturals0))
assert dumeq(solveset(c - Mod(a**n*b, m), n, S.Naturals0),
Intersection(ImageSet(Lambda(n, 2147483646*n + 100), S.Naturals0),
S.Naturals0))
assert dumeq(solveset(c - Mod(a**(2*n)*b, m), n, S.Integers),
Intersection(ImageSet(Lambda(n, 1073741823*n + 50), S.Naturals0),
S.Integers))
assert solveset(c - Mod(a**(2*n + 7)*b, m), n, S.Integers) == EmptySet()
assert dumeq(solveset(c - Mod(a**(n - 4)*b, m), n, S.Integers),
Intersection(ImageSet(Lambda(n, 2147483646*n + 104), S.Naturals0),
S.Integers))
# end of modular tests
def test_issue_17276():
assert nonlinsolve([Eq(x, 5**(S(1)/5)), Eq(x*y, 25*sqrt(5))], x, y) == \
FiniteSet((5**(S(1)/5), 25*5**(S(3)/10)))
|
f8cd6ef641203c36dd4fbd5fbeebffc938955b32209076c091c867ba5a9f1d33
|
from sympy import (
Abs, And, Derivative, Dummy, Eq, Float, Function, Gt, I, Integral,
LambertW, Lt, Matrix, Or, Poly, Q, Rational, S, Symbol, Ne,
Wild, acos, asin, atan, atanh, binomial, cos, cosh, diff, erf, erfinv, erfc,
erfcinv, exp, im, log, pi, re, sec, sin,
sinh, solve, solve_linear, sqrt, sstr, symbols, sympify, tan, tanh,
root, atan2, arg, Mul, SparseMatrix, ask, Tuple, nsolve, oo,
E, cbrt, denom, Add, Piecewise, GoldenRatio, TribonacciConstant)
from sympy.core.function import nfloat
from sympy.solvers import solve_linear_system, solve_linear_system_LU, \
solve_undetermined_coeffs
from sympy.solvers.bivariate import _filtered_gens, _solve_lambert, _lambert
from sympy.solvers.solvers import _invert, unrad, checksol, posify, _ispow, \
det_quick, det_perm, det_minor, _simple_dens, denoms
from sympy.physics.units import cm
from sympy.polys.rootoftools import CRootOf
from sympy.testing.pytest import slow, XFAIL, SKIP, raises
from sympy.testing.randtest import verify_numerically as tn
from sympy.abc import a, b, c, d, k, h, p, x, y, z, t, q, m
def NS(e, n=15, **options):
return sstr(sympify(e).evalf(n, **options), full_prec=True)
def test_swap_back():
f, g = map(Function, 'fg')
fx, gx = f(x), g(x)
assert solve([fx + y - 2, fx - gx - 5], fx, y, gx) == \
{fx: gx + 5, y: -gx - 3}
assert solve(fx + gx*x - 2, [fx, gx], dict=True)[0] == {fx: 2, gx: 0}
assert solve(fx + gx**2*x - y, [fx, gx], dict=True) == [{fx: y - gx**2*x}]
assert solve([f(1) - 2, x + 2], dict=True) == [{x: -2, f(1): 2}]
def guess_solve_strategy(eq, symbol):
try:
solve(eq, symbol)
return True
except (TypeError, NotImplementedError):
return False
def test_guess_poly():
# polynomial equations
assert guess_solve_strategy( S(4), x ) # == GS_POLY
assert guess_solve_strategy( x, x ) # == GS_POLY
assert guess_solve_strategy( x + a, x ) # == GS_POLY
assert guess_solve_strategy( 2*x, x ) # == GS_POLY
assert guess_solve_strategy( x + sqrt(2), x) # == GS_POLY
assert guess_solve_strategy( x + 2**Rational(1, 4), x) # == GS_POLY
assert guess_solve_strategy( x**2 + 1, x ) # == GS_POLY
assert guess_solve_strategy( x**2 - 1, x ) # == GS_POLY
assert guess_solve_strategy( x*y + y, x ) # == GS_POLY
assert guess_solve_strategy( x*exp(y) + y, x) # == GS_POLY
assert guess_solve_strategy(
(x - y**3)/(y**2*sqrt(1 - y**2)), x) # == GS_POLY
def test_guess_poly_cv():
# polynomial equations via a change of variable
assert guess_solve_strategy( sqrt(x) + 1, x ) # == GS_POLY_CV_1
assert guess_solve_strategy(
x**Rational(1, 3) + sqrt(x) + 1, x ) # == GS_POLY_CV_1
assert guess_solve_strategy( 4*x*(1 - sqrt(x)), x ) # == GS_POLY_CV_1
# polynomial equation multiplying both sides by x**n
assert guess_solve_strategy( x + 1/x + y, x ) # == GS_POLY_CV_2
def test_guess_rational_cv():
# rational functions
assert guess_solve_strategy( (x + 1)/(x**2 + 2), x) # == GS_RATIONAL
assert guess_solve_strategy(
(x - y**3)/(y**2*sqrt(1 - y**2)), y) # == GS_RATIONAL_CV_1
# rational functions via the change of variable y -> x**n
assert guess_solve_strategy( (sqrt(x) + 1)/(x**Rational(1, 3) + sqrt(x) + 1), x ) \
#== GS_RATIONAL_CV_1
def test_guess_transcendental():
#transcendental functions
assert guess_solve_strategy( exp(x) + 1, x ) # == GS_TRANSCENDENTAL
assert guess_solve_strategy( 2*cos(x) - y, x ) # == GS_TRANSCENDENTAL
assert guess_solve_strategy(
exp(x) + exp(-x) - y, x ) # == GS_TRANSCENDENTAL
assert guess_solve_strategy(3**x - 10, x) # == GS_TRANSCENDENTAL
assert guess_solve_strategy(-3**x + 10, x) # == GS_TRANSCENDENTAL
assert guess_solve_strategy(a*x**b - y, x) # == GS_TRANSCENDENTAL
def test_solve_args():
# equation container, issue 5113
ans = {x: -3, y: 1}
eqs = (x + 5*y - 2, -3*x + 6*y - 15)
assert all(solve(container(eqs), x, y) == ans for container in
(tuple, list, set, frozenset))
assert solve(Tuple(*eqs), x, y) == ans
# implicit symbol to solve for
assert set(solve(x**2 - 4)) == set([S(2), -S(2)])
assert solve([x + y - 3, x - y - 5]) == {x: 4, y: -1}
assert solve(x - exp(x), x, implicit=True) == [exp(x)]
# no symbol to solve for
assert solve(42) == solve(42, x) == []
assert solve([1, 2]) == []
# duplicate symbols removed
assert solve((x - 3, y + 2), x, y, x) == {x: 3, y: -2}
# unordered symbols
# only 1
assert solve(y - 3, set([y])) == [3]
# more than 1
assert solve(y - 3, set([x, y])) == [{y: 3}]
# multiple symbols: take the first linear solution+
# - return as tuple with values for all requested symbols
assert solve(x + y - 3, [x, y]) == [(3 - y, y)]
# - unless dict is True
assert solve(x + y - 3, [x, y], dict=True) == [{x: 3 - y}]
# - or no symbols are given
assert solve(x + y - 3) == [{x: 3 - y}]
# multiple symbols might represent an undetermined coefficients system
assert solve(a + b*x - 2, [a, b]) == {a: 2, b: 0}
args = (a + b)*x - b**2 + 2, a, b
assert solve(*args) == \
[(-sqrt(2), sqrt(2)), (sqrt(2), -sqrt(2))]
assert solve(*args, set=True) == \
([a, b], set([(-sqrt(2), sqrt(2)), (sqrt(2), -sqrt(2))]))
assert solve(*args, dict=True) == \
[{b: sqrt(2), a: -sqrt(2)}, {b: -sqrt(2), a: sqrt(2)}]
eq = a*x**2 + b*x + c - ((x - h)**2 + 4*p*k)/4/p
flags = dict(dict=True)
assert solve(eq, [h, p, k], exclude=[a, b, c], **flags) == \
[{k: c - b**2/(4*a), h: -b/(2*a), p: 1/(4*a)}]
flags.update(dict(simplify=False))
assert solve(eq, [h, p, k], exclude=[a, b, c], **flags) == \
[{k: (4*a*c - b**2)/(4*a), h: -b/(2*a), p: 1/(4*a)}]
# failing undetermined system
assert solve(a*x + b**2/(x + 4) - 3*x - 4/x, a, b, dict=True) == \
[{a: (-b**2*x + 3*x**3 + 12*x**2 + 4*x + 16)/(x**2*(x + 4))}]
# failed single equation
assert solve(1/(1/x - y + exp(y))) == []
raises(
NotImplementedError, lambda: solve(exp(x) + sin(x) + exp(y) + sin(y)))
# failed system
# -- when no symbols given, 1 fails
assert solve([y, exp(x) + x]) == [{x: -LambertW(1), y: 0}]
# both fail
assert solve(
(exp(x) - x, exp(y) - y)) == [{x: -LambertW(-1), y: -LambertW(-1)}]
# -- when symbols given
solve([y, exp(x) + x], x, y) == [(-LambertW(1), 0)]
# symbol is a number
assert solve(x**2 - pi, pi) == [x**2]
# no equations
assert solve([], [x]) == []
# overdetermined system
# - nonlinear
assert solve([(x + y)**2 - 4, x + y - 2]) == [{x: -y + 2}]
# - linear
assert solve((x + y - 2, 2*x + 2*y - 4)) == {x: -y + 2}
# When one or more args are Boolean
assert solve(Eq(x**2, 0.0)) == [0] # issue 19048
assert solve([True, Eq(x, 0)], [x], dict=True) == [{x: 0}]
assert solve([Eq(x, x), Eq(x, 0), Eq(x, x+1)], [x], dict=True) == []
assert not solve([Eq(x, x+1), x < 2], x)
assert solve([Eq(x, 0), x+1<2]) == Eq(x, 0)
assert solve([Eq(x, x), Eq(x, x+1)], x) == []
assert solve(True, x) == []
assert solve([x - 1, False], [x], set=True) == ([], set())
def test_solve_polynomial1():
assert solve(3*x - 2, x) == [Rational(2, 3)]
assert solve(Eq(3*x, 2), x) == [Rational(2, 3)]
assert set(solve(x**2 - 1, x)) == set([-S.One, S.One])
assert set(solve(Eq(x**2, 1), x)) == set([-S.One, S.One])
assert solve(x - y**3, x) == [y**3]
rx = root(x, 3)
assert solve(x - y**3, y) == [
rx, -rx/2 - sqrt(3)*I*rx/2, -rx/2 + sqrt(3)*I*rx/2]
a11, a12, a21, a22, b1, b2 = symbols('a11,a12,a21,a22,b1,b2')
assert solve([a11*x + a12*y - b1, a21*x + a22*y - b2], x, y) == \
{
x: (a22*b1 - a12*b2)/(a11*a22 - a12*a21),
y: (a11*b2 - a21*b1)/(a11*a22 - a12*a21),
}
solution = {y: S.Zero, x: S.Zero}
assert solve((x - y, x + y), x, y ) == solution
assert solve((x - y, x + y), (x, y)) == solution
assert solve((x - y, x + y), [x, y]) == solution
assert set(solve(x**3 - 15*x - 4, x)) == set([
-2 + 3**S.Half,
S(4),
-2 - 3**S.Half
])
assert set(solve((x**2 - 1)**2 - a, x)) == \
set([sqrt(1 + sqrt(a)), -sqrt(1 + sqrt(a)),
sqrt(1 - sqrt(a)), -sqrt(1 - sqrt(a))])
def test_solve_polynomial2():
assert solve(4, x) == []
def test_solve_polynomial_cv_1a():
"""
Test for solving on equations that can be converted to a polynomial equation
using the change of variable y -> x**Rational(p, q)
"""
assert solve( sqrt(x) - 1, x) == [1]
assert solve( sqrt(x) - 2, x) == [4]
assert solve( x**Rational(1, 4) - 2, x) == [16]
assert solve( x**Rational(1, 3) - 3, x) == [27]
assert solve(sqrt(x) + x**Rational(1, 3) + x**Rational(1, 4), x) == [0]
def test_solve_polynomial_cv_1b():
assert set(solve(4*x*(1 - a*sqrt(x)), x)) == set([S.Zero, 1/a**2])
assert set(solve(x*(root(x, 3) - 3), x)) == set([S.Zero, S(27)])
def test_solve_polynomial_cv_2():
"""
Test for solving on equations that can be converted to a polynomial equation
multiplying both sides of the equation by x**m
"""
assert solve(x + 1/x - 1, x) in \
[[ S.Half + I*sqrt(3)/2, S.Half - I*sqrt(3)/2],
[ S.Half - I*sqrt(3)/2, S.Half + I*sqrt(3)/2]]
def test_quintics_1():
f = x**5 - 110*x**3 - 55*x**2 + 2310*x + 979
s = solve(f, check=False)
for r in s:
res = f.subs(x, r.n()).n()
assert tn(res, 0)
f = x**5 - 15*x**3 - 5*x**2 + 10*x + 20
s = solve(f)
for r in s:
assert r.func == CRootOf
# if one uses solve to get the roots of a polynomial that has a CRootOf
# solution, make sure that the use of nfloat during the solve process
# doesn't fail. Note: if you want numerical solutions to a polynomial
# it is *much* faster to use nroots to get them than to solve the
# equation only to get RootOf solutions which are then numerically
# evaluated. So for eq = x**5 + 3*x + 7 do Poly(eq).nroots() rather
# than [i.n() for i in solve(eq)] to get the numerical roots of eq.
assert nfloat(solve(x**5 + 3*x**3 + 7)[0], exponent=False) == \
CRootOf(x**5 + 3*x**3 + 7, 0).n()
def test_quintics_2():
f = x**5 + 15*x + 12
s = solve(f, check=False)
for r in s:
res = f.subs(x, r.n()).n()
assert tn(res, 0)
f = x**5 - 15*x**3 - 5*x**2 + 10*x + 20
s = solve(f)
for r in s:
assert r.func == CRootOf
assert solve(x**5 - 6*x**3 - 6*x**2 + x - 6) == [
CRootOf(x**5 - 6*x**3 - 6*x**2 + x - 6, 0),
CRootOf(x**5 - 6*x**3 - 6*x**2 + x - 6, 1),
CRootOf(x**5 - 6*x**3 - 6*x**2 + x - 6, 2),
CRootOf(x**5 - 6*x**3 - 6*x**2 + x - 6, 3),
CRootOf(x**5 - 6*x**3 - 6*x**2 + x - 6, 4)]
def test_highorder_poly():
# just testing that the uniq generator is unpacked
sol = solve(x**6 - 2*x + 2)
assert all(isinstance(i, CRootOf) for i in sol) and len(sol) == 6
def test_solve_rational():
"""Test solve for rational functions"""
assert solve( ( x - y**3 )/( (y**2)*sqrt(1 - y**2) ), x) == [y**3]
def test_solve_nonlinear():
assert solve(x**2 - y**2, x, y, dict=True) == [{x: -y}, {x: y}]
assert solve(x**2 - y**2/exp(x), y, x, dict=True) == [{y: -x*sqrt(exp(x))},
{y: x*sqrt(exp(x))}]
def test_issue_8666():
x = symbols('x')
assert solve(Eq(x**2 - 1/(x**2 - 4), 4 - 1/(x**2 - 4)), x) == []
assert solve(Eq(x + 1/x, 1/x), x) == []
def test_issue_7228():
assert solve(4**(2*(x**2) + 2*x) - 8, x) == [Rational(-3, 2), S.Half]
def test_issue_7190():
assert solve(log(x-3) + log(x+3), x) == [sqrt(10)]
def test_linear_system():
x, y, z, t, n = symbols('x, y, z, t, n')
assert solve([x - 1, x - y, x - 2*y, y - 1], [x, y]) == []
assert solve([x - 1, x - y, x - 2*y, x - 1], [x, y]) == []
assert solve([x - 1, x - 1, x - y, x - 2*y], [x, y]) == []
assert solve([x + 5*y - 2, -3*x + 6*y - 15], x, y) == {x: -3, y: 1}
M = Matrix([[0, 0, n*(n + 1), (n + 1)**2, 0],
[n + 1, n + 1, -2*n - 1, -(n + 1), 0],
[-1, 0, 1, 0, 0]])
assert solve_linear_system(M, x, y, z, t) == \
{x: -t - t/n, z: -t - t/n, y: 0}
assert solve([x + y + z + t, -z - t], x, y, z, t) == {x: -y, z: -t}
# https://github.com/sympy/sympy/issues/6420
M = Matrix([[0, 15.0, 10.0, 700.0],
[1, 1, 1, 100.0],
[0, 10.0, 5.0, 200.0],
[-5.0, 0, 0, 0 ]])
assert solve_linear_system(M, x, y, z) == {x: 0, y: -60.0, z: 160.0}
def test_linear_system_function():
a = Function('a')
assert solve([a(0, 0) + a(0, 1) + a(1, 0) + a(1, 1), -a(1, 0) - a(1, 1)],
a(0, 0), a(0, 1), a(1, 0), a(1, 1)) == {a(1, 0): -a(1, 1), a(0, 0): -a(0, 1)}
def test_linear_systemLU():
n = Symbol('n')
M = Matrix([[1, 2, 0, 1], [1, 3, 2*n, 1], [4, -1, n**2, 1]])
assert solve_linear_system_LU(M, [x, y, z]) == {z: -3/(n**2 + 18*n),
x: 1 - 12*n/(n**2 + 18*n),
y: 6*n/(n**2 + 18*n)}
# Note: multiple solutions exist for some of these equations, so the tests
# should be expected to break if the implementation of the solver changes
# in such a way that a different branch is chosen
@slow
def test_solve_transcendental():
from sympy.abc import a, b
assert solve(exp(x) - 3, x) == [log(3)]
assert set(solve((a*x + b)*(exp(x) - 3), x)) == set([-b/a, log(3)])
assert solve(cos(x) - y, x) == [-acos(y) + 2*pi, acos(y)]
assert solve(2*cos(x) - y, x) == [-acos(y/2) + 2*pi, acos(y/2)]
assert solve(Eq(cos(x), sin(x)), x) == [pi/4]
assert set(solve(exp(x) + exp(-x) - y, x)) in [set([
log(y/2 - sqrt(y**2 - 4)/2),
log(y/2 + sqrt(y**2 - 4)/2),
]), set([
log(y - sqrt(y**2 - 4)) - log(2),
log(y + sqrt(y**2 - 4)) - log(2)]),
set([
log(y/2 - sqrt((y - 2)*(y + 2))/2),
log(y/2 + sqrt((y - 2)*(y + 2))/2)])]
assert solve(exp(x) - 3, x) == [log(3)]
assert solve(Eq(exp(x), 3), x) == [log(3)]
assert solve(log(x) - 3, x) == [exp(3)]
assert solve(sqrt(3*x) - 4, x) == [Rational(16, 3)]
assert solve(3**(x + 2), x) == []
assert solve(3**(2 - x), x) == []
assert solve(x + 2**x, x) == [-LambertW(log(2))/log(2)]
assert solve(2*x + 5 + log(3*x - 2), x) == \
[Rational(2, 3) + LambertW(2*exp(Rational(-19, 3))/3)/2]
assert solve(3*x + log(4*x), x) == [LambertW(Rational(3, 4))/3]
assert set(solve((2*x + 8)*(8 + exp(x)), x)) == set([S(-4), log(8) + pi*I])
eq = 2*exp(3*x + 4) - 3
ans = solve(eq, x) # this generated a failure in flatten
assert len(ans) == 3 and all(eq.subs(x, a).n(chop=True) == 0 for a in ans)
assert solve(2*log(3*x + 4) - 3, x) == [(exp(Rational(3, 2)) - 4)/3]
assert solve(exp(x) + 1, x) == [pi*I]
eq = 2*(3*x + 4)**5 - 6*7**(3*x + 9)
result = solve(eq, x)
ans = [(log(2401) + 5*LambertW((-1 + sqrt(5) + sqrt(2)*I*sqrt(sqrt(5) + \
5))*log(7**(7*3**Rational(1, 5)/20))* -1))/(-3*log(7)), \
(log(2401) + 5*LambertW((1 + sqrt(5) - sqrt(2)*I*sqrt(5 - \
sqrt(5)))*log(7**(7*3**Rational(1, 5)/20))))/(-3*log(7)), \
(log(2401) + 5*LambertW((1 + sqrt(5) + sqrt(2)*I*sqrt(5 - \
sqrt(5)))*log(7**(7*3**Rational(1, 5)/20))))/(-3*log(7)), \
(log(2401) + 5*LambertW((-sqrt(5) + 1 + sqrt(2)*I*sqrt(sqrt(5) + \
5))*log(7**(7*3**Rational(1, 5)/20))))/(-3*log(7)), \
(log(2401) + 5*LambertW(-log(7**(7*3**Rational(1, 5)/5))))/(-3*log(7))]
assert result == ans
# it works if expanded, too
assert solve(eq.expand(), x) == result
assert solve(z*cos(x) - y, x) == [-acos(y/z) + 2*pi, acos(y/z)]
assert solve(z*cos(2*x) - y, x) == [-acos(y/z)/2 + pi, acos(y/z)/2]
assert solve(z*cos(sin(x)) - y, x) == [
pi - asin(acos(y/z)), asin(acos(y/z) - 2*pi) + pi,
-asin(acos(y/z) - 2*pi), asin(acos(y/z))]
assert solve(z*cos(x), x) == [pi/2, pi*Rational(3, 2)]
# issue 4508
assert solve(y - b*x/(a + x), x) in [[-a*y/(y - b)], [a*y/(b - y)]]
assert solve(y - b*exp(a/x), x) == [a/log(y/b)]
# issue 4507
assert solve(y - b/(1 + a*x), x) in [[(b - y)/(a*y)], [-((y - b)/(a*y))]]
# issue 4506
assert solve(y - a*x**b, x) == [(y/a)**(1/b)]
# issue 4505
assert solve(z**x - y, x) == [log(y)/log(z)]
# issue 4504
assert solve(2**x - 10, x) == [1 + log(5)/log(2)]
# issue 6744
assert solve(x*y) == [{x: 0}, {y: 0}]
assert solve([x*y]) == [{x: 0}, {y: 0}]
assert solve(x**y - 1) == [{x: 1}, {y: 0}]
assert solve([x**y - 1]) == [{x: 1}, {y: 0}]
assert solve(x*y*(x**2 - y**2)) == [{x: 0}, {x: -y}, {x: y}, {y: 0}]
assert solve([x*y*(x**2 - y**2)]) == [{x: 0}, {x: -y}, {x: y}, {y: 0}]
# issue 4739
assert solve(exp(log(5)*x) - 2**x, x) == [0]
# issue 14791
assert solve(exp(log(5)*x) - exp(log(2)*x), x) == [0]
f = Function('f')
assert solve(y*f(log(5)*x) - y*f(log(2)*x), x) == [0]
assert solve(f(x) - f(0), x) == [0]
assert solve(f(x) - f(2 - x), x) == [1]
raises(NotImplementedError, lambda: solve(f(x, y) - f(1, 2), x))
raises(NotImplementedError, lambda: solve(f(x, y) - f(2 - x, 2), x))
raises(ValueError, lambda: solve(f(x, y) - f(1 - x), x))
raises(ValueError, lambda: solve(f(x, y) - f(1), x))
# misc
# make sure that the right variables is picked up in tsolve
# shouldn't generate a GeneratorsNeeded error in _tsolve when the NaN is generated
# for eq_down. Actual answers, as determined numerically are approx. +/- 0.83
raises(NotImplementedError, lambda:
solve(sinh(x)*sinh(sinh(x)) + cosh(x)*cosh(sinh(x)) - 3))
# watch out for recursive loop in tsolve
raises(NotImplementedError, lambda: solve((x + 2)**y*x - 3, x))
# issue 7245
assert solve(sin(sqrt(x))) == [0, pi**2]
# issue 7602
a, b = symbols('a, b', real=True, negative=False)
assert str(solve(Eq(a, 0.5 - cos(pi*b)/2), b)) == \
'[2.0 - 0.318309886183791*acos(1.0 - 2.0*a), 0.318309886183791*acos(1.0 - 2.0*a)]'
# issue 15325
assert solve(y**(1/x) - z, x) == [log(y)/log(z)]
def test_solve_for_functions_derivatives():
t = Symbol('t')
x = Function('x')(t)
y = Function('y')(t)
a11, a12, a21, a22, b1, b2 = symbols('a11,a12,a21,a22,b1,b2')
soln = solve([a11*x + a12*y - b1, a21*x + a22*y - b2], x, y)
assert soln == {
x: (a22*b1 - a12*b2)/(a11*a22 - a12*a21),
y: (a11*b2 - a21*b1)/(a11*a22 - a12*a21),
}
assert solve(x - 1, x) == [1]
assert solve(3*x - 2, x) == [Rational(2, 3)]
soln = solve([a11*x.diff(t) + a12*y.diff(t) - b1, a21*x.diff(t) +
a22*y.diff(t) - b2], x.diff(t), y.diff(t))
assert soln == { y.diff(t): (a11*b2 - a21*b1)/(a11*a22 - a12*a21),
x.diff(t): (a22*b1 - a12*b2)/(a11*a22 - a12*a21) }
assert solve(x.diff(t) - 1, x.diff(t)) == [1]
assert solve(3*x.diff(t) - 2, x.diff(t)) == [Rational(2, 3)]
eqns = set((3*x - 1, 2*y - 4))
assert solve(eqns, set((x, y))) == { x: Rational(1, 3), y: 2 }
x = Symbol('x')
f = Function('f')
F = x**2 + f(x)**2 - 4*x - 1
assert solve(F.diff(x), diff(f(x), x)) == [(-x + 2)/f(x)]
# Mixed cased with a Symbol and a Function
x = Symbol('x')
y = Function('y')(t)
soln = solve([a11*x + a12*y.diff(t) - b1, a21*x +
a22*y.diff(t) - b2], x, y.diff(t))
assert soln == { y.diff(t): (a11*b2 - a21*b1)/(a11*a22 - a12*a21),
x: (a22*b1 - a12*b2)/(a11*a22 - a12*a21) }
# issue 13263
x = Symbol('x')
f = Function('f')
soln = solve([f(x).diff(x) + f(x).diff(x, 2) - 1, f(x).diff(x) - f(x).diff(x, 2)],
f(x).diff(x), f(x).diff(x, 2))
assert soln == { f(x).diff(x, 2): 1/2, f(x).diff(x): 1/2 }
soln = solve([f(x).diff(x, 2) + f(x).diff(x, 3) - 1, 1 - f(x).diff(x, 2) -
f(x).diff(x, 3), 1 - f(x).diff(x,3)], f(x).diff(x, 2), f(x).diff(x, 3))
assert soln == { f(x).diff(x, 2): 0, f(x).diff(x, 3): 1 }
def test_issue_3725():
f = Function('f')
F = x**2 + f(x)**2 - 4*x - 1
e = F.diff(x)
assert solve(e, f(x).diff(x)) in [[(2 - x)/f(x)], [-((x - 2)/f(x))]]
def test_issue_3870():
a, b, c, d = symbols('a b c d')
A = Matrix(2, 2, [a, b, c, d])
B = Matrix(2, 2, [0, 2, -3, 0])
C = Matrix(2, 2, [1, 2, 3, 4])
assert solve(A*B - C, [a, b, c, d]) == {a: 1, b: Rational(-1, 3), c: 2, d: -1}
assert solve([A*B - C], [a, b, c, d]) == {a: 1, b: Rational(-1, 3), c: 2, d: -1}
assert solve(Eq(A*B, C), [a, b, c, d]) == {a: 1, b: Rational(-1, 3), c: 2, d: -1}
assert solve([A*B - B*A], [a, b, c, d]) == {a: d, b: Rational(-2, 3)*c}
assert solve([A*C - C*A], [a, b, c, d]) == {a: d - c, b: Rational(2, 3)*c}
assert solve([A*B - B*A, A*C - C*A], [a, b, c, d]) == {a: d, b: 0, c: 0}
assert solve([Eq(A*B, B*A)], [a, b, c, d]) == {a: d, b: Rational(-2, 3)*c}
assert solve([Eq(A*C, C*A)], [a, b, c, d]) == {a: d - c, b: Rational(2, 3)*c}
assert solve([Eq(A*B, B*A), Eq(A*C, C*A)], [a, b, c, d]) == {a: d, b: 0, c: 0}
def test_solve_linear():
w = Wild('w')
assert solve_linear(x, x) == (0, 1)
assert solve_linear(x, exclude=[x]) == (0, 1)
assert solve_linear(x, symbols=[w]) == (0, 1)
assert solve_linear(x, y - 2*x) in [(x, y/3), (y, 3*x)]
assert solve_linear(x, y - 2*x, exclude=[x]) == (y, 3*x)
assert solve_linear(3*x - y, 0) in [(x, y/3), (y, 3*x)]
assert solve_linear(3*x - y, 0, [x]) == (x, y/3)
assert solve_linear(3*x - y, 0, [y]) == (y, 3*x)
assert solve_linear(x**2/y, 1) == (y, x**2)
assert solve_linear(w, x) in [(w, x), (x, w)]
assert solve_linear(cos(x)**2 + sin(x)**2 + 2 + y) == \
(y, -2 - cos(x)**2 - sin(x)**2)
assert solve_linear(cos(x)**2 + sin(x)**2 + 2 + y, symbols=[x]) == (0, 1)
assert solve_linear(Eq(x, 3)) == (x, 3)
assert solve_linear(1/(1/x - 2)) == (0, 0)
assert solve_linear((x + 1)*exp(-x), symbols=[x]) == (x, -1)
assert solve_linear((x + 1)*exp(x), symbols=[x]) == ((x + 1)*exp(x), 1)
assert solve_linear(x*exp(-x**2), symbols=[x]) == (x, 0)
assert solve_linear(0**x - 1) == (0**x - 1, 1)
assert solve_linear(1 + 1/(x - 1)) == (x, 0)
eq = y*cos(x)**2 + y*sin(x)**2 - y # = y*(1 - 1) = 0
assert solve_linear(eq) == (0, 1)
eq = cos(x)**2 + sin(x)**2 # = 1
assert solve_linear(eq) == (0, 1)
raises(ValueError, lambda: solve_linear(Eq(x, 3), 3))
def test_solve_undetermined_coeffs():
assert solve_undetermined_coeffs(a*x**2 + b*x**2 + b*x + 2*c*x + c + 1, [a, b, c], x) == \
{a: -2, b: 2, c: -1}
# Test that rational functions work
assert solve_undetermined_coeffs(a/x + b/(x + 1) - (2*x + 1)/(x**2 + x), [a, b], x) == \
{a: 1, b: 1}
# Test cancellation in rational functions
assert solve_undetermined_coeffs(((c + 1)*a*x**2 + (c + 1)*b*x**2 +
(c + 1)*b*x + (c + 1)*2*c*x + (c + 1)**2)/(c + 1), [a, b, c], x) == \
{a: -2, b: 2, c: -1}
def test_solve_inequalities():
x = Symbol('x')
sol = And(S.Zero < x, x < oo)
assert solve(x + 1 > 1) == sol
assert solve([x + 1 > 1]) == sol
assert solve([x + 1 > 1], x) == sol
assert solve([x + 1 > 1], [x]) == sol
system = [Lt(x**2 - 2, 0), Gt(x**2 - 1, 0)]
assert solve(system) == \
And(Or(And(Lt(-sqrt(2), x), Lt(x, -1)),
And(Lt(1, x), Lt(x, sqrt(2)))), Eq(0, 0))
x = Symbol('x', real=True)
system = [Lt(x**2 - 2, 0), Gt(x**2 - 1, 0)]
assert solve(system) == \
Or(And(Lt(-sqrt(2), x), Lt(x, -1)), And(Lt(1, x), Lt(x, sqrt(2))))
# issues 6627, 3448
assert solve((x - 3)/(x - 2) < 0, x) == And(Lt(2, x), Lt(x, 3))
assert solve(x/(x + 1) > 1, x) == And(Lt(-oo, x), Lt(x, -1))
assert solve(sin(x) > S.Half) == And(pi/6 < x, x < pi*Rational(5, 6))
assert solve(Eq(False, x < 1)) == (S.One <= x) & (x < oo)
assert solve(Eq(True, x < 1)) == (-oo < x) & (x < 1)
assert solve(Eq(x < 1, False)) == (S.One <= x) & (x < oo)
assert solve(Eq(x < 1, True)) == (-oo < x) & (x < 1)
assert solve(Eq(False, x)) == False
assert solve(Eq(0, x)) == [0]
assert solve(Eq(True, x)) == True
assert solve(Eq(1, x)) == [1]
assert solve(Eq(False, ~x)) == True
assert solve(Eq(True, ~x)) == False
assert solve(Ne(True, x)) == False
assert solve(Ne(1, x)) == (x > -oo) & (x < oo) & Ne(x, 1)
def test_issue_4793():
assert solve(1/x) == []
assert solve(x*(1 - 5/x)) == [5]
assert solve(x + sqrt(x) - 2) == [1]
assert solve(-(1 + x)/(2 + x)**2 + 1/(2 + x)) == []
assert solve(-x**2 - 2*x + (x + 1)**2 - 1) == []
assert solve((x/(x + 1) + 3)**(-2)) == []
assert solve(x/sqrt(x**2 + 1), x) == [0]
assert solve(exp(x) - y, x) == [log(y)]
assert solve(exp(x)) == []
assert solve(x**2 + x + sin(y)**2 + cos(y)**2 - 1, x) in [[0, -1], [-1, 0]]
eq = 4*3**(5*x + 2) - 7
ans = solve(eq, x)
assert len(ans) == 5 and all(eq.subs(x, a).n(chop=True) == 0 for a in ans)
assert solve(log(x**2) - y**2/exp(x), x, y, set=True) == (
[x, y],
{(x, sqrt(exp(x) * log(x ** 2))), (x, -sqrt(exp(x) * log(x ** 2)))})
assert solve(x**2*z**2 - z**2*y**2) == [{x: -y}, {x: y}, {z: 0}]
assert solve((x - 1)/(1 + 1/(x - 1))) == []
assert solve(x**(y*z) - x, x) == [1]
raises(NotImplementedError, lambda: solve(log(x) - exp(x), x))
raises(NotImplementedError, lambda: solve(2**x - exp(x) - 3))
def test_PR1964():
# issue 5171
assert solve(sqrt(x)) == solve(sqrt(x**3)) == [0]
assert solve(sqrt(x - 1)) == [1]
# issue 4462
a = Symbol('a')
assert solve(-3*a/sqrt(x), x) == []
# issue 4486
assert solve(2*x/(x + 2) - 1, x) == [2]
# issue 4496
assert set(solve((x**2/(7 - x)).diff(x))) == set([S.Zero, S(14)])
# issue 4695
f = Function('f')
assert solve((3 - 5*x/f(x))*f(x), f(x)) == [x*Rational(5, 3)]
# issue 4497
assert solve(1/root(5 + x, 5) - 9, x) == [Rational(-295244, 59049)]
assert solve(sqrt(x) + sqrt(sqrt(x)) - 4) == [(Rational(-1, 2) + sqrt(17)/2)**4]
assert set(solve(Poly(sqrt(exp(x)) + sqrt(exp(-x)) - 4))) in \
[
set([log((-sqrt(3) + 2)**2), log((sqrt(3) + 2)**2)]),
set([2*log(-sqrt(3) + 2), 2*log(sqrt(3) + 2)]),
set([log(-4*sqrt(3) + 7), log(4*sqrt(3) + 7)]),
]
assert set(solve(Poly(exp(x) + exp(-x) - 4))) == \
set([log(-sqrt(3) + 2), log(sqrt(3) + 2)])
assert set(solve(x**y + x**(2*y) - 1, x)) == \
set([(Rational(-1, 2) + sqrt(5)/2)**(1/y), (Rational(-1, 2) - sqrt(5)/2)**(1/y)])
assert solve(exp(x/y)*exp(-z/y) - 2, y) == [(x - z)/log(2)]
assert solve(
x**z*y**z - 2, z) in [[log(2)/(log(x) + log(y))], [log(2)/(log(x*y))]]
# if you do inversion too soon then multiple roots (as for the following)
# will be missed, e.g. if exp(3*x) = exp(3) -> 3*x = 3
E = S.Exp1
assert solve(exp(3*x) - exp(3), x) in [
[1, log(E*(Rational(-1, 2) - sqrt(3)*I/2)), log(E*(Rational(-1, 2) + sqrt(3)*I/2))],
[1, log(-E/2 - sqrt(3)*E*I/2), log(-E/2 + sqrt(3)*E*I/2)],
]
# coverage test
p = Symbol('p', positive=True)
assert solve((1/p + 1)**(p + 1)) == []
def test_issue_5197():
x = Symbol('x', real=True)
assert solve(x**2 + 1, x) == []
n = Symbol('n', integer=True, positive=True)
assert solve((n - 1)*(n + 2)*(2*n - 1), n) == [1]
x = Symbol('x', positive=True)
y = Symbol('y')
assert solve([x + 5*y - 2, -3*x + 6*y - 15], x, y) == []
# not {x: -3, y: 1} b/c x is positive
# The solution following should not contain (-sqrt(2), sqrt(2))
assert solve((x + y)*n - y**2 + 2, x, y) == [(sqrt(2), -sqrt(2))]
y = Symbol('y', positive=True)
# The solution following should not contain {y: -x*exp(x/2)}
assert solve(x**2 - y**2/exp(x), y, x, dict=True) == [{y: x*exp(x/2)}]
x, y, z = symbols('x y z', positive=True)
assert solve(z**2*x**2 - z**2*y**2/exp(x), y, x, z, dict=True) == [{y: x*exp(x/2)}]
def test_checking():
assert set(
solve(x*(x - y/x), x, check=False)) == set([sqrt(y), S.Zero, -sqrt(y)])
assert set(solve(x*(x - y/x), x, check=True)) == set([sqrt(y), -sqrt(y)])
# {x: 0, y: 4} sets denominator to 0 in the following so system should return None
assert solve((1/(1/x + 2), 1/(y - 3) - 1)) == []
# 0 sets denominator of 1/x to zero so None is returned
assert solve(1/(1/x + 2)) == []
def test_issue_4671_4463_4467():
assert solve((sqrt(x**2 - 1) - 2)) in ([sqrt(5), -sqrt(5)],
[-sqrt(5), sqrt(5)])
assert solve((2**exp(y**2/x) + 2)/(x**2 + 15), y) == [
-sqrt(x*log(1 + I*pi/log(2))), sqrt(x*log(1 + I*pi/log(2)))]
C1, C2 = symbols('C1 C2')
f = Function('f')
assert solve(C1 + C2/x**2 - exp(-f(x)), f(x)) == [log(x**2/(C1*x**2 + C2))]
a = Symbol('a')
E = S.Exp1
assert solve(1 - log(a + 4*x**2), x) in (
[-sqrt(-a + E)/2, sqrt(-a + E)/2],
[sqrt(-a + E)/2, -sqrt(-a + E)/2]
)
assert solve(log(a**(-3) - x**2)/a, x) in (
[-sqrt(-1 + a**(-3)), sqrt(-1 + a**(-3))],
[sqrt(-1 + a**(-3)), -sqrt(-1 + a**(-3))],)
assert solve(1 - log(a + 4*x**2), x) in (
[-sqrt(-a + E)/2, sqrt(-a + E)/2],
[sqrt(-a + E)/2, -sqrt(-a + E)/2],)
assert solve((a**2 + 1)*(sin(a*x) + cos(a*x)), x) == [-pi/(4*a)]
assert solve(3 - (sinh(a*x) + cosh(a*x)), x) == [log(3)/a]
assert set(solve(3 - (sinh(a*x) + cosh(a*x)**2), x)) == \
set([log(-2 + sqrt(5))/a, log(-sqrt(2) + 1)/a,
log(-sqrt(5) - 2)/a, log(1 + sqrt(2))/a])
assert solve(atan(x) - 1) == [tan(1)]
def test_issue_5132():
r, t = symbols('r,t')
assert set(solve([r - x**2 - y**2, tan(t) - y/x], [x, y])) == \
set([(
-sqrt(r*cos(t)**2), -1*sqrt(r*cos(t)**2)*tan(t)),
(sqrt(r*cos(t)**2), sqrt(r*cos(t)**2)*tan(t))])
assert solve([exp(x) - sin(y), 1/y - 3], [x, y]) == \
[(log(sin(Rational(1, 3))), Rational(1, 3))]
assert solve([exp(x) - sin(y), 1/exp(y) - 3], [x, y]) == \
[(log(-sin(log(3))), -log(3))]
assert set(solve([exp(x) - sin(y), y**2 - 4], [x, y])) == \
set([(log(-sin(2)), -S(2)), (log(sin(2)), S(2))])
eqs = [exp(x)**2 - sin(y) + z**2, 1/exp(y) - 3]
assert solve(eqs, set=True) == \
([x, y], set([
(log(-sqrt(-z**2 - sin(log(3)))), -log(3)),
(log(-z**2 - sin(log(3)))/2, -log(3))]))
assert solve(eqs, x, z, set=True) == (
[x, z],
{(log(-z**2 + sin(y))/2, z), (log(-sqrt(-z**2 + sin(y))), z)})
assert set(solve(eqs, x, y)) == \
set([
(log(-sqrt(-z**2 - sin(log(3)))), -log(3)),
(log(-z**2 - sin(log(3)))/2, -log(3))])
assert set(solve(eqs, y, z)) == \
set([
(-log(3), -sqrt(-exp(2*x) - sin(log(3)))),
(-log(3), sqrt(-exp(2*x) - sin(log(3))))])
eqs = [exp(x)**2 - sin(y) + z, 1/exp(y) - 3]
assert solve(eqs, set=True) == ([x, y], set(
[
(log(-sqrt(-z - sin(log(3)))), -log(3)),
(log(-z - sin(log(3)))/2, -log(3))]))
assert solve(eqs, x, z, set=True) == (
[x, z],
{(log(-sqrt(-z + sin(y))), z), (log(-z + sin(y))/2, z)})
assert set(solve(eqs, x, y)) == set(
[
(log(-sqrt(-z - sin(log(3)))), -log(3)),
(log(-z - sin(log(3)))/2, -log(3))])
assert solve(eqs, z, y) == \
[(-exp(2*x) - sin(log(3)), -log(3))]
assert solve((sqrt(x**2 + y**2) - sqrt(10), x + y - 4), set=True) == (
[x, y], set([(S.One, S(3)), (S(3), S.One)]))
assert set(solve((sqrt(x**2 + y**2) - sqrt(10), x + y - 4), x, y)) == \
set([(S.One, S(3)), (S(3), S.One)])
def test_issue_5335():
lam, a0, conc = symbols('lam a0 conc')
a = 0.005
b = 0.743436700916726
eqs = [lam + 2*y - a0*(1 - x/2)*x - a*x/2*x,
a0*(1 - x/2)*x - 1*y - b*y,
x + y - conc]
sym = [x, y, a0]
# there are 4 solutions obtained manually but only two are valid
assert len(solve(eqs, sym, manual=True, minimal=True)) == 2
assert len(solve(eqs, sym)) == 2 # cf below with rational=False
@SKIP("Hangs")
def _test_issue_5335_float():
# gives ZeroDivisionError: polynomial division
lam, a0, conc = symbols('lam a0 conc')
a = 0.005
b = 0.743436700916726
eqs = [lam + 2*y - a0*(1 - x/2)*x - a*x/2*x,
a0*(1 - x/2)*x - 1*y - b*y,
x + y - conc]
sym = [x, y, a0]
assert len(solve(eqs, sym, rational=False)) == 2
def test_issue_5767():
assert set(solve([x**2 + y + 4], [x])) == \
set([(-sqrt(-y - 4),), (sqrt(-y - 4),)])
def test_polysys():
assert set(solve([x**2 + 2/y - 2, x + y - 3], [x, y])) == \
set([(S.One, S(2)), (1 + sqrt(5), 2 - sqrt(5)),
(1 - sqrt(5), 2 + sqrt(5))])
assert solve([x**2 + y - 2, x**2 + y]) == []
# the ordering should be whatever the user requested
assert solve([x**2 + y - 3, x - y - 4], (x, y)) != solve([x**2 +
y - 3, x - y - 4], (y, x))
@slow
def test_unrad1():
raises(NotImplementedError, lambda:
unrad(sqrt(x) + sqrt(x + 1) + sqrt(1 - sqrt(x)) + 3))
raises(NotImplementedError, lambda:
unrad(sqrt(x) + (x + 1)**Rational(1, 3) + 2*sqrt(y)))
s = symbols('s', cls=Dummy)
# checkers to deal with possibility of answer coming
# back with a sign change (cf issue 5203)
def check(rv, ans):
assert bool(rv[1]) == bool(ans[1])
if ans[1]:
return s_check(rv, ans)
e = rv[0].expand()
a = ans[0].expand()
return e in [a, -a] and rv[1] == ans[1]
def s_check(rv, ans):
# get the dummy
rv = list(rv)
d = rv[0].atoms(Dummy)
reps = list(zip(d, [s]*len(d)))
# replace s with this dummy
rv = (rv[0].subs(reps).expand(), [rv[1][0].subs(reps), rv[1][1].subs(reps)])
ans = (ans[0].subs(reps).expand(), [ans[1][0].subs(reps), ans[1][1].subs(reps)])
return str(rv[0]) in [str(ans[0]), str(-ans[0])] and \
str(rv[1]) == str(ans[1])
assert check(unrad(sqrt(x)),
(x, []))
assert check(unrad(sqrt(x) + 1),
(x - 1, []))
assert check(unrad(sqrt(x) + root(x, 3) + 2),
(s**3 + s**2 + 2, [s, s**6 - x]))
assert check(unrad(sqrt(x)*root(x, 3) + 2),
(x**5 - 64, []))
assert check(unrad(sqrt(x) + (x + 1)**Rational(1, 3)),
(x**3 - (x + 1)**2, []))
assert check(unrad(sqrt(x) + sqrt(x + 1) + sqrt(2*x)),
(-2*sqrt(2)*x - 2*x + 1, []))
assert check(unrad(sqrt(x) + sqrt(x + 1) + 2),
(16*x - 9, []))
assert check(unrad(sqrt(x) + sqrt(x + 1) + sqrt(1 - x)),
(5*x**2 - 4*x, []))
assert check(unrad(a*sqrt(x) + b*sqrt(x) + c*sqrt(y) + d*sqrt(y)),
((a*sqrt(x) + b*sqrt(x))**2 - (c*sqrt(y) + d*sqrt(y))**2, []))
assert check(unrad(sqrt(x) + sqrt(1 - x)),
(2*x - 1, []))
assert check(unrad(sqrt(x) + sqrt(1 - x) - 3),
(x**2 - x + 16, []))
assert check(unrad(sqrt(x) + sqrt(1 - x) + sqrt(2 + x)),
(5*x**2 - 2*x + 1, []))
assert unrad(sqrt(x) + sqrt(1 - x) + sqrt(2 + x) - 3) in [
(25*x**4 + 376*x**3 + 1256*x**2 - 2272*x + 784, []),
(25*x**8 - 476*x**6 + 2534*x**4 - 1468*x**2 + 169, [])]
assert unrad(sqrt(x) + sqrt(1 - x) + sqrt(2 + x) - sqrt(1 - 2*x)) == \
(41*x**4 + 40*x**3 + 232*x**2 - 160*x + 16, []) # orig root at 0.487
assert check(unrad(sqrt(x) + sqrt(x + 1)), (S.One, []))
eq = sqrt(x) + sqrt(x + 1) + sqrt(1 - sqrt(x))
assert check(unrad(eq),
(16*x**2 - 9*x, []))
assert set(solve(eq, check=False)) == set([S.Zero, Rational(9, 16)])
assert solve(eq) == []
# but this one really does have those solutions
assert set(solve(sqrt(x) - sqrt(x + 1) + sqrt(1 - sqrt(x)))) == \
set([S.Zero, Rational(9, 16)])
assert check(unrad(sqrt(x) + root(x + 1, 3) + 2*sqrt(y), y),
(S('2*sqrt(x)*(x + 1)**(1/3) + x - 4*y + (x + 1)**(2/3)'), []))
assert check(unrad(sqrt(x/(1 - x)) + (x + 1)**Rational(1, 3)),
(x**5 - x**4 - x**3 + 2*x**2 + x - 1, []))
assert check(unrad(sqrt(x/(1 - x)) + 2*sqrt(y), y),
(4*x*y + x - 4*y, []))
assert check(unrad(sqrt(x)*sqrt(1 - x) + 2, x),
(x**2 - x + 4, []))
# http://tutorial.math.lamar.edu/
# Classes/Alg/SolveRadicalEqns.aspx#Solve_Rad_Ex2_a
assert solve(Eq(x, sqrt(x + 6))) == [3]
assert solve(Eq(x + sqrt(x - 4), 4)) == [4]
assert solve(Eq(1, x + sqrt(2*x - 3))) == []
assert set(solve(Eq(sqrt(5*x + 6) - 2, x))) == set([-S.One, S(2)])
assert set(solve(Eq(sqrt(2*x - 1) - sqrt(x - 4), 2))) == set([S(5), S(13)])
assert solve(Eq(sqrt(x + 7) + 2, sqrt(3 - x))) == [-6]
# http://www.purplemath.com/modules/solverad.htm
assert solve((2*x - 5)**Rational(1, 3) - 3) == [16]
assert set(solve(x + 1 - root(x**4 + 4*x**3 - x, 4))) == \
set([Rational(-1, 2), Rational(-1, 3)])
assert set(solve(sqrt(2*x**2 - 7) - (3 - x))) == set([-S(8), S(2)])
assert solve(sqrt(2*x + 9) - sqrt(x + 1) - sqrt(x + 4)) == [0]
assert solve(sqrt(x + 4) + sqrt(2*x - 1) - 3*sqrt(x - 1)) == [5]
assert solve(sqrt(x)*sqrt(x - 7) - 12) == [16]
assert solve(sqrt(x - 3) + sqrt(x) - 3) == [4]
assert solve(sqrt(9*x**2 + 4) - (3*x + 2)) == [0]
assert solve(sqrt(x) - 2 - 5) == [49]
assert solve(sqrt(x - 3) - sqrt(x) - 3) == []
assert solve(sqrt(x - 1) - x + 7) == [10]
assert solve(sqrt(x - 2) - 5) == [27]
assert solve(sqrt(17*x - sqrt(x**2 - 5)) - 7) == [3]
assert solve(sqrt(x) - sqrt(x - 1) + sqrt(sqrt(x))) == []
# don't posify the expression in unrad and do use _mexpand
z = sqrt(2*x + 1)/sqrt(x) - sqrt(2 + 1/x)
p = posify(z)[0]
assert solve(p) == []
assert solve(z) == []
assert solve(z + 6*I) == [Rational(-1, 11)]
assert solve(p + 6*I) == []
# issue 8622
assert unrad((root(x + 1, 5) - root(x, 3))) == (
x**5 - x**3 - 3*x**2 - 3*x - 1, [])
# issue #8679
assert check(unrad(x + root(x, 3) + root(x, 3)**2 + sqrt(y), x),
(s**3 + s**2 + s + sqrt(y), [s, s**3 - x]))
# for coverage
assert check(unrad(sqrt(x) + root(x, 3) + y),
(s**3 + s**2 + y, [s, s**6 - x]))
assert solve(sqrt(x) + root(x, 3) - 2) == [1]
raises(NotImplementedError, lambda:
solve(sqrt(x) + root(x, 3) + root(x + 1, 5) - 2))
# fails through a different code path
raises(NotImplementedError, lambda: solve(-sqrt(2) + cosh(x)/x))
# unrad some
assert solve(sqrt(x + root(x, 3))+root(x - y, 5), y) == [
x + (x**Rational(1, 3) + x)**Rational(5, 2)]
assert check(unrad(sqrt(x) - root(x + 1, 3)*sqrt(x + 2) + 2),
(s**10 + 8*s**8 + 24*s**6 - 12*s**5 - 22*s**4 - 160*s**3 - 212*s**2 -
192*s - 56, [s, s**2 - x]))
e = root(x + 1, 3) + root(x, 3)
assert unrad(e) == (2*x + 1, [])
eq = (sqrt(x) + sqrt(x + 1) + sqrt(1 - x) - 6*sqrt(5)/5)
assert check(unrad(eq),
(15625*x**4 + 173000*x**3 + 355600*x**2 - 817920*x + 331776, []))
assert check(unrad(root(x, 4) + root(x, 4)**3 - 1),
(s**3 + s - 1, [s, s**4 - x]))
assert check(unrad(root(x, 2) + root(x, 2)**3 - 1),
(x**3 + 2*x**2 + x - 1, []))
assert unrad(x**0.5) is None
assert check(unrad(t + root(x + y, 5) + root(x + y, 5)**3),
(s**3 + s + t, [s, s**5 - x - y]))
assert check(unrad(x + root(x + y, 5) + root(x + y, 5)**3, y),
(s**3 + s + x, [s, s**5 - x - y]))
assert check(unrad(x + root(x + y, 5) + root(x + y, 5)**3, x),
(s**5 + s**3 + s - y, [s, s**5 - x - y]))
assert check(unrad(root(x - 1, 3) + root(x + 1, 5) + root(2, 5)),
(s**5 + 5*2**Rational(1, 5)*s**4 + s**3 + 10*2**Rational(2, 5)*s**3 +
10*2**Rational(3, 5)*s**2 + 5*2**Rational(4, 5)*s + 4, [s, s**3 - x + 1]))
raises(NotImplementedError, lambda:
unrad((root(x, 2) + root(x, 3) + root(x, 4)).subs(x, x**5 - x + 1)))
# the simplify flag should be reset to False for unrad results;
# if it's not then this next test will take a long time
assert solve(root(x, 3) + root(x, 5) - 2) == [1]
eq = (sqrt(x) + sqrt(x + 1) + sqrt(1 - x) - 6*sqrt(5)/5)
assert check(unrad(eq),
((5*x - 4)*(3125*x**3 + 37100*x**2 + 100800*x - 82944), []))
ans = S('''
[4/5, -1484/375 + 172564/(140625*(114*sqrt(12657)/78125 +
12459439/52734375)**(1/3)) +
4*(114*sqrt(12657)/78125 + 12459439/52734375)**(1/3)]''')
assert solve(eq) == ans
# duplicate radical handling
assert check(unrad(sqrt(x + root(x + 1, 3)) - root(x + 1, 3) - 2),
(s**3 - s**2 - 3*s - 5, [s, s**3 - x - 1]))
# cov post-processing
e = root(x**2 + 1, 3) - root(x**2 - 1, 5) - 2
assert check(unrad(e),
(s**5 - 10*s**4 + 39*s**3 - 80*s**2 + 80*s - 30,
[s, s**3 - x**2 - 1]))
e = sqrt(x + root(x + 1, 2)) - root(x + 1, 3) - 2
assert check(unrad(e),
(s**6 - 2*s**5 - 7*s**4 - 3*s**3 + 26*s**2 + 40*s + 25,
[s, s**3 - x - 1]))
assert check(unrad(e, _reverse=True),
(s**6 - 14*s**5 + 73*s**4 - 187*s**3 + 276*s**2 - 228*s + 89,
[s, s**2 - x - sqrt(x + 1)]))
# this one needs r0, r1 reversal to work
assert check(unrad(sqrt(x + sqrt(root(x, 3) - 1)) - root(x, 6) - 2),
(s**12 - 2*s**8 - 8*s**7 - 8*s**6 + s**4 + 8*s**3 + 23*s**2 +
32*s + 17, [s, s**6 - x]))
# is this needed?
#assert unrad(root(cosh(x), 3)/x*root(x + 1, 5) - 1) == (
# x**15 - x**3*cosh(x)**5 - 3*x**2*cosh(x)**5 - 3*x*cosh(x)**5 - cosh(x)**5, [])
raises(NotImplementedError, lambda:
unrad(sqrt(cosh(x)/x) + root(x + 1,3)*sqrt(x) - 1))
assert unrad(S('(x+y)**(2*y/3) + (x+y)**(1/3) + 1')) is None
assert check(unrad(S('(x+y)**(2*y/3) + (x+y)**(1/3) + 1'), x),
(s**(2*y) + s + 1, [s, s**3 - x - y]))
# This tests two things: that if full unrad is attempted and fails
# the solution should still be found; also it tests that the use of
# composite
assert len(solve(sqrt(y)*x + x**3 - 1, x)) == 3
assert len(solve(-512*y**3 + 1344*(x + 2)**Rational(1, 3)*y**2 -
1176*(x + 2)**Rational(2, 3)*y - 169*x + 686, y, _unrad=False)) == 3
# watch out for when the cov doesn't involve the symbol of interest
eq = S('-x + (7*y/8 - (27*x/2 + 27*sqrt(x**2)/2)**(1/3)/3)**3 - 1')
assert solve(eq, y) == [
4*2**Rational(2, 3)*(27*x + 27*sqrt(x**2))**Rational(1, 3)/21 - (Rational(-1, 2) -
sqrt(3)*I/2)*(x*Rational(-6912, 343) + sqrt((x*Rational(-13824, 343) - Rational(13824, 343))**2)/2 -
Rational(6912, 343))**Rational(1, 3)/3, 4*2**Rational(2, 3)*(27*x + 27*sqrt(x**2))**Rational(1, 3)/21 -
(Rational(-1, 2) + sqrt(3)*I/2)*(x*Rational(-6912, 343) + sqrt((x*Rational(-13824, 343) -
Rational(13824, 343))**2)/2 - Rational(6912, 343))**Rational(1, 3)/3, 4*2**Rational(2, 3)*(27*x +
27*sqrt(x**2))**Rational(1, 3)/21 - (x*Rational(-6912, 343) + sqrt((x*Rational(-13824, 343) -
Rational(13824, 343))**2)/2 - Rational(6912, 343))**Rational(1, 3)/3]
eq = root(x + 1, 3) - (root(x, 3) + root(x, 5))
assert check(unrad(eq),
(3*s**13 + 3*s**11 + s**9 - 1, [s, s**15 - x]))
assert check(unrad(eq - 2),
(3*s**13 + 3*s**11 + 6*s**10 + s**9 + 12*s**8 + 6*s**6 + 12*s**5 +
12*s**3 + 7, [s, s**15 - x]))
assert check(unrad(root(x, 3) - root(x + 1, 4)/2 + root(x + 2, 3)),
(4096*s**13 + 960*s**12 + 48*s**11 - s**10 - 1728*s**4,
[s, s**4 - x - 1])) # orig expr has two real roots: -1, -.389
assert check(unrad(root(x, 3) + root(x + 1, 4) - root(x + 2, 3)/2),
(343*s**13 + 2904*s**12 + 1344*s**11 + 512*s**10 - 1323*s**9 -
3024*s**8 - 1728*s**7 + 1701*s**5 + 216*s**4 - 729*s, [s, s**4 - x -
1])) # orig expr has one real root: -0.048
assert check(unrad(root(x, 3)/2 - root(x + 1, 4) + root(x + 2, 3)),
(729*s**13 - 216*s**12 + 1728*s**11 - 512*s**10 + 1701*s**9 -
3024*s**8 + 1344*s**7 + 1323*s**5 - 2904*s**4 + 343*s, [s, s**4 - x -
1])) # orig expr has 2 real roots: -0.91, -0.15
assert check(unrad(root(x, 3)/2 - root(x + 1, 4) + root(x + 2, 3) - 2),
(729*s**13 + 1242*s**12 + 18496*s**10 + 129701*s**9 + 388602*s**8 +
453312*s**7 - 612864*s**6 - 3337173*s**5 - 6332418*s**4 - 7134912*s**3
- 5064768*s**2 - 2111913*s - 398034, [s, s**4 - x - 1]))
# orig expr has 1 real root: 19.53
ans = solve(sqrt(x) + sqrt(x + 1) -
sqrt(1 - x) - sqrt(2 + x))
assert len(ans) == 1 and NS(ans[0])[:4] == '0.73'
# the fence optimization problem
# https://github.com/sympy/sympy/issues/4793#issuecomment-36994519
F = Symbol('F')
eq = F - (2*x + 2*y + sqrt(x**2 + y**2))
ans = F*Rational(2, 7) - sqrt(2)*F/14
X = solve(eq, x, check=False)
for xi in reversed(X): # reverse since currently, ans is the 2nd one
Y = solve((x*y).subs(x, xi).diff(y), y, simplify=False, check=False)
if any((a - ans).expand().is_zero for a in Y):
break
else:
assert None # no answer was found
assert solve(sqrt(x + 1) + root(x, 3) - 2) == S('''
[(-11/(9*(47/54 + sqrt(93)/6)**(1/3)) + 1/3 + (47/54 +
sqrt(93)/6)**(1/3))**3]''')
assert solve(sqrt(sqrt(x + 1)) + x**Rational(1, 3) - 2) == S('''
[(-sqrt(-2*(-1/16 + sqrt(6913)/16)**(1/3) + 6/(-1/16 +
sqrt(6913)/16)**(1/3) + 17/2 + 121/(4*sqrt(-6/(-1/16 +
sqrt(6913)/16)**(1/3) + 2*(-1/16 + sqrt(6913)/16)**(1/3) + 17/4)))/2 +
sqrt(-6/(-1/16 + sqrt(6913)/16)**(1/3) + 2*(-1/16 +
sqrt(6913)/16)**(1/3) + 17/4)/2 + 9/4)**3]''')
assert solve(sqrt(x) + root(sqrt(x) + 1, 3) - 2) == S('''
[(-(81/2 + 3*sqrt(741)/2)**(1/3)/3 + (81/2 + 3*sqrt(741)/2)**(-1/3) +
2)**2]''')
eq = S('''
-x + (1/2 - sqrt(3)*I/2)*(3*x**3/2 - x*(3*x**2 - 34)/2 + sqrt((-3*x**3
+ x*(3*x**2 - 34) + 90)**2/4 - 39304/27) - 45)**(1/3) + 34/(3*(1/2 -
sqrt(3)*I/2)*(3*x**3/2 - x*(3*x**2 - 34)/2 + sqrt((-3*x**3 + x*(3*x**2
- 34) + 90)**2/4 - 39304/27) - 45)**(1/3))''')
assert check(unrad(eq),
(-s*(-s**6 + sqrt(3)*s**6*I - 153*2**Rational(2, 3)*3**Rational(1, 3)*s**4 +
51*12**Rational(1, 3)*s**4 - 102*2**Rational(2, 3)*3**Rational(5, 6)*s**4*I - 1620*s**3 +
1620*sqrt(3)*s**3*I + 13872*18**Rational(1, 3)*s**2 - 471648 +
471648*sqrt(3)*I), [s, s**3 - 306*x - sqrt(3)*sqrt(31212*x**2 -
165240*x + 61484) + 810]))
assert solve(eq) == [] # not other code errors
eq = root(x, 3) - root(y, 3) + root(x, 5)
assert check(unrad(eq),
(s**15 + 3*s**13 + 3*s**11 + s**9 - y, [s, s**15 - x]))
eq = root(x, 3) + root(y, 3) + root(x*y, 4)
assert check(unrad(eq),
(s*y*(-s**12 - 3*s**11*y - 3*s**10*y**2 - s**9*y**3 -
3*s**8*y**2 + 21*s**7*y**3 - 3*s**6*y**4 - 3*s**4*y**4 -
3*s**3*y**5 - y**6), [s, s**4 - x*y]))
raises(NotImplementedError,
lambda: unrad(root(x, 3) + root(y, 3) + root(x*y, 5)))
# Test unrad with an Equality
eq = Eq(-x**(S(1)/5) + x**(S(1)/3), -3**(S(1)/3) - (-1)**(S(3)/5)*3**(S(1)/5))
assert check(unrad(eq),
(-s**5 + s**3 - 3**(S(1)/3) - (-1)**(S(3)/5)*3**(S(1)/5), [s, s**15 - x]))
@slow
def test_unrad_slow():
# this has roots with multiplicity > 1; there should be no
# repeats in roots obtained, however
eq = (sqrt(1 + sqrt(1 - 4*x**2)) - x*((1 + sqrt(1 + 2*sqrt(1 - 4*x**2)))))
assert solve(eq) == [S.Half]
@XFAIL
def test_unrad_fail():
# this only works if we check real_root(eq.subs(x, Rational(1, 3)))
# but checksol doesn't work like that
assert solve(root(x**3 - 3*x**2, 3) + 1 - x) == [Rational(1, 3)]
assert solve(root(x + 1, 3) + root(x**2 - 2, 5) + 1) == [
-1, -1 + CRootOf(x**5 + x**4 + 5*x**3 + 8*x**2 + 10*x + 5, 0)**3]
def test_checksol():
x, y, r, t = symbols('x, y, r, t')
eq = r - x**2 - y**2
dict_var_soln = {y: - sqrt(r) / sqrt(tan(t)**2 + 1),
x: -sqrt(r)*tan(t)/sqrt(tan(t)**2 + 1)}
assert checksol(eq, dict_var_soln) == True
assert checksol(Eq(x, False), {x: False}) is True
assert checksol(Ne(x, False), {x: False}) is False
assert checksol(Eq(x < 1, True), {x: 0}) is True
assert checksol(Eq(x < 1, True), {x: 1}) is False
assert checksol(Eq(x < 1, False), {x: 1}) is True
assert checksol(Eq(x < 1, False), {x: 0}) is False
assert checksol(Eq(x + 1, x**2 + 1), {x: 1}) is True
assert checksol([x - 1, x**2 - 1], x, 1) is True
assert checksol([x - 1, x**2 - 2], x, 1) is False
assert checksol(Poly(x**2 - 1), x, 1) is True
raises(ValueError, lambda: checksol(x, 1))
raises(ValueError, lambda: checksol([], x, 1))
def test__invert():
assert _invert(x - 2) == (2, x)
assert _invert(2) == (2, 0)
assert _invert(exp(1/x) - 3, x) == (1/log(3), x)
assert _invert(exp(1/x + a/x) - 3, x) == ((a + 1)/log(3), x)
assert _invert(a, x) == (a, 0)
def test_issue_4463():
assert solve(-a*x + 2*x*log(x), x) == [exp(a/2)]
assert solve(x**x) == []
assert solve(x**x - 2) == [exp(LambertW(log(2)))]
assert solve(((x - 3)*(x - 2))**((x - 3)*(x - 4))) == [2]
@slow
def test_issue_5114_solvers():
a, b, c, d, e, f, g, h, i, j, k, l, m, n, o, p, q, r = symbols('a:r')
# there is no 'a' in the equation set but this is how the
# problem was originally posed
syms = a, b, c, f, h, k, n
eqs = [b + r/d - c/d,
c*(1/d + 1/e + 1/g) - f/g - r/d,
f*(1/g + 1/i + 1/j) - c/g - h/i,
h*(1/i + 1/l + 1/m) - f/i - k/m,
k*(1/m + 1/o + 1/p) - h/m - n/p,
n*(1/p + 1/q) - k/p]
assert len(solve(eqs, syms, manual=True, check=False, simplify=False)) == 1
def test_issue_5849():
I1, I2, I3, I4, I5, I6 = symbols('I1:7')
dI1, dI4, dQ2, dQ4, Q2, Q4 = symbols('dI1,dI4,dQ2,dQ4,Q2,Q4')
e = (
I1 - I2 - I3,
I3 - I4 - I5,
I4 + I5 - I6,
-I1 + I2 + I6,
-2*I1 - 2*I3 - 2*I5 - 3*I6 - dI1/2 + 12,
-I4 + dQ4,
-I2 + dQ2,
2*I3 + 2*I5 + 3*I6 - Q2,
I4 - 2*I5 + 2*Q4 + dI4
)
ans = [{
dQ4: I3 - I5,
dI1: -4*I2 - 8*I3 - 4*I5 - 6*I6 + 24,
I4: I3 - I5,
dQ2: I2,
Q2: 2*I3 + 2*I5 + 3*I6,
I1: I2 + I3,
Q4: -I3/2 + 3*I5/2 - dI4/2}]
v = I1, I4, Q2, Q4, dI1, dI4, dQ2, dQ4
assert solve(e, *v, manual=True, check=False, dict=True) == ans
assert solve(e, *v, manual=True) == []
# the matrix solver (tested below) doesn't like this because it produces
# a zero row in the matrix. Is this related to issue 4551?
assert [ei.subs(
ans[0]) for ei in e] == [0, 0, I3 - I6, -I3 + I6, 0, 0, 0, 0, 0]
# Should this work at all? Simpler examples fail e.g.:
# solve([x+y+z,x+y],[x,y]) == []
# Here a solution only exists if I3 == I6 which is not generically true.
@XFAIL
def test_issue_5849_matrix():
'''Same as test_issue_5849 but solved with the matrix solver.'''
I1, I2, I3, I4, I5, I6 = symbols('I1:7')
dI1, dI4, dQ2, dQ4, Q2, Q4 = symbols('dI1,dI4,dQ2,dQ4,Q2,Q4')
e = (
I1 - I2 - I3,
I3 - I4 - I5,
I4 + I5 - I6,
-I1 + I2 + I6,
-2*I1 - 2*I3 - 2*I5 - 3*I6 - dI1/2 + 12,
-I4 + dQ4,
-I2 + dQ2,
2*I3 + 2*I5 + 3*I6 - Q2,
I4 - 2*I5 + 2*Q4 + dI4
)
assert solve(e, I1, I4, Q2, Q4, dI1, dI4, dQ2, dQ4) == {
dI4: -I3 + 3*I5 - 2*Q4,
dI1: -4*I2 - 8*I3 - 4*I5 - 6*I6 + 24,
dQ2: I2,
I1: I2 + I3,
Q2: 2*I3 + 2*I5 + 3*I6,
dQ4: I3 - I5,
I4: I3 - I5}
def test_issue_5901():
f, g, h = map(Function, 'fgh')
a = Symbol('a')
D = Derivative(f(x), x)
G = Derivative(g(a), a)
assert solve(f(x) + f(x).diff(x), f(x)) == \
[-D]
assert solve(f(x) - 3, f(x)) == \
[3]
assert solve(f(x) - 3*f(x).diff(x), f(x)) == \
[3*D]
assert solve([f(x) - 3*f(x).diff(x)], f(x)) == \
{f(x): 3*D}
assert solve([f(x) - 3*f(x).diff(x), f(x)**2 - y + 4], f(x), y) == \
[{f(x): 3*D, y: 9*D**2 + 4}]
assert solve(-f(a)**2*g(a)**2 + f(a)**2*h(a)**2 + g(a).diff(a),
h(a), g(a), set=True) == \
([g(a)], set([
(-sqrt(h(a)**2*f(a)**2 + G)/f(a),),
(sqrt(h(a)**2*f(a)**2+ G)/f(a),)]))
args = [f(x).diff(x, 2)*(f(x) + g(x)) - g(x)**2 + 2, f(x), g(x)]
assert set(solve(*args)) == \
set([(-sqrt(2), sqrt(2)), (sqrt(2), -sqrt(2))])
eqs = [f(x)**2 + g(x) - 2*f(x).diff(x), g(x)**2 - 4]
assert solve(eqs, f(x), g(x), set=True) == \
([f(x), g(x)], set([
(-sqrt(2*D - 2), S(2)),
(sqrt(2*D - 2), S(2)),
(-sqrt(2*D + 2), -S(2)),
(sqrt(2*D + 2), -S(2))]))
# the underlying problem was in solve_linear that was not masking off
# anything but a Mul or Add; it now raises an error if it gets anything
# but a symbol and solve handles the substitutions necessary so solve_linear
# won't make this error
raises(
ValueError, lambda: solve_linear(f(x) + f(x).diff(x), symbols=[f(x)]))
assert solve_linear(f(x) + f(x).diff(x), symbols=[x]) == \
(f(x) + Derivative(f(x), x), 1)
assert solve_linear(f(x) + Integral(x, (x, y)), symbols=[x]) == \
(f(x) + Integral(x, (x, y)), 1)
assert solve_linear(f(x) + Integral(x, (x, y)) + x, symbols=[x]) == \
(x + f(x) + Integral(x, (x, y)), 1)
assert solve_linear(f(y) + Integral(x, (x, y)) + x, symbols=[x]) == \
(x, -f(y) - Integral(x, (x, y)))
assert solve_linear(x - f(x)/a + (f(x) - 1)/a, symbols=[x]) == \
(x, 1/a)
assert solve_linear(x + Derivative(2*x, x)) == \
(x, -2)
assert solve_linear(x + Integral(x, y), symbols=[x]) == \
(x, 0)
assert solve_linear(x + Integral(x, y) - 2, symbols=[x]) == \
(x, 2/(y + 1))
assert set(solve(x + exp(x)**2, exp(x))) == \
set([-sqrt(-x), sqrt(-x)])
assert solve(x + exp(x), x, implicit=True) == \
[-exp(x)]
assert solve(cos(x) - sin(x), x, implicit=True) == []
assert solve(x - sin(x), x, implicit=True) == \
[sin(x)]
assert solve(x**2 + x - 3, x, implicit=True) == \
[-x**2 + 3]
assert solve(x**2 + x - 3, x**2, implicit=True) == \
[-x + 3]
def test_issue_5912():
assert set(solve(x**2 - x - 0.1, rational=True)) == \
set([S.Half + sqrt(35)/10, -sqrt(35)/10 + S.Half])
ans = solve(x**2 - x - 0.1, rational=False)
assert len(ans) == 2 and all(a.is_Number for a in ans)
ans = solve(x**2 - x - 0.1)
assert len(ans) == 2 and all(a.is_Number for a in ans)
def test_float_handling():
def test(e1, e2):
return len(e1.atoms(Float)) == len(e2.atoms(Float))
assert solve(x - 0.5, rational=True)[0].is_Rational
assert solve(x - 0.5, rational=False)[0].is_Float
assert solve(x - S.Half, rational=False)[0].is_Rational
assert solve(x - 0.5, rational=None)[0].is_Float
assert solve(x - S.Half, rational=None)[0].is_Rational
assert test(nfloat(1 + 2*x), 1.0 + 2.0*x)
for contain in [list, tuple, set]:
ans = nfloat(contain([1 + 2*x]))
assert type(ans) is contain and test(list(ans)[0], 1.0 + 2.0*x)
k, v = list(nfloat({2*x: [1 + 2*x]}).items())[0]
assert test(k, 2*x) and test(v[0], 1.0 + 2.0*x)
assert test(nfloat(cos(2*x)), cos(2.0*x))
assert test(nfloat(3*x**2), 3.0*x**2)
assert test(nfloat(3*x**2, exponent=True), 3.0*x**2.0)
assert test(nfloat(exp(2*x)), exp(2.0*x))
assert test(nfloat(x/3), x/3.0)
assert test(nfloat(x**4 + 2*x + cos(Rational(1, 3)) + 1),
x**4 + 2.0*x + 1.94495694631474)
# don't call nfloat if there is no solution
tot = 100 + c + z + t
assert solve(((.7 + c)/tot - .6, (.2 + z)/tot - .3, t/tot - .1)) == []
def test_check_assumptions():
x = symbols('x', positive=True)
assert solve(x**2 - 1) == [1]
def test_issue_6056():
assert solve(tanh(x + 3)*tanh(x - 3) - 1) == []
assert solve(tanh(x - 1)*tanh(x + 1) + 1) == \
[I*pi*Rational(-3, 4), -I*pi/4, I*pi/4, I*pi*Rational(3, 4)]
assert solve((tanh(x + 3)*tanh(x - 3) + 1)**2) == \
[I*pi*Rational(-3, 4), -I*pi/4, I*pi/4, I*pi*Rational(3, 4)]
def test_issue_5673():
eq = -x + exp(exp(LambertW(log(x)))*LambertW(log(x)))
assert checksol(eq, x, 2) is True
assert checksol(eq, x, 2, numerical=False) is None
def test_exclude():
R, C, Ri, Vout, V1, Vminus, Vplus, s = \
symbols('R, C, Ri, Vout, V1, Vminus, Vplus, s')
Rf = symbols('Rf', positive=True) # to eliminate Rf = 0 soln
eqs = [C*V1*s + Vplus*(-2*C*s - 1/R),
Vminus*(-1/Ri - 1/Rf) + Vout/Rf,
C*Vplus*s + V1*(-C*s - 1/R) + Vout/R,
-Vminus + Vplus]
assert solve(eqs, exclude=s*C*R) == [
{
Rf: Ri*(C*R*s + 1)**2/(C*R*s),
Vminus: Vplus,
V1: 2*Vplus + Vplus/(C*R*s),
Vout: C*R*Vplus*s + 3*Vplus + Vplus/(C*R*s)},
{
Vplus: 0,
Vminus: 0,
V1: 0,
Vout: 0},
]
# TODO: Investigate why currently solution [0] is preferred over [1].
assert solve(eqs, exclude=[Vplus, s, C]) in [[{
Vminus: Vplus,
V1: Vout/2 + Vplus/2 + sqrt((Vout - 5*Vplus)*(Vout - Vplus))/2,
R: (Vout - 3*Vplus - sqrt(Vout**2 - 6*Vout*Vplus + 5*Vplus**2))/(2*C*Vplus*s),
Rf: Ri*(Vout - Vplus)/Vplus,
}, {
Vminus: Vplus,
V1: Vout/2 + Vplus/2 - sqrt((Vout - 5*Vplus)*(Vout - Vplus))/2,
R: (Vout - 3*Vplus + sqrt(Vout**2 - 6*Vout*Vplus + 5*Vplus**2))/(2*C*Vplus*s),
Rf: Ri*(Vout - Vplus)/Vplus,
}], [{
Vminus: Vplus,
Vout: (V1**2 - V1*Vplus - Vplus**2)/(V1 - 2*Vplus),
Rf: Ri*(V1 - Vplus)**2/(Vplus*(V1 - 2*Vplus)),
R: Vplus/(C*s*(V1 - 2*Vplus)),
}]]
def test_high_order_roots():
s = x**5 + 4*x**3 + 3*x**2 + Rational(7, 4)
assert set(solve(s)) == set(Poly(s*4, domain='ZZ').all_roots())
def test_minsolve_linear_system():
def count(dic):
return len([x for x in dic.values() if x == 0])
assert count(solve([x + y + z, y + z + a + t], particular=True, quick=True)) \
== 3
assert count(solve([x + y + z, y + z + a + t], particular=True, quick=False)) \
== 3
assert count(solve([x + y + z, y + z + a], particular=True, quick=True)) == 1
assert count(solve([x + y + z, y + z + a], particular=True, quick=False)) == 2
def test_real_roots():
# cf. issue 6650
x = Symbol('x', real=True)
assert len(solve(x**5 + x**3 + 1)) == 1
def test_issue_6528():
eqs = [
327600995*x**2 - 37869137*x + 1809975124*y**2 - 9998905626,
895613949*x**2 - 273830224*x*y + 530506983*y**2 - 10000000000]
# two expressions encountered are > 1400 ops long so if this hangs
# it is likely because simplification is being done
assert len(solve(eqs, y, x, check=False)) == 4
def test_overdetermined():
x = symbols('x', real=True)
eqs = [Abs(4*x - 7) - 5, Abs(3 - 8*x) - 1]
assert solve(eqs, x) == [(S.Half,)]
assert solve(eqs, x, manual=True) == [(S.Half,)]
assert solve(eqs, x, manual=True, check=False) == [(S.Half,), (S(3),)]
def test_issue_6605():
x = symbols('x')
assert solve(4**(x/2) - 2**(x/3)) == [0, 3*I*pi/log(2)]
# while the first one passed, this one failed
x = symbols('x', real=True)
assert solve(5**(x/2) - 2**(x/3)) == [0]
b = sqrt(6)*sqrt(log(2))/sqrt(log(5))
assert solve(5**(x/2) - 2**(3/x)) == [-b, b]
def test__ispow():
assert _ispow(x**2)
assert not _ispow(x)
assert not _ispow(True)
def test_issue_6644():
eq = -sqrt((m - q)**2 + (-m/(2*q) + S.Half)**2) + sqrt((-m**2/2 - sqrt(
4*m**4 - 4*m**2 + 8*m + 1)/4 - Rational(1, 4))**2 + (m**2/2 - m - sqrt(
4*m**4 - 4*m**2 + 8*m + 1)/4 - Rational(1, 4))**2)
sol = solve(eq, q, simplify=False, check=False)
assert len(sol) == 5
def test_issue_6752():
assert solve([a**2 + a, a - b], [a, b]) == [(-1, -1), (0, 0)]
assert solve([a**2 + a*c, a - b], [a, b]) == [(0, 0), (-c, -c)]
def test_issue_6792():
assert solve(x*(x - 1)**2*(x + 1)*(x**6 - x + 1)) == [
-1, 0, 1, CRootOf(x**6 - x + 1, 0), CRootOf(x**6 - x + 1, 1),
CRootOf(x**6 - x + 1, 2), CRootOf(x**6 - x + 1, 3),
CRootOf(x**6 - x + 1, 4), CRootOf(x**6 - x + 1, 5)]
def test_issues_6819_6820_6821_6248_8692():
# issue 6821
x, y = symbols('x y', real=True)
assert solve(abs(x + 3) - 2*abs(x - 3)) == [1, 9]
assert solve([abs(x) - 2, arg(x) - pi], x) == [(-2,), (2,)]
assert set(solve(abs(x - 7) - 8)) == set([-S.One, S(15)])
# issue 8692
assert solve(Eq(Abs(x + 1) + Abs(x**2 - 7), 9), x) == [
Rational(-1, 2) + sqrt(61)/2, -sqrt(69)/2 + S.Half]
# issue 7145
assert solve(2*abs(x) - abs(x - 1)) == [-1, Rational(1, 3)]
x = symbols('x')
assert solve([re(x) - 1, im(x) - 2], x) == [
{re(x): 1, x: 1 + 2*I, im(x): 2}]
# check for 'dict' handling of solution
eq = sqrt(re(x)**2 + im(x)**2) - 3
assert solve(eq) == solve(eq, x)
i = symbols('i', imaginary=True)
assert solve(abs(i) - 3) == [-3*I, 3*I]
raises(NotImplementedError, lambda: solve(abs(x) - 3))
w = symbols('w', integer=True)
assert solve(2*x**w - 4*y**w, w) == solve((x/y)**w - 2, w)
x, y = symbols('x y', real=True)
assert solve(x + y*I + 3) == {y: 0, x: -3}
# issue 2642
assert solve(x*(1 + I)) == [0]
x, y = symbols('x y', imaginary=True)
assert solve(x + y*I + 3 + 2*I) == {x: -2*I, y: 3*I}
x = symbols('x', real=True)
assert solve(x + y + 3 + 2*I) == {x: -3, y: -2*I}
# issue 6248
f = Function('f')
assert solve(f(x + 1) - f(2*x - 1)) == [2]
assert solve(log(x + 1) - log(2*x - 1)) == [2]
x = symbols('x')
assert solve(2**x + 4**x) == [I*pi/log(2)]
def test_issue_14607():
# issue 14607
s, tau_c, tau_1, tau_2, phi, K = symbols(
's, tau_c, tau_1, tau_2, phi, K')
target = (s**2*tau_1*tau_2 + s*tau_1 + s*tau_2 + 1)/(K*s*(-phi + tau_c))
K_C, tau_I, tau_D = symbols('K_C, tau_I, tau_D',
positive=True, nonzero=True)
PID = K_C*(1 + 1/(tau_I*s) + tau_D*s)
eq = (target - PID).together()
eq *= denom(eq).simplify()
eq = Poly(eq, s)
c = eq.coeffs()
vars = [K_C, tau_I, tau_D]
s = solve(c, vars, dict=True)
assert len(s) == 1
knownsolution = {K_C: -(tau_1 + tau_2)/(K*(phi - tau_c)),
tau_I: tau_1 + tau_2,
tau_D: tau_1*tau_2/(tau_1 + tau_2)}
for var in vars:
assert s[0][var].simplify() == knownsolution[var].simplify()
def test_lambert_multivariate():
from sympy.abc import x, y
assert _filtered_gens(Poly(x + 1/x + exp(x) + y), x) == set([x, exp(x)])
assert _lambert(x, x) == []
assert solve((x**2 - 2*x + 1).subs(x, log(x) + 3*x)) == [LambertW(3*S.Exp1)/3]
assert solve((x**2 - 2*x + 1).subs(x, (log(x) + 3*x)**2 - 1)) == \
[LambertW(3*exp(-sqrt(2)))/3, LambertW(3*exp(sqrt(2)))/3]
assert solve((x**2 - 2*x - 2).subs(x, log(x) + 3*x)) == \
[LambertW(3*exp(1 - sqrt(3)))/3, LambertW(3*exp(1 + sqrt(3)))/3]
eq = (x*exp(x) - 3).subs(x, x*exp(x))
assert solve(eq) == [LambertW(3*exp(-LambertW(3)))]
# coverage test
raises(NotImplementedError, lambda: solve(x - sin(x)*log(y - x), x))
ans = [3, -3*LambertW(-log(3)/3)/log(3)] # 3 and 2.478...
assert solve(x**3 - 3**x, x) == ans
assert set(solve(3*log(x) - x*log(3))) == set(ans)
assert solve(LambertW(2*x) - y, x) == [y*exp(y)/2]
@XFAIL
def test_other_lambert():
assert solve(3*sin(x) - x*sin(3), x) == [3]
assert set(solve(x**a - a**x), x) == set(
[a, -a*LambertW(-log(a)/a)/log(a)])
@slow
def test_lambert_bivariate():
# tests passing current implementation
assert solve((x**2 + x)*exp((x**2 + x)) - 1) == [
Rational(-1, 2) + sqrt(1 + 4*LambertW(1))/2,
Rational(-1, 2) - sqrt(1 + 4*LambertW(1))/2]
assert solve((x**2 + x)*exp((x**2 + x)*2) - 1) == [
Rational(-1, 2) + sqrt(1 + 2*LambertW(2))/2,
Rational(-1, 2) - sqrt(1 + 2*LambertW(2))/2]
assert solve(a/x + exp(x/2), x) == [2*LambertW(-a/2)]
assert solve((a/x + exp(x/2)).diff(x), x) == \
[4*LambertW(-sqrt(2)*sqrt(a)/4), 4*LambertW(sqrt(2)*sqrt(a)/4)]
assert solve((1/x + exp(x/2)).diff(x), x) == \
[4*LambertW(-sqrt(2)/4),
4*LambertW(sqrt(2)/4), # nsimplifies as 2*2**(141/299)*3**(206/299)*5**(205/299)*7**(37/299)/21
4*LambertW(-sqrt(2)/4, -1)]
assert solve(x*log(x) + 3*x + 1, x) == \
[exp(-3 + LambertW(-exp(3)))]
assert solve(-x**2 + 2**x, x) == [2, 4, -2*LambertW(log(2)/2)/log(2)]
assert solve(x**2 - 2**x, x) == [2, 4, -2*LambertW(log(2)/2)/log(2)]
ans = solve(3*x + 5 + 2**(-5*x + 3), x)
assert len(ans) == 1 and ans[0].expand() == \
Rational(-5, 3) + LambertW(-10240*root(2, 3)*log(2)/3)/(5*log(2))
assert solve(5*x - 1 + 3*exp(2 - 7*x), x) == \
[Rational(1, 5) + LambertW(-21*exp(Rational(3, 5))/5)/7]
assert solve((log(x) + x).subs(x, x**2 + 1)) == [
-I*sqrt(-LambertW(1) + 1), sqrt(-1 + LambertW(1))]
# check collection
ax = a**(3*x + 5)
ans = solve(3*log(ax) + b*log(ax) + ax, x)
x0 = 1/log(a)
x1 = sqrt(3)*I
x2 = b + 3
x3 = x2*LambertW(1/x2)/a**5
x4 = x3**Rational(1, 3)/2
assert ans == [
x0*log(x4*(x1 - 1)),
x0*log(-x4*(x1 + 1)),
x0*log(x3)/3]
x1 = LambertW(Rational(1, 3))
x2 = a**(-5)
x3 = 3**Rational(1, 3)
x4 = 3**Rational(5, 6)*I
x5 = x1**Rational(1, 3)*x2**Rational(1, 3)/2
ans = solve(3*log(ax) + ax, x)
assert ans == [
x0*log(3*x1*x2)/3,
x0*log(x5*(-x3 + x4)),
x0*log(-x5*(x3 + x4))]
# coverage
p = symbols('p', positive=True)
eq = 4*2**(2*p + 3) - 2*p - 3
assert _solve_lambert(eq, p, _filtered_gens(Poly(eq), p)) == [
Rational(-3, 2) - LambertW(-4*log(2))/(2*log(2))]
assert set(solve(3**cos(x) - cos(x)**3)) == set(
[acos(3), acos(-3*LambertW(-log(3)/3)/log(3))])
# should give only one solution after using `uniq`
assert solve(2*log(x) - 2*log(z) + log(z + log(x) + log(z)), x) == [
exp(-z + LambertW(2*z**4*exp(2*z))/2)/z]
# cases when p != S.One
# issue 4271
ans = solve((a/x + exp(x/2)).diff(x, 2), x)
x0 = (-a)**Rational(1, 3)
x1 = sqrt(3)*I
x2 = x0/6
assert ans == [
6*LambertW(x0/3),
6*LambertW(x2*(x1 - 1)),
6*LambertW(-x2*(x1 + 1))]
assert solve((1/x + exp(x/2)).diff(x, 2), x) == \
[6*LambertW(Rational(-1, 3)), 6*LambertW(Rational(1, 6) - sqrt(3)*I/6), \
6*LambertW(Rational(1, 6) + sqrt(3)*I/6), 6*LambertW(Rational(-1, 3), -1)]
assert solve(x**2 - y**2/exp(x), x, y, dict=True) == \
[{x: 2*LambertW(-y/2)}, {x: 2*LambertW(y/2)}]
# this is slow but not exceedingly slow
assert solve((x**3)**(x/2) + pi/2, x) == [
exp(LambertW(-2*log(2)/3 + 2*log(pi)/3 + I*pi*Rational(2, 3)))]
def test_rewrite_trig():
assert solve(sin(x) + tan(x)) == [0, -pi, pi, 2*pi]
assert solve(sin(x) + sec(x)) == [
-2*atan(Rational(-1, 2) + sqrt(2)*sqrt(1 - sqrt(3)*I)/2 + sqrt(3)*I/2),
2*atan(S.Half - sqrt(2)*sqrt(1 + sqrt(3)*I)/2 + sqrt(3)*I/2), 2*atan(S.Half
+ sqrt(2)*sqrt(1 + sqrt(3)*I)/2 + sqrt(3)*I/2), 2*atan(S.Half -
sqrt(3)*I/2 + sqrt(2)*sqrt(1 - sqrt(3)*I)/2)]
assert solve(sinh(x) + tanh(x)) == [0, I*pi]
# issue 6157
assert solve(2*sin(x) - cos(x), x) == [atan(S.Half)]
@XFAIL
def test_rewrite_trigh():
# if this import passes then the test below should also pass
from sympy import sech
assert solve(sinh(x) + sech(x)) == [
2*atanh(Rational(-1, 2) + sqrt(5)/2 - sqrt(-2*sqrt(5) + 2)/2),
2*atanh(Rational(-1, 2) + sqrt(5)/2 + sqrt(-2*sqrt(5) + 2)/2),
2*atanh(-sqrt(5)/2 - S.Half + sqrt(2 + 2*sqrt(5))/2),
2*atanh(-sqrt(2 + 2*sqrt(5))/2 - sqrt(5)/2 - S.Half)]
def test_uselogcombine():
eq = z - log(x) + log(y/(x*(-1 + y**2/x**2)))
assert solve(eq, x, force=True) == [-sqrt(y*(y - exp(z))), sqrt(y*(y - exp(z)))]
assert solve(log(x + 3) + log(1 + 3/x) - 3) in [
[-3 + sqrt(-12 + exp(3))*exp(Rational(3, 2))/2 + exp(3)/2,
-sqrt(-12 + exp(3))*exp(Rational(3, 2))/2 - 3 + exp(3)/2],
[-3 + sqrt(-36 + (-exp(3) + 6)**2)/2 + exp(3)/2,
-3 - sqrt(-36 + (-exp(3) + 6)**2)/2 + exp(3)/2],
]
assert solve(log(exp(2*x) + 1) + log(-tanh(x) + 1) - log(2)) == []
def test_atan2():
assert solve(atan2(x, 2) - pi/3, x) == [2*sqrt(3)]
def test_errorinverses():
assert solve(erf(x) - y, x) == [erfinv(y)]
assert solve(erfinv(x) - y, x) == [erf(y)]
assert solve(erfc(x) - y, x) == [erfcinv(y)]
assert solve(erfcinv(x) - y, x) == [erfc(y)]
def test_issue_2725():
R = Symbol('R')
eq = sqrt(2)*R*sqrt(1/(R + 1)) + (R + 1)*(sqrt(2)*sqrt(1/(R + 1)) - 1)
sol = solve(eq, R, set=True)[1]
assert sol == set([(Rational(5, 3) + (Rational(-1, 2) - sqrt(3)*I/2)*(Rational(251, 27) +
sqrt(111)*I/9)**Rational(1, 3) + 40/(9*((Rational(-1, 2) - sqrt(3)*I/2)*(Rational(251, 27) +
sqrt(111)*I/9)**Rational(1, 3))),), (Rational(5, 3) + 40/(9*(Rational(251, 27) +
sqrt(111)*I/9)**Rational(1, 3)) + (Rational(251, 27) + sqrt(111)*I/9)**Rational(1, 3),)])
def test_issue_5114_6611():
# See that it doesn't hang; this solves in about 2 seconds.
# Also check that the solution is relatively small.
# Note: the system in issue 6611 solves in about 5 seconds and has
# an op-count of 138336 (with simplify=False).
b, c, d, e, f, g, h, i, j, k, l, m, n, o, p, q, r = symbols('b:r')
eqs = Matrix([
[b - c/d + r/d], [c*(1/g + 1/e + 1/d) - f/g - r/d],
[-c/g + f*(1/j + 1/i + 1/g) - h/i], [-f/i + h*(1/m + 1/l + 1/i) - k/m],
[-h/m + k*(1/p + 1/o + 1/m) - n/p], [-k/p + n*(1/q + 1/p)]])
v = Matrix([f, h, k, n, b, c])
ans = solve(list(eqs), list(v), simplify=False)
# If time is taken to simplify then then 2617 below becomes
# 1168 and the time is about 50 seconds instead of 2.
assert sum([s.count_ops() for s in ans.values()]) <= 3093
def test_det_quick():
m = Matrix(3, 3, symbols('a:9'))
assert m.det() == det_quick(m) # calls det_perm
m[0, 0] = 1
assert m.det() == det_quick(m) # calls det_minor
m = Matrix(3, 3, list(range(9)))
assert m.det() == det_quick(m) # defaults to .det()
# make sure they work with Sparse
s = SparseMatrix(2, 2, (1, 2, 1, 4))
assert det_perm(s) == det_minor(s) == s.det()
def test_real_imag_splitting():
a, b = symbols('a b', real=True)
assert solve(sqrt(a**2 + b**2) - 3, a) == \
[-sqrt(-b**2 + 9), sqrt(-b**2 + 9)]
a, b = symbols('a b', imaginary=True)
assert solve(sqrt(a**2 + b**2) - 3, a) == []
def test_issue_7110():
y = -2*x**3 + 4*x**2 - 2*x + 5
assert any(ask(Q.real(i)) for i in solve(y))
def test_units():
assert solve(1/x - 1/(2*cm)) == [2*cm]
def test_issue_7547():
A, B, V = symbols('A,B,V')
eq1 = Eq(630.26*(V - 39.0)*V*(V + 39) - A + B, 0)
eq2 = Eq(B, 1.36*10**8*(V - 39))
eq3 = Eq(A, 5.75*10**5*V*(V + 39.0))
sol = Matrix(nsolve(Tuple(eq1, eq2, eq3), [A, B, V], (0, 0, 0)))
assert str(sol) == str(Matrix(
[['4442890172.68209'],
['4289299466.1432'],
['70.5389666628177']]))
def test_issue_7895():
r = symbols('r', real=True)
assert solve(sqrt(r) - 2) == [4]
def test_issue_2777():
# the equations represent two circles
x, y = symbols('x y', real=True)
e1, e2 = sqrt(x**2 + y**2) - 10, sqrt(y**2 + (-x + 10)**2) - 3
a, b = Rational(191, 20), 3*sqrt(391)/20
ans = [(a, -b), (a, b)]
assert solve((e1, e2), (x, y)) == ans
assert solve((e1, e2/(x - a)), (x, y)) == []
# make the 2nd circle's radius be -3
e2 += 6
assert solve((e1, e2), (x, y)) == []
assert solve((e1, e2), (x, y), check=False) == ans
def test_issue_7322():
number = 5.62527e-35
assert solve(x - number, x)[0] == number
def test_nsolve():
raises(ValueError, lambda: nsolve(x, (-1, 1), method='bisect'))
raises(TypeError, lambda: nsolve((x - y + 3,x + y,z - y),(x,y,z),(-50,50)))
raises(TypeError, lambda: nsolve((x + y, x - y), (0, 1)))
@slow
def test_high_order_multivariate():
assert len(solve(a*x**3 - x + 1, x)) == 3
assert len(solve(a*x**4 - x + 1, x)) == 4
assert solve(a*x**5 - x + 1, x) == [] # incomplete solution allowed
raises(NotImplementedError, lambda:
solve(a*x**5 - x + 1, x, incomplete=False))
# result checking must always consider the denominator and CRootOf
# must be checked, too
d = x**5 - x + 1
assert solve(d*(1 + 1/d)) == [CRootOf(d + 1, i) for i in range(5)]
d = x - 1
assert solve(d*(2 + 1/d)) == [S.Half]
def test_base_0_exp_0():
assert solve(0**x - 1) == [0]
assert solve(0**(x - 2) - 1) == [2]
assert solve(S('x*(1/x**0 - x)', evaluate=False)) == \
[0, 1]
def test__simple_dens():
assert _simple_dens(1/x**0, [x]) == set()
assert _simple_dens(1/x**y, [x]) == set([x**y])
assert _simple_dens(1/root(x, 3), [x]) == set([x])
def test_issue_8755():
# This tests two things: that if full unrad is attempted and fails
# the solution should still be found; also it tests the use of
# keyword `composite`.
assert len(solve(sqrt(y)*x + x**3 - 1, x)) == 3
assert len(solve(-512*y**3 + 1344*(x + 2)**Rational(1, 3)*y**2 -
1176*(x + 2)**Rational(2, 3)*y - 169*x + 686, y, _unrad=False)) == 3
@slow
def test_issue_8828():
x1 = 0
y1 = -620
r1 = 920
x2 = 126
y2 = 276
x3 = 51
y3 = 205
r3 = 104
v = x, y, z
f1 = (x - x1)**2 + (y - y1)**2 - (r1 - z)**2
f2 = (x2 - x)**2 + (y2 - y)**2 - z**2
f3 = (x - x3)**2 + (y - y3)**2 - (r3 - z)**2
F = f1,f2,f3
g1 = sqrt((x - x1)**2 + (y - y1)**2) + z - r1
g2 = f2
g3 = sqrt((x - x3)**2 + (y - y3)**2) + z - r3
G = g1,g2,g3
A = solve(F, v)
B = solve(G, v)
C = solve(G, v, manual=True)
p, q, r = [set([tuple(i.evalf(2) for i in j) for j in R]) for R in [A, B, C]]
assert p == q == r
@slow
def test_issue_2840_8155():
assert solve(sin(3*x) + sin(6*x)) == [
0, pi*Rational(-5, 3), pi*Rational(-4, 3), -pi, pi*Rational(-2, 3),
pi*Rational(-4, 9), -pi/3, pi*Rational(-2, 9), pi*Rational(2, 9),
pi/3, pi*Rational(4, 9), pi*Rational(2, 3), pi, pi*Rational(4, 3),
pi*Rational(14, 9), pi*Rational(5, 3), pi*Rational(16, 9), 2*pi,
-2*I*log(-(-1)**Rational(1, 9)), -2*I*log(-(-1)**Rational(2, 9)),
-2*I*log(-sin(pi/18) - I*cos(pi/18)),
-2*I*log(-sin(pi/18) + I*cos(pi/18)),
-2*I*log(sin(pi/18) - I*cos(pi/18)),
-2*I*log(sin(pi/18) + I*cos(pi/18))]
assert solve(2*sin(x) - 2*sin(2*x)) == [
0, pi*Rational(-5, 3), -pi, -pi/3, pi/3, pi, pi*Rational(5, 3)]
def test_issue_9567():
assert solve(1 + 1/(x - 1)) == [0]
def test_issue_11538():
assert solve(x + E) == [-E]
assert solve(x**2 + E) == [-I*sqrt(E), I*sqrt(E)]
assert solve(x**3 + 2*E) == [
-cbrt(2 * E),
cbrt(2)*cbrt(E)/2 - cbrt(2)*sqrt(3)*I*cbrt(E)/2,
cbrt(2)*cbrt(E)/2 + cbrt(2)*sqrt(3)*I*cbrt(E)/2]
assert solve([x + 4, y + E], x, y) == {x: -4, y: -E}
assert solve([x**2 + 4, y + E], x, y) == [
(-2*I, -E), (2*I, -E)]
e1 = x - y**3 + 4
e2 = x + y + 4 + 4 * E
assert len(solve([e1, e2], x, y)) == 3
@slow
def test_issue_12114():
a, b, c, d, e, f, g = symbols('a,b,c,d,e,f,g')
terms = [1 + a*b + d*e, 1 + a*c + d*f, 1 + b*c + e*f,
g - a**2 - d**2, g - b**2 - e**2, g - c**2 - f**2]
s = solve(terms, [a, b, c, d, e, f, g], dict=True)
assert s == [{a: -sqrt(-f**2 - 1), b: -sqrt(-f**2 - 1),
c: -sqrt(-f**2 - 1), d: f, e: f, g: -1},
{a: sqrt(-f**2 - 1), b: sqrt(-f**2 - 1),
c: sqrt(-f**2 - 1), d: f, e: f, g: -1},
{a: -sqrt(3)*f/2 - sqrt(-f**2 + 2)/2,
b: sqrt(3)*f/2 - sqrt(-f**2 + 2)/2, c: sqrt(-f**2 + 2),
d: -f/2 + sqrt(-3*f**2 + 6)/2,
e: -f/2 - sqrt(3)*sqrt(-f**2 + 2)/2, g: 2},
{a: -sqrt(3)*f/2 + sqrt(-f**2 + 2)/2,
b: sqrt(3)*f/2 + sqrt(-f**2 + 2)/2, c: -sqrt(-f**2 + 2),
d: -f/2 - sqrt(-3*f**2 + 6)/2,
e: -f/2 + sqrt(3)*sqrt(-f**2 + 2)/2, g: 2},
{a: sqrt(3)*f/2 - sqrt(-f**2 + 2)/2,
b: -sqrt(3)*f/2 - sqrt(-f**2 + 2)/2, c: sqrt(-f**2 + 2),
d: -f/2 - sqrt(-3*f**2 + 6)/2,
e: -f/2 + sqrt(3)*sqrt(-f**2 + 2)/2, g: 2},
{a: sqrt(3)*f/2 + sqrt(-f**2 + 2)/2,
b: -sqrt(3)*f/2 + sqrt(-f**2 + 2)/2, c: -sqrt(-f**2 + 2),
d: -f/2 + sqrt(-3*f**2 + 6)/2,
e: -f/2 - sqrt(3)*sqrt(-f**2 + 2)/2, g: 2}]
def test_inf():
assert solve(1 - oo*x) == []
assert solve(oo*x, x) == []
assert solve(oo*x - oo, x) == []
def test_issue_12448():
f = Function('f')
fun = [f(i) for i in range(15)]
sym = symbols('x:15')
reps = dict(zip(fun, sym))
(x, y, z), c = sym[:3], sym[3:]
ssym = solve([c[4*i]*x + c[4*i + 1]*y + c[4*i + 2]*z + c[4*i + 3]
for i in range(3)], (x, y, z))
(x, y, z), c = fun[:3], fun[3:]
sfun = solve([c[4*i]*x + c[4*i + 1]*y + c[4*i + 2]*z + c[4*i + 3]
for i in range(3)], (x, y, z))
assert sfun[fun[0]].xreplace(reps).count_ops() == \
ssym[sym[0]].count_ops()
def test_denoms():
assert denoms(x/2 + 1/y) == set([2, y])
assert denoms(x/2 + 1/y, y) == set([y])
assert denoms(x/2 + 1/y, [y]) == set([y])
assert denoms(1/x + 1/y + 1/z, [x, y]) == set([x, y])
assert denoms(1/x + 1/y + 1/z, x, y) == set([x, y])
assert denoms(1/x + 1/y + 1/z, set([x, y])) == set([x, y])
def test_issue_12476():
x0, x1, x2, x3, x4, x5 = symbols('x0 x1 x2 x3 x4 x5')
eqns = [x0**2 - x0, x0*x1 - x1, x0*x2 - x2, x0*x3 - x3, x0*x4 - x4, x0*x5 - x5,
x0*x1 - x1, -x0/3 + x1**2 - 2*x2/3, x1*x2 - x1/3 - x2/3 - x3/3,
x1*x3 - x2/3 - x3/3 - x4/3, x1*x4 - 2*x3/3 - x5/3, x1*x5 - x4, x0*x2 - x2,
x1*x2 - x1/3 - x2/3 - x3/3, -x0/6 - x1/6 + x2**2 - x2/6 - x3/3 - x4/6,
-x1/6 + x2*x3 - x2/3 - x3/6 - x4/6 - x5/6, x2*x4 - x2/3 - x3/3 - x4/3,
x2*x5 - x3, x0*x3 - x3, x1*x3 - x2/3 - x3/3 - x4/3,
-x1/6 + x2*x3 - x2/3 - x3/6 - x4/6 - x5/6,
-x0/6 - x1/6 - x2/6 + x3**2 - x3/3 - x4/6, -x1/3 - x2/3 + x3*x4 - x3/3,
-x2 + x3*x5, x0*x4 - x4, x1*x4 - 2*x3/3 - x5/3, x2*x4 - x2/3 - x3/3 - x4/3,
-x1/3 - x2/3 + x3*x4 - x3/3, -x0/3 - 2*x2/3 + x4**2, -x1 + x4*x5, x0*x5 - x5,
x1*x5 - x4, x2*x5 - x3, -x2 + x3*x5, -x1 + x4*x5, -x0 + x5**2, x0 - 1]
sols = [{x0: 1, x3: Rational(1, 6), x2: Rational(1, 6), x4: Rational(-2, 3), x1: Rational(-2, 3), x5: 1},
{x0: 1, x3: S.Half, x2: Rational(-1, 2), x4: 0, x1: 0, x5: -1},
{x0: 1, x3: Rational(-1, 3), x2: Rational(-1, 3), x4: Rational(1, 3), x1: Rational(1, 3), x5: 1},
{x0: 1, x3: 1, x2: 1, x4: 1, x1: 1, x5: 1},
{x0: 1, x3: Rational(-1, 3), x2: Rational(1, 3), x4: sqrt(5)/3, x1: -sqrt(5)/3, x5: -1},
{x0: 1, x3: Rational(-1, 3), x2: Rational(1, 3), x4: -sqrt(5)/3, x1: sqrt(5)/3, x5: -1}]
assert solve(eqns) == sols
def test_issue_13849():
t = symbols('t')
assert solve((t*(sqrt(5) + sqrt(2)) - sqrt(2), t), t) == []
def test_issue_14860():
from sympy.physics.units import newton, kilo
assert solve(8*kilo*newton + x + y, x) == [-8000*newton - y]
def test_issue_14721():
k, h, a, b = symbols(':4')
assert solve([
-1 + (-k + 1)**2/b**2 + (-h - 1)**2/a**2,
-1 + (-k + 1)**2/b**2 + (-h + 1)**2/a**2,
h, k + 2], h, k, a, b) == [
(0, -2, -b*sqrt(1/(b**2 - 9)), b),
(0, -2, b*sqrt(1/(b**2 - 9)), b)]
assert solve([
h, h/a + 1/b**2 - 2, -h/2 + 1/b**2 - 2], a, h, b) == [
(a, 0, -sqrt(2)/2), (a, 0, sqrt(2)/2)]
assert solve((a + b**2 - 1, a + b**2 - 2)) == []
def test_issue_14779():
x = symbols('x', real=True)
assert solve(sqrt(x**4 - 130*x**2 + 1089) + sqrt(x**4 - 130*x**2
+ 3969) - 96*Abs(x)/x,x) == [sqrt(130)]
def test_issue_15307():
assert solve((y - 2, Mul(x + 3,x - 2, evaluate=False))) == \
[{x: -3, y: 2}, {x: 2, y: 2}]
assert solve((y - 2, Mul(3, x - 2, evaluate=False))) == \
{x: 2, y: 2}
assert solve((y - 2, Add(x + 4, x - 2, evaluate=False))) == \
{x: -1, y: 2}
eq1 = Eq(12513*x + 2*y - 219093, -5726*x - y)
eq2 = Eq(-2*x + 8, 2*x - 40)
assert solve([eq1, eq2]) == {x:12, y:75}
def test_issue_15415():
assert solve(x - 3, x) == [3]
assert solve([x - 3], x) == {x:3}
assert solve(Eq(y + 3*x**2/2, y + 3*x), y) == []
assert solve([Eq(y + 3*x**2/2, y + 3*x)], y) == []
assert solve([Eq(y + 3*x**2/2, y + 3*x), Eq(x, 1)], y) == []
@slow
def test_issue_15731():
# f(x)**g(x)=c
assert solve(Eq((x**2 - 7*x + 11)**(x**2 - 13*x + 42), 1)) == [2, 3, 4, 5, 6, 7]
assert solve((x)**(x + 4) - 4) == [-2]
assert solve((-x)**(-x + 4) - 4) == [2]
assert solve((x**2 - 6)**(x**2 - 2) - 4) == [-2, 2]
assert solve((x**2 - 2*x - 1)**(x**2 - 3) - 1/(1 - 2*sqrt(2))) == [sqrt(2)]
assert solve(x**(x + S.Half) - 4*sqrt(2)) == [S(2)]
assert solve((x**2 + 1)**x - 25) == [2]
assert solve(x**(2/x) - 2) == [2, 4]
assert solve((x/2)**(2/x) - sqrt(2)) == [4, 8]
assert solve(x**(x + S.Half) - Rational(9, 4)) == [Rational(3, 2)]
# a**g(x)=c
assert solve((-sqrt(sqrt(2)))**x - 2) == [4, log(2)/(log(2**Rational(1, 4)) + I*pi)]
assert solve((sqrt(2))**x - sqrt(sqrt(2))) == [S.Half]
assert solve((-sqrt(2))**x + 2*(sqrt(2))) == [3,
(3*log(2)**2 + 4*pi**2 - 4*I*pi*log(2))/(log(2)**2 + 4*pi**2)]
assert solve((sqrt(2))**x - 2*(sqrt(2))) == [3]
assert solve(I**x + 1) == [2]
assert solve((1 + I)**x - 2*I) == [2]
assert solve((sqrt(2) + sqrt(3))**x - (2*sqrt(6) + 5)**Rational(1, 3)) == [Rational(2, 3)]
# bases of both sides are equal
b = Symbol('b')
assert solve(b**x - b**2, x) == [2]
assert solve(b**x - 1/b, x) == [-1]
assert solve(b**x - b, x) == [1]
b = Symbol('b', positive=True)
assert solve(b**x - b**2, x) == [2]
assert solve(b**x - 1/b, x) == [-1]
def test_issue_10933():
assert solve(x**4 + y*(x + 0.1), x) # doesn't fail
assert solve(I*x**4 + x**3 + x**2 + 1.) # doesn't fail
def test_Abs_handling():
x = symbols('x', real=True)
assert solve(abs(x/y), x) == [0]
def test_issue_7982():
x = Symbol('x')
# Test that no exception happens
assert solve([2*x**2 + 5*x + 20 <= 0, x >= 1.5], x) is S.false
# From #8040
assert solve([x**3 - 8.08*x**2 - 56.48*x/5 - 106 >= 0, x - 1 <= 0], [x]) is S.false
def test_issue_14645():
x, y = symbols('x y')
assert solve([x*y - x - y, x*y - x - y], [x, y]) == [(y/(y - 1), y)]
def test_issue_12024():
x, y = symbols('x y')
assert solve(Piecewise((0.0, x < 0.1), (x, x >= 0.1)) - y) == \
[{y: Piecewise((0.0, x < 0.1), (x, True))}]
def test_issue_17452():
assert solve((7**x)**x + pi, x) == [-sqrt(log(pi) + I*pi)/sqrt(log(7)),
sqrt(log(pi) + I*pi)/sqrt(log(7))]
assert solve(x**(x/11) + pi/11, x) == [exp(LambertW(-11*log(11) + 11*log(pi) + 11*I*pi))]
def test_issue_17799():
assert solve(-erf(x**(S(1)/3))**pi + I, x) == []
def test_issue_17650():
x = Symbol('x', real=True)
assert solve(abs((abs(x**2 - 1) - x)) - x) == [1, -1 + sqrt(2), 1 + sqrt(2)]
def test_issue_17882():
eq = -8*x**2/(9*(x**2 - 1)**(S(4)/3)) + 4/(3*(x**2 - 1)**(S(1)/3))
assert unrad(eq) == (4*x**2 - 12, [])
def test_issue_17949():
assert solve(exp(+x+x**2), x) == []
assert solve(exp(-x+x**2), x) == []
assert solve(exp(+x-x**2), x) == []
assert solve(exp(-x-x**2), x) == []
def test_issue_10993():
assert solve(Eq(binomial(x, 2), 3)) == [-2, 3]
assert solve(Eq(pow(x, 2) + binomial(x, 3), x)) == [-4, 0, 1]
assert solve(Eq(binomial(x, 2), 0)) == [0, 1]
assert solve(a+binomial(x, 3), a) == [-binomial(x, 3)]
assert solve(x-binomial(a, 3) + binomial(y, 2) + sin(a), x) == [-sin(a) + binomial(a, 3) - binomial(y, 2)]
assert solve((x+1)-binomial(x+1, 3), x) == [-2, -1, 3]
def test_issue_11553():
eq1 = x + y + 1
eq2 = x + GoldenRatio
assert solve([eq1, eq2], x, y) == {x: -GoldenRatio, y: -1 + GoldenRatio}
eq3 = x + 2 + TribonacciConstant
assert solve([eq1, eq3], x, y) == {x: -2 - TribonacciConstant, y: 1 + TribonacciConstant}
def test_issue_19113_19102():
t = S(1)/3
solve(cos(x)**5-sin(x)**5)
assert solve(4*cos(x)**3 - 2*sin(x)**3) == [
atan(2**(t)), -atan(2**(t)*(1 - sqrt(3)*I)/2),
-atan(2**(t)*(1 + sqrt(3)*I)/2)]
h = S.Half
assert solve(cos(x)**2 + sin(x)) == [
2*atan(-h + sqrt(5)/2 + sqrt(2)*sqrt(1 - sqrt(5))/2),
-2*atan(h + sqrt(5)/2 + sqrt(2)*sqrt(1 + sqrt(5))/2),
-2*atan(-sqrt(5)/2 + h + sqrt(2)*sqrt(1 - sqrt(5))/2),
-2*atan(-sqrt(2)*sqrt(1 + sqrt(5))/2 + h + sqrt(5)/2)]
assert solve(3*cos(x) - sin(x)) == [atan(3)]
def test_issue_19509():
a = S(3)/4
b = S(5)/8
c = sqrt(5)/8
d = sqrt(5)/4
assert solve(1/(x -1)**5 - 1) == [2,
-d + a - sqrt(-b + c),
-d + a + sqrt(-b + c),
d + a - sqrt(-b - c),
d + a + sqrt(-b - c)]
|
1ca9ff19d24748c34b434a7475e7362f2337db3776987c57072702be3322c281
|
from sympy import (acos, acosh, asinh, atan, cos, Derivative, diff,
Dummy, Eq, Ne, exp, Function, I, Integral, LambertW, log, O, pi,
Rational, rootof, S, sin, sqrt, Subs, Symbol, tan, asin, sinh,
Piecewise, symbols, Poly, sec, re, im, atan2, collect, hyper, integrate)
from sympy.solvers.ode import (classify_ode,
homogeneous_order, infinitesimals, checkinfsol,
dsolve)
from sympy.solvers.ode.subscheck import checkodesol, checksysodesol
from sympy.solvers.ode.ode import (_linear_coeff_match,
_undetermined_coefficients_match, classify_sysode,
constant_renumber, constantsimp, get_numbered_constants, solve_ics)
from sympy.functions import airyai, airybi, besselj, bessely
from sympy.solvers.deutils import ode_order
from sympy.testing.pytest import XFAIL, skip, raises, slow, ON_TRAVIS, SKIP
from sympy.utilities.misc import filldedent
C0, C1, C2, C3, C4, C5, C6, C7, C8, C9, C10 = symbols('C0:11')
u, x, y, z = symbols('u,x:z', real=True)
f = Function('f')
g = Function('g')
h = Function('h')
# Note: the tests below may fail (but still be correct) if ODE solver,
# the integral engine, solve(), or even simplify() changes. Also, in
# differently formatted solutions, the arbitrary constants might not be
# equal. Using specific hints in tests can help to avoid this.
# Tests of order higher than 1 should run the solutions through
# constant_renumber because it will normalize it (constant_renumber causes
# dsolve() to return different results on different machines)
def test_get_numbered_constants():
with raises(ValueError):
get_numbered_constants(None)
def test_dsolve_system():
eqs = [f(x).diff(x, 2), g(x).diff(x)]
with raises(ValueError):
dsolve(eqs) # NotImplementedError would be better
eqs = [f(x).diff(x) - x, f(x).diff(x) + x]
with raises(ValueError):
# Could also be NotImplementedError. f(x)=0 is a solution...
dsolve(eqs)
eqs = [f(x, y).diff(x)]
with raises(ValueError):
dsolve(eqs)
eqs = [f(x, y).diff(x)+g(x).diff(x), g(x).diff(x)]
with raises(ValueError):
dsolve(eqs)
def test_dsolve_all_hint():
eq = f(x).diff(x)
output = dsolve(eq, hint='all')
# Match the Dummy variables:
sol1 = output['separable_Integral']
_y = sol1.lhs.args[1][0]
sol1 = output['1st_homogeneous_coeff_subs_dep_div_indep_Integral']
_u1 = sol1.rhs.args[1].args[1][0]
expected = {'Bernoulli_Integral': Eq(f(x), C1 + Integral(0, x)),
'1st_homogeneous_coeff_best': Eq(f(x), C1),
'Bernoulli': Eq(f(x), C1),
'nth_algebraic': Eq(f(x), C1),
'nth_linear_euler_eq_homogeneous': Eq(f(x), C1),
'nth_linear_constant_coeff_homogeneous': Eq(f(x), C1),
'separable': Eq(f(x), C1),
'1st_homogeneous_coeff_subs_indep_div_dep': Eq(f(x), C1),
'nth_algebraic_Integral': Eq(f(x), C1),
'1st_linear': Eq(f(x), C1),
'1st_linear_Integral': Eq(f(x), C1 + Integral(0, x)),
'lie_group': Eq(f(x), C1),
'1st_homogeneous_coeff_subs_dep_div_indep': Eq(f(x), C1),
'1st_homogeneous_coeff_subs_dep_div_indep_Integral': Eq(log(x), C1 + Integral(-1/_u1, (_u1, f(x)/x))),
'1st_power_series': Eq(f(x), C1),
'separable_Integral': Eq(Integral(1, (_y, f(x))), C1 + Integral(0, x)),
'1st_homogeneous_coeff_subs_indep_div_dep_Integral': Eq(f(x), C1),
'best': Eq(f(x), C1),
'best_hint': 'nth_algebraic',
'default': 'nth_algebraic',
'order': 1}
assert output == expected
assert dsolve(eq, hint='best') == Eq(f(x), C1)
def test_dsolve_ics():
# Maybe this should just use one of the solutions instead of raising...
with raises(NotImplementedError):
dsolve(f(x).diff(x) - sqrt(f(x)), ics={f(1):1})
@slow
@XFAIL
def test_nonlinear_3eq_order1_type1():
if ON_TRAVIS:
skip("Too slow for travis.")
a, b, c = symbols('a b c')
eqs = [
a * f(x).diff(x) - (b - c) * g(x) * h(x),
b * g(x).diff(x) - (c - a) * h(x) * f(x),
c * h(x).diff(x) - (a - b) * f(x) * g(x),
]
assert dsolve(eqs) # NotImplementedError
def test_dsolve_euler_rootof():
eq = x**6 * f(x).diff(x, 6) - x*f(x).diff(x) + f(x)
sol = Eq(f(x),
C1*x
+ C2*x**rootof(x**5 - 14*x**4 + 71*x**3 - 154*x**2 + 120*x - 1, 0)
+ C3*x**rootof(x**5 - 14*x**4 + 71*x**3 - 154*x**2 + 120*x - 1, 1)
+ C4*x**rootof(x**5 - 14*x**4 + 71*x**3 - 154*x**2 + 120*x - 1, 2)
+ C5*x**rootof(x**5 - 14*x**4 + 71*x**3 - 154*x**2 + 120*x - 1, 3)
+ C6*x**rootof(x**5 - 14*x**4 + 71*x**3 - 154*x**2 + 120*x - 1, 4)
)
assert dsolve(eq) == sol
def test_linear_2eq_order1_type6_path1_broken():
eqs = [Eq(diff(f(x), x), f(x) + x*g(x)),
Eq(diff(g(x), x), 2*(1 + 2/x)*f(x) + 2*(x - 1/x) * g(x))]
# FIXME: This is not the correct solution:
sol = [
Eq(f(x), (C1 + Integral(C2*x*exp(-2*Integral(1/x, x))*exp(Integral(-2*x - 1, x)), x))*exp(-Integral(-2*x - 1, x))),
Eq(g(x), C1*exp(-2*Integral(1/x, x))
+ 2*(C1 + Integral(C2*x*exp(-2*Integral(1/x, x))*exp(Integral(-2*x - 1, x)), x))*exp(-Integral(-2*x - 1, x)))
]
dsolve_sol = dsolve(eqs)
# FIXME: Comparing solutions with == doesn't work in this case...
assert [ds.lhs for ds in dsolve_sol] == [f(x), g(x)]
assert [ds.rhs.equals(ss.rhs) for ds, ss in zip(dsolve_sol, sol)]
# FIXME: checked in XFAIL test_linear_2eq_order1_type6_path1_broken_check below
@XFAIL
def test_linear_2eq_order1_type6_path1_broken_check():
# See test_linear_2eq_order1_type6_path1_broken above
eqs = [Eq(diff(f(x), x), f(x) + x*g(x)),
Eq(diff(g(x), x), 2*(1 + 2/x)*f(x) + 2*(x - 1/x) * g(x))]
# FIXME: This is not the correct solution:
sol = [
Eq(f(x), (C1 + Integral(C2*x*exp(-2*Integral(1/x, x))*exp(Integral(-2*x - 1, x)), x))*exp(-Integral(-2*x - 1, x))),
Eq(g(x), C1*exp(-2*Integral(1/x, x))
+ 2*(C1 + Integral(C2*x*exp(-2*Integral(1/x, x))*exp(Integral(-2*x - 1, x)), x))*exp(-Integral(-2*x - 1, x)))
]
assert checksysodesol(eqs, sol) == (True, [0, 0]) # XFAIL
def test_linear_2eq_order1_type6_path2_broken():
# This is the reverse of the equations above and should also be handled by
# type6.
eqs = [Eq(diff(g(x), x), 2*(1 + 2/x)*g(x) + 2*(x - 1/x) * f(x)),
Eq(diff(f(x), x), g(x) + x*f(x))]
# FIXME: This is not the correct solution:
sol = [
Eq(g(x), C1*exp(-2*Integral(1/x, x))
+ 2*(C1 + Integral(-C2*exp(-2*Integral(1/x, x))*exp(Integral(-2*x - 1, x)), x))*exp(-Integral(-2*x - 1, x))),
Eq(f(x), (C1 + Integral(-C2*exp(-2*Integral(1/x, x))*exp(Integral(-2*x - 1, x)), x))*exp(-Integral(-2*x - 1, x)))
]
dsolve_sol = dsolve(eqs)
# Comparing solutions with == doesn't work in this case...
assert [ds.lhs for ds in dsolve_sol] == [g(x), f(x)]
assert [ds.rhs.equals(ss.rhs) for ds, ss in zip(dsolve_sol, sol)]
# FIXME: checked in XFAIL test_linear_2eq_order1_type6_path2_broken_check below
@XFAIL
def test_linear_2eq_order1_type6_path2_broken_check():
# See test_linear_2eq_order1_type6_path2_broken above
eqs = [Eq(diff(g(x), x), 2*(1 + 2/x)*g(x) + 2*(x - 1/x) * f(x)),
Eq(diff(f(x), x), g(x) + x*f(x))]
sol = [
Eq(g(x), C1*exp(-2*Integral(1/x, x))
+ 2*(C1 + Integral(-C2*exp(-2*Integral(1/x, x))*exp(Integral(-2*x - 1, x)), x))*exp(-Integral(-2*x - 1, x))),
Eq(f(x), (C1 + Integral(-C2*exp(-2*Integral(1/x, x))*exp(Integral(-2*x - 1, x)), x))*exp(-Integral(-2*x - 1, x)))
]
assert checksysodesol(eqs, sol) == (True, [0, 0]) # XFAIL
def test_nth_euler_imroot():
eq = x**2 * f(x).diff(x, 2) + x * f(x).diff(x) + 4 * f(x) - 1/x
sol = Eq(f(x), C1*sin(2*log(x)) + C2*cos(2*log(x)) + 1/(5*x))
dsolve_sol = dsolve(eq, hint='nth_linear_euler_eq_nonhomogeneous_variation_of_parameters')
assert dsolve_sol == sol
assert checkodesol(eq, sol, order=2, solve_for_func=False)[0]
def test_constant_coeff_circular_atan2():
eq = f(x).diff(x, x) + y*f(x)
sol = Eq(f(x), C1*exp(-x*sqrt(-y)) + C2*exp(x*sqrt(-y)))
assert dsolve(eq) == sol
assert checkodesol(eq, sol, order=2, solve_for_func=False)[0]
def test_linear_2eq_order2_type1_broken1():
eqs = [Eq(f(x).diff(x, 2), 2*f(x) + g(x)),
Eq(g(x).diff(x, 2), -f(x))]
# FIXME: This is not the correct solution:
sol = [
Eq(f(x), 2*C1*(x + 2)*exp(x) + 2*C2*(x + 2)*exp(-x) + 2*C3*x*exp(x) + 2*C4*x*exp(-x)),
Eq(g(x), -2*C1*x*exp(x) - 2*C2*x*exp(-x) + C3*(-2*x + 4)*exp(x) + C4*(-2*x - 4)*exp(-x))
]
assert dsolve(eqs) == sol
# FIXME: checked in XFAIL test_linear_2eq_order2_type1_broken1_check below
@XFAIL
def test_linear_2eq_order2_type1_broken1_check():
# See test_linear_2eq_order2_type1_broken1 above
eqs = [Eq(f(x).diff(x, 2), 2*f(x) + g(x)),
Eq(g(x).diff(x, 2), -f(x))]
# This is the returned solution but it isn't correct:
sol = [
Eq(f(x), 2*C1*(x + 2)*exp(x) + 2*C2*(x + 2)*exp(-x) + 2*C3*x*exp(x) + 2*C4*x*exp(-x)),
Eq(g(x), -2*C1*x*exp(x) - 2*C2*x*exp(-x) + C3*(-2*x + 4)*exp(x) + C4*(-2*x - 4)*exp(-x))
]
assert checksysodesol(eqs, sol) == (True, [0, 0])
@XFAIL
def test_linear_2eq_order2_type1_broken2():
eqs = [Eq(f(x).diff(x, 2), 0),
Eq(g(x).diff(x, 2), f(x))]
sol = [
Eq(f(x), C1 + C2*x),
Eq(g(x), C4 + C3*x + C2*x**3/6 + C1*x**2/2)
]
assert dsolve(eqs) == sol # UnboundLocalError
def test_linear_2eq_order2_type1_broken2_check():
eqs = [Eq(f(x).diff(x, 2), 0),
Eq(g(x).diff(x, 2), f(x))]
sol = [
Eq(f(x), C1 + C2*x),
Eq(g(x), C4 + C3*x + C2*x**3/6 + C1*x**2/2)
]
assert checksysodesol(eqs, sol) == (True, [0, 0])
def test_linear_2eq_order2_type1():
eqs = [Eq(f(x).diff(x, 2), 2*f(x)),
Eq(g(x).diff(x, 2), -f(x) + 2*g(x))]
sol = [
Eq(f(x), 2*sqrt(2)*C1*exp(sqrt(2)*x) + 2*sqrt(2)*C2*exp(-sqrt(2)*x)),
Eq(g(x), -C1*x*exp(sqrt(2)*x) + C2*x*exp(-sqrt(2)*x) + C3*exp(sqrt(2)*x) + C4*exp(-sqrt(2)*x))
]
assert dsolve(eqs) == sol
assert checksysodesol(eqs, sol) == (True, [0, 0])
eqs = [Eq(f(x).diff(x, 2), 2*f(x) + g(x)),
Eq(g(x).diff(x, 2), + 2*g(x))]
sol = [
Eq(f(x), C1*x*exp(sqrt(2)*x) - C2*x*exp(-sqrt(2)*x) + C3*exp(sqrt(2)*x) + C4*exp(-sqrt(2)*x)),
Eq(g(x), 2*sqrt(2)*C1*exp(sqrt(2)*x) + 2*sqrt(2)*C2*exp(-sqrt(2)*x))
]
assert dsolve(eqs) == sol
assert checksysodesol(eqs, sol) == (True, [0, 0])
eqs = [Eq(f(x).diff(x, 2), f(x)),
Eq(g(x).diff(x, 2), f(x))]
sol = [Eq(f(x), C1*exp(x) + C2*exp(-x)),
Eq(g(x), C1*exp(x) + C2*exp(-x) - C3*x - C4)]
assert dsolve(eqs) == sol
assert checksysodesol(eqs, sol) == (True, [0, 0])
eqs = [Eq(f(x).diff(x, 2), f(x) + g(x)),
Eq(g(x).diff(x, 2), -f(x) - g(x))]
sol = [Eq(f(x), C1*x**3 + C2*x**2 + C3*x + C4),
Eq(g(x), -C1*x**3 + 6*C1*x - C2*x**2 + 2*C2 - C3*x - C4)]
assert dsolve(eqs) == sol
assert checksysodesol(eqs, sol) == (True, [0, 0])
def test_linear_2eq_order2_type2():
eqs = [Eq(f(x).diff(x, 2), f(x) + g(x) + 1),
Eq(g(x).diff(x, 2), f(x) + g(x) + 1)]
sol = [Eq(f(x), C1*exp(sqrt(2)*x) + C2*exp(-sqrt(2)*x) + C3*x + C4 - S.Half),
Eq(g(x), C1*exp(sqrt(2)*x) + C2*exp(-sqrt(2)*x) - C3*x - C4 - S.Half)]
assert dsolve(eqs) == sol
assert checksysodesol(eqs, sol) == (True, [0, 0])
eqs = [Eq(f(x).diff(x, 2), f(x) + g(x) + 1),
Eq(g(x).diff(x, 2), -f(x) - g(x) + 1)]
sol = [Eq(f(x), C1*x**3 + C2*x**2 + C3*x + C4 + x**4/12 + x**2/2),
Eq(g(x), -C1*x**3 + 6*C1*x - C2*x**2 + 2*C2 - C3*x - C4 - x**4/12 + x**2/2)]
assert dsolve(eqs) == sol
assert checksysodesol(eqs, sol) == (True, [0, 0])
def test_linear_2eq_order2_type4_broken():
Ca, Cb, Ra, Rb = symbols('Ca, Cb, Ra, Rb')
eq = [f(x).diff(x, 2) + 2*f(x).diff(x) + f(x) + g(x) - 2*exp(I*x),
g(x).diff(x, 2) + 2*g(x).diff(x) + f(x) + g(x) - 2*exp(I*x)]
# FIXME: This is not the correct solution:
# Solution returned with Ca, Ra etc symbols is clearly incorrect:
sol = [
Eq(f(x), C1 + C2*exp(2*x) + C3*exp(x*(1 + sqrt(3))) + C4*exp(x*(-sqrt(3) + 1)) + (I*Ca + Ra)*exp(I*x)),
Eq(g(x), -C1 - 3*C2*exp(2*x) + C3*(-3*sqrt(3) - 4 + (1 + sqrt(3))**2)*exp(x*(1 + sqrt(3)))
+ C4*(-4 + (-sqrt(3) + 1)**2 + 3*sqrt(3))*exp(x*(-sqrt(3) + 1)) + (I*Cb + Rb)*exp(I*x))
]
dsolve_sol = dsolve(eq)
assert dsolve_sol == sol
# FIXME: checked in XFAIL test_linear_2eq_order2_type4_broken_check below
@XFAIL
def test_linear_2eq_order2_type4_broken_check():
# See test_linear_2eq_order2_type4_broken above
Ca, Cb, Ra, Rb = symbols('Ca, Cb, Ra, Rb')
eq = [f(x).diff(x, 2) + 2*f(x).diff(x) + f(x) + g(x) - 2*exp(I*x),
g(x).diff(x, 2) + 2*g(x).diff(x) + f(x) + g(x) - 2*exp(I*x)]
# Solution returned with Ca, Ra etc symbols is clearly incorrect:
sol = [
Eq(f(x), C1 + C2*exp(2*x) + C3*exp(x*(1 + sqrt(3))) + C4*exp(x*(-sqrt(3) + 1)) + (I*Ca + Ra)*exp(I*x)),
Eq(g(x), -C1 - 3*C2*exp(2*x) + C3*(-3*sqrt(3) - 4 + (1 + sqrt(3))**2)*exp(x*(1 + sqrt(3)))
+ C4*(-4 + (-sqrt(3) + 1)**2 + 3*sqrt(3))*exp(x*(-sqrt(3) + 1)) + (I*Cb + Rb)*exp(I*x))
]
assert checksysodesol(eq, sol) == (True, [0, 0]) # Fails here
def test_linear_2eq_order2_type5():
eqs = [Eq(f(x).diff(x, 2), 2*(x*g(x).diff(x) - g(x))),
Eq(g(x).diff(x, 2),-2*(x*f(x).diff(x) - f(x)))]
sol = [Eq(f(x), C3*x + x*Integral((2*C1*cos(x**2) + 2*C2*sin(x**2))/x**2, x)),
Eq(g(x), C4*x + x*Integral((-2*C1*sin(x**2) + 2*C2*cos(x**2))/x**2, x))]
assert dsolve(eqs) == sol
assert checksysodesol(eqs, sol) == (True, [0, 0])
def test_linear_2eq_order2_type8():
eqs = [Eq(f(x).diff(x, 2), 2/x *(x*g(x).diff(x) - g(x))),
Eq(g(x).diff(x, 2),-2/x *(x*f(x).diff(x) - f(x)))]
# FIXME: This is what is returned but it does not seem correct:
sol = [Eq(f(x), C3*x + x*Integral((-C1*cos(Integral(-2, x)) - C2*sin(Integral(-2, x)))/x**2, x)),
Eq(g(x), C4*x + x*Integral((-C1*sin(Integral(-2, x)) + C2*cos(Integral(-2, x)))/x**2, x))]
assert dsolve(eqs) == sol
assert checksysodesol(eqs, sol) == (True, [0, 0]) # Fails here
@XFAIL
def test_nonlinear_3eq_order1_type4():
eqs = [
Eq(f(x).diff(x), (2*h(x)*g(x) - 3*g(x)*h(x))),
Eq(g(x).diff(x), (4*f(x)*h(x) - 2*h(x)*f(x))),
Eq(h(x).diff(x), (3*g(x)*f(x) - 4*f(x)*g(x))),
]
dsolve(eqs) # KeyError when matching
# sol = ?
# assert dsolve_sol == sol
# assert checksysodesol(eqs, dsolve_sol) == (True, [0, 0, 0])
@slow
@XFAIL
def test_nonlinear_3eq_order1_type3():
if ON_TRAVIS:
skip("Too slow for travis.")
eqs = [
Eq(f(x).diff(x), (2*f(x)**2 - 3 )),
Eq(g(x).diff(x), (4 - 2*h(x) )),
Eq(h(x).diff(x), (3*h(x) - 4*f(x)**2)),
]
dsolve(eqs) # Not sure if this finishes...
# sol = ?
# assert dsolve_sol == sol
# assert checksysodesol(eqs, dsolve_sol) == (True, [0, 0, 0])
@XFAIL
def test_nonlinear_3eq_order1_type5():
eqs = [
Eq(f(x).diff(x), f(x)*(2*f(x) - 3*g(x))),
Eq(g(x).diff(x), g(x)*(4*g(x) - 2*h(x))),
Eq(h(x).diff(x), h(x)*(3*h(x) - 4*f(x))),
]
dsolve(eqs) # KeyError
# sol = ?
# assert dsolve_sol == sol
# assert checksysodesol(eqs, dsolve_sol) == (True, [0, 0, 0])
def test_linear_2eq_order1():
x, y, z = symbols('x, y, z', cls=Function)
k, l, m, n = symbols('k, l, m, n', Integer=True)
t = Symbol('t')
x0, y0 = symbols('x0, y0', cls=Function)
eq1 = (Eq(diff(x(t),t), x(t) + y(t) + 9), Eq(diff(y(t),t), 2*x(t) + 5*y(t) + 23))
sol1 = [Eq(x(t), C1*exp(t*(sqrt(6) + 3)) + C2*exp(t*(-sqrt(6) + 3)) - Rational(22, 3)), \
Eq(y(t), C1*(2 + sqrt(6))*exp(t*(sqrt(6) + 3)) + C2*(-sqrt(6) + 2)*exp(t*(-sqrt(6) + 3)) - Rational(5, 3))]
assert checksysodesol(eq1, sol1) == (True, [0, 0])
eq2 = (Eq(diff(x(t),t), x(t) + y(t) + 81), Eq(diff(y(t),t), -2*x(t) + y(t) + 23))
sol2 = [Eq(x(t), (C1*cos(sqrt(2)*t) + C2*sin(sqrt(2)*t))*exp(t) - Rational(58, 3)), \
Eq(y(t), (-sqrt(2)*C1*sin(sqrt(2)*t) + sqrt(2)*C2*cos(sqrt(2)*t))*exp(t) - Rational(185, 3))]
assert checksysodesol(eq2, sol2) == (True, [0, 0])
eq3 = (Eq(diff(x(t),t), 5*t*x(t) + 2*y(t)), Eq(diff(y(t),t), 2*x(t) + 5*t*y(t)))
sol3 = [Eq(x(t), (C1*exp(2*t) + C2*exp(-2*t))*exp(Rational(5, 2)*t**2)), \
Eq(y(t), (C1*exp(2*t) - C2*exp(-2*t))*exp(Rational(5, 2)*t**2))]
assert checksysodesol(eq3, sol3) == (True, [0, 0])
eq4 = (Eq(diff(x(t),t), 5*t*x(t) + t**2*y(t)), Eq(diff(y(t),t), -t**2*x(t) + 5*t*y(t)))
sol4 = [Eq(x(t), (C1*cos((t**3)/3) + C2*sin((t**3)/3))*exp(Rational(5, 2)*t**2)), \
Eq(y(t), (-C1*sin((t**3)/3) + C2*cos((t**3)/3))*exp(Rational(5, 2)*t**2))]
assert checksysodesol(eq4, sol4) == (True, [0, 0])
eq5 = (Eq(diff(x(t),t), 5*t*x(t) + t**2*y(t)), Eq(diff(y(t),t), -t**2*x(t) + (5*t+9*t**2)*y(t)))
sol5 = [Eq(x(t), (C1*exp((sqrt(77)/2 + Rational(9, 2))*(t**3)/3) + \
C2*exp((-sqrt(77)/2 + Rational(9, 2))*(t**3)/3))*exp(Rational(5, 2)*t**2)), \
Eq(y(t), (C1*(sqrt(77)/2 + Rational(9, 2))*exp((sqrt(77)/2 + Rational(9, 2))*(t**3)/3) + \
C2*(-sqrt(77)/2 + Rational(9, 2))*exp((-sqrt(77)/2 + Rational(9, 2))*(t**3)/3))*exp(Rational(5, 2)*t**2))]
assert checksysodesol(eq5, sol5) == (True, [0, 0])
eq6 = (Eq(diff(x(t),t), 5*t*x(t) + t**2*y(t)), Eq(diff(y(t),t), (1-t**2)*x(t) + (5*t+9*t**2)*y(t)))
sol6 = [Eq(x(t), C1*x0(t) + C2*x0(t)*Integral(t**2*exp(Integral(5*t, t))*exp(Integral(9*t**2 + 5*t, t))/x0(t)**2, t)), \
Eq(y(t), C1*y0(t) + C2*(y0(t)*Integral(t**2*exp(Integral(5*t, t))*exp(Integral(9*t**2 + 5*t, t))/x0(t)**2, t) + \
exp(Integral(5*t, t))*exp(Integral(9*t**2 + 5*t, t))/x0(t)))]
s = dsolve(eq6)
assert s == sol6 # too complicated to test with subs and simplify
# assert checksysodesol(eq10, sol10) == (True, [0, 0]) # this one fails
@slow
def test_linear_2eq_order2():
x, y, z = symbols('x, y, z', cls=Function)
k, l, m, n = symbols('k, l, m, n', Integer=True)
t, l = symbols('t, l')
x0, y0 = symbols('x0, y0', cls=Function)
eq1 = (Eq(diff(x(t),t,t), 5*x(t) + 43*y(t)), Eq(diff(y(t),t,t), x(t) + 9*y(t)))
sol1 = [Eq(x(t), 43*C1*exp(t*rootof(l**4 - 14*l**2 + 2, 0)) + 43*C2*exp(t*rootof(l**4 - 14*l**2 + 2, 1)) + \
43*C3*exp(t*rootof(l**4 - 14*l**2 + 2, 2)) + 43*C4*exp(t*rootof(l**4 - 14*l**2 + 2, 3))), \
Eq(y(t), C1*(rootof(l**4 - 14*l**2 + 2, 0)**2 - 5)*exp(t*rootof(l**4 - 14*l**2 + 2, 0)) + \
C2*(rootof(l**4 - 14*l**2 + 2, 1)**2 - 5)*exp(t*rootof(l**4 - 14*l**2 + 2, 1)) + \
C3*(rootof(l**4 - 14*l**2 + 2, 2)**2 - 5)*exp(t*rootof(l**4 - 14*l**2 + 2, 2)) + \
C4*(rootof(l**4 - 14*l**2 + 2, 3)**2 - 5)*exp(t*rootof(l**4 - 14*l**2 + 2, 3)))]
assert dsolve(eq1) == sol1
# FIXME: assert checksysodesol(eq1, sol1) == (True, [0, 0]) # this one fails
eq2 = (Eq(diff(x(t),t,t), 8*x(t)+3*y(t)+31), Eq(diff(y(t),t,t), 9*x(t)+7*y(t)+12))
sol2 = [Eq(x(t), 3*C1*exp(t*rootof(l**4 - 15*l**2 + 29, 0)) + 3*C2*exp(t*rootof(l**4 - 15*l**2 + 29, 1)) + \
3*C3*exp(t*rootof(l**4 - 15*l**2 + 29, 2)) + 3*C4*exp(t*rootof(l**4 - 15*l**2 + 29, 3)) - Rational(181, 29)), \
Eq(y(t), C1*(rootof(l**4 - 15*l**2 + 29, 0)**2 - 8)*exp(t*rootof(l**4 - 15*l**2 + 29, 0)) + \
C2*(rootof(l**4 - 15*l**2 + 29, 1)**2 - 8)*exp(t*rootof(l**4 - 15*l**2 + 29, 1)) + \
C3*(rootof(l**4 - 15*l**2 + 29, 2)**2 - 8)*exp(t*rootof(l**4 - 15*l**2 + 29, 2)) + \
C4*(rootof(l**4 - 15*l**2 + 29, 3)**2 - 8)*exp(t*rootof(l**4 - 15*l**2 + 29, 3)) + Rational(183, 29))]
assert dsolve(eq2) == sol2
# FIXME: assert checksysodesol(eq2, sol2) == (True, [0, 0]) # this one fails
eq3 = (Eq(diff(x(t),t,t) - 9*diff(y(t),t) + 7*x(t),0), Eq(diff(y(t),t,t) + 9*diff(x(t),t) + 7*y(t),0))
sol3 = [Eq(x(t), C1*cos(t*(Rational(9, 2) + sqrt(109)/2)) + C2*sin(t*(Rational(9, 2) + sqrt(109)/2)) + C3*cos(t*(-sqrt(109)/2 + Rational(9, 2))) + \
C4*sin(t*(-sqrt(109)/2 + Rational(9, 2)))), Eq(y(t), -C1*sin(t*(Rational(9, 2) + sqrt(109)/2)) + C2*cos(t*(Rational(9, 2) + sqrt(109)/2)) - \
C3*sin(t*(-sqrt(109)/2 + Rational(9, 2))) + C4*cos(t*(-sqrt(109)/2 + Rational(9, 2))))]
assert dsolve(eq3) == sol3
assert checksysodesol(eq3, sol3) == (True, [0, 0])
eq4 = (Eq(diff(x(t),t,t), 9*t*diff(y(t),t)-9*y(t)), Eq(diff(y(t),t,t),7*t*diff(x(t),t)-7*x(t)))
sol4 = [Eq(x(t), C3*t + t*Integral((9*C1*exp(3*sqrt(7)*t**2/2) + 9*C2*exp(-3*sqrt(7)*t**2/2))/t**2, t)), \
Eq(y(t), C4*t + t*Integral((3*sqrt(7)*C1*exp(3*sqrt(7)*t**2/2) - 3*sqrt(7)*C2*exp(-3*sqrt(7)*t**2/2))/t**2, t))]
assert dsolve(eq4) == sol4
assert checksysodesol(eq4, sol4) == (True, [0, 0])
eq5 = (Eq(diff(x(t),t,t), (log(t)+t**2)*diff(x(t),t)+(log(t)+t**2)*3*diff(y(t),t)), Eq(diff(y(t),t,t), \
(log(t)+t**2)*2*diff(x(t),t)+(log(t)+t**2)*9*diff(y(t),t)))
sol5 = [Eq(x(t), -sqrt(22)*(C1*Integral(exp((-sqrt(22) + 5)*Integral(t**2 + log(t), t)), t) + C2 - \
C3*Integral(exp((sqrt(22) + 5)*Integral(t**2 + log(t), t)), t) - C4 - \
(sqrt(22) + 5)*(C1*Integral(exp((-sqrt(22) + 5)*Integral(t**2 + log(t), t)), t) + C2) + \
(-sqrt(22) + 5)*(C3*Integral(exp((sqrt(22) + 5)*Integral(t**2 + log(t), t)), t) + C4))/88), \
Eq(y(t), -sqrt(22)*(C1*Integral(exp((-sqrt(22) + 5)*Integral(t**2 + log(t), t)), t) + \
C2 - C3*Integral(exp((sqrt(22) + 5)*Integral(t**2 + log(t), t)), t) - C4)/44)]
assert dsolve(eq5) == sol5
assert checksysodesol(eq5, sol5) == (True, [0, 0])
eq6 = (Eq(diff(x(t),t,t), log(t)*t*diff(y(t),t) - log(t)*y(t)), Eq(diff(y(t),t,t), log(t)*t*diff(x(t),t) - log(t)*x(t)))
sol6 = [Eq(x(t), C3*t + t*Integral((C1*exp(Integral(t*log(t), t)) + \
C2*exp(-Integral(t*log(t), t)))/t**2, t)), Eq(y(t), C4*t + t*Integral((C1*exp(Integral(t*log(t), t)) - \
C2*exp(-Integral(t*log(t), t)))/t**2, t))]
assert dsolve(eq6) == sol6
assert checksysodesol(eq6, sol6) == (True, [0, 0])
eq7 = (Eq(diff(x(t),t,t), log(t)*(t*diff(x(t),t) - x(t)) + exp(t)*(t*diff(y(t),t) - y(t))), \
Eq(diff(y(t),t,t), (t**2)*(t*diff(x(t),t) - x(t)) + (t)*(t*diff(y(t),t) - y(t))))
sol7 = [Eq(x(t), C3*t + t*Integral((C1*x0(t) + C2*x0(t)*Integral(t*exp(t)*exp(Integral(t**2, t))*\
exp(Integral(t*log(t), t))/x0(t)**2, t))/t**2, t)), Eq(y(t), C4*t + t*Integral((C1*y0(t) + \
C2*(y0(t)*Integral(t*exp(t)*exp(Integral(t**2, t))*exp(Integral(t*log(t), t))/x0(t)**2, t) + \
exp(Integral(t**2, t))*exp(Integral(t*log(t), t))/x0(t)))/t**2, t))]
assert dsolve(eq7) == sol7
# FIXME: assert checksysodesol(eq7, sol7) == (True, [0, 0])
eq8 = (Eq(diff(x(t),t,t), t*(4*x(t) + 9*y(t))), Eq(diff(y(t),t,t), t*(12*x(t) - 6*y(t))))
sol8 = [Eq(x(t), -sqrt(133)*(-4*C1*airyai(t*(-1 + sqrt(133))**(S(1)/3)) + 4*C1*airyai(-t*(1 + \
sqrt(133))**(S(1)/3)) - 4*C2*airybi(t*(-1 + sqrt(133))**(S(1)/3)) + 4*C2*airybi(-t*(1 + sqrt(133))**(S(1)/3)) +\
(-sqrt(133) - 1)*(C1*airyai(t*(-1 + sqrt(133))**(S(1)/3)) + C2*airybi(t*(-1 + sqrt(133))**(S(1)/3))) - (-1 +\
sqrt(133))*(C1*airyai(-t*(1 + sqrt(133))**(S(1)/3)) + C2*airybi(-t*(1 + sqrt(133))**(S(1)/3))))/3192), \
Eq(y(t), -sqrt(133)*(-C1*airyai(t*(-1 + sqrt(133))**(S(1)/3)) + C1*airyai(-t*(1 + sqrt(133))**(S(1)/3)) -\
C2*airybi(t*(-1 + sqrt(133))**(S(1)/3)) + C2*airybi(-t*(1 + sqrt(133))**(S(1)/3)))/266)]
assert dsolve(eq8) == sol8
assert checksysodesol(eq8, sol8) == (True, [0, 0])
assert filldedent(dsolve(eq8)) == filldedent('''
[Eq(x(t), -sqrt(133)*(-4*C1*airyai(t*(-1 + sqrt(133))**(1/3)) +
4*C1*airyai(-t*(1 + sqrt(133))**(1/3)) - 4*C2*airybi(t*(-1 +
sqrt(133))**(1/3)) + 4*C2*airybi(-t*(1 + sqrt(133))**(1/3)) +
(-sqrt(133) - 1)*(C1*airyai(t*(-1 + sqrt(133))**(1/3)) +
C2*airybi(t*(-1 + sqrt(133))**(1/3))) - (-1 +
sqrt(133))*(C1*airyai(-t*(1 + sqrt(133))**(1/3)) + C2*airybi(-t*(1 +
sqrt(133))**(1/3))))/3192), Eq(y(t), -sqrt(133)*(-C1*airyai(t*(-1 +
sqrt(133))**(1/3)) + C1*airyai(-t*(1 + sqrt(133))**(1/3)) -
C2*airybi(t*(-1 + sqrt(133))**(1/3)) + C2*airybi(-t*(1 +
sqrt(133))**(1/3)))/266)]''')
assert checksysodesol(eq8, sol8) == (True, [0, 0])
eq9 = (Eq(diff(x(t),t,t), t*(4*diff(x(t),t) + 9*diff(y(t),t))), Eq(diff(y(t),t,t), t*(12*diff(x(t),t) - 6*diff(y(t),t))))
sol9 = [Eq(x(t), -sqrt(133)*(4*C1*Integral(exp((-sqrt(133) - 1)*Integral(t, t)), t) + 4*C2 - \
4*C3*Integral(exp((-1 + sqrt(133))*Integral(t, t)), t) - 4*C4 - (-1 + sqrt(133))*(C1*Integral(exp((-sqrt(133) - \
1)*Integral(t, t)), t) + C2) + (-sqrt(133) - 1)*(C3*Integral(exp((-1 + sqrt(133))*Integral(t, t)), t) + \
C4))/3192), Eq(y(t), -sqrt(133)*(C1*Integral(exp((-sqrt(133) - 1)*Integral(t, t)), t) + C2 - \
C3*Integral(exp((-1 + sqrt(133))*Integral(t, t)), t) - C4)/266)]
assert dsolve(eq9) == sol9
assert checksysodesol(eq9, sol9) == (True, [0, 0])
eq10 = (t**2*diff(x(t),t,t) + 3*t*diff(x(t),t) + 4*t*diff(y(t),t) + 12*x(t) + 9*y(t), \
t**2*diff(y(t),t,t) + 2*t*diff(x(t),t) - 5*t*diff(y(t),t) + 15*x(t) + 8*y(t))
sol10 = [Eq(x(t), -C1*(-2*sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)) + 13 + 2*sqrt(-284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + \
4 + 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) - 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + \
346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3))))*exp((-sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + \
4 + 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3))/2 + 1 + sqrt(-284/sqrt(-346/(3*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) - 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3) + 8 + 346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)))/2)*log(t)) - \
C2*(-2*sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + \
13 - 2*sqrt(-284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)) - 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + 346/(3*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3))))*exp((-sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + \
2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3))/2 + 1 - sqrt(-284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + \
4 + 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) - 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + 346/(3*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)))/2)*log(t)) - C3*t**(1 + sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + \
2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3))/2 + sqrt(-2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + 346/(3*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)) + 284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)))/2)*(2*sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)) + 13 + 2*sqrt(-2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + 346/(3*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)) + 284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)))) - C4*t**(-sqrt(-2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + 346/(3*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)) + 284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)))/2 + 1 + sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3))/2)*(-2*sqrt(-2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + 346/(3*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)) + 284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3))) + 2*sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)) + 13)), Eq(y(t), C1*(-sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + \
2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 14 + (-sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + \
2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3))/2 + 1 + sqrt(-284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + \
4 + 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) - 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + 346/(3*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)))/2)**2 + sqrt(-284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + \
2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) - 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + 346/(3*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3))))*exp((-sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3))/2 + 1 + sqrt(-284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + \
2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) - 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + 346/(3*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)))/2)*log(t)) + C2*(-sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + \
2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 14 - sqrt(-284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + \
4 + 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) - 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + 346/(3*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3))) + (-sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3))/2 + 1 - sqrt(-284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + \
2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) - 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + 346/(3*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)))/2)**2)*exp((-sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3))/2 + 1 - sqrt(-284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + \
2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) - 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + 346/(3*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)))/2)*log(t)) + C3*t**(1 + sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + \
2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3))/2 + sqrt(-2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + 346/(3*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)) + 284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)))/2)*(sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)) + sqrt(-2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + 346/(3*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)) + 284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3))) + 14 + (1 + sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3))/2 + sqrt(-2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + 346/(3*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)) + 284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)))/2)**2) + C4*t**(-sqrt(-2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + \
346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + \
4 + 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)))/2 + 1 + sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + \
4 + 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3))/2)*(-sqrt(-2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + \
8 + 346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + \
4 + 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3))) + (-sqrt(-2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3) + 8 + \
346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 284/sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + \
4 + 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)))/2 + 1 + sqrt(-346/(3*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + \
4 + 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3))/2)**2 + sqrt(-346/(3*(Rational(4333, 4) + \
5*sqrt(70771857)/36)**Rational(1, 3)) + 4 + 2*(Rational(4333, 4) + 5*sqrt(70771857)/36)**Rational(1, 3)) + 14))]
assert dsolve(eq10) == sol10
# FIXME: assert checksysodesol(eq10, sol10) == (True, [0, 0]) # this hangs or at least takes a while...
def test_nonlinear_2eq_order1():
x, y, z = symbols('x, y, z', cls=Function)
t = Symbol('t')
eq1 = (Eq(diff(x(t),t),x(t)*y(t)**3), Eq(diff(y(t),t),y(t)**5))
sol1 = [
Eq(x(t), C1*exp((-1/(4*C2 + 4*t))**(Rational(-1, 4)))),
Eq(y(t), -(-1/(4*C2 + 4*t))**Rational(1, 4)),
Eq(x(t), C1*exp(-1/(-1/(4*C2 + 4*t))**Rational(1, 4))),
Eq(y(t), (-1/(4*C2 + 4*t))**Rational(1, 4)),
Eq(x(t), C1*exp(-I/(-1/(4*C2 + 4*t))**Rational(1, 4))),
Eq(y(t), -I*(-1/(4*C2 + 4*t))**Rational(1, 4)),
Eq(x(t), C1*exp(I/(-1/(4*C2 + 4*t))**Rational(1, 4))),
Eq(y(t), I*(-1/(4*C2 + 4*t))**Rational(1, 4))]
assert dsolve(eq1) == sol1
assert checksysodesol(eq1, sol1) == (True, [0, 0])
eq2 = (Eq(diff(x(t),t), exp(3*x(t))*y(t)**3),Eq(diff(y(t),t), y(t)**5))
sol2 = [
Eq(x(t), -log(C1 - 3/(-1/(4*C2 + 4*t))**Rational(1, 4))/3),
Eq(y(t), -(-1/(4*C2 + 4*t))**Rational(1, 4)),
Eq(x(t), -log(C1 + 3/(-1/(4*C2 + 4*t))**Rational(1, 4))/3),
Eq(y(t), (-1/(4*C2 + 4*t))**Rational(1, 4)),
Eq(x(t), -log(C1 + 3*I/(-1/(4*C2 + 4*t))**Rational(1, 4))/3),
Eq(y(t), -I*(-1/(4*C2 + 4*t))**Rational(1, 4)),
Eq(x(t), -log(C1 - 3*I/(-1/(4*C2 + 4*t))**Rational(1, 4))/3),
Eq(y(t), I*(-1/(4*C2 + 4*t))**Rational(1, 4))]
assert dsolve(eq2) == sol2
assert checksysodesol(eq2, sol2) == (True, [0, 0])
eq3 = (Eq(diff(x(t),t), y(t)*x(t)), Eq(diff(y(t),t), x(t)**3))
tt = Rational(2, 3)
sol3 = [
Eq(x(t), 6**tt/(6*(-sinh(sqrt(C1)*(C2 + t)/2)/sqrt(C1))**tt)),
Eq(y(t), sqrt(C1 + C1/sinh(sqrt(C1)*(C2 + t)/2)**2)/3)]
assert dsolve(eq3) == sol3
# FIXME: assert checksysodesol(eq3, sol3) == (True, [0, 0])
eq4 = (Eq(diff(x(t),t),x(t)*y(t)*sin(t)**2), Eq(diff(y(t),t),y(t)**2*sin(t)**2))
sol4 = set([Eq(x(t), -2*exp(C1)/(C2*exp(C1) + t - sin(2*t)/2)), Eq(y(t), -2/(C1 + t - sin(2*t)/2))])
assert dsolve(eq4) == sol4
# FIXME: assert checksysodesol(eq4, sol4) == (True, [0, 0])
eq5 = (Eq(x(t),t*diff(x(t),t)+diff(x(t),t)*diff(y(t),t)), Eq(y(t),t*diff(y(t),t)+diff(y(t),t)**2))
sol5 = set([Eq(x(t), C1*C2 + C1*t), Eq(y(t), C2**2 + C2*t)])
assert dsolve(eq5) == sol5
assert checksysodesol(eq5, sol5) == (True, [0, 0])
eq6 = (Eq(diff(x(t),t),x(t)**2*y(t)**3), Eq(diff(y(t),t),y(t)**5))
sol6 = [
Eq(x(t), 1/(C1 - 1/(-1/(4*C2 + 4*t))**Rational(1, 4))),
Eq(y(t), -(-1/(4*C2 + 4*t))**Rational(1, 4)),
Eq(x(t), 1/(C1 + (-1/(4*C2 + 4*t))**(Rational(-1, 4)))),
Eq(y(t), (-1/(4*C2 + 4*t))**Rational(1, 4)),
Eq(x(t), 1/(C1 + I/(-1/(4*C2 + 4*t))**Rational(1, 4))),
Eq(y(t), -I*(-1/(4*C2 + 4*t))**Rational(1, 4)),
Eq(x(t), 1/(C1 - I/(-1/(4*C2 + 4*t))**Rational(1, 4))),
Eq(y(t), I*(-1/(4*C2 + 4*t))**Rational(1, 4))]
assert dsolve(eq6) == sol6
assert checksysodesol(eq6, sol6) == (True, [0, 0])
@slow
def test_nonlinear_3eq_order1():
x, y, z = symbols('x, y, z', cls=Function)
t, u = symbols('t u')
eq1 = (4*diff(x(t),t) + 2*y(t)*z(t), 3*diff(y(t),t) - z(t)*x(t), 5*diff(z(t),t) - x(t)*y(t))
sol1 = [Eq(4*Integral(1/(sqrt(-4*u**2 - 3*C1 + C2)*sqrt(-4*u**2 + 5*C1 - C2)), (u, x(t))),
C3 - sqrt(15)*t/15), Eq(3*Integral(1/(sqrt(-6*u**2 - C1 + 5*C2)*sqrt(3*u**2 + C1 - 4*C2)),
(u, y(t))), C3 + sqrt(5)*t/10), Eq(5*Integral(1/(sqrt(-10*u**2 - 3*C1 + C2)*
sqrt(5*u**2 + 4*C1 - C2)), (u, z(t))), C3 + sqrt(3)*t/6)]
assert [i.dummy_eq(j) for i, j in zip(dsolve(eq1), sol1)]
# FIXME: assert checksysodesol(eq1, sol1) == (True, [0, 0, 0])
eq2 = (4*diff(x(t),t) + 2*y(t)*z(t)*sin(t), 3*diff(y(t),t) - z(t)*x(t)*sin(t), 5*diff(z(t),t) - x(t)*y(t)*sin(t))
sol2 = [Eq(3*Integral(1/(sqrt(-6*u**2 - C1 + 5*C2)*sqrt(3*u**2 + C1 - 4*C2)), (u, x(t))), C3 +
sqrt(5)*cos(t)/10), Eq(4*Integral(1/(sqrt(-4*u**2 - 3*C1 + C2)*sqrt(-4*u**2 + 5*C1 - C2)),
(u, y(t))), C3 - sqrt(15)*cos(t)/15), Eq(5*Integral(1/(sqrt(-10*u**2 - 3*C1 + C2)*
sqrt(5*u**2 + 4*C1 - C2)), (u, z(t))), C3 + sqrt(3)*cos(t)/6)]
assert [i.dummy_eq(j) for i, j in zip(dsolve(eq2), sol2)]
# FIXME: assert checksysodesol(eq2, sol2) == (True, [0, 0, 0])
@slow
def test_dsolve_options():
eq = x*f(x).diff(x) + f(x)
a = dsolve(eq, hint='all')
b = dsolve(eq, hint='all', simplify=False)
c = dsolve(eq, hint='all_Integral')
keys = ['1st_exact', '1st_exact_Integral', '1st_homogeneous_coeff_best',
'1st_homogeneous_coeff_subs_dep_div_indep',
'1st_homogeneous_coeff_subs_dep_div_indep_Integral',
'1st_homogeneous_coeff_subs_indep_div_dep',
'1st_homogeneous_coeff_subs_indep_div_dep_Integral', '1st_linear',
'1st_linear_Integral', 'Bernoulli', 'Bernoulli_Integral',
'almost_linear', 'almost_linear_Integral', 'best', 'best_hint',
'default', 'lie_group',
'nth_linear_euler_eq_homogeneous', 'order',
'separable', 'separable_Integral']
Integral_keys = ['1st_exact_Integral',
'1st_homogeneous_coeff_subs_dep_div_indep_Integral',
'1st_homogeneous_coeff_subs_indep_div_dep_Integral', '1st_linear_Integral',
'Bernoulli_Integral', 'almost_linear_Integral', 'best', 'best_hint', 'default',
'nth_linear_euler_eq_homogeneous',
'order', 'separable_Integral']
assert sorted(a.keys()) == keys
assert a['order'] == ode_order(eq, f(x))
assert a['best'] == Eq(f(x), C1/x)
assert dsolve(eq, hint='best') == Eq(f(x), C1/x)
assert a['default'] == 'separable'
assert a['best_hint'] == 'separable'
assert not a['1st_exact'].has(Integral)
assert not a['separable'].has(Integral)
assert not a['1st_homogeneous_coeff_best'].has(Integral)
assert not a['1st_homogeneous_coeff_subs_dep_div_indep'].has(Integral)
assert not a['1st_homogeneous_coeff_subs_indep_div_dep'].has(Integral)
assert not a['1st_linear'].has(Integral)
assert a['1st_linear_Integral'].has(Integral)
assert a['1st_exact_Integral'].has(Integral)
assert a['1st_homogeneous_coeff_subs_dep_div_indep_Integral'].has(Integral)
assert a['1st_homogeneous_coeff_subs_indep_div_dep_Integral'].has(Integral)
assert a['separable_Integral'].has(Integral)
assert sorted(b.keys()) == keys
assert b['order'] == ode_order(eq, f(x))
assert b['best'] == Eq(f(x), C1/x)
assert dsolve(eq, hint='best', simplify=False) == Eq(f(x), C1/x)
assert b['default'] == 'separable'
assert b['best_hint'] == '1st_linear'
assert a['separable'] != b['separable']
assert a['1st_homogeneous_coeff_subs_dep_div_indep'] != \
b['1st_homogeneous_coeff_subs_dep_div_indep']
assert a['1st_homogeneous_coeff_subs_indep_div_dep'] != \
b['1st_homogeneous_coeff_subs_indep_div_dep']
assert not b['1st_exact'].has(Integral)
assert not b['separable'].has(Integral)
assert not b['1st_homogeneous_coeff_best'].has(Integral)
assert not b['1st_homogeneous_coeff_subs_dep_div_indep'].has(Integral)
assert not b['1st_homogeneous_coeff_subs_indep_div_dep'].has(Integral)
assert not b['1st_linear'].has(Integral)
assert b['1st_linear_Integral'].has(Integral)
assert b['1st_exact_Integral'].has(Integral)
assert b['1st_homogeneous_coeff_subs_dep_div_indep_Integral'].has(Integral)
assert b['1st_homogeneous_coeff_subs_indep_div_dep_Integral'].has(Integral)
assert b['separable_Integral'].has(Integral)
assert sorted(c.keys()) == Integral_keys
raises(ValueError, lambda: dsolve(eq, hint='notarealhint'))
raises(ValueError, lambda: dsolve(eq, hint='Liouville'))
assert dsolve(f(x).diff(x) - 1/f(x)**2, hint='all')['best'] == \
dsolve(f(x).diff(x) - 1/f(x)**2, hint='best')
assert dsolve(f(x) + f(x).diff(x) + sin(x).diff(x) + 1, f(x),
hint="1st_linear_Integral") == \
Eq(f(x), (C1 + Integral((-sin(x).diff(x) - 1)*
exp(Integral(1, x)), x))*exp(-Integral(1, x)))
def test_classify_ode():
assert classify_ode(f(x).diff(x, 2), f(x)) == \
(
'nth_algebraic',
'nth_linear_constant_coeff_homogeneous',
'nth_linear_euler_eq_homogeneous',
'Liouville',
'2nd_power_series_ordinary',
'nth_algebraic_Integral',
'Liouville_Integral',
)
assert classify_ode(f(x), f(x)) == ('nth_algebraic', 'nth_algebraic_Integral')
assert classify_ode(Eq(f(x).diff(x), 0), f(x)) == (
'nth_algebraic',
'separable',
'1st_linear',
'Bernoulli',
'1st_homogeneous_coeff_best',
'1st_homogeneous_coeff_subs_indep_div_dep',
'1st_homogeneous_coeff_subs_dep_div_indep',
'1st_power_series', 'lie_group',
'nth_linear_constant_coeff_homogeneous',
'nth_linear_euler_eq_homogeneous',
'nth_algebraic_Integral',
'separable_Integral',
'1st_linear_Integral',
'Bernoulli_Integral',
'1st_homogeneous_coeff_subs_indep_div_dep_Integral',
'1st_homogeneous_coeff_subs_dep_div_indep_Integral')
assert classify_ode(f(x).diff(x)**2, f(x)) == ('factorable',
'nth_algebraic',
'separable',
'1st_linear',
'Bernoulli',
'1st_homogeneous_coeff_best',
'1st_homogeneous_coeff_subs_indep_div_dep',
'1st_homogeneous_coeff_subs_dep_div_indep',
'1st_power_series',
'lie_group',
'nth_linear_constant_coeff_homogeneous',
'nth_linear_euler_eq_homogeneous',
'nth_algebraic_Integral',
'separable_Integral',
'1st_linear_Integral',
'Bernoulli_Integral',
'1st_homogeneous_coeff_subs_indep_div_dep_Integral',
'1st_homogeneous_coeff_subs_dep_div_indep_Integral')
# issue 4749: f(x) should be cleared from highest derivative before classifying
a = classify_ode(Eq(f(x).diff(x) + f(x), x), f(x))
b = classify_ode(f(x).diff(x)*f(x) + f(x)*f(x) - x*f(x), f(x))
c = classify_ode(f(x).diff(x)/f(x) + f(x)/f(x) - x/f(x), f(x))
assert a == ('1st_linear',
'Bernoulli',
'almost_linear',
'1st_power_series', "lie_group",
'nth_linear_constant_coeff_undetermined_coefficients',
'nth_linear_constant_coeff_variation_of_parameters',
'1st_linear_Integral',
'Bernoulli_Integral',
'almost_linear_Integral',
'nth_linear_constant_coeff_variation_of_parameters_Integral')
assert b == ('factorable',
'1st_linear',
'Bernoulli',
'1st_power_series',
'lie_group',
'nth_linear_constant_coeff_undetermined_coefficients',
'nth_linear_constant_coeff_variation_of_parameters',
'1st_linear_Integral',
'Bernoulli_Integral',
'nth_linear_constant_coeff_variation_of_parameters_Integral')
assert c == ('1st_linear',
'Bernoulli',
'1st_power_series',
'lie_group',
'nth_linear_constant_coeff_undetermined_coefficients',
'nth_linear_constant_coeff_variation_of_parameters',
'1st_linear_Integral',
'Bernoulli_Integral',
'nth_linear_constant_coeff_variation_of_parameters_Integral')
assert classify_ode(
2*x*f(x)*f(x).diff(x) + (1 + x)*f(x)**2 - exp(x), f(x)
) == ('Bernoulli', 'almost_linear', 'lie_group',
'Bernoulli_Integral', 'almost_linear_Integral')
assert 'Riccati_special_minus2' in \
classify_ode(2*f(x).diff(x) + f(x)**2 - f(x)/x + 3*x**(-2), f(x))
raises(ValueError, lambda: classify_ode(x + f(x, y).diff(x).diff(
y), f(x, y)))
# issue 5176
k = Symbol('k')
assert classify_ode(f(x).diff(x)/(k*f(x) + k*x*f(x)) + 2*f(x)/(k*f(x) +
k*x*f(x)) + x*f(x).diff(x)/(k*f(x) + k*x*f(x)) + z, f(x)) == \
('separable', '1st_exact', '1st_linear', 'Bernoulli',
'1st_power_series', 'lie_group', 'separable_Integral', '1st_exact_Integral',
'1st_linear_Integral', 'Bernoulli_Integral')
# preprocessing
ans = ('nth_algebraic', 'separable', '1st_exact', '1st_linear', 'Bernoulli',
'1st_homogeneous_coeff_best',
'1st_homogeneous_coeff_subs_indep_div_dep',
'1st_homogeneous_coeff_subs_dep_div_indep',
'1st_power_series', 'lie_group',
'nth_linear_constant_coeff_undetermined_coefficients',
'nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients',
'nth_linear_constant_coeff_variation_of_parameters',
'nth_linear_euler_eq_nonhomogeneous_variation_of_parameters',
'nth_algebraic_Integral',
'separable_Integral', '1st_exact_Integral',
'1st_linear_Integral',
'Bernoulli_Integral',
'1st_homogeneous_coeff_subs_indep_div_dep_Integral',
'1st_homogeneous_coeff_subs_dep_div_indep_Integral',
'nth_linear_constant_coeff_variation_of_parameters_Integral',
'nth_linear_euler_eq_nonhomogeneous_variation_of_parameters_Integral')
# w/o f(x) given
assert classify_ode(diff(f(x) + x, x) + diff(f(x), x)) == ans
# w/ f(x) and prep=True
assert classify_ode(diff(f(x) + x, x) + diff(f(x), x), f(x),
prep=True) == ans
assert classify_ode(Eq(2*x**3*f(x).diff(x), 0), f(x)) == \
('factorable', 'nth_algebraic', 'separable', '1st_linear',
'Bernoulli', '1st_power_series',
'lie_group', 'nth_linear_euler_eq_homogeneous',
'nth_algebraic_Integral', 'separable_Integral',
'1st_linear_Integral', 'Bernoulli_Integral')
assert classify_ode(Eq(2*f(x)**3*f(x).diff(x), 0), f(x)) == \
('factorable', 'nth_algebraic', 'separable', '1st_linear', 'Bernoulli',
'1st_power_series', 'lie_group', 'nth_algebraic_Integral',
'separable_Integral', '1st_linear_Integral', 'Bernoulli_Integral')
# test issue 13864
assert classify_ode(Eq(diff(f(x), x) - f(x)**x, 0), f(x)) == \
('1st_power_series', 'lie_group')
assert isinstance(classify_ode(Eq(f(x), 5), f(x), dict=True), dict)
def test_classify_ode_ics():
# Dummy
eq = f(x).diff(x, x) - f(x)
# Not f(0) or f'(0)
ics = {x: 1}
raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics))
############################
# f(0) type (AppliedUndef) #
############################
# Wrong function
ics = {g(0): 1}
raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics))
# Contains x
ics = {f(x): 1}
raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics))
# Too many args
ics = {f(0, 0): 1}
raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics))
# point contains f
# XXX: Should be NotImplementedError
ics = {f(0): f(1)}
raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics))
# Does not raise
ics = {f(0): 1}
classify_ode(eq, f(x), ics=ics)
#####################
# f'(0) type (Subs) #
#####################
# Wrong function
ics = {g(x).diff(x).subs(x, 0): 1}
raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics))
# Contains x
ics = {f(y).diff(y).subs(y, x): 1}
raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics))
# Wrong variable
ics = {f(y).diff(y).subs(y, 0): 1}
raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics))
# Too many args
ics = {f(x, y).diff(x).subs(x, 0): 1}
raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics))
# Derivative wrt wrong vars
ics = {Derivative(f(x), x, y).subs(x, 0): 1}
raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics))
# point contains f
# XXX: Should be NotImplementedError
ics = {f(x).diff(x).subs(x, 0): f(0)}
raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics))
# Does not raise
ics = {f(x).diff(x).subs(x, 0): 1}
classify_ode(eq, f(x), ics=ics)
###########################
# f'(y) type (Derivative) #
###########################
# Wrong function
ics = {g(x).diff(x).subs(x, y): 1}
raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics))
# Contains x
ics = {f(y).diff(y).subs(y, x): 1}
raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics))
# Too many args
ics = {f(x, y).diff(x).subs(x, y): 1}
raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics))
# Derivative wrt wrong vars
ics = {Derivative(f(x), x, z).subs(x, y): 1}
raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics))
# point contains f
# XXX: Should be NotImplementedError
ics = {f(x).diff(x).subs(x, y): f(0)}
raises(ValueError, lambda: classify_ode(eq, f(x), ics=ics))
# Does not raise
ics = {f(x).diff(x).subs(x, y): 1}
classify_ode(eq, f(x), ics=ics)
def test_classify_sysode():
# Here x is assumed to be x(t) and y as y(t) for simplicity.
# Similarly diff(x,t) and diff(y,y) is assumed to be x1 and y1 respectively.
k, l, m, n = symbols('k, l, m, n', Integer=True)
k1, k2, k3, l1, l2, l3, m1, m2, m3 = symbols('k1, k2, k3, l1, l2, l3, m1, m2, m3', Integer=True)
P, Q, R, p, q, r = symbols('P, Q, R, p, q, r', cls=Function)
P1, P2, P3, Q1, Q2, R1, R2 = symbols('P1, P2, P3, Q1, Q2, R1, R2', cls=Function)
x, y, z = symbols('x, y, z', cls=Function)
t = symbols('t')
x1 = diff(x(t),t) ; y1 = diff(y(t),t) ;
x2 = diff(x(t),t,t) ; y2 = diff(y(t),t,t)
eq2 = (Eq(x2, k*x(t) - l*y1), Eq(y2, l*x1 + k*y(t)))
sol2 = {'order': {y(t): 2, x(t): 2}, 'type_of_equation': 'type3', 'is_linear': True, 'eq': \
[-k*x(t) + l*Derivative(y(t), t) + Derivative(x(t), t, t), -k*y(t) - l*Derivative(x(t), t) + \
Derivative(y(t), t, t)], 'no_of_equation': 2, 'func_coeff': {(0, y(t), 0): 0, (0, x(t), 2): 1, \
(1, y(t), 1): 0, (1, y(t), 2): 1, (1, x(t), 2): 0, (0, y(t), 2): 0, (0, x(t), 0): -k, (1, x(t), 1): \
-l, (0, x(t), 1): 0, (0, y(t), 1): l, (1, x(t), 0): 0, (1, y(t), 0): -k}, 'func': [x(t), y(t)]}
assert classify_sysode(eq2) == sol2
eq3 = (Eq(x2+4*x1+3*y1+9*x(t)+7*y(t), 11*exp(I*t)), Eq(y2+5*x1+8*y1+3*x(t)+12*y(t), 2*exp(I*t)))
sol3 = {'no_of_equation': 2, 'func_coeff': {(1, x(t), 2): 0, (0, y(t), 2): 0, (0, x(t), 0): 9, \
(1, x(t), 1): 5, (0, x(t), 1): 4, (0, y(t), 1): 3, (1, x(t), 0): 3, (1, y(t), 0): 12, (0, y(t), 0): 7, \
(0, x(t), 2): 1, (1, y(t), 2): 1, (1, y(t), 1): 8}, 'type_of_equation': 'type4', 'func': [x(t), y(t)], \
'is_linear': True, 'eq': [9*x(t) + 7*y(t) - 11*exp(I*t) + 4*Derivative(x(t), t) + 3*Derivative(y(t), t) + \
Derivative(x(t), t, t), 3*x(t) + 12*y(t) - 2*exp(I*t) + 5*Derivative(x(t), t) + 8*Derivative(y(t), t) + \
Derivative(y(t), t, t)], 'order': {y(t): 2, x(t): 2}}
assert classify_sysode(eq3) == sol3
eq4 = (Eq((4*t**2 + 7*t + 1)**2*x2, 5*x(t) + 35*y(t)), Eq((4*t**2 + 7*t + 1)**2*y2, x(t) + 9*y(t)))
sol4 = {'no_of_equation': 2, 'func_coeff': {(1, x(t), 2): 0, (0, y(t), 2): 0, (0, x(t), 0): -5, \
(1, x(t), 1): 0, (0, x(t), 1): 0, (0, y(t), 1): 0, (1, x(t), 0): -1, (1, y(t), 0): -9, (0, y(t), 0): -35, \
(0, x(t), 2): 16*t**4 + 56*t**3 + 57*t**2 + 14*t + 1, (1, y(t), 2): 16*t**4 + 56*t**3 + 57*t**2 + 14*t + 1, \
(1, y(t), 1): 0}, 'type_of_equation': 'type10', 'func': [x(t), y(t)], 'is_linear': True, \
'eq': [(4*t**2 + 7*t + 1)**2*Derivative(x(t), t, t) - 5*x(t) - 35*y(t), (4*t**2 + 7*t + 1)**2*Derivative(y(t), t, t)\
- x(t) - 9*y(t)], 'order': {y(t): 2, x(t): 2}}
assert classify_sysode(eq4) == sol4
eq6 = (Eq(x1, exp(k*x(t))*P(x(t),y(t))), Eq(y1,r(y(t))*P(x(t),y(t))))
sol6 = {'no_of_equation': 2, 'func_coeff': {(0, x(t), 0): 0, (1, x(t), 1): 0, (0, x(t), 1): 1, (1, y(t), 0): 0, \
(1, x(t), 0): 0, (0, y(t), 1): 0, (0, y(t), 0): 0, (1, y(t), 1): 1}, 'type_of_equation': 'type2', 'func': \
[x(t), y(t)], 'is_linear': False, 'eq': [-P(x(t), y(t))*exp(k*x(t)) + Derivative(x(t), t), -P(x(t), \
y(t))*r(y(t)) + Derivative(y(t), t)], 'order': {y(t): 1, x(t): 1}}
assert classify_sysode(eq6) == sol6
eq7 = (Eq(x1, x(t)**2+y(t)/x(t)), Eq(y1, x(t)/y(t)))
sol7 = {'no_of_equation': 2, 'func_coeff': {(0, x(t), 0): 0, (1, x(t), 1): 0, (0, x(t), 1): 1, (1, y(t), 0): 0, \
(1, x(t), 0): -1/y(t), (0, y(t), 1): 0, (0, y(t), 0): -1/x(t), (1, y(t), 1): 1}, 'type_of_equation': 'type3', \
'func': [x(t), y(t)], 'is_linear': False, 'eq': [-x(t)**2 + Derivative(x(t), t) - y(t)/x(t), -x(t)/y(t) + \
Derivative(y(t), t)], 'order': {y(t): 1, x(t): 1}}
assert classify_sysode(eq7) == sol7
eq8 = (Eq(x1, P1(x(t))*Q1(y(t))*R(x(t),y(t),t)), Eq(y1, P1(x(t))*Q1(y(t))*R(x(t),y(t),t)))
sol8 = {'func': [x(t), y(t)], 'is_linear': False, 'type_of_equation': 'type4', 'eq': \
[-P1(x(t))*Q1(y(t))*R(x(t), y(t), t) + Derivative(x(t), t), -P1(x(t))*Q1(y(t))*R(x(t), y(t), t) + \
Derivative(y(t), t)], 'func_coeff': {(0, y(t), 1): 0, (1, y(t), 1): 1, (1, x(t), 1): 0, (0, y(t), 0): 0, \
(1, x(t), 0): 0, (0, x(t), 0): 0, (1, y(t), 0): 0, (0, x(t), 1): 1}, 'order': {y(t): 1, x(t): 1}, 'no_of_equation': 2}
assert classify_sysode(eq8) == sol8
eq10 = (x2 + log(t)*(t*x1 - x(t)) + exp(t)*(t*y1 - y(t)), y2 + (t**2)*(t*x1 - x(t)) + (t)*(t*y1 - y(t)))
sol10 = {'no_of_equation': 2, 'func_coeff': {(1, x(t), 2): 0, (0, y(t), 2): 0, (0, x(t), 0): -log(t), \
(1, x(t), 1): t**3, (0, x(t), 1): t*log(t), (0, y(t), 1): t*exp(t), (1, x(t), 0): -t**2, (1, y(t), 0): -t, \
(0, y(t), 0): -exp(t), (0, x(t), 2): 1, (1, y(t), 2): 1, (1, y(t), 1): t**2}, 'type_of_equation': 'type11', \
'func': [x(t), y(t)], 'is_linear': True, 'eq': [(t*Derivative(x(t), t) - x(t))*log(t) + (t*Derivative(y(t), t) - \
y(t))*exp(t) + Derivative(x(t), t, t), t**2*(t*Derivative(x(t), t) - x(t)) + t*(t*Derivative(y(t), t) - y(t)) \
+ Derivative(y(t), t, t)], 'order': {y(t): 2, x(t): 2}}
assert classify_sysode(eq10) == sol10
eq11 = (Eq(x1,x(t)*y(t)**3), Eq(y1,y(t)**5))
sol11 = {'no_of_equation': 2, 'func_coeff': {(0, x(t), 0): -y(t)**3, (1, x(t), 1): 0, (0, x(t), 1): 1, \
(1, y(t), 0): 0, (1, x(t), 0): 0, (0, y(t), 1): 0, (0, y(t), 0): 0, (1, y(t), 1): 1}, 'type_of_equation': \
'type1', 'func': [x(t), y(t)], 'is_linear': False, 'eq': [-x(t)*y(t)**3 + Derivative(x(t), t), \
-y(t)**5 + Derivative(y(t), t)], 'order': {y(t): 1, x(t): 1}}
assert classify_sysode(eq11) == sol11
eq13 = (Eq(x1,x(t)*y(t)*sin(t)**2), Eq(y1,y(t)**2*sin(t)**2))
sol13 = {'no_of_equation': 2, 'func_coeff': {(0, x(t), 0): -y(t)*sin(t)**2, (1, x(t), 1): 0, (0, x(t), 1): 1, \
(1, y(t), 0): 0, (1, x(t), 0): 0, (0, y(t), 1): 0, (0, y(t), 0): -x(t)*sin(t)**2, (1, y(t), 1): 1}, \
'type_of_equation': 'type4', 'func': [x(t), y(t)], 'is_linear': False, 'eq': [-x(t)*y(t)*sin(t)**2 + \
Derivative(x(t), t), -y(t)**2*sin(t)**2 + Derivative(y(t), t)], 'order': {y(t): 1, x(t): 1}}
assert classify_sysode(eq13) == sol13
def test_solve_ics():
# Basic tests that things work from dsolve.
assert dsolve(f(x).diff(x) - 1/f(x), f(x), ics={f(1): 2}) == \
Eq(f(x), sqrt(2 * x + 2))
assert dsolve(f(x).diff(x) - f(x), f(x), ics={f(0): 1}) == Eq(f(x), exp(x))
assert dsolve(f(x).diff(x) - f(x), f(x), ics={f(x).diff(x).subs(x, 0): 1}) == Eq(f(x), exp(x))
assert dsolve(f(x).diff(x, x) + f(x), f(x), ics={f(0): 1,
f(x).diff(x).subs(x, 0): 1}) == Eq(f(x), sin(x) + cos(x))
assert dsolve([f(x).diff(x) - f(x) + g(x), g(x).diff(x) - g(x) - f(x)],
[f(x), g(x)], ics={f(0): 1, g(0): 0}) == [Eq(f(x), exp(x)*cos(x)), Eq(g(x), exp(x)*sin(x))]
# Test cases where dsolve returns two solutions.
eq = (x**2*f(x)**2 - x).diff(x)
assert dsolve(eq, f(x), ics={f(1): 0}) == [Eq(f(x),
-sqrt(x - 1)/x), Eq(f(x), sqrt(x - 1)/x)]
assert dsolve(eq, f(x), ics={f(x).diff(x).subs(x, 1): 0}) == [Eq(f(x),
-sqrt(x - S.Half)/x), Eq(f(x), sqrt(x - S.Half)/x)]
eq = cos(f(x)) - (x*sin(f(x)) - f(x)**2)*f(x).diff(x)
assert dsolve(eq, f(x),
ics={f(0):1}, hint='1st_exact', simplify=False) == Eq(x*cos(f(x)) + f(x)**3/3, Rational(1, 3))
assert dsolve(eq, f(x),
ics={f(0):1}, hint='1st_exact', simplify=True) == Eq(x*cos(f(x)) + f(x)**3/3, Rational(1, 3))
assert solve_ics([Eq(f(x), C1*exp(x))], [f(x)], [C1], {f(0): 1}) == {C1: 1}
assert solve_ics([Eq(f(x), C1*sin(x) + C2*cos(x))], [f(x)], [C1, C2],
{f(0): 1, f(pi/2): 1}) == {C1: 1, C2: 1}
assert solve_ics([Eq(f(x), C1*sin(x) + C2*cos(x))], [f(x)], [C1, C2],
{f(0): 1, f(x).diff(x).subs(x, 0): 1}) == {C1: 1, C2: 1}
assert solve_ics([Eq(f(x), C1*sin(x) + C2*cos(x))], [f(x)], [C1, C2], {f(0): 1}) == \
{C2: 1}
# Some more complicated tests Refer to PR #16098
assert set(dsolve(f(x).diff(x)*(f(x).diff(x, 2)-x), ics={f(0):0, f(x).diff(x).subs(x, 1):0})) == \
{Eq(f(x), 0), Eq(f(x), x ** 3 / 6 - x / 2)}
assert set(dsolve(f(x).diff(x)*(f(x).diff(x, 2)-x), ics={f(0):0})) == \
{Eq(f(x), 0), Eq(f(x), C2*x + x**3/6)}
K, r, f0 = symbols('K r f0')
sol = Eq(f(x), K*f0*exp(r*x)/((-K + f0)*(f0*exp(r*x)/(-K + f0) - 1)))
assert (dsolve(Eq(f(x).diff(x), r * f(x) * (1 - f(x) / K)), f(x), ics={f(0): f0})) == sol
#Order dependent issues Refer to PR #16098
assert set(dsolve(f(x).diff(x)*(f(x).diff(x, 2)-x), ics={f(x).diff(x).subs(x,0):0, f(0):0})) == \
{Eq(f(x), 0), Eq(f(x), x ** 3 / 6)}
assert set(dsolve(f(x).diff(x)*(f(x).diff(x, 2)-x), ics={f(0):0, f(x).diff(x).subs(x,0):0})) == \
{Eq(f(x), 0), Eq(f(x), x ** 3 / 6)}
# XXX: Ought to be ValueError
raises(ValueError, lambda: solve_ics([Eq(f(x), C1*sin(x) + C2*cos(x))], [f(x)], [C1, C2], {f(0): 1, f(pi): 1}))
# Degenerate case. f'(0) is identically 0.
raises(ValueError, lambda: solve_ics([Eq(f(x), sqrt(C1 - x**2))], [f(x)], [C1], {f(x).diff(x).subs(x, 0): 0}))
EI, q, L = symbols('EI q L')
# eq = Eq(EI*diff(f(x), x, 4), q)
sols = [Eq(f(x), C1 + C2*x + C3*x**2 + C4*x**3 + q*x**4/(24*EI))]
funcs = [f(x)]
constants = [C1, C2, C3, C4]
# Test both cases, Derivative (the default from f(x).diff(x).subs(x, L)),
# and Subs
ics1 = {f(0): 0,
f(x).diff(x).subs(x, 0): 0,
f(L).diff(L, 2): 0,
f(L).diff(L, 3): 0}
ics2 = {f(0): 0,
f(x).diff(x).subs(x, 0): 0,
Subs(f(x).diff(x, 2), x, L): 0,
Subs(f(x).diff(x, 3), x, L): 0}
solved_constants1 = solve_ics(sols, funcs, constants, ics1)
solved_constants2 = solve_ics(sols, funcs, constants, ics2)
assert solved_constants1 == solved_constants2 == {
C1: 0,
C2: 0,
C3: L**2*q/(4*EI),
C4: -L*q/(6*EI)}
def test_ode_order():
f = Function('f')
g = Function('g')
x = Symbol('x')
assert ode_order(3*x*exp(f(x)), f(x)) == 0
assert ode_order(x*diff(f(x), x) + 3*x*f(x) - sin(x)/x, f(x)) == 1
assert ode_order(x**2*f(x).diff(x, x) + x*diff(f(x), x) - f(x), f(x)) == 2
assert ode_order(diff(x*exp(f(x)), x, x), f(x)) == 2
assert ode_order(diff(x*diff(x*exp(f(x)), x, x), x), f(x)) == 3
assert ode_order(diff(f(x), x, x), g(x)) == 0
assert ode_order(diff(f(x), x, x)*diff(g(x), x), f(x)) == 2
assert ode_order(diff(f(x), x, x)*diff(g(x), x), g(x)) == 1
assert ode_order(diff(x*diff(x*exp(f(x)), x, x), x), g(x)) == 0
# issue 5835: ode_order has to also work for unevaluated derivatives
# (ie, without using doit()).
assert ode_order(Derivative(x*f(x), x), f(x)) == 1
assert ode_order(x*sin(Derivative(x*f(x)**2, x, x)), f(x)) == 2
assert ode_order(Derivative(x*Derivative(x*exp(f(x)), x, x), x), g(x)) == 0
assert ode_order(Derivative(f(x), x, x), g(x)) == 0
assert ode_order(Derivative(x*exp(f(x)), x, x), f(x)) == 2
assert ode_order(Derivative(f(x), x, x)*Derivative(g(x), x), g(x)) == 1
assert ode_order(Derivative(x*Derivative(f(x), x, x), x), f(x)) == 3
assert ode_order(
x*sin(Derivative(x*Derivative(f(x), x)**2, x, x)), f(x)) == 3
# In all tests below, checkodesol has the order option set to prevent
# superfluous calls to ode_order(), and the solve_for_func flag set to False
# because dsolve() already tries to solve for the function, unless the
# simplify=False option is set.
def test_old_ode_tests():
# These are simple tests from the old ode module
eq1 = Eq(f(x).diff(x), 0)
eq2 = Eq(3*f(x).diff(x) - 5, 0)
eq3 = Eq(3*f(x).diff(x), 5)
eq4 = Eq(9*f(x).diff(x, x) + f(x), 0)
eq5 = Eq(9*f(x).diff(x, x), f(x))
# Type: a(x)f'(x)+b(x)*f(x)+c(x)=0
eq6 = Eq(x**2*f(x).diff(x) + 3*x*f(x) - sin(x)/x, 0)
eq7 = Eq(f(x).diff(x, x) - 3*diff(f(x), x) + 2*f(x), 0)
# Type: 2nd order, constant coefficients (two real different roots)
eq8 = Eq(f(x).diff(x, x) - 4*diff(f(x), x) + 4*f(x), 0)
# Type: 2nd order, constant coefficients (two real equal roots)
eq9 = Eq(f(x).diff(x, x) + 2*diff(f(x), x) + 3*f(x), 0)
# Type: 2nd order, constant coefficients (two complex roots)
eq10 = Eq(3*f(x).diff(x) - 1, 0)
eq11 = Eq(x*f(x).diff(x) - 1, 0)
sol1 = Eq(f(x), C1)
sol2 = Eq(f(x), C1 + x*Rational(5, 3))
sol3 = Eq(f(x), C1 + x*Rational(5, 3))
sol4 = Eq(f(x), C1*sin(x/3) + C2*cos(x/3))
sol5 = Eq(f(x), C1*exp(-x/3) + C2*exp(x/3))
sol6 = Eq(f(x), (C1 - cos(x))/x**3)
sol7 = Eq(f(x), (C1 + C2*exp(x))*exp(x))
sol8 = Eq(f(x), (C1 + C2*x)*exp(2*x))
sol9 = Eq(f(x), (C1*sin(x*sqrt(2)) + C2*cos(x*sqrt(2)))*exp(-x))
sol10 = Eq(f(x), C1 + x/3)
sol11 = Eq(f(x), C1 + log(x))
assert dsolve(eq1) == sol1
assert dsolve(eq1.lhs) == sol1
assert dsolve(eq2) == sol2
assert dsolve(eq3) == sol3
assert dsolve(eq4) == sol4
assert dsolve(eq5) == sol5
assert dsolve(eq6) == sol6
assert dsolve(eq7) == sol7
assert dsolve(eq8) == sol8
assert dsolve(eq9) == sol9
assert dsolve(eq10) == sol10
assert dsolve(eq11) == sol11
assert checkodesol(eq1, sol1, order=1, solve_for_func=False)[0]
assert checkodesol(eq2, sol2, order=1, solve_for_func=False)[0]
assert checkodesol(eq3, sol3, order=1, solve_for_func=False)[0]
assert checkodesol(eq4, sol4, order=2, solve_for_func=False)[0]
assert checkodesol(eq5, sol5, order=2, solve_for_func=False)[0]
assert checkodesol(eq6, sol6, order=1, solve_for_func=False)[0]
assert checkodesol(eq7, sol7, order=2, solve_for_func=False)[0]
assert checkodesol(eq8, sol8, order=2, solve_for_func=False)[0]
assert checkodesol(eq9, sol9, order=2, solve_for_func=False)[0]
assert checkodesol(eq10, sol10, order=1, solve_for_func=False)[0]
assert checkodesol(eq11, sol11, order=1, solve_for_func=False)[0]
@slow
def test_1st_exact1():
# Type: Exact differential equation, p(x,f) + q(x,f)*f' == 0,
# where dp/df == dq/dx
eq1 = sin(x)*cos(f(x)) + cos(x)*sin(f(x))*f(x).diff(x)
eq2 = (2*x*f(x) + 1)/f(x) + (f(x) - x)/f(x)**2*f(x).diff(x)
eq3 = 2*x + f(x)*cos(x) + (2*f(x) + sin(x) - sin(f(x)))*f(x).diff(x)
eq4 = cos(f(x)) - (x*sin(f(x)) - f(x)**2)*f(x).diff(x)
eq5 = 2*x*f(x) + (x**2 + f(x)**2)*f(x).diff(x)
sol1 = [Eq(f(x), -acos(C1/cos(x)) + 2*pi), Eq(f(x), acos(C1/cos(x)))]
sol2 = Eq(f(x), exp(C1 - x**2 + LambertW(-x*exp(-C1 + x**2))))
sol2b = Eq(log(f(x)) + x/f(x) + x**2, C1)
sol3 = Eq(f(x)*sin(x) + cos(f(x)) + x**2 + f(x)**2, C1)
sol4 = Eq(x*cos(f(x)) + f(x)**3/3, C1)
sol5 = Eq(x**2*f(x) + f(x)**3/3, C1)
assert dsolve(eq1, f(x), hint='1st_exact') == sol1
assert dsolve(eq2, f(x), hint='1st_exact') == sol2
assert dsolve(eq3, f(x), hint='1st_exact') == sol3
assert dsolve(eq4, hint='1st_exact') == sol4
assert dsolve(eq5, hint='1st_exact', simplify=False) == sol5
assert checkodesol(eq1, sol1, order=1, solve_for_func=False)[0]
# issue 5080 blocks the testing of this solution
# FIXME: assert checkodesol(eq2, sol2, order=1, solve_for_func=False)[0]
assert checkodesol(eq2, sol2b, order=1, solve_for_func=False)[0]
assert checkodesol(eq3, sol3, order=1, solve_for_func=False)[0]
assert checkodesol(eq4, sol4, order=1, solve_for_func=False)[0]
assert checkodesol(eq5, sol5, order=1, solve_for_func=False)[0]
@slow
@XFAIL
def test_1st_exact2_broken():
"""
This is an exact equation that fails under the exact engine. It is caught
by first order homogeneous albeit with a much contorted solution. The
exact engine fails because of a poorly simplified integral of q(0,y)dy,
where q is the function multiplying f'. The solutions should be
Eq(sqrt(x**2+f(x)**2)**3+y**3, C1). The equation below is
equivalent, but it is so complex that checkodesol fails, and takes a long
time to do so.
"""
if ON_TRAVIS:
skip("Too slow for travis.")
eq = (x*sqrt(x**2 + f(x)**2) - (x**2*f(x)/(f(x) -
sqrt(x**2 + f(x)**2)))*f(x).diff(x))
sol = Eq(log(x),
C1 - 9*sqrt(1 + f(x)**2/x**2)*asinh(f(x)/x)/(-27*f(x)/x +
27*sqrt(1 + f(x)**2/x**2)) - 9*sqrt(1 + f(x)**2/x**2)*
log(1 - sqrt(1 + f(x)**2/x**2)*f(x)/x + 2*f(x)**2/x**2)/
(-27*f(x)/x + 27*sqrt(1 + f(x)**2/x**2)) +
9*asinh(f(x)/x)*f(x)/(x*(-27*f(x)/x + 27*sqrt(1 + f(x)**2/x**2))) +
9*f(x)*log(1 - sqrt(1 + f(x)**2/x**2)*f(x)/x + 2*f(x)**2/x**2)/
(x*(-27*f(x)/x + 27*sqrt(1 + f(x)**2/x**2))))
assert dsolve(eq) == sol # Slow
# FIXME: Checked in test_1st_exact2_broken_check below
@slow
def test_1st_exact2_broken_check():
# See test_1st_exact2_broken above
eq = (x*sqrt(x**2 + f(x)**2) - (x**2*f(x)/(f(x) -
sqrt(x**2 + f(x)**2)))*f(x).diff(x))
sol = Eq(log(x),
C1 - 9*sqrt(1 + f(x)**2/x**2)*asinh(f(x)/x)/(-27*f(x)/x +
27*sqrt(1 + f(x)**2/x**2)) - 9*sqrt(1 + f(x)**2/x**2)*
log(1 - sqrt(1 + f(x)**2/x**2)*f(x)/x + 2*f(x)**2/x**2)/
(-27*f(x)/x + 27*sqrt(1 + f(x)**2/x**2)) +
9*asinh(f(x)/x)*f(x)/(x*(-27*f(x)/x + 27*sqrt(1 + f(x)**2/x**2))) +
9*f(x)*log(1 - sqrt(1 + f(x)**2/x**2)*f(x)/x + 2*f(x)**2/x**2)/
(x*(-27*f(x)/x + 27*sqrt(1 + f(x)**2/x**2))))
assert checkodesol(eq, sol, order=1, solve_for_func=False)[0]
def test_homogeneous_order():
assert homogeneous_order(exp(y/x) + tan(y/x), x, y) == 0
assert homogeneous_order(x**2 + sin(x)*cos(y), x, y) is None
assert homogeneous_order(x - y - x*sin(y/x), x, y) == 1
assert homogeneous_order((x*y + sqrt(x**4 + y**4) + x**2*(log(x) - log(y)))/
(pi*x**Rational(2, 3)*sqrt(y)**3), x, y) == Rational(-1, 6)
assert homogeneous_order(y/x*cos(y/x) - x/y*sin(y/x) + cos(y/x), x, y) == 0
assert homogeneous_order(f(x), x, f(x)) == 1
assert homogeneous_order(f(x)**2, x, f(x)) == 2
assert homogeneous_order(x*y*z, x, y) == 2
assert homogeneous_order(x*y*z, x, y, z) == 3
assert homogeneous_order(x**2*f(x)/sqrt(x**2 + f(x)**2), f(x)) is None
assert homogeneous_order(f(x, y)**2, x, f(x, y), y) == 2
assert homogeneous_order(f(x, y)**2, x, f(x), y) is None
assert homogeneous_order(f(x, y)**2, x, f(x, y)) is None
assert homogeneous_order(f(y, x)**2, x, y, f(x, y)) is None
assert homogeneous_order(f(y), f(x), x) is None
assert homogeneous_order(-f(x)/x + 1/sin(f(x)/ x), f(x), x) == 0
assert homogeneous_order(log(1/y) + log(x**2), x, y) is None
assert homogeneous_order(log(1/y) + log(x), x, y) == 0
assert homogeneous_order(log(x/y), x, y) == 0
assert homogeneous_order(2*log(1/y) + 2*log(x), x, y) == 0
a = Symbol('a')
assert homogeneous_order(a*log(1/y) + a*log(x), x, y) == 0
assert homogeneous_order(f(x).diff(x), x, y) is None
assert homogeneous_order(-f(x).diff(x) + x, x, y) is None
assert homogeneous_order(O(x), x, y) is None
assert homogeneous_order(x + O(x**2), x, y) is None
assert homogeneous_order(x**pi, x) == pi
assert homogeneous_order(x**x, x) is None
raises(ValueError, lambda: homogeneous_order(x*y))
@slow
def test_1st_homogeneous_coeff_ode():
# Type: First order homogeneous, y'=f(y/x)
eq1 = f(x)/x*cos(f(x)/x) - (x/f(x)*sin(f(x)/x) + cos(f(x)/x))*f(x).diff(x)
eq2 = x*f(x).diff(x) - f(x) - x*sin(f(x)/x)
eq3 = f(x) + (x*log(f(x)/x) - 2*x)*diff(f(x), x)
eq4 = 2*f(x)*exp(x/f(x)) + f(x)*f(x).diff(x) - 2*x*exp(x/f(x))*f(x).diff(x)
eq5 = 2*x**2*f(x) + f(x)**3 + (x*f(x)**2 - 2*x**3)*f(x).diff(x)
eq6 = x*exp(f(x)/x) - f(x)*sin(f(x)/x) + x*sin(f(x)/x)*f(x).diff(x)
eq7 = (x + sqrt(f(x)**2 - x*f(x)))*f(x).diff(x) - f(x)
eq8 = x + f(x) - (x - f(x))*f(x).diff(x)
sol1 = Eq(log(x), C1 - log(f(x)*sin(f(x)/x)/x))
sol2 = Eq(log(x), log(C1) + log(cos(f(x)/x) - 1)/2 - log(cos(f(x)/x) + 1)/2)
sol3 = Eq(f(x), -exp(C1)*LambertW(-x*exp(-C1 + 1)))
sol4 = Eq(log(f(x)), C1 - 2*exp(x/f(x)))
sol5 = Eq(f(x), exp(2*C1 + LambertW(-2*x**4*exp(-4*C1))/2)/x)
sol6 = Eq(log(x), C1 + exp(-f(x)/x)*sin(f(x)/x)/2 + exp(-f(x)/x)*cos(f(x)/x)/2)
sol7 = Eq(log(f(x)), C1 - 2*sqrt(-x/f(x) + 1))
sol8 = Eq(log(x), C1 - log(sqrt(1 + f(x)**2/x**2)) + atan(f(x)/x))
# indep_div_dep actually has a simpler solution for eq2,
# but it runs too slow
assert dsolve(eq1, hint='1st_homogeneous_coeff_subs_dep_div_indep') == sol1
assert dsolve(eq2, hint='1st_homogeneous_coeff_subs_dep_div_indep', simplify=False) == sol2
assert dsolve(eq3, hint='1st_homogeneous_coeff_best') == sol3
assert dsolve(eq4, hint='1st_homogeneous_coeff_best') == sol4
assert dsolve(eq5, hint='1st_homogeneous_coeff_best') == sol5
assert dsolve(eq6, hint='1st_homogeneous_coeff_subs_dep_div_indep') == sol6
assert dsolve(eq7, hint='1st_homogeneous_coeff_best') == sol7
assert dsolve(eq8, hint='1st_homogeneous_coeff_best') == sol8
# FIXME: sol3 and sol5 don't work with checkodesol (because of LambertW?)
# previous code was testing with these other solutions:
sol3b = Eq(-f(x)/(1 + log(x/f(x))), C1)
sol5b = Eq(log(C1*x*sqrt(1/x)*sqrt(f(x))) + x**2/(2*f(x)**2), 0)
assert checkodesol(eq1, sol1, order=1, solve_for_func=False)[0]
assert checkodesol(eq2, sol2, order=1, solve_for_func=False)[0]
assert checkodesol(eq3, sol3b, order=1, solve_for_func=False)[0]
assert checkodesol(eq4, sol4, order=1, solve_for_func=False)[0]
assert checkodesol(eq5, sol5b, order=1, solve_for_func=False)[0]
assert checkodesol(eq6, sol6, order=1, solve_for_func=False)[0]
assert checkodesol(eq8, sol8, order=1, solve_for_func=False)[0]
def test_1st_homogeneous_coeff_ode_check2():
eq2 = x*f(x).diff(x) - f(x) - x*sin(f(x)/x)
sol2 = Eq(x/tan(f(x)/(2*x)), C1)
assert checkodesol(eq2, sol2, order=1, solve_for_func=False)[0]
def test_1st_homogeneous_coeff_ode_check3():
eq3 = f(x) + (x*log(f(x)/x) - 2*x)*diff(f(x), x)
# This solution is correct:
sol3 = Eq(f(x), -exp(C1)*LambertW(-x*exp(1 - C1)))
assert dsolve(eq3) == sol3
# FIXME: Checked in test_1st_homogeneous_coeff_ode_check3_check below
# Alternate form:
sol3a = Eq(f(x), x*exp(1 - LambertW(C1*x)))
assert checkodesol(eq3, sol3a, solve_for_func=True)[0]
@XFAIL
def test_1st_homogeneous_coeff_ode_check3_check():
# See test_1st_homogeneous_coeff_ode_check3 above
eq3 = f(x) + (x*log(f(x)/x) - 2*x)*diff(f(x), x)
sol3 = Eq(f(x), -exp(C1)*LambertW(-x*exp(1 - C1)))
assert checkodesol(eq3, sol3) == (True, 0) # XFAIL
def test_1st_homogeneous_coeff_ode_check7():
eq7 = (x + sqrt(f(x)**2 - x*f(x)))*f(x).diff(x) - f(x)
sol7 = Eq(log(f(x)), C1 - 2*sqrt(-x/f(x) + 1))
assert dsolve(eq7) == sol7
assert checkodesol(eq7, sol7, order=1, solve_for_func=False) == (True, 0)
def test_1st_homogeneous_coeff_ode2():
eq1 = f(x).diff(x) - f(x)/x + 1/sin(f(x)/x)
eq2 = x**2 + f(x)**2 - 2*x*f(x)*f(x).diff(x)
eq3 = x*exp(f(x)/x) + f(x) - x*f(x).diff(x)
sol1 = [Eq(f(x), x*(-acos(C1 + log(x)) + 2*pi)), Eq(f(x), x*acos(C1 + log(x)))]
sol2 = Eq(log(f(x)), log(C1) + log(x/f(x)) - log(x**2/f(x)**2 - 1))
sol3 = Eq(f(x), log((1/(C1 - log(x)))**x))
# specific hints are applied for speed reasons
assert dsolve(eq1, hint='1st_homogeneous_coeff_subs_dep_div_indep') == sol1
assert dsolve(eq2, hint='1st_homogeneous_coeff_best', simplify=False) == sol2
assert dsolve(eq3, hint='1st_homogeneous_coeff_subs_dep_div_indep') == sol3
# FIXME: sol3 doesn't work with checkodesol (because of **x?)
# previous code was testing with this other solution:
sol3b = Eq(f(x), log(log(C1/x)**(-x)))
assert checkodesol(eq1, sol1, order=1, solve_for_func=False)[0]
assert checkodesol(eq2, sol2, order=1, solve_for_func=False)[0]
assert checkodesol(eq3, sol3b, order=1, solve_for_func=False)[0]
def test_1st_homogeneous_coeff_ode_check9():
_u2 = Dummy('u2')
__a = Dummy('a')
eq9 = f(x)**2 + (x*sqrt(f(x)**2 - x**2) - x*f(x))*f(x).diff(x)
sol9 = Eq(-Integral(-1/(-(1 - sqrt(1 - _u2**2))*_u2 + _u2), (_u2, __a,
x/f(x))) + log(C1*f(x)), 0)
assert checkodesol(eq9, sol9, order=1, solve_for_func=False)[0]
def test_1st_homogeneous_coeff_ode3():
# The standard integration engine cannot handle one of the integrals
# involved (see issue 4551). meijerg code comes up with an answer, but in
# unconventional form.
# checkodesol fails for this equation, so its test is in
# test_1st_homogeneous_coeff_ode_check9 above. It has to compare string
# expressions because u2 is a dummy variable.
eq = f(x)**2 + (x*sqrt(f(x)**2 - x**2) - x*f(x))*f(x).diff(x)
sol = Eq(log(f(x)), C1 + Piecewise(
(acosh(f(x)/x), abs(f(x)**2)/x**2 > 1),
(-I*asin(f(x)/x), True)))
assert dsolve(eq, hint='1st_homogeneous_coeff_subs_indep_div_dep') == sol
def test_1st_homogeneous_coeff_corner_case():
eq1 = f(x).diff(x) - f(x)/x
c1 = classify_ode(eq1, f(x))
eq2 = x*f(x).diff(x) - f(x)
c2 = classify_ode(eq2, f(x))
sdi = "1st_homogeneous_coeff_subs_dep_div_indep"
sid = "1st_homogeneous_coeff_subs_indep_div_dep"
assert sid not in c1 and sdi not in c1
assert sid not in c2 and sdi not in c2
@slow
def test_nth_linear_constant_coeff_homogeneous():
# From Exercise 20, in Ordinary Differential Equations,
# Tenenbaum and Pollard, pg. 220
a = Symbol('a', positive=True)
k = Symbol('k', real=True)
eq1 = f(x).diff(x, 2) + 2*f(x).diff(x)
eq2 = f(x).diff(x, 2) - 3*f(x).diff(x) + 2*f(x)
eq3 = f(x).diff(x, 2) - f(x)
eq4 = f(x).diff(x, 3) + f(x).diff(x, 2) - 6*f(x).diff(x)
eq5 = 6*f(x).diff(x, 2) - 11*f(x).diff(x) + 4*f(x)
eq6 = Eq(f(x).diff(x, 2) + 2*f(x).diff(x) - f(x), 0)
eq7 = diff(f(x), x, 3) + diff(f(x), x, 2) - 10*diff(f(x), x) - 6*f(x)
eq8 = f(x).diff(x, 4) - f(x).diff(x, 3) - 4*f(x).diff(x, 2) + \
4*f(x).diff(x)
eq9 = f(x).diff(x, 4) + 4*f(x).diff(x, 3) + f(x).diff(x, 2) - \
4*f(x).diff(x) - 2*f(x)
eq10 = f(x).diff(x, 4) - a**2*f(x)
eq11 = f(x).diff(x, 2) - 2*k*f(x).diff(x) - 2*f(x)
eq12 = f(x).diff(x, 2) + 4*k*f(x).diff(x) - 12*k**2*f(x)
eq13 = f(x).diff(x, 4)
eq14 = f(x).diff(x, 2) + 4*f(x).diff(x) + 4*f(x)
eq15 = 3*f(x).diff(x, 3) + 5*f(x).diff(x, 2) + f(x).diff(x) - f(x)
eq16 = f(x).diff(x, 3) - 6*f(x).diff(x, 2) + 12*f(x).diff(x) - 8*f(x)
eq17 = f(x).diff(x, 2) - 2*a*f(x).diff(x) + a**2*f(x)
eq18 = f(x).diff(x, 4) + 3*f(x).diff(x, 3)
eq19 = f(x).diff(x, 4) - 2*f(x).diff(x, 2)
eq20 = f(x).diff(x, 4) + 2*f(x).diff(x, 3) - 11*f(x).diff(x, 2) - \
12*f(x).diff(x) + 36*f(x)
eq21 = 36*f(x).diff(x, 4) - 37*f(x).diff(x, 2) + 4*f(x).diff(x) + 5*f(x)
eq22 = f(x).diff(x, 4) - 8*f(x).diff(x, 2) + 16*f(x)
eq23 = f(x).diff(x, 2) - 2*f(x).diff(x) + 5*f(x)
eq24 = f(x).diff(x, 2) - f(x).diff(x) + f(x)
eq25 = f(x).diff(x, 4) + 5*f(x).diff(x, 2) + 6*f(x)
eq26 = f(x).diff(x, 2) - 4*f(x).diff(x) + 20*f(x)
eq27 = f(x).diff(x, 4) + 4*f(x).diff(x, 2) + 4*f(x)
eq28 = f(x).diff(x, 3) + 8*f(x)
eq29 = f(x).diff(x, 4) + 4*f(x).diff(x, 2)
eq30 = f(x).diff(x, 5) + 2*f(x).diff(x, 3) + f(x).diff(x)
eq31 = f(x).diff(x, 4) + f(x).diff(x, 2) + f(x)
eq32 = f(x).diff(x, 4) + 4*f(x).diff(x, 2) + f(x)
sol1 = Eq(f(x), C1 + C2*exp(-2*x))
sol2 = Eq(f(x), (C1 + C2*exp(x))*exp(x))
sol3 = Eq(f(x), C1*exp(x) + C2*exp(-x))
sol4 = Eq(f(x), C1 + C2*exp(-3*x) + C3*exp(2*x))
sol5 = Eq(f(x), C1*exp(x/2) + C2*exp(x*Rational(4, 3)))
sol6 = Eq(f(x), C1*exp(x*(-1 + sqrt(2))) + C2*exp(x*(-sqrt(2) - 1)))
sol7 = Eq(f(x), C3*exp(3*x) + (C1*exp(-sqrt(2)*x) + C2*exp(sqrt(2)*x))*exp(-2*x))
sol8 = Eq(f(x), C1 + C2*exp(x) + C3*exp(-2*x) + C4*exp(2*x))
sol9 = Eq(f(x), C3*exp(-x) + C4*exp(x) + (C1*exp(-sqrt(2)*x) + C2*exp(sqrt(2)*x))*exp(-2*x))
sol10 = Eq(f(x),
C1*sin(x*sqrt(a)) + C2*cos(x*sqrt(a)) + C3*exp(x*sqrt(a)) +
C4*exp(-x*sqrt(a)))
sol11 = Eq(f(x),
C1*exp(x*(k - sqrt(k**2 + 2))) + C2*exp(x*(k + sqrt(k**2 + 2))))
sol12 = Eq(f(x), C1*exp(-6*k*x) + C2*exp(2*k*x))
sol13 = Eq(f(x), C1 + C2*x + C3*x**2 + C4*x**3)
sol14 = Eq(f(x), (C1 + C2*x)*exp(-2*x))
sol15 = Eq(f(x), (C1 + C2*x)*exp(-x) + C3*exp(x/3))
sol16 = Eq(f(x), (C1 + x*(C2 + C3*x))*exp(2*x))
sol17 = Eq(f(x), (C1 + C2*x)*exp(a*x))
sol18 = Eq(f(x), C1 + C2*x + C3*x**2 + C4*exp(-3*x))
sol19 = Eq(f(x), C1 + C2*x + C3*exp(x*sqrt(2)) + C4*exp(-x*sqrt(2)))
sol20 = Eq(f(x), (C1 + C2*x)*exp(-3*x) + (C3 + C4*x)*exp(2*x))
sol21 = Eq(f(x), C1*exp(x/2) + C2*exp(-x) + C3*exp(-x/3) + C4*exp(x*Rational(5, 6)))
sol22 = Eq(f(x), (C1 + C2*x)*exp(-2*x) + (C3 + C4*x)*exp(2*x))
sol23 = Eq(f(x), (C1*sin(2*x) + C2*cos(2*x))*exp(x))
sol24 = Eq(f(x), (C1*sin(x*sqrt(3)/2) + C2*cos(x*sqrt(3)/2))*exp(x/2))
sol25 = Eq(f(x),
C1*cos(x*sqrt(3)) + C2*sin(x*sqrt(3)) + C3*sin(x*sqrt(2)) +
C4*cos(x*sqrt(2)))
sol26 = Eq(f(x), (C1*sin(4*x) + C2*cos(4*x))*exp(2*x))
sol27 = Eq(f(x), (C1 + C2*x)*sin(x*sqrt(2)) + (C3 + C4*x)*cos(x*sqrt(2)))
sol28 = Eq(f(x),
(C1*sin(x*sqrt(3)) + C2*cos(x*sqrt(3)))*exp(x) + C3*exp(-2*x))
sol29 = Eq(f(x), C1 + C2*sin(2*x) + C3*cos(2*x) + C4*x)
sol30 = Eq(f(x), C1 + (C2 + C3*x)*sin(x) + (C4 + C5*x)*cos(x))
sol31 = Eq(f(x), (C1*sin(sqrt(3)*x/2) + C2*cos(sqrt(3)*x/2))/sqrt(exp(x))
+ (C3*sin(sqrt(3)*x/2) + C4*cos(sqrt(3)*x/2))*sqrt(exp(x)))
sol32 = Eq(f(x), C1*sin(x*sqrt(-sqrt(3) + 2)) + C2*sin(x*sqrt(sqrt(3) + 2))
+ C3*cos(x*sqrt(-sqrt(3) + 2)) + C4*cos(x*sqrt(sqrt(3) + 2)))
sol1s = constant_renumber(sol1)
sol2s = constant_renumber(sol2)
sol3s = constant_renumber(sol3)
sol4s = constant_renumber(sol4)
sol5s = constant_renumber(sol5)
sol6s = constant_renumber(sol6)
sol7s = constant_renumber(sol7)
sol8s = constant_renumber(sol8)
sol9s = constant_renumber(sol9)
sol10s = constant_renumber(sol10)
sol11s = constant_renumber(sol11)
sol12s = constant_renumber(sol12)
sol13s = constant_renumber(sol13)
sol14s = constant_renumber(sol14)
sol15s = constant_renumber(sol15)
sol16s = constant_renumber(sol16)
sol17s = constant_renumber(sol17)
sol18s = constant_renumber(sol18)
sol19s = constant_renumber(sol19)
sol20s = constant_renumber(sol20)
sol21s = constant_renumber(sol21)
sol22s = constant_renumber(sol22)
sol23s = constant_renumber(sol23)
sol24s = constant_renumber(sol24)
sol25s = constant_renumber(sol25)
sol26s = constant_renumber(sol26)
sol27s = constant_renumber(sol27)
sol28s = constant_renumber(sol28)
sol29s = constant_renumber(sol29)
sol30s = constant_renumber(sol30)
assert dsolve(eq1) in (sol1, sol1s)
assert dsolve(eq2) in (sol2, sol2s)
assert dsolve(eq3) in (sol3, sol3s)
assert dsolve(eq4) in (sol4, sol4s)
assert dsolve(eq5) in (sol5, sol5s)
assert dsolve(eq6) in (sol6, sol6s)
got = dsolve(eq7)
assert got in (sol7, sol7s), got
assert dsolve(eq8) in (sol8, sol8s)
got = dsolve(eq9)
assert got in (sol9, sol9s), got
assert dsolve(eq10) in (sol10, sol10s)
assert dsolve(eq11) in (sol11, sol11s)
assert dsolve(eq12) in (sol12, sol12s)
assert dsolve(eq13) in (sol13, sol13s)
assert dsolve(eq14) in (sol14, sol14s)
assert dsolve(eq15) in (sol15, sol15s)
got = dsolve(eq16)
assert got in (sol16, sol16s), got
assert dsolve(eq17) in (sol17, sol17s)
assert dsolve(eq18) in (sol18, sol18s)
assert dsolve(eq19) in (sol19, sol19s)
assert dsolve(eq20) in (sol20, sol20s)
assert dsolve(eq21) in (sol21, sol21s)
assert dsolve(eq22) in (sol22, sol22s)
assert dsolve(eq23) in (sol23, sol23s)
assert dsolve(eq24) in (sol24, sol24s)
assert dsolve(eq25) in (sol25, sol25s)
assert dsolve(eq26) in (sol26, sol26s)
assert dsolve(eq27) in (sol27, sol27s)
assert dsolve(eq28) in (sol28, sol28s)
assert dsolve(eq29) in (sol29, sol29s)
assert dsolve(eq30) in (sol30, sol30s)
assert dsolve(eq31) in (sol31,)
assert dsolve(eq32) in (sol32,)
assert checkodesol(eq1, sol1, order=2, solve_for_func=False)[0]
assert checkodesol(eq2, sol2, order=2, solve_for_func=False)[0]
assert checkodesol(eq3, sol3, order=2, solve_for_func=False)[0]
assert checkodesol(eq4, sol4, order=3, solve_for_func=False)[0]
assert checkodesol(eq5, sol5, order=2, solve_for_func=False)[0]
assert checkodesol(eq6, sol6, order=2, solve_for_func=False)[0]
assert checkodesol(eq7, sol7, order=3, solve_for_func=False)[0]
assert checkodesol(eq8, sol8, order=4, solve_for_func=False)[0]
assert checkodesol(eq9, sol9, order=4, solve_for_func=False)[0]
assert checkodesol(eq10, sol10, order=4, solve_for_func=False)[0]
assert checkodesol(eq11, sol11, order=2, solve_for_func=False)[0]
assert checkodesol(eq12, sol12, order=2, solve_for_func=False)[0]
assert checkodesol(eq13, sol13, order=4, solve_for_func=False)[0]
assert checkodesol(eq14, sol14, order=2, solve_for_func=False)[0]
assert checkodesol(eq15, sol15, order=3, solve_for_func=False)[0]
assert checkodesol(eq16, sol16, order=3, solve_for_func=False)[0]
assert checkodesol(eq17, sol17, order=2, solve_for_func=False)[0]
assert checkodesol(eq18, sol18, order=4, solve_for_func=False)[0]
assert checkodesol(eq19, sol19, order=4, solve_for_func=False)[0]
assert checkodesol(eq20, sol20, order=4, solve_for_func=False)[0]
assert checkodesol(eq21, sol21, order=4, solve_for_func=False)[0]
assert checkodesol(eq22, sol22, order=4, solve_for_func=False)[0]
assert checkodesol(eq23, sol23, order=2, solve_for_func=False)[0]
assert checkodesol(eq24, sol24, order=2, solve_for_func=False)[0]
assert checkodesol(eq25, sol25, order=4, solve_for_func=False)[0]
assert checkodesol(eq26, sol26, order=2, solve_for_func=False)[0]
assert checkodesol(eq27, sol27, order=4, solve_for_func=False)[0]
assert checkodesol(eq28, sol28, order=3, solve_for_func=False)[0]
assert checkodesol(eq29, sol29, order=4, solve_for_func=False)[0]
assert checkodesol(eq30, sol30, order=5, solve_for_func=False)[0]
assert checkodesol(eq31, sol31, order=4, solve_for_func=False)[0]
assert checkodesol(eq32, sol32, order=4, solve_for_func=False)[0]
# Issue #15237
eqn = Derivative(x*f(x), x, x, x)
hint = 'nth_linear_constant_coeff_homogeneous'
raises(ValueError, lambda: dsolve(eqn, f(x), hint, prep=True))
raises(ValueError, lambda: dsolve(eqn, f(x), hint, prep=False))
def test_nth_linear_constant_coeff_homogeneous_rootof():
# One real root, two complex conjugate pairs
eq = f(x).diff(x, 5) + 11*f(x).diff(x) - 2*f(x)
r1, r2, r3, r4, r5 = [rootof(x**5 + 11*x - 2, n) for n in range(5)]
sol = Eq(f(x),
C5*exp(r1*x)
+ exp(re(r2)*x) * (C1*sin(im(r2)*x) + C2*cos(im(r2)*x))
+ exp(re(r4)*x) * (C3*sin(im(r4)*x) + C4*cos(im(r4)*x))
)
assert dsolve(eq) == sol
# FIXME: assert checkodesol(eq, sol) == (True, [0]) # Hangs...
# Three real roots, one complex conjugate pair
eq = f(x).diff(x,5) - 3*f(x).diff(x) + f(x)
r1, r2, r3, r4, r5 = [rootof(x**5 - 3*x + 1, n) for n in range(5)]
sol = Eq(f(x),
C3*exp(r1*x) + C4*exp(r2*x) + C5*exp(r3*x)
+ exp(re(r4)*x) * (C1*sin(im(r4)*x) + C2*cos(im(r4)*x))
)
assert dsolve(eq) == sol
# FIXME: assert checkodesol(eq, sol) == (True, [0]) # Hangs...
# Five distinct real roots
eq = f(x).diff(x,5) - 100*f(x).diff(x,3) + 1000*f(x).diff(x) + f(x)
r1, r2, r3, r4, r5 = [rootof(x**5 - 100*x**3 + 1000*x + 1, n) for n in range(5)]
sol = Eq(f(x), C1*exp(r1*x) + C2*exp(r2*x) + C3*exp(r3*x) + C4*exp(r4*x) + C5*exp(r5*x))
assert dsolve(eq) == sol
# FIXME: assert checkodesol(eq, sol) == (True, [0]) # Hangs...
# Rational root and unsolvable quintic
eq = f(x).diff(x, 6) - 6*f(x).diff(x, 5) + 5*f(x).diff(x, 4) + 10*f(x).diff(x) - 50 * f(x)
r2, r3, r4, r5, r6 = [rootof(x**5 - x**4 + 10, n) for n in range(5)]
sol = Eq(f(x),
C5*exp(5*x)
+ C6*exp(x*r2)
+ exp(re(r3)*x) * (C1*sin(im(r3)*x) + C2*cos(im(r3)*x))
+ exp(re(r5)*x) * (C3*sin(im(r5)*x) + C4*cos(im(r5)*x))
)
assert dsolve(eq) == sol
# FIXME: assert checkodesol(eq, sol) == (True, [0]) # Hangs...
# Five double roots (this is (x**5 - x + 1)**2)
eq = f(x).diff(x, 10) - 2*f(x).diff(x, 6) + 2*f(x).diff(x, 5) + f(x).diff(x, 2) - 2*f(x).diff(x, 1) + f(x)
r1, r2, r3, r4, r5 = [rootof(x**5 - x + 1, n) for n in range(5)]
sol = Eq(f(x), (C1 + C2*x)*exp(x*r1) + (C10*sin(x*im(r4)) + C7*x*sin(x*im(r4)) + (
C8 + C9*x)*cos(x*im(r4)))*exp(x*re(r4)) + (C3*x*sin(x*im(r2)) + C6*sin(x*im(r2)
) + (C4 + C5*x)*cos(x*im(r2)))*exp(x*re(r2)))
got = dsolve(eq)
assert sol == got, got
# FIXME: assert checkodesol(eq, sol) == (True, [0]) # Hangs...
def test_nth_linear_constant_coeff_homogeneous_irrational():
our_hint='nth_linear_constant_coeff_homogeneous'
eq = Eq(sqrt(2) * f(x).diff(x,x,x) + f(x).diff(x), 0)
sol = Eq(f(x), C1 + C2*sin(2**Rational(3, 4)*x/2) + C3*cos(2**Rational(3, 4)*x/2))
assert our_hint in classify_ode(eq)
assert dsolve(eq, f(x), hint=our_hint) == sol
assert dsolve(eq, f(x)) == sol
assert checkodesol(eq, sol, order=3, solve_for_func=False)[0]
E = exp(1)
eq = Eq(E * f(x).diff(x,x,x) + f(x).diff(x), 0)
sol = Eq(f(x), C1 + C2*sin(x/sqrt(E)) + C3*cos(x/sqrt(E)))
assert our_hint in classify_ode(eq)
assert dsolve(eq, f(x), hint=our_hint) == sol
assert dsolve(eq, f(x)) == sol
assert checkodesol(eq, sol, order=3, solve_for_func=False)[0]
eq = Eq(pi * f(x).diff(x,x,x) + f(x).diff(x), 0)
sol = Eq(f(x), C1 + C2*sin(x/sqrt(pi)) + C3*cos(x/sqrt(pi)))
assert our_hint in classify_ode(eq)
assert dsolve(eq, f(x), hint=our_hint) == sol
assert dsolve(eq, f(x)) == sol
assert checkodesol(eq, sol, order=3, solve_for_func=False)[0]
eq = Eq(I * f(x).diff(x,x,x) + f(x).diff(x), 0)
sol = Eq(f(x), C1 + C2*exp(-sqrt(I)*x) + C3*exp(sqrt(I)*x))
assert our_hint in classify_ode(eq)
assert dsolve(eq, f(x), hint=our_hint) == sol
assert dsolve(eq, f(x)) == sol
assert checkodesol(eq, sol, order=3, solve_for_func=False)[0]
@XFAIL
@slow
def test_nth_linear_constant_coeff_homogeneous_rootof_sol():
# See https://github.com/sympy/sympy/issues/15753
if ON_TRAVIS:
skip("Too slow for travis.")
eq = f(x).diff(x, 5) + 11*f(x).diff(x) - 2*f(x)
sol = Eq(f(x),
C1*exp(x*rootof(x**5 + 11*x - 2, 0)) +
C2*exp(x*rootof(x**5 + 11*x - 2, 1)) +
C3*exp(x*rootof(x**5 + 11*x - 2, 2)) +
C4*exp(x*rootof(x**5 + 11*x - 2, 3)) +
C5*exp(x*rootof(x**5 + 11*x - 2, 4)))
assert checkodesol(eq, sol, order=5, solve_for_func=False)[0]
@XFAIL
def test_noncircularized_real_imaginary_parts():
# If this passes, lines numbered 3878-3882 (at the time of this commit)
# of sympy/solvers/ode.py for nth_linear_constant_coeff_homogeneous
# should be removed.
y = sqrt(1+x)
i, r = im(y), re(y)
assert not (i.has(atan2) and r.has(atan2))
def test_collect_respecting_exponentials():
# If this test passes, lines 1306-1311 (at the time of this commit)
# of sympy/solvers/ode.py should be removed.
sol = 1 + exp(x/2)
assert sol == collect( sol, exp(x/3))
def test_undetermined_coefficients_match():
assert _undetermined_coefficients_match(g(x), x) == {'test': False}
assert _undetermined_coefficients_match(sin(2*x + sqrt(5)), x) == \
{'test': True, 'trialset':
set([cos(2*x + sqrt(5)), sin(2*x + sqrt(5))])}
assert _undetermined_coefficients_match(sin(x)*cos(x), x) == \
{'test': False}
s = set([cos(x), x*cos(x), x**2*cos(x), x**2*sin(x), x*sin(x), sin(x)])
assert _undetermined_coefficients_match(sin(x)*(x**2 + x + 1), x) == \
{'test': True, 'trialset': s}
assert _undetermined_coefficients_match(
sin(x)*x**2 + sin(x)*x + sin(x), x) == {'test': True, 'trialset': s}
assert _undetermined_coefficients_match(
exp(2*x)*sin(x)*(x**2 + x + 1), x
) == {
'test': True, 'trialset': set([exp(2*x)*sin(x), x**2*exp(2*x)*sin(x),
cos(x)*exp(2*x), x**2*cos(x)*exp(2*x), x*cos(x)*exp(2*x),
x*exp(2*x)*sin(x)])}
assert _undetermined_coefficients_match(1/sin(x), x) == {'test': False}
assert _undetermined_coefficients_match(log(x), x) == {'test': False}
assert _undetermined_coefficients_match(2**(x)*(x**2 + x + 1), x) == \
{'test': True, 'trialset': set([2**x, x*2**x, x**2*2**x])}
assert _undetermined_coefficients_match(x**y, x) == {'test': False}
assert _undetermined_coefficients_match(exp(x)*exp(2*x + 1), x) == \
{'test': True, 'trialset': set([exp(1 + 3*x)])}
assert _undetermined_coefficients_match(sin(x)*(x**2 + x + 1), x) == \
{'test': True, 'trialset': set([x*cos(x), x*sin(x), x**2*cos(x),
x**2*sin(x), cos(x), sin(x)])}
assert _undetermined_coefficients_match(sin(x)*(x + sin(x)), x) == \
{'test': False}
assert _undetermined_coefficients_match(sin(x)*(x + sin(2*x)), x) == \
{'test': False}
assert _undetermined_coefficients_match(sin(x)*tan(x), x) == \
{'test': False}
assert _undetermined_coefficients_match(
x**2*sin(x)*exp(x) + x*sin(x) + x, x
) == {
'test': True, 'trialset': set([x**2*cos(x)*exp(x), x, cos(x), S.One,
exp(x)*sin(x), sin(x), x*exp(x)*sin(x), x*cos(x), x*cos(x)*exp(x),
x*sin(x), cos(x)*exp(x), x**2*exp(x)*sin(x)])}
assert _undetermined_coefficients_match(4*x*sin(x - 2), x) == {
'trialset': set([x*cos(x - 2), x*sin(x - 2), cos(x - 2), sin(x - 2)]),
'test': True,
}
assert _undetermined_coefficients_match(2**x*x, x) == \
{'test': True, 'trialset': set([2**x, x*2**x])}
assert _undetermined_coefficients_match(2**x*exp(2*x), x) == \
{'test': True, 'trialset': set([2**x*exp(2*x)])}
assert _undetermined_coefficients_match(exp(-x)/x, x) == \
{'test': False}
# Below are from Ordinary Differential Equations,
# Tenenbaum and Pollard, pg. 231
assert _undetermined_coefficients_match(S(4), x) == \
{'test': True, 'trialset': set([S.One])}
assert _undetermined_coefficients_match(12*exp(x), x) == \
{'test': True, 'trialset': set([exp(x)])}
assert _undetermined_coefficients_match(exp(I*x), x) == \
{'test': True, 'trialset': set([exp(I*x)])}
assert _undetermined_coefficients_match(sin(x), x) == \
{'test': True, 'trialset': set([cos(x), sin(x)])}
assert _undetermined_coefficients_match(cos(x), x) == \
{'test': True, 'trialset': set([cos(x), sin(x)])}
assert _undetermined_coefficients_match(8 + 6*exp(x) + 2*sin(x), x) == \
{'test': True, 'trialset': set([S.One, cos(x), sin(x), exp(x)])}
assert _undetermined_coefficients_match(x**2, x) == \
{'test': True, 'trialset': set([S.One, x, x**2])}
assert _undetermined_coefficients_match(9*x*exp(x) + exp(-x), x) == \
{'test': True, 'trialset': set([x*exp(x), exp(x), exp(-x)])}
assert _undetermined_coefficients_match(2*exp(2*x)*sin(x), x) == \
{'test': True, 'trialset': set([exp(2*x)*sin(x), cos(x)*exp(2*x)])}
assert _undetermined_coefficients_match(x - sin(x), x) == \
{'test': True, 'trialset': set([S.One, x, cos(x), sin(x)])}
assert _undetermined_coefficients_match(x**2 + 2*x, x) == \
{'test': True, 'trialset': set([S.One, x, x**2])}
assert _undetermined_coefficients_match(4*x*sin(x), x) == \
{'test': True, 'trialset': set([x*cos(x), x*sin(x), cos(x), sin(x)])}
assert _undetermined_coefficients_match(x*sin(2*x), x) == \
{'test': True, 'trialset':
set([x*cos(2*x), x*sin(2*x), cos(2*x), sin(2*x)])}
assert _undetermined_coefficients_match(x**2*exp(-x), x) == \
{'test': True, 'trialset': set([x*exp(-x), x**2*exp(-x), exp(-x)])}
assert _undetermined_coefficients_match(2*exp(-x) - x**2*exp(-x), x) == \
{'test': True, 'trialset': set([x*exp(-x), x**2*exp(-x), exp(-x)])}
assert _undetermined_coefficients_match(exp(-2*x) + x**2, x) == \
{'test': True, 'trialset': set([S.One, x, x**2, exp(-2*x)])}
assert _undetermined_coefficients_match(x*exp(-x), x) == \
{'test': True, 'trialset': set([x*exp(-x), exp(-x)])}
assert _undetermined_coefficients_match(x + exp(2*x), x) == \
{'test': True, 'trialset': set([S.One, x, exp(2*x)])}
assert _undetermined_coefficients_match(sin(x) + exp(-x), x) == \
{'test': True, 'trialset': set([cos(x), sin(x), exp(-x)])}
assert _undetermined_coefficients_match(exp(x), x) == \
{'test': True, 'trialset': set([exp(x)])}
# converted from sin(x)**2
assert _undetermined_coefficients_match(S.Half - cos(2*x)/2, x) == \
{'test': True, 'trialset': set([S.One, cos(2*x), sin(2*x)])}
# converted from exp(2*x)*sin(x)**2
assert _undetermined_coefficients_match(
exp(2*x)*(S.Half + cos(2*x)/2), x
) == {
'test': True, 'trialset': set([exp(2*x)*sin(2*x), cos(2*x)*exp(2*x),
exp(2*x)])}
assert _undetermined_coefficients_match(2*x + sin(x) + cos(x), x) == \
{'test': True, 'trialset': set([S.One, x, cos(x), sin(x)])}
# converted from sin(2*x)*sin(x)
assert _undetermined_coefficients_match(cos(x)/2 - cos(3*x)/2, x) == \
{'test': True, 'trialset': set([cos(x), cos(3*x), sin(x), sin(3*x)])}
assert _undetermined_coefficients_match(cos(x**2), x) == {'test': False}
assert _undetermined_coefficients_match(2**(x**2), x) == {'test': False}
def test_issue_12623():
t = symbols("t")
u = symbols("u",cls=Function)
R, L, C, E_0, alpha = symbols("R L C E_0 alpha",positive=True)
omega = Symbol('omega')
eqRLC_1 = Eq( u(t).diff(t,t) + R /L*u(t).diff(t) + 1/(L*C)*u(t), alpha)
sol_1 = Eq(u(t), C*L*alpha + C1*exp(t*(-R - sqrt(C*R**2 - 4*L)/sqrt(C))/(2*L)) + C2*exp(t*(-R + sqrt(C*R**2 - 4*L)/sqrt(C))/(2*L)))
assert dsolve(eqRLC_1) == sol_1
assert checkodesol(eqRLC_1, sol_1) == (True, 0)
eqRLC_2 = Eq( L*C*u(t).diff(t,t) + R*C*u(t).diff(t) + u(t), E_0*exp(I*omega*t) )
sol_2 = Eq(u(t), C1*exp(t*(-R - sqrt(C*R**2 - 4*L)/sqrt(C))/(2*L)) + C2*exp(t*(-R + sqrt(C*R**2 - 4*L)/sqrt(C))/(2*L)) + E_0*exp(I*omega*t)/(-C*L*omega**2 + I*C*R*omega + 1))
assert dsolve(eqRLC_2) == sol_2
assert checkodesol(eqRLC_2, sol_2) == (True, 0)
#issue-https://github.com/sympy/sympy/issues/12623
def test_issue_5787():
# This test case is to show the classification of imaginary constants under
# nth_linear_constant_coeff_undetermined_coefficients
eq = Eq(diff(f(x), x), I*f(x) + S.Half - I)
our_hint = 'nth_linear_constant_coeff_undetermined_coefficients'
assert our_hint in classify_ode(eq)
def test_nth_linear_constant_coeff_undetermined_coefficients_imaginary_exp():
# Equivalent to eq26 in
# test_nth_linear_constant_coeff_undetermined_coefficients above. This
# previously failed because the algorithm for undetermined coefficients
# didn't know to multiply exp(I*x) by sufficient x because it is linearly
# dependent on sin(x) and cos(x).
hint = 'nth_linear_constant_coeff_undetermined_coefficients'
eq26a = f(x).diff(x, 5) + 2*f(x).diff(x, 3) + f(x).diff(x) - 2*x - exp(I*x)
sol26 = Eq(f(x), C1 + x**2*(I*exp(I*x)/8 + 1) + (C2 + C3*x)*sin(x) + (C4 + C5*x)*cos(x))
assert dsolve(eq26a, hint=hint) == sol26
assert checkodesol(eq26a, sol26) == (True, 0)
@slow
def test_nth_linear_constant_coeff_variation_of_parameters():
hint = 'nth_linear_constant_coeff_variation_of_parameters'
g = exp(-x)
f2 = f(x).diff(x, 2)
c = 3*f(x).diff(x, 3) + 5*f2 + f(x).diff(x) - f(x) - x
eq1 = c - x*g
eq2 = c - g
eq3 = f(x).diff(x) - 1
eq4 = f2 + 3*f(x).diff(x) + 2*f(x) - 4
eq5 = f2 + 3*f(x).diff(x) + 2*f(x) - 12*exp(x)
eq6 = f2 - 2*f(x).diff(x) - 8*f(x) - 9*x*exp(x) - 10*exp(-x)
eq7 = f2 + 2*f(x).diff(x) + f(x) - x**2*exp(-x)
eq8 = f2 - 3*f(x).diff(x) + 2*f(x) - x*exp(-x)
eq9 = f(x).diff(x, 3) - 3*f2 + 3*f(x).diff(x) - f(x) - exp(x)
eq10 = f2 + 2*f(x).diff(x) + f(x) - exp(-x)/x
eq11 = f2 + f(x) - 1/sin(x)*1/cos(x)
eq12 = f(x).diff(x, 4) - 1/x
sol1 = Eq(f(x), C3*exp(x/3) - x + (C1 + x*(C2 - x**2/24 - 3*x/32))*exp(-x) - 1)
sol2 = Eq(f(x), C3*exp(x/3) - x + (C1 + x*(C2 - x/8))*exp(-x) - 1)
sol3 = Eq(f(x), C1 + x)
sol4 = Eq(f(x), 2 + C1*exp(-x) + C2*exp(-2*x))
sol5 = Eq(f(x), 2*exp(x) + C1*exp(-x) + C2*exp(-2*x))
sol6 = Eq(f(x), -x*exp(x) - 2*exp(-x) + C1*exp(-2*x) + C2*exp(4*x))
sol7 = Eq(f(x), (C1 + x*(C2 + x**3/12))*exp(-x))
sol8 = Eq(f(x), C1*exp(x) + C2*exp(2*x) + (6*x + 5)*exp(-x)/36)
sol9 = Eq(f(x), (C1 + x*(C2 + x*(C3 + x/6)))*exp(x))
sol10 = Eq(f(x), (C1 + x*(C2 + log(x)))*exp(-x))
sol11 = Eq(f(x), (C1 + log(sin(x) - 1)/2 - log(sin(x) + 1)/2
)*cos(x) + (C2 + log(cos(x) - 1)/2 - log(cos(x) + 1)/2)*sin(x))
sol12 = Eq(f(x), C1 + C2*x + x**3*(C3 + log(x)/6) + C4*x**2)
sol1s = constant_renumber(sol1)
sol2s = constant_renumber(sol2)
sol3s = constant_renumber(sol3)
sol4s = constant_renumber(sol4)
sol5s = constant_renumber(sol5)
sol6s = constant_renumber(sol6)
sol7s = constant_renumber(sol7)
sol8s = constant_renumber(sol8)
sol9s = constant_renumber(sol9)
sol10s = constant_renumber(sol10)
sol11s = constant_renumber(sol11)
sol12s = constant_renumber(sol12)
got = dsolve(eq1, hint=hint)
assert got in (sol1, sol1s), got
got = dsolve(eq2, hint=hint)
assert got in (sol2, sol2s), got
assert dsolve(eq3, hint=hint) in (sol3, sol3s)
assert dsolve(eq4, hint=hint) in (sol4, sol4s)
assert dsolve(eq5, hint=hint) in (sol5, sol5s)
assert dsolve(eq6, hint=hint) in (sol6, sol6s)
got = dsolve(eq7, hint=hint)
assert got in (sol7, sol7s), got
assert dsolve(eq8, hint=hint) in (sol8, sol8s)
got = dsolve(eq9, hint=hint)
assert got in (sol9, sol9s), got
assert dsolve(eq10, hint=hint) in (sol10, sol10s)
assert dsolve(eq11, hint=hint + '_Integral').doit() in (sol11, sol11s)
assert dsolve(eq12, hint=hint) in (sol12, sol12s)
assert checkodesol(eq1, sol1, order=3, solve_for_func=False)[0]
assert checkodesol(eq2, sol2, order=3, solve_for_func=False)[0]
assert checkodesol(eq3, sol3, order=1, solve_for_func=False)[0]
assert checkodesol(eq4, sol4, order=2, solve_for_func=False)[0]
assert checkodesol(eq5, sol5, order=2, solve_for_func=False)[0]
assert checkodesol(eq6, sol6, order=2, solve_for_func=False)[0]
assert checkodesol(eq7, sol7, order=2, solve_for_func=False)[0]
assert checkodesol(eq8, sol8, order=2, solve_for_func=False)[0]
assert checkodesol(eq9, sol9, order=3, solve_for_func=False)[0]
assert checkodesol(eq10, sol10, order=2, solve_for_func=False)[0]
assert checkodesol(eq12, sol12, order=4, solve_for_func=False)[0]
@slow
def test_nth_linear_constant_coeff_variation_of_parameters_simplify_False():
# solve_variation_of_parameters shouldn't attempt to simplify the
# Wronskian if simplify=False. If wronskian() ever gets good enough
# to simplify the result itself, this test might fail.
our_hint = 'nth_linear_constant_coeff_variation_of_parameters_Integral'
eq = f(x).diff(x, 5) + 2*f(x).diff(x, 3) + f(x).diff(x) - 2*x - exp(I*x)
sol_simp = dsolve(eq, f(x), hint=our_hint, simplify=True)
sol_nsimp = dsolve(eq, f(x), hint=our_hint, simplify=False)
assert sol_simp != sol_nsimp
assert checkodesol(eq, sol_simp, order=5, solve_for_func=False) == (True, 0)
assert checkodesol(eq, sol_simp, order=5, solve_for_func=False) == (True, 0)
def test_unexpanded_Liouville_ODE():
# This is the same as eq1 from test_Liouville_ODE() above.
eq1 = diff(f(x), x)/x + diff(f(x), x, x)/2 - diff(f(x), x)**2/2
eq2 = eq1*exp(-f(x))/exp(f(x))
sol2 = Eq(f(x), C1 + log(x) - log(C2 + x))
sol2s = constant_renumber(sol2)
assert dsolve(eq2) in (sol2, sol2s)
assert checkodesol(eq2, sol2, order=2, solve_for_func=False)[0]
def test_issue_4785():
from sympy.abc import A
eq = x + A*(x + diff(f(x), x) + f(x)) + diff(f(x), x) + f(x) + 2
assert classify_ode(eq, f(x)) == ('1st_linear', 'almost_linear',
'1st_power_series', 'lie_group',
'nth_linear_constant_coeff_undetermined_coefficients',
'nth_linear_constant_coeff_variation_of_parameters',
'1st_linear_Integral', 'almost_linear_Integral',
'nth_linear_constant_coeff_variation_of_parameters_Integral')
# issue 4864
eq = (x**2 + f(x)**2)*f(x).diff(x) - 2*x*f(x)
assert classify_ode(eq, f(x)) == ('1st_exact',
'1st_homogeneous_coeff_best',
'1st_homogeneous_coeff_subs_indep_div_dep',
'1st_homogeneous_coeff_subs_dep_div_indep',
'1st_power_series',
'lie_group', '1st_exact_Integral',
'1st_homogeneous_coeff_subs_indep_div_dep_Integral',
'1st_homogeneous_coeff_subs_dep_div_indep_Integral')
def test_issue_4825():
raises(ValueError, lambda: dsolve(f(x, y).diff(x) - y*f(x, y), f(x)))
assert classify_ode(f(x, y).diff(x) - y*f(x, y), f(x), dict=True) == \
{'order': 0, 'default': None, 'ordered_hints': ()}
# See also issue 3793, test Z13.
raises(ValueError, lambda: dsolve(f(x).diff(x), f(y)))
assert classify_ode(f(x).diff(x), f(y), dict=True) == \
{'order': 0, 'default': None, 'ordered_hints': ()}
def test_constant_renumber_order_issue_5308():
from sympy.utilities.iterables import variations
assert constant_renumber(C1*x + C2*y) == \
constant_renumber(C1*y + C2*x) == \
C1*x + C2*y
e = C1*(C2 + x)*(C3 + y)
for a, b, c in variations([C1, C2, C3], 3):
assert constant_renumber(a*(b + x)*(c + y)) == e
def test_issue_5770():
k = Symbol("k", real=True)
t = Symbol('t')
w = Function('w')
sol = dsolve(w(t).diff(t, 6) - k**6*w(t), w(t))
assert len([s for s in sol.free_symbols if s.name.startswith('C')]) == 6
assert constantsimp((C1*cos(x) + C2*cos(x))*exp(x), set([C1, C2])) == \
C1*cos(x)*exp(x)
assert constantsimp(C1*cos(x) + C2*cos(x) + C3*sin(x), set([C1, C2, C3])) == \
C1*cos(x) + C3*sin(x)
assert constantsimp(exp(C1 + x), set([C1])) == C1*exp(x)
assert constantsimp(x + C1 + y, set([C1, y])) == C1 + x
assert constantsimp(x + C1 + Integral(x, (x, 1, 2)), set([C1])) == C1 + x
def test_issue_5112_5430():
assert homogeneous_order(-log(x) + acosh(x), x) is None
assert homogeneous_order(y - log(x), x, y) is None
def test_issue_5095():
f = Function('f')
raises(ValueError, lambda: dsolve(f(x).diff(x)**2, f(x), 'fdsjf'))
def test_exact_enhancement():
f = Function('f')(x)
df = Derivative(f, x)
eq = f/x**2 + ((f*x - 1)/x)*df
sol = [Eq(f, (i*sqrt(C1*x**2 + 1) + 1)/x) for i in (-1, 1)]
assert set(dsolve(eq, f)) == set(sol)
assert checkodesol(eq, sol, order=1, solve_for_func=False) == [(True, 0), (True, 0)]
eq = (x*f - 1) + df*(x**2 - x*f)
sol = [Eq(f, x - sqrt(C1 + x**2 - 2*log(x))),
Eq(f, x + sqrt(C1 + x**2 - 2*log(x)))]
assert set(dsolve(eq, f)) == set(sol)
assert checkodesol(eq, sol, order=1, solve_for_func=False) == [(True, 0), (True, 0)]
eq = (x + 2)*sin(f) + df*x*cos(f)
sol = [Eq(f, -asin(C1*exp(-x)/x**2) + pi),
Eq(f, asin(C1*exp(-x)/x**2))]
assert set(dsolve(eq, f)) == set(sol)
assert checkodesol(eq, sol, order=1, solve_for_func=False) == [(True, 0), (True, 0)]
@slow
def test_separable_reduced():
f = Function('f')
x = Symbol('x')
df = f(x).diff(x)
eq = (x / f(x))*df + tan(x**2*f(x) / (x**2*f(x) - 1))
assert classify_ode(eq) == ('separable_reduced', 'lie_group',
'separable_reduced_Integral')
eq = x* df + f(x)* (1 / (x**2*f(x) - 1))
assert classify_ode(eq) == ('separable_reduced', 'lie_group',
'separable_reduced_Integral')
sol = dsolve(eq, hint = 'separable_reduced', simplify=False)
assert sol.lhs == log(x**2*f(x))/3 + log(x**2*f(x) - Rational(3, 2))/6
assert sol.rhs == C1 + log(x)
assert checkodesol(eq, sol, order=1, solve_for_func=False)[0]
eq = f(x).diff(x) + (f(x) / (x**4*f(x) - x))
assert classify_ode(eq) == ('separable_reduced', 'lie_group',
'separable_reduced_Integral')
sol = dsolve(eq, hint = 'separable_reduced')
# FIXME: This one hangs
#assert checkodesol(eq, sol, order=1, solve_for_func=False) == [(True, 0)] * 4
assert len(sol) == 4
eq = x*df + f(x)*(x**2*f(x))
sol = dsolve(eq, hint = 'separable_reduced', simplify=False)
assert sol == Eq(log(x**2*f(x))/2 - log(x**2*f(x) - 2)/2, C1 + log(x))
assert checkodesol(eq, sol, order=1, solve_for_func=False)[0]
eq = Eq(f(x).diff(x) + f(x)/x * (1 + (x**(S(2)/3)*f(x))**2), 0)
sol = dsolve(eq, hint = 'separable_reduced', simplify=False)
assert sol == Eq(-3*log(x**(S(2)/3)*f(x)) + 3*log(3*x**(S(4)/3)*f(x)**2 + 1)/2, C1 + log(x))
assert checkodesol(eq, sol, solve_for_func=False) == (True, 0)
eq = Eq(f(x).diff(x) + f(x)/x * (1 + (x*f(x))**2), 0)
sol = dsolve(eq, hint = 'separable_reduced')
assert sol == [Eq(f(x), -sqrt(2)*sqrt(1/(C1 + log(x)))/(2*x)),\
Eq(f(x), sqrt(2)*sqrt(1/(C1 + log(x)))/(2*x))]
assert checkodesol(eq, sol) == [(True, 0)]*2
eq = Eq(f(x).diff(x) + (x**4*f(x)**2 + x**2*f(x))*f(x)/(x*(x**6*f(x)**3 + x**4*f(x)**2)), 0)
sol = dsolve(eq, hint = 'separable_reduced')
assert sol == Eq(f(x), C1 + 1/(2*x**2))
assert checkodesol(eq, sol) == (True, 0)
eq = Eq(f(x).diff(x) + (f(x)**2)*f(x)/(x), 0)
sol = dsolve(eq, hint = 'separable_reduced')
assert sol == [Eq(f(x), -sqrt(2)*sqrt(1/(C1 + log(x)))/2),\
Eq(f(x), sqrt(2)*sqrt(1/(C1 + log(x)))/2)]
assert checkodesol(eq, sol) == [(True, 0), (True, 0)]
eq = Eq(f(x).diff(x) + (f(x)+3)*f(x)/(x*(f(x)+2)), 0)
sol = dsolve(eq, hint = 'separable_reduced', simplify=False)
assert sol == Eq(-log(f(x) + 3)/3 - 2*log(f(x))/3, C1 + log(x))
assert checkodesol(eq, sol, solve_for_func=False) == (True, 0)
eq = Eq(f(x).diff(x) + (f(x)+3)*f(x)/x, 0)
sol = dsolve(eq, hint = 'separable_reduced')
assert sol == Eq(f(x), 3/(C1*x**3 - 1))
assert checkodesol(eq, sol) == (True, 0)
eq = Eq(f(x).diff(x) + (f(x)**2+f(x))*f(x)/(x), 0)
sol = dsolve(eq, hint='separable_reduced', simplify=False)
assert sol == Eq(-log(f(x) + 1) + log(f(x)) + 1/f(x), C1 + log(x))
assert checkodesol(eq, sol, solve_for_func=False) == (True, 0)
def test_homogeneous_function():
f = Function('f')
eq1 = tan(x + f(x))
eq2 = sin((3*x)/(4*f(x)))
eq3 = cos(x*f(x)*Rational(3, 4))
eq4 = log((3*x + 4*f(x))/(5*f(x) + 7*x))
eq5 = exp((2*x**2)/(3*f(x)**2))
eq6 = log((3*x + 4*f(x))/(5*f(x) + 7*x) + exp((2*x**2)/(3*f(x)**2)))
eq7 = sin((3*x)/(5*f(x) + x**2))
assert homogeneous_order(eq1, x, f(x)) == None
assert homogeneous_order(eq2, x, f(x)) == 0
assert homogeneous_order(eq3, x, f(x)) == None
assert homogeneous_order(eq4, x, f(x)) == 0
assert homogeneous_order(eq5, x, f(x)) == 0
assert homogeneous_order(eq6, x, f(x)) == 0
assert homogeneous_order(eq7, x, f(x)) == None
def test_linear_coeff_match():
n, d = z*(2*x + 3*f(x) + 5), z*(7*x + 9*f(x) + 11)
rat = n/d
eq1 = sin(rat) + cos(rat.expand())
eq2 = rat
eq3 = log(sin(rat))
ans = (4, Rational(-13, 3))
assert _linear_coeff_match(eq1, f(x)) == ans
assert _linear_coeff_match(eq2, f(x)) == ans
assert _linear_coeff_match(eq3, f(x)) == ans
# no c
eq4 = (3*x)/f(x)
# not x and f(x)
eq5 = (3*x + 2)/x
# denom will be zero
eq6 = (3*x + 2*f(x) + 1)/(3*x + 2*f(x) + 5)
# not rational coefficient
eq7 = (3*x + 2*f(x) + sqrt(2))/(3*x + 2*f(x) + 5)
assert _linear_coeff_match(eq4, f(x)) is None
assert _linear_coeff_match(eq5, f(x)) is None
assert _linear_coeff_match(eq6, f(x)) is None
assert _linear_coeff_match(eq7, f(x)) is None
def test_linear_coefficients():
f = Function('f')
sol = Eq(f(x), C1/(x**2 + 6*x + 9) - Rational(3, 2))
eq = f(x).diff(x) + (3 + 2*f(x))/(x + 3)
assert dsolve(eq, hint='linear_coefficients') == sol
assert checkodesol(eq, sol, order=1, solve_for_func=False)[0]
def test_constantsimp_take_problem():
c = exp(C1) + 2
assert len(Poly(constantsimp(exp(C1) + c + c*x, [C1])).gens) == 2
def test_issue_6879():
f = Function('f')
eq = Eq(Derivative(f(x), x, 2) - 2*Derivative(f(x), x) + f(x), sin(x))
sol = (C1 + C2*x)*exp(x) + cos(x)/2
assert dsolve(eq).rhs == sol
assert checkodesol(eq, sol, order=1, solve_for_func=False)[0]
def test_issue_6989():
f = Function('f')
k = Symbol('k')
eq = f(x).diff(x) - x*exp(-k*x)
csol = Eq(f(x), C1 + Piecewise(
((-k*x - 1)*exp(-k*x)/k**2, Ne(k**2, 0)),
(x**2/2, True)
))
sol = dsolve(eq, f(x))
assert sol == csol
assert checkodesol(eq, sol, order=1, solve_for_func=False)[0]
eq = -f(x).diff(x) + x*exp(-k*x)
csol = Eq(f(x), C1 + Piecewise(
((-k*x - 1)*exp(-k*x)/k**2, Ne(k**2, 0)),
(x**2/2, True)
))
sol = dsolve(eq, f(x))
assert sol == csol
assert checkodesol(eq, sol, order=1, solve_for_func=False)[0]
def test_heuristic1():
y, a, b, c, a4, a3, a2, a1, a0 = symbols("y a b c a4 a3 a2 a1 a0")
f = Function('f')
xi = Function('xi')
eta = Function('eta')
df = f(x).diff(x)
eq = Eq(df, x**2*f(x))
eq1 = f(x).diff(x) + a*f(x) - c*exp(b*x)
eq2 = f(x).diff(x) + 2*x*f(x) - x*exp(-x**2)
eq3 = (1 + 2*x)*df + 2 - 4*exp(-f(x))
eq4 = f(x).diff(x) - (a4*x**4 + a3*x**3 + a2*x**2 + a1*x + a0)**Rational(-1, 2)
eq5 = x**2*df - f(x) + x**2*exp(x - (1/x))
eqlist = [eq, eq1, eq2, eq3, eq4, eq5]
i = infinitesimals(eq, hint='abaco1_simple')
assert i == [{eta(x, f(x)): exp(x**3/3), xi(x, f(x)): 0},
{eta(x, f(x)): f(x), xi(x, f(x)): 0},
{eta(x, f(x)): 0, xi(x, f(x)): x**(-2)}]
i1 = infinitesimals(eq1, hint='abaco1_simple')
assert i1 == [{eta(x, f(x)): exp(-a*x), xi(x, f(x)): 0}]
i2 = infinitesimals(eq2, hint='abaco1_simple')
assert i2 == [{eta(x, f(x)): exp(-x**2), xi(x, f(x)): 0}]
i3 = infinitesimals(eq3, hint='abaco1_simple')
assert i3 == [{eta(x, f(x)): 0, xi(x, f(x)): 2*x + 1},
{eta(x, f(x)): 0, xi(x, f(x)): 1/(exp(f(x)) - 2)}]
i4 = infinitesimals(eq4, hint='abaco1_simple')
assert i4 == [{eta(x, f(x)): 1, xi(x, f(x)): 0},
{eta(x, f(x)): 0,
xi(x, f(x)): sqrt(a0 + a1*x + a2*x**2 + a3*x**3 + a4*x**4)}]
i5 = infinitesimals(eq5, hint='abaco1_simple')
assert i5 == [{xi(x, f(x)): 0, eta(x, f(x)): exp(-1/x)}]
ilist = [i, i1, i2, i3, i4, i5]
for eq, i in (zip(eqlist, ilist)):
check = checkinfsol(eq, i)
assert check[0]
def test_issue_6247():
eq = x**2*f(x)**2 + x*Derivative(f(x), x)
sol = Eq(f(x), 2*C1/(C1*x**2 - 1))
assert dsolve(eq, hint = 'separable_reduced') == sol
assert checkodesol(eq, sol, order=1)[0]
eq = f(x).diff(x, x) + 4*f(x)
sol = Eq(f(x), C1*sin(2*x) + C2*cos(2*x))
assert dsolve(eq) == sol
assert checkodesol(eq, sol, order=1)[0]
def test_heuristic2():
xi = Function('xi')
eta = Function('eta')
df = f(x).diff(x)
# This ODE can be solved by the Lie Group method, when there are
# better assumptions
eq = df - (f(x)/x)*(x*log(x**2/f(x)) + 2)
i = infinitesimals(eq, hint='abaco1_product')
assert i == [{eta(x, f(x)): f(x)*exp(-x), xi(x, f(x)): 0}]
assert checkinfsol(eq, i)[0]
@slow
def test_heuristic3():
xi = Function('xi')
eta = Function('eta')
a, b = symbols("a b")
df = f(x).diff(x)
eq = x**2*df + x*f(x) + f(x)**2 + x**2
i = infinitesimals(eq, hint='bivariate')
assert i == [{eta(x, f(x)): f(x), xi(x, f(x)): x}]
assert checkinfsol(eq, i)[0]
eq = x**2*(-f(x)**2 + df)- a*x**2*f(x) + 2 - a*x
i = infinitesimals(eq, hint='bivariate')
assert checkinfsol(eq, i)[0]
def test_heuristic_4():
y, a = symbols("y a")
eq = x*(f(x).diff(x)) + 1 - f(x)**2
i = infinitesimals(eq, hint='chi')
assert checkinfsol(eq, i)[0]
def test_heuristic_function_sum():
xi = Function('xi')
eta = Function('eta')
eq = f(x).diff(x) - (3*(1 + x**2/f(x)**2)*atan(f(x)/x) + (1 - 2*f(x))/x +
(1 - 3*f(x))*(x/f(x)**2))
i = infinitesimals(eq, hint='function_sum')
assert i == [{eta(x, f(x)): f(x)**(-2) + x**(-2), xi(x, f(x)): 0}]
assert checkinfsol(eq, i)[0]
def test_heuristic_abaco2_similar():
xi = Function('xi')
eta = Function('eta')
F = Function('F')
a, b = symbols("a b")
eq = f(x).diff(x) - F(a*x + b*f(x))
i = infinitesimals(eq, hint='abaco2_similar')
assert i == [{eta(x, f(x)): -a/b, xi(x, f(x)): 1}]
assert checkinfsol(eq, i)[0]
eq = f(x).diff(x) - (f(x)**2 / (sin(f(x) - x) - x**2 + 2*x*f(x)))
i = infinitesimals(eq, hint='abaco2_similar')
assert i == [{eta(x, f(x)): f(x)**2, xi(x, f(x)): f(x)**2}]
assert checkinfsol(eq, i)[0]
def test_heuristic_abaco2_unique_unknown():
xi = Function('xi')
eta = Function('eta')
F = Function('F')
a, b = symbols("a b")
x = Symbol("x", positive=True)
eq = f(x).diff(x) - x**(a - 1)*(f(x)**(1 - b))*F(x**a/a + f(x)**b/b)
i = infinitesimals(eq, hint='abaco2_unique_unknown')
assert i == [{eta(x, f(x)): -f(x)*f(x)**(-b), xi(x, f(x)): x*x**(-a)}]
assert checkinfsol(eq, i)[0]
eq = f(x).diff(x) + tan(F(x**2 + f(x)**2) + atan(x/f(x)))
i = infinitesimals(eq, hint='abaco2_unique_unknown')
assert i == [{eta(x, f(x)): x, xi(x, f(x)): -f(x)}]
assert checkinfsol(eq, i)[0]
eq = (x*f(x).diff(x) + f(x) + 2*x)**2 -4*x*f(x) -4*x**2 -4*a
i = infinitesimals(eq, hint='abaco2_unique_unknown')
assert checkinfsol(eq, i)[0]
def test_heuristic_linear():
a, b, m, n = symbols("a b m n")
eq = x**(n*(m + 1) - m)*(f(x).diff(x)) - a*f(x)**n -b*x**(n*(m + 1))
i = infinitesimals(eq, hint='linear')
assert checkinfsol(eq, i)[0]
@XFAIL
def test_kamke():
a, b, alpha, c = symbols("a b alpha c")
eq = x**2*(a*f(x)**2+(f(x).diff(x))) + b*x**alpha + c
i = infinitesimals(eq, hint='sum_function') # XFAIL
assert checkinfsol(eq, i)[0]
def test_series():
C1 = Symbol("C1")
eq = f(x).diff(x) - f(x)
sol = Eq(f(x), C1 + C1*x + C1*x**2/2 + C1*x**3/6 + C1*x**4/24 +
C1*x**5/120 + O(x**6))
assert dsolve(eq, hint='1st_power_series') == sol
assert checkodesol(eq, sol, order=1)[0]
eq = f(x).diff(x) - x*f(x)
sol = Eq(f(x), C1*x**4/8 + C1*x**2/2 + C1 + O(x**6))
assert dsolve(eq, hint='1st_power_series') == sol
assert checkodesol(eq, sol, order=1)[0]
eq = f(x).diff(x) - sin(x*f(x))
sol = Eq(f(x), (x - 2)**2*(1+ sin(4))*cos(4) + (x - 2)*sin(4) + 2 + O(x**3))
assert dsolve(eq, hint='1st_power_series', ics={f(2): 2}, n=3) == sol
# FIXME: The solution here should be O((x-2)**3) so is incorrect
#assert checkodesol(eq, sol, order=1)[0]
@XFAIL
@SKIP
def test_lie_group_issue17322_1():
eq=x*f(x).diff(x)*(f(x)+4) + (f(x)**2) -2*f(x)-2*x
sol = dsolve(eq, f(x)) # Hangs
assert checkodesol(eq, sol) == (True, 0)
@XFAIL
@SKIP
def test_lie_group_issue17322_2():
eq=x*f(x).diff(x)*(f(x)+4) + (f(x)**2) -2*f(x)-2*x
sol = dsolve(eq) # Hangs
assert checkodesol(eq, sol) == (True, 0)
@XFAIL
@SKIP
def test_lie_group_issue17322_3():
eq=Eq(x**7*Derivative(f(x), x) + 5*x**3*f(x)**2 - (2*x**2 + 2)*f(x)**3, 0)
sol = dsolve(eq) # Hangs
assert checkodesol(eq, sol) == (True, 0)
@XFAIL
def test_lie_group_issue17322_4():
eq=f(x).diff(x) - (f(x) - x*log(x))**2/x**2 + log(x)
sol = dsolve(eq) # NotImplementedError
assert checkodesol(eq, sol) == (True, 0)
@slow
def test_lie_group():
C1 = Symbol("C1")
x = Symbol("x") # assuming x is real generates an error!
a, b, c = symbols("a b c")
eq = f(x).diff(x)**2
sol = dsolve(eq, f(x), hint='lie_group')
assert checkodesol(eq, sol) == (True, 0)
eq = Eq(f(x).diff(x), x**2*f(x))
sol = dsolve(eq, f(x), hint='lie_group')
assert sol == Eq(f(x), C1*exp(x**3)**Rational(1, 3))
assert checkodesol(eq, sol) == (True, 0)
eq = f(x).diff(x) + a*f(x) - c*exp(b*x)
sol = dsolve(eq, f(x), hint='lie_group')
assert checkodesol(eq, sol) == (True, 0)
eq = f(x).diff(x) + 2*x*f(x) - x*exp(-x**2)
sol = dsolve(eq, f(x), hint='lie_group')
actual_sol = Eq(f(x), (C1 + x**2/2)*exp(-x**2))
errstr = str(eq)+' : '+str(sol)+' == '+str(actual_sol)
assert sol == actual_sol, errstr
assert checkodesol(eq, sol) == (True, 0)
eq = (1 + 2*x)*(f(x).diff(x)) + 2 - 4*exp(-f(x))
sol = dsolve(eq, f(x), hint='lie_group')
assert sol == Eq(f(x), log(C1/(2*x + 1) + 2))
assert checkodesol(eq, sol) == (True, 0)
eq = x**2*(f(x).diff(x)) - f(x) + x**2*exp(x - (1/x))
sol = dsolve(eq, f(x), hint='lie_group')
assert checkodesol(eq, sol)[0]
eq = x**2*f(x)**2 + x*Derivative(f(x), x)
sol = dsolve(eq, f(x), hint='lie_group')
assert sol == Eq(f(x), 2/(C1 + x**2))
assert checkodesol(eq, sol) == (True, 0)
eq=diff(f(x),x) + 2*x*f(x) - x*exp(-x**2)
sol = Eq(f(x), exp(-x**2)*(C1 + x**2/2))
assert sol == dsolve(eq, hint='lie_group')
assert checkodesol(eq, sol) == (True, 0)
eq = diff(f(x),x) + f(x)*cos(x) - exp(2*x)
sol = Eq(f(x), exp(-sin(x))*(C1 + Integral(exp(2*x)*exp(sin(x)), x)))
assert sol == dsolve(eq, hint='lie_group')
assert checkodesol(eq, sol) == (True, 0)
eq = diff(f(x),x) + f(x)*cos(x) - sin(2*x)/2
sol = Eq(f(x), C1*exp(-sin(x)) + sin(x) - 1)
assert sol == dsolve(eq, hint='lie_group')
assert checkodesol(eq, sol) == (True, 0)
eq = x*diff(f(x),x) + f(x) - x*sin(x)
sol = Eq(f(x), (C1 - x*cos(x) + sin(x))/x)
assert sol == dsolve(eq, hint='lie_group')
assert checkodesol(eq, sol) == (True, 0)
eq = x*diff(f(x),x) - f(x) - x/log(x)
sol = Eq(f(x), x*(C1 + log(log(x))))
assert sol == dsolve(eq, hint='lie_group')
assert checkodesol(eq, sol) == (True, 0)
eq = (f(x).diff(x)-f(x)) * (f(x).diff(x)+f(x))
sol = [Eq(f(x), C1*exp(x)), Eq(f(x), C1*exp(-x))]
assert set(sol) == set(dsolve(eq, hint='lie_group'))
assert checkodesol(eq, sol[0]) == (True, 0)
assert checkodesol(eq, sol[1]) == (True, 0)
eq = f(x).diff(x) * (f(x).diff(x) - f(x))
sol = [Eq(f(x), C1*exp(x)), Eq(f(x), C1)]
assert set(sol) == set(dsolve(eq, hint='lie_group'))
assert checkodesol(eq, sol[0]) == (True, 0)
assert checkodesol(eq, sol[1]) == (True, 0)
@XFAIL
def test_lie_group_issue15219():
eqn = exp(f(x).diff(x)-f(x))
assert 'lie_group' not in classify_ode(eqn, f(x))
def test_user_infinitesimals():
x = Symbol("x") # assuming x is real generates an error
eq = x*(f(x).diff(x)) + 1 - f(x)**2
sol = Eq(f(x), (C1 + x**2)/(C1 - x**2))
infinitesimals = {'xi':sqrt(f(x) - 1)/sqrt(f(x) + 1), 'eta':0}
assert dsolve(eq, hint='lie_group', **infinitesimals) == sol
assert checkodesol(eq, sol) == (True, 0)
def test_issue_7081():
eq = x*(f(x).diff(x)) + 1 - f(x)**2
s = Eq(f(x), -1/(-C1 + x**2)*(C1 + x**2))
assert dsolve(eq) == s
assert checkodesol(eq, s) == (True, 0)
@slow
def test_2nd_power_series_ordinary():
C1, C2 = symbols("C1 C2")
eq = f(x).diff(x, 2) - x*f(x)
assert classify_ode(eq) == ('2nd_linear_airy', '2nd_power_series_ordinary')
sol = Eq(f(x), C2*(x**3/6 + 1) + C1*x*(x**3/12 + 1) + O(x**6))
assert dsolve(eq, hint='2nd_power_series_ordinary') == sol
assert checkodesol(eq, sol) == (True, 0)
sol = Eq(f(x), C2*((x + 2)**4/6 + (x + 2)**3/6 - (x + 2)**2 + 1)
+ C1*(x + (x + 2)**4/12 - (x + 2)**3/3 + S(2))
+ O(x**6))
assert dsolve(eq, hint='2nd_power_series_ordinary', x0=-2) == sol
# FIXME: Solution should be O((x+2)**6)
# assert checkodesol(eq, sol) == (True, 0)
sol = Eq(f(x), C2*x + C1 + O(x**2))
assert dsolve(eq, hint='2nd_power_series_ordinary', n=2) == sol
assert checkodesol(eq, sol) == (True, 0)
eq = (1 + x**2)*(f(x).diff(x, 2)) + 2*x*(f(x).diff(x)) -2*f(x)
assert classify_ode(eq) == ('2nd_power_series_ordinary',)
sol = Eq(f(x), C2*(-x**4/3 + x**2 + 1) + C1*x + O(x**6))
assert dsolve(eq) == sol
assert checkodesol(eq, sol) == (True, 0)
eq = f(x).diff(x, 2) + x*(f(x).diff(x)) + f(x)
assert classify_ode(eq) == ('2nd_power_series_ordinary',)
sol = Eq(f(x), C2*(x**4/8 - x**2/2 + 1) + C1*x*(-x**2/3 + 1) + O(x**6))
assert dsolve(eq) == sol
# FIXME: checkodesol fails for this solution...
# assert checkodesol(eq, sol) == (True, 0)
eq = f(x).diff(x, 2) + f(x).diff(x) - x*f(x)
assert classify_ode(eq) == ('2nd_power_series_ordinary',)
sol = Eq(f(x), C2*(-x**4/24 + x**3/6 + 1)
+ C1*x*(x**3/24 + x**2/6 - x/2 + 1) + O(x**6))
assert dsolve(eq) == sol
# FIXME: checkodesol fails for this solution...
# assert checkodesol(eq, sol) == (True, 0)
eq = f(x).diff(x, 2) + x*f(x)
assert classify_ode(eq) == ('2nd_linear_airy', '2nd_power_series_ordinary')
sol = Eq(f(x), C2*(x**6/180 - x**3/6 + 1) + C1*x*(-x**3/12 + 1) + O(x**7))
assert dsolve(eq, hint='2nd_power_series_ordinary', n=7) == sol
assert checkodesol(eq, sol) == (True, 0)
def test_Airy_equation():
eq = f(x).diff(x, 2) - x*f(x)
sol = Eq(f(x), C1*airyai(x) + C2*airybi(x))
sols = constant_renumber(sol)
assert classify_ode(eq) == ("2nd_linear_airy",'2nd_power_series_ordinary')
assert checkodesol(eq, sol) == (True, 0)
assert dsolve(eq, f(x)) in (sol, sols)
assert dsolve(eq, f(x), hint='2nd_linear_airy') in (sol, sols)
eq = f(x).diff(x, 2) + 2*x*f(x)
sol = Eq(f(x), C1*airyai(-2**(S(1)/3)*x) + C2*airybi(-2**(S(1)/3)*x))
sols = constant_renumber(sol)
assert classify_ode(eq) == ("2nd_linear_airy",'2nd_power_series_ordinary')
assert checkodesol(eq, sol) == (True, 0)
assert dsolve(eq, f(x)) in (sol, sols)
assert dsolve(eq, f(x), hint='2nd_linear_airy') in (sol, sols)
def test_2nd_power_series_regular():
C1, C2 = symbols("C1 C2")
eq = x**2*(f(x).diff(x, 2)) - 3*x*(f(x).diff(x)) + (4*x + 4)*f(x)
sol = Eq(f(x), C1*x**2*(-16*x**3/9 + 4*x**2 - 4*x + 1) + O(x**6))
assert dsolve(eq, hint='2nd_power_series_regular') == sol
assert checkodesol(eq, sol) == (True, 0)
eq = 4*x**2*(f(x).diff(x, 2)) -8*x**2*(f(x).diff(x)) + (4*x**2 +
1)*f(x)
sol = Eq(f(x), C1*sqrt(x)*(x**4/24 + x**3/6 + x**2/2 + x + 1) + O(x**6))
assert dsolve(eq, hint='2nd_power_series_regular') == sol
assert checkodesol(eq, sol) == (True, 0)
eq = x**2*(f(x).diff(x, 2)) - x**2*(f(x).diff(x)) + (
x**2 - 2)*f(x)
sol = Eq(f(x), C1*(-x**6/720 - 3*x**5/80 - x**4/8 + x**2/2 + x/2 + 1)/x +
C2*x**2*(-x**3/60 + x**2/20 + x/2 + 1) + O(x**6))
assert dsolve(eq) == sol
assert checkodesol(eq, sol) == (True, 0)
eq = x**2*(f(x).diff(x, 2)) + x*(f(x).diff(x)) + (x**2 - Rational(1, 4))*f(x)
sol = Eq(f(x), C1*(x**4/24 - x**2/2 + 1)/sqrt(x) +
C2*sqrt(x)*(x**4/120 - x**2/6 + 1) + O(x**6))
assert dsolve(eq, hint='2nd_power_series_regular') == sol
assert checkodesol(eq, sol) == (True, 0)
def test_2nd_linear_bessel_equation():
eq = x**2*(f(x).diff(x, 2)) + x*(f(x).diff(x)) + (x**2 - 4)*f(x)
sol = Eq(f(x), C1*besselj(2, x) + C2*bessely(2, x))
sols = constant_renumber(sol)
assert dsolve(eq, f(x)) in (sol, sols)
assert dsolve(eq, f(x), hint='2nd_linear_bessel') in (sol, sols)
assert checkodesol(eq, sol, order=2, solve_for_func=False) == (True, 0)
eq = x**2*(f(x).diff(x, 2)) + x*(f(x).diff(x)) + (x**2 +25)*f(x)
sol = Eq(f(x), C1*besselj(5*I, x) + C2*bessely(5*I, x))
sols = constant_renumber(sol)
assert dsolve(eq, f(x)) in (sol, sols)
assert dsolve(eq, f(x), hint='2nd_linear_bessel') in (sol, sols)
checkodesol(eq, sol, order=2, solve_for_func=False) == (True, 0)
eq = x**2*(f(x).diff(x, 2)) + x*(f(x).diff(x)) + (x**2)*f(x)
sol = Eq(f(x), C1*besselj(0, x) + C2*bessely(0, x))
sols = constant_renumber(sol)
assert dsolve(eq, f(x)) in (sol, sols)
assert dsolve(eq, f(x), hint='2nd_linear_bessel') in (sol, sols)
assert checkodesol(eq, sol, order=2, solve_for_func=False) == (True, 0)
eq = x**2*(f(x).diff(x, 2)) + x*(f(x).diff(x)) + (81*x**2 -S(1)/9)*f(x)
sol = Eq(f(x), C1*besselj(S(1)/3, 9*x) + C2*bessely(S(1)/3, 9*x))
sols = constant_renumber(sol)
assert dsolve(eq, f(x)) in (sol, sols)
assert dsolve(eq, f(x), hint='2nd_linear_bessel') in (sol, sols)
checkodesol(eq, sol, order=2, solve_for_func=False) == (True, 0)
eq = x**2*(f(x).diff(x, 2)) + x*(f(x).diff(x)) + (x**4 - 4)*f(x)
sol = Eq(f(x), C1*besselj(1, x**2/2) + C2*bessely(1, x**2/2))
sols = constant_renumber(sol)
assert dsolve(eq, f(x)) in (sol, sols)
assert dsolve(eq, f(x), hint='2nd_linear_bessel') in (sol, sols)
assert checkodesol(eq, sol, order=2, solve_for_func=False) == (True, 0)
eq = x**2*(f(x).diff(x, 2)) + 2*x*(f(x).diff(x)) + (x**4 - 4)*f(x)
sol = Eq(f(x), (C1*besselj(sqrt(17)/4, x**2/2) + C2*bessely(sqrt(17)/4, x**2/2))/sqrt(x))
sols = constant_renumber(sol)
assert dsolve(eq, f(x)) in (sol, sols)
assert dsolve(eq, f(x), hint='2nd_linear_bessel') in (sol, sols)
assert checkodesol(eq, sol, order=2, solve_for_func=False) == (True, 0)
eq = x**2*(f(x).diff(x, 2)) + x*(f(x).diff(x)) + (x**2 - S(1)/4)*f(x)
sol = Eq(f(x), C1*besselj(S(1)/2, x) + C2*bessely(S(1)/2, x))
sols = constant_renumber(sol)
assert dsolve(eq, f(x)) in (sol, sols)
assert dsolve(eq, f(x), hint='2nd_linear_bessel') in (sol, sols)
assert checkodesol(eq, sol, order=2, solve_for_func=False) == (True, 0)
eq = x**2*(f(x).diff(x, 2)) - 3*x*(f(x).diff(x)) + (4*x + 4)*f(x)
sol = Eq(f(x), x**2*(C1*besselj(0, 4*sqrt(x)) + C2*bessely(0, 4*sqrt(x))))
sols = constant_renumber(sol)
assert dsolve(eq, f(x)) in (sol, sols)
assert dsolve(eq, f(x), hint='2nd_linear_bessel') in (sol, sols)
assert checkodesol(eq, sol, order=2, solve_for_func=False) == (True, 0)
eq = x*(f(x).diff(x, 2)) - f(x).diff(x) + 4*x**3*f(x)
sol = Eq(f(x), x*(C1*besselj(S(1)/2, x**2) + C2*bessely(S(1)/2, x**2)))
sols = constant_renumber(sol)
assert dsolve(eq, f(x)) in (sol, sols)
assert dsolve(eq, f(x), hint='2nd_linear_bessel') in (sol, sols)
assert checkodesol(eq, sol, order=2, solve_for_func=False) == (True, 0)
eq = (x-2)**2*(f(x).diff(x, 2)) - (x-2)*f(x).diff(x) + 4*(x-2)**2*f(x)
sol = Eq(f(x), (x - 2)*(C1*besselj(1, 2*x - 4) + C2*bessely(1, 2*x - 4)))
sols = constant_renumber(sol)
assert dsolve(eq, f(x)) in (sol, sols)
assert dsolve(eq, f(x), hint='2nd_linear_bessel') in (sol, sols)
assert checkodesol(eq, sol, order=2, solve_for_func=False) == (True, 0)
def test_issue_7093():
x = Symbol("x") # assuming x is real leads to an error
sol = [Eq(f(x), C1 - 2*x*sqrt(x**3)/5),
Eq(f(x), C1 + 2*x*sqrt(x**3)/5)]
eq = Derivative(f(x), x)**2 - x**3
assert set(dsolve(eq)) == set(sol)
assert checkodesol(eq, sol) == [(True, 0)] * 2
def test_dsolve_linsystem_symbol():
eps = Symbol('epsilon', positive=True)
eq1 = (Eq(diff(f(x), x), -eps*g(x)), Eq(diff(g(x), x), eps*f(x)))
sol1 = [Eq(f(x), -C1*eps*cos(eps*x) - C2*eps*sin(eps*x)),
Eq(g(x), -C1*eps*sin(eps*x) + C2*eps*cos(eps*x))]
assert checksysodesol(eq1, sol1) == (True, [0, 0])
def test_C1_function_9239():
t = Symbol('t')
C1 = Function('C1')
C2 = Function('C2')
C3 = Symbol('C3')
C4 = Symbol('C4')
eq = (Eq(diff(C1(t), t), 9*C2(t)), Eq(diff(C2(t), t), 12*C1(t)))
sol = [Eq(C1(t), 9*C3*exp(6*sqrt(3)*t) + 9*C4*exp(-6*sqrt(3)*t)),
Eq(C2(t), 6*sqrt(3)*C3*exp(6*sqrt(3)*t) - 6*sqrt(3)*C4*exp(-6*sqrt(3)*t))]
assert checksysodesol(eq, sol) == (True, [0, 0])
def test_issue_15056():
t = Symbol('t')
C3 = Symbol('C3')
assert get_numbered_constants(Symbol('C1') * Function('C2')(t)) == C3
def test_issue_10379():
t,y = symbols('t,y')
eq = f(t).diff(t)-(1-51.05*y*f(t))
sol = Eq(f(t), (0.019588638589618*exp(y*(C1 - 51.05*t)) + 0.019588638589618)/y)
dsolve_sol = dsolve(eq, rational=False)
assert str(dsolve_sol) == str(sol)
assert checkodesol(eq, dsolve_sol)[0]
def test_issue_10867():
x = Symbol('x')
eq = Eq(g(x).diff(x).diff(x), (x-2)**2 + (x-3)**3)
sol = Eq(g(x), C1 + C2*x + x**5/20 - 2*x**4/3 + 23*x**3/6 - 23*x**2/2)
assert dsolve(eq, g(x)) == sol
assert checkodesol(eq, sol, order=2, solve_for_func=False) == (True, 0)
def test_issue_11290():
eq = cos(f(x)) - (x*sin(f(x)) - f(x)**2)*f(x).diff(x)
sol_1 = dsolve(eq, f(x), simplify=False, hint='1st_exact_Integral')
sol_0 = dsolve(eq, f(x), simplify=False, hint='1st_exact')
assert sol_1.dummy_eq(Eq(Subs(
Integral(u**2 - x*sin(u) - Integral(-sin(u), x), u) +
Integral(cos(u), x), u, f(x)), C1))
assert sol_1.doit() == sol_0
assert checkodesol(eq, sol_0, order=1, solve_for_func=False)
assert checkodesol(eq, sol_1, order=1, solve_for_func=False)
def test_issue_4838():
# Issue #15999
eq = f(x).diff(x) - C1*f(x)
sol = Eq(f(x), C2*exp(C1*x))
assert dsolve(eq, f(x)) == sol
assert checkodesol(eq, sol, order=1, solve_for_func=False) == (True, 0)
# Issue #13691
eq = f(x).diff(x) - C1*g(x).diff(x)
sol = Eq(f(x), C2 + C1*g(x))
assert dsolve(eq, f(x)) == sol
assert checkodesol(eq, sol, f(x), order=1, solve_for_func=False) == (True, 0)
# Issue #4838
eq = f(x).diff(x) - 3*C1 - 3*x**2
sol = Eq(f(x), C2 + 3*C1*x + x**3)
assert dsolve(eq, f(x)) == sol
assert checkodesol(eq, sol, order=1, solve_for_func=False) == (True, 0)
@slow
def test_issue_14395():
eq = Derivative(f(x), x, x) + 9*f(x) - sec(x)
sol = Eq(f(x), (C1 - x/3 + sin(2*x)/3)*sin(3*x) + (C2 + log(cos(x))
- 2*log(cos(x)**2)/3 + 2*cos(x)**2/3)*cos(3*x))
assert dsolve(eq, f(x)) == sol
# FIXME: assert checkodesol(eq, sol, order=2, solve_for_func=False) == (True, 0)
# Needs to be a way to know how to combine derivatives in the expression
def test_factoring_ode():
from sympy import Mul
eqn = Derivative(x*f(x), x, x, x) + Derivative(f(x), x, x, x)
# 2-arg Mul!
soln = Eq(f(x), C1 + C2*x + C3/Mul(2, (x + 1), evaluate=False))
assert checkodesol(eqn, soln, order=2, solve_for_func=False)[0]
assert soln == dsolve(eqn, f(x))
def test_issue_11542():
m = 96
g = 9.8
k = .2
f1 = g * m
t = Symbol('t')
v = Function('v')
v_equation = dsolve(f1 - k * (v(t) ** 2) - m * Derivative(v(t)), 0)
assert str(v_equation) == \
'Eq(v(t), -68.585712797929/tanh(C1 - 0.142886901662352*t))'
def test_issue_15913():
eq = -C1/x - 2*x*f(x) - f(x) + Derivative(f(x), x)
sol = C2*exp(x**2 + x) + exp(x**2 + x)*Integral(C1*exp(-x**2 - x)/x, x)
assert checkodesol(eq, sol) == (True, 0)
sol = C1 + C2*exp(-x*y)
eq = Derivative(y*f(x), x) + f(x).diff(x, 2)
assert checkodesol(eq, sol, f(x)) == (True, 0)
def test_issue_16146():
raises(ValueError, lambda: dsolve([f(x).diff(x), g(x).diff(x)], [f(x), g(x), h(x)]))
raises(ValueError, lambda: dsolve([f(x).diff(x), g(x).diff(x)], [f(x)]))
def test_dsolve_remove_redundant_solutions():
eq = (f(x)-2)*f(x).diff(x)
sol = Eq(f(x), C1)
assert dsolve(eq) == sol
eq = (f(x)-sin(x))*(f(x).diff(x, 2))
sol = {Eq(f(x), C1 + C2*x), Eq(f(x), sin(x))}
assert set(dsolve(eq)) == sol
eq = (f(x)**2-2*f(x)+1)*f(x).diff(x, 3)
sol = Eq(f(x), C1 + C2*x + C3*x**2)
assert dsolve(eq) == sol
def test_issue_17322():
eq = (f(x).diff(x)-f(x)) * (f(x).diff(x)+f(x))
sol = [Eq(f(x), C1*exp(-x)), Eq(f(x), C1*exp(x))]
assert set(sol) == set(dsolve(eq, hint='lie_group'))
assert checkodesol(eq, sol) == 2*[(True, 0)]
eq = f(x).diff(x)*(f(x).diff(x)+f(x))
sol = [Eq(f(x), C1), Eq(f(x), C1*exp(-x))]
assert set(sol) == set(dsolve(eq, hint='lie_group'))
assert checkodesol(eq, sol) == 2*[(True, 0)]
def test_2nd_2F1_hypergeometric():
eq = x*(x-1)*f(x).diff(x, 2) + (S(3)/2 -2*x)*f(x).diff(x) + 2*f(x)
sol = Eq(f(x), C1*x**(S(5)/2)*hyper((S(3)/2, S(1)/2), (S(7)/2,), x) + C2*hyper((-1, -2), (-S(3)/2,), x))
assert sol == dsolve(eq, hint='2nd_hypergeometric')
assert checkodesol(eq, sol) == (True, 0)
eq = x*(x-1)*f(x).diff(x, 2) + (S(7)/2*x)*f(x).diff(x) + f(x)
sol = Eq(f(x), (C1*(1 - x)**(S(5)/2)*hyper((S(1)/2, 2), (S(7)/2,), 1 - x) +
C2*hyper((-S(1)/2, -2), (-S(3)/2,), 1 - x))/(x - 1)**(S(5)/2))
assert sol == dsolve(eq, hint='2nd_hypergeometric')
assert checkodesol(eq, sol) == (True, 0)
eq = x*(x-1)*f(x).diff(x, 2) + (S(3)+ S(7)/2*x)*f(x).diff(x) + f(x)
sol = Eq(f(x), (C1*(1 - x)**(S(11)/2)*hyper((S(1)/2, 2), (S(13)/2,), 1 - x) +
C2*hyper((-S(7)/2, -5), (-S(9)/2,), 1 - x))/(x - 1)**(S(11)/2))
assert sol == dsolve(eq, hint='2nd_hypergeometric')
assert checkodesol(eq, sol) == (True, 0)
eq = x*(x-1)*f(x).diff(x, 2) + (-1+ S(7)/2*x)*f(x).diff(x) + f(x)
sol = Eq(f(x), (C1 + C2*Integral(exp(Integral((1 - x/2)/(x*(x - 1)), x))/(1 -
x/2)**2, x))*exp(Integral(1/(x - 1), x)/4)*exp(-Integral(7/(x -
1), x)/4)*hyper((S(1)/2, -1), (1,), x))
assert sol == dsolve(eq, hint='2nd_hypergeometric_Integral')
assert checkodesol(eq, sol) == (True, 0)
eq = -x**(S(5)/7)*(-416*x**(S(9)/7)/9 - 2385*x**(S(5)/7)/49 + S(298)*x/3)*f(x)/(196*(-x**(S(6)/7) +
x)**2*(x**(S(6)/7) + x)**2) + Derivative(f(x), (x, 2))
sol = Eq(f(x), x**(S(45)/98)*(C1*x**(S(4)/49)*hyper((S(1)/3, -S(1)/2), (S(9)/7,), x**(S(2)/7)) +
C2*hyper((S(1)/21, -S(11)/14), (S(5)/7,), x**(S(2)/7)))/(x**(S(2)/7) - 1)**(S(19)/84))
assert sol == dsolve(eq, hint='2nd_hypergeometric')
# assert checkodesol(eq, sol) == (True, 0) #issue-https://github.com/sympy/sympy/issues/17702
def test_issue_5096():
eq = f(x).diff(x, x) + f(x) - x*sin(x - 2)
sol = Eq(f(x), C1*sin(x) + C2*cos(x) - x**2*cos(x - 2)/4 + x*sin(x - 2)/4)
assert sol == dsolve(eq, hint='nth_linear_constant_coeff_undetermined_coefficients')
assert checkodesol(eq, sol) == (True, 0)
eq = f(x).diff(x, 2) + f(x) - x**4*sin(x-1)
sol = Eq(f(x), C1*sin(x) + C2*cos(x) - x**5*cos(x - 1)/10 + x**4*sin(x - 1)/4 + x**3*cos(x - 1)/2 - 3*x**2*sin(x - 1)/4 - 3*x*cos(x - 1)/4)
assert sol == dsolve(eq, hint='nth_linear_constant_coeff_undetermined_coefficients')
assert checkodesol(eq, sol) == (True, 0)
eq = f(x).diff(x, 2) - f(x) - exp(x - 1)
sol = Eq(f(x), C2*exp(-x) + (C1 + x*exp(-1)/2)*exp(x))
got = dsolve(eq, hint='nth_linear_constant_coeff_undetermined_coefficients')
assert sol == got, got
assert checkodesol(eq, sol) == (True, 0)
eq = f(x).diff(x, 2)+f(x)-(sin(x-2)+1)
sol = Eq(f(x), C1*sin(x) + C2*cos(x) - x*cos(x - 2)/2 + 1)
assert sol == dsolve(eq, hint='nth_linear_constant_coeff_undetermined_coefficients')
assert checkodesol(eq, sol) == (True, 0)
eq = 2*x**2*f(x).diff(x, 2) + f(x) + sqrt(2*x)*sin(log(2*x)/2)
sol = Eq(f(x), sqrt(x)*(C1*sin(log(x)/2) + C2*cos(log(x)/2) + sqrt(2)*log(x)*cos(log(2*x)/2)/2))
assert sol == dsolve(eq, hint='nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients')
assert checkodesol(eq, sol) == (True, 0)
eq = 2*x**2*f(x).diff(x, 2) + f(x) + sin(log(2*x)/2)
sol = Eq(f(x), C1*sqrt(x)*sin(log(x)/2) + C2*sqrt(x)*cos(log(x)/2) - 2*sin(log(2*x)/2)/5 - 4*cos(log(2*x)/2)/5)
assert sol == dsolve(eq, hint='nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients')
assert checkodesol(eq, sol) == (True, 0)
def test_issue_15996():
eq = f(x).diff(x, 5) + 2*f(x).diff(x, 3) + f(x).diff(x) - 2*x - exp(I*x)
sol = Eq(f(x), C1 + x**2 + (C2 + x*(C3 - x/8 + 3*exp(I*x)/2 + 3*exp(-I*x)/2) + 5*exp(2*I*x)/16 + 2*I*exp(I*x) - 2*I*exp(-I*x))*sin(x) + (C4 + x*(C5 + I*x/8 + 3*I*exp(I*x)/2 - 3*I*exp(-I*x)/2) + 5*I*exp(2*I*x)/16 - 2*exp(I*x) - 2*exp(-I*x))*cos(x) - I*exp(I*x))
got = dsolve(eq, hint='nth_linear_constant_coeff_variation_of_parameters')
assert sol == got, got
assert checkodesol(eq, sol) == (True, 0)
eq = f(x).diff(x, 5) + 2*f(x).diff(x, 3) + f(x).diff(x) - exp(I*x)
sol = Eq(f(x), C1 + (C2 + x*(C3 - x/8) + 5*exp(2*I*x)/16)*sin(x) + (C4 + x*(C5 + I*x/8) + 5*I*exp(2*I*x)/16)*cos(x) - I*exp(I*x))
got = dsolve(eq, hint='nth_linear_constant_coeff_variation_of_parameters')
assert sol == got, got
assert checkodesol(eq, sol) == (True, 0)
def test_issue_18408():
eq = f(x).diff(x, 3) - f(x).diff(x) - sinh(x)
sol = Eq(f(x), C1 + C2*exp(-x) + C3*exp(x) + x*sinh(x)/2)
assert sol == dsolve(eq, hint='nth_linear_constant_coeff_undetermined_coefficients')
assert checkodesol(eq, sol) == (True, 0)
eq = f(x).diff(x, 2) - 49*f(x) - sinh(3*x)
sol = Eq(f(x), C1*exp(-7*x) + C2*exp(7*x) - sinh(3*x)/40)
assert sol == dsolve(eq, hint='nth_linear_constant_coeff_undetermined_coefficients')
assert checkodesol(eq, sol) == (True, 0)
eq = f(x).diff(x, 3) - f(x).diff(x) - sinh(x) - exp(x)
sol = Eq(f(x), C1 + C3*exp(-x) + x*sinh(x)/2 + (C2 + x/2)*exp(x))
assert sol == dsolve(eq, hint='nth_linear_constant_coeff_undetermined_coefficients')
assert checkodesol(eq, sol) == (True, 0)
def test_issue_9446():
f = Function('f')
assert dsolve(Eq(f(2 * x), sin(Derivative(f(x)))), f(x)) == \
[Eq(f(x), C1 + pi*x - Integral(asin(f(2*x)), x)), Eq(f(x), C1 + Integral(asin(f(2*x)), x))]
assert integrate(-asin(f(2*x)+pi), x) == -Integral(asin(pi + f(2*x)), x)
|
7abcb3a95b22177ba97d0406c031935a3ae3c26f832247f17d9d077331f0d9f0
|
#
# The main tests for the code in single.py are currently located in
# sympy/solvers/tests/test_ode.py
#
r"""
This File contains test functions for the individual hints used for solving ODEs.
Examples of each solver will be returned by _get_examples_ode_sol_name_of_solver.
Examples should have a key 'XFAIL' which stores the list of hints if they are
expected to fail for that hint.
Functions that are for internal use:
1) _ode_solver_test(ode_examples) - It takes dictionary of examples returned by
_get_examples method and tests them with their respective hints.
2) _test_particular_example(our_hint, example_name) - It tests the ODE example corresponding
to the hint provided.
3) _test_all_hints(runxfail=False) - It is used to test all the examples with all the hints
currently implemented. It calls _test_all_examples_for_one_hint() which outputs whether the
given hint functions properly if it classifies the ODE example.
If runxfail flag is set to True then it will only test the examples which are expected to fail.
Everytime the ODE of partiular solver are added then _test_all_hints() is to execuetd to find
the possible failures of different solver hints.
4) _test_all_examples_for_one_hint(our_hint, all_examples) - It takes hint as argument and checks
this hint against all the ODE examples and gives output as the number of ODEs matched, number
of ODEs which were solved correctly, list of ODEs which gives incorrect solution and list of
ODEs which raises exception.
"""
from sympy import (acos, asin, atan, cos, Derivative, Dummy, diff,
E, Eq, exp, I, log, pi, Piecewise, Rational, S, sin, sinh, tan,
sqrt, symbols, Ei, erfi)
from sympy.core import Function, Symbol
from sympy.functions import airyai, airybi, besselj, bessely
from sympy.integrals.risch import NonElementaryIntegral
from sympy.solvers.ode import classify_ode, dsolve
from sympy.solvers.ode.ode import allhints, _remove_redundant_solutions
from sympy.solvers.ode.single import (FirstLinear, ODEMatchError,
SingleODEProblem, SingleODESolver)
from sympy.solvers.ode.subscheck import checkodesol
from sympy.testing.pytest import raises, slow
import traceback
x = Symbol('x')
u = Symbol('u')
y = Symbol('y')
f = Function('f')
g = Function('g')
C1, C2, C3, C4, C5 = symbols('C1:6')
hint_message = """\
Hint did not match the example {example}.
The ODE is:
{eq}.
The expected hint was
{our_hint}\
"""
expected_sol_message = """\
Different solution found from dsolve for example {example}.
The ODE is:
{eq}
The expected solution was
{sol}
What dsolve returned is:
{dsolve_sol}\
"""
checkodesol_msg = """\
solution found is not correct for example {example}.
The ODE is:
{eq}\
"""
dsol_incorrect_msg = """\
solution returned by dsolve is incorrect when using {hint}.
The ODE is:
{eq}
The expected solution was
{sol}
what dsolve returned is:
{dsolve_sol}
You can test this with:
eq = {eq}
sol = dsolve(eq, hint='{hint}')
print(sol)
print(checkodesol(eq, sol))
"""
exception_msg = """\
dsolve raised exception : {e}
when using {hint} for the example {example}
You can test this with:
from sympy.solvers.ode.tests.test_single import _test_an_example
_test_an_example('{hint}', example_name = '{example}')
The ODE is:
{eq}
\
"""
check_hint_msg = """\
Tested hint was : {hint}
Total of {matched} examples matched with this hint.
Out of which {solve} gave correct results.
Examples which gave incorrect results are {unsolve}.
Examples which raised exceptions are {exceptions}
\
"""
def _ode_solver_test(ode_examples, run_slow_test=False):
our_hint = ode_examples['hint']
for example in ode_examples['examples']:
temp = {
'eq': ode_examples['examples'][example]['eq'],
'sol': ode_examples['examples'][example]['sol'],
'XFAIL': ode_examples['examples'][example].get('XFAIL', []),
'func': ode_examples['examples'][example].get('func',ode_examples['func']),
'example_name': example,
'slow': ode_examples['examples'][example].get('slow', False),
'checkodesol_XFAIL': ode_examples['examples'][example].get('checkodesol_XFAIL', False)
}
if (not run_slow_test) and temp['slow']:
continue
result = _test_particular_example(our_hint, temp, solver_flag=True)
if result['xpass_msg'] != "":
print(result['xpass_msg'])
def _test_all_hints(runxfail=False):
all_hints = list(allhints)+["default"]
all_examples = _get_all_examples()
for our_hint in all_hints:
if our_hint.endswith('_Integral') or 'series' in our_hint:
continue
_test_all_examples_for_one_hint(our_hint, all_examples, runxfail)
def _test_dummy_sol(expected_sol,dsolve_sol):
if type(dsolve_sol)==list:
return any(expected_sol.dummy_eq(sub_dsol) for sub_dsol in dsolve_sol)
else:
return expected_sol.dummy_eq(dsolve_sol)
def _test_an_example(our_hint, example_name):
all_examples = _get_all_examples()
for example in all_examples:
if example['example_name'] == example_name:
_test_particular_example(our_hint, example)
def _test_particular_example(our_hint, ode_example, solver_flag=False):
eq = ode_example['eq']
expected_sol = ode_example['sol']
example = ode_example['example_name']
xfail = our_hint in ode_example['XFAIL']
func = ode_example['func']
result = {'msg': '', 'xpass_msg': ''}
checkodesol_XFAIL = ode_example['checkodesol_XFAIL']
xpass = True
if solver_flag:
if our_hint not in classify_ode(eq, func):
message = hint_message.format(example=example, eq=eq, our_hint=our_hint)
raise AssertionError(message)
if our_hint in classify_ode(eq, func):
result['match_list'] = example
try:
dsolve_sol = dsolve(eq, func, hint=our_hint)
except Exception as e:
dsolve_sol = []
result['exception_list'] = example
if not solver_flag:
traceback.print_exc()
result['msg'] = exception_msg.format(e=str(e), hint=our_hint, example=example, eq=eq)
xpass = False
if solver_flag and dsolve_sol!=[]:
expect_sol_check = False
if type(dsolve_sol)==list:
for sub_sol in expected_sol:
if sub_sol.has(Dummy):
expect_sol_check = not _test_dummy_sol(sub_sol, dsolve_sol)
else:
expect_sol_check = sub_sol not in dsolve_sol
if expect_sol_check:
break
else:
expect_sol_check = dsolve_sol not in expected_sol
for sub_sol in expected_sol:
if sub_sol.has(Dummy):
expect_sol_check = not _test_dummy_sol(sub_sol, dsolve_sol)
if expect_sol_check:
message = expected_sol_message.format(example=example, eq=eq, sol=expected_sol, dsolve_sol=dsolve_sol)
raise AssertionError(message)
expected_checkodesol = [(True, 0) for i in range(len(expected_sol))]
if len(expected_sol) == 1:
expected_checkodesol = (True, 0)
if not checkodesol_XFAIL:
if checkodesol(eq, dsolve_sol, solve_for_func=False) != expected_checkodesol:
result['unsolve_list'] = example
xpass = False
message = dsol_incorrect_msg.format(hint=our_hint, eq=eq, sol=expected_sol,dsolve_sol=dsolve_sol)
if solver_flag:
message = checkodesol_msg.format(example=example, eq=eq)
raise AssertionError(message)
else:
result['msg'] = 'AssertionError: ' + message
if xpass and xfail:
result['xpass_msg'] = example + "is now passing for the hint" + our_hint
return result
def _test_all_examples_for_one_hint(our_hint, all_examples=[], runxfail=None):
if all_examples == []:
all_examples = _get_all_examples()
match_list, unsolve_list, exception_list = [], [], []
for ode_example in all_examples:
xfail = our_hint in ode_example['XFAIL']
if runxfail and not xfail:
continue
if xfail:
continue
result = _test_particular_example(our_hint, ode_example)
match_list += result.get('match_list',[])
unsolve_list += result.get('unsolve_list',[])
exception_list += result.get('exception_list',[])
if runxfail is not None:
msg = result['msg']
if msg!='':
print(result['msg'])
# print(result.get('xpass_msg',''))
if runxfail is None:
match_count = len(match_list)
solved = len(match_list)-len(unsolve_list)-len(exception_list)
msg = check_hint_msg.format(hint=our_hint, matched=match_count, solve=solved, unsolve=unsolve_list, exceptions=exception_list)
print(msg)
def test_SingleODESolver():
# Test that not implemented methods give NotImplementedError
# Subclasses should override these methods.
problem = SingleODEProblem(f(x).diff(x), f(x), x)
solver = SingleODESolver(problem)
raises(NotImplementedError, lambda: solver.matches())
raises(NotImplementedError, lambda: solver.get_general_solution())
raises(NotImplementedError, lambda: solver._matches())
raises(NotImplementedError, lambda: solver._get_general_solution())
# This ODE can not be solved by the FirstLinear solver. Here we test that
# it does not match and the asking for a general solution gives
# ODEMatchError
problem = SingleODEProblem(f(x).diff(x) + f(x)*f(x), f(x), x)
solver = FirstLinear(problem)
raises(ODEMatchError, lambda: solver.get_general_solution())
solver = FirstLinear(problem)
assert solver.matches() is False
#These are just test for order of ODE
problem = SingleODEProblem(f(x).diff(x) + f(x), f(x), x)
assert problem.order == 1
problem = SingleODEProblem(f(x).diff(x,4) + f(x).diff(x,2) - f(x).diff(x,3), f(x), x)
assert problem.order == 4
def test_nth_algebraic():
eqn = f(x) + f(x)*f(x).diff(x)
solns = [Eq(f(x), exp(x)),
Eq(f(x), C1*exp(C2*x))]
solns_final = _remove_redundant_solutions(eqn, solns, 2, x)
assert solns_final == [Eq(f(x), C1*exp(C2*x))]
_ode_solver_test(_get_examples_ode_sol_nth_algebraic())
@slow
def test_slow_examples_nth_order_reducible():
_ode_solver_test(_get_examples_ode_sol_nth_order_reducible(), run_slow_test=True)
@slow
def test_slow_examples_nth_linear_constant_coeff_undetermined_coefficients():
_ode_solver_test(_get_examples_ode_sol_nth_linear_undetermined_coefficients(), run_slow_test=True)
@slow
def test_slow_examples_separable():
_ode_solver_test(_get_examples_ode_sol_separable(), run_slow_test=True)
def test_nth_linear_constant_coeff_undetermined_coefficients():
_ode_solver_test(_get_examples_ode_sol_nth_linear_undetermined_coefficients())
def test_nth_order_reducible():
from sympy.solvers.ode.ode import _nth_order_reducible_match
F = lambda eq: _nth_order_reducible_match(eq, f(x))
D = Derivative
assert F(D(y*f(x), x, y) + D(f(x), x)) is None
assert F(D(y*f(y), y, y) + D(f(y), y)) is None
assert F(f(x)*D(f(x), x) + D(f(x), x, 2)) is None
assert F(D(x*f(y), y, 2) + D(u*y*f(x), x, 3)) is None # no simplification by design
assert F(D(f(y), y, 2) + D(f(y), y, 3) + D(f(x), x, 4)) is None
assert F(D(f(x), x, 2) + D(f(x), x, 3)) == dict(n=2)
_ode_solver_test(_get_examples_ode_sol_nth_order_reducible())
def test_separable():
_ode_solver_test(_get_examples_ode_sol_separable())
def test_factorable():
_ode_solver_test(_get_examples_ode_sol_factorable())
def test_Riccati_special_minus2():
_ode_solver_test(_get_examples_ode_sol_riccati())
def test_Bernoulli():
_ode_solver_test(_get_examples_ode_sol_bernoulli())
def test_1st_linear():
_ode_solver_test(_get_examples_ode_sol_1st_linear())
def test_almost_linear():
_ode_solver_test(_get_examples_ode_sol_almost_linear())
def test_Liouville_ODE():
hint = 'Liouville'
not_Liouville1 = classify_ode(diff(f(x), x)/x + f(x)*diff(f(x), x, x)/2 -
diff(f(x), x)**2/2, f(x))
not_Liouville2 = classify_ode(diff(f(x), x)/x + diff(f(x), x, x)/2 -
x*diff(f(x), x)**2/2, f(x))
assert hint not in not_Liouville1
assert hint not in not_Liouville2
assert hint + '_Integral' not in not_Liouville1
assert hint + '_Integral' not in not_Liouville2
_ode_solver_test(_get_examples_ode_sol_liouville())
def test_nth_order_linear_euler_eq_homogeneous():
x, t, a, b, c = symbols('x t a b c')
y = Function('y')
our_hint = "nth_linear_euler_eq_homogeneous"
eq = diff(f(t), t, 4)*t**4 - 13*diff(f(t), t, 2)*t**2 + 36*f(t)
assert our_hint in classify_ode(eq)
eq = a*y(t) + b*t*diff(y(t), t) + c*t**2*diff(y(t), t, 2)
assert our_hint in classify_ode(eq)
_ode_solver_test(_get_examples_ode_sol_euler_homogeneous())
def test_nth_order_linear_euler_eq_nonhomogeneous_undetermined_coefficients():
x, t = symbols('x t')
a, b, c, d = symbols('a b c d', integer=True)
our_hint = "nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients"
eq = x**4*diff(f(x), x, 4) - 13*x**2*diff(f(x), x, 2) + 36*f(x) + x
assert our_hint in classify_ode(eq, f(x))
eq = a*x**2*diff(f(x), x, 2) + b*x*diff(f(x), x) + c*f(x) + d*log(x)
assert our_hint in classify_ode(eq, f(x))
_ode_solver_test(_get_examples_ode_sol_euler_undetermined_coeff())
def test_nth_order_linear_euler_eq_nonhomogeneous_variation_of_parameters():
x, t = symbols('x, t')
a, b, c, d = symbols('a, b, c, d', integer=True)
our_hint = "nth_linear_euler_eq_nonhomogeneous_variation_of_parameters"
eq = Eq(x**2*diff(f(x),x,2) - 8*x*diff(f(x),x) + 12*f(x), x**2)
assert our_hint in classify_ode(eq, f(x))
eq = Eq(a*x**3*diff(f(x),x,3) + b*x**2*diff(f(x),x,2) + c*x*diff(f(x),x) + d*f(x), x*log(x))
assert our_hint in classify_ode(eq, f(x))
_ode_solver_test(_get_examples_ode_sol_euler_var_para())
def _get_examples_ode_sol_euler_homogeneous():
return {
'hint': "nth_linear_euler_eq_homogeneous",
'func': f(x),
'examples':{
'euler_hom_01': {
'eq': Eq(-3*diff(f(x), x)*x + 2*x**2*diff(f(x), x, x), 0),
'sol': [Eq(f(x), C1 + C2*x**Rational(5, 2))],
},
'euler_hom_02': {
'eq': Eq(3*f(x) - 5*diff(f(x), x)*x + 2*x**2*diff(f(x), x, x), 0),
'sol': [Eq(f(x), C1*sqrt(x) + C2*x**3)]
},
'euler_hom_03': {
'eq': Eq(4*f(x) + 5*diff(f(x), x)*x + x**2*diff(f(x), x, x), 0),
'sol': [Eq(f(x), (C1 + C2*log(x))/x**2)]
},
'euler_hom_04': {
'eq': Eq(6*f(x) - 6*diff(f(x), x)*x + 1*x**2*diff(f(x), x, x) + x**3*diff(f(x), x, x, x), 0),
'sol': [Eq(f(x), C1/x**2 + C2*x + C3*x**3)]
},
'euler_hom_05': {
'eq': Eq(-125*f(x) + 61*diff(f(x), x)*x - 12*x**2*diff(f(x), x, x) + x**3*diff(f(x), x, x, x), 0),
'sol': [Eq(f(x), x**5*(C1 + C2*log(x) + C3*log(x)**2))]
},
'euler_hom_06': {
'eq': x**2*diff(f(x), x, 2) + x*diff(f(x), x) - 9*f(x),
'sol': [Eq(f(x), C1*x**-3 + C2*x**3)]
},
'euler_hom_07': {
'eq': sin(x)*x**2*f(x).diff(x, 2) + sin(x)*x*f(x).diff(x) + sin(x)*f(x),
'sol': [Eq(f(x), C1*sin(log(x)) + C2*cos(log(x)))],
'XFAIL': ['2nd_power_series_regular','nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients']
},
}
}
def _get_examples_ode_sol_euler_undetermined_coeff():
return {
'hint': "nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients",
'func': f(x),
'examples':{
'euler_undet_01': {
'eq': Eq(x**2*diff(f(x), x, x) + x*diff(f(x), x), 1),
'sol': [Eq(f(x), C1 + C2*log(x) + log(x)**2/2)]
},
'euler_undet_02': {
'eq': Eq(x**2*diff(f(x), x, x) - 2*x*diff(f(x), x) + 2*f(x), x**3),
'sol': [Eq(f(x), x*(C1 + C2*x + Rational(1, 2)*x**2))]
},
'euler_undet_03': {
'eq': Eq(x**2*diff(f(x), x, x) - x*diff(f(x), x) - 3*f(x), log(x)/x),
'sol': [Eq(f(x), (C1 + C2*x**4 - log(x)**2/8 - log(x)/16)/x)]
},
'euler_undet_04': {
'eq': Eq(x**2*diff(f(x), x, x) + 3*x*diff(f(x), x) - 8*f(x), log(x)**3 - log(x)),
'sol': [Eq(f(x), C1/x**4 + C2*x**2 - Rational(1,8)*log(x)**3 - Rational(3,32)*log(x)**2 - Rational(1,64)*log(x) - Rational(7, 256))]
},
'euler_undet_05': {
'eq': Eq(x**3*diff(f(x), x, x, x) - 3*x**2*diff(f(x), x, x) + 6*x*diff(f(x), x) - 6*f(x), log(x)),
'sol': [Eq(f(x), C1*x + C2*x**2 + C3*x**3 - Rational(1, 6)*log(x) - Rational(11, 36))]
},
}
}
def _get_examples_ode_sol_euler_var_para():
return {
'hint': "nth_linear_euler_eq_nonhomogeneous_variation_of_parameters",
'func': f(x),
'examples':{
'euler_var_01': {
'eq': Eq(x**2*Derivative(f(x), x, x) - 2*x*Derivative(f(x), x) + 2*f(x), x**4),
'sol': [Eq(f(x), x*(C1 + C2*x + x**3/6))]
},
'euler_var_02': {
'eq': Eq(3*x**2*diff(f(x), x, x) + 6*x*diff(f(x), x) - 6*f(x), x**3*exp(x)),
'sol': [Eq(f(x), C1/x**2 + C2*x + x*exp(x)/3 - 4*exp(x)/3 + 8*exp(x)/(3*x) - 8*exp(x)/(3*x**2))]
},
'euler_var_03': {
'eq': Eq(x**2*Derivative(f(x), x, x) - 2*x*Derivative(f(x), x) + 2*f(x), x**4*exp(x)),
'sol': [Eq(f(x), x*(C1 + C2*x + x*exp(x) - 2*exp(x)))]
},
'euler_var_04': {
'eq': x**2*Derivative(f(x), x, x) - 2*x*Derivative(f(x), x) + 2*f(x) - log(x),
'sol': [Eq(f(x), C1*x + C2*x**2 + log(x)/2 + Rational(3, 4))]
},
'euler_var_05': {
'eq': -exp(x) + (x*Derivative(f(x), (x, 2)) + Derivative(f(x), x))/x,
'sol': [Eq(f(x), C1 + C2*log(x) + exp(x) - Ei(x))]
},
}
}
def _get_examples_ode_sol_bernoulli():
# Type: Bernoulli, f'(x) + p(x)*f(x) == q(x)*f(x)**n
return {
'hint': "Bernoulli",
'func': f(x),
'examples':{
'bernoulli_01': {
'eq': Eq(x*f(x).diff(x) + f(x) - f(x)**2, 0),
'sol': [Eq(f(x), 1/(C1*x + 1))],
'XFAIL': ['separable_reduced']
},
'bernoulli_02': {
'eq': f(x).diff(x) - y*f(x),
'sol': [Eq(f(x), C1*exp(x*y))]
},
'bernoulli_03': {
'eq': f(x)*f(x).diff(x) - 1,
'sol': [Eq(f(x), -sqrt(C1 + 2*x)), Eq(f(x), sqrt(C1 + 2*x))]
},
}
}
def _get_examples_ode_sol_riccati():
# Type: Riccati special alpha = -2, a*dy/dx + b*y**2 + c*y/x +d/x**2
return {
'hint': "Riccati_special_minus2",
'func': f(x),
'examples':{
'riccati_01': {
'eq': 2*f(x).diff(x) + f(x)**2 - f(x)/x + 3*x**(-2),
'sol': [Eq(f(x), (-sqrt(3)*tan(C1 + sqrt(3)*log(x)/4) + 3)/(2*x))],
},
},
}
def _get_examples_ode_sol_1st_linear():
# Type: first order linear form f'(x)+p(x)f(x)=q(x)
return {
'hint': "1st_linear",
'func': f(x),
'examples':{
'linear_01': {
'eq': Eq(f(x).diff(x) + x*f(x), x**2),
'sol': [Eq(f(x), (C1 + x*exp(x**2/2)- sqrt(2)*sqrt(pi)*erfi(sqrt(2)*x/2)/2)*exp(-x**2/2))],
},
},
}
def _get_examples_ode_sol_factorable():
""" some hints are marked as xfail for examples because they missed additional algebraic solution
which could be found by Factorable hint. Fact_01 raise exception for
nth_linear_constant_coeff_undetermined_coefficients"""
y = Dummy('y')
return {
'hint': "factorable",
'func': f(x),
'examples':{
'fact_01': {
'eq': f(x) + f(x)*f(x).diff(x),
'sol': [Eq(f(x), 0), Eq(f(x), C1 - x)],
'XFAIL': ['separable', '1st_exact', '1st_linear', 'Bernoulli', '1st_homogeneous_coeff_best',
'1st_homogeneous_coeff_subs_indep_div_dep', '1st_homogeneous_coeff_subs_dep_div_indep',
'lie_group', 'nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients',
'nth_linear_constant_coeff_variation_of_parameters',
'nth_linear_euler_eq_nonhomogeneous_variation_of_parameters',
'nth_linear_constant_coeff_undetermined_coefficients']
},
'fact_02': {
'eq': f(x)*(f(x).diff(x)+f(x)*x+2),
'sol': [Eq(f(x), (C1 - sqrt(2)*sqrt(pi)*erfi(sqrt(2)*x/2))*exp(-x**2/2)), Eq(f(x), 0)],
'XFAIL': ['Bernoulli', '1st_linear', 'lie_group']
},
'fact_03': {
'eq': (f(x).diff(x)+f(x)*x**2)*(f(x).diff(x, 2) + x*f(x)),
'sol': [Eq(f(x), C1*airyai(-x) + C2*airybi(-x)),Eq(f(x), C1*exp(-x**3/3))]
},
'fact_04': {
'eq': (f(x).diff(x)+f(x)*x**2)*(f(x).diff(x, 2) + f(x)),
'sol': [Eq(f(x), C1*exp(-x**3/3)), Eq(f(x), C1*sin(x) + C2*cos(x))]
},
'fact_05': {
'eq': (f(x).diff(x)**2-1)*(f(x).diff(x)**2-4),
'sol': [Eq(f(x), C1 - x), Eq(f(x), C1 + x), Eq(f(x), C1 + 2*x), Eq(f(x), C1 - 2*x)]
},
'fact_06': {
'eq': (f(x).diff(x, 2)-exp(f(x)))*f(x).diff(x),
'sol': [Eq(f(x), C1)]
},
'fact_07': {
'eq': (f(x).diff(x)**2-1)*(f(x)*f(x).diff(x)-1),
'sol': [Eq(f(x), C1 - x), Eq(f(x), -sqrt(C1 + 2*x)),Eq(f(x), sqrt(C1 + 2*x)), Eq(f(x), C1 + x)]
},
'fact_08': {
'eq': Derivative(f(x), x)**4 - 2*Derivative(f(x), x)**2 + 1,
'sol': [Eq(f(x), C1 - x), Eq(f(x), C1 + x)]
},
'fact_09': {
'eq': f(x)**2*Derivative(f(x), x)**6 - 2*f(x)**2*Derivative(f(x),
x)**4 + f(x)**2*Derivative(f(x), x)**2 - 2*f(x)*Derivative(f(x),
x)**5 + 4*f(x)*Derivative(f(x), x)**3 - 2*f(x)*Derivative(f(x),
x) + Derivative(f(x), x)**4 - 2*Derivative(f(x), x)**2 + 1,
'sol': [Eq(f(x), C1 - x), Eq(f(x), -sqrt(C1 + 2*x)),
Eq(f(x), sqrt(C1 + 2*x)), Eq(f(x), C1 + x)]
},
'fact_10': {
'eq': x**4*f(x)**2 + 2*x**4*f(x)*Derivative(f(x), (x, 2)) + x**4*Derivative(f(x),
(x, 2))**2 + 2*x**3*f(x)*Derivative(f(x), x) + 2*x**3*Derivative(f(x),
x)*Derivative(f(x), (x, 2)) - 7*x**2*f(x)**2 - 7*x**2*f(x)*Derivative(f(x),
(x, 2)) + x**2*Derivative(f(x), x)**2 - 7*x*f(x)*Derivative(f(x), x) + 12*f(x)**2,
'sol': [Eq(f(x), C1*besselj(2, x) + C2*bessely(2, x)), Eq(f(x), C1*besselj(sqrt(3),
x) + C2*bessely(sqrt(3), x))]
},
'fact_11': {
'eq': (f(x).diff(x, 2)-exp(f(x)))*(f(x).diff(x, 2)+exp(f(x))),
'sol': [], #currently dsolve doesn't return any solution for this example
'XFAIL': ['factorable']
},
#Below examples were added for the issue: https://github.com/sympy/sympy/issues/15889
'fact_12': {
'eq': exp(f(x).diff(x))-f(x)**2,
'sol': [Eq(NonElementaryIntegral(1/log(y**2), (y, f(x))), C1 + x)],
'XFAIL': ['lie_group'] #It shows not implemented error for lie_group.
},
'fact_13': {
'eq': f(x).diff(x)**2 - f(x)**3,
'sol': [Eq(f(x), 4/(C1**2 - 2*C1*x + x**2))],
'XFAIL': ['lie_group'] #It shows not implemented error for lie_group.
},
'fact_14': {
'eq': f(x).diff(x)**2 - f(x),
'sol': [Eq(f(x), C1**2/4 - C1*x/2 + x**2/4)]
},
'fact_15': {
'eq': f(x).diff(x)**2 - f(x)**2,
'sol': [Eq(f(x), C1*exp(x)), Eq(f(x), C1*exp(-x))]
},
'fact_16': {
'eq': f(x).diff(x)**2 - f(x)**3,
'sol': [Eq(f(x), 4/(C1**2 - 2*C1*x + x**2))]
},
}
}
def _get_examples_ode_sol_almost_linear():
from sympy import Ei
A = Symbol('A', positive=True)
f = Function('f')
d = f(x).diff(x)
return {
'hint': "almost_linear",
'func': f(x),
'examples':{
'almost_lin_01': {
'eq': x**2*f(x)**2*d + f(x)**3 + 1,
'sol': [Eq(f(x), (C1*exp(3/x) - 1)**Rational(1, 3)),
Eq(f(x), (-1 - sqrt(3)*I)*(C1*exp(3/x) - 1)**Rational(1, 3)/2),
Eq(f(x), (-1 + sqrt(3)*I)*(C1*exp(3/x) - 1)**Rational(1, 3)/2)],
},
'almost_lin_02': {
'eq': x*f(x)*d + 2*x*f(x)**2 + 1,
'sol': [Eq(f(x), -sqrt((C1 - 2*Ei(4*x))*exp(-4*x))), Eq(f(x), sqrt((C1 - 2*Ei(4*x))*exp(-4*x)))]
},
'almost_lin_03': {
'eq': x*d + x*f(x) + 1,
'sol': [Eq(f(x), (C1 - Ei(x))*exp(-x))]
},
'almost_lin_04': {
'eq': x*exp(f(x))*d + exp(f(x)) + 3*x,
'sol': [Eq(f(x), log(C1/x - x*Rational(3, 2)))],
},
'almost_lin_05': {
'eq': x + A*(x + diff(f(x), x) + f(x)) + diff(f(x), x) + f(x) + 2,
'sol': [Eq(f(x), (C1 + Piecewise(
(x, Eq(A + 1, 0)), ((-A*x + A - x - 1)*exp(x)/(A + 1), True)))*exp(-x))],
},
}
}
def _get_examples_ode_sol_liouville():
return {
'hint': "Liouville",
'func': f(x),
'examples':{
'liouville_01': {
'eq': diff(f(x), x)/x + diff(f(x), x, x)/2 - diff(f(x), x)**2/2,
'sol': [Eq(f(x), log(x/(C1 + C2*x)))],
},
'liouville_02': {
'eq': diff(x*exp(-f(x)), x, x),
'sol': [Eq(f(x), log(x/(C1 + C2*x)))]
},
'liouville_03': {
'eq': ((diff(f(x), x)/x + diff(f(x), x, x)/2 - diff(f(x), x)**2/2)*exp(-f(x))/exp(f(x))).expand(),
'sol': [Eq(f(x), log(x/(C1 + C2*x)))]
},
'liouville_04': {
'eq': diff(f(x), x, x) + 1/f(x)*(diff(f(x), x))**2 + 1/x*diff(f(x), x),
'sol': [Eq(f(x), -sqrt(C1 + C2*log(x))), Eq(f(x), sqrt(C1 + C2*log(x)))],
},
'liouville_05': {
'eq': x*diff(f(x), x, x) + x/f(x)*diff(f(x), x)**2 + x*diff(f(x), x),
'sol': [Eq(f(x), -sqrt(C1 + C2*exp(-x))), Eq(f(x), sqrt(C1 + C2*exp(-x)))],
},
'liouville_06': {
'eq': Eq((x*exp(f(x))).diff(x, x), 0),
'sol': [Eq(f(x), log(C1 + C2/x))],
},
}
}
def _get_examples_ode_sol_nth_algebraic():
M, m, r, t = symbols('M m r t')
phi = Function('phi')
# This one needs a substitution f' = g.
# 'algeb_12': {
# 'eq': -exp(x) + (x*Derivative(f(x), (x, 2)) + Derivative(f(x), x))/x,
# 'sol': [Eq(f(x), C1 + C2*log(x) + exp(x) - Ei(x))],
# },
return {
'hint': "nth_algebraic",
'func': f(x),
'examples':{
'algeb_01': {
'eq': f(x) * f(x).diff(x) * f(x).diff(x, x) * (f(x) - 1) * (f(x).diff(x) - x),
'sol': [Eq(f(x), C1 + x**2/2), Eq(f(x), C1 + C2*x)]
},
'algeb_02': {
'eq': f(x) * f(x).diff(x) * f(x).diff(x, x) * (f(x) - 1),
'sol': [Eq(f(x), C1 + C2*x)]
},
'algeb_03': {
'eq': f(x) * f(x).diff(x) * f(x).diff(x, x),
'sol': [Eq(f(x), C1 + C2*x)]
},
'algeb_04': {
'eq': Eq(-M * phi(t).diff(t),
Rational(3, 2) * m * r**2 * phi(t).diff(t) * phi(t).diff(t,t)),
'sol': [Eq(phi(t), C1), Eq(phi(t), C1 + C2*t - M*t**2/(3*m*r**2))],
'func': phi(t)
},
'algeb_05': {
'eq': (1 - sin(f(x))) * f(x).diff(x),
'sol': [Eq(f(x), C1)],
'XFAIL': ['separable'] #It raised exception.
},
'algeb_06': {
'eq': (diff(f(x)) - x)*(diff(f(x)) + x),
'sol': [Eq(f(x), C1 - x**2/2), Eq(f(x), C1 + x**2/2)]
},
'algeb_07': {
'eq': Eq(Derivative(f(x), x), Derivative(g(x), x)),
'sol': [Eq(f(x), C1 + g(x))],
},
'algeb_08': {
'eq': f(x).diff(x) - C1, #this example is from issue 15999
'sol': [Eq(f(x), C1*x + C2)],
},
'algeb_09': {
'eq': f(x)*f(x).diff(x),
'sol': [Eq(f(x), C1)],
},
'algeb_10': {
'eq': (diff(f(x)) - x)*(diff(f(x)) + x),
'sol': [Eq(f(x), C1 - x**2/2), Eq(f(x), C1 + x**2/2)],
},
'algeb_11': {
'eq': f(x) + f(x)*f(x).diff(x),
'sol': [Eq(f(x), 0), Eq(f(x), C1 - x)],
'XFAIL': ['separable', '1st_exact', '1st_linear', 'Bernoulli', '1st_homogeneous_coeff_best',
'1st_homogeneous_coeff_subs_indep_div_dep', '1st_homogeneous_coeff_subs_dep_div_indep',
'lie_group', 'nth_linear_constant_coeff_undetermined_coefficients',
'nth_linear_euler_eq_nonhomogeneous_undetermined_coefficients',
'nth_linear_constant_coeff_variation_of_parameters',
'nth_linear_euler_eq_nonhomogeneous_variation_of_parameters']
#nth_linear_constant_coeff_undetermined_coefficients raises exception rest all of them misses a solution.
},
'algeb_12': {
'eq': Derivative(x*f(x), x, x, x),
'sol': [Eq(f(x), (C1 + C2*x + C3*x**2) / x)],
'XFAIL': ['nth_algebraic'] # It passes only when prep=False is set in dsolve.
},
'algeb_13': {
'eq': Eq(Derivative(x*Derivative(f(x), x), x)/x, exp(x)),
'sol': [Eq(f(x), C1 + C2*log(x) + exp(x) - Ei(x))],
'XFAIL': ['nth_algebraic'] # It passes only when prep=False is set in dsolve.
},
}
}
def _get_examples_ode_sol_nth_order_reducible():
return {
'hint': "nth_order_reducible",
'func': f(x),
'examples':{
'reducible_01': {
'eq': Eq(x*Derivative(f(x), x)**2 + Derivative(f(x), x, 2), 0),
'sol': [Eq(f(x),C1 - sqrt(-1/C2)*log(-C2*sqrt(-1/C2) + x) +
sqrt(-1/C2)*log(C2*sqrt(-1/C2) + x))],
'slow': True,
},
'reducible_02': {
'eq': -exp(x) + (x*Derivative(f(x), (x, 2)) + Derivative(f(x), x))/x,
'sol': [Eq(f(x), C1 + C2*log(x) + exp(x) - Ei(x))],
'slow': True,
},
'reducible_03': {
'eq': Eq(sqrt(2) * f(x).diff(x,x,x) + f(x).diff(x), 0),
'sol': [Eq(f(x), C1 + C2*sin(2**Rational(3, 4)*x/2) + C3*cos(2**Rational(3, 4)*x/2))],
'slow': True,
},
'reducible_04': {
'eq': f(x).diff(x, 2) + 2*f(x).diff(x),
'sol': [Eq(f(x), C1 + C2*exp(-2*x))],
},
'reducible_05': {
'eq': f(x).diff(x, 3) + f(x).diff(x, 2) - 6*f(x).diff(x),
'sol': [Eq(f(x), C1 + C2*exp(-3*x) + C3*exp(2*x))],
'slow': True,
},
'reducible_06': {
'eq': f(x).diff(x, 4) - f(x).diff(x, 3) - 4*f(x).diff(x, 2) + \
4*f(x).diff(x),
'sol': [Eq(f(x), C1 + C2*exp(-2*x) + C3*exp(x) + C4*exp(2*x))],
'slow': True,
},
'reducible_07': {
'eq': f(x).diff(x, 4) + 3*f(x).diff(x, 3),
'sol': [Eq(f(x), C1 + C2*x + C3*x**2 + C4*exp(-3*x))],
'slow': True,
},
'reducible_08': {
'eq': f(x).diff(x, 4) - 2*f(x).diff(x, 2),
'sol': [Eq(f(x), C1 + C2*x + C3*exp(-sqrt(2)*x) + C4*exp(sqrt(2)*x))],
'slow': True,
},
'reducible_09': {
'eq': f(x).diff(x, 4) + 4*f(x).diff(x, 2),
'sol': [Eq(f(x), C1 + C2*x + C3*sin(2*x) + C4*cos(2*x))],
'slow': True,
},
'reducible_10': {
'eq': f(x).diff(x, 5) + 2*f(x).diff(x, 3) + f(x).diff(x),
'sol': [Eq(f(x), C1 + C2*(x*sin(x) + cos(x)) + C3*(-x*cos(x) + sin(x)) + C4*sin(x) + C5*cos(x))],
'slow': True,
},
'reducible_11': {
'eq': f(x).diff(x, 2) - f(x).diff(x)**3,
'sol': [Eq(f(x), C1 - sqrt(2)*(I*C2 + I*x)*sqrt(1/(C2 + x))),
Eq(f(x), C1 + sqrt(2)*(I*C2 + I*x)*sqrt(1/(C2 + x)))],
'slow': True,
},
}
}
def _get_examples_ode_sol_nth_linear_undetermined_coefficients():
# examples 3-27 below are from Ordinary Differential Equations,
# Tenenbaum and Pollard, pg. 231
g = exp(-x)
f2 = f(x).diff(x, 2)
c = 3*f(x).diff(x, 3) + 5*f2 + f(x).diff(x) - f(x) - x
return {
'hint': "nth_linear_constant_coeff_undetermined_coefficients",
'func': f(x),
'examples':{
'undet_01': {
'eq': c - x*g,
'sol': [Eq(f(x), C3*exp(x/3) - x + (C1 + x*(C2 - x**2/24 - 3*x/32))*exp(-x) - 1)],
'slow': True,
},
'undet_02': {
'eq': c - g,
'sol': [Eq(f(x), C3*exp(x/3) - x + (C1 + x*(C2 - x/8))*exp(-x) - 1)],
'slow': True,
},
'undet_03': {
'eq': f2 + 3*f(x).diff(x) + 2*f(x) - 4,
'sol': [Eq(f(x), C1*exp(-2*x) + C2*exp(-x) + 2)],
'slow': True,
},
'undet_04': {
'eq': f2 + 3*f(x).diff(x) + 2*f(x) - 12*exp(x),
'sol': [Eq(f(x), C1*exp(-2*x) + C2*exp(-x) + 2*exp(x))],
'slow': True,
},
'undet_05': {
'eq': f2 + 3*f(x).diff(x) + 2*f(x) - exp(I*x),
'sol': [Eq(f(x), (S(3)/10 + I/10)*(C1*exp(-2*x) + C2*exp(-x) - I*exp(I*x)))],
'slow': True,
},
'undet_06': {
'eq': f2 + 3*f(x).diff(x) + 2*f(x) - sin(x),
'sol': [Eq(f(x), C1*exp(-2*x) + C2*exp(-x) + sin(x)/10 - 3*cos(x)/10)],
'slow': True,
},
'undet_07': {
'eq': f2 + 3*f(x).diff(x) + 2*f(x) - cos(x),
'sol': [Eq(f(x), C1*exp(-2*x) + C2*exp(-x) + 3*sin(x)/10 + cos(x)/10)],
'slow': True,
},
'undet_08': {
'eq': f2 + 3*f(x).diff(x) + 2*f(x) - (8 + 6*exp(x) + 2*sin(x)),
'sol': [Eq(f(x), C1*exp(-2*x) + C2*exp(-x) + exp(x) + sin(x)/5 - 3*cos(x)/5 + 4)],
'slow': True,
},
'undet_09': {
'eq': f2 + f(x).diff(x) + f(x) - x**2,
'sol': [Eq(f(x), -2*x + x**2 + (C1*sin(x*sqrt(3)/2) + C2*cos(x*sqrt(3)/2))*exp(-x/2))],
'slow': True,
},
'undet_10': {
'eq': f2 - 2*f(x).diff(x) - 8*f(x) - 9*x*exp(x) - 10*exp(-x),
'sol': [Eq(f(x), -x*exp(x) - 2*exp(-x) + C1*exp(-2*x) + C2*exp(4*x))],
'slow': True,
},
'undet_11': {
'eq': f2 - 3*f(x).diff(x) - 2*exp(2*x)*sin(x),
'sol': [Eq(f(x), C1 + C2*exp(3*x) - 3*exp(2*x)*sin(x)/5 - exp(2*x)*cos(x)/5)],
'slow': True,
},
'undet_12': {
'eq': f(x).diff(x, 4) - 2*f2 + f(x) - x + sin(x),
'sol': [Eq(f(x), x - sin(x)/4 + (C1 + C2*x)*exp(-x) + (C3 + C4*x)*exp(x))],
'slow': True,
},
'undet_13': {
'eq': f2 + f(x).diff(x) - x**2 - 2*x,
'sol': [Eq(f(x), C1 + x**3/3 + C2*exp(-x))],
'slow': True,
},
'undet_14': {
'eq': f2 + f(x).diff(x) - x - sin(2*x),
'sol': [Eq(f(x), C1 - x - sin(2*x)/5 - cos(2*x)/10 + x**2/2 + C2*exp(-x))],
'slow': True,
},
'undet_15': {
'eq': f2 + f(x) - 4*x*sin(x),
'sol': [Eq(f(x), (C1 - x**2)*cos(x) + (C2 + x)*sin(x))],
'slow': True,
},
'undet_16': {
'eq': f2 + 4*f(x) - x*sin(2*x),
'sol': [Eq(f(x), (C1 - x**2/8)*cos(2*x) + (C2 + x/16)*sin(2*x))],
'slow': True,
},
'undet_17': {
'eq': f2 + 2*f(x).diff(x) + f(x) - x**2*exp(-x),
'sol': [Eq(f(x), (C1 + x*(C2 + x**3/12))*exp(-x))],
'slow': True,
},
'undet_18': {
'eq': f(x).diff(x, 3) + 3*f2 + 3*f(x).diff(x) + f(x) - 2*exp(-x) + \
x**2*exp(-x),
'sol': [Eq(f(x), (C1 + x*(C2 + x*(C3 - x**3/60 + x/3)))*exp(-x))],
'slow': True,
},
'undet_19': {
'eq': f2 + 3*f(x).diff(x) + 2*f(x) - exp(-2*x) - x**2,
'sol': [Eq(f(x), C2*exp(-x) + x**2/2 - x*Rational(3,2) + (C1 - x)*exp(-2*x) + Rational(7,4))],
'slow': True,
},
'undet_20': {
'eq': f2 - 3*f(x).diff(x) + 2*f(x) - x*exp(-x),
'sol': [Eq(f(x), C1*exp(x) + C2*exp(2*x) + (6*x + 5)*exp(-x)/36)],
'slow': True,
},
'undet_21': {
'eq': f2 + f(x).diff(x) - 6*f(x) - x - exp(2*x),
'sol': [Eq(f(x), Rational(-1, 36) - x/6 + C2*exp(-3*x) + (C1 + x/5)*exp(2*x))],
'slow': True,
},
'undet_22': {
'eq': f2 + f(x) - sin(x) - exp(-x),
'sol': [Eq(f(x), C2*sin(x) + (C1 - x/2)*cos(x) + exp(-x)/2)],
'slow': True,
},
'undet_23': {
'eq': f(x).diff(x, 3) - 3*f2 + 3*f(x).diff(x) - f(x) - exp(x),
'sol': [Eq(f(x), (C1 + x*(C2 + x*(C3 + x/6)))*exp(x))],
'slow': True,
},
'undet_24': {
'eq': f2 + f(x) - S.Half - cos(2*x)/2,
'sol': [Eq(f(x), S.Half - cos(2*x)/6 + C1*sin(x) + C2*cos(x))],
'slow': True,
},
'undet_25': {
'eq': f(x).diff(x, 3) - f(x).diff(x) - exp(2*x)*(S.Half - cos(2*x)/2),
'sol': [Eq(f(x), C1 + C2*exp(-x) + C3*exp(x) + (-21*sin(2*x) + 27*cos(2*x) + 130)*exp(2*x)/1560)],
'slow': True,
},
'undet_26': {
'eq': (f(x).diff(x, 5) + 2*f(x).diff(x, 3) + f(x).diff(x) - 2*x -
sin(x) - cos(x)),
'sol': [Eq(f(x), C1 + x**2 + (C2 + x*(C3 - x/8))*sin(x) + (C4 + x*(C5 + x/8))*cos(x))],
'slow': True,
},
'undet_27': {
'eq': f2 + f(x) - cos(x)/2 + cos(3*x)/2,
'sol': [Eq(f(x), cos(3*x)/16 + C2*cos(x) + (C1 + x/4)*sin(x))],
'slow': True,
},
'undet_28': {
'eq': f(x).diff(x) - 1,
'sol': [Eq(f(x), C1 + x)],
'slow': True,
},
# https://github.com/sympy/sympy/issues/19358
'undet_29': {
'eq': f2 + f(x).diff(x) + exp(x-C1),
'sol': [Eq(f(x), C2 + C3*exp(-x) - exp(-C1 + x)/2)],
'slow': True,
},
}
}
def _get_examples_ode_sol_separable():
# test_separable1-5 are from Ordinary Differential Equations, Tenenbaum and
# Pollard, pg. 55
a = Symbol('a')
return {
'hint': "separable",
'func': f(x),
'examples':{
'separable_01': {
'eq': f(x).diff(x) - f(x),
'sol': [Eq(f(x), C1*exp(x))],
},
'separable_02': {
'eq': x*f(x).diff(x) - f(x),
'sol': [Eq(f(x), C1*x)],
},
'separable_03': {
'eq': f(x).diff(x) + sin(x),
'sol': [Eq(f(x), C1 + cos(x))],
},
'separable_04': {
'eq': f(x)**2 + 1 - (x**2 + 1)*f(x).diff(x),
'sol': [Eq(f(x), tan(C1 + atan(x)))],
},
'separable_05': {
'eq': f(x).diff(x)/tan(x) - f(x) - 2,
'sol': [Eq(f(x), C1/cos(x) - 2)],
},
'separable_06': {
'eq': f(x).diff(x) * (1 - sin(f(x))) - 1,
'sol': [Eq(-x + f(x) + cos(f(x)), C1)],
},
'separable_07': {
'eq': f(x)*x**2*f(x).diff(x) - f(x)**3 - 2*x**2*f(x).diff(x),
'sol': [Eq(f(x), (-x + sqrt(x*(4*C1*x + x - 4)))/(C1*x - 1)/2),
Eq(f(x), -((x + sqrt(x*(4*C1*x + x - 4)))/(C1*x - 1))/2)],
'slow': True,
},
'separable_08': {
'eq': f(x)**2 - 1 - (2*f(x) + x*f(x))*f(x).diff(x),
'sol': [Eq(f(x), -sqrt(C1*x**2 + 4*C1*x + 4*C1 + 1)),
Eq(f(x), sqrt(C1*x**2 + 4*C1*x + 4*C1 + 1))],
'slow': True,
},
'separable_09': {
'eq': x*log(x)*f(x).diff(x) + sqrt(1 + f(x)**2),
'sol': [Eq(f(x), sinh(C1 - log(log(x))))], #One more solution is f(x)=I
'slow': True,
'checkodesol_XFAIL': True,
},
'separable_10': {
'eq': exp(x + 1)*tan(f(x)) + cos(f(x))*f(x).diff(x),
'sol': [Eq(E*exp(x) + log(cos(f(x)) - 1)/2 - log(cos(f(x)) + 1)/2 + cos(f(x)), C1)],
'slow': True,
},
'separable_11': {
'eq': (x*cos(f(x)) + x**2*sin(f(x))*f(x).diff(x) - a**2*sin(f(x))*f(x).diff(x)),
'sol': [Eq(f(x), -acos(C1*sqrt(-a**2 + x**2)) + 2*pi),
Eq(f(x), acos(C1*sqrt(-a**2 + x**2)))],
'slow': True,
},
'separable_12': {
'eq': f(x).diff(x) - f(x)*tan(x),
'sol': [Eq(f(x), C1/cos(x))],
},
'separable_13': {
'eq': (x - 1)*cos(f(x))*f(x).diff(x) - 2*x*sin(f(x)),
'sol': [Eq(f(x), pi - asin(C1*(x**2 - 2*x + 1)*exp(2*x))),
Eq(f(x), asin(C1*(x**2 - 2*x + 1)*exp(2*x)))],
},
'separable_14': {
'eq': f(x).diff(x) - f(x)*log(f(x))/tan(x),
'sol': [Eq(f(x), exp(C1*sin(x)))],
},
'separable_15': {
'eq': x*f(x).diff(x) + (1 + f(x)**2)*atan(f(x)),
'sol': [Eq(f(x), tan(C1/x))], #Two more solutions are f(x)=0 and f(x)=I
'slow': True,
'checkodesol_XFAIL': True,
},
'separable_16': {
'eq': f(x).diff(x) + x*(f(x) + 1),
'sol': [Eq(f(x), -1 + C1*exp(-x**2/2))],
},
'separable_17': {
'eq': exp(f(x)**2)*(x**2 + 2*x + 1) + (x*f(x) + f(x))*f(x).diff(x),
'sol': [Eq(f(x), -sqrt(log(1/(C1 + x**2 + 2*x)))),
Eq(f(x), sqrt(log(1/(C1 + x**2 + 2*x))))],
},
'separable_18': {
'eq': f(x).diff(x) + f(x),
'sol': [Eq(f(x), C1*exp(-x))],
},
'separable_19': {
'eq': sin(x)*cos(2*f(x)) + cos(x)*sin(2*f(x))*f(x).diff(x),
'sol': [Eq(f(x), pi - acos(C1/cos(x)**2)/2), Eq(f(x), acos(C1/cos(x)**2)/2)],
},
'separable_20': {
'eq': (1 - x)*f(x).diff(x) - x*(f(x) + 1),
'sol': [Eq(f(x), (C1*exp(-x) - x + 1)/(x - 1))],
},
'separable_21': {
'eq': f(x)*diff(f(x), x) + x - 3*x*f(x)**2,
'sol': [Eq(f(x), -sqrt(3)*sqrt(C1*exp(3*x**2) + 1)/3),
Eq(f(x), sqrt(3)*sqrt(C1*exp(3*x**2) + 1)/3)],
},
'separable_22': {
'eq': f(x).diff(x) - exp(x + f(x)),
'sol': [Eq(f(x), log(-1/(C1 + exp(x))))],
'XFAIL': ['lie_group'] #It shows 'NoneType' object is not subscriptable for lie_group.
},
}
}
def _get_all_examples():
all_solvers = [_get_examples_ode_sol_euler_homogeneous(),
_get_examples_ode_sol_euler_undetermined_coeff(),
_get_examples_ode_sol_euler_var_para(),
_get_examples_ode_sol_factorable(),
_get_examples_ode_sol_bernoulli(),
_get_examples_ode_sol_nth_algebraic(),
_get_examples_ode_sol_riccati(),
_get_examples_ode_sol_1st_linear(),
_get_examples_ode_sol_almost_linear(),
_get_examples_ode_sol_nth_order_reducible(),
_get_examples_ode_sol_nth_linear_undetermined_coefficients(),
_get_examples_ode_sol_liouville(),
_get_examples_ode_sol_separable(),
]
all_examples = []
for solver in all_solvers:
for example in solver['examples']:
temp = {
'hint': solver['hint'],
'func': solver['examples'][example].get('func',solver['func']),
'eq': solver['examples'][example]['eq'],
'sol': solver['examples'][example]['sol'],
'XFAIL': solver['examples'][example].get('XFAIL',[]),
'checkodesol_XFAIL': solver['examples'][example].get('checkodesol_XFAIL', False),
'example_name': example,
}
all_examples.append(temp)
return all_examples
|
e0c216904fa9e44af7d1b19b9e6e3e0e390376189ef412d9aa0c9b710f56749b
|
from sympy import (symbols, Symbol, diff, Function, Derivative, Matrix, Rational, S,
I, Eq, sqrt)
from sympy.functions import exp, cos, sin, log
from sympy.matrices import dotprodsimp
from sympy.solvers.ode import dsolve
from sympy.solvers.ode.subscheck import checksysodesol
from sympy.solvers.ode.systems import (neq_nth_linear_constant_coeff_match, linear_ode_to_matrix,
ODEOrderError, ODENonlinearError, _simpsol)
from sympy.integrals.integrals import Integral
from sympy.testing.pytest import ON_TRAVIS, raises, slow, skip, XFAIL
C0, C1, C2, C3, C4, C5, C6, C7, C8, C9, C10 = symbols('C0:11')
def test_linear_ode_to_matrix():
f, g, h = symbols("f, g, h", cls=Function)
t = Symbol("t")
funcs = [f(t), g(t), h(t)]
f1 = f(t).diff(t)
g1 = g(t).diff(t)
h1 = h(t).diff(t)
f2 = f(t).diff(t, 2)
g2 = g(t).diff(t, 2)
h2 = h(t).diff(t, 2)
eqs_1 = [Eq(f1, g(t)), Eq(g1, f(t))]
sol_1 = ([Matrix([[1, 0], [0, 1]]), Matrix([[ 0, -1], [-1, 0]])], Matrix([[0],[0]]))
assert linear_ode_to_matrix(eqs_1, funcs[:-1], t, 1) == sol_1
eqs_2 = [Eq(f1, f(t) + 2*g(t)), Eq(g1, h(t)), Eq(h1, g(t) + h(t) + f(t))]
sol_2 = ([Matrix([[1, 0, 0], [0, 1, 0], [0, 0, 1]]), Matrix([[-1, -2, 0], [ 0, 0, -1], [-1, -1, -1]])],
Matrix([[0], [0], [0]]))
assert linear_ode_to_matrix(eqs_2, funcs, t, 1) == sol_2
eqs_3 = [Eq(2*f1 + 3*h1, f(t) + g(t)), Eq(4*h1 + 5*g1, f(t) + h(t)), Eq(5*f1 + 4*g1, g(t) + h(t))]
sol_3 = ([Matrix([[2, 0, 3], [0, 5, 4], [5, 4, 0]]), Matrix([[-1, -1, 0], [-1, 0, -1], [0, -1, -1]])],
Matrix([[0], [0], [0]]))
assert linear_ode_to_matrix(eqs_3, funcs, t, 1) == sol_3
eqs_4 = [Eq(f2 + h(t), f1 + g(t)), Eq(2*h2 + g2 + g1 + g(t), 0), Eq(3*h1, 4)]
sol_4 = ([Matrix([[1, 0, 0], [0, 1, 2], [0, 0, 0]]), Matrix([[-1, 0, 0], [0, 1, 0], [0, 0, 3]]),
Matrix([[0, -1, 1], [0, 1, 0], [0, 0, 0]])], Matrix([[0], [0], [4]]))
assert linear_ode_to_matrix(eqs_4, funcs, t, 2) == sol_4
eqs_5 = [Eq(f2, g(t)), Eq(f1 + g1, f(t))]
raises(ODEOrderError, lambda: linear_ode_to_matrix(eqs_5, funcs[:-1], t, 1))
eqs_6 = [Eq(f1, f(t)**2), Eq(g1, f(t) + g(t))]
raises(ODENonlinearError, lambda: linear_ode_to_matrix(eqs_6, funcs[:-1], t, 1))
def test_neq_nth_linear_constant_coeff_match():
x, y, z, w = symbols('x, y, z, w', cls=Function)
t = Symbol('t')
x1 = diff(x(t), t)
y1 = diff(y(t), t)
z1 = diff(z(t), t)
w1 = diff(w(t), t)
x2 = diff(x(t), t, t)
funcs = [x(t), y(t)]
funcs_2 = funcs + [z(t), w(t)]
eqs_1 = (5 * x1 + 12 * x(t) - 6 * (y(t)), (2 * y1 - 11 * t * x(t) + 3 * y(t) + t))
assert neq_nth_linear_constant_coeff_match(eqs_1, funcs, t) is None
eqs_2 = (5 * (x1**2) + 12 * x(t) - 6 * (y(t)), (2 * y1 - 11 * t * x(t) + 3 * y(t) + t))
assert neq_nth_linear_constant_coeff_match(eqs_2, funcs, t) is None
eqs_3 = (5 * x1 + 12 * x(t) - 6 * (y(t)), (2 * y1 - 11 * x(t) + 3 * y(t)), (5 * w1 + z(t)), (z1 + w(t)))
answer_3 = {'no_of_equation': 4,
'eq': (12*x(t) - 6*y(t) + 5*Derivative(x(t), t),
-11*x(t) + 3*y(t) + 2*Derivative(y(t), t),
z(t) + 5*Derivative(w(t), t),
w(t) + Derivative(z(t), t)),
'func': [x(t), y(t), z(t), w(t)],
'order': {x(t): 1, y(t): 1, z(t): 1, w(t): 1},
'is_linear': True,
'is_constant': True,
'is_homogeneous': True,
'func_coeff': Matrix([
[Rational(12, 5), Rational(-6, 5), 0, 0],
[Rational(-11, 2), Rational(3, 2), 0, 0],
[0, 0, 0, 1],
[0, 0, Rational(1, 5), 0]]),
'type_of_equation': 'type1',
'is_general': True}
assert neq_nth_linear_constant_coeff_match(eqs_3, funcs_2, t) == answer_3
eqs_4 = (5 * x1 + 12 * x(t) - 6 * (y(t)), (2 * y1 - 11 * x(t) + 3 * y(t)), (z1 - w(t)), (w1 - z(t)))
answer_4 = {'no_of_equation': 4,
'eq': (12 * x(t) - 6 * y(t) + 5 * Derivative(x(t), t),
-11 * x(t) + 3 * y(t) + 2 * Derivative(y(t), t),
-w(t) + Derivative(z(t), t),
-z(t) + Derivative(w(t), t)),
'func': [x(t), y(t), z(t), w(t)],
'order': {x(t): 1, y(t): 1, z(t): 1, w(t): 1},
'is_linear': True,
'is_constant': True,
'is_homogeneous': True,
'func_coeff': Matrix([
[Rational(12, 5), Rational(-6, 5), 0, 0],
[Rational(-11, 2), Rational(3, 2), 0, 0],
[0, 0, 0, -1],
[0, 0, -1, 0]]),
'type_of_equation': 'type1',
'is_general': True}
assert neq_nth_linear_constant_coeff_match(eqs_4, funcs_2, t) == answer_4
eqs_5 = (5 * x1 + 12 * x(t) - 6 * (y(t)) + x2, (2 * y1 - 11 * x(t) + 3 * y(t)), (z1 - w(t)), (w1 - z(t)))
assert neq_nth_linear_constant_coeff_match(eqs_5, funcs_2, t) is None
eqs_6 = (Eq(x1,3*y(t)-11*z(t)),Eq(y1,7*z(t)-3*x(t)),Eq(z1,11*x(t)-7*y(t)))
answer_6 = {'no_of_equation': 3, 'eq': (Eq(Derivative(x(t), t), 3*y(t) - 11*z(t)), Eq(Derivative(y(t), t), -3*x(t) + 7*z(t)),
Eq(Derivative(z(t), t), 11*x(t) - 7*y(t))), 'func': [x(t), y(t), z(t)], 'order': {x(t): 1, y(t): 1, z(t): 1},
'is_linear': True, 'is_constant': True, 'is_homogeneous': True,
'func_coeff': Matrix([
[ 0, -3, 11],
[ 3, 0, -7],
[-11, 7, 0]]),
'type_of_equation': 'type1', 'is_general': True}
assert neq_nth_linear_constant_coeff_match(eqs_6, funcs_2[:-1], t) == answer_6
eqs_7 = (Eq(x1, y(t)), Eq(y1, x(t)))
answer_7 = {'no_of_equation': 2, 'eq': (Eq(Derivative(x(t), t), y(t)), Eq(Derivative(y(t), t), x(t))),
'func': [x(t), y(t)], 'order': {x(t): 1, y(t): 1}, 'is_linear': True, 'is_constant': True,
'is_homogeneous': True, 'func_coeff': Matrix([
[ 0, -1],
[-1, 0]]),
'type_of_equation': 'type1', 'is_general': True}
assert neq_nth_linear_constant_coeff_match(eqs_7, funcs, t) == answer_7
eqs_8 = (Eq(x1, 21*x(t)), Eq(y1, 17*x(t)+3*y(t)), Eq(z1, 5*x(t)+7*y(t)+9*z(t)))
answer_8 = {'no_of_equation': 3, 'eq': (Eq(Derivative(x(t), t), 21*x(t)), Eq(Derivative(y(t), t), 17*x(t) + 3*y(t)),
Eq(Derivative(z(t), t), 5*x(t) + 7*y(t) + 9*z(t))), 'func': [x(t), y(t), z(t)], 'order': {x(t): 1, y(t): 1, z(t): 1},
'is_linear': True, 'is_constant': True, 'is_homogeneous': True,
'func_coeff': Matrix([
[-21, 0, 0],
[-17, -3, 0],
[ -5, -7, -9]]),
'type_of_equation': 'type1', 'is_general': True}
assert neq_nth_linear_constant_coeff_match(eqs_8, funcs_2[:-1], t) == answer_8
eqs_9 = (Eq(x1,4*x(t)+5*y(t)+2*z(t)),Eq(y1,x(t)+13*y(t)+9*z(t)),Eq(z1,32*x(t)+41*y(t)+11*z(t)))
answer_9 = {'no_of_equation': 3, 'eq': (Eq(Derivative(x(t), t), 4*x(t) + 5*y(t) + 2*z(t)),
Eq(Derivative(y(t), t), x(t) + 13*y(t) + 9*z(t)), Eq(Derivative(z(t), t), 32*x(t) + 41*y(t) + 11*z(t))),
'func': [x(t), y(t), z(t)], 'order': {x(t): 1, y(t): 1, z(t): 1}, 'is_linear': True,
'is_constant': True, 'is_homogeneous': True,
'func_coeff': Matrix([
[ -4, -5, -2],
[ -1, -13, -9],
[-32, -41, -11]]),
'type_of_equation': 'type1', 'is_general': True}
assert neq_nth_linear_constant_coeff_match(eqs_9, funcs_2[:-1], t) == answer_9
eqs_10 = (Eq(3*x1,4*5*(y(t)-z(t))),Eq(4*y1,3*5*(z(t)-x(t))),Eq(5*z1,3*4*(x(t)-y(t))))
answer_10 = {'no_of_equation': 3, 'eq': (Eq(3*Derivative(x(t), t), 20*y(t) - 20*z(t)),
Eq(4*Derivative(y(t), t), -15*x(t) + 15*z(t)), Eq(5*Derivative(z(t), t), 12*x(t) - 12*y(t))),
'func': [x(t), y(t), z(t)], 'order': {x(t): 1, y(t): 1, z(t): 1}, 'is_linear': True,
'is_constant': True, 'is_homogeneous': True,
'func_coeff': Matrix([
[ 0, Rational(-20, 3), Rational(20, 3)],
[Rational(15, 4), 0, Rational(-15, 4)],
[Rational(-12, 5), Rational(12, 5), 0]]),
'type_of_equation': 'type1', 'is_general': True}
assert neq_nth_linear_constant_coeff_match(eqs_10, funcs_2[:-1], t) == answer_10
eq11 = (Eq(x1,3*y(t)-11*z(t)),Eq(y1,7*z(t)-3*x(t)),Eq(z1,11*x(t)-7*y(t)))
sol11 = {'no_of_equation': 3, 'eq': (Eq(Derivative(x(t), t), 3*y(t) - 11*z(t)), Eq(Derivative(y(t), t), -3*x(t) + 7*z(t)),
Eq(Derivative(z(t), t), 11*x(t) - 7*y(t))), 'func': [x(t), y(t), z(t)], 'order': {x(t): 1, y(t): 1, z(t): 1},
'is_linear': True, 'is_constant': True, 'is_homogeneous': True, 'func_coeff': Matrix([
[ 0, -3, 11], [ 3, 0, -7], [-11, 7, 0]]), 'type_of_equation': 'type1', 'is_general': True}
assert neq_nth_linear_constant_coeff_match(eq11, funcs_2[:-1], t) == sol11
eq12 = (Eq(Derivative(x(t), t), y(t)), Eq(Derivative(y(t), t), x(t)))
sol12 = {'no_of_equation': 2, 'eq': (Eq(Derivative(x(t), t), y(t)), Eq(Derivative(y(t), t), x(t))),
'func': [x(t), y(t)], 'order': {x(t): 1, y(t): 1}, 'is_linear': True, 'is_constant': True,
'is_homogeneous': True, 'func_coeff': Matrix([
[0, -1],
[-1, 0]]), 'type_of_equation': 'type1', 'is_general': True}
assert neq_nth_linear_constant_coeff_match(eq12, [x(t), y(t)], t) == sol12
eq13 = (Eq(Derivative(x(t), t), 21 * x(t)), Eq(Derivative(y(t), t), 17 * x(t) + 3 * y(t)),
Eq(Derivative(z(t), t), 5 * x(t) + 7 * y(t) + 9 * z(t)))
sol13 = {'no_of_equation': 3, 'eq': (
Eq(Derivative(x(t), t), 21 * x(t)), Eq(Derivative(y(t), t), 17 * x(t) + 3 * y(t)),
Eq(Derivative(z(t), t), 5 * x(t) + 7 * y(t) + 9 * z(t))), 'func': [x(t), y(t), z(t)],
'order': {x(t): 1, y(t): 1, z(t): 1}, 'is_linear': True, 'is_constant': True, 'is_homogeneous': True,
'func_coeff': Matrix([
[-21, 0, 0],
[-17, -3, 0],
[-5, -7, -9]]), 'type_of_equation': 'type1', 'is_general': True}
assert neq_nth_linear_constant_coeff_match(eq13, [x(t), y(t), z(t)], t) == sol13
eq14 = (
Eq(Derivative(x(t), t), 4 * x(t) + 5 * y(t) + 2 * z(t)), Eq(Derivative(y(t), t), x(t) + 13 * y(t) + 9 * z(t)),
Eq(Derivative(z(t), t), 32 * x(t) + 41 * y(t) + 11 * z(t)))
sol14 = {'no_of_equation': 3, 'eq': (
Eq(Derivative(x(t), t), 4 * x(t) + 5 * y(t) + 2 * z(t)), Eq(Derivative(y(t), t), x(t) + 13 * y(t) + 9 * z(t)),
Eq(Derivative(z(t), t), 32 * x(t) + 41 * y(t) + 11 * z(t))), 'func': [x(t), y(t), z(t)],
'order': {x(t): 1, y(t): 1, z(t): 1}, 'is_linear': True, 'is_constant': True, 'is_homogeneous': True,
'func_coeff': Matrix([
[-4, -5, -2],
[-1, -13, -9],
[-32, -41, -11]]), 'type_of_equation': 'type1', 'is_general': True}
assert neq_nth_linear_constant_coeff_match(eq14, [x(t), y(t), z(t)], t) == sol14
eq15 = (Eq(3 * Derivative(x(t), t), 20 * y(t) - 20 * z(t)), Eq(4 * Derivative(y(t), t), -15 * x(t) + 15 * z(t)),
Eq(5 * Derivative(z(t), t), 12 * x(t) - 12 * y(t)))
sol15 = {'no_of_equation': 3, 'eq': (
Eq(3 * Derivative(x(t), t), 20 * y(t) - 20 * z(t)), Eq(4 * Derivative(y(t), t), -15 * x(t) + 15 * z(t)),
Eq(5 * Derivative(z(t), t), 12 * x(t) - 12 * y(t))), 'func': [x(t), y(t), z(t)],
'order': {x(t): 1, y(t): 1, z(t): 1}, 'is_linear': True, 'is_constant': True, 'is_homogeneous': True,
'func_coeff': Matrix([
[0, Rational(-20, 3), Rational(20, 3)],
[Rational(15, 4), 0, Rational(-15, 4)],
[Rational(-12, 5), Rational(12, 5), 0]]), 'type_of_equation': 'type1', 'is_general': True}
assert neq_nth_linear_constant_coeff_match(eq15, [x(t), y(t), z(t)], t) == sol15
# Constant coefficient homogeneous ODEs
eq1 = (Eq(diff(x(t),t), x(t) + y(t) + 9), Eq(diff(y(t),t), 2*x(t) + 5*y(t) + 23))
sol1 = {'no_of_equation': 2, 'eq': (Eq(Derivative(x(t), t), x(t) + y(t) + 9),
Eq(Derivative(y(t), t), 2*x(t) + 5*y(t) + 23)), 'func': [x(t), y(t)],
'order': {x(t): 1, y(t): 1}, 'is_linear': True, 'is_constant': True, 'is_homogeneous': False, 'is_general': True,
'func_coeff': Matrix([[-1, -1], [-2, -5]]), 'rhs': Matrix([[ 9], [23]]), 'type_of_equation': 'type2'}
assert neq_nth_linear_constant_coeff_match(eq1, funcs, t) == sol1
# Non constant coefficient non-homogeneous ODEs
eq1 = (Eq(diff(x(t), t), 5 * t * x(t) + 2 * y(t)), Eq(diff(y(t), t), 2 * x(t) + 5 * t * y(t)))
sol1 = {'no_of_equation': 2, 'eq': (Eq(Derivative(x(t), t), 5*t*x(t) + 2*y(t)), Eq(Derivative(y(t), t), 5*t*y(t) + 2*x(t))),
'func': [x(t), y(t)], 'order': {x(t): 1, y(t): 1}, 'is_linear': True, 'is_constant': False,
'is_homogeneous': True, 'func_coeff': Matrix([ [-5*t, -2], [ -2, -5*t]]), 'commutative_antiderivative': Matrix([
[5*t**2/2, 2*t], [ 2*t, 5*t**2/2]]), 'type_of_equation': 'type3', 'is_general': True}
assert neq_nth_linear_constant_coeff_match(eq1, funcs, t) == sol1
def test_matrix_exp():
from sympy.matrices.dense import Matrix, eye, zeros
from sympy.solvers.ode.systems import matrix_exp
t = Symbol('t')
for n in range(1, 6+1):
assert matrix_exp(zeros(n), t) == eye(n)
for n in range(1, 6+1):
A = eye(n)
expAt = exp(t) * eye(n)
assert matrix_exp(A, t) == expAt
for n in range(1, 6+1):
A = Matrix(n, n, lambda i,j: i+1 if i==j else 0)
expAt = Matrix(n, n, lambda i,j: exp((i+1)*t) if i==j else 0)
assert matrix_exp(A, t) == expAt
A = Matrix([[0, 1], [-1, 0]])
expAt = Matrix([[cos(t), sin(t)], [-sin(t), cos(t)]])
assert matrix_exp(A, t) == expAt
A = Matrix([[2, -5], [2, -4]])
expAt = Matrix([
[3*exp(-t)*sin(t) + exp(-t)*cos(t), -5*exp(-t)*sin(t)],
[2*exp(-t)*sin(t), -3*exp(-t)*sin(t) + exp(-t)*cos(t)]
])
assert matrix_exp(A, t) == expAt
A = Matrix([[21, 17, 6], [-5, -1, -6], [4, 4, 16]])
# TO update this.
# expAt = Matrix([
# [(8*t*exp(12*t) + 5*exp(12*t) - 1)*exp(4*t)/4,
# (8*t*exp(12*t) + 5*exp(12*t) - 5)*exp(4*t)/4,
# (exp(12*t) - 1)*exp(4*t)/2],
# [(-8*t*exp(12*t) - exp(12*t) + 1)*exp(4*t)/4,
# (-8*t*exp(12*t) - exp(12*t) + 5)*exp(4*t)/4,
# (-exp(12*t) + 1)*exp(4*t)/2],
# [4*t*exp(16*t), 4*t*exp(16*t), exp(16*t)]])
expAt = Matrix([
[2*t*exp(16*t) + 5*exp(16*t)/4 - exp(4*t)/4, 2*t*exp(16*t) + 5*exp(16*t)/4 - 5*exp(4*t)/4, exp(16*t)/2 - exp(4*t)/2],
[ -2*t*exp(16*t) - exp(16*t)/4 + exp(4*t)/4, -2*t*exp(16*t) - exp(16*t)/4 + 5*exp(4*t)/4, -exp(16*t)/2 + exp(4*t)/2],
[ 4*t*exp(16*t), 4*t*exp(16*t), exp(16*t)]
])
assert matrix_exp(A, t) == expAt
A = Matrix([[1, 1, 0, 0],
[0, 1, 1, 0],
[0, 0, 1, -S(1)/8],
[0, 0, S(1)/2, S(1)/2]])
expAt = Matrix([
[exp(t), t*exp(t), 4*t*exp(3*t/4) + 8*t*exp(t) + 48*exp(3*t/4) - 48*exp(t),
-2*t*exp(3*t/4) - 2*t*exp(t) - 16*exp(3*t/4) + 16*exp(t)],
[0, exp(t), -t*exp(3*t/4) - 8*exp(3*t/4) + 8*exp(t), t*exp(3*t/4)/2 + 2*exp(3*t/4) - 2*exp(t)],
[0, 0, t*exp(3*t/4)/4 + exp(3*t/4), -t*exp(3*t/4)/8],
[0, 0, t*exp(3*t/4)/2, -t*exp(3*t/4)/4 + exp(3*t/4)]
])
assert matrix_exp(A, t) == expAt
A = Matrix([
[ 0, 1, 0, 0],
[-1, 0, 0, 0],
[ 0, 0, 0, 1],
[ 0, 0, -1, 0]])
expAt = Matrix([
[ cos(t), sin(t), 0, 0],
[-sin(t), cos(t), 0, 0],
[ 0, 0, cos(t), sin(t)],
[ 0, 0, -sin(t), cos(t)]])
assert matrix_exp(A, t) == expAt
A = Matrix([
[ 0, 1, 1, 0],
[-1, 0, 0, 1],
[ 0, 0, 0, 1],
[ 0, 0, -1, 0]])
expAt = Matrix([
[ cos(t), sin(t), t*cos(t), t*sin(t)],
[-sin(t), cos(t), -t*sin(t), t*cos(t)],
[ 0, 0, cos(t), sin(t)],
[ 0, 0, -sin(t), cos(t)]])
assert matrix_exp(A, t) == expAt
# This case is unacceptably slow right now but should be solvable...
#a, b, c, d, e, f = symbols('a b c d e f')
#A = Matrix([
#[-a, b, c, d],
#[ a, -b, e, 0],
#[ 0, 0, -c - e - f, 0],
#[ 0, 0, f, -d]])
A = Matrix([[0, I], [I, 0]])
expAt = Matrix([
[exp(I*t)/2 + exp(-I*t)/2, exp(I*t)/2 - exp(-I*t)/2],
[exp(I*t)/2 - exp(-I*t)/2, exp(I*t)/2 + exp(-I*t)/2]])
assert matrix_exp(A, t) == expAt
def test_sysode_linear_neq_order1_type1():
f, g, x, y, h = symbols('f g x y h', cls=Function)
a, b, c, t = symbols('a b c t')
eq1 = [Eq(x(t).diff(t), x(t)), Eq(y(t).diff(t), y(t))]
sol1 = [Eq(x(t), C1*exp(t)), Eq(y(t), C2*exp(t))]
assert dsolve(eq1) == sol1
assert checksysodesol(eq1, sol1) == (True, [0, 0])
eq2 = [Eq(x(t).diff(t), 2*x(t)), Eq(y(t).diff(t), 3*y(t))]
#sol2 = [Eq(x(t), C1*exp(2*t)), Eq(y(t), C2*exp(3*t))]
sol2 = [Eq(x(t), C1*exp(2*t)), Eq(y(t), C2*exp(3*t))]
assert dsolve(eq2) == sol2
assert checksysodesol(eq2, sol2) == (True, [0, 0])
eq3 = [Eq(x(t).diff(t), a*x(t)), Eq(y(t).diff(t), a*y(t))]
sol3 = [Eq(x(t), C1*exp(a*t)), Eq(y(t), C2*exp(a*t))]
assert dsolve(eq3) == sol3
assert checksysodesol(eq3, sol3) == (True, [0, 0])
# Regression test case for issue #15474
# https://github.com/sympy/sympy/issues/15474
eq4 = [Eq(x(t).diff(t), a*x(t)), Eq(y(t).diff(t), b*y(t))]
sol4 = [Eq(x(t), C1*exp(a*t)), Eq(y(t), C2*exp(b*t))]
assert dsolve(eq4) == sol4
assert checksysodesol(eq4, sol4) == (True, [0, 0])
eq5 = [Eq(x(t).diff(t), -y(t)), Eq(y(t).diff(t), x(t))]
sol5 = [Eq(x(t), -C1*sin(t) - C2*cos(t)), Eq(y(t), C1*cos(t) - C2*sin(t))]
assert dsolve(eq5) == sol5
assert checksysodesol(eq5, sol5) == (True, [0, 0])
eq6 = [Eq(x(t).diff(t), -2*y(t)), Eq(y(t).diff(t), 2*x(t))]
sol6 = [Eq(x(t), -C1*sin(2*t) - C2*cos(2*t)), Eq(y(t), C1*cos(2*t) - C2*sin(2*t))]
assert dsolve(eq6) == sol6
assert checksysodesol(eq6, sol6) == (True, [0, 0])
eq7 = [Eq(x(t).diff(t), I*y(t)), Eq(y(t).diff(t), I*x(t))]
sol7 = [Eq(x(t), -C1*exp(-I*t) + C2*exp(I*t)), Eq(y(t), C1*exp(-I*t) + C2*exp(I*t))]
assert dsolve(eq7) == sol7
assert checksysodesol(eq7, sol7) == (True, [0, 0])
eq8 = [Eq(x(t).diff(t), -a*y(t)), Eq(y(t).diff(t), a*x(t))]
sol8 = [Eq(x(t), -I*C1*exp(-I*a*t) + I*C2*exp(I*a*t)), Eq(y(t), C1*exp(-I*a*t) + C2*exp(I*a*t))]
assert dsolve(eq8) == sol8
assert checksysodesol(eq8, sol8) == (True, [0, 0])
eq9 = [Eq(x(t).diff(t), x(t) + y(t)), Eq(y(t).diff(t), x(t) - y(t))]
sol9 = [Eq(x(t), C1*(1 - sqrt(2))*exp(-sqrt(2)*t) + C2*(1 + sqrt(2))*exp(sqrt(2)*t)),
Eq(y(t), C1*exp(-sqrt(2)*t) + C2*exp(sqrt(2)*t))]
assert dsolve(eq9) == sol9
assert checksysodesol(eq9, sol9) == (True, [0, 0])
eq10 = [Eq(x(t).diff(t), x(t) + y(t)), Eq(y(t).diff(t), x(t) + y(t))]
sol10 = [Eq(x(t), -C1 + C2*exp(2*t)), Eq(y(t), C1 + C2*exp(2*t))]
assert dsolve(eq10) == sol10
assert checksysodesol(eq10, sol10) == (True, [0, 0])
eq11 = [Eq(x(t).diff(t), 2*x(t) + y(t)), Eq(y(t).diff(t), -x(t) + 2*y(t))]
sol11 = [Eq(x(t), (C1*sin(t) + C2*cos(t))*exp(2*t)),
Eq(y(t), (C1*cos(t) - C2*sin(t))*exp(2*t))]
assert dsolve(eq11) == sol11
assert checksysodesol(eq11, sol11) == (True, [0, 0])
eq12 = [Eq(x(t).diff(t), x(t) + 2*y(t)), Eq(y(t).diff(t), 2*x(t) + y(t))]
sol12 = [Eq(x(t), -C1*exp(-t) + C2*exp(3*t)), Eq(y(t), C1*exp(-t) + C2*exp(3*t))]
assert dsolve(eq12) == sol12
assert checksysodesol(eq12, sol12) == (True, [0, 0])
eq13 = [Eq(x(t).diff(t), 4*x(t) + y(t)), Eq(y(t).diff(t), -x(t) + 2*y(t))]
sol13 = [Eq(x(t), (C1 + C2*t + C2)*exp(3*t)), Eq(y(t), (-C1 - C2*t)*exp(3*t))]
assert dsolve(eq13) == sol13
assert checksysodesol(eq13, sol13) == (True, [0, 0])
eq14 = [Eq(x(t).diff(t), a*y(t)), Eq(y(t).diff(t), a*x(t))]
sol14 = [Eq(x(t), -C1*exp(-a*t) + C2*exp(a*t)), Eq(y(t), C1*exp(-a*t) + C2*exp(a*t))]
assert dsolve(eq14) == sol14
assert checksysodesol(eq14, sol14) == (True, [0, 0])
eq15 = [Eq(x(t).diff(t), a*y(t)), Eq(y(t).diff(t), b*x(t))]
sol15 = [Eq(x(t), -C1*a*exp(-t*sqrt(a*b))/sqrt(a*b) + C2*a*exp(t*sqrt(a*b))/sqrt(a*b)),
Eq(y(t), C1*exp(-t*sqrt(a*b)) + C2*exp(t*sqrt(a*b)))]
assert dsolve(eq15) == sol15
assert checksysodesol(eq15, sol15) == (True, [0, 0])
eq16 = [Eq(x(t).diff(t), a*x(t) + b*y(t)), Eq(y(t).diff(t), c*x(t))]
sol16 = [Eq(x(t), -2*C1*b*exp(t*(a/2 - sqrt(a**2 + 4*b*c)/2))/(a + sqrt(a**2 + 4*b*c)) - 2*C2*b*exp(t*(a/2 + sqrt(a**2 + 4*b*c)/2))/(a - sqrt(a**2 + 4*b*c))),
Eq(y(t), C1*exp(t*(a/2 - sqrt(a**2 + 4*b*c)/2)) + C2*exp(t*(a/2 + sqrt(a**2 + 4*b*c)/2)))]
assert dsolve(eq16) == sol16
assert checksysodesol(eq16, sol16) == (True, [0, 0])
# Regression test case for issue #18562
# https://github.com/sympy/sympy/issues/18562
eq17 = [Eq(x(t).diff(t), x(t) + a*y(t)), Eq(y(t).diff(t), x(t)*a - y(t))]
sol17 = [Eq(x(t), -C1*a*exp(-t*sqrt(a**2 + 1))/(sqrt(a**2 + 1) + 1) + C2*a*exp(t*sqrt(a**2 + 1))/(sqrt(a**2 + 1) - 1)),
Eq(y(t), C1*exp(-t*sqrt(a**2 + 1)) + C2*exp(t*sqrt(a**2 + 1)))]
assert dsolve(eq17) == sol17
assert checksysodesol(eq17, sol17) == (True, [0, 0])
eq18 = [Eq(x(t).diff(t), 0), Eq(y(t).diff(t), 0)]
sol18 = [Eq(x(t), C1), Eq(y(t), C2)]
assert dsolve(eq18) == sol18
assert checksysodesol(eq18, sol18) == (True, [0, 0])
eq19 = [Eq(x(t).diff(t), 2*x(t) - y(t)), Eq(y(t).diff(t), x(t))]
sol19 = [Eq(x(t), (C1 + C2*t + C2)*exp(t)), Eq(y(t), (C1 + C2*t)*exp(t))]
assert dsolve(eq19) == sol19
assert checksysodesol(eq19, sol19) == (True, [0, 0])
eq20 = [Eq(x(t).diff(t), x(t)), Eq(y(t).diff(t), x(t) + y(t))]
sol20 = [Eq(x(t), C2*exp(t)), Eq(y(t), (C1 + C2*t)*exp(t))]
assert dsolve(eq20) == sol20
assert checksysodesol(eq20, sol20) == (True, [0, 0])
eq21 = [Eq(x(t).diff(t), 3*x(t)), Eq(y(t).diff(t), x(t) + y(t))]
sol21 = [Eq(x(t), 2*C2*exp(3*t)), Eq(y(t), C1*exp(t) + C2*exp(3*t))]
assert dsolve(eq21) == sol21
assert checksysodesol(eq21, sol21) == (True, [0, 0])
eq22 = [Eq(x(t).diff(t), 3*x(t)), Eq(y(t).diff(t), y(t))]
sol22 = [Eq(x(t), C2*exp(3*t)), Eq(y(t), C1*exp(t))]
assert dsolve(eq22) == sol22
assert checksysodesol(eq22, sol22) == (True, [0, 0])
Z0 = Function('Z0')
Z1 = Function('Z1')
Z2 = Function('Z2')
Z3 = Function('Z3')
k01, k10, k20, k21, k23, k30 = symbols('k01 k10 k20 k21 k23 k30')
eq1 = (Eq(Derivative(Z0(t), t), -k01*Z0(t) + k10*Z1(t) + k20*Z2(t) + k30*Z3(t)), Eq(Derivative(Z1(t), t),
k01*Z0(t) - k10*Z1(t) + k21*Z2(t)), Eq(Derivative(Z2(t), t), -(k20 + k21 + k23)*Z2(t)), Eq(Derivative(Z3(t),
t), k23*Z2(t) - k30*Z3(t)))
sol1 = [
Eq(Z0(t), C1*k10/k01 + C2*(-k10 + k30)*exp(-k30*t)/(k01 + k10 - k30)
- C3*exp(t*(-k01 - k10)) + C4*(-k10*k20 - k10*k21 + k10*k30
+ k20**2 + k20*k21 + k20*k23 - k20*k30 - k23*k30)*exp(t*(-k20 - k21
- k23))/(k23*(-k01 - k10 + k20 + k21 + k23))),
Eq(Z1(t), C1 - C2*k01*exp(-k30*t)/(k01 + k10 - k30) + C3*exp(t*(-k01 -
k10)) + C4*(-k01*k20 - k01*k21 + k01*k30 + k20*k21 + k21**2
+ k21*k23 - k21*k30)*exp(t*(-k20 - k21 - k23))/(k23*(-k01 - k10
+ k20 + k21 + k23))),
Eq(Z2(t), C4*(-k20 - k21 - k23 + k30)*exp(t*(-k20 - k21 - k23))/k23),
Eq(Z3(t), C2*exp(-k30*t) + C4*exp(t*(-k20 - k21 - k23)))
]
sol1 = [
Eq(Z0(t), C1*k10/k01 + C2*(-k10 + k30)*exp(-k30*t)/(k01 + k10 - k30)
- C3*exp(t*(-k01 - k10)) + C4*(k10*k20 + k10*k21 - k10*k30
- k20**2 - k20*k21 - k20*k23 + k20*k30 + k23*k30)*exp(t*(-k20 - k21
- k23))/(k23*(k01 + k10 - k20 - k21 - k23))),
Eq(Z1(t), C1 - C2*k01*exp(-k30*t)/(k01 + k10 - k30) + C3*exp(t*(-k01
- k10)) + C4*(k01*k20 + k01*k21 - k01*k30 - k20*k21 - k21**2
- k21*k23 + k21*k30)*exp(t*(-k20 - k21 - k23))/(k23*(k01 + k10
- k20 - k21 - k23))),
Eq(Z2(t), C4*(-k20 - k21 - k23 + k30)*exp(t*(-k20 - k21 - k23))/k23),
Eq(Z3(t), C2*exp(-k30*t) + C4*exp(t*(-k20 - k21 - k23)))
]
assert dsolve(eq1, simplify=False) == sol1
assert checksysodesol(eq1, sol1) == (True, [0, 0, 0, 0])
x, y, z = symbols('x y z', cls=Function)
k2, k3 = symbols('k2 k3')
eq2 = (
Eq(Derivative(z(t), t), k2 * y(t)),
Eq(Derivative(x(t), t), k3 * y(t)),
Eq(Derivative(y(t), t), (-k2 - k3) * y(t))
)
sol2 = {Eq(z(t), C1 - C3 * k2 * exp(t * (-k2 - k3)) / (k2 + k3)),
Eq(x(t), C2 - C3 * k3 * exp(t * (-k2 - k3)) / (k2 + k3)),
Eq(y(t), C3 * exp(t * (-k2 - k3)))}
assert set(dsolve(eq2)) == sol2
assert checksysodesol(eq2, sol2) == (True, [0, 0, 0])
u, v, w = symbols('u v w', cls=Function)
eq3 = [4 * u(t) - v(t) - 2 * w(t) + Derivative(u(t), t),
2 * u(t) + v(t) - 2 * w(t) + Derivative(v(t), t),
5 * u(t) + v(t) - 3 * w(t) + Derivative(w(t), t)]
sol3 = [Eq(u(t), C1*exp(-2*t) + C2*cos(sqrt(3)*t)/2 - C3*sin(sqrt(3)*t)/2 + sqrt(3)*(C2*sin(sqrt(3)*t)
+ C3*cos(sqrt(3)*t))/6), Eq(v(t), C2*cos(sqrt(3)*t)/2 - C3*sin(sqrt(3)*t)/2 + sqrt(3)*(C2*sin(sqrt(3)*t)
+ C3*cos(sqrt(3)*t))/6), Eq(w(t), C1*exp(-2*t) + C2*cos(sqrt(3)*t) - C3*sin(sqrt(3)*t))]
assert dsolve(eq3) == sol3
assert checksysodesol(eq3, sol3) == (True, [0, 0, 0])
tw = Rational(2, 9)
eq4 = [Eq(x(t).diff(t), 2 * x(t) + y(t) - tw * 4 * z(t) - tw * w(t)),
Eq(y(t).diff(t), 2 * y(t) + 8 * tw * z(t) + 2 * tw * w(t)),
Eq(z(t).diff(t), Rational(37, 9) * z(t) - tw * w(t)), Eq(w(t).diff(t), 22 * tw * w(t) - 2 * tw * z(t))]
sol4 = [Eq(x(t), (C1 + C2*t)*exp(2*t)),
Eq(y(t), C2*exp(2*t) + 2*C3*exp(4*t)),
Eq(z(t), 2*C3*exp(4*t) - C4*exp(5*t)/4),
Eq(w(t), C3*exp(4*t) + C4*exp(5*t))]
assert dsolve(eq4) == sol4
assert checksysodesol(eq4, sol4) == (True, [0, 0, 0, 0])
# Regression test case for issue #15574
# https://github.com/sympy/sympy/issues/15574
eq5 = [Eq(x(t).diff(t), x(t)), Eq(y(t).diff(t), y(t)), Eq(z(t).diff(t), z(t)), Eq(w(t).diff(t), w(t))]
sol5 = [Eq(x(t), C1*exp(t)), Eq(y(t), C2*exp(t)), Eq(z(t), C3*exp(t)), Eq(w(t), C4*exp(t))]
assert dsolve(eq5) == sol5
assert checksysodesol(eq5, sol5) == (True, [0, 0, 0, 0])
eq6 = [Eq(x(t).diff(t), x(t) + y(t)), Eq(y(t).diff(t), y(t) + z(t)),
Eq(z(t).diff(t), z(t) + Rational(-1, 8) * w(t)),
Eq(w(t).diff(t), Rational(1, 2) * (w(t) + z(t)))]
sol6 = [Eq(x(t), (C3 + C4*t)*exp(t) + (4*C1 + 4*C2*t + 48*C2)*exp(3*t/4)),
Eq(y(t), C4*exp(t) + (-C1 - C2*t - 8*C2)*exp(3*t/4)),
Eq(z(t), (C1/4 + C2*t/4 + C2)*exp(3*t/4)),
Eq(w(t), (C1/2 + C2*t/2)*exp(3*t/4))]
assert dsolve(eq6) == sol6
assert checksysodesol(eq6, sol6) == (True, [0, 0, 0, 0])
# Regression test case for issue #15574
# https://github.com/sympy/sympy/issues/15574
eq7 = [Eq(x(t).diff(t), x(t)), Eq(y(t).diff(t), y(t)), Eq(z(t).diff(t), z(t)),
Eq(w(t).diff(t), w(t)), Eq(u(t).diff(t), u(t))]
sol7 = [Eq(x(t), C1*exp(t)), Eq(y(t), C2*exp(t)), Eq(z(t), C3*exp(t)), Eq(w(t), C4*exp(t)),
Eq(u(t), C5*exp(t))]
assert dsolve(eq7) == sol7
assert checksysodesol(eq7, sol7) == (True, [0, 0, 0, 0, 0])
eq8 = [Eq(x(t).diff(t), 2 * x(t) + y(t)), Eq(y(t).diff(t), 2 * y(t)),
Eq(z(t).diff(t), 4 * z(t)), Eq(w(t).diff(t), 5 * w(t) + u(t)),
Eq(u(t).diff(t), 5 * u(t))]
sol8 = [Eq(x(t), (C1 + C2*t)*exp(2*t)), Eq(y(t), C2*exp(2*t)), Eq(z(t), C3*exp(4*t)), Eq(w(t), (C4 + C5*t)*exp(5*t)),
Eq(u(t), C5*exp(5*t))]
assert dsolve(eq8) == sol8
assert checksysodesol(eq8, sol8) == (True, [0, 0, 0, 0, 0])
# Regression test case for issue #15574
# https://github.com/sympy/sympy/issues/15574
eq9 = [Eq(x(t).diff(t), x(t)), Eq(y(t).diff(t), y(t)), Eq(z(t).diff(t), z(t))]
sol9 = [Eq(x(t), C1*exp(t)), Eq(y(t), C2*exp(t)), Eq(z(t), C3*exp(t))]
assert dsolve(eq9) == sol9
assert checksysodesol(eq9, sol9) == (True, [0, 0, 0])
# Regression test case for issue #15407
# https://github.com/sympy/sympy/issues/15407
a_b, a_c = symbols('a_b a_c', real=True)
eq10 = [Eq(x(t).diff(t), (-a_b - a_c)*x(t)), Eq(y(t).diff(t), a_b*y(t)), Eq(z(t).diff(t), a_c*x(t))]
sol10 = [Eq(x(t), -C3*(a_b + a_c)*exp(t*(-a_b - a_c))/a_c), Eq(y(t), C2*exp(a_b*t)),
Eq(z(t), C1 + C3*exp(t*(-a_b - a_c)))]
assert dsolve(eq10) == sol10
assert checksysodesol(eq10, sol10) == (True, [0, 0, 0])
# Regression test case for issue #14312
# https://github.com/sympy/sympy/issues/14312
eq11 = (Eq(Derivative(x(t),t), k3*y(t)), Eq(Derivative(y(t),t), -(k3+k2)*y(t)), Eq(Derivative(z(t),t), k2*y(t)))
sol11 = [Eq(x(t), C1 + C3*k3*exp(t*(-k2 - k3))/k2), Eq(y(t), -C3*(k2 + k3)*exp(t*(-k2 - k3))/k2),
Eq(z(t), C2 + C3*exp(t*(-k2 - k3)))]
assert dsolve(eq11) == sol11
assert checksysodesol(eq11, sol11) == (True, [0, 0, 0])
# Regression test case for issue #14312
# https://github.com/sympy/sympy/issues/14312
eq12 = (Eq(Derivative(z(t),t), k2*y(t)), Eq(Derivative(x(t),t), k3*y(t)), Eq(Derivative(y(t),t), -(k3+k2)*y(t)))
sol12 = [Eq(z(t), C1 - C3*k2*exp(t*(-k2 - k3))/(k2 + k3)), Eq(x(t), C2 - C3*k3*exp(t*(-k2 - k3))/(k2 + k3)),
Eq(y(t), C3*exp(t*(-k2 - k3)))]
assert dsolve(eq12) == sol12
assert checksysodesol(eq12, sol12) == (True, [0, 0, 0])
# Regression test case for issue #15474
# https://github.com/sympy/sympy/issues/15474
eq13 = [Eq(diff(f(t), t), 2 * f(t) + g(t)),
Eq(diff(g(t), t), a * f(t))]
sol13 = [Eq(f(t), -C1*exp(t*(1 - sqrt(a + 1)))/(sqrt(a + 1) + 1) + C2*exp(t*(sqrt(a + 1) + 1))/(sqrt(a + 1) - 1)),
Eq(g(t), C1*exp(t*(1 - sqrt(a + 1))) + C2*exp(t*(sqrt(a + 1) + 1)))]
assert dsolve(eq13) == sol13
assert checksysodesol(eq13, sol13) == (True, [0, 0])
eq14 = [Eq(f(t).diff(t), 2 * g(t) - 3 * h(t)),
Eq(g(t).diff(t), 4 * h(t) - 2 * f(t)),
Eq(h(t).diff(t), 3 * f(t) - 4 * g(t))]
sol14 = [Eq(f(t), 2*C1 - 8*C2*cos(sqrt(29)*t)/25 + 8*C3*sin(sqrt(29)*t)/25 - 3*sqrt(29)*(C2*sin(sqrt(29)*t)
+ C3*cos(sqrt(29)*t))/25), Eq(g(t), 3*C1/2 - 6*C2*cos(sqrt(29)*t)/25 + 6*C3*sin(sqrt(29)*t)/25
+ 4*sqrt(29)*(C2*sin(sqrt(29)*t) + C3*cos(sqrt(29)*t))/25), Eq(h(t), C1 + C2*cos(sqrt(29)*t)
- C3*sin(sqrt(29)*t))]
assert dsolve(eq14) == sol14
assert checksysodesol(eq14, sol14) == (True, [0, 0, 0])
eq15 = [Eq(2 * f(t).diff(t), 3 * 4 * (g(t) - h(t))),
Eq(3 * g(t).diff(t), 2 * 4 * (h(t) - f(t))),
Eq(4 * h(t).diff(t), 2 * 3 * (f(t) - g(t)))]
sol15 = [Eq(f(t), C1 - 16*C2*cos(sqrt(29)*t)/13 + 16*C3*sin(sqrt(29)*t)/13 - 6*sqrt(29)*(C2*sin(sqrt(29)*t)
+ C3*cos(sqrt(29)*t))/13), Eq(g(t), C1 - 16*C2*cos(sqrt(29)*t)/13 + 16*C3*sin(sqrt(29)*t)/13
+ 8*sqrt(29)*(C2*sin(sqrt(29)*t) + C3*cos(sqrt(29)*t))/39), Eq(h(t), C1 + C2*cos(sqrt(29)*t) - C3*sin(sqrt(29)*t))]
assert dsolve(eq15) == sol15
assert checksysodesol(eq15, sol15) == (True, [0, 0, 0])
eq16 = (Eq(diff(x(t), t), 21 * x(t)), Eq(diff(y(t), t), 17 * x(t) + 3 * y(t)),
Eq(diff(z(t), t), 5 * x(t) + 7 * y(t) + 9 * z(t)))
sol16 = [Eq(x(t), 216*C3*exp(21*t)/209), Eq(y(t), -6*C1*exp(3*t)/7 + 204*C3*exp(21*t)/209),
Eq(z(t), C1*exp(3*t) + C2*exp(9*t) + C3*exp(21*t))]
assert dsolve(eq16) == sol16
assert checksysodesol(eq16, sol16) == (True, [0, 0, 0])
eq17 = (Eq(diff(x(t),t),3*y(t)-11*z(t)),Eq(diff(y(t),t),7*z(t)-3*x(t)),Eq(diff(z(t),t),11*x(t)-7*y(t)))
sol17 = [Eq(x(t), 7*C1/3 - 21*C2*cos(sqrt(179)*t)/170 + 21*C3*sin(sqrt(179)*t)/170 - 11*sqrt(179)*(C2*sin(sqrt(179)*t)
+ C3*cos(sqrt(179)*t))/170), Eq(y(t), 11*C1/3 - 33*C2*cos(sqrt(179)*t)/170 + 33*C3*sin(sqrt(179)*t)/170
+ 7*sqrt(179)*(C2*sin(sqrt(179)*t) + C3*cos(sqrt(179)*t))/170), Eq(z(t), C1 + C2*cos(sqrt(179)*t)
- C3*sin(sqrt(179)*t))]
assert dsolve(eq17) == sol17
assert checksysodesol(eq17, sol17) == (True, [0, 0, 0])
eq18 = (Eq(3*diff(x(t),t),4*5*(y(t)-z(t))),Eq(4*diff(y(t),t),3*5*(z(t)-x(t))),Eq(5*diff(z(t),t),3*4*(x(t)-y(t))))
sol18 = [Eq(x(t), C1 - C2*cos(5*sqrt(2)*t) + C3*sin(5*sqrt(2)*t) - 4*sqrt(2)*(C2*sin(5*sqrt(2)*t) + C3*cos(5*sqrt(2)*t))/3),
Eq(y(t), C1 - C2*cos(5*sqrt(2)*t) + C3*sin(5*sqrt(2)*t) + 3*sqrt(2)*(C2*sin(5*sqrt(2)*t) + C3*cos(5*sqrt(2)*t))/4),
Eq(z(t), C1 + C2*cos(5*sqrt(2)*t) - C3*sin(5*sqrt(2)*t))]
assert dsolve(eq18) == sol18
assert checksysodesol(eq18, sol18) == (True, [0, 0, 0])
eq19 = (Eq(diff(x(t),t),4*x(t) - z(t)),Eq(diff(y(t),t),2*x(t)+2*y(t)-z(t)),Eq(diff(z(t),t),3*x(t)+y(t)))
sol19 = [Eq(x(t), (C1 + C2*t + 2*C2 + C3*t**2/2 + 2*C3*t + C3)*exp(2*t)),
Eq(y(t), (C1 + C2*t + 2*C2 + C3*t**2/2 + 2*C3*t)*exp(2*t)),
Eq(z(t), (2*C1 + 2*C2*t + 3*C2 + C3*t**2 + 3*C3*t)*exp(2*t))]
assert dsolve(eq19) == sol19
assert checksysodesol(eq19, sol19) == (True, [0, 0, 0])
eq20 = (Eq(diff(x(t),t),4*x(t) - y(t) - 2*z(t)),Eq(diff(y(t),t),2*x(t) + y(t)- 2*z(t)),Eq(diff(z(t),t),5*x(t)-3*z(t)))
sol20 = [Eq(x(t), C1*exp(2*t) - C2*sin(t)/5 + 3*C2*cos(t)/5 - 3*C3*sin(t)/5 - C3*cos(t)/5),
Eq(y(t), -C2*sin(t)/5 + 3*C2*cos(t)/5 - 3*C3*sin(t)/5 - C3*cos(t)/5),
Eq(z(t), C1*exp(2*t) + C2*cos(t) - C3*sin(t))]
assert dsolve(eq20) == sol20
assert checksysodesol(eq20, sol20) == (True, [0, 0, 0])
eq21 = (Eq(diff(x(t),t), 9*y(t)), Eq(diff(y(t),t), 12*x(t)))
sol21 = [Eq(x(t), -sqrt(3)*C1*exp(-6*sqrt(3)*t)/2 + sqrt(3)*C2*exp(6*sqrt(3)*t)/2),
Eq(y(t), C1*exp(-6*sqrt(3)*t) + C2*exp(6*sqrt(3)*t))]
assert dsolve(eq21) == sol21
assert checksysodesol(eq21, sol21) == (True, [0, 0])
eq22 = (Eq(diff(x(t),t), 2*x(t) + 4*y(t)), Eq(diff(y(t),t), 12*x(t) + 41*y(t)))
sol22 = [Eq(x(t), C1*(-sqrt(1713)/24 + Rational(-13, 8))*exp(t*(Rational(43, 2) - sqrt(1713)/2)) \
+ C2*(Rational(-13, 8) + sqrt(1713)/24)*exp(t*(sqrt(1713)/2 + Rational(43, 2)))),
Eq(y(t), C1*exp(t*(Rational(43, 2) - sqrt(1713)/2)) + C2*exp(t*(sqrt(1713)/2 + Rational(43, 2))))]
assert dsolve(eq22) == sol22
assert checksysodesol(eq22, sol22) == (True, [0, 0])
eq23 = (Eq(diff(x(t),t), x(t) + y(t)), Eq(diff(y(t),t), -2*x(t) + 2*y(t)))
sol23 = [Eq(x(t), (C1*cos(sqrt(7)*t/2)/4 - C2*sin(sqrt(7)*t/2)/4 + sqrt(7)*(C1*sin(sqrt(7)*t/2)
+ C2*cos(sqrt(7)*t/2))/4)*exp(3*t/2)),
Eq(y(t), (C1*cos(sqrt(7)*t/2) - C2*sin(sqrt(7)*t/2))*exp(3*t/2))]
assert dsolve(eq23) == sol23
assert checksysodesol(eq23, sol23) == (True, [0, 0])
# Regression test case for issue #15474
# https://github.com/sympy/sympy/issues/15474
a = Symbol("a", real=True)
eq24 = [x(t).diff(t) - a*y(t), y(t).diff(t) + a*x(t)]
sol24 = [Eq(x(t), C1*sin(a*t) + C2*cos(a*t)), Eq(y(t), C1*cos(a*t) - C2*sin(a*t))]
assert dsolve(eq24) == sol24
assert checksysodesol(eq24, sol24) == (True, [0, 0])
# Regression test case for issue #19150
# https://github.com/sympy/sympy/issues/19150
eq25 = [Eq(Derivative(f(t), t), 0),
Eq(Derivative(g(t), t), 1/(c*b)* ( -2*g(t)+x(t)+f(t) ) ),
Eq(Derivative(x(t), t), 1/(c*b)* ( -2*x(t)+g(t)+y(t) ) ),
Eq(Derivative(y(t), t), 1/(c*b)* ( -2*y(t)+x(t)+h(t) ) ),
Eq(Derivative(h(t), t), 0)]
sol25 = [Eq(f(t), 4*C1 - 3*C2),
Eq(g(t), 3*C1 - 2*C2 - C3*exp(-2*t/(b*c)) + C4*exp(t*(-2 - sqrt(2))/(b*c)) + C5*exp(t*(-2 + sqrt(2))/(b*c))),
Eq(x(t), 2*C1 - C2 - sqrt(2)*C4*exp(t*(-2 - sqrt(2))/(b*c)) + sqrt(2)*C5*exp(t*(-2 + sqrt(2))/(b*c))),
Eq(y(t), C1 + C3*exp(-2*t/(b*c)) + C4*exp(t*(-2 - sqrt(2))/(b*c)) + C5*exp(t*(-2 + sqrt(2))/(b*c))),
Eq(h(t), C2)]
assert dsolve(eq25) == sol25
assert checksysodesol(eq25, sol25) == (True, [0, 0, 0, 0, 0])
eq26 = [Eq(diff(f(t), t), 2*f(t)), Eq(diff(g(t), t), 3*f(t) + 7*g(t))]
sol26 = [Eq(f(t), -5*C1*exp(2*t)/3), Eq(g(t), C1*exp(2*t) + C2*exp(7*t))]
assert dsolve(eq26) == sol26
assert checksysodesol(eq26, sol26) == (True, [0, 0])
eq27 = [Eq(diff(f(t), t), -9*I*f(t) - 4*g(t)), Eq(diff(g(t), t), -4*I*g(t))]
sol27 = [Eq(f(t), C1*exp(-9*I*t) + 4*I*C2*exp(-4*I*t)/5), Eq(g(t), C2*exp(-4*I*t))]
assert dsolve(eq27) == sol27
assert checksysodesol(eq27, sol27) == (True, [0, 0])
eq28 = [Eq(diff(f(t), t), -9*I*f(t)), Eq(diff(g(t), t), -4*I*g(t))]
sol28 = [Eq(f(t), C1*exp(-9*I*t)), Eq(g(t), C2*exp(-4*I*t))]
assert dsolve(eq28) == sol28
assert checksysodesol(eq28, sol28) == (True, [0, 0])
eq29 = [Eq(Derivative(f(t), t), 0), Eq(Derivative(g(t), t), 0)]
sol29 = [Eq(f(t), C1), Eq(g(t), C2)]
assert dsolve(eq29) == sol29
assert checksysodesol(eq29, sol29) == (True, [0, 0])
eq30 = [Eq(Derivative(f(t), t), f(t)), Eq(Derivative(g(t), t), 0)]
sol30 = [Eq(f(t), C2 * exp(t)), Eq(g(t), C1)]
assert dsolve(eq30) == sol30
assert checksysodesol(eq30, sol30) == (True, [0, 0])
eq31 = [Eq(Derivative(f(t), t), g(t)), Eq(Derivative(g(t), t), 0)]
sol31 = [Eq(f(t), C1 + C2 * t), Eq(g(t), C2)]
assert dsolve(eq31) == sol31
assert checksysodesol(eq31, sol31) == (True, [0, 0])
eq32 = [Eq(Derivative(f(t), t), 0), Eq(Derivative(g(t), t), f(t))]
sol32 = [Eq(f(t), C2), Eq(g(t), C1 + C2 * t)]
assert dsolve(eq32) == sol32
assert checksysodesol(eq32, sol32) == (True, [0, 0])
eq33 = [Eq(Derivative(f(t), t), 0), Eq(Derivative(g(t), t), g(t))]
sol33 = [Eq(f(t), C1), Eq(g(t), C2 * exp(t))]
assert dsolve(eq33) == sol33
assert checksysodesol(eq33, sol33) == (True, [0, 0])
eq34 = [Eq(Derivative(f(t), t), f(t)), Eq(Derivative(g(t), t), I * g(t))]
sol34 = [Eq(f(t), C1 * exp(t)), Eq(g(t), C2 * exp(I * t))]
assert dsolve(eq34) == sol34
assert checksysodesol(eq34, sol34) == (True, [0, 0])
eq35 = [Eq(Derivative(f(t), t), I * f(t)), Eq(Derivative(g(t), t), -I * g(t))]
sol35 = [Eq(f(t), C2 * exp(I * t)), Eq(g(t), C1 * exp(-I * t))]
assert dsolve(eq35) == sol35
assert checksysodesol(eq35, sol35) == (True, [0, 0])
eq36 = [Eq(Derivative(f(t), t), I * g(t)), Eq(Derivative(g(t), t), 0)]
sol36 = [Eq(f(t), I * (C1 + C2 * t)), Eq(g(t), C2)]
assert dsolve(eq36) == sol36
assert checksysodesol(eq36, sol36) == (True, [0, 0])
eq37 = [Eq(Derivative(f(t), t), I * g(t)), Eq(Derivative(g(t), t), I * f(t))]
sol37 = [Eq(f(t), -C1 * exp(-I * t) + C2 * exp(I * t)), Eq(g(t), C1 * exp(-I * t) + C2 * exp(I * t))]
assert dsolve(eq37) == sol37
assert checksysodesol(eq37, sol37) == (True, [0, 0])
def test_sysode_linear_neq_order1_type2():
f, g, h, k = symbols('f g h k', cls=Function)
x, t, a, b, c, d = symbols('x t a b c d')
eq1 = [Eq(diff(f(x), x), f(x) + g(x) + 5),
Eq(diff(g(x), x), -f(x) - g(x) + 7)]
sol1 = [Eq(f(x), C1 + C2*x + C2 + x*Integral(12, x) + Integral(12, x) + Integral(-12*x - 7, x)), Eq(g(x), -C1 -
C2*x - x*Integral(12, x) - Integral(-12*x - 7, x))]
assert dsolve(eq1) == sol1
assert checksysodesol(eq1, sol1) == (True, [0, 0])
eq2 = [Eq(diff(f(x), x), f(x) + g(x) + 5),
Eq(diff(g(x), x), f(x) + g(x) + 7)]
sol2 = [Eq(f(x), -C1 + C2*exp(2*x) + exp(2*x)*Integral(6*exp(-2*x), x) - Integral(1, x)), Eq(g(x), C1 + C2*exp(2*x)
+ exp(2*x)*Integral(6*exp(-2*x), x) + Integral(1, x))]
assert dsolve(eq2) == sol2
assert checksysodesol(eq2, sol2) == (True, [0, 0])
eq3 = [Eq(diff(f(x), x), f(x) + 5), Eq(diff(g(x), x), f(x) + 7)]
sol3 = [Eq(f(x), C2*exp(x) + exp(x)*Integral(5*exp(-x), x)), Eq(g(x), C1 + C2*exp(x) + exp(x)*Integral(5*exp(-x), x)
+ Integral(2, x))]
assert dsolve(eq3) == sol3
assert checksysodesol(eq3, sol3) == (True, [0, 0])
eq4 = [Eq(diff(f(x), x), f(x) + exp(x)), Eq(diff(g(x), x), f(x) + g(x) + x*exp(x))]
sol4 = [Eq(f(x), (C2 + Integral(1, x))*exp(x)), Eq(g(x), (C1 + C2*x + x*Integral(1, x) + Integral(0, x))*exp(x))]
assert dsolve(eq4) == sol4
assert checksysodesol(eq4, sol4) == (True, [0, 0])
eq5 = [Eq(diff(f(x), x), f(x) + g(x) + 5*x), Eq(diff(g(x), x), f(x) - g(x))]
sol5 = [Eq(f(x), C2*exp(sqrt(2)*x) + sqrt(2)*C2*exp(sqrt(2)*x) + (-sqrt(2)*C1
+ C1 - sqrt(2)*Integral(5*sqrt(2)*x*exp(sqrt(2)*x)/(-4 + 2*sqrt(2)) -
5*x*exp(sqrt(2)*x)/(-4 + 2*sqrt(2)), x) +
Integral(5*sqrt(2)*x*exp(sqrt(2)*x)/(-4 + 2*sqrt(2)) -
5*x*exp(sqrt(2)*x)/(-4 + 2*sqrt(2)), x))*exp(-sqrt(2)*x) +
exp(sqrt(2)*x)*Integral(5*sqrt(2)*x*exp(-sqrt(2)*x)/4, x) +
sqrt(2)*exp(sqrt(2)*x)*Integral(5*sqrt(2)*x*exp(-sqrt(2)*x)/4, x)),
Eq(g(x), C2*exp(sqrt(2)*x) + (C1 +
Integral(5*sqrt(2)*x*exp(sqrt(2)*x)/(-4 + 2*sqrt(2)) -
5*x*exp(sqrt(2)*x)/(-4 + 2*sqrt(2)), x))*exp(-sqrt(2)*x) +
exp(sqrt(2)*x)*Integral(5*sqrt(2)*x*exp(-sqrt(2)*x)/4, x))]
with dotprodsimp(True):
assert dsolve(eq5) == sol5
assert checksysodesol(eq5, sol5) == (True, [0, 0])
eq6 = [Eq(diff(f(x), x), -9*f(x) - 4*g(x)),
Eq(diff(g(x), x), -4*g(x)),
Eq(diff(h(x), x), h(x) + exp(x))]
sol6 = [Eq(f(x), (C1 + Integral(0, x))*exp(-9*x) + (-4*C2/5 - 4*Integral(0,
x)/5)*exp(-4*x)), Eq(g(x), (C2 + Integral(0, x))*exp(-4*x)), Eq(h(x),
(C3 + Integral(1, x))*exp(x))]
assert dsolve(eq6) == sol6
assert checksysodesol(eq6, sol6) == (True, [0, 0, 0])
# Regression test case for issue #8859
# https://github.com/sympy/sympy/issues/8859
eq7 = [Eq(diff(f(t),t), f(t) + 3*t), Eq(diff(g(t),t), g(t))]
sol7 = [Eq(f(t), C1*exp(t) + exp(t)*Integral(3*t*exp(-t), t)), Eq(g(t),
C2*exp(t) + exp(t)*Integral(0, t))]
assert dsolve(eq7) == sol7
assert checksysodesol(eq7, sol7) == (True, [0, 0])
# Regression test case for issue #8567
# https://github.com/sympy/sympy/issues/8567
eq8 = [Eq(f(t).diff(t), f(t) + 2*g(t)), Eq(g(t).diff(t), -2*f(t) + g(t) + 2*exp(t))]
sol8 = [
Eq(f(t),
(C1*sin(2*t) + C2*cos(2*t)
+ sin(2*t)*Integral(-2*sin(2*t)**2/cos(2*t) + 2/cos(2*t), t)
+ cos(2*t)*Integral(-2*sin(2*t), t))*exp(t)),
Eq(g(t),
(C1*cos(2*t) - C2*sin(2*t)
- sin(2*t)*Integral(-2*sin(2*t), t)
+ cos(2*t)*Integral(-2*sin(2*t)**2/cos(2*t) + 2/cos(2*t), t))*exp(t))
]
with dotprodsimp(True):
assert dsolve(eq8) == sol8
assert checksysodesol(eq8, sol8) == (True, [0, 0])
# Regression test case for issue #19150
# https://github.com/sympy/sympy/issues/19150
eq9 = [Eq(Derivative(f(t), t), 1 / (a * b) * (-2 * f(t) + g(t) + c)),
Eq(Derivative(g(t), t), 1 / (a * b) * (-2 * g(t) + f(t) + h(t))),
Eq(Derivative(h(t), t), 1 / (a * b) * (-2 * h(t) + g(t) + d))]
sol9 = [Eq(f(t), (-C1 + C2*exp(-sqrt(2)*t/(a*b)) + C3*exp(sqrt(2)*t/(a*b)) +
exp(sqrt(2)*t/(a*b))*Integral(c*exp(-sqrt(2)*t/(a*b) +
2*t/(a*b))/(4*a*b) + d*exp(-sqrt(2)*t/(a*b) + 2*t/(a*b))/(4*a*b), t) -
Integral(-c*exp(2*t/(a*b))/(2*a*b) + d*exp(2*t/(a*b))/(2*a*b), t) +
exp(-sqrt(2)*t/(a*b))*Integral(c*exp(sqrt(2)*t/(a*b) +
2*t/(a*b))/(4*a*b) + d*exp(sqrt(2)*t/(a*b) + 2*t/(a*b))/(4*a*b),
t))*exp(-2*t/(a*b))), Eq(g(t), (-sqrt(2)*C2*exp(-sqrt(2)*t/(a*b)) +
sqrt(2)*C3*exp(sqrt(2)*t/(a*b)) +
sqrt(2)*exp(sqrt(2)*t/(a*b))*Integral(c*exp(-sqrt(2)*t/(a*b) +
2*t/(a*b))/(4*a*b) + d*exp(-sqrt(2)*t/(a*b) + 2*t/(a*b))/(4*a*b), t) -
sqrt(2)*exp(-sqrt(2)*t/(a*b))*Integral(c*exp(sqrt(2)*t/(a*b) +
2*t/(a*b))/(4*a*b) + d*exp(sqrt(2)*t/(a*b) + 2*t/(a*b))/(4*a*b),
t))*exp(-2*t/(a*b))), Eq(h(t), (C1 + C2*exp(-sqrt(2)*t/(a*b)) +
C3*exp(sqrt(2)*t/(a*b)) +
exp(sqrt(2)*t/(a*b))*Integral(c*exp(-sqrt(2)*t/(a*b) +
2*t/(a*b))/(4*a*b) + d*exp(-sqrt(2)*t/(a*b) + 2*t/(a*b))/(4*a*b), t) +
Integral(-c*exp(2*t/(a*b))/(2*a*b) + d*exp(2*t/(a*b))/(2*a*b), t) +
exp(-sqrt(2)*t/(a*b))*Integral(c*exp(sqrt(2)*t/(a*b) +
2*t/(a*b))/(4*a*b) + d*exp(sqrt(2)*t/(a*b) + 2*t/(a*b))/(4*a*b),
t))*exp(-2*t/(a*b)))]
assert dsolve(eq9) == sol9
assert checksysodesol(eq9, sol9) == (True, [0, 0, 0])
def test_sysode_linear_neq_order1_type3():
f, g, h, k = symbols('f g h k', cls=Function)
x = symbols('x')
r = symbols('r', real=True)
eqs1 = [Eq(diff(f(r), r), f(r) + r*g(r)),
Eq(diff(g(r), r),-r*f(r) + g(r))]
sol1 = [Eq(f(r), (C1*cos(r**2/2) + C2*sin(r**2/2))*exp(r)),
Eq(g(r), (-C1*sin(r**2/2) + C2*cos(r**2/2))*exp(r))]
assert dsolve(eqs1) == sol1
assert checksysodesol(eqs1, sol1) == (True, [0, 0])
eqs2 = [Eq(diff(f(x), x), x*f(x) + x**2*g(x)),
Eq(diff(g(x), x), 2*x**2*f(x) + (x + 3*x**2)*g(x))]
sol2 = [Eq(f(x), (6*sqrt(17)*C1/(-221 + 51*sqrt(17)) - 34*C1/(-221 + 51*sqrt(17)) - 13*C2/(-51 + 13*sqrt(17))
+ 3*sqrt(17)*C2/(-51 + 13*sqrt(17)))*exp(-sqrt(17)*x**3/6 + x**3/2 + x**2/2)
+ (45*sqrt(17)*C1/(-221 + 51*sqrt(17)) - 187*C1/(-221 + 51*sqrt(17)) - 3*sqrt(17)*C2/(-51 + 13*sqrt(17))
+ 13*C2/(-51 + 13*sqrt(17)))*exp(x**3/2 + sqrt(17)*x**3/6 + x**2/2)),
Eq(g(x), (102*C1/(-221 + 51*sqrt(17)) - 26*sqrt(17)*C1/(-221 + 51*sqrt(17))
+ 6*sqrt(17)*C2/(-221 + 51*sqrt(17)) - 34*C2/(-221 + 51*sqrt(17)))*exp(x**3/2
+ sqrt(17)*x**3/6 + x**2/2) + (26*sqrt(17)*C1/(-221 + 51*sqrt(17)) - 102*C1/(-221 + 51*sqrt(17))
+ 45*sqrt(17)*C2/(-221 + 51*sqrt(17)) - 187*C2/(-221 + 51*sqrt(17)))*exp(-sqrt(17)*x**3/6
+ x**3/2 + x**2/2))]
from sympy.core import Mul
sol2 = [
Eq(f(x),
- 2*sqrt(17)*C1*x**3*exp(x**3/2 + sqrt(17)*x**3/6 + x**2/2)/Mul(51, (-sqrt(17)*x**3/6 - x**3/2), evaluate=False)
+ 2*sqrt(17)*C1*x**3*exp(-sqrt(17)*x**3/6 + x**3/2 + x**2/2)/Mul(51, (-x**3/2 + sqrt(17)*x**3/6), evaluate=False)
+ 2*sqrt(17)*C2*x**6*exp(-sqrt(17)*x**3/6 + x**3/2 + x**2/2)/(153*(-x**3/2 + sqrt(17)*x**3/6)**2)
- C2*x**3*exp(-sqrt(17)*x**3/6 + x**3/2 + x**2/2)/Mul(3, (-x**3/2 + sqrt(17)*x**3/6), evaluate=False)
+ sqrt(17)*C2*exp(x**3/2 + sqrt(17)*x**3/6 + x**2/2)/17),
Eq(g(x),
+ 2*sqrt(17)*C1*exp(x**3/2 + sqrt(17)*x**3/6 + x**2/2)/17
- 2*sqrt(17)*C1*exp(-sqrt(17)*x**3/6 + x**3/2 + x**2/2)/17
+ 2*sqrt(17)*C2*x**3*exp(x**3/2 + sqrt(17)*x**3/6
+ x**2/2)/Mul(51, -x**3/2 + sqrt(17)*x**3/6, evaluate=False)
- 2*sqrt(17)*C2*x**3*exp(-sqrt(17)*x**3/6 + x**3/2
+ x**2/2)/Mul(51, -x**3/2 + sqrt(17)*x**3/6, evaluate=False)
+ C2*exp(-sqrt(17)*x**3/6 + x**3/2 + x**2/2))
]
assert dsolve(eqs2) == sol2
assert checksysodesol(eqs2, sol2) == (True, [0, 0])
eqs3 = [Eq(f(x).diff(x), x * f(x) + g(x)), Eq(g(x).diff(x), -f(x) + x * g(x))]
sol3 = [Eq(f(x), (C1/2 - I*C2/2)*exp(x**2/2 + I*x) + (C1/2 + I*C2/2)*exp(x**2/2 - I*x)),
Eq(g(x), (-I*C1/2 + C2/2)*exp(x**2/2 - I*x) + (I*C1/2 + C2/2)*exp(x**2/2 + I*x))]
assert dsolve(eqs3) == sol3
assert checksysodesol(eqs3, sol3) == (True, [0, 0])
eqs4 = [Eq(f(x).diff(x), x*(f(x) + g(x) + h(x))), Eq(g(x).diff(x), x*(f(x) + g(x) + h(x))), Eq(h(x).diff(x), x*(f(x) + g(x) + h(x)))]
sol4 = [Eq(f(x), 2*C1/3 - C2/3 - C3/3 + (C1/3 + C2/3 + C3/3)*exp(3*x**2/2)),
Eq(g(x), -C1/3 + 2*C2/3 - C3/3 + (C1/3 + C2/3 + C3/3)*exp(3*x**2/2)),
Eq(h(x), -C1/3 - C2/3 + 2*C3/3 + (C1/3 + C2/3 + C3/3)*exp(3*x**2/2))]
assert dsolve(eqs4) == sol4
assert checksysodesol(eqs4, sol4) == (True, [0, 0, 0])
eqs5 = [Eq(f(x).diff(x), x**2*(f(x) + g(x) + h(x))), Eq(g(x).diff(x), x**2*(f(x) + g(x) + h(x))),
Eq(h(x).diff(x), x**2*(f(x) + g(x) + h(x)))]
sol5 = [Eq(f(x), 2*C1/3 - C2/3 - C3/3 + (C1/3 + C2/3 + C3/3)*exp(x**3)),
Eq(g(x), -C1/3 + 2*C2/3 - C3/3 + (C1/3 + C2/3 + C3/3)*exp(x**3)),
Eq(h(x), -C1/3 - C2/3 + 2*C3/3 + (C1/3 + C2/3 + C3/3)*exp(x**3))]
assert dsolve(eqs5) == sol5
assert checksysodesol(eqs5, sol5) == (True, [0, 0, 0])
eqs6 = [Eq(Derivative(f(x), x), x*(f(x) + g(x) + h(x) + k(x))),
Eq(Derivative(g(x), x), x*(f(x) + g(x) + h(x) + k(x))),
Eq(Derivative(h(x), x), x*(f(x) + g(x) + h(x) + k(x))),
Eq(Derivative(k(x), x), x*(f(x) + g(x) + h(x) + k(x)))]
sol6 = [Eq(f(x), 3*C1/4 - C2/4 - C3/4 - C4/4 + (C1/4 + C2/4 + C3/4 + C4/4)*exp(2*x**2)),
Eq(g(x), -C1/4 + 3*C2/4 - C3/4 - C4/4 + (C1/4 + C2/4 + C3/4 + C4/4)*exp(2*x**2)),
Eq(h(x), -C1/4 - C2/4 + 3*C3/4 - C4/4 + (C1/4 + C2/4 + C3/4 + C4/4)*exp(2*x**2)),
Eq(k(x), -C1/4 - C2/4 - C3/4 + 3*C4/4 + (C1/4 + C2/4 + C3/4 + C4/4)*exp(2*x**2))]
assert dsolve(eqs6) == sol6
assert checksysodesol(eqs6, sol6) == (True, [0, 0, 0, 0])
y = symbols("y", real=True)
eqs7 = [Eq(Derivative(f(y), y), y*f(y) + g(y)), Eq(Derivative(g(y), y), y*g(y) - f(y))]
sol7 = [Eq(f(y), (C1*cos(y) + C2*sin(y))*exp(y**2/2)), Eq(g(y), (-C1*sin(y) + C2*cos(y))*exp(y**2/2))]
assert dsolve(eqs7) == sol7
assert checksysodesol(eqs7, sol7) == (True, [0, 0])
@slow
def test_linear_3eq_order1_type4_slow():
x, y, z = symbols('x, y, z', cls=Function)
t = Symbol('t')
f = t ** 3 + log(t)
g = t ** 2 + sin(t)
eq1 = (Eq(diff(x(t), t), (4 * f + g) * x(t) - f * y(t) - 2 * f * z(t)),
Eq(diff(y(t), t), 2 * f * x(t) + (f + g) * y(t) - 2 * f * z(t)), Eq(diff(z(t), t), 5 * f * x(t) + f * y(
t) + (-3 * f + g) * z(t)))
with dotprodsimp(True):
dsolve(eq1)
def test_linear_neq_order1_type2_big_test_cases():
i, r1, c1, r2, c2, t = symbols('i, r1, c1, r2, c2, t')
x1 = Function('x1')
x2 = Function('x2')
eq1 = r1*c1*Derivative(x1(t), t) + x1(t) - x2(t) - r1*i
eq2 = r2*c1*Derivative(x1(t), t) + r2*c2*Derivative(x2(t), t) + x2(t) - r2*i
eq = [eq1, eq2]
z1 = c1**2*r1**2 + 2*c1**2*r1*r2 + c1**2*r2**2 - 2*c1*c2*r1*r2 + 2*c1*c2*r2**2 + c2**2*r2**2
z2 = exp(-t/(2*c2*r2) - t/(2*c2*r1) - t/(2*c1*r1) + t*sqrt(z1)/(2*c1*c2*r1*r2))
z3 = exp(-t/(2*c2*r2) - t/(2*c2*r1) - t/(2*c1*r1) - t*sqrt(z1)/(2*c1*c2*r1*r2))
z4 = Integral(i*r2*exp(t/(2*c2*r2) + t/(2*c2*r1) + t/(2*c1*r1) - t*sqrt(z1)/(2*c1*c2*r1*r2))/sqrt(z1), t)
z5 = Integral(-i*r2*exp(t/(2*c2*r2) + t/(2*c2*r1) + t/(2*c1*r1) + t*sqrt(z1)/(2*c1*c2*r1*r2))/sqrt(z1), t)
sol = [
Eq(x1(t),
z2*(C2*r1/(2*r2) + C2/2 - C2*c2/(2*c1) + C2*sqrt(z1)/(2*c1*r2)
+ r1*z4/(2*r2) + z4/2 - c2*z4/(2*c1) + sqrt(z1)*z4/(2*c1*r2))
+ z3*(C1*r1/(2*r2) + C1/2 - C1*c2/(2*c1) - C1*sqrt(z1)/(2*c1*r2)
+ r1*z5/(2*r2) + z5/2 - c2*z5/(2*c1) - sqrt(z1)*z5/(2*c1*r2))),
Eq(x2(t), z2*(C2 + z4) + z3*(C1 + z5)),
]
with dotprodsimp(True):
assert dsolve(eq) == sol
assert checksysodesol(eq, sol) == (True, [0, 0])
def _de_lorentz_solution():
m = Symbol("m", real=True)
q = Symbol("q", real=True)
t = Symbol("t", real=True)
e1, e2, e3 = symbols("e1:4", real=True)
b1, b2, b3 = symbols("b1:4", real=True)
v1, v2, v3 = symbols("v1:4", cls=Function, real=True)
eqs = [
-e1 * q + m * Derivative(v1(t), t) - q * (-b2 * v3(t) + b3 * v2(t)),
-e2 * q + m * Derivative(v2(t), t) - q * (b1 * v3(t) - b3 * v1(t)),
-e3 * q + m * Derivative(v3(t), t) - q * (-b1 * v2(t) + b2 * v1(t))
]
# The code for the solution here is made using
# printsol from https://github.com/sympy/sympy/issues/19574
z1 = exp(2*q*t*sqrt(-b1**2 - b2**2 - b3**2)/m)
z2 = exp(q*t*sqrt(-b1**2 - b2**2 - b3**2)/m)
z3 = 1/(-b1**2*b3*z2 - b2**2*b3*z2)
z4 = sqrt(b1**2 + b2**2 + b3**2)
z5 = Integral(b1*b3*e1*q/(b1**2*m + b2**2*m + b3**2*m)
+ b2*b3*e2*q/(b1**2*m + b2**2*m + b3**2*m)
+ b3**2*e3*q/(b1**2*m + b2**2*m + b3**2*m), t)
z6 = 1/(-2*I*b1**2*m*z2*z4 - 2*I*b2**2*m*z2*z4 - 2*I*b3**2*m*z2*z4)
z7 = Integral(b1**3*e2*q*z6 - b1**2*b2*e1*q*z6 - I*b1**2*e3*q*z4*z6
+ b1*b2**2*e2*q*z6 + b1*b3**2*e2*q*z6 + I*b1*b3*e1*q*z4*z6
- b2**3*e1*q*z6 - I*b2**2*e3*q*z4*z6 - b2*b3**2*e1*q*z6 + I*b2*b3*e2*q*z4*z6, t)
z8 = 1/(-2*b1**3*b3*m - 2*I*b1**2*b2*m*z4 - 2*b1*b2**2*b3*m - 2*b1*b3**3*m - 2*I*b2**3*m*z4 - 2*I*b2*b3**2*m*z4)
z9 = Integral(-b1**3*b2*e2*q*z2*z8 - b1**3*b3*e3*q*z2*z8 + b1**2*b2**2*e1*q*z2*z8
- I*b1**2*b2*e3*q*z2*z4*z8 + b1**2*b3**2*e1*q*z2*z8 + I*b1**2*b3*e2*q*z2*z4*z8
- b1*b2**3*e2*q*z2*z8 - b1*b2**2*b3*e3*q*z2*z8 + b2**4*e1*q*z2*z8
- I*b2**3*e3*q*z2*z4*z8 + b2**2*b3**2*e1*q*z2*z8 + I*b2**2*b3*e2*q*z2*z4*z8, t)
z10 = 1/(b1**2*b3*z2 + b2**2*b3*z2)
sol = [
Eq(v1(t),
C1*b1**3*z10*z2 + C1*b1*b2**2*z10*z2
- C2*b1*b3**2*z10 - I*C2*b2*b3*z10*z4
- C3*b1*b3**2*z1*z10 + I*C3*b2*b3*z1*z10*z4
+ b1**3*z10*z2*z5 + b1*b2**2*z10*z2*z5 - b1*b3**2*z1*z10*z7
- b1*b3**2*z10*z9 + I*b2*b3*z1*z10*z4*z7 - I*b2*b3*z10*z4*z9),
Eq(v2(t),
- C1*b1**2*b2*z2*z3 - C1*b2**3*z2*z3
- I*C2*b1*b3*z3*z4 + C2*b2*b3**2*z3
+ I*C3*b1*b3*z1*z3*z4 + C3*b2*b3**2*z1*z3
- b1**2*b2*z2*z3*z5 + I*b1*b3*z1*z3*z4*z7 - I*b1*b3*z3*z4*z9
- b2**3*z2*z3*z5 + b2*b3**2*z1*z3*z7 + b2*b3**2*z3*z9),
Eq(v3(t), C1 + C3*z2 + z2*z7 + z5 + (C2 + z9)*exp(-q*t*sqrt(-b1**2 - b2**2 - b3**2)/m)),
]
return eqs, sol
# A very big solution is obtained for this
# test case. To be simplified in future.
def test_linear_new_order1_type2_de_lorentz():
eqs, sol = _de_lorentz_solution()
with dotprodsimp(True):
assert dsolve(eqs) == sol
@slow
def test_linear_new_order1_type2_de_lorentz_slow_check():
if ON_TRAVIS:
skip("Too slow for travis.")
eqs, sol = _de_lorentz_solution()
assert checksysodesol(eqs, sol) == (True, [0, 0, 0])
def _neq_order1_type2_slow():
RC, t, C, Vs, L, R1, V0, I0 = symbols("RC t C Vs L R1 V0 I0")
V = Function("V")
I = Function("I")
system = [Eq(V(t).diff(t), -1 / RC * V(t) + I(t) / C), Eq(I(t).diff(t), -R1 / L * I(t) - 1 / L * V(t) + Vs / L)]
z1 = sqrt(C**2*L**2 - 2*C**2*L*R1*RC + C**2*R1**2*RC**2 - 4*C*L*RC**2)
z2 = 1/(C*L - C*R1*RC - z1)
z3 = 1/(C*L - C*R1*RC + z1)
z4 = exp(-t/(2*RC) - R1*t/(2*L) + t*z1/(2*C*L*RC))
z5 = exp(-t/(2*RC) - R1*t/(2*L) - t*z1/(2*C*L*RC))
z6 = Integral(2*RC*Vs*exp(t/(2*RC) + R1*t/(2*L) +
t*z1/(2*C*L*RC))/(-2*C*L**2*RC*z2 + 2*C*L**2*RC*z3 + 2*C*L*R1*RC**2*z2
- 2*C*L*R1*RC**2*z3 - 2*L*RC*z1*z2 + 2*L*RC*z1*z3), t)
z7 = Integral(-2*RC*Vs*exp(t/(2*RC) + R1*t/(2*L) -
t*z1/(2*C*L*RC))/(-2*C*L**2*RC*z2 + 2*C*L**2*RC*z3 + 2*C*L*R1*RC**2*z2
- 2*C*L*R1*RC**2*z3 + 2*L*RC*z1*z2 - 2*L*RC*z1*z3), t)
sol = [
Eq(V(t), 2*C1*L*RC*z2*z5 + 2*C2*L*RC*z3*z4 + 2*L*RC*z2*z5*z6 + 2*L*RC*z3*z4*z7),
Eq(I(t), C1*z5 + C2*z4 + z4*z7 + z5*z6),
]
return system, sol
# A very big solution is obtained for this
# test case. To be simplified in future.
def test_linear_neq_order1_type2_slow():
system, sol = _neq_order1_type2_slow()
assert dsolve(system) == sol
@slow
def test_linear_neq_order1_type2_slow_check():
if ON_TRAVIS:
skip("Too slow for travis.")
system, sol = _neq_order1_type2_slow()
assert checksysodesol(system, sol) == (True, [0, 0])
def _linear_3eq_order1_type4_long():
x, y, z = symbols('x, y, z', cls=Function)
t = Symbol('t')
f = t ** 3 + log(t)
g = t ** 2 + sin(t)
eq = [
Eq(diff(x(t), t), (4 * f + g) * x(t) - f * y(t) - 2 * f * z(t)),
Eq(diff(y(t), t), 2 * f * x(t) + (f + g) * y(t) - 2 * f * z(t)),
Eq(diff(z(t), t), 5 * f * x(t) + f * y( t) + (-3 * f + g) * z(t))
]
x_1 = sqrt(-t ** 6 - 8 * t ** 3 * log(t) + 8 * t ** 3 - 16 * log(t) ** 2 + 32 * log(t) - 16)
x_2 = sqrt(3)
x_3 = 8324372644 * C1 * x_1 * x_2 + 4162186322 * C2 * x_1 * x_2 - 8324372644 * C3 * x_1 * x_2
x_4 = 1 / (1903457163 * t ** 3 + 3825881643 * x_1 * x_2 + 7613828652 * log(t) - 7613828652)
x_5 = exp(t ** 3 / 3 + t * x_1 * x_2 / 4 - cos(t))
x_6 = exp(t ** 3 / 3 - t * x_1 * x_2 / 4 - cos(t))
x_7 = exp(t ** 4 / 2 + t ** 3 / 3 + 2 * t * log(t) - 2 * t - cos(t))
x_8 = 91238 * C1 * x_1 * x_2 + 91238 * C2 * x_1 * x_2 - 91238 * C3 * x_1 * x_2
x_9 = 1 / (66049 * t ** 3 - 50629 * x_1 * x_2 + 264196 * log(t) - 264196)
x_10 = 50629 * C1 / 25189 + 37909 * C2 / 25189 - 50629 * C3 / 25189 - x_3 * x_4
x_11 = -50629 * C1 / 25189 - 12720 * C2 / 25189 + 50629 * C3 / 25189 + x_3 * x_4
sol = [
Eq(x(t), x_10 * x_5 + x_11 * x_6 + x_7 * (C1 - C2)),
Eq(y(t), x_10 * x_5 + x_11 * x_6),
Eq(z(t), x_5 * (-424*C1/257 - 167*C2 / 257+424*C3/257 - x_8*x_9)
+ x_6*(167*C1/257 + 424*C2/257 - 167*C3/257 + x_8*x_9) + x_7*(C1 - C2))
]
return eq, sol
@XFAIL
@slow
def test_linear_3eq_order1_type4_long_dsolve_slow_xfail():
if ON_TRAVIS:
skip("Too slow for travis.")
eq, sol = _linear_3eq_order1_type4_long()
dsolve_sol = dsolve(eq)
dsolve_sol1 = [_simpsol(sol) for sol in dsolve_sol]
assert dsolve_sol1 == sol
def test_linear_3eq_order1_type4_long_dsolve_dotprodsimp():
from sympy.matrices import dotprodsimp
eq, sol = _linear_3eq_order1_type4_long()
# XXX: Only works with dotprodsimp see
# test_linear_3eq_order1_type4_long_dsolve_slow_xfail which is too slow
with dotprodsimp(True):
dsolve_sol = dsolve(eq)
dsolve_sol1 = [_simpsol(sol) for sol in dsolve_sol]
assert dsolve_sol1 == sol
def test_linear_3eq_order1_type4_long_check():
eq, sol = _linear_3eq_order1_type4_long()
assert checksysodesol(eq, sol) == (True, [0, 0, 0])
|
defa582cd8db6362acffcecdf626c4d049ba656649e20b4037cec2ab85b6d50f
|
""" Tests from Michael Wester's 1999 paper "Review of CAS mathematical
capabilities".
http://www.math.unm.edu/~wester/cas/book/Wester.pdf
See also http://math.unm.edu/~wester/cas_review.html for detailed output of
each tested system.
"""
from sympy import (Rational, symbols, Dummy, factorial, sqrt, log, exp, oo, zoo,
product, binomial, rf, pi, gamma, igcd, factorint, radsimp, combsimp,
npartitions, totient, primerange, factor, simplify, gcd, resultant, expand,
I, trigsimp, tan, sin, cos, cot, diff, nan, limit, EulerGamma, polygamma,
bernoulli, hyper, hyperexpand, besselj, asin, assoc_legendre, Function, re,
im, DiracDelta, chebyshevt, legendre_poly, polylog, series, O,
atan, sinh, cosh, tanh, floor, ceiling, solve, asinh, acot, csc, sec,
LambertW, N, apart, sqrtdenest, factorial2, powdenest, Mul, S, ZZ,
Poly, expand_func, E, Q, And, Lt, Min, ask, refine, AlgebraicNumber,
continued_fraction_iterator as cf_i, continued_fraction_periodic as cf_p,
continued_fraction_convergents as cf_c, continued_fraction_reduce as cf_r,
FiniteSet, elliptic_e, elliptic_f, powsimp, hessian, wronskian, fibonacci,
sign, Lambda, Piecewise, Subs, residue, Derivative, logcombine, Symbol,
Intersection, Union, EmptySet, Interval, idiff, ImageSet, acos, Max,
MatMul, conjugate)
import mpmath
from sympy.functions.combinatorial.numbers import stirling
from sympy.functions.special.delta_functions import Heaviside
from sympy.functions.special.error_functions import Ci, Si, erf
from sympy.functions.special.zeta_functions import zeta
from sympy.testing.pytest import (XFAIL, slow, SKIP, skip, ON_TRAVIS,
raises)
from sympy.utilities.iterables import partitions
from mpmath import mpi, mpc
from sympy.matrices import Matrix, GramSchmidt, eye
from sympy.matrices.expressions.blockmatrix import BlockMatrix, block_collapse
from sympy.matrices.expressions import MatrixSymbol, ZeroMatrix
from sympy.physics.quantum import Commutator
from sympy.assumptions import assuming
from sympy.polys.rings import PolyRing
from sympy.polys.fields import FracField
from sympy.polys.solvers import solve_lin_sys
from sympy.concrete import Sum
from sympy.concrete.products import Product
from sympy.integrals import integrate
from sympy.integrals.transforms import laplace_transform,\
inverse_laplace_transform, LaplaceTransform, fourier_transform,\
mellin_transform
from sympy.solvers.recurr import rsolve
from sympy.solvers.solveset import solveset, solveset_real, linsolve
from sympy.solvers.ode import dsolve
from sympy.core.relational import Equality
from itertools import islice, takewhile
from sympy.series.formal import fps
from sympy.series.fourier import fourier_series
from sympy.calculus.util import minimum
R = Rational
x, y, z = symbols('x y z')
i, j, k, l, m, n = symbols('i j k l m n', integer=True)
f = Function('f')
g = Function('g')
# A. Boolean Logic and Quantifier Elimination
# Not implemented.
# B. Set Theory
def test_B1():
assert (FiniteSet(i, j, j, k, k, k) | FiniteSet(l, k, j) |
FiniteSet(j, m, j)) == FiniteSet(i, j, k, l, m)
def test_B2():
assert (FiniteSet(i, j, j, k, k, k) & FiniteSet(l, k, j) &
FiniteSet(j, m, j)) == Intersection({j, m}, {i, j, k}, {j, k, l})
# Previous output below. Not sure why that should be the expected output.
# There should probably be a way to rewrite Intersections that way but I
# don't see why an Intersection should evaluate like that:
#
# == Union({j}, Intersection({m}, Union({j, k}, Intersection({i}, {l}))))
def test_B3():
assert (FiniteSet(i, j, k, l, m) - FiniteSet(j) ==
FiniteSet(i, k, l, m))
def test_B4():
assert (FiniteSet(*(FiniteSet(i, j)*FiniteSet(k, l))) ==
FiniteSet((i, k), (i, l), (j, k), (j, l)))
# C. Numbers
def test_C1():
assert (factorial(50) ==
30414093201713378043612608166064768844377641568960512000000000000)
def test_C2():
assert (factorint(factorial(50)) == {2: 47, 3: 22, 5: 12, 7: 8,
11: 4, 13: 3, 17: 2, 19: 2, 23: 2, 29: 1, 31: 1, 37: 1,
41: 1, 43: 1, 47: 1})
def test_C3():
assert (factorial2(10), factorial2(9)) == (3840, 945)
# Base conversions; not really implemented by sympy
# Whatever. Take credit!
def test_C4():
assert 0xABC == 2748
def test_C5():
assert 123 == int('234', 7)
def test_C6():
assert int('677', 8) == int('1BF', 16) == 447
def test_C7():
assert log(32768, 8) == 5
def test_C8():
# Modular multiplicative inverse. Would be nice if divmod could do this.
assert ZZ.invert(5, 7) == 3
assert ZZ.invert(5, 6) == 5
def test_C9():
assert igcd(igcd(1776, 1554), 5698) == 74
def test_C10():
x = 0
for n in range(2, 11):
x += R(1, n)
assert x == R(4861, 2520)
def test_C11():
assert R(1, 7) == S('0.[142857]')
def test_C12():
assert R(7, 11) * R(22, 7) == 2
def test_C13():
test = R(10, 7) * (1 + R(29, 1000)) ** R(1, 3)
good = 3 ** R(1, 3)
assert test == good
def test_C14():
assert sqrtdenest(sqrt(2*sqrt(3) + 4)) == 1 + sqrt(3)
def test_C15():
test = sqrtdenest(sqrt(14 + 3*sqrt(3 + 2*sqrt(5 - 12*sqrt(3 - 2*sqrt(2))))))
good = sqrt(2) + 3
assert test == good
def test_C16():
test = sqrtdenest(sqrt(10 + 2*sqrt(6) + 2*sqrt(10) + 2*sqrt(15)))
good = sqrt(2) + sqrt(3) + sqrt(5)
assert test == good
def test_C17():
test = radsimp((sqrt(3) + sqrt(2)) / (sqrt(3) - sqrt(2)))
good = 5 + 2*sqrt(6)
assert test == good
def test_C18():
assert simplify((sqrt(-2 + sqrt(-5)) * sqrt(-2 - sqrt(-5))).expand(complex=True)) == 3
@XFAIL
def test_C19():
assert radsimp(simplify((90 + 34*sqrt(7)) ** R(1, 3))) == 3 + sqrt(7)
def test_C20():
inside = (135 + 78*sqrt(3))
test = AlgebraicNumber((inside**R(2, 3) + 3) * sqrt(3) / inside**R(1, 3))
assert simplify(test) == AlgebraicNumber(12)
def test_C21():
assert simplify(AlgebraicNumber((41 + 29*sqrt(2)) ** R(1, 5))) == \
AlgebraicNumber(1 + sqrt(2))
@XFAIL
def test_C22():
test = simplify(((6 - 4*sqrt(2))*log(3 - 2*sqrt(2)) + (3 - 2*sqrt(2))*log(17
- 12*sqrt(2)) + 32 - 24*sqrt(2)) / (48*sqrt(2) - 72))
good = sqrt(2)/3 - log(sqrt(2) - 1)/3
assert test == good
def test_C23():
assert 2 * oo - 3 is oo
@XFAIL
def test_C24():
raise NotImplementedError("2**aleph_null == aleph_1")
# D. Numerical Analysis
def test_D1():
assert 0.0 / sqrt(2) == 0.0
def test_D2():
assert str(exp(-1000000).evalf()) == '3.29683147808856e-434295'
def test_D3():
assert exp(pi*sqrt(163)).evalf(50).num.ae(262537412640768744)
def test_D4():
assert floor(R(-5, 3)) == -2
assert ceiling(R(-5, 3)) == -1
@XFAIL
def test_D5():
raise NotImplementedError("cubic_spline([1, 2, 4, 5], [1, 4, 2, 3], x)(3) == 27/8")
@XFAIL
def test_D6():
raise NotImplementedError("translate sum(a[i]*x**i, (i,1,n)) to FORTRAN")
@XFAIL
def test_D7():
raise NotImplementedError("translate sum(a[i]*x**i, (i,1,n)) to C")
@XFAIL
def test_D8():
# One way is to cheat by converting the sum to a string,
# and replacing the '[' and ']' with ''.
# E.g., horner(S(str(_).replace('[','').replace(']','')))
raise NotImplementedError("apply Horner's rule to sum(a[i]*x**i, (i,1,5))")
@XFAIL
def test_D9():
raise NotImplementedError("translate D8 to FORTRAN")
@XFAIL
def test_D10():
raise NotImplementedError("translate D8 to C")
@XFAIL
def test_D11():
#Is there a way to use count_ops?
raise NotImplementedError("flops(sum(product(f[i][k], (i,1,k)), (k,1,n)))")
@XFAIL
def test_D12():
assert (mpi(-4, 2) * x + mpi(1, 3)) ** 2 == mpi(-8, 16)*x**2 + mpi(-24, 12)*x + mpi(1, 9)
@XFAIL
def test_D13():
raise NotImplementedError("discretize a PDE: diff(f(x,t),t) == diff(diff(f(x,t),x),x)")
# E. Statistics
# See scipy; all of this is numerical.
# F. Combinatorial Theory.
def test_F1():
assert rf(x, 3) == x*(1 + x)*(2 + x)
def test_F2():
assert expand_func(binomial(n, 3)) == n*(n - 1)*(n - 2)/6
@XFAIL
def test_F3():
assert combsimp(2**n * factorial(n) * factorial2(2*n - 1)) == factorial(2*n)
@XFAIL
def test_F4():
assert combsimp(2**n * factorial(n) * product(2*k - 1, (k, 1, n))) == factorial(2*n)
@XFAIL
def test_F5():
assert gamma(n + R(1, 2)) / sqrt(pi) / factorial(n) == factorial(2*n)/2**(2*n)/factorial(n)**2
def test_F6():
partTest = [p.copy() for p in partitions(4)]
partDesired = [{4: 1}, {1: 1, 3: 1}, {2: 2}, {1: 2, 2:1}, {1: 4}]
assert partTest == partDesired
def test_F7():
assert npartitions(4) == 5
def test_F8():
assert stirling(5, 2, signed=True) == -50 # if signed, then kind=1
def test_F9():
assert totient(1776) == 576
# G. Number Theory
def test_G1():
assert list(primerange(999983, 1000004)) == [999983, 1000003]
@XFAIL
def test_G2():
raise NotImplementedError("find the primitive root of 191 == 19")
@XFAIL
def test_G3():
raise NotImplementedError("(a+b)**p mod p == a**p + b**p mod p; p prime")
# ... G14 Modular equations are not implemented.
def test_G15():
assert Rational(sqrt(3).evalf()).limit_denominator(15) == R(26, 15)
assert list(takewhile(lambda x: x.q <= 15, cf_c(cf_i(sqrt(3)))))[-1] == \
R(26, 15)
def test_G16():
assert list(islice(cf_i(pi),10)) == [3, 7, 15, 1, 292, 1, 1, 1, 2, 1]
def test_G17():
assert cf_p(0, 1, 23) == [4, [1, 3, 1, 8]]
def test_G18():
assert cf_p(1, 2, 5) == [[1]]
assert cf_r([[1]]).expand() == S.Half + sqrt(5)/2
@XFAIL
def test_G19():
s = symbols('s', integer=True, positive=True)
it = cf_i((exp(1/s) - 1)/(exp(1/s) + 1))
assert list(islice(it, 5)) == [0, 2*s, 6*s, 10*s, 14*s]
def test_G20():
s = symbols('s', integer=True, positive=True)
# Wester erroneously has this as -s + sqrt(s**2 + 1)
assert cf_r([[2*s]]) == s + sqrt(s**2 + 1)
@XFAIL
def test_G20b():
s = symbols('s', integer=True, positive=True)
assert cf_p(s, 1, s**2 + 1) == [[2*s]]
# H. Algebra
def test_H1():
assert simplify(2*2**n) == simplify(2**(n + 1))
assert powdenest(2*2**n) == simplify(2**(n + 1))
def test_H2():
assert powsimp(4 * 2**n) == 2**(n + 2)
def test_H3():
assert (-1)**(n*(n + 1)) == 1
def test_H4():
expr = factor(6*x - 10)
assert type(expr) is Mul
assert expr.args[0] == 2
assert expr.args[1] == 3*x - 5
p1 = 64*x**34 - 21*x**47 - 126*x**8 - 46*x**5 - 16*x**60 - 81
p2 = 72*x**60 - 25*x**25 - 19*x**23 - 22*x**39 - 83*x**52 + 54*x**10 + 81
q = 34*x**19 - 25*x**16 + 70*x**7 + 20*x**3 - 91*x - 86
def test_H5():
assert gcd(p1, p2, x) == 1
def test_H6():
assert gcd(expand(p1 * q), expand(p2 * q)) == q
def test_H7():
p1 = 24*x*y**19*z**8 - 47*x**17*y**5*z**8 + 6*x**15*y**9*z**2 - 3*x**22 + 5
p2 = 34*x**5*y**8*z**13 + 20*x**7*y**7*z**7 + 12*x**9*y**16*z**4 + 80*y**14*z
assert gcd(p1, p2, x, y, z) == 1
def test_H8():
p1 = 24*x*y**19*z**8 - 47*x**17*y**5*z**8 + 6*x**15*y**9*z**2 - 3*x**22 + 5
p2 = 34*x**5*y**8*z**13 + 20*x**7*y**7*z**7 + 12*x**9*y**16*z**4 + 80*y**14*z
q = 11*x**12*y**7*z**13 - 23*x**2*y**8*z**10 + 47*x**17*y**5*z**8
assert gcd(p1 * q, p2 * q, x, y, z) == q
def test_H9():
p1 = 2*x**(n + 4) - x**(n + 2)
p2 = 4*x**(n + 1) + 3*x**n
assert gcd(p1, p2) == x**n
def test_H10():
p1 = 3*x**4 + 3*x**3 + x**2 - x - 2
p2 = x**3 - 3*x**2 + x + 5
assert resultant(p1, p2, x) == 0
def test_H11():
assert resultant(p1 * q, p2 * q, x) == 0
def test_H12():
num = x**2 - 4
den = x**2 + 4*x + 4
assert simplify(num/den) == (x - 2)/(x + 2)
@XFAIL
def test_H13():
assert simplify((exp(x) - 1) / (exp(x/2) + 1)) == exp(x/2) - 1
def test_H14():
p = (x + 1) ** 20
ep = expand(p)
assert ep == (1 + 20*x + 190*x**2 + 1140*x**3 + 4845*x**4 + 15504*x**5
+ 38760*x**6 + 77520*x**7 + 125970*x**8 + 167960*x**9 + 184756*x**10
+ 167960*x**11 + 125970*x**12 + 77520*x**13 + 38760*x**14 + 15504*x**15
+ 4845*x**16 + 1140*x**17 + 190*x**18 + 20*x**19 + x**20)
dep = diff(ep, x)
assert dep == (20 + 380*x + 3420*x**2 + 19380*x**3 + 77520*x**4
+ 232560*x**5 + 542640*x**6 + 1007760*x**7 + 1511640*x**8 + 1847560*x**9
+ 1847560*x**10 + 1511640*x**11 + 1007760*x**12 + 542640*x**13
+ 232560*x**14 + 77520*x**15 + 19380*x**16 + 3420*x**17 + 380*x**18
+ 20*x**19)
assert factor(dep) == 20*(1 + x)**19
def test_H15():
assert simplify(Mul(*[x - r for r in solveset(x**3 + x**2 - 7)])) == x**3 + x**2 - 7
def test_H16():
assert factor(x**100 - 1) == ((x - 1)*(x + 1)*(x**2 + 1)*(x**4 - x**3
+ x**2 - x + 1)*(x**4 + x**3 + x**2 + x + 1)*(x**8 - x**6 + x**4
- x**2 + 1)*(x**20 - x**15 + x**10 - x**5 + 1)*(x**20 + x**15 + x**10
+ x**5 + 1)*(x**40 - x**30 + x**20 - x**10 + 1))
def test_H17():
assert simplify(factor(expand(p1 * p2)) - p1*p2) == 0
@XFAIL
def test_H18():
# Factor over complex rationals.
test = factor(4*x**4 + 8*x**3 + 77*x**2 + 18*x + 153)
good = (2*x + 3*I)*(2*x - 3*I)*(x + 1 - 4*I)*(x + 1 + 4*I)
assert test == good
def test_H19():
a = symbols('a')
# The idea is to let a**2 == 2, then solve 1/(a-1). Answer is a+1")
assert Poly(a - 1).invert(Poly(a**2 - 2)) == a + 1
@XFAIL
def test_H20():
raise NotImplementedError("let a**2==2; (x**3 + (a-2)*x**2 - "
+ "(2*a+3)*x - 3*a) / (x**2-2) = (x**2 - 2*x - 3) / (x-a)")
@XFAIL
def test_H21():
raise NotImplementedError("evaluate (b+c)**4 assuming b**3==2, c**2==3. \
Answer is 2*b + 8*c + 18*b**2 + 12*b*c + 9")
def test_H22():
assert factor(x**4 - 3*x**2 + 1, modulus=5) == (x - 2)**2 * (x + 2)**2
def test_H23():
f = x**11 + x + 1
g = (x**2 + x + 1) * (x**9 - x**8 + x**6 - x**5 + x**3 - x**2 + 1)
assert factor(f, modulus=65537) == g
def test_H24():
phi = AlgebraicNumber(S.GoldenRatio.expand(func=True), alias='phi')
assert factor(x**4 - 3*x**2 + 1, extension=phi) == \
(x - phi)*(x + 1 - phi)*(x - 1 + phi)*(x + phi)
def test_H25():
e = (x - 2*y**2 + 3*z**3) ** 20
assert factor(expand(e)) == e
def test_H26():
g = expand((sin(x) - 2*cos(y)**2 + 3*tan(z)**3)**20)
assert factor(g, expand=False) == (-sin(x) + 2*cos(y)**2 - 3*tan(z)**3)**20
def test_H27():
f = 24*x*y**19*z**8 - 47*x**17*y**5*z**8 + 6*x**15*y**9*z**2 - 3*x**22 + 5
g = 34*x**5*y**8*z**13 + 20*x**7*y**7*z**7 + 12*x**9*y**16*z**4 + 80*y**14*z
h = -2*z*y**7 \
*(6*x**9*y**9*z**3 + 10*x**7*z**6 + 17*y*x**5*z**12 + 40*y**7) \
*(3*x**22 + 47*x**17*y**5*z**8 - 6*x**15*y**9*z**2 - 24*x*y**19*z**8 - 5)
assert factor(expand(f*g)) == h
@XFAIL
def test_H28():
raise NotImplementedError("expand ((1 - c**2)**5 * (1 - s**2)**5 * "
+ "(c**2 + s**2)**10) with c**2 + s**2 = 1. Answer is c**10*s**10.")
@XFAIL
def test_H29():
assert factor(4*x**2 - 21*x*y + 20*y**2, modulus=3) == (x + y)*(x - y)
def test_H30():
test = factor(x**3 + y**3, extension=sqrt(-3))
answer = (x + y)*(x + y*(-R(1, 2) - sqrt(3)/2*I))*(x + y*(-R(1, 2) + sqrt(3)/2*I))
assert answer == test
def test_H31():
f = (x**2 + 2*x + 3)/(x**3 + 4*x**2 + 5*x + 2)
g = 2 / (x + 1)**2 - 2 / (x + 1) + 3 / (x + 2)
assert apart(f) == g
@XFAIL
def test_H32(): # issue 6558
raise NotImplementedError("[A*B*C - (A*B*C)**(-1)]*A*C*B (product \
of a non-commuting product and its inverse)")
def test_H33():
A, B, C = symbols('A, B, C', commutative=False)
assert (Commutator(A, Commutator(B, C))
+ Commutator(B, Commutator(C, A))
+ Commutator(C, Commutator(A, B))).doit().expand() == 0
# I. Trigonometry
def test_I1():
assert tan(pi*R(7, 10)) == -sqrt(1 + 2/sqrt(5))
@XFAIL
def test_I2():
assert sqrt((1 + cos(6))/2) == -cos(3)
def test_I3():
assert cos(n*pi) + sin((4*n - 1)*pi/2) == (-1)**n - 1
def test_I4():
assert refine(cos(pi*cos(n*pi)) + sin(pi/2*cos(n*pi)), Q.integer(n)) == (-1)**n - 1
@XFAIL
def test_I5():
assert sin((n**5/5 + n**4/2 + n**3/3 - n/30) * pi) == 0
@XFAIL
def test_I6():
raise NotImplementedError("assuming -3*pi<x<-5*pi/2, abs(cos(x)) == -cos(x), abs(sin(x)) == -sin(x)")
@XFAIL
def test_I7():
assert cos(3*x)/cos(x) == cos(x)**2 - 3*sin(x)**2
@XFAIL
def test_I8():
assert cos(3*x)/cos(x) == 2*cos(2*x) - 1
@XFAIL
def test_I9():
# Supposed to do this with rewrite rules.
assert cos(3*x)/cos(x) == cos(x)**2 - 3*sin(x)**2
def test_I10():
assert trigsimp((tan(x)**2 + 1 - cos(x)**-2) / (sin(x)**2 + cos(x)**2 - 1)) is nan
@SKIP("hangs")
@XFAIL
def test_I11():
assert limit((tan(x)**2 + 1 - cos(x)**-2) / (sin(x)**2 + cos(x)**2 - 1), x, 0) != 0
@XFAIL
def test_I12():
# This should fail or return nan or something.
res = diff((tan(x)**2 + 1 - cos(x)**-2) / (sin(x)**2 + cos(x)**2 - 1), x)
assert res is nan # trigsimp(res) gives nan
# J. Special functions.
def test_J1():
assert bernoulli(16) == R(-3617, 510)
def test_J2():
assert diff(elliptic_e(x, y**2), y) == (elliptic_e(x, y**2) - elliptic_f(x, y**2))/y
@XFAIL
def test_J3():
raise NotImplementedError("Jacobi elliptic functions: diff(dn(u,k), u) == -k**2*sn(u,k)*cn(u,k)")
def test_J4():
assert gamma(R(-1, 2)) == -2*sqrt(pi)
def test_J5():
assert polygamma(0, R(1, 3)) == -log(3) - sqrt(3)*pi/6 - EulerGamma - log(sqrt(3))
def test_J6():
assert mpmath.besselj(2, 1 + 1j).ae(mpc('0.04157988694396212', '0.24739764151330632'))
def test_J7():
assert simplify(besselj(R(-5,2), pi/2)) == 12/(pi**2)
def test_J8():
p = besselj(R(3,2), z)
q = (sin(z)/z - cos(z))/sqrt(pi*z/2)
assert simplify(expand_func(p) -q) == 0
def test_J9():
assert besselj(0, z).diff(z) == - besselj(1, z)
def test_J10():
mu, nu = symbols('mu, nu', integer=True)
assert assoc_legendre(nu, mu, 0) == 2**mu*sqrt(pi)/gamma((nu - mu)/2 + 1)/gamma((-nu - mu + 1)/2)
def test_J11():
assert simplify(assoc_legendre(3, 1, x)) == simplify(-R(3, 2)*sqrt(1 - x**2)*(5*x**2 - 1))
@slow
def test_J12():
assert simplify(chebyshevt(1008, x) - 2*x*chebyshevt(1007, x) + chebyshevt(1006, x)) == 0
def test_J13():
a = symbols('a', integer=True, negative=False)
assert chebyshevt(a, -1) == (-1)**a
def test_J14():
p = hyper([S.Half, S.Half], [R(3, 2)], z**2)
assert hyperexpand(p) == asin(z)/z
@XFAIL
def test_J15():
raise NotImplementedError("F((n+2)/2,-(n-2)/2,R(3,2),sin(z)**2) == sin(n*z)/(n*sin(z)*cos(z)); F(.) is hypergeometric function")
@XFAIL
def test_J16():
raise NotImplementedError("diff(zeta(x), x) @ x=0 == -log(2*pi)/2")
def test_J17():
assert integrate(f((x + 2)/5)*DiracDelta((x - 2)/3) - g(x)*diff(DiracDelta(x - 1), x), (x, 0, 3)) == 3*f(R(4, 5)) + Subs(Derivative(g(x), x), x, 1)
@XFAIL
def test_J18():
raise NotImplementedError("define an antisymmetric function")
# K. The Complex Domain
def test_K1():
z1, z2 = symbols('z1, z2', complex=True)
assert re(z1 + I*z2) == -im(z2) + re(z1)
assert im(z1 + I*z2) == im(z1) + re(z2)
def test_K2():
assert abs(3 - sqrt(7) + I*sqrt(6*sqrt(7) - 15)) == 1
@XFAIL
def test_K3():
a, b = symbols('a, b', real=True)
assert simplify(abs(1/(a + I/a + I*b))) == 1/sqrt(a**2 + (I/a + b)**2)
def test_K4():
assert log(3 + 4*I).expand(complex=True) == log(5) + I*atan(R(4, 3))
def test_K5():
x, y = symbols('x, y', real=True)
assert tan(x + I*y).expand(complex=True) == (sin(2*x)/(cos(2*x) +
cosh(2*y)) + I*sinh(2*y)/(cos(2*x) + cosh(2*y)))
def test_K6():
assert sqrt(x*y*abs(z)**2)/(sqrt(x)*abs(z)) == sqrt(x*y)/sqrt(x)
assert sqrt(x*y*abs(z)**2)/(sqrt(x)*abs(z)) != sqrt(y)
def test_K7():
y = symbols('y', real=True, negative=False)
expr = sqrt(x*y*abs(z)**2)/(sqrt(x)*abs(z))
sexpr = simplify(expr)
assert sexpr == sqrt(y)
def test_K8():
z = symbols('z', complex=True)
assert simplify(sqrt(1/z) - 1/sqrt(z)) != 0 # Passes
z = symbols('z', complex=True, negative=False)
assert simplify(sqrt(1/z) - 1/sqrt(z)) == 0 # Fails
def test_K9():
z = symbols('z', real=True, positive=True)
assert simplify(sqrt(1/z) - 1/sqrt(z)) == 0
def test_K10():
z = symbols('z', real=True, negative=True)
assert simplify(sqrt(1/z) + 1/sqrt(z)) == 0
# This goes up to K25
# L. Determining Zero Equivalence
def test_L1():
assert sqrt(997) - (997**3)**R(1, 6) == 0
def test_L2():
assert sqrt(999983) - (999983**3)**R(1, 6) == 0
def test_L3():
assert simplify((2**R(1, 3) + 4**R(1, 3))**3 - 6*(2**R(1, 3) + 4**R(1, 3)) - 6) == 0
def test_L4():
assert trigsimp(cos(x)**3 + cos(x)*sin(x)**2 - cos(x)) == 0
@XFAIL
def test_L5():
assert log(tan(R(1, 2)*x + pi/4)) - asinh(tan(x)) == 0
def test_L6():
assert (log(tan(x/2 + pi/4)) - asinh(tan(x))).diff(x).subs({x: 0}) == 0
@XFAIL
def test_L7():
assert simplify(log((2*sqrt(x) + 1)/(sqrt(4*x + 4*sqrt(x) + 1)))) == 0
@XFAIL
def test_L8():
assert simplify((4*x + 4*sqrt(x) + 1)**(sqrt(x)/(2*sqrt(x) + 1)) \
*(2*sqrt(x) + 1)**(1/(2*sqrt(x) + 1)) - 2*sqrt(x) - 1) == 0
@XFAIL
def test_L9():
z = symbols('z', complex=True)
assert simplify(2**(1 - z)*gamma(z)*zeta(z)*cos(z*pi/2) - pi**2*zeta(1 - z)) == 0
# M. Equations
@XFAIL
def test_M1():
assert Equality(x, 2)/2 + Equality(1, 1) == Equality(x/2 + 1, 2)
def test_M2():
# The roots of this equation should all be real. Note that this
# doesn't test that they are correct.
sol = solveset(3*x**3 - 18*x**2 + 33*x - 19, x)
assert all(s.expand(complex=True).is_real for s in sol)
@XFAIL
def test_M5():
assert solveset(x**6 - 9*x**4 - 4*x**3 + 27*x**2 - 36*x - 23, x) == FiniteSet(2**(1/3) + sqrt(3), 2**(1/3) - sqrt(3), +sqrt(3) - 1/2**(2/3) + I*sqrt(3)/2**(2/3), +sqrt(3) - 1/2**(2/3) - I*sqrt(3)/2**(2/3), -sqrt(3) - 1/2**(2/3) + I*sqrt(3)/2**(2/3), -sqrt(3) - 1/2**(2/3) - I*sqrt(3)/2**(2/3))
def test_M6():
assert set(solveset(x**7 - 1, x)) == \
{cos(n*pi*R(2, 7)) + I*sin(n*pi*R(2, 7)) for n in range(0, 7)}
# The paper asks for exp terms, but sin's and cos's may be acceptable;
# if the results are simplified, exp terms appear for all but
# -sin(pi/14) - I*cos(pi/14) and -sin(pi/14) + I*cos(pi/14) which
# will simplify if you apply the transformation foo.rewrite(exp).expand()
def test_M7():
# TODO: Replace solve with solveset, as of now test fails for solveset
sol = solve(x**8 - 8*x**7 + 34*x**6 - 92*x**5 + 175*x**4 - 236*x**3 +
226*x**2 - 140*x + 46, x)
assert [s.simplify() for s in sol] == [
1 - sqrt(-6 - 2*I*sqrt(3 + 4*sqrt(3)))/2,
1 + sqrt(-6 - 2*I*sqrt(3 + 4*sqrt(3)))/2,
1 - sqrt(-6 + 2*I*sqrt(3 + 4*sqrt(3)))/2,
1 + sqrt(-6 + 2*I*sqrt(3 + 4*sqrt (3)))/2,
1 - sqrt(-6 + 2*sqrt(-3 + 4*sqrt(3)))/2,
1 + sqrt(-6 + 2*sqrt(-3 + 4*sqrt(3)))/2,
1 - sqrt(-6 - 2*sqrt(-3 + 4*sqrt(3)))/2,
1 + sqrt(-6 - 2*sqrt(-3 + 4*sqrt(3)))/2]
@XFAIL # There are an infinite number of solutions.
def test_M8():
x = Symbol('x')
z = symbols('z', complex=True)
assert solveset(exp(2*x) + 2*exp(x) + 1 - z, x, S.Reals) == \
FiniteSet(log(1 + z - 2*sqrt(z))/2, log(1 + z + 2*sqrt(z))/2)
# This one could be simplified better (the 1/2 could be pulled into the log
# as a sqrt, and the function inside the log can be factored as a square,
# giving [log(sqrt(z) - 1), log(sqrt(z) + 1)]). Also, there should be an
# infinite number of solutions.
# x = {log(sqrt(z) - 1), log(sqrt(z) + 1) + i pi} [+ n 2 pi i, + n 2 pi i]
# where n is an arbitrary integer. See url of detailed output above.
@XFAIL
def test_M9():
# x = symbols('x')
raise NotImplementedError("solveset(exp(2-x**2)-exp(-x),x) has complex solutions.")
def test_M10():
# TODO: Replace solve with solveset, as of now test fails for solveset
assert solve(exp(x) - x, x) == [-LambertW(-1)]
@XFAIL
def test_M11():
assert solveset(x**x - x, x) == FiniteSet(-1, 1)
def test_M12():
# TODO: x = [-1, 2*(+/-asinh(1)*I + n*pi}, 3*(pi/6 + n*pi/3)]
# TODO: Replace solve with solveset, as of now test fails for solveset
assert solve((x + 1)*(sin(x)**2 + 1)**2*cos(3*x)**3, x) == [
-1, pi/6, pi/2,
- I*log(1 + sqrt(2)), I*log(1 + sqrt(2)),
pi - I*log(1 + sqrt(2)), pi + I*log(1 + sqrt(2)),
]
@XFAIL
def test_M13():
n = Dummy('n')
assert solveset_real(sin(x) - cos(x), x) == ImageSet(Lambda(n, n*pi - pi*R(7, 4)), S.Integers)
@XFAIL
def test_M14():
n = Dummy('n')
assert solveset_real(tan(x) - 1, x) == ImageSet(Lambda(n, n*pi + pi/4), S.Integers)
def test_M15():
n = Dummy('n')
got = solveset(sin(x) - S.Half)
assert any(got.dummy_eq(i) for i in (
Union(ImageSet(Lambda(n, 2*n*pi + pi/6), S.Integers),
ImageSet(Lambda(n, 2*n*pi + pi*R(5, 6)), S.Integers)),
Union(ImageSet(Lambda(n, 2*n*pi + pi*R(5, 6)), S.Integers),
ImageSet(Lambda(n, 2*n*pi + pi/6), S.Integers))))
@XFAIL
def test_M16():
n = Dummy('n')
assert solveset(sin(x) - tan(x), x) == ImageSet(Lambda(n, n*pi), S.Integers)
@XFAIL
def test_M17():
assert solveset_real(asin(x) - atan(x), x) == FiniteSet(0)
@XFAIL
def test_M18():
assert solveset_real(acos(x) - atan(x), x) == FiniteSet(sqrt((sqrt(5) - 1)/2))
def test_M19():
# TODO: Replace solve with solveset, as of now test fails for solveset
assert solve((x - 2)/x**R(1, 3), x) == [2]
def test_M20():
assert solveset(sqrt(x**2 + 1) - x + 2, x) == EmptySet
def test_M21():
assert solveset(x + sqrt(x) - 2) == FiniteSet(1)
def test_M22():
assert solveset(2*sqrt(x) + 3*x**R(1, 4) - 2) == FiniteSet(R(1, 16))
def test_M23():
x = symbols('x', complex=True)
# TODO: Replace solve with solveset, as of now test fails for solveset
assert solve(x - 1/sqrt(1 + x**2)) == [
-I*sqrt(S.Half + sqrt(5)/2), sqrt(Rational(-1, 2) + sqrt(5)/2)]
def test_M24():
# TODO: Replace solve with solveset, as of now test fails for solveset
solution = solve(1 - binomial(m, 2)*2**k, k)
answer = log(2/(m*(m - 1)), 2)
assert solution[0].expand() == answer.expand()
def test_M25():
a, b, c, d = symbols(':d', positive=True)
x = symbols('x')
# TODO: Replace solve with solveset, as of now test fails for solveset
assert solve(a*b**x - c*d**x, x)[0].expand() == (log(c/a)/log(b/d)).expand()
def test_M26():
# TODO: Replace solve with solveset, as of now test fails for solveset
assert solve(sqrt(log(x)) - log(sqrt(x))) == [1, exp(4)]
def test_M27():
x = symbols('x', real=True)
b = symbols('b', real=True)
with assuming(Q.is_true(sin(cos(1/E**2) + 1) + b > 0)):
# TODO: Replace solve with solveset
solve(log(acos(asin(x**R(2, 3) - b) - 1)) + 2, x) == [-b - sin(1 + cos(1/E**2))**R(3/2), b + sin(1 + cos(1/E**2))**R(3/2)]
@XFAIL
def test_M28():
assert solveset_real(5*x + exp((x - 5)/2) - 8*x**3, x, assume=Q.real(x)) == [-0.784966, -0.016291, 0.802557]
def test_M29():
x = symbols('x')
assert solveset(abs(x - 1) - 2, domain=S.Reals) == FiniteSet(-1, 3)
def test_M30():
# TODO: Replace solve with solveset, as of now
# solveset doesn't supports assumptions
# assert solve(abs(2*x + 5) - abs(x - 2),x, assume=Q.real(x)) == [-1, -7]
assert solveset_real(abs(2*x + 5) - abs(x - 2), x) == FiniteSet(-1, -7)
def test_M31():
# TODO: Replace solve with solveset, as of now
# solveset doesn't supports assumptions
# assert solve(1 - abs(x) - max(-x - 2, x - 2),x, assume=Q.real(x)) == [-3/2, 3/2]
assert solveset_real(1 - abs(x) - Max(-x - 2, x - 2), x) == FiniteSet(R(-3, 2), R(3, 2))
@XFAIL
def test_M32():
# TODO: Replace solve with solveset, as of now
# solveset doesn't supports assumptions
assert solveset_real(Max(2 - x**2, x)- Max(-x, (x**3)/9), x) == FiniteSet(-1, 3)
@XFAIL
def test_M33():
# TODO: Replace solve with solveset, as of now
# solveset doesn't supports assumptions
# Second answer can be written in another form. The second answer is the root of x**3 + 9*x**2 - 18 = 0 in the interval (-2, -1).
assert solveset_real(Max(2 - x**2, x) - x**3/9, x) == FiniteSet(-3, -1.554894, 3)
@XFAIL
def test_M34():
z = symbols('z', complex=True)
assert solveset((1 + I) * z + (2 - I) * conjugate(z) + 3*I, z) == FiniteSet(2 + 3*I)
def test_M35():
x, y = symbols('x y', real=True)
assert linsolve((3*x - 2*y - I*y + 3*I).as_real_imag(), y, x) == FiniteSet((3, 2))
def test_M36():
# TODO: Replace solve with solveset, as of now
# solveset doesn't supports solving for function
# assert solve(f**2 + f - 2, x) == [Eq(f(x), 1), Eq(f(x), -2)]
assert solveset(f(x)**2 + f(x) - 2, f(x)) == FiniteSet(-2, 1)
def test_M37():
assert linsolve([x + y + z - 6, 2*x + y + 2*z - 10, x + 3*y + z - 10 ], x, y, z) == \
FiniteSet((-z + 4, 2, z))
def test_M38():
a, b, c = symbols('a, b, c')
domain = FracField([a, b, c], ZZ).to_domain()
ring = PolyRing('k1:50', domain)
(k1, k2, k3, k4, k5, k6, k7, k8, k9, k10,
k11, k12, k13, k14, k15, k16, k17, k18, k19, k20,
k21, k22, k23, k24, k25, k26, k27, k28, k29, k30,
k31, k32, k33, k34, k35, k36, k37, k38, k39, k40,
k41, k42, k43, k44, k45, k46, k47, k48, k49) = ring.gens
system = [
-b*k8/a + c*k8/a, -b*k11/a + c*k11/a, -b*k10/a + c*k10/a + k2, -k3 - b*k9/a + c*k9/a,
-b*k14/a + c*k14/a, -b*k15/a + c*k15/a, -b*k18/a + c*k18/a - k2, -b*k17/a + c*k17/a,
-b*k16/a + c*k16/a + k4, -b*k13/a + c*k13/a - b*k21/a + c*k21/a + b*k5/a - c*k5/a,
b*k44/a - c*k44/a, -b*k45/a + c*k45/a, -b*k20/a + c*k20/a, -b*k44/a + c*k44/a,
b*k46/a - c*k46/a, b**2*k47/a**2 - 2*b*c*k47/a**2 + c**2*k47/a**2, k3, -k4,
-b*k12/a + c*k12/a - a*k6/b + c*k6/b, -b*k19/a + c*k19/a + a*k7/c - b*k7/c,
b*k45/a - c*k45/a, -b*k46/a + c*k46/a, -k48 + c*k48/a + c*k48/b - c**2*k48/(a*b),
-k49 + b*k49/a + b*k49/c - b**2*k49/(a*c), a*k1/b - c*k1/b, a*k4/b - c*k4/b,
a*k3/b - c*k3/b + k9, -k10 + a*k2/b - c*k2/b, a*k7/b - c*k7/b, -k9, k11,
b*k12/a - c*k12/a + a*k6/b - c*k6/b, a*k15/b - c*k15/b, k10 + a*k18/b - c*k18/b,
-k11 + a*k17/b - c*k17/b, a*k16/b - c*k16/b, -a*k13/b + c*k13/b + a*k21/b - c*k21/b + a*k5/b - c*k5/b,
-a*k44/b + c*k44/b, a*k45/b - c*k45/b, a*k14/c - b*k14/c + a*k20/b - c*k20/b,
a*k44/b - c*k44/b, -a*k46/b + c*k46/b, -k47 + c*k47/a + c*k47/b - c**2*k47/(a*b),
a*k19/b - c*k19/b, -a*k45/b + c*k45/b, a*k46/b - c*k46/b, a**2*k48/b**2 - 2*a*c*k48/b**2 + c**2*k48/b**2,
-k49 + a*k49/b + a*k49/c - a**2*k49/(b*c), k16, -k17, -a*k1/c + b*k1/c,
-k16 - a*k4/c + b*k4/c, -a*k3/c + b*k3/c, k18 - a*k2/c + b*k2/c, b*k19/a - c*k19/a - a*k7/c + b*k7/c,
-a*k6/c + b*k6/c, -a*k8/c + b*k8/c, -a*k11/c + b*k11/c + k17, -a*k10/c + b*k10/c - k18,
-a*k9/c + b*k9/c, -a*k14/c + b*k14/c - a*k20/b + c*k20/b, -a*k13/c + b*k13/c + a*k21/c - b*k21/c - a*k5/c + b*k5/c,
a*k44/c - b*k44/c, -a*k45/c + b*k45/c, -a*k44/c + b*k44/c, a*k46/c - b*k46/c,
-k47 + b*k47/a + b*k47/c - b**2*k47/(a*c), -a*k12/c + b*k12/c, a*k45/c - b*k45/c,
-a*k46/c + b*k46/c, -k48 + a*k48/b + a*k48/c - a**2*k48/(b*c),
a**2*k49/c**2 - 2*a*b*k49/c**2 + b**2*k49/c**2, k8, k11, -k15, k10 - k18,
-k17, k9, -k16, -k29, k14 - k32, -k21 + k23 - k31, -k24 - k30, -k35, k44,
-k45, k36, k13 - k23 + k39, -k20 + k38, k25 + k37, b*k26/a - c*k26/a - k34 + k42,
-2*k44, k45, k46, b*k47/a - c*k47/a, k41, k44, -k46, -b*k47/a + c*k47/a,
k12 + k24, -k19 - k25, -a*k27/b + c*k27/b - k33, k45, -k46, -a*k48/b + c*k48/b,
a*k28/c - b*k28/c + k40, -k45, k46, a*k48/b - c*k48/b, a*k49/c - b*k49/c,
-a*k49/c + b*k49/c, -k1, -k4, -k3, k15, k18 - k2, k17, k16, k22, k25 - k7,
k24 + k30, k21 + k23 - k31, k28, -k44, k45, -k30 - k6, k20 + k32, k27 + b*k33/a - c*k33/a,
k44, -k46, -b*k47/a + c*k47/a, -k36, k31 - k39 - k5, -k32 - k38, k19 - k37,
k26 - a*k34/b + c*k34/b - k42, k44, -2*k45, k46, a*k48/b - c*k48/b,
a*k35/c - b*k35/c - k41, -k44, k46, b*k47/a - c*k47/a, -a*k49/c + b*k49/c,
-k40, k45, -k46, -a*k48/b + c*k48/b, a*k49/c - b*k49/c, k1, k4, k3, -k8,
-k11, -k10 + k2, -k9, k37 + k7, -k14 - k38, -k22, -k25 - k37, -k24 + k6,
-k13 - k23 + k39, -k28 + b*k40/a - c*k40/a, k44, -k45, -k27, -k44, k46,
b*k47/a - c*k47/a, k29, k32 + k38, k31 - k39 + k5, -k12 + k30, k35 - a*k41/b + c*k41/b,
-k44, k45, -k26 + k34 + a*k42/c - b*k42/c, k44, k45, -2*k46, -b*k47/a + c*k47/a,
-a*k48/b + c*k48/b, a*k49/c - b*k49/c, k33, -k45, k46, a*k48/b - c*k48/b,
-a*k49/c + b*k49/c
]
solution = {
k49: 0, k48: 0, k47: 0, k46: 0, k45: 0, k44: 0, k41: 0, k40: 0,
k38: 0, k37: 0, k36: 0, k35: 0, k33: 0, k32: 0, k30: 0, k29: 0,
k28: 0, k27: 0, k25: 0, k24: 0, k22: 0, k21: 0, k20: 0, k19: 0,
k18: 0, k17: 0, k16: 0, k15: 0, k14: 0, k13: 0, k12: 0, k11: 0,
k10: 0, k9: 0, k8: 0, k7: 0, k6: 0, k5: 0, k4: 0, k3: 0,
k2: 0, k1: 0,
k34: b/c*k42, k31: k39, k26: a/c*k42, k23: k39
}
assert solve_lin_sys(system, ring) == solution
def test_M39():
x, y, z = symbols('x y z', complex=True)
# TODO: Replace solve with solveset, as of now
# solveset doesn't supports non-linear multivariate
assert solve([x**2*y + 3*y*z - 4, -3*x**2*z + 2*y**2 + 1, 2*y*z**2 - z**2 - 1 ]) ==\
[{y: 1, z: 1, x: -1}, {y: 1, z: 1, x: 1},\
{y: sqrt(2)*I, z: R(1,3) - sqrt(2)*I/3, x: -sqrt(-1 - sqrt(2)*I)},\
{y: sqrt(2)*I, z: R(1,3) - sqrt(2)*I/3, x: sqrt(-1 - sqrt(2)*I)},\
{y: -sqrt(2)*I, z: R(1,3) + sqrt(2)*I/3, x: -sqrt(-1 + sqrt(2)*I)},\
{y: -sqrt(2)*I, z: R(1,3) + sqrt(2)*I/3, x: sqrt(-1 + sqrt(2)*I)}]
# N. Inequalities
def test_N1():
assert ask(Q.is_true(E**pi > pi**E))
@XFAIL
def test_N2():
x = symbols('x', real=True)
assert ask(Q.is_true(x**4 - x + 1 > 0)) is True
assert ask(Q.is_true(x**4 - x + 1 > 1)) is False
@XFAIL
def test_N3():
x = symbols('x', real=True)
assert ask(Q.is_true(And(Lt(-1, x), Lt(x, 1))), Q.is_true(abs(x) < 1 ))
@XFAIL
def test_N4():
x, y = symbols('x y', real=True)
assert ask(Q.is_true(2*x**2 > 2*y**2), Q.is_true((x > y) & (y > 0))) is True
@XFAIL
def test_N5():
x, y, k = symbols('x y k', real=True)
assert ask(Q.is_true(k*x**2 > k*y**2), Q.is_true((x > y) & (y > 0) & (k > 0))) is True
@XFAIL
def test_N6():
x, y, k, n = symbols('x y k n', real=True)
assert ask(Q.is_true(k*x**n > k*y**n), Q.is_true((x > y) & (y > 0) & (k > 0) & (n > 0))) is True
@XFAIL
def test_N7():
x, y = symbols('x y', real=True)
assert ask(Q.is_true(y > 0), Q.is_true((x > 1) & (y >= x - 1))) is True
@XFAIL
def test_N8():
x, y, z = symbols('x y z', real=True)
assert ask(Q.is_true((x == y) & (y == z)),
Q.is_true((x >= y) & (y >= z) & (z >= x)))
def test_N9():
x = Symbol('x')
assert solveset(abs(x - 1) > 2, domain=S.Reals) == Union(Interval(-oo, -1, False, True),
Interval(3, oo, True))
def test_N10():
x = Symbol('x')
p = (x - 1)*(x - 2)*(x - 3)*(x - 4)*(x - 5)
assert solveset(expand(p) < 0, domain=S.Reals) == Union(Interval(-oo, 1, True, True),
Interval(2, 3, True, True),
Interval(4, 5, True, True))
def test_N11():
x = Symbol('x')
assert solveset(6/(x - 3) <= 3, domain=S.Reals) == Union(Interval(-oo, 3, True, True), Interval(5, oo))
def test_N12():
x = Symbol('x')
assert solveset(sqrt(x) < 2, domain=S.Reals) == Interval(0, 4, False, True)
def test_N13():
x = Symbol('x')
assert solveset(sin(x) < 2, domain=S.Reals) == S.Reals
@XFAIL
def test_N14():
x = Symbol('x')
# Gives 'Union(Interval(Integer(0), Mul(Rational(1, 2), pi), false, true),
# Interval(Mul(Rational(1, 2), pi), Mul(Integer(2), pi), true, false))'
# which is not the correct answer, but the provided also seems wrong.
assert solveset(sin(x) < 1, x, domain=S.Reals) == Union(Interval(-oo, pi/2, True, True),
Interval(pi/2, oo, True, True))
def test_N15():
r, t = symbols('r t')
# raises NotImplementedError: only univariate inequalities are supported
solveset(abs(2*r*(cos(t) - 1) + 1) <= 1, r, S.Reals)
def test_N16():
r, t = symbols('r t')
solveset((r**2)*((cos(t) - 4)**2)*sin(t)**2 < 9, r, S.Reals)
@XFAIL
def test_N17():
# currently only univariate inequalities are supported
assert solveset((x + y > 0, x - y < 0), (x, y)) == (abs(x) < y)
def test_O1():
M = Matrix((1 + I, -2, 3*I))
assert sqrt(expand(M.dot(M.H))) == sqrt(15)
def test_O2():
assert Matrix((2, 2, -3)).cross(Matrix((1, 3, 1))) == Matrix([[11],
[-5],
[4]])
# The vector module has no way of representing vectors symbolically (without
# respect to a basis)
@XFAIL
def test_O3():
# assert (va ^ vb) | (vc ^ vd) == -(va | vc)*(vb | vd) + (va | vd)*(vb | vc)
raise NotImplementedError("""The vector module has no way of representing
vectors symbolically (without respect to a basis)""")
def test_O4():
from sympy.vector import CoordSys3D, Del
N = CoordSys3D("N")
delop = Del()
i, j, k = N.base_vectors()
x, y, z = N.base_scalars()
F = i*(x*y*z) + j*((x*y*z)**2) + k*((y**2)*(z**3))
assert delop.cross(F).doit() == (-2*x**2*y**2*z + 2*y*z**3)*i + x*y*j + (2*x*y**2*z**2 - x*z)*k
@XFAIL
def test_O5():
#assert grad|(f^g)-g|(grad^f)+f|(grad^g) == 0
raise NotImplementedError("""The vector module has no way of representing
vectors symbolically (without respect to a basis)""")
#testO8-O9 MISSING!!
def test_O10():
L = [Matrix([2, 3, 5]), Matrix([3, 6, 2]), Matrix([8, 3, 6])]
assert GramSchmidt(L) == [Matrix([
[2],
[3],
[5]]),
Matrix([
[R(23, 19)],
[R(63, 19)],
[R(-47, 19)]]),
Matrix([
[R(1692, 353)],
[R(-1551, 706)],
[R(-423, 706)]])]
def test_P1():
assert Matrix(3, 3, lambda i, j: j - i).diagonal(-1) == Matrix(
1, 2, [-1, -1])
def test_P2():
M = Matrix([[1, 2, 3], [4, 5, 6], [7, 8, 9]])
M.row_del(1)
M.col_del(2)
assert M == Matrix([[1, 2],
[7, 8]])
def test_P3():
A = Matrix([
[11, 12, 13, 14],
[21, 22, 23, 24],
[31, 32, 33, 34],
[41, 42, 43, 44]])
A11 = A[0:3, 1:4]
A12 = A[(0, 1, 3), (2, 0, 3)]
A21 = A
A221 = -A[0:2, 2:4]
A222 = -A[(3, 0), (2, 1)]
A22 = BlockMatrix([[A221, A222]]).T
rows = [[-A11, A12], [A21, A22]]
raises(ValueError, lambda: BlockMatrix(rows))
B = Matrix(rows)
assert B == Matrix([
[-12, -13, -14, 13, 11, 14],
[-22, -23, -24, 23, 21, 24],
[-32, -33, -34, 43, 41, 44],
[11, 12, 13, 14, -13, -23],
[21, 22, 23, 24, -14, -24],
[31, 32, 33, 34, -43, -13],
[41, 42, 43, 44, -42, -12]])
@XFAIL
def test_P4():
raise NotImplementedError("Block matrix diagonalization not supported")
def test_P5():
M = Matrix([[7, 11],
[3, 8]])
assert M % 2 == Matrix([[1, 1],
[1, 0]])
def test_P6():
M = Matrix([[cos(x), sin(x)],
[-sin(x), cos(x)]])
assert M.diff(x, 2) == Matrix([[-cos(x), -sin(x)],
[sin(x), -cos(x)]])
def test_P7():
M = Matrix([[x, y]])*(
z*Matrix([[1, 3, 5],
[2, 4, 6]]) + Matrix([[7, -9, 11],
[-8, 10, -12]]))
assert M == Matrix([[x*(z + 7) + y*(2*z - 8), x*(3*z - 9) + y*(4*z + 10),
x*(5*z + 11) + y*(6*z - 12)]])
def test_P8():
M = Matrix([[1, -2*I],
[-3*I, 4]])
assert M.norm(ord=S.Infinity) == 7
def test_P9():
a, b, c = symbols('a b c', nonzero=True)
M = Matrix([[a/(b*c), 1/c, 1/b],
[1/c, b/(a*c), 1/a],
[1/b, 1/a, c/(a*b)]])
assert factor(M.norm('fro')) == (a**2 + b**2 + c**2)/(abs(a)*abs(b)*abs(c))
@XFAIL
def test_P10():
M = Matrix([[1, 2 + 3*I],
[f(4 - 5*I), 6]])
# conjugate(f(4 - 5*i)) is not simplified to f(4+5*I)
assert M.H == Matrix([[1, f(4 + 5*I)],
[2 + 3*I, 6]])
@XFAIL
def test_P11():
# raises NotImplementedError("Matrix([[x,y],[1,x*y]]).inv()
# not simplifying to extract common factor")
assert Matrix([[x, y],
[1, x*y]]).inv() == (1/(x**2 - 1))*Matrix([[x, -1],
[-1/y, x/y]])
def test_P11_workaround():
# This test was changed to inverse method ADJ because it depended on the
# specific form of inverse returned from the 'GE' method which has changed.
M = Matrix([[x, y], [1, x*y]]).inv('ADJ')
c = gcd(tuple(M))
assert MatMul(c, M/c, evaluate=False) == MatMul(c, Matrix([
[x*y, -y],
[ -1, x]]), evaluate=False)
def test_P12():
A11 = MatrixSymbol('A11', n, n)
A12 = MatrixSymbol('A12', n, n)
A22 = MatrixSymbol('A22', n, n)
B = BlockMatrix([[A11, A12],
[ZeroMatrix(n, n), A22]])
assert block_collapse(B.I) == BlockMatrix([[A11.I, (-1)*A11.I*A12*A22.I],
[ZeroMatrix(n, n), A22.I]])
def test_P13():
M = Matrix([[1, x - 2, x - 3],
[x - 1, x**2 - 3*x + 6, x**2 - 3*x - 2],
[x - 2, x**2 - 8, 2*(x**2) - 12*x + 14]])
L, U, _ = M.LUdecomposition()
assert simplify(L) == Matrix([[1, 0, 0],
[x - 1, 1, 0],
[x - 2, x - 3, 1]])
assert simplify(U) == Matrix([[1, x - 2, x - 3],
[0, 4, x - 5],
[0, 0, x - 7]])
def test_P14():
M = Matrix([[1, 2, 3, 1, 3],
[3, 2, 1, 1, 7],
[0, 2, 4, 1, 1],
[1, 1, 1, 1, 4]])
R, _ = M.rref()
assert R == Matrix([[1, 0, -1, 0, 2],
[0, 1, 2, 0, -1],
[0, 0, 0, 1, 3],
[0, 0, 0, 0, 0]])
def test_P15():
M = Matrix([[-1, 3, 7, -5],
[4, -2, 1, 3],
[2, 4, 15, -7]])
assert M.rank() == 2
def test_P16():
M = Matrix([[2*sqrt(2), 8],
[6*sqrt(6), 24*sqrt(3)]])
assert M.rank() == 1
def test_P17():
t = symbols('t', real=True)
M=Matrix([
[sin(2*t), cos(2*t)],
[2*(1 - (cos(t)**2))*cos(t), (1 - 2*(sin(t)**2))*sin(t)]])
assert M.rank() == 1
def test_P18():
M = Matrix([[1, 0, -2, 0],
[-2, 1, 0, 3],
[-1, 2, -6, 6]])
assert M.nullspace() == [Matrix([[2],
[4],
[1],
[0]]),
Matrix([[0],
[-3],
[0],
[1]])]
def test_P19():
w = symbols('w')
M = Matrix([[1, 1, 1, 1],
[w, x, y, z],
[w**2, x**2, y**2, z**2],
[w**3, x**3, y**3, z**3]])
assert M.det() == (w**3*x**2*y - w**3*x**2*z - w**3*x*y**2 + w**3*x*z**2
+ w**3*y**2*z - w**3*y*z**2 - w**2*x**3*y + w**2*x**3*z
+ w**2*x*y**3 - w**2*x*z**3 - w**2*y**3*z + w**2*y*z**3
+ w*x**3*y**2 - w*x**3*z**2 - w*x**2*y**3 + w*x**2*z**3
+ w*y**3*z**2 - w*y**2*z**3 - x**3*y**2*z + x**3*y*z**2
+ x**2*y**3*z - x**2*y*z**3 - x*y**3*z**2 + x*y**2*z**3
)
@XFAIL
def test_P20():
raise NotImplementedError("Matrix minimal polynomial not supported")
def test_P21():
M = Matrix([[5, -3, -7],
[-2, 1, 2],
[2, -3, -4]])
assert M.charpoly(x).as_expr() == x**3 - 2*x**2 - 5*x + 6
def test_P22():
d = 100
M = (2 - x)*eye(d)
assert M.eigenvals() == {-x + 2: d}
def test_P23():
M = Matrix([
[2, 1, 0, 0, 0],
[1, 2, 1, 0, 0],
[0, 1, 2, 1, 0],
[0, 0, 1, 2, 1],
[0, 0, 0, 1, 2]])
assert M.eigenvals() == {
S('1'): 1,
S('2'): 1,
S('3'): 1,
S('sqrt(3) + 2'): 1,
S('-sqrt(3) + 2'): 1}
def test_P24():
M = Matrix([[611, 196, -192, 407, -8, -52, -49, 29],
[196, 899, 113, -192, -71, -43, -8, -44],
[-192, 113, 899, 196, 61, 49, 8, 52],
[ 407, -192, 196, 611, 8, 44, 59, -23],
[ -8, -71, 61, 8, 411, -599, 208, 208],
[ -52, -43, 49, 44, -599, 411, 208, 208],
[ -49, -8, 8, 59, 208, 208, 99, -911],
[ 29, -44, 52, -23, 208, 208, -911, 99]])
assert M.eigenvals() == {
S('0'): 1,
S('10*sqrt(10405)'): 1,
S('100*sqrt(26) + 510'): 1,
S('1000'): 2,
S('-100*sqrt(26) + 510'): 1,
S('-10*sqrt(10405)'): 1,
S('1020'): 1}
def test_P25():
MF = N(Matrix([[ 611, 196, -192, 407, -8, -52, -49, 29],
[ 196, 899, 113, -192, -71, -43, -8, -44],
[-192, 113, 899, 196, 61, 49, 8, 52],
[ 407, -192, 196, 611, 8, 44, 59, -23],
[ -8, -71, 61, 8, 411, -599, 208, 208],
[ -52, -43, 49, 44, -599, 411, 208, 208],
[ -49, -8, 8, 59, 208, 208, 99, -911],
[ 29, -44, 52, -23, 208, 208, -911, 99]]))
ev_1 = sorted(MF.eigenvals(multiple=True))
ev_2 = sorted(
[-1020.0490184299969, 0.0, 0.09804864072151699, 1000.0, 1000.0,
1019.9019513592784, 1020.0, 1020.0490184299969])
for x, y in zip(ev_1, ev_2):
assert abs(x - y) < 1e-12
def test_P26():
a0, a1, a2, a3, a4 = symbols('a0 a1 a2 a3 a4')
M = Matrix([[-a4, -a3, -a2, -a1, -a0, 0, 0, 0, 0],
[ 1, 0, 0, 0, 0, 0, 0, 0, 0],
[ 0, 1, 0, 0, 0, 0, 0, 0, 0],
[ 0, 0, 1, 0, 0, 0, 0, 0, 0],
[ 0, 0, 0, 1, 0, 0, 0, 0, 0],
[ 0, 0, 0, 0, 0, -1, -1, 0, 0],
[ 0, 0, 0, 0, 0, 1, 0, 0, 0],
[ 0, 0, 0, 0, 0, 0, 1, -1, -1],
[ 0, 0, 0, 0, 0, 0, 0, 1, 0]])
assert M.eigenvals(error_when_incomplete=False) == {
S('-1/2 - sqrt(3)*I/2'): 2,
S('-1/2 + sqrt(3)*I/2'): 2}
def test_P27():
a = symbols('a')
M = Matrix([[a, 0, 0, 0, 0],
[0, 0, 0, 0, 1],
[0, 0, a, 0, 0],
[0, 0, 0, a, 0],
[0, -2, 0, 0, 2]])
# XXX: 2-arg Mul hack
def mul2(x, y):
return Mul(x, y, evaluate=False)
assert M.eigenvects() == [
(a, 3, [
Matrix([1, 0, 0, 0, 0]),
Matrix([0, 0, 1, 0, 0]),
Matrix([0, 0, 0, 1, 0])
]),
(1 - I, 1, [
Matrix([0, mul2(-S(1)/2, -1 - I), 0, 0, 1])
]),
(1 + I, 1, [
Matrix([0, mul2(-S(1)/2, -1 + I), 0, 0, 1])
]),
]
@XFAIL
def test_P28():
raise NotImplementedError("Generalized eigenvectors not supported \
https://github.com/sympy/sympy/issues/5293")
@XFAIL
def test_P29():
raise NotImplementedError("Generalized eigenvectors not supported \
https://github.com/sympy/sympy/issues/5293")
def test_P30():
M = Matrix([[1, 0, 0, 1, -1],
[0, 1, -2, 3, -3],
[0, 0, -1, 2, -2],
[1, -1, 1, 0, 1],
[1, -1, 1, -1, 2]])
_, J = M.jordan_form()
assert J == Matrix([[-1, 0, 0, 0, 0],
[0, 1, 1, 0, 0],
[0, 0, 1, 0, 0],
[0, 0, 0, 1, 1],
[0, 0, 0, 0, 1]])
@XFAIL
def test_P31():
raise NotImplementedError("Smith normal form not implemented")
def test_P32():
M = Matrix([[1, -2],
[2, 1]])
assert exp(M).rewrite(cos).simplify() == Matrix([[E*cos(2), -E*sin(2)],
[E*sin(2), E*cos(2)]])
def test_P33():
w, t = symbols('w t')
M = Matrix([[0, 1, 0, 0],
[0, 0, 0, 2*w],
[0, 0, 0, 1],
[0, -2*w, 3*w**2, 0]])
assert exp(M*t).rewrite(cos).expand() == Matrix([
[1, -3*t + 4*sin(t*w)/w, 6*t*w - 6*sin(t*w), -2*cos(t*w)/w + 2/w],
[0, 4*cos(t*w) - 3, -6*w*cos(t*w) + 6*w, 2*sin(t*w)],
[0, 2*cos(t*w)/w - 2/w, -3*cos(t*w) + 4, sin(t*w)/w],
[0, -2*sin(t*w), 3*w*sin(t*w), cos(t*w)]])
@XFAIL
def test_P34():
a, b, c = symbols('a b c', real=True)
M = Matrix([[a, 1, 0, 0, 0, 0],
[0, a, 0, 0, 0, 0],
[0, 0, b, 0, 0, 0],
[0, 0, 0, c, 1, 0],
[0, 0, 0, 0, c, 1],
[0, 0, 0, 0, 0, c]])
# raises exception, sin(M) not supported. exp(M*I) also not supported
# https://github.com/sympy/sympy/issues/6218
assert sin(M) == Matrix([[sin(a), cos(a), 0, 0, 0, 0],
[0, sin(a), 0, 0, 0, 0],
[0, 0, sin(b), 0, 0, 0],
[0, 0, 0, sin(c), cos(c), -sin(c)/2],
[0, 0, 0, 0, sin(c), cos(c)],
[0, 0, 0, 0, 0, sin(c)]])
@XFAIL
def test_P35():
M = pi/2*Matrix([[2, 1, 1],
[2, 3, 2],
[1, 1, 2]])
# raises exception, sin(M) not supported. exp(M*I) also not supported
# https://github.com/sympy/sympy/issues/6218
assert sin(M) == eye(3)
@XFAIL
def test_P36():
M = Matrix([[10, 7],
[7, 17]])
assert sqrt(M) == Matrix([[3, 1],
[1, 4]])
def test_P37():
M = Matrix([[1, 1, 0],
[0, 1, 0],
[0, 0, 1]])
assert M**S.Half == Matrix([[1, R(1, 2), 0],
[0, 1, 0],
[0, 0, 1]])
@XFAIL
def test_P38():
M=Matrix([[0, 1, 0],
[0, 0, 0],
[0, 0, 0]])
#raises ValueError: Matrix det == 0; not invertible
M**S.Half
@XFAIL
def test_P39():
"""
M=Matrix([
[1, 1],
[2, 2],
[3, 3]])
M.SVD()
"""
raise NotImplementedError("Singular value decomposition not implemented")
def test_P40():
r, t = symbols('r t', real=True)
M = Matrix([r*cos(t), r*sin(t)])
assert M.jacobian(Matrix([r, t])) == Matrix([[cos(t), -r*sin(t)],
[sin(t), r*cos(t)]])
def test_P41():
r, t = symbols('r t', real=True)
assert hessian(r**2*sin(t),(r,t)) == Matrix([[ 2*sin(t), 2*r*cos(t)],
[2*r*cos(t), -r**2*sin(t)]])
def test_P42():
assert wronskian([cos(x), sin(x)], x).simplify() == 1
def test_P43():
def __my_jacobian(M, Y):
return Matrix([M.diff(v).T for v in Y]).T
r, t = symbols('r t', real=True)
M = Matrix([r*cos(t), r*sin(t)])
assert __my_jacobian(M,[r,t]) == Matrix([[cos(t), -r*sin(t)],
[sin(t), r*cos(t)]])
def test_P44():
def __my_hessian(f, Y):
V = Matrix([diff(f, v) for v in Y])
return Matrix([V.T.diff(v) for v in Y])
r, t = symbols('r t', real=True)
assert __my_hessian(r**2*sin(t), (r, t)) == Matrix([
[ 2*sin(t), 2*r*cos(t)],
[2*r*cos(t), -r**2*sin(t)]])
def test_P45():
def __my_wronskian(Y, v):
M = Matrix([Matrix(Y).T.diff(x, n) for n in range(0, len(Y))])
return M.det()
assert __my_wronskian([cos(x), sin(x)], x).simplify() == 1
# Q1-Q6 Tensor tests missing
@XFAIL
def test_R1():
i, j, n = symbols('i j n', integer=True, positive=True)
xn = MatrixSymbol('xn', n, 1)
Sm = Sum((xn[i, 0] - Sum(xn[j, 0], (j, 0, n - 1))/n)**2, (i, 0, n - 1))
# sum does not calculate
# Unknown result
Sm.doit()
raise NotImplementedError('Unknown result')
@XFAIL
def test_R2():
m, b = symbols('m b')
i, n = symbols('i n', integer=True, positive=True)
xn = MatrixSymbol('xn', n, 1)
yn = MatrixSymbol('yn', n, 1)
f = Sum((yn[i, 0] - m*xn[i, 0] - b)**2, (i, 0, n - 1))
f1 = diff(f, m)
f2 = diff(f, b)
# raises TypeError: solveset() takes at most 2 arguments (3 given)
solveset((f1, f2), (m, b), domain=S.Reals)
@XFAIL
def test_R3():
n, k = symbols('n k', integer=True, positive=True)
sk = ((-1)**k) * (binomial(2*n, k))**2
Sm = Sum(sk, (k, 1, oo))
T = Sm.doit()
T2 = T.combsimp()
# returns -((-1)**n*factorial(2*n)
# - (factorial(n))**2)*exp_polar(-I*pi)/(factorial(n))**2
assert T2 == (-1)**n*binomial(2*n, n)
@XFAIL
def test_R4():
# Macsyma indefinite sum test case:
#(c15) /* Check whether the full Gosper algorithm is implemented
# => 1/2^(n + 1) binomial(n, k - 1) */
#closedform(indefsum(binomial(n, k)/2^n - binomial(n + 1, k)/2^(n + 1), k));
#Time= 2690 msecs
# (- n + k - 1) binomial(n + 1, k)
#(d15) - --------------------------------
# n
# 2 2 (n + 1)
#
#(c16) factcomb(makefact(%));
#Time= 220 msecs
# n!
#(d16) ----------------
# n
# 2 k! 2 (n - k)!
# Might be possible after fixing https://github.com/sympy/sympy/pull/1879
raise NotImplementedError("Indefinite sum not supported")
@XFAIL
def test_R5():
a, b, c, n, k = symbols('a b c n k', integer=True, positive=True)
sk = ((-1)**k)*(binomial(a + b, a + k)
*binomial(b + c, b + k)*binomial(c + a, c + k))
Sm = Sum(sk, (k, 1, oo))
T = Sm.doit() # hypergeometric series not calculated
assert T == factorial(a+b+c)/(factorial(a)*factorial(b)*factorial(c))
def test_R6():
n, k = symbols('n k', integer=True, positive=True)
gn = MatrixSymbol('gn', n + 2, 1)
Sm = Sum(gn[k, 0] - gn[k - 1, 0], (k, 1, n + 1))
assert Sm.doit() == -gn[0, 0] + gn[n + 1, 0]
def test_R7():
n, k = symbols('n k', integer=True, positive=True)
T = Sum(k**3,(k,1,n)).doit()
assert T.factor() == n**2*(n + 1)**2/4
@XFAIL
def test_R8():
n, k = symbols('n k', integer=True, positive=True)
Sm = Sum(k**2*binomial(n, k), (k, 1, n))
T = Sm.doit() #returns Piecewise function
assert T.combsimp() == n*(n + 1)*2**(n - 2)
def test_R9():
n, k = symbols('n k', integer=True, positive=True)
Sm = Sum(binomial(n, k - 1)/k, (k, 1, n + 1))
assert Sm.doit().simplify() == (2**(n + 1) - 1)/(n + 1)
@XFAIL
def test_R10():
n, m, r, k = symbols('n m r k', integer=True, positive=True)
Sm = Sum(binomial(n, k)*binomial(m, r - k), (k, 0, r))
T = Sm.doit()
T2 = T.combsimp().rewrite(factorial)
assert T2 == factorial(m + n)/(factorial(r)*factorial(m + n - r))
assert T2 == binomial(m + n, r).rewrite(factorial)
# rewrite(binomial) is not working.
# https://github.com/sympy/sympy/issues/7135
T3 = T2.rewrite(binomial)
assert T3 == binomial(m + n, r)
@XFAIL
def test_R11():
n, k = symbols('n k', integer=True, positive=True)
sk = binomial(n, k)*fibonacci(k)
Sm = Sum(sk, (k, 0, n))
T = Sm.doit()
# Fibonacci simplification not implemented
# https://github.com/sympy/sympy/issues/7134
assert T == fibonacci(2*n)
@XFAIL
def test_R12():
n, k = symbols('n k', integer=True, positive=True)
Sm = Sum(fibonacci(k)**2, (k, 0, n))
T = Sm.doit()
assert T == fibonacci(n)*fibonacci(n + 1)
@XFAIL
def test_R13():
n, k = symbols('n k', integer=True, positive=True)
Sm = Sum(sin(k*x), (k, 1, n))
T = Sm.doit() # Sum is not calculated
assert T.simplify() == cot(x/2)/2 - cos(x*(2*n + 1)/2)/(2*sin(x/2))
@XFAIL
def test_R14():
n, k = symbols('n k', integer=True, positive=True)
Sm = Sum(sin((2*k - 1)*x), (k, 1, n))
T = Sm.doit() # Sum is not calculated
assert T.simplify() == sin(n*x)**2/sin(x)
@XFAIL
def test_R15():
n, k = symbols('n k', integer=True, positive=True)
Sm = Sum(binomial(n - k, k), (k, 0, floor(n/2)))
T = Sm.doit() # Sum is not calculated
assert T.simplify() == fibonacci(n + 1)
def test_R16():
k = symbols('k', integer=True, positive=True)
Sm = Sum(1/k**2 + 1/k**3, (k, 1, oo))
assert Sm.doit() == zeta(3) + pi**2/6
def test_R17():
k = symbols('k', integer=True, positive=True)
assert abs(float(Sum(1/k**2 + 1/k**3, (k, 1, oo)))
- 2.8469909700078206) < 1e-15
def test_R18():
k = symbols('k', integer=True, positive=True)
Sm = Sum(1/(2**k*k**2), (k, 1, oo))
T = Sm.doit()
assert T.simplify() == -log(2)**2/2 + pi**2/12
@slow
@XFAIL
def test_R19():
k = symbols('k', integer=True, positive=True)
Sm = Sum(1/((3*k + 1)*(3*k + 2)*(3*k + 3)), (k, 0, oo))
T = Sm.doit()
# assert fails, T not simplified
assert T.simplify() == -log(3)/4 + sqrt(3)*pi/12
@XFAIL
def test_R20():
n, k = symbols('n k', integer=True, positive=True)
Sm = Sum(binomial(n, 4*k), (k, 0, oo))
T = Sm.doit()
# assert fails, T not simplified
assert T.simplify() == 2**(n/2)*cos(pi*n/4)/2 + 2**(n - 1)/2
@XFAIL
def test_R21():
k = symbols('k', integer=True, positive=True)
Sm = Sum(1/(sqrt(k*(k + 1)) * (sqrt(k) + sqrt(k + 1))), (k, 1, oo))
T = Sm.doit() # Sum not calculated
assert T.simplify() == 1
# test_R22 answer not available in Wester samples
# Sum(Sum(binomial(n, k)*binomial(n - k, n - 2*k)*x**n*y**(n - 2*k),
# (k, 0, floor(n/2))), (n, 0, oo)) with abs(x*y)<1?
@XFAIL
def test_R23():
n, k = symbols('n k', integer=True, positive=True)
Sm = Sum(Sum((factorial(n)/(factorial(k)**2*factorial(n - 2*k)))*
(x/y)**k*(x*y)**(n - k), (n, 2*k, oo)), (k, 0, oo))
# Missing how to express constraint abs(x*y)<1?
T = Sm.doit() # Sum not calculated
assert T == -1/sqrt(x**2*y**2 - 4*x**2 - 2*x*y + 1)
def test_R24():
m, k = symbols('m k', integer=True, positive=True)
Sm = Sum(Product(k/(2*k - 1), (k, 1, m)), (m, 2, oo))
assert Sm.doit() == pi/2
def test_S1():
k = symbols('k', integer=True, positive=True)
Pr = Product(gamma(k/3), (k, 1, 8))
assert Pr.doit().simplify() == 640*sqrt(3)*pi**3/6561
def test_S2():
n, k = symbols('n k', integer=True, positive=True)
assert Product(k, (k, 1, n)).doit() == factorial(n)
def test_S3():
n, k = symbols('n k', integer=True, positive=True)
assert Product(x**k, (k, 1, n)).doit().simplify() == x**(n*(n + 1)/2)
def test_S4():
n, k = symbols('n k', integer=True, positive=True)
assert Product(1 + 1/k, (k, 1, n -1)).doit().simplify() == n
def test_S5():
n, k = symbols('n k', integer=True, positive=True)
assert (Product((2*k - 1)/(2*k), (k, 1, n)).doit().gammasimp() ==
gamma(n + S.Half)/(sqrt(pi)*gamma(n + 1)))
@XFAIL
def test_S6():
n, k = symbols('n k', integer=True, positive=True)
# Product does not evaluate
assert (Product(x**2 -2*x*cos(k*pi/n) + 1, (k, 1, n - 1)).doit().simplify()
== (x**(2*n) - 1)/(x**2 - 1))
@XFAIL
def test_S7():
k = symbols('k', integer=True, positive=True)
Pr = Product((k**3 - 1)/(k**3 + 1), (k, 2, oo))
T = Pr.doit() # Product does not evaluate
assert T.simplify() == R(2, 3)
@XFAIL
def test_S8():
k = symbols('k', integer=True, positive=True)
Pr = Product(1 - 1/(2*k)**2, (k, 1, oo))
T = Pr.doit()
# Product does not evaluate
assert T.simplify() == 2/pi
@XFAIL
def test_S9():
k = symbols('k', integer=True, positive=True)
Pr = Product(1 + (-1)**(k + 1)/(2*k - 1), (k, 1, oo))
T = Pr.doit()
# Product produces 0
# https://github.com/sympy/sympy/issues/7133
assert T.simplify() == sqrt(2)
@XFAIL
def test_S10():
k = symbols('k', integer=True, positive=True)
Pr = Product((k*(k + 1) + 1 + I)/(k*(k + 1) + 1 - I), (k, 0, oo))
T = Pr.doit()
# Product does not evaluate
assert T.simplify() == -1
def test_T1():
assert limit((1 + 1/n)**n, n, oo) == E
assert limit((1 - cos(x))/x**2, x, 0) == S.Half
def test_T2():
assert limit((3**x + 5**x)**(1/x), x, oo) == 5
def test_T3():
assert limit(log(x)/(log(x) + sin(x)), x, oo) == 1
def test_T4():
assert limit((exp(x*exp(-x)/(exp(-x) + exp(-2*x**2/(x + 1))))
- exp(x))/x, x, oo) == -exp(2)
def test_T5():
assert limit(x*log(x)*log(x*exp(x) - x**2)**2/log(log(x**2
+ 2*exp(exp(3*x**3*log(x))))), x, oo) == R(1, 3)
def test_T6():
assert limit(1/n * factorial(n)**(1/n), n, oo) == exp(-1)
def test_T7():
limit(1/n * gamma(n + 1)**(1/n), n, oo)
def test_T8():
a, z = symbols('a z', real=True, positive=True)
assert limit(gamma(z + a)/gamma(z)*exp(-a*log(z)), z, oo) == 1
@XFAIL
def test_T9():
z, k = symbols('z k', real=True, positive=True)
# raises NotImplementedError:
# Don't know how to calculate the mrv of '(1, k)'
assert limit(hyper((1, k), (1,), z/k), k, oo) == exp(z)
@XFAIL
def test_T10():
# No longer raises PoleError, but should return euler-mascheroni constant
assert limit(zeta(x) - 1/(x - 1), x, 1) == integrate(-1/x + 1/floor(x), (x, 1, oo))
@XFAIL
def test_T11():
n, k = symbols('n k', integer=True, positive=True)
# evaluates to 0
assert limit(n**x/(x*product((1 + x/k), (k, 1, n))), n, oo) == gamma(x)
@XFAIL
def test_T12():
x, t = symbols('x t', real=True)
# Does not evaluate the limit but returns an expression with erf
assert limit(x * integrate(exp(-t**2), (t, 0, x))/(1 - exp(-x**2)),
x, 0) == 1
def test_T13():
x = symbols('x', real=True)
assert [limit(x/abs(x), x, 0, dir='-'),
limit(x/abs(x), x, 0, dir='+')] == [-1, 1]
def test_T14():
x = symbols('x', real=True)
assert limit(atan(-log(x)), x, 0, dir='+') == pi/2
def test_U1():
x = symbols('x', real=True)
assert diff(abs(x), x) == sign(x)
def test_U2():
f = Lambda(x, Piecewise((-x, x < 0), (x, x >= 0)))
assert diff(f(x), x) == Piecewise((-1, x < 0), (1, x >= 0))
def test_U3():
f = Lambda(x, Piecewise((x**2 - 1, x == 1), (x**3, x != 1)))
f1 = Lambda(x, diff(f(x), x))
assert f1(x) == 3*x**2
assert f1(1) == 3
@XFAIL
def test_U4():
n = symbols('n', integer=True, positive=True)
x = symbols('x', real=True)
d = diff(x**n, x, n)
assert d.rewrite(factorial) == factorial(n)
def test_U5():
# issue 6681
t = symbols('t')
ans = (
Derivative(f(g(t)), g(t))*Derivative(g(t), (t, 2)) +
Derivative(f(g(t)), (g(t), 2))*Derivative(g(t), t)**2)
assert f(g(t)).diff(t, 2) == ans
assert ans.doit() == ans
def test_U6():
h = Function('h')
T = integrate(f(y), (y, h(x), g(x)))
assert T.diff(x) == (
f(g(x))*Derivative(g(x), x) - f(h(x))*Derivative(h(x), x))
@XFAIL
def test_U7():
p, t = symbols('p t', real=True)
# Exact differential => d(V(P, T)) => dV/dP DP + dV/dT DT
# raises ValueError: Since there is more than one variable in the
# expression, the variable(s) of differentiation must be supplied to
# differentiate f(p,t)
diff(f(p, t))
def test_U8():
x, y = symbols('x y', real=True)
eq = cos(x*y) + x
# If SymPy had implicit_diff() function this hack could be avoided
# TODO: Replace solve with solveset, current test fails for solveset
assert idiff(y - eq, y, x) == (-y*sin(x*y) + 1)/(x*sin(x*y) + 1)
def test_U9():
# Wester sample case for Maple:
# O29 := diff(f(x, y), x) + diff(f(x, y), y);
# /d \ /d \
# |-- f(x, y)| + |-- f(x, y)|
# \dx / \dy /
#
# O30 := factor(subs(f(x, y) = g(x^2 + y^2), %));
# 2 2
# 2 D(g)(x + y ) (x + y)
x, y = symbols('x y', real=True)
su = diff(f(x, y), x) + diff(f(x, y), y)
s2 = su.subs(f(x, y), g(x**2 + y**2))
s3 = s2.doit().factor()
# Subs not performed, s3 = 2*(x + y)*Subs(Derivative(
# g(_xi_1), _xi_1), _xi_1, x**2 + y**2)
# Derivative(g(x*2 + y**2), x**2 + y**2) is not valid in SymPy,
# and probably will remain that way. You can take derivatives with respect
# to other expressions only if they are atomic, like a symbol or a
# function.
# D operator should be added to SymPy
# See https://github.com/sympy/sympy/issues/4719.
assert s3 == (x + y)*Subs(Derivative(g(x), x), x, x**2 + y**2)*2
def test_U10():
# see issue 2519:
assert residue((z**3 + 5)/((z**4 - 1)*(z + 1)), z, -1) == R(-9, 4)
@XFAIL
def test_U11():
# assert (2*dx + dz) ^ (3*dx + dy + dz) ^ (dx + dy + 4*dz) == 8*dx ^ dy ^dz
raise NotImplementedError
@XFAIL
def test_U12():
# Wester sample case:
# (c41) /* d(3 x^5 dy /\ dz + 5 x y^2 dz /\ dx + 8 z dx /\ dy)
# => (15 x^4 + 10 x y + 8) dx /\ dy /\ dz */
# factor(ext_diff(3*x^5 * dy ~ dz + 5*x*y^2 * dz ~ dx + 8*z * dx ~ dy));
# 4
# (d41) (10 x y + 15 x + 8) dx dy dz
raise NotImplementedError(
"External diff of differential form not supported")
def test_U13():
assert minimum(x**4 - x + 1, x) == -3*2**R(1,3)/8 + 1
@XFAIL
def test_U14():
#f = 1/(x**2 + y**2 + 1)
#assert [minimize(f), maximize(f)] == [0,1]
raise NotImplementedError("minimize(), maximize() not supported")
@XFAIL
def test_U15():
raise NotImplementedError("minimize() not supported and also solve does \
not support multivariate inequalities")
@XFAIL
def test_U16():
raise NotImplementedError("minimize() not supported in SymPy and also \
solve does not support multivariate inequalities")
@XFAIL
def test_U17():
raise NotImplementedError("Linear programming, symbolic simplex not \
supported in SymPy")
def test_V1():
x = symbols('x', real=True)
assert integrate(abs(x), x) == Piecewise((-x**2/2, x <= 0), (x**2/2, True))
def test_V2():
assert integrate(Piecewise((-x, x < 0), (x, x >= 0)), x
) == Piecewise((-x**2/2, x < 0), (x**2/2, True))
def test_V3():
assert integrate(1/(x**3 + 2),x).diff().simplify() == 1/(x**3 + 2)
def test_V4():
assert integrate(2**x/sqrt(1 + 4**x), x) == asinh(2**x)/log(2)
@XFAIL
def test_V5():
# Returns (-45*x**2 + 80*x - 41)/(5*sqrt(2*x - 1)*(4*x**2 - 4*x + 1))
assert (integrate((3*x - 5)**2/(2*x - 1)**R(7, 2), x).simplify() ==
(-41 + 80*x - 45*x**2)/(5*(2*x - 1)**R(5, 2)))
@XFAIL
def test_V6():
# returns RootSum(40*_z**2 - 1, Lambda(_i, _i*log(-4*_i + exp(-m*x))))/m
assert (integrate(1/(2*exp(m*x) - 5*exp(-m*x)), x) == sqrt(10)*(
log(2*exp(m*x) - sqrt(10)) - log(2*exp(m*x) + sqrt(10)))/(20*m))
def test_V7():
r1 = integrate(sinh(x)**4/cosh(x)**2)
assert r1.simplify() == x*R(-3, 2) + sinh(x)**3/(2*cosh(x)) + 3*tanh(x)/2
@XFAIL
def test_V8_V9():
#Macsyma test case:
#(c27) /* This example involves several symbolic parameters
# => 1/sqrt(b^2 - a^2) log([sqrt(b^2 - a^2) tan(x/2) + a + b]/
# [sqrt(b^2 - a^2) tan(x/2) - a - b]) (a^2 < b^2)
# [Gradshteyn and Ryzhik 2.553(3)] */
#assume(b^2 > a^2)$
#(c28) integrate(1/(a + b*cos(x)), x);
#(c29) trigsimp(ratsimp(diff(%, x)));
# 1
#(d29) ------------
# b cos(x) + a
raise NotImplementedError(
"Integrate with assumption not supported")
def test_V10():
assert integrate(1/(3 + 3*cos(x) + 4*sin(x)), x) == log(tan(x/2) + R(3, 4))/4
def test_V11():
r1 = integrate(1/(4 + 3*cos(x) + 4*sin(x)), x)
r2 = factor(r1)
assert (logcombine(r2, force=True) ==
log(((tan(x/2) + 1)/(tan(x/2) + 7))**R(1, 3)))
def test_V12():
r1 = integrate(1/(5 + 3*cos(x) + 4*sin(x)), x)
assert r1 == -1/(tan(x/2) + 2)
@XFAIL
def test_V13():
r1 = integrate(1/(6 + 3*cos(x) + 4*sin(x)), x)
# expression not simplified, returns: -sqrt(11)*I*log(tan(x/2) + 4/3
# - sqrt(11)*I/3)/11 + sqrt(11)*I*log(tan(x/2) + 4/3 + sqrt(11)*I/3)/11
assert r1.simplify() == 2*sqrt(11)*atan(sqrt(11)*(3*tan(x/2) + 4)/11)/11
@slow
@XFAIL
def test_V14():
r1 = integrate(log(abs(x**2 - y**2)), x)
# Piecewise result does not simplify to the desired result.
assert (r1.simplify() == x*log(abs(x**2 - y**2))
+ y*log(x + y) - y*log(x - y) - 2*x)
def test_V15():
r1 = integrate(x*acot(x/y), x)
assert simplify(r1 - (x*y + (x**2 + y**2)*acot(x/y))/2) == 0
@XFAIL
def test_V16():
# Integral not calculated
assert integrate(cos(5*x)*Ci(2*x), x) == Ci(2*x)*sin(5*x)/5 - (Si(3*x) + Si(7*x))/10
@XFAIL
def test_V17():
r1 = integrate((diff(f(x), x)*g(x)
- f(x)*diff(g(x), x))/(f(x)**2 - g(x)**2), x)
# integral not calculated
assert simplify(r1 - (f(x) - g(x))/(f(x) + g(x))/2) == 0
@XFAIL
def test_W1():
# The function has a pole at y.
# The integral has a Cauchy principal value of zero but SymPy returns -I*pi
# https://github.com/sympy/sympy/issues/7159
assert integrate(1/(x - y), (x, y - 1, y + 1)) == 0
@XFAIL
def test_W2():
# The function has a pole at y.
# The integral is divergent but SymPy returns -2
# https://github.com/sympy/sympy/issues/7160
# Test case in Macsyma:
# (c6) errcatch(integrate(1/(x - a)^2, x, a - 1, a + 1));
# Integral is divergent
assert integrate(1/(x - y)**2, (x, y - 1, y + 1)) is zoo
@XFAIL
@slow
def test_W3():
# integral is not calculated
# https://github.com/sympy/sympy/issues/7161
assert integrate(sqrt(x + 1/x - 2), (x, 0, 1)) == R(4, 3)
@XFAIL
@slow
def test_W4():
# integral is not calculated
assert integrate(sqrt(x + 1/x - 2), (x, 1, 2)) == -2*sqrt(2)/3 + R(4, 3)
@XFAIL
@slow
def test_W5():
# integral is not calculated
assert integrate(sqrt(x + 1/x - 2), (x, 0, 2)) == -2*sqrt(2)/3 + R(8, 3)
@XFAIL
@slow
def test_W6():
# integral is not calculated
assert integrate(sqrt(2 - 2*cos(2*x))/2, (x, pi*R(-3, 4), -pi/4)) == sqrt(2)
def test_W7():
a = symbols('a', real=True, positive=True)
r1 = integrate(cos(x)/(x**2 + a**2), (x, -oo, oo))
assert r1.simplify() == pi*exp(-a)/a
@XFAIL
def test_W8():
# Test case in Mathematica:
# In[19]:= Integrate[t^(a - 1)/(1 + t), {t, 0, Infinity},
# Assumptions -> 0 < a < 1]
# Out[19]= Pi Csc[a Pi]
raise NotImplementedError(
"Integrate with assumption 0 < a < 1 not supported")
@XFAIL
def test_W9():
# Integrand with a residue at infinity => -2 pi [sin(pi/5) + sin(2pi/5)]
# (principal value) [Levinson and Redheffer, p. 234] *)
r1 = integrate(5*x**3/(1 + x + x**2 + x**3 + x**4), (x, -oo, oo))
r2 = r1.doit()
assert r2 == -2*pi*(sqrt(-sqrt(5)/8 + 5/8) + sqrt(sqrt(5)/8 + 5/8))
@XFAIL
def test_W10():
# integrate(1/[1 + x + x^2 + ... + x^(2 n)], x = -infinity..infinity) =
# 2 pi/(2 n + 1) [1 + cos(pi/[2 n + 1])] csc(2 pi/[2 n + 1])
# [Levinson and Redheffer, p. 255] => 2 pi/5 [1 + cos(pi/5)] csc(2 pi/5) */
r1 = integrate(x/(1 + x + x**2 + x**4), (x, -oo, oo))
r2 = r1.doit()
assert r2 == 2*pi*(sqrt(5)/4 + 5/4)*csc(pi*R(2, 5))/5
@XFAIL
def test_W11():
# integral not calculated
assert (integrate(sqrt(1 - x**2)/(1 + x**2), (x, -1, 1)) ==
pi*(-1 + sqrt(2)))
def test_W12():
p = symbols('p', real=True, positive=True)
q = symbols('q', real=True)
r1 = integrate(x*exp(-p*x**2 + 2*q*x), (x, -oo, oo))
assert r1.simplify() == sqrt(pi)*q*exp(q**2/p)/p**R(3, 2)
@XFAIL
def test_W13():
# Integral not calculated. Expected result is 2*(Euler_mascheroni_constant)
r1 = integrate(1/log(x) + 1/(1 - x) - log(log(1/x)), (x, 0, 1))
assert r1 == 2*EulerGamma
def test_W14():
assert integrate(sin(x)/x*exp(2*I*x), (x, -oo, oo)) == 0
@XFAIL
def test_W15():
# integral not calculated
assert integrate(log(gamma(x))*cos(6*pi*x), (x, 0, 1)) == R(1, 12)
def test_W16():
assert integrate((1 + x)**3*legendre_poly(1, x)*legendre_poly(2, x),
(x, -1, 1)) == R(36, 35)
def test_W17():
a, b = symbols('a b', real=True, positive=True)
assert integrate(exp(-a*x)*besselj(0, b*x),
(x, 0, oo)) == 1/(b*sqrt(a**2/b**2 + 1))
def test_W18():
assert integrate((besselj(1, x)/x)**2, (x, 0, oo)) == 4/(3*pi)
@XFAIL
def test_W19():
# Integral not calculated
# Expected result is (cos 7 - 1)/7 [Gradshteyn and Ryzhik 6.782(3)]
assert integrate(Ci(x)*besselj(0, 2*sqrt(7*x)), (x, 0, oo)) == (cos(7) - 1)/7
@XFAIL
def test_W20():
# integral not calculated
assert (integrate(x**2*polylog(3, 1/(x + 1)), (x, 0, 1)) ==
-pi**2/36 - R(17, 108) + zeta(3)/4 +
(-pi**2/2 - 4*log(2) + log(2)**2 + 35/3)*log(2)/9)
def test_W21():
assert abs(N(integrate(x**2*polylog(3, 1/(x + 1)), (x, 0, 1)))
- 0.210882859565594) < 1e-15
def test_W22():
t, u = symbols('t u', real=True)
s = Lambda(x, Piecewise((1, And(x >= 1, x <= 2)), (0, True)))
assert integrate(s(t)*cos(t), (t, 0, u)) == Piecewise(
(0, u < 0),
(-sin(Min(1, u)) + sin(Min(2, u)), True))
@slow
def test_W23():
a, b = symbols('a b', real=True, positive=True)
r1 = integrate(integrate(x/(x**2 + y**2), (x, a, b)), (y, -oo, oo))
assert r1.collect(pi) == pi*(-a + b)
def test_W23b():
# like W23 but limits are reversed
a, b = symbols('a b', real=True, positive=True)
r2 = integrate(integrate(x/(x**2 + y**2), (y, -oo, oo)), (x, a, b))
assert r2.collect(pi) == pi*(-a + b)
@XFAIL
@slow
def test_W24():
if ON_TRAVIS:
skip("Too slow for travis.")
# Not that slow, but does not fully evaluate so simplify is slow.
# Maybe also require doit()
x, y = symbols('x y', real=True)
r1 = integrate(integrate(sqrt(x**2 + y**2), (x, 0, 1)), (y, 0, 1))
assert (r1 - (sqrt(2) + asinh(1))/3).simplify() == 0
@XFAIL
@slow
def test_W25():
if ON_TRAVIS:
skip("Too slow for travis.")
a, x, y = symbols('a x y', real=True)
i1 = integrate(
sin(a)*sin(y)/sqrt(1 - sin(a)**2*sin(x)**2*sin(y)**2),
(x, 0, pi/2))
i2 = integrate(i1, (y, 0, pi/2))
assert (i2 - pi*a/2).simplify() == 0
def test_W26():
x, y = symbols('x y', real=True)
assert integrate(integrate(abs(y - x**2), (y, 0, 2)),
(x, -1, 1)) == R(46, 15)
def test_W27():
a, b, c = symbols('a b c')
assert integrate(integrate(integrate(1, (z, 0, c*(1 - x/a - y/b))),
(y, 0, b*(1 - x/a))),
(x, 0, a)) == a*b*c/6
def test_X1():
v, c = symbols('v c', real=True)
assert (series(1/sqrt(1 - (v/c)**2), v, x0=0, n=8) ==
5*v**6/(16*c**6) + 3*v**4/(8*c**4) + v**2/(2*c**2) + 1 + O(v**8))
def test_X2():
v, c = symbols('v c', real=True)
s1 = series(1/sqrt(1 - (v/c)**2), v, x0=0, n=8)
assert (1/s1**2).series(v, x0=0, n=8) == -v**2/c**2 + 1 + O(v**8)
def test_X3():
s1 = (sin(x).series()/cos(x).series()).series()
s2 = tan(x).series()
assert s2 == x + x**3/3 + 2*x**5/15 + O(x**6)
assert s1 == s2
def test_X4():
s1 = log(sin(x)/x).series()
assert s1 == -x**2/6 - x**4/180 + O(x**6)
assert log(series(sin(x)/x)).series() == s1
@XFAIL
def test_X5():
# test case in Mathematica syntax:
# In[21]:= (* => [a f'(a d) + g(b d) + integrate(h(c y), y = 0..d)]
# + [a^2 f''(a d) + b g'(b d) + h(c d)] (x - d) *)
# In[22]:= D[f[a*x], x] + g[b*x] + Integrate[h[c*y], {y, 0, x}]
# Out[22]= g[b x] + Integrate[h[c y], {y, 0, x}] + a f'[a x]
# In[23]:= Series[%, {x, d, 1}]
# Out[23]= (g[b d] + Integrate[h[c y], {y, 0, d}] + a f'[a d]) +
# 2 2
# (h[c d] + b g'[b d] + a f''[a d]) (-d + x) + O[-d + x]
h = Function('h')
a, b, c, d = symbols('a b c d', real=True)
# series() raises NotImplementedError:
# The _eval_nseries method should be added to <class
# 'sympy.core.function.Subs'> to give terms up to O(x**n) at x=0
series(diff(f(a*x), x) + g(b*x) + integrate(h(c*y), (y, 0, x)),
x, x0=d, n=2)
# assert missing, until exception is removed
def test_X6():
# Taylor series of nonscalar objects (noncommutative multiplication)
# expected result => (B A - A B) t^2/2 + O(t^3) [Stanly Steinberg]
a, b = symbols('a b', commutative=False, scalar=False)
assert (series(exp((a + b)*x) - exp(a*x) * exp(b*x), x, x0=0, n=3) ==
x**2*(-a*b/2 + b*a/2) + O(x**3))
def test_X7():
# => sum( Bernoulli[k]/k! x^(k - 2), k = 1..infinity )
# = 1/x^2 - 1/(2 x) + 1/12 - x^2/720 + x^4/30240 + O(x^6)
# [Levinson and Redheffer, p. 173]
assert (series(1/(x*(exp(x) - 1)), x, 0, 7) == x**(-2) - 1/(2*x) +
R(1, 12) - x**2/720 + x**4/30240 - x**6/1209600 + O(x**7))
def test_X8():
# Puiseux series (terms with fractional degree):
# => 1/sqrt(x - 3/2 pi) + (x - 3/2 pi)^(3/2) / 12 + O([x - 3/2 pi]^(7/2))
# see issue 7167:
x = symbols('x', real=True)
assert (series(sqrt(sec(x)), x, x0=pi*3/2, n=4) ==
1/sqrt(x - pi*R(3, 2)) + (x - pi*R(3, 2))**R(3, 2)/12 +
(x - pi*R(3, 2))**R(7, 2)/160 + O((x - pi*R(3, 2))**4, (x, pi*R(3, 2))))
def test_X9():
assert (series(x**x, x, x0=0, n=4) == 1 + x*log(x) + x**2*log(x)**2/2 +
x**3*log(x)**3/6 + O(x**4*log(x)**4))
def test_X10():
z, w = symbols('z w')
assert (series(log(sinh(z)) + log(cosh(z + w)), z, x0=0, n=2) ==
log(cosh(w)) + log(z) + z*sinh(w)/cosh(w) + O(z**2))
def test_X11():
z, w = symbols('z w')
assert (series(log(sinh(z) * cosh(z + w)), z, x0=0, n=2) ==
log(cosh(w)) + log(z) + z*sinh(w)/cosh(w) + O(z**2))
@XFAIL
def test_X12():
# Look at the generalized Taylor series around x = 1
# Result => (x - 1)^a/e^b [1 - (a + 2 b) (x - 1) / 2 + O((x - 1)^2)]
a, b, x = symbols('a b x', real=True)
# series returns O(log(x-1)**2)
# https://github.com/sympy/sympy/issues/7168
assert (series(log(x)**a*exp(-b*x), x, x0=1, n=2) ==
(x - 1)**a/exp(b)*(1 - (a + 2*b)*(x - 1)/2 + O((x - 1)**2)))
def test_X13():
assert series(sqrt(2*x**2 + 1), x, x0=oo, n=1) == sqrt(2)*x + O(1/x, (x, oo))
@XFAIL
def test_X14():
# Wallis' product => 1/sqrt(pi n) + ... [Knopp, p. 385]
assert series(1/2**(2*n)*binomial(2*n, n),
n, x==oo, n=1) == 1/(sqrt(pi)*sqrt(n)) + O(1/x, (x, oo))
@SKIP("https://github.com/sympy/sympy/issues/7164")
def test_X15():
# => 0!/x - 1!/x^2 + 2!/x^3 - 3!/x^4 + O(1/x^5) [Knopp, p. 544]
x, t = symbols('x t', real=True)
# raises RuntimeError: maximum recursion depth exceeded
# https://github.com/sympy/sympy/issues/7164
# 2019-02-17: Raises
# PoleError:
# Asymptotic expansion of Ei around [-oo] is not implemented.
e1 = integrate(exp(-t)/t, (t, x, oo))
assert (series(e1, x, x0=oo, n=5) ==
6/x**4 + 2/x**3 - 1/x**2 + 1/x + O(x**(-5), (x, oo)))
def test_X16():
# Multivariate Taylor series expansion => 1 - (x^2 + 2 x y + y^2)/2 + O(x^4)
assert (series(cos(x + y), x + y, x0=0, n=4) == 1 - (x + y)**2/2 +
O(x**4 + x**3*y + x**2*y**2 + x*y**3 + y**4, x, y))
@XFAIL
def test_X17():
# Power series (compute the general formula)
# (c41) powerseries(log(sin(x)/x), x, 0);
# /aquarius/data2/opt/local/macsyma_422/library1/trgred.so being loaded.
# inf
# ==== i1 2 i1 2 i1
# \ (- 1) 2 bern(2 i1) x
# (d41) > ------------------------------
# / 2 i1 (2 i1)!
# ====
# i1 = 1
# fps does not calculate
assert fps(log(sin(x)/x)) == \
Sum((-1)**k*2**(2*k - 1)*bernoulli(2*k)*x**(2*k)/(k*factorial(2*k)), (k, 1, oo))
@XFAIL
def test_X18():
# Power series (compute the general formula). Maple FPS:
# > FormalPowerSeries(exp(-x)*sin(x), x = 0);
# infinity
# ----- (1/2 k) k
# \ 2 sin(3/4 k Pi) x
# ) -------------------------
# / k!
# -----
#
# Now, sympy returns
# oo
# _____
# \ `
# \ / k k\
# \ k |I*(-1 - I) I*(-1 + I) |
# \ x *|----------- - -----------|
# / \ 2 2 /
# / ------------------------------
# / k!
# /____,
# k = 0
k = Dummy('k')
assert fps(exp(-x)*sin(x)) == \
Sum(2**(S.Half*k)*sin(R(3, 4)*k*pi)*x**k/factorial(k), (k, 0, oo))
@XFAIL
def test_X19():
# (c45) /* Derive an explicit Taylor series solution of y as a function of
# x from the following implicit relation:
# y = x - 1 + (x - 1)^2/2 + 2/3 (x - 1)^3 + (x - 1)^4 +
# 17/10 (x - 1)^5 + ...
# */
# x = sin(y) + cos(y);
# Time= 0 msecs
# (d45) x = sin(y) + cos(y)
#
# (c46) taylor_revert(%, y, 7);
raise NotImplementedError("Solve using series not supported. \
Inverse Taylor series expansion also not supported")
@XFAIL
def test_X20():
# Pade (rational function) approximation => (2 - x)/(2 + x)
# > numapprox[pade](exp(-x), x = 0, [1, 1]);
# bytes used=9019816, alloc=3669344, time=13.12
# 1 - 1/2 x
# ---------
# 1 + 1/2 x
# mpmath support numeric Pade approximant but there is
# no symbolic implementation in SymPy
# https://en.wikipedia.org/wiki/Pad%C3%A9_approximant
raise NotImplementedError("Symbolic Pade approximant not supported")
def test_X21():
"""
Test whether `fourier_series` of x periodical on the [-p, p] interval equals
`- (2 p / pi) sum( (-1)^n / n sin(n pi x / p), n = 1..infinity )`.
"""
p = symbols('p', positive=True)
n = symbols('n', positive=True, integer=True)
s = fourier_series(x, (x, -p, p))
# All cosine coefficients are equal to 0
assert s.an.formula == 0
# Check for sine coefficients
assert s.bn.formula.subs(s.bn.variables[0], 0) == 0
assert s.bn.formula.subs(s.bn.variables[0], n) == \
-2*p/pi * (-1)**n / n * sin(n*pi*x/p)
@XFAIL
def test_X22():
# (c52) /* => p / 2
# - (2 p / pi^2) sum( [1 - (-1)^n] cos(n pi x / p) / n^2,
# n = 1..infinity ) */
# fourier_series(abs(x), x, p);
# p
# (e52) a = -
# 0 2
#
# %nn
# (2 (- 1) - 2) p
# (e53) a = ------------------
# %nn 2 2
# %pi %nn
#
# (e54) b = 0
# %nn
#
# Time= 5290 msecs
# inf %nn %pi %nn x
# ==== (2 (- 1) - 2) cos(---------)
# \ p
# p > -------------------------------
# / 2
# ==== %nn
# %nn = 1 p
# (d54) ----------------------------------------- + -
# 2 2
# %pi
raise NotImplementedError("Fourier series not supported")
def test_Y1():
t = symbols('t', real=True, positive=True)
w = symbols('w', real=True)
s = symbols('s')
F, _, _ = laplace_transform(cos((w - 1)*t), t, s)
assert F == s/(s**2 + (w - 1)**2)
def test_Y2():
t = symbols('t', real=True, positive=True)
w = symbols('w', real=True)
s = symbols('s')
f = inverse_laplace_transform(s/(s**2 + (w - 1)**2), s, t)
assert f == cos(t*w - t)
def test_Y3():
t = symbols('t', real=True, positive=True)
w = symbols('w', real=True)
s = symbols('s')
F, _, _ = laplace_transform(sinh(w*t)*cosh(w*t), t, s)
assert F == w/(s**2 - 4*w**2)
def test_Y4():
t = symbols('t', real=True, positive=True)
s = symbols('s')
F, _, _ = laplace_transform(erf(3/sqrt(t)), t, s)
assert F == (1 - exp(-6*sqrt(s)))/s
@XFAIL
def test_Y5_Y6():
# Solve y'' + y = 4 [H(t - 1) - H(t - 2)], y(0) = 1, y'(0) = 0 where H is the
# Heaviside (unit step) function (the RHS describes a pulse of magnitude 4 and
# duration 1). See David A. Sanchez, Richard C. Allen, Jr. and Walter T.
# Kyner, _Differential Equations: An Introduction_, Addison-Wesley Publishing
# Company, 1983, p. 211. First, take the Laplace transform of the ODE
# => s^2 Y(s) - s + Y(s) = 4/s [e^(-s) - e^(-2 s)]
# where Y(s) is the Laplace transform of y(t)
t = symbols('t', real=True, positive=True)
s = symbols('s')
y = Function('y')
F, _, _ = laplace_transform(diff(y(t), t, 2)
+ y(t)
- 4*(Heaviside(t - 1)
- Heaviside(t - 2)), t, s)
# Laplace transform for diff() not calculated
# https://github.com/sympy/sympy/issues/7176
assert (F == s**2*LaplaceTransform(y(t), t, s) - s
+ LaplaceTransform(y(t), t, s) - 4*exp(-s)/s + 4*exp(-2*s)/s)
# TODO implement second part of test case
# Now, solve for Y(s) and then take the inverse Laplace transform
# => Y(s) = s/(s^2 + 1) + 4 [1/s - s/(s^2 + 1)] [e^(-s) - e^(-2 s)]
# => y(t) = cos t + 4 {[1 - cos(t - 1)] H(t - 1) - [1 - cos(t - 2)] H(t - 2)}
@XFAIL
def test_Y7():
# What is the Laplace transform of an infinite square wave?
# => 1/s + 2 sum( (-1)^n e^(- s n a)/s, n = 1..infinity )
# [Sanchez, Allen and Kyner, p. 213]
t = symbols('t', real=True, positive=True)
a = symbols('a', real=True)
s = symbols('s')
F, _, _ = laplace_transform(1 + 2*Sum((-1)**n*Heaviside(t - n*a),
(n, 1, oo)), t, s)
# returns 2*LaplaceTransform(Sum((-1)**n*Heaviside(-a*n + t),
# (n, 1, oo)), t, s) + 1/s
# https://github.com/sympy/sympy/issues/7177
assert F == 2*Sum((-1)**n*exp(-a*n*s)/s, (n, 1, oo)) + 1/s
@XFAIL
def test_Y8():
assert fourier_transform(1, x, z) == DiracDelta(z)
def test_Y9():
assert (fourier_transform(exp(-9*x**2), x, z) ==
sqrt(pi)*exp(-pi**2*z**2/9)/3)
def test_Y10():
assert (fourier_transform(abs(x)*exp(-3*abs(x)), x, z) ==
(-8*pi**2*z**2 + 18)/(16*pi**4*z**4 + 72*pi**2*z**2 + 81))
@SKIP("https://github.com/sympy/sympy/issues/7181")
@slow
def test_Y11():
# => pi cot(pi s) (0 < Re s < 1) [Gradshteyn and Ryzhik 17.43(5)]
x, s = symbols('x s')
# raises RuntimeError: maximum recursion depth exceeded
# https://github.com/sympy/sympy/issues/7181
# Update 2019-02-17 raises:
# TypeError: cannot unpack non-iterable MellinTransform object
F, _, _ = mellin_transform(1/(1 - x), x, s)
assert F == pi*cot(pi*s)
@XFAIL
def test_Y12():
# => 2^(s - 4) gamma(s/2)/gamma(4 - s/2) (0 < Re s < 1)
# [Gradshteyn and Ryzhik 17.43(16)]
x, s = symbols('x s')
# returns Wrong value -2**(s - 4)*gamma(s/2 - 3)/gamma(-s/2 + 1)
# https://github.com/sympy/sympy/issues/7182
F, _, _ = mellin_transform(besselj(3, x)/x**3, x, s)
assert F == -2**(s - 4)*gamma(s/2)/gamma(-s/2 + 4)
@XFAIL
def test_Y13():
# Z[H(t - m T)] => z/[z^m (z - 1)] (H is the Heaviside (unit step) function) z
raise NotImplementedError("z-transform not supported")
@XFAIL
def test_Y14():
# Z[H(t - m T)] => z/[z^m (z - 1)] (H is the Heaviside (unit step) function)
raise NotImplementedError("z-transform not supported")
def test_Z1():
r = Function('r')
assert (rsolve(r(n + 2) - 2*r(n + 1) + r(n) - 2, r(n),
{r(0): 1, r(1): m}).simplify() == n**2 + n*(m - 2) + 1)
def test_Z2():
r = Function('r')
assert (rsolve(r(n) - (5*r(n - 1) - 6*r(n - 2)), r(n), {r(0): 0, r(1): 1})
== -2**n + 3**n)
def test_Z3():
# => r(n) = Fibonacci[n + 1] [Cohen, p. 83]
r = Function('r')
# recurrence solution is correct, Wester expects it to be simplified to
# fibonacci(n+1), but that is quite hard
assert (rsolve(r(n) - (r(n - 1) + r(n - 2)), r(n),
{r(1): 1, r(2): 2}).simplify()
== 2**(-n)*((1 + sqrt(5))**n*(sqrt(5) + 5) +
(-sqrt(5) + 1)**n*(-sqrt(5) + 5))/10)
@XFAIL
def test_Z4():
# => [c^(n+1) [c^(n+1) - 2 c - 2] + (n+1) c^2 + 2 c - n] / [(c-1)^3 (c+1)]
# [Joan Z. Yu and Robert Israel in sci.math.symbolic]
r = Function('r')
c = symbols('c')
# raises ValueError: Polynomial or rational function expected,
# got '(c**2 - c**n)/(c - c**n)
s = rsolve(r(n) - ((1 + c - c**(n-1) - c**(n+1))/(1 - c**n)*r(n - 1)
- c*(1 - c**(n-2))/(1 - c**(n-1))*r(n - 2) + 1),
r(n), {r(1): 1, r(2): (2 + 2*c + c**2)/(1 + c)})
assert (s - (c*(n + 1)*(c*(n + 1) - 2*c - 2) +
(n + 1)*c**2 + 2*c - n)/((c-1)**3*(c+1)) == 0)
@XFAIL
def test_Z5():
# Second order ODE with initial conditions---solve directly
# transform: f(t) = sin(2 t)/8 - t cos(2 t)/4
C1, C2 = symbols('C1 C2')
# initial conditions not supported, this is a manual workaround
# https://github.com/sympy/sympy/issues/4720
eq = Derivative(f(x), x, 2) + 4*f(x) - sin(2*x)
sol = dsolve(eq, f(x))
f0 = Lambda(x, sol.rhs)
assert f0(x) == C2*sin(2*x) + (C1 - x/4)*cos(2*x)
f1 = Lambda(x, diff(f0(x), x))
# TODO: Replace solve with solveset, when it works for solveset
const_dict = solve((f0(0), f1(0)))
result = f0(x).subs(C1, const_dict[C1]).subs(C2, const_dict[C2])
assert result == -x*cos(2*x)/4 + sin(2*x)/8
# Result is OK, but ODE solving with initial conditions should be
# supported without all this manual work
raise NotImplementedError('ODE solving with initial conditions \
not supported')
@XFAIL
def test_Z6():
# Second order ODE with initial conditions---solve using Laplace
# transform: f(t) = sin(2 t)/8 - t cos(2 t)/4
t = symbols('t', real=True, positive=True)
s = symbols('s')
eq = Derivative(f(t), t, 2) + 4*f(t) - sin(2*t)
F, _, _ = laplace_transform(eq, t, s)
# Laplace transform for diff() not calculated
# https://github.com/sympy/sympy/issues/7176
assert (F == s**2*LaplaceTransform(f(t), t, s) +
4*LaplaceTransform(f(t), t, s) - 2/(s**2 + 4))
# rest of test case not implemented
|
75a983882995cf84dcdc4d4af6ad229fa857b0b13340ecf37ad2f985a5d893f2
|
from sympy import (Add, Abs, Catalan, cos, Derivative, E, EulerGamma, exp,
factorial, factorial2, Function, GoldenRatio, TribonacciConstant, I,
Integer, Integral, Interval, Lambda, Limit, Matrix, nan, O, oo, pi, Pow,
Rational, Float, Rel, S, sin, SparseMatrix, sqrt, summation, Sum, Symbol,
symbols, Wild, WildFunction, zeta, zoo, Dummy, Dict, Tuple, FiniteSet, factor,
subfactorial, true, false, Equivalent, Xor, Complement, SymmetricDifference,
AccumBounds, UnevaluatedExpr, Eq, Ne, Quaternion, Subs, MatrixSymbol, MatrixSlice)
from sympy.core import Expr, Mul
from sympy.physics.units import second, joule
from sympy.polys import (Poly, rootof, RootSum, groebner, ring, field, ZZ, QQ,
ZZ_I, QQ_I, lex, grlex)
from sympy.geometry import Point, Circle, Polygon, Ellipse, Triangle
from sympy.testing.pytest import raises
from sympy.printing import sstr, sstrrepr, StrPrinter
from sympy.core.trace import Tr
x, y, z, w, t = symbols('x,y,z,w,t')
d = Dummy('d')
def test_printmethod():
class R(Abs):
def _sympystr(self, printer):
return "foo(%s)" % printer._print(self.args[0])
assert sstr(R(x)) == "foo(x)"
class R(Abs):
def _sympystr(self, printer):
return "foo"
assert sstr(R(x)) == "foo"
def test_Abs():
assert str(Abs(x)) == "Abs(x)"
assert str(Abs(Rational(1, 6))) == "1/6"
assert str(Abs(Rational(-1, 6))) == "1/6"
def test_Add():
assert str(x + y) == "x + y"
assert str(x + 1) == "x + 1"
assert str(x + x**2) == "x**2 + x"
assert str(Add(0, 1, evaluate=False)) == "0 + 1"
assert str(Add(0, 0, 1, evaluate=False)) == "0 + 0 + 1"
assert str(1.0*x) == "1.0*x"
assert str(5 + x + y + x*y + x**2 + y**2) == "x**2 + x*y + x + y**2 + y + 5"
assert str(1 + x + x**2/2 + x**3/3) == "x**3/3 + x**2/2 + x + 1"
assert str(2*x - 7*x**2 + 2 + 3*y) == "-7*x**2 + 2*x + 3*y + 2"
assert str(x - y) == "x - y"
assert str(2 - x) == "2 - x"
assert str(x - 2) == "x - 2"
assert str(x - y - z - w) == "-w + x - y - z"
assert str(x - z*y**2*z*w) == "-w*y**2*z**2 + x"
assert str(x - 1*y*x*y) == "-x*y**2 + x"
assert str(sin(x).series(x, 0, 15)) == "x - x**3/6 + x**5/120 - x**7/5040 + x**9/362880 - x**11/39916800 + x**13/6227020800 + O(x**15)"
def test_Catalan():
assert str(Catalan) == "Catalan"
def test_ComplexInfinity():
assert str(zoo) == "zoo"
def test_Derivative():
assert str(Derivative(x, y)) == "Derivative(x, y)"
assert str(Derivative(x**2, x, evaluate=False)) == "Derivative(x**2, x)"
assert str(Derivative(
x**2/y, x, y, evaluate=False)) == "Derivative(x**2/y, x, y)"
def test_dict():
assert str({1: 1 + x}) == sstr({1: 1 + x}) == "{1: x + 1}"
assert str({1: x**2, 2: y*x}) in ("{1: x**2, 2: x*y}", "{2: x*y, 1: x**2}")
assert sstr({1: x**2, 2: y*x}) == "{1: x**2, 2: x*y}"
def test_Dict():
assert str(Dict({1: 1 + x})) == sstr({1: 1 + x}) == "{1: x + 1}"
assert str(Dict({1: x**2, 2: y*x})) in (
"{1: x**2, 2: x*y}", "{2: x*y, 1: x**2}")
assert sstr(Dict({1: x**2, 2: y*x})) == "{1: x**2, 2: x*y}"
def test_Dummy():
assert str(d) == "_d"
assert str(d + x) == "_d + x"
def test_EulerGamma():
assert str(EulerGamma) == "EulerGamma"
def test_Exp():
assert str(E) == "E"
def test_factorial():
n = Symbol('n', integer=True)
assert str(factorial(-2)) == "zoo"
assert str(factorial(0)) == "1"
assert str(factorial(7)) == "5040"
assert str(factorial(n)) == "factorial(n)"
assert str(factorial(2*n)) == "factorial(2*n)"
assert str(factorial(factorial(n))) == 'factorial(factorial(n))'
assert str(factorial(factorial2(n))) == 'factorial(factorial2(n))'
assert str(factorial2(factorial(n))) == 'factorial2(factorial(n))'
assert str(factorial2(factorial2(n))) == 'factorial2(factorial2(n))'
assert str(subfactorial(3)) == "2"
assert str(subfactorial(n)) == "subfactorial(n)"
assert str(subfactorial(2*n)) == "subfactorial(2*n)"
def test_Function():
f = Function('f')
fx = f(x)
w = WildFunction('w')
assert str(f) == "f"
assert str(fx) == "f(x)"
assert str(w) == "w_"
def test_Geometry():
assert sstr(Point(0, 0)) == 'Point2D(0, 0)'
assert sstr(Circle(Point(0, 0), 3)) == 'Circle(Point2D(0, 0), 3)'
assert sstr(Ellipse(Point(1, 2), 3, 4)) == 'Ellipse(Point2D(1, 2), 3, 4)'
assert sstr(Triangle(Point(1, 1), Point(7, 8), Point(0, -1))) == \
'Triangle(Point2D(1, 1), Point2D(7, 8), Point2D(0, -1))'
assert sstr(Polygon(Point(5, 6), Point(-2, -3), Point(0, 0), Point(4, 7))) == \
'Polygon(Point2D(5, 6), Point2D(-2, -3), Point2D(0, 0), Point2D(4, 7))'
assert sstr(Triangle(Point(0, 0), Point(1, 0), Point(0, 1)), sympy_integers=True) == \
'Triangle(Point2D(S(0), S(0)), Point2D(S(1), S(0)), Point2D(S(0), S(1)))'
assert sstr(Ellipse(Point(1, 2), 3, 4), sympy_integers=True) == \
'Ellipse(Point2D(S(1), S(2)), S(3), S(4))'
def test_GoldenRatio():
assert str(GoldenRatio) == "GoldenRatio"
def test_TribonacciConstant():
assert str(TribonacciConstant) == "TribonacciConstant"
def test_ImaginaryUnit():
assert str(I) == "I"
def test_Infinity():
assert str(oo) == "oo"
assert str(oo*I) == "oo*I"
def test_Integer():
assert str(Integer(-1)) == "-1"
assert str(Integer(1)) == "1"
assert str(Integer(-3)) == "-3"
assert str(Integer(0)) == "0"
assert str(Integer(25)) == "25"
def test_Integral():
assert str(Integral(sin(x), y)) == "Integral(sin(x), y)"
assert str(Integral(sin(x), (y, 0, 1))) == "Integral(sin(x), (y, 0, 1))"
def test_Interval():
n = (S.NegativeInfinity, 1, 2, S.Infinity)
for i in range(len(n)):
for j in range(i + 1, len(n)):
for l in (True, False):
for r in (True, False):
ival = Interval(n[i], n[j], l, r)
assert S(str(ival)) == ival
def test_AccumBounds():
a = Symbol('a', real=True)
assert str(AccumBounds(0, a)) == "AccumBounds(0, a)"
assert str(AccumBounds(0, 1)) == "AccumBounds(0, 1)"
def test_Lambda():
assert str(Lambda(d, d**2)) == "Lambda(_d, _d**2)"
# issue 2908
assert str(Lambda((), 1)) == "Lambda((), 1)"
assert str(Lambda((), x)) == "Lambda((), x)"
assert str(Lambda((x, y), x+y)) == "Lambda((x, y), x + y)"
assert str(Lambda(((x, y),), x+y)) == "Lambda(((x, y),), x + y)"
def test_Limit():
assert str(Limit(sin(x)/x, x, y)) == "Limit(sin(x)/x, x, y)"
assert str(Limit(1/x, x, 0)) == "Limit(1/x, x, 0)"
assert str(
Limit(sin(x)/x, x, y, dir="-")) == "Limit(sin(x)/x, x, y, dir='-')"
def test_list():
assert str([x]) == sstr([x]) == "[x]"
assert str([x**2, x*y + 1]) == sstr([x**2, x*y + 1]) == "[x**2, x*y + 1]"
assert str([x**2, [y + x]]) == sstr([x**2, [y + x]]) == "[x**2, [x + y]]"
def test_Matrix_str():
M = Matrix([[x**+1, 1], [y, x + y]])
assert str(M) == "Matrix([[x, 1], [y, x + y]])"
assert sstr(M) == "Matrix([\n[x, 1],\n[y, x + y]])"
M = Matrix([[1]])
assert str(M) == sstr(M) == "Matrix([[1]])"
M = Matrix([[1, 2]])
assert str(M) == sstr(M) == "Matrix([[1, 2]])"
M = Matrix()
assert str(M) == sstr(M) == "Matrix(0, 0, [])"
M = Matrix(0, 1, lambda i, j: 0)
assert str(M) == sstr(M) == "Matrix(0, 1, [])"
def test_Mul():
assert str(x/y) == "x/y"
assert str(y/x) == "y/x"
assert str(x/y/z) == "x/(y*z)"
assert str((x + 1)/(y + 2)) == "(x + 1)/(y + 2)"
assert str(2*x/3) == '2*x/3'
assert str(-2*x/3) == '-2*x/3'
assert str(-1.0*x) == '-1.0*x'
assert str(1.0*x) == '1.0*x'
assert str(Mul(0, 1, evaluate=False)) == '0*1'
assert str(Mul(1, 0, evaluate=False)) == '1*0'
assert str(Mul(1, 1, evaluate=False)) == '1*1'
assert str(Mul(1, 1, 1, evaluate=False)) == '1*1*1'
assert str(Mul(1, 2, evaluate=False)) == '1*2'
assert str(Mul(1, S.Half, evaluate=False)) == '1*(1/2)'
assert str(Mul(1, 1, S.Half, evaluate=False)) == '1*1*(1/2)'
assert str(Mul(1, 1, 2, 3, x, evaluate=False)) == '1*1*2*3*x'
assert str(Mul(1, -1, evaluate=False)) == '1*(-1)'
assert str(Mul(-1, 1, evaluate=False)) == '(-1)*1'
assert str(Mul(4, 3, 2, 1, 0, y, x, evaluate=False)) == '4*3*2*1*0*y*x'
assert str(Mul(4, 3, 2, 1+z, 0, y, x, evaluate=False)) == '4*3*2*(z + 1)*0*y*x'
assert str(Mul(Rational(2, 3), Rational(5, 7), evaluate=False)) == '(2/3)*(5/7)'
# For issue 14160
assert str(Mul(-2, x, Pow(Mul(y,y,evaluate=False), -1, evaluate=False),
evaluate=False)) == '-2*x/(y*y)'
class CustomClass1(Expr):
is_commutative = True
class CustomClass2(Expr):
is_commutative = True
cc1 = CustomClass1()
cc2 = CustomClass2()
assert str(Rational(2)*cc1) == '2*CustomClass1()'
assert str(cc1*Rational(2)) == '2*CustomClass1()'
assert str(cc1*Float("1.5")) == '1.5*CustomClass1()'
assert str(cc2*Rational(2)) == '2*CustomClass2()'
assert str(cc2*Rational(2)*cc1) == '2*CustomClass1()*CustomClass2()'
assert str(cc1*Rational(2)*cc2) == '2*CustomClass1()*CustomClass2()'
def test_NaN():
assert str(nan) == "nan"
def test_NegativeInfinity():
assert str(-oo) == "-oo"
def test_Order():
assert str(O(x)) == "O(x)"
assert str(O(x**2)) == "O(x**2)"
assert str(O(x*y)) == "O(x*y, x, y)"
assert str(O(x, x)) == "O(x)"
assert str(O(x, (x, 0))) == "O(x)"
assert str(O(x, (x, oo))) == "O(x, (x, oo))"
assert str(O(x, x, y)) == "O(x, x, y)"
assert str(O(x, x, y)) == "O(x, x, y)"
assert str(O(x, (x, oo), (y, oo))) == "O(x, (x, oo), (y, oo))"
def test_Permutation_Cycle():
from sympy.combinatorics import Permutation, Cycle
# general principle: economically, canonically show all moved elements
# and the size of the permutation.
for p, s in [
(Cycle(),
'()'),
(Cycle(2),
'(2)'),
(Cycle(2, 1),
'(1 2)'),
(Cycle(1, 2)(5)(6, 7)(10),
'(1 2)(6 7)(10)'),
(Cycle(3, 4)(1, 2)(3, 4),
'(1 2)(4)'),
]:
assert sstr(p) == s
for p, s in [
(Permutation([]),
'Permutation([])'),
(Permutation([], size=1),
'Permutation([0])'),
(Permutation([], size=2),
'Permutation([0, 1])'),
(Permutation([], size=10),
'Permutation([], size=10)'),
(Permutation([1, 0, 2]),
'Permutation([1, 0, 2])'),
(Permutation([1, 0, 2, 3, 4, 5]),
'Permutation([1, 0], size=6)'),
(Permutation([1, 0, 2, 3, 4, 5], size=10),
'Permutation([1, 0], size=10)'),
]:
assert sstr(p, perm_cyclic=False) == s
for p, s in [
(Permutation([]),
'()'),
(Permutation([], size=1),
'(0)'),
(Permutation([], size=2),
'(1)'),
(Permutation([], size=10),
'(9)'),
(Permutation([1, 0, 2]),
'(2)(0 1)'),
(Permutation([1, 0, 2, 3, 4, 5]),
'(5)(0 1)'),
(Permutation([1, 0, 2, 3, 4, 5], size=10),
'(9)(0 1)'),
(Permutation([0, 1, 3, 2, 4, 5], size=10),
'(9)(2 3)'),
]:
assert sstr(p) == s
def test_Pi():
assert str(pi) == "pi"
def test_Poly():
assert str(Poly(0, x)) == "Poly(0, x, domain='ZZ')"
assert str(Poly(1, x)) == "Poly(1, x, domain='ZZ')"
assert str(Poly(x, x)) == "Poly(x, x, domain='ZZ')"
assert str(Poly(2*x + 1, x)) == "Poly(2*x + 1, x, domain='ZZ')"
assert str(Poly(2*x - 1, x)) == "Poly(2*x - 1, x, domain='ZZ')"
assert str(Poly(-1, x)) == "Poly(-1, x, domain='ZZ')"
assert str(Poly(-x, x)) == "Poly(-x, x, domain='ZZ')"
assert str(Poly(-2*x + 1, x)) == "Poly(-2*x + 1, x, domain='ZZ')"
assert str(Poly(-2*x - 1, x)) == "Poly(-2*x - 1, x, domain='ZZ')"
assert str(Poly(x - 1, x)) == "Poly(x - 1, x, domain='ZZ')"
assert str(Poly(2*x + x**5, x)) == "Poly(x**5 + 2*x, x, domain='ZZ')"
assert str(Poly(3**(2*x), 3**x)) == "Poly((3**x)**2, 3**x, domain='ZZ')"
assert str(Poly((x**2)**x)) == "Poly(((x**2)**x), (x**2)**x, domain='ZZ')"
assert str(Poly((x + y)**3, (x + y), expand=False)
) == "Poly((x + y)**3, x + y, domain='ZZ')"
assert str(Poly((x - 1)**2, (x - 1), expand=False)
) == "Poly((x - 1)**2, x - 1, domain='ZZ')"
assert str(
Poly(x**2 + 1 + y, x)) == "Poly(x**2 + y + 1, x, domain='ZZ[y]')"
assert str(
Poly(x**2 - 1 + y, x)) == "Poly(x**2 + y - 1, x, domain='ZZ[y]')"
assert str(Poly(x**2 + I*x, x)) == "Poly(x**2 + I*x, x, domain='ZZ_I')"
assert str(Poly(x**2 - I*x, x)) == "Poly(x**2 - I*x, x, domain='ZZ_I')"
assert str(Poly(-x*y*z + x*y - 1, x, y, z)
) == "Poly(-x*y*z + x*y - 1, x, y, z, domain='ZZ')"
assert str(Poly(-w*x**21*y**7*z + (1 + w)*z**3 - 2*x*z + 1, x, y, z)) == \
"Poly(-w*x**21*y**7*z - 2*x*z + (w + 1)*z**3 + 1, x, y, z, domain='ZZ[w]')"
assert str(Poly(x**2 + 1, x, modulus=2)) == "Poly(x**2 + 1, x, modulus=2)"
assert str(Poly(2*x**2 + 3*x + 4, x, modulus=17)) == "Poly(2*x**2 + 3*x + 4, x, modulus=17)"
def test_PolyRing():
assert str(ring("x", ZZ, lex)[0]) == "Polynomial ring in x over ZZ with lex order"
assert str(ring("x,y", QQ, grlex)[0]) == "Polynomial ring in x, y over QQ with grlex order"
assert str(ring("x,y,z", ZZ["t"], lex)[0]) == "Polynomial ring in x, y, z over ZZ[t] with lex order"
def test_FracField():
assert str(field("x", ZZ, lex)[0]) == "Rational function field in x over ZZ with lex order"
assert str(field("x,y", QQ, grlex)[0]) == "Rational function field in x, y over QQ with grlex order"
assert str(field("x,y,z", ZZ["t"], lex)[0]) == "Rational function field in x, y, z over ZZ[t] with lex order"
def test_PolyElement():
Ruv, u,v = ring("u,v", ZZ)
Rxyz, x,y,z = ring("x,y,z", Ruv)
Rx_zzi, xz = ring("x", ZZ_I)
assert str(x - x) == "0"
assert str(x - 1) == "x - 1"
assert str(x + 1) == "x + 1"
assert str(x**2) == "x**2"
assert str(x**(-2)) == "x**(-2)"
assert str(x**QQ(1, 2)) == "x**(1/2)"
assert str((u**2 + 3*u*v + 1)*x**2*y + u + 1) == "(u**2 + 3*u*v + 1)*x**2*y + u + 1"
assert str((u**2 + 3*u*v + 1)*x**2*y + (u + 1)*x) == "(u**2 + 3*u*v + 1)*x**2*y + (u + 1)*x"
assert str((u**2 + 3*u*v + 1)*x**2*y + (u + 1)*x + 1) == "(u**2 + 3*u*v + 1)*x**2*y + (u + 1)*x + 1"
assert str((-u**2 + 3*u*v - 1)*x**2*y - (u + 1)*x - 1) == "-(u**2 - 3*u*v + 1)*x**2*y - (u + 1)*x - 1"
assert str(-(v**2 + v + 1)*x + 3*u*v + 1) == "-(v**2 + v + 1)*x + 3*u*v + 1"
assert str(-(v**2 + v + 1)*x - 3*u*v + 1) == "-(v**2 + v + 1)*x - 3*u*v + 1"
assert str((1+I)*xz + 2) == "(1 + 1*I)*x + (2 + 0*I)"
def test_FracElement():
Fuv, u,v = field("u,v", ZZ)
Fxyzt, x,y,z,t = field("x,y,z,t", Fuv)
Rx_zzi, xz = field("x", QQ_I)
i = QQ_I(0, 1)
assert str(x - x) == "0"
assert str(x - 1) == "x - 1"
assert str(x + 1) == "x + 1"
assert str(x/3) == "x/3"
assert str(x/z) == "x/z"
assert str(x*y/z) == "x*y/z"
assert str(x/(z*t)) == "x/(z*t)"
assert str(x*y/(z*t)) == "x*y/(z*t)"
assert str((x - 1)/y) == "(x - 1)/y"
assert str((x + 1)/y) == "(x + 1)/y"
assert str((-x - 1)/y) == "(-x - 1)/y"
assert str((x + 1)/(y*z)) == "(x + 1)/(y*z)"
assert str(-y/(x + 1)) == "-y/(x + 1)"
assert str(y*z/(x + 1)) == "y*z/(x + 1)"
assert str(((u + 1)*x*y + 1)/((v - 1)*z - 1)) == "((u + 1)*x*y + 1)/((v - 1)*z - 1)"
assert str(((u + 1)*x*y + 1)/((v - 1)*z - t*u*v - 1)) == "((u + 1)*x*y + 1)/((v - 1)*z - u*v*t - 1)"
assert str((1+i)/xz) == "(1 + 1*I)/x"
assert str(((1+i)*xz - i)/xz) == "((1 + 1*I)*x + (0 + -1*I))/x"
def test_GaussianInteger():
assert str(ZZ_I(1, 0)) == "1"
assert str(ZZ_I(-1, 0)) == "-1"
assert str(ZZ_I(0, 1)) == "I"
assert str(ZZ_I(0, -1)) == "-I"
assert str(ZZ_I(0, 2)) == "2*I"
assert str(ZZ_I(0, -2)) == "-2*I"
assert str(ZZ_I(1, 1)) == "1 + I"
assert str(ZZ_I(-1, -1)) == "-1 - I"
assert str(ZZ_I(-1, -2)) == "-1 - 2*I"
def test_GaussianRational():
assert str(QQ_I(1, 0)) == "1"
assert str(QQ_I(QQ(2, 3), 0)) == "2/3"
assert str(QQ_I(0, QQ(2, 3))) == "2*I/3"
assert str(QQ_I(QQ(1, 2), QQ(-2, 3))) == "1/2 - 2*I/3"
def test_Pow():
assert str(x**-1) == "1/x"
assert str(x**-2) == "x**(-2)"
assert str(x**2) == "x**2"
assert str((x + y)**-1) == "1/(x + y)"
assert str((x + y)**-2) == "(x + y)**(-2)"
assert str((x + y)**2) == "(x + y)**2"
assert str((x + y)**(1 + x)) == "(x + y)**(x + 1)"
assert str(x**Rational(1, 3)) == "x**(1/3)"
assert str(1/x**Rational(1, 3)) == "x**(-1/3)"
assert str(sqrt(sqrt(x))) == "x**(1/4)"
# not the same as x**-1
assert str(x**-1.0) == 'x**(-1.0)'
# see issue #2860
assert str(Pow(S(2), -1.0, evaluate=False)) == '2**(-1.0)'
def test_sqrt():
assert str(sqrt(x)) == "sqrt(x)"
assert str(sqrt(x**2)) == "sqrt(x**2)"
assert str(1/sqrt(x)) == "1/sqrt(x)"
assert str(1/sqrt(x**2)) == "1/sqrt(x**2)"
assert str(y/sqrt(x)) == "y/sqrt(x)"
assert str(x**0.5) == "x**0.5"
assert str(1/x**0.5) == "x**(-0.5)"
def test_Rational():
n1 = Rational(1, 4)
n2 = Rational(1, 3)
n3 = Rational(2, 4)
n4 = Rational(2, -4)
n5 = Rational(0)
n7 = Rational(3)
n8 = Rational(-3)
assert str(n1*n2) == "1/12"
assert str(n1*n2) == "1/12"
assert str(n3) == "1/2"
assert str(n1*n3) == "1/8"
assert str(n1 + n3) == "3/4"
assert str(n1 + n2) == "7/12"
assert str(n1 + n4) == "-1/4"
assert str(n4*n4) == "1/4"
assert str(n4 + n2) == "-1/6"
assert str(n4 + n5) == "-1/2"
assert str(n4*n5) == "0"
assert str(n3 + n4) == "0"
assert str(n1**n7) == "1/64"
assert str(n2**n7) == "1/27"
assert str(n2**n8) == "27"
assert str(n7**n8) == "1/27"
assert str(Rational("-25")) == "-25"
assert str(Rational("1.25")) == "5/4"
assert str(Rational("-2.6e-2")) == "-13/500"
assert str(S("25/7")) == "25/7"
assert str(S("-123/569")) == "-123/569"
assert str(S("0.1[23]", rational=1)) == "61/495"
assert str(S("5.1[666]", rational=1)) == "31/6"
assert str(S("-5.1[666]", rational=1)) == "-31/6"
assert str(S("0.[9]", rational=1)) == "1"
assert str(S("-0.[9]", rational=1)) == "-1"
assert str(sqrt(Rational(1, 4))) == "1/2"
assert str(sqrt(Rational(1, 36))) == "1/6"
assert str((123**25) ** Rational(1, 25)) == "123"
assert str((123**25 + 1)**Rational(1, 25)) != "123"
assert str((123**25 - 1)**Rational(1, 25)) != "123"
assert str((123**25 - 1)**Rational(1, 25)) != "122"
assert str(sqrt(Rational(81, 36))**3) == "27/8"
assert str(1/sqrt(Rational(81, 36))**3) == "8/27"
assert str(sqrt(-4)) == str(2*I)
assert str(2**Rational(1, 10**10)) == "2**(1/10000000000)"
assert sstr(Rational(2, 3), sympy_integers=True) == "S(2)/3"
x = Symbol("x")
assert sstr(x**Rational(2, 3), sympy_integers=True) == "x**(S(2)/3)"
assert sstr(Eq(x, Rational(2, 3)), sympy_integers=True) == "Eq(x, S(2)/3)"
assert sstr(Limit(x, x, Rational(7, 2)), sympy_integers=True) == \
"Limit(x, x, S(7)/2)"
def test_Float():
# NOTE dps is the whole number of decimal digits
assert str(Float('1.23', dps=1 + 2)) == '1.23'
assert str(Float('1.23456789', dps=1 + 8)) == '1.23456789'
assert str(
Float('1.234567890123456789', dps=1 + 18)) == '1.234567890123456789'
assert str(pi.evalf(1 + 2)) == '3.14'
assert str(pi.evalf(1 + 14)) == '3.14159265358979'
assert str(pi.evalf(1 + 64)) == ('3.141592653589793238462643383279'
'5028841971693993751058209749445923')
assert str(pi.round(-1)) == '0.0'
assert str((pi**400 - (pi**400).round(1)).n(2)) == '-0.e+88'
assert sstr(Float("100"), full_prec=False, min=-2, max=2) == '1.0e+2'
assert sstr(Float("100"), full_prec=False, min=-2, max=3) == '100.0'
assert sstr(Float("0.1"), full_prec=False, min=-2, max=3) == '0.1'
assert sstr(Float("0.099"), min=-2, max=3) == '9.90000000000000e-2'
def test_Relational():
assert str(Rel(x, y, "<")) == "x < y"
assert str(Rel(x + y, y, "==")) == "Eq(x + y, y)"
assert str(Rel(x, y, "!=")) == "Ne(x, y)"
assert str(Eq(x, 1) | Eq(x, 2)) == "Eq(x, 1) | Eq(x, 2)"
assert str(Ne(x, 1) & Ne(x, 2)) == "Ne(x, 1) & Ne(x, 2)"
def test_CRootOf():
assert str(rootof(x**5 + 2*x - 1, 0)) == "CRootOf(x**5 + 2*x - 1, 0)"
def test_RootSum():
f = x**5 + 2*x - 1
assert str(
RootSum(f, Lambda(z, z), auto=False)) == "RootSum(x**5 + 2*x - 1)"
assert str(RootSum(f, Lambda(
z, z**2), auto=False)) == "RootSum(x**5 + 2*x - 1, Lambda(z, z**2))"
def test_GroebnerBasis():
assert str(groebner(
[], x, y)) == "GroebnerBasis([], x, y, domain='ZZ', order='lex')"
F = [x**2 - 3*y - x + 1, y**2 - 2*x + y - 1]
assert str(groebner(F, order='grlex')) == \
"GroebnerBasis([x**2 - x - 3*y + 1, y**2 - 2*x + y - 1], x, y, domain='ZZ', order='grlex')"
assert str(groebner(F, order='lex')) == \
"GroebnerBasis([2*x - y**2 - y + 1, y**4 + 2*y**3 - 3*y**2 - 16*y + 7], x, y, domain='ZZ', order='lex')"
def test_set():
assert sstr(set()) == 'set()'
assert sstr(frozenset()) == 'frozenset()'
assert sstr(set([1])) == '{1}'
assert sstr(frozenset([1])) == 'frozenset({1})'
assert sstr(set([1, 2, 3])) == '{1, 2, 3}'
assert sstr(frozenset([1, 2, 3])) == 'frozenset({1, 2, 3})'
assert sstr(
set([1, x, x**2, x**3, x**4])) == '{1, x, x**2, x**3, x**4}'
assert sstr(
frozenset([1, x, x**2, x**3, x**4])) == 'frozenset({1, x, x**2, x**3, x**4})'
def test_SparseMatrix():
M = SparseMatrix([[x**+1, 1], [y, x + y]])
assert str(M) == "Matrix([[x, 1], [y, x + y]])"
assert sstr(M) == "Matrix([\n[x, 1],\n[y, x + y]])"
def test_Sum():
assert str(summation(cos(3*z), (z, x, y))) == "Sum(cos(3*z), (z, x, y))"
assert str(Sum(x*y**2, (x, -2, 2), (y, -5, 5))) == \
"Sum(x*y**2, (x, -2, 2), (y, -5, 5))"
def test_Symbol():
assert str(y) == "y"
assert str(x) == "x"
e = x
assert str(e) == "x"
def test_tuple():
assert str((x,)) == sstr((x,)) == "(x,)"
assert str((x + y, 1 + x)) == sstr((x + y, 1 + x)) == "(x + y, x + 1)"
assert str((x + y, (
1 + x, x**2))) == sstr((x + y, (1 + x, x**2))) == "(x + y, (x + 1, x**2))"
def test_Quaternion_str_printer():
q = Quaternion(x, y, z, t)
assert str(q) == "x + y*i + z*j + t*k"
q = Quaternion(x,y,z,x*t)
assert str(q) == "x + y*i + z*j + t*x*k"
q = Quaternion(x,y,z,x+t)
assert str(q) == "x + y*i + z*j + (t + x)*k"
def test_Quantity_str():
assert sstr(second, abbrev=True) == "s"
assert sstr(joule, abbrev=True) == "J"
assert str(second) == "second"
assert str(joule) == "joule"
def test_wild_str():
# Check expressions containing Wild not causing infinite recursion
w = Wild('x')
assert str(w + 1) == 'x_ + 1'
assert str(exp(2**w) + 5) == 'exp(2**x_) + 5'
assert str(3*w + 1) == '3*x_ + 1'
assert str(1/w + 1) == '1 + 1/x_'
assert str(w**2 + 1) == 'x_**2 + 1'
assert str(1/(1 - w)) == '1/(1 - x_)'
def test_zeta():
assert str(zeta(3)) == "zeta(3)"
def test_issue_3101():
e = x - y
a = str(e)
b = str(e)
assert a == b
def test_issue_3103():
e = -2*sqrt(x) - y/sqrt(x)/2
assert str(e) not in ["(-2)*x**1/2(-1/2)*x**(-1/2)*y",
"-2*x**1/2(-1/2)*x**(-1/2)*y", "-2*x**1/2-1/2*x**-1/2*w"]
assert str(e) == "-2*sqrt(x) - y/(2*sqrt(x))"
def test_issue_4021():
e = Integral(x, x) + 1
assert str(e) == 'Integral(x, x) + 1'
def test_sstrrepr():
assert sstr('abc') == 'abc'
assert sstrrepr('abc') == "'abc'"
e = ['a', 'b', 'c', x]
assert sstr(e) == "[a, b, c, x]"
assert sstrrepr(e) == "['a', 'b', 'c', x]"
def test_infinity():
assert sstr(oo*I) == "oo*I"
def test_full_prec():
assert sstr(S("0.3"), full_prec=True) == "0.300000000000000"
assert sstr(S("0.3"), full_prec="auto") == "0.300000000000000"
assert sstr(S("0.3"), full_prec=False) == "0.3"
assert sstr(S("0.3")*x, full_prec=True) in [
"0.300000000000000*x",
"x*0.300000000000000"
]
assert sstr(S("0.3")*x, full_prec="auto") in [
"0.3*x",
"x*0.3"
]
assert sstr(S("0.3")*x, full_prec=False) in [
"0.3*x",
"x*0.3"
]
def test_noncommutative():
A, B, C = symbols('A,B,C', commutative=False)
assert sstr(A*B*C**-1) == "A*B*C**(-1)"
assert sstr(C**-1*A*B) == "C**(-1)*A*B"
assert sstr(A*C**-1*B) == "A*C**(-1)*B"
assert sstr(sqrt(A)) == "sqrt(A)"
assert sstr(1/sqrt(A)) == "A**(-1/2)"
def test_empty_printer():
str_printer = StrPrinter()
assert str_printer.emptyPrinter("foo") == "foo"
assert str_printer.emptyPrinter(x*y) == "x*y"
assert str_printer.emptyPrinter(32) == "32"
def test_settings():
raises(TypeError, lambda: sstr(S(4), method="garbage"))
def test_RandomDomain():
from sympy.stats import Normal, Die, Exponential, pspace, where
X = Normal('x1', 0, 1)
assert str(where(X > 0)) == "Domain: (0 < x1) & (x1 < oo)"
D = Die('d1', 6)
assert str(where(D > 4)) == "Domain: Eq(d1, 5) | Eq(d1, 6)"
A = Exponential('a', 1)
B = Exponential('b', 1)
assert str(pspace(Tuple(A, B)).domain) == "Domain: (0 <= a) & (0 <= b) & (a < oo) & (b < oo)"
def test_FiniteSet():
assert str(FiniteSet(*range(1, 51))) == (
'FiniteSet(1, 2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17,'
' 18, 19, 20, 21, 22, 23, 24, 25, 26, 27, 28, 29, 30, 31, 32, 33, 34,'
' 35, 36, 37, 38, 39, 40, 41, 42, 43, 44, 45, 46, 47, 48, 49, 50)'
)
assert str(FiniteSet(*range(1, 6))) == 'FiniteSet(1, 2, 3, 4, 5)'
def test_UniversalSet():
assert str(S.UniversalSet) == 'UniversalSet'
def test_PrettyPoly():
from sympy.polys.domains import QQ
F = QQ.frac_field(x, y)
R = QQ[x, y]
assert sstr(F.convert(x/(x + y))) == sstr(x/(x + y))
assert sstr(R.convert(x + y)) == sstr(x + y)
def test_categories():
from sympy.categories import (Object, NamedMorphism,
IdentityMorphism, Category)
A = Object("A")
B = Object("B")
f = NamedMorphism(A, B, "f")
id_A = IdentityMorphism(A)
K = Category("K")
assert str(A) == 'Object("A")'
assert str(f) == 'NamedMorphism(Object("A"), Object("B"), "f")'
assert str(id_A) == 'IdentityMorphism(Object("A"))'
assert str(K) == 'Category("K")'
def test_Tr():
A, B = symbols('A B', commutative=False)
t = Tr(A*B)
assert str(t) == 'Tr(A*B)'
def test_issue_6387():
assert str(factor(-3.0*z + 3)) == '-3.0*(1.0*z - 1.0)'
def test_MatMul_MatAdd():
from sympy import MatrixSymbol
X, Y = MatrixSymbol("X", 2, 2), MatrixSymbol("Y", 2, 2)
assert str(2*(X + Y)) == "2*(X + Y)"
assert str(I*X) == "I*X"
assert str(-I*X) == "-I*X"
assert str((1 + I)*X) == '(1 + I)*X'
assert str(-(1 + I)*X) == '(-1 - I)*X'
def test_MatrixSlice():
n = Symbol('n', integer=True)
X = MatrixSymbol('X', n, n)
Y = MatrixSymbol('Y', 10, 10)
Z = MatrixSymbol('Z', 10, 10)
assert str(MatrixSlice(X, (None, None, None), (None, None, None))) == 'X[:, :]'
assert str(X[x:x + 1, y:y + 1]) == 'X[x:x + 1, y:y + 1]'
assert str(X[x:x + 1:2, y:y + 1:2]) == 'X[x:x + 1:2, y:y + 1:2]'
assert str(X[:x, y:]) == 'X[:x, y:]'
assert str(X[:x, y:]) == 'X[:x, y:]'
assert str(X[x:, :y]) == 'X[x:, :y]'
assert str(X[x:y, z:w]) == 'X[x:y, z:w]'
assert str(X[x:y:t, w:t:x]) == 'X[x:y:t, w:t:x]'
assert str(X[x::y, t::w]) == 'X[x::y, t::w]'
assert str(X[:x:y, :t:w]) == 'X[:x:y, :t:w]'
assert str(X[::x, ::y]) == 'X[::x, ::y]'
assert str(MatrixSlice(X, (0, None, None), (0, None, None))) == 'X[:, :]'
assert str(MatrixSlice(X, (None, n, None), (None, n, None))) == 'X[:, :]'
assert str(MatrixSlice(X, (0, n, None), (0, n, None))) == 'X[:, :]'
assert str(MatrixSlice(X, (0, n, 2), (0, n, 2))) == 'X[::2, ::2]'
assert str(X[1:2:3, 4:5:6]) == 'X[1:2:3, 4:5:6]'
assert str(X[1:3:5, 4:6:8]) == 'X[1:3:5, 4:6:8]'
assert str(X[1:10:2]) == 'X[1:10:2, :]'
assert str(Y[:5, 1:9:2]) == 'Y[:5, 1:9:2]'
assert str(Y[:5, 1:10:2]) == 'Y[:5, 1::2]'
assert str(Y[5, :5:2]) == 'Y[5:6, :5:2]'
assert str(X[0:1, 0:1]) == 'X[:1, :1]'
assert str(X[0:1:2, 0:1:2]) == 'X[:1:2, :1:2]'
assert str((Y + Z)[2:, 2:]) == '(Y + Z)[2:, 2:]'
def test_true_false():
assert str(true) == repr(true) == sstr(true) == "True"
assert str(false) == repr(false) == sstr(false) == "False"
def test_Equivalent():
assert str(Equivalent(y, x)) == "Equivalent(x, y)"
def test_Xor():
assert str(Xor(y, x, evaluate=False)) == "x ^ y"
def test_Complement():
assert str(Complement(S.Reals, S.Naturals)) == 'Complement(Reals, Naturals)'
def test_SymmetricDifference():
assert str(SymmetricDifference(Interval(2, 3), Interval(3, 4),evaluate=False)) == \
'SymmetricDifference(Interval(2, 3), Interval(3, 4))'
def test_UnevaluatedExpr():
a, b = symbols("a b")
expr1 = 2*UnevaluatedExpr(a+b)
assert str(expr1) == "2*(a + b)"
def test_MatrixElement_printing():
# test cases for issue #11821
A = MatrixSymbol("A", 1, 3)
B = MatrixSymbol("B", 1, 3)
C = MatrixSymbol("C", 1, 3)
assert(str(A[0, 0]) == "A[0, 0]")
assert(str(3 * A[0, 0]) == "3*A[0, 0]")
F = C[0, 0].subs(C, A - B)
assert str(F) == "(A - B)[0, 0]"
def test_MatrixSymbol_printing():
A = MatrixSymbol("A", 3, 3)
B = MatrixSymbol("B", 3, 3)
assert str(A - A*B - B) == "A - A*B - B"
assert str(A*B - (A+B)) == "-(A + B) + A*B"
assert str(A**(-1)) == "A**(-1)"
assert str(A**3) == "A**3"
def test_MatrixExpressions():
n = Symbol('n', integer=True)
X = MatrixSymbol('X', n, n)
assert str(X) == "X"
# Apply function elementwise (`ElementwiseApplyFunc`):
expr = (X.T*X).applyfunc(sin)
assert str(expr) == 'Lambda(_d, sin(_d)).(X.T*X)'
lamda = Lambda(x, 1/x)
expr = (n*X).applyfunc(lamda)
assert str(expr) == 'Lambda(x, 1/x).(n*X)'
def test_Subs_printing():
assert str(Subs(x, (x,), (1,))) == 'Subs(x, x, 1)'
assert str(Subs(x + y, (x, y), (1, 2))) == 'Subs(x + y, (x, y), (1, 2))'
def test_issue_15716():
e = Integral(factorial(x), (x, -oo, oo))
assert e.as_terms() == ([(e, ((1.0, 0.0), (1,), ()))], [e])
def test_str_special_matrices():
from sympy.matrices import Identity, ZeroMatrix, OneMatrix
assert str(Identity(4)) == 'I'
assert str(ZeroMatrix(2, 2)) == '0'
assert str(OneMatrix(2, 2)) == '1'
def test_issue_14567():
assert factorial(Sum(-1, (x, 0, 0))) + y # doesn't raise an error
def test_diffgeom():
from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField
m = Manifold('M', 2)
assert str(m) == "M"
p = Patch('P', m)
assert str(p) == "P"
rect = CoordSystem('rect', p)
assert str(rect) == "rect"
b = BaseScalarField(rect, 0)
assert str(b) == "rect_0"
|
b7c66cce3ff766056905fa4ef98297ae4fc9022cbd250dde682cd2e6fc82d127
|
"""Most of these tests come from the examples in Bronstein's book."""
from sympy import Poly, symbols, oo, I, Rational
from sympy.integrals.risch import (DifferentialExtension,
NonElementaryIntegralException)
from sympy.integrals.rde import (order_at, order_at_oo, weak_normalizer,
normal_denom, special_denom, bound_degree, spde, solve_poly_rde,
no_cancel_equal, cancel_primitive, cancel_exp, rischDE)
from sympy.testing.pytest import raises
from sympy.abc import x, t, z, n
t0, t1, t2, k = symbols('t:3 k')
def test_order_at():
a = Poly(t**4, t)
b = Poly((t**2 + 1)**3*t, t)
c = Poly((t**2 + 1)**6*t, t)
d = Poly((t**2 + 1)**10*t**10, t)
e = Poly((t**2 + 1)**100*t**37, t)
p1 = Poly(t, t)
p2 = Poly(1 + t**2, t)
assert order_at(a, p1, t) == 4
assert order_at(b, p1, t) == 1
assert order_at(c, p1, t) == 1
assert order_at(d, p1, t) == 10
assert order_at(e, p1, t) == 37
assert order_at(a, p2, t) == 0
assert order_at(b, p2, t) == 3
assert order_at(c, p2, t) == 6
assert order_at(d, p1, t) == 10
assert order_at(e, p2, t) == 100
assert order_at(Poly(0, t), Poly(t, t), t) is oo
assert order_at_oo(Poly(t**2 - 1, t), Poly(t + 1), t) == \
order_at_oo(Poly(t - 1, t), Poly(1, t), t) == -1
assert order_at_oo(Poly(0, t), Poly(1, t), t) is oo
def test_weak_normalizer():
a = Poly((1 + x)*t**5 + 4*t**4 + (-1 - 3*x)*t**3 - 4*t**2 + (-2 + 2*x)*t, t)
d = Poly(t**4 - 3*t**2 + 2, t)
DE = DifferentialExtension(extension={'D': [Poly(1, x), Poly(t, t)]})
r = weak_normalizer(a, d, DE, z)
assert r == (Poly(t**5 - t**4 - 4*t**3 + 4*t**2 + 4*t - 4, t, domain='ZZ[x]'),
(Poly((1 + x)*t**2 + x*t, t, domain='ZZ[x]'),
Poly(t + 1, t, domain='ZZ[x]')))
assert weak_normalizer(r[1][0], r[1][1], DE) == (Poly(1, t), r[1])
r = weak_normalizer(Poly(1 + t**2), Poly(t**2 - 1, t), DE, z)
assert r == (Poly(t**4 - 2*t**2 + 1, t), (Poly(-3*t**2 + 1, t), Poly(t**2 - 1, t)))
assert weak_normalizer(r[1][0], r[1][1], DE, z) == (Poly(1, t), r[1])
DE = DifferentialExtension(extension={'D': [Poly(1, x), Poly(1 + t**2)]})
r = weak_normalizer(Poly(1 + t**2), Poly(t, t), DE, z)
assert r == (Poly(t, t), (Poly(0, t), Poly(1, t)))
assert weak_normalizer(r[1][0], r[1][1], DE, z) == (Poly(1, t), r[1])
def test_normal_denom():
DE = DifferentialExtension(extension={'D': [Poly(1, x)]})
raises(NonElementaryIntegralException, lambda: normal_denom(Poly(1, x), Poly(1, x),
Poly(1, x), Poly(x, x), DE))
fa, fd = Poly(t**2 + 1, t), Poly(1, t)
ga, gd = Poly(1, t), Poly(t**2, t)
DE = DifferentialExtension(extension={'D': [Poly(1, x), Poly(t**2 + 1, t)]})
assert normal_denom(fa, fd, ga, gd, DE) == \
(Poly(t, t), (Poly(t**3 - t**2 + t - 1, t), Poly(1, t)), (Poly(1, t),
Poly(1, t)), Poly(t, t))
def test_special_denom():
# TODO: add more tests here
DE = DifferentialExtension(extension={'D': [Poly(1, x), Poly(t, t)]})
assert special_denom(Poly(1, t), Poly(t**2, t), Poly(1, t), Poly(t**2 - 1, t),
Poly(t, t), DE) == \
(Poly(1, t), Poly(t**2 - 1, t), Poly(t**2 - 1, t), Poly(t, t))
# assert special_denom(Poly(1, t), Poly(2*x, t), Poly((1 + 2*x)*t, t), DE) == 1
# issue 3940
# Note, this isn't a very good test, because the denominator is just 1,
# but at least it tests the exp cancellation case
DE = DifferentialExtension(extension={'D': [Poly(1, x), Poly(-2*x*t0, t0),
Poly(I*k*t1, t1)]})
DE.decrement_level()
assert special_denom(Poly(1, t0), Poly(I*k, t0), Poly(1, t0), Poly(t0, t0),
Poly(1, t0), DE) == \
(Poly(1, t0, domain='ZZ'), Poly(I*k, t0, domain='ZZ_I[k,x]'),
Poly(t0, t0, domain='ZZ'), Poly(1, t0, domain='ZZ'))
assert special_denom(Poly(1, t), Poly(t**2, t), Poly(1, t), Poly(t**2 - 1, t),
Poly(t, t), DE, case='tan') == \
(Poly(1, t, t0, domain='ZZ'), Poly(t**2, t0, t, domain='ZZ[x]'),
Poly(t, t, t0, domain='ZZ'), Poly(1, t0, domain='ZZ'))
raises(ValueError, lambda: special_denom(Poly(1, t), Poly(t**2, t), Poly(1, t), Poly(t**2 - 1, t),
Poly(t, t), DE, case='unrecognized_case'))
def test_bound_degree_fail():
# Primitive
DE = DifferentialExtension(extension={'D': [Poly(1, x),
Poly(t0/x**2, t0), Poly(1/x, t)]})
assert bound_degree(Poly(t**2, t), Poly(-(1/x**2*t**2 + 1/x), t),
Poly((2*x - 1)*t**4 + (t0 + x)/x*t**3 - (t0 + 4*x**2)/2*x*t**2 + x*t,
t), DE) == 3
def test_bound_degree():
# Base
DE = DifferentialExtension(extension={'D': [Poly(1, x)]})
assert bound_degree(Poly(1, x), Poly(-2*x, x), Poly(1, x), DE) == 0
# Primitive (see above test_bound_degree_fail)
# TODO: Add test for when the degree bound becomes larger after limited_integrate
# TODO: Add test for db == da - 1 case
# Exp
# TODO: Add tests
# TODO: Add test for when the degree becomes larger after parametric_log_deriv()
# Nonlinear
DE = DifferentialExtension(extension={'D': [Poly(1, x), Poly(t**2 + 1, t)]})
assert bound_degree(Poly(t, t), Poly((t - 1)*(t**2 + 1), t), Poly(1, t), DE) == 0
def test_spde():
DE = DifferentialExtension(extension={'D': [Poly(1, x), Poly(t**2 + 1, t)]})
raises(NonElementaryIntegralException, lambda: spde(Poly(t, t), Poly((t - 1)*(t**2 + 1), t), Poly(1, t), 0, DE))
DE = DifferentialExtension(extension={'D': [Poly(1, x), Poly(t, t)]})
assert spde(Poly(t**2 + x*t*2 + x**2, t), Poly(t**2/x**2 + (2/x - 1)*t, t),
Poly(t**2/x**2 + (2/x - 1)*t, t), 0, DE) == \
(Poly(0, t), Poly(0, t), 0, Poly(0, t), Poly(1, t, domain='ZZ(x)'))
DE = DifferentialExtension(extension={'D': [Poly(1, x), Poly(t0/x**2, t0), Poly(1/x, t)]})
assert spde(Poly(t**2, t), Poly(-t**2/x**2 - 1/x, t),
Poly((2*x - 1)*t**4 + (t0 + x)/x*t**3 - (t0 + 4*x**2)/(2*x)*t**2 + x*t, t), 3, DE) == \
(Poly(0, t), Poly(0, t), 0, Poly(0, t),
Poly(t0*t**2/2 + x**2*t**2 - x**2*t, t, domain='ZZ(x,t0)'))
DE = DifferentialExtension(extension={'D': [Poly(1, x)]})
assert spde(Poly(x**2 + x + 1, x), Poly(-2*x - 1, x), Poly(x**5/2 +
3*x**4/4 + x**3 - x**2 + 1, x), 4, DE) == \
(Poly(0, x, domain='QQ'), Poly(x/2 - Rational(1, 4), x), 2, Poly(x**2 + x + 1, x), Poly(x*Rational(5, 4), x))
assert spde(Poly(x**2 + x + 1, x), Poly(-2*x - 1, x), Poly(x**5/2 +
3*x**4/4 + x**3 - x**2 + 1, x), n, DE) == \
(Poly(0, x, domain='QQ'), Poly(x/2 - Rational(1, 4), x), -2 + n, Poly(x**2 + x + 1, x), Poly(x*Rational(5, 4), x))
DE = DifferentialExtension(extension={'D': [Poly(1, x), Poly(1, t)]})
raises(NonElementaryIntegralException, lambda: spde(Poly((t - 1)*(t**2 + 1)**2, t), Poly((t - 1)*(t**2 + 1), t), Poly(1, t), 0, DE))
DE = DifferentialExtension(extension={'D': [Poly(1, x)]})
assert spde(Poly(x**2 - x, x), Poly(1, x), Poly(9*x**4 - 10*x**3 + 2*x**2, x), 4, DE) == \
(Poly(0, x, domain='ZZ'), Poly(0, x), 0, Poly(0, x), Poly(3*x**3 - 2*x**2, x, domain='QQ'))
assert spde(Poly(x**2 - x, x), Poly(x**2 - 5*x + 3, x), Poly(x**7 - x**6 - 2*x**4 + 3*x**3 - x**2, x), 5, DE) == \
(Poly(1, x, domain='QQ'), Poly(x + 1, x, domain='QQ'), 1, Poly(x**4 - x**3, x), Poly(x**3 - x**2, x, domain='QQ'))
def test_solve_poly_rde_no_cancel():
# deg(b) large
DE = DifferentialExtension(extension={'D': [Poly(1, x), Poly(1 + t**2, t)]})
assert solve_poly_rde(Poly(t**2 + 1, t), Poly(t**3 + (x + 1)*t**2 + t + x + 2, t),
oo, DE) == Poly(t + x, t)
# deg(b) small
DE = DifferentialExtension(extension={'D': [Poly(1, x)]})
assert solve_poly_rde(Poly(0, x), Poly(x/2 - Rational(1, 4), x), oo, DE) == \
Poly(x**2/4 - x/4, x)
DE = DifferentialExtension(extension={'D': [Poly(1, x), Poly(t**2 + 1, t)]})
assert solve_poly_rde(Poly(2, t), Poly(t**2 + 2*t + 3, t), 1, DE) == \
Poly(t + 1, t, x)
# deg(b) == deg(D) - 1
DE = DifferentialExtension(extension={'D': [Poly(1, x), Poly(t**2 + 1, t)]})
assert no_cancel_equal(Poly(1 - t, t),
Poly(t**3 + t**2 - 2*x*t - 2*x, t), oo, DE) == \
(Poly(t**2, t), 1, Poly((-2 - 2*x)*t - 2*x, t))
def test_solve_poly_rde_cancel():
# exp
DE = DifferentialExtension(extension={'D': [Poly(1, x), Poly(t, t)]})
assert cancel_exp(Poly(2*x, t), Poly(2*x, t), 0, DE) == \
Poly(1, t)
assert cancel_exp(Poly(2*x, t), Poly((1 + 2*x)*t, t), 1, DE) == \
Poly(t, t)
# TODO: Add more exp tests, including tests that require is_deriv_in_field()
# primitive
DE = DifferentialExtension(extension={'D': [Poly(1, x), Poly(1/x, t)]})
# If the DecrementLevel context manager is working correctly, this shouldn't
# cause any problems with the further tests.
raises(NonElementaryIntegralException, lambda: cancel_primitive(Poly(1, t), Poly(t, t), oo, DE))
assert cancel_primitive(Poly(1, t), Poly(t + 1/x, t), 2, DE) == \
Poly(t, t)
assert cancel_primitive(Poly(4*x, t), Poly(4*x*t**2 + 2*t/x, t), 3, DE) == \
Poly(t**2, t)
# TODO: Add more primitive tests, including tests that require is_deriv_in_field()
def test_rischDE():
# TODO: Add more tests for rischDE, including ones from the text
DE = DifferentialExtension(extension={'D': [Poly(1, x), Poly(t, t)]})
DE.decrement_level()
assert rischDE(Poly(-2*x, x), Poly(1, x), Poly(1 - 2*x - 2*x**2, x),
Poly(1, x), DE) == \
(Poly(x + 1, x), Poly(1, x))
|
6f98dd804c9da420361b9972edd2aaaea46d4ac7da67fa1670123fb5938e7815
|
from sympy.integrals.transforms import (mellin_transform,
inverse_mellin_transform, laplace_transform, inverse_laplace_transform,
fourier_transform, inverse_fourier_transform,
sine_transform, inverse_sine_transform,
cosine_transform, inverse_cosine_transform,
hankel_transform, inverse_hankel_transform,
LaplaceTransform, FourierTransform, SineTransform, CosineTransform,
InverseLaplaceTransform, InverseFourierTransform,
InverseSineTransform, InverseCosineTransform, IntegralTransformError)
from sympy import (
gamma, exp, oo, Heaviside, symbols, Symbol, re, factorial, pi, arg,
cos, S, Abs, And, sin, sqrt, I, log, tan, hyperexpand, meijerg,
EulerGamma, erf, erfc, besselj, bessely, besseli, besselk,
exp_polar, unpolarify, Function, expint, expand_mul, Rational,
gammasimp, trigsimp, atan, sinh, cosh, Ne, periodic_argument, atan2)
from sympy.testing.pytest import XFAIL, slow, skip, raises
from sympy.matrices import Matrix, eye
from sympy.abc import x, s, a, b, c, d
nu, beta, rho = symbols('nu beta rho')
def test_undefined_function():
from sympy import Function, MellinTransform
f = Function('f')
assert mellin_transform(f(x), x, s) == MellinTransform(f(x), x, s)
assert mellin_transform(f(x) + exp(-x), x, s) == \
(MellinTransform(f(x), x, s) + gamma(s), (0, oo), True)
assert laplace_transform(2*f(x), x, s) == 2*LaplaceTransform(f(x), x, s)
# TODO test derivative and other rules when implemented
def test_free_symbols():
from sympy import Function
f = Function('f')
assert mellin_transform(f(x), x, s).free_symbols == {s}
assert mellin_transform(f(x)*a, x, s).free_symbols == {s, a}
def test_as_integral():
from sympy import Function, Integral
f = Function('f')
assert mellin_transform(f(x), x, s).rewrite('Integral') == \
Integral(x**(s - 1)*f(x), (x, 0, oo))
assert fourier_transform(f(x), x, s).rewrite('Integral') == \
Integral(f(x)*exp(-2*I*pi*s*x), (x, -oo, oo))
assert laplace_transform(f(x), x, s).rewrite('Integral') == \
Integral(f(x)*exp(-s*x), (x, 0, oo))
assert str(2*pi*I*inverse_mellin_transform(f(s), s, x, (a, b)).rewrite('Integral')) \
== "Integral(x**(-s)*f(s), (s, _c - oo*I, _c + oo*I))"
assert str(2*pi*I*inverse_laplace_transform(f(s), s, x).rewrite('Integral')) == \
"Integral(f(s)*exp(s*x), (s, _c - oo*I, _c + oo*I))"
assert inverse_fourier_transform(f(s), s, x).rewrite('Integral') == \
Integral(f(s)*exp(2*I*pi*s*x), (s, -oo, oo))
# NOTE this is stuck in risch because meijerint cannot handle it
@slow
@XFAIL
def test_mellin_transform_fail():
skip("Risch takes forever.")
MT = mellin_transform
bpos = symbols('b', positive=True)
# bneg = symbols('b', negative=True)
expr = (sqrt(x + b**2) + b)**a/sqrt(x + b**2)
# TODO does not work with bneg, argument wrong. Needs changes to matching.
assert MT(expr.subs(b, -bpos), x, s) == \
((-1)**(a + 1)*2**(a + 2*s)*bpos**(a + 2*s - 1)*gamma(a + s)
*gamma(1 - a - 2*s)/gamma(1 - s),
(-re(a), -re(a)/2 + S.Half), True)
expr = (sqrt(x + b**2) + b)**a
assert MT(expr.subs(b, -bpos), x, s) == \
(
2**(a + 2*s)*a*bpos**(a + 2*s)*gamma(-a - 2*
s)*gamma(a + s)/gamma(-s + 1),
(-re(a), -re(a)/2), True)
# Test exponent 1:
assert MT(expr.subs({b: -bpos, a: 1}), x, s) == \
(-bpos**(2*s + 1)*gamma(s)*gamma(-s - S.Half)/(2*sqrt(pi)),
(-1, Rational(-1, 2)), True)
def test_mellin_transform():
from sympy import Max, Min
MT = mellin_transform
bpos = symbols('b', positive=True)
# 8.4.2
assert MT(x**nu*Heaviside(x - 1), x, s) == \
(-1/(nu + s), (-oo, -re(nu)), True)
assert MT(x**nu*Heaviside(1 - x), x, s) == \
(1/(nu + s), (-re(nu), oo), True)
assert MT((1 - x)**(beta - 1)*Heaviside(1 - x), x, s) == \
(gamma(beta)*gamma(s)/gamma(beta + s), (0, oo), re(beta) > 0)
assert MT((x - 1)**(beta - 1)*Heaviside(x - 1), x, s) == \
(gamma(beta)*gamma(1 - beta - s)/gamma(1 - s),
(-oo, -re(beta) + 1), re(beta) > 0)
assert MT((1 + x)**(-rho), x, s) == \
(gamma(s)*gamma(rho - s)/gamma(rho), (0, re(rho)), True)
# TODO also the conditions should be simplified, e.g.
# And(re(rho) - 1 < 0, re(rho) < 1) should just be
# re(rho) < 1
assert MT(abs(1 - x)**(-rho), x, s) == (
2*sin(pi*rho/2)*gamma(1 - rho)*
cos(pi*(rho/2 - s))*gamma(s)*gamma(rho-s)/pi,
(0, re(rho)), And(re(rho) - 1 < 0, re(rho) < 1))
mt = MT((1 - x)**(beta - 1)*Heaviside(1 - x)
+ a*(x - 1)**(beta - 1)*Heaviside(x - 1), x, s)
assert mt[1], mt[2] == ((0, -re(beta) + 1), re(beta) > 0)
assert MT((x**a - b**a)/(x - b), x, s)[0] == \
pi*b**(a + s - 1)*sin(pi*a)/(sin(pi*s)*sin(pi*(a + s)))
assert MT((x**a - bpos**a)/(x - bpos), x, s) == \
(pi*bpos**(a + s - 1)*sin(pi*a)/(sin(pi*s)*sin(pi*(a + s))),
(Max(-re(a), 0), Min(1 - re(a), 1)), True)
expr = (sqrt(x + b**2) + b)**a
assert MT(expr.subs(b, bpos), x, s) == \
(-a*(2*bpos)**(a + 2*s)*gamma(s)*gamma(-a - 2*s)/gamma(-a - s + 1),
(0, -re(a)/2), True)
expr = (sqrt(x + b**2) + b)**a/sqrt(x + b**2)
assert MT(expr.subs(b, bpos), x, s) == \
(2**(a + 2*s)*bpos**(a + 2*s - 1)*gamma(s)
*gamma(1 - a - 2*s)/gamma(1 - a - s),
(0, -re(a)/2 + S.Half), True)
# 8.4.2
assert MT(exp(-x), x, s) == (gamma(s), (0, oo), True)
assert MT(exp(-1/x), x, s) == (gamma(-s), (-oo, 0), True)
# 8.4.5
assert MT(log(x)**4*Heaviside(1 - x), x, s) == (24/s**5, (0, oo), True)
assert MT(log(x)**3*Heaviside(x - 1), x, s) == (6/s**4, (-oo, 0), True)
assert MT(log(x + 1), x, s) == (pi/(s*sin(pi*s)), (-1, 0), True)
assert MT(log(1/x + 1), x, s) == (pi/(s*sin(pi*s)), (0, 1), True)
assert MT(log(abs(1 - x)), x, s) == (pi/(s*tan(pi*s)), (-1, 0), True)
assert MT(log(abs(1 - 1/x)), x, s) == (pi/(s*tan(pi*s)), (0, 1), True)
# 8.4.14
assert MT(erf(sqrt(x)), x, s) == \
(-gamma(s + S.Half)/(sqrt(pi)*s), (Rational(-1, 2), 0), True)
@slow
def test_mellin_transform2():
MT = mellin_transform
# TODO we cannot currently do these (needs summation of 3F2(-1))
# this also implies that they cannot be written as a single g-function
# (although this is possible)
mt = MT(log(x)/(x + 1), x, s)
assert mt[1:] == ((0, 1), True)
assert not hyperexpand(mt[0], allow_hyper=True).has(meijerg)
mt = MT(log(x)**2/(x + 1), x, s)
assert mt[1:] == ((0, 1), True)
assert not hyperexpand(mt[0], allow_hyper=True).has(meijerg)
mt = MT(log(x)/(x + 1)**2, x, s)
assert mt[1:] == ((0, 2), True)
assert not hyperexpand(mt[0], allow_hyper=True).has(meijerg)
@slow
def test_mellin_transform_bessel():
from sympy import Max
MT = mellin_transform
# 8.4.19
assert MT(besselj(a, 2*sqrt(x)), x, s) == \
(gamma(a/2 + s)/gamma(a/2 - s + 1), (-re(a)/2, Rational(3, 4)), True)
assert MT(sin(sqrt(x))*besselj(a, sqrt(x)), x, s) == \
(2**a*gamma(-2*s + S.Half)*gamma(a/2 + s + S.Half)/(
gamma(-a/2 - s + 1)*gamma(a - 2*s + 1)), (
-re(a)/2 - S.Half, Rational(1, 4)), True)
assert MT(cos(sqrt(x))*besselj(a, sqrt(x)), x, s) == \
(2**a*gamma(a/2 + s)*gamma(-2*s + S.Half)/(
gamma(-a/2 - s + S.Half)*gamma(a - 2*s + 1)), (
-re(a)/2, Rational(1, 4)), True)
assert MT(besselj(a, sqrt(x))**2, x, s) == \
(gamma(a + s)*gamma(S.Half - s)
/ (sqrt(pi)*gamma(1 - s)*gamma(1 + a - s)),
(-re(a), S.Half), True)
assert MT(besselj(a, sqrt(x))*besselj(-a, sqrt(x)), x, s) == \
(gamma(s)*gamma(S.Half - s)
/ (sqrt(pi)*gamma(1 - a - s)*gamma(1 + a - s)),
(0, S.Half), True)
# NOTE: prudnikov gives the strip below as (1/2 - re(a), 1). As far as
# I can see this is wrong (since besselj(z) ~ 1/sqrt(z) for z large)
assert MT(besselj(a - 1, sqrt(x))*besselj(a, sqrt(x)), x, s) == \
(gamma(1 - s)*gamma(a + s - S.Half)
/ (sqrt(pi)*gamma(Rational(3, 2) - s)*gamma(a - s + S.Half)),
(S.Half - re(a), S.Half), True)
assert MT(besselj(a, sqrt(x))*besselj(b, sqrt(x)), x, s) == \
(4**s*gamma(1 - 2*s)*gamma((a + b)/2 + s)
/ (gamma(1 - s + (b - a)/2)*gamma(1 - s + (a - b)/2)
*gamma( 1 - s + (a + b)/2)),
(-(re(a) + re(b))/2, S.Half), True)
assert MT(besselj(a, sqrt(x))**2 + besselj(-a, sqrt(x))**2, x, s)[1:] == \
((Max(re(a), -re(a)), S.Half), True)
# Section 8.4.20
assert MT(bessely(a, 2*sqrt(x)), x, s) == \
(-cos(pi*(a/2 - s))*gamma(s - a/2)*gamma(s + a/2)/pi,
(Max(-re(a)/2, re(a)/2), Rational(3, 4)), True)
assert MT(sin(sqrt(x))*bessely(a, sqrt(x)), x, s) == \
(-4**s*sin(pi*(a/2 - s))*gamma(S.Half - 2*s)
* gamma((1 - a)/2 + s)*gamma((1 + a)/2 + s)
/ (sqrt(pi)*gamma(1 - s - a/2)*gamma(1 - s + a/2)),
(Max(-(re(a) + 1)/2, (re(a) - 1)/2), Rational(1, 4)), True)
assert MT(cos(sqrt(x))*bessely(a, sqrt(x)), x, s) == \
(-4**s*cos(pi*(a/2 - s))*gamma(s - a/2)*gamma(s + a/2)*gamma(S.Half - 2*s)
/ (sqrt(pi)*gamma(S.Half - s - a/2)*gamma(S.Half - s + a/2)),
(Max(-re(a)/2, re(a)/2), Rational(1, 4)), True)
assert MT(besselj(a, sqrt(x))*bessely(a, sqrt(x)), x, s) == \
(-cos(pi*s)*gamma(s)*gamma(a + s)*gamma(S.Half - s)
/ (pi**S('3/2')*gamma(1 + a - s)),
(Max(-re(a), 0), S.Half), True)
assert MT(besselj(a, sqrt(x))*bessely(b, sqrt(x)), x, s) == \
(-4**s*cos(pi*(a/2 - b/2 + s))*gamma(1 - 2*s)
* gamma(a/2 - b/2 + s)*gamma(a/2 + b/2 + s)
/ (pi*gamma(a/2 - b/2 - s + 1)*gamma(a/2 + b/2 - s + 1)),
(Max((-re(a) + re(b))/2, (-re(a) - re(b))/2), S.Half), True)
# NOTE bessely(a, sqrt(x))**2 and bessely(a, sqrt(x))*bessely(b, sqrt(x))
# are a mess (no matter what way you look at it ...)
assert MT(bessely(a, sqrt(x))**2, x, s)[1:] == \
((Max(-re(a), 0, re(a)), S.Half), True)
# Section 8.4.22
# TODO we can't do any of these (delicate cancellation)
# Section 8.4.23
assert MT(besselk(a, 2*sqrt(x)), x, s) == \
(gamma(
s - a/2)*gamma(s + a/2)/2, (Max(-re(a)/2, re(a)/2), oo), True)
assert MT(besselj(a, 2*sqrt(2*sqrt(x)))*besselk(
a, 2*sqrt(2*sqrt(x))), x, s) == (4**(-s)*gamma(2*s)*
gamma(a/2 + s)/(2*gamma(a/2 - s + 1)), (Max(0, -re(a)/2), oo), True)
# TODO bessely(a, x)*besselk(a, x) is a mess
assert MT(besseli(a, sqrt(x))*besselk(a, sqrt(x)), x, s) == \
(gamma(s)*gamma(
a + s)*gamma(-s + S.Half)/(2*sqrt(pi)*gamma(a - s + 1)),
(Max(-re(a), 0), S.Half), True)
assert MT(besseli(b, sqrt(x))*besselk(a, sqrt(x)), x, s) == \
(2**(2*s - 1)*gamma(-2*s + 1)*gamma(-a/2 + b/2 + s)* \
gamma(a/2 + b/2 + s)/(gamma(-a/2 + b/2 - s + 1)* \
gamma(a/2 + b/2 - s + 1)), (Max(-re(a)/2 - re(b)/2, \
re(a)/2 - re(b)/2), S.Half), True)
# TODO products of besselk are a mess
mt = MT(exp(-x/2)*besselk(a, x/2), x, s)
mt0 = gammasimp(trigsimp(gammasimp(mt[0].expand(func=True))))
assert mt0 == 2*pi**Rational(3, 2)*cos(pi*s)*gamma(-s + S.Half)/(
(cos(2*pi*a) - cos(2*pi*s))*gamma(-a - s + 1)*gamma(a - s + 1))
assert mt[1:] == ((Max(-re(a), re(a)), oo), True)
# TODO exp(x/2)*besselk(a, x/2) [etc] cannot currently be done
# TODO various strange products of special orders
@slow
def test_expint():
from sympy import E1, expint, Max, re, lerchphi, Symbol, simplify, Si, Ci, Ei
aneg = Symbol('a', negative=True)
u = Symbol('u', polar=True)
assert mellin_transform(E1(x), x, s) == (gamma(s)/s, (0, oo), True)
assert inverse_mellin_transform(gamma(s)/s, s, x,
(0, oo)).rewrite(expint).expand() == E1(x)
assert mellin_transform(expint(a, x), x, s) == \
(gamma(s)/(a + s - 1), (Max(1 - re(a), 0), oo), True)
# XXX IMT has hickups with complicated strips ...
assert simplify(unpolarify(
inverse_mellin_transform(gamma(s)/(aneg + s - 1), s, x,
(1 - aneg, oo)).rewrite(expint).expand(func=True))) == \
expint(aneg, x)
assert mellin_transform(Si(x), x, s) == \
(-2**s*sqrt(pi)*gamma(s/2 + S.Half)/(
2*s*gamma(-s/2 + 1)), (-1, 0), True)
assert inverse_mellin_transform(-2**s*sqrt(pi)*gamma((s + 1)/2)
/(2*s*gamma(-s/2 + 1)), s, x, (-1, 0)) \
== Si(x)
assert mellin_transform(Ci(sqrt(x)), x, s) == \
(-2**(2*s - 1)*sqrt(pi)*gamma(s)/(s*gamma(-s + S.Half)), (0, 1), True)
assert inverse_mellin_transform(
-4**s*sqrt(pi)*gamma(s)/(2*s*gamma(-s + S.Half)),
s, u, (0, 1)).expand() == Ci(sqrt(u))
# TODO LT of Si, Shi, Chi is a mess ...
assert laplace_transform(Ci(x), x, s) == (-log(1 + s**2)/2/s, 0, True)
assert laplace_transform(expint(a, x), x, s) == \
(lerchphi(s*exp_polar(I*pi), 1, a), 0, re(a) > S.Zero)
assert laplace_transform(expint(1, x), x, s) == (log(s + 1)/s, 0, True)
assert laplace_transform(expint(2, x), x, s) == \
((s - log(s + 1))/s**2, 0, True)
assert inverse_laplace_transform(-log(1 + s**2)/2/s, s, u).expand() == \
Heaviside(u)*Ci(u)
assert inverse_laplace_transform(log(s + 1)/s, s, x).rewrite(expint) == \
Heaviside(x)*E1(x)
assert inverse_laplace_transform((s - log(s + 1))/s**2, s,
x).rewrite(expint).expand() == \
(expint(2, x)*Heaviside(x)).rewrite(Ei).rewrite(expint).expand()
@slow
def test_inverse_mellin_transform():
from sympy import (sin, simplify, Max, Min, expand,
powsimp, exp_polar, cos, cot)
IMT = inverse_mellin_transform
assert IMT(gamma(s), s, x, (0, oo)) == exp(-x)
assert IMT(gamma(-s), s, x, (-oo, 0)) == exp(-1/x)
assert simplify(IMT(s/(2*s**2 - 2), s, x, (2, oo))) == \
(x**2 + 1)*Heaviside(1 - x)/(4*x)
# test passing "None"
assert IMT(1/(s**2 - 1), s, x, (-1, None)) == \
-x*Heaviside(-x + 1)/2 - Heaviside(x - 1)/(2*x)
assert IMT(1/(s**2 - 1), s, x, (None, 1)) == \
-x*Heaviside(-x + 1)/2 - Heaviside(x - 1)/(2*x)
# test expansion of sums
assert IMT(gamma(s) + gamma(s - 1), s, x, (1, oo)) == (x + 1)*exp(-x)/x
# test factorisation of polys
r = symbols('r', real=True)
assert IMT(1/(s**2 + 1), s, exp(-x), (None, oo)
).subs(x, r).rewrite(sin).simplify() \
== sin(r)*Heaviside(1 - exp(-r))
# test multiplicative substitution
_a, _b = symbols('a b', positive=True)
assert IMT(_b**(-s/_a)*factorial(s/_a)/s, s, x, (0, oo)) == exp(-_b*x**_a)
assert IMT(factorial(_a/_b + s/_b)/(_a + s), s, x, (-_a, oo)) == x**_a*exp(-x**_b)
def simp_pows(expr):
return simplify(powsimp(expand_mul(expr, deep=False), force=True)).replace(exp_polar, exp)
# Now test the inverses of all direct transforms tested above
# Section 8.4.2
nu = symbols('nu', real=True)
assert IMT(-1/(nu + s), s, x, (-oo, None)) == x**nu*Heaviside(x - 1)
assert IMT(1/(nu + s), s, x, (None, oo)) == x**nu*Heaviside(1 - x)
assert simp_pows(IMT(gamma(beta)*gamma(s)/gamma(s + beta), s, x, (0, oo))) \
== (1 - x)**(beta - 1)*Heaviside(1 - x)
assert simp_pows(IMT(gamma(beta)*gamma(1 - beta - s)/gamma(1 - s),
s, x, (-oo, None))) \
== (x - 1)**(beta - 1)*Heaviside(x - 1)
assert simp_pows(IMT(gamma(s)*gamma(rho - s)/gamma(rho), s, x, (0, None))) \
== (1/(x + 1))**rho
assert simp_pows(IMT(d**c*d**(s - 1)*sin(pi*c)
*gamma(s)*gamma(s + c)*gamma(1 - s)*gamma(1 - s - c)/pi,
s, x, (Max(-re(c), 0), Min(1 - re(c), 1)))) \
== (x**c - d**c)/(x - d)
assert simplify(IMT(1/sqrt(pi)*(-c/2)*gamma(s)*gamma((1 - c)/2 - s)
*gamma(-c/2 - s)/gamma(1 - c - s),
s, x, (0, -re(c)/2))) == \
(1 + sqrt(x + 1))**c
assert simplify(IMT(2**(a + 2*s)*b**(a + 2*s - 1)*gamma(s)*gamma(1 - a - 2*s)
/gamma(1 - a - s), s, x, (0, (-re(a) + 1)/2))) == \
b**(a - 1)*(sqrt(1 + x/b**2) + 1)**(a - 1)*(b**2*sqrt(1 + x/b**2) +
b**2 + x)/(b**2 + x)
assert simplify(IMT(-2**(c + 2*s)*c*b**(c + 2*s)*gamma(s)*gamma(-c - 2*s)
/ gamma(-c - s + 1), s, x, (0, -re(c)/2))) == \
b**c*(sqrt(1 + x/b**2) + 1)**c
# Section 8.4.5
assert IMT(24/s**5, s, x, (0, oo)) == log(x)**4*Heaviside(1 - x)
assert expand(IMT(6/s**4, s, x, (-oo, 0)), force=True) == \
log(x)**3*Heaviside(x - 1)
assert IMT(pi/(s*sin(pi*s)), s, x, (-1, 0)) == log(x + 1)
assert IMT(pi/(s*sin(pi*s/2)), s, x, (-2, 0)) == log(x**2 + 1)
assert IMT(pi/(s*sin(2*pi*s)), s, x, (Rational(-1, 2), 0)) == log(sqrt(x) + 1)
assert IMT(pi/(s*sin(pi*s)), s, x, (0, 1)) == log(1 + 1/x)
# TODO
def mysimp(expr):
from sympy import expand, logcombine, powsimp
return expand(
powsimp(logcombine(expr, force=True), force=True, deep=True),
force=True).replace(exp_polar, exp)
assert mysimp(mysimp(IMT(pi/(s*tan(pi*s)), s, x, (-1, 0)))) in [
log(1 - x)*Heaviside(1 - x) + log(x - 1)*Heaviside(x - 1),
log(x)*Heaviside(x - 1) + log(1 - 1/x)*Heaviside(x - 1) + log(-x +
1)*Heaviside(-x + 1)]
# test passing cot
assert mysimp(IMT(pi*cot(pi*s)/s, s, x, (0, 1))) in [
log(1/x - 1)*Heaviside(1 - x) + log(1 - 1/x)*Heaviside(x - 1),
-log(x)*Heaviside(-x + 1) + log(1 - 1/x)*Heaviside(x - 1) + log(-x +
1)*Heaviside(-x + 1), ]
# 8.4.14
assert IMT(-gamma(s + S.Half)/(sqrt(pi)*s), s, x, (Rational(-1, 2), 0)) == \
erf(sqrt(x))
# 8.4.19
assert simplify(IMT(gamma(a/2 + s)/gamma(a/2 - s + 1), s, x, (-re(a)/2, Rational(3, 4)))) \
== besselj(a, 2*sqrt(x))
assert simplify(IMT(2**a*gamma(S.Half - 2*s)*gamma(s + (a + 1)/2)
/ (gamma(1 - s - a/2)*gamma(1 - 2*s + a)),
s, x, (-(re(a) + 1)/2, Rational(1, 4)))) == \
sin(sqrt(x))*besselj(a, sqrt(x))
assert simplify(IMT(2**a*gamma(a/2 + s)*gamma(S.Half - 2*s)
/ (gamma(S.Half - s - a/2)*gamma(1 - 2*s + a)),
s, x, (-re(a)/2, Rational(1, 4)))) == \
cos(sqrt(x))*besselj(a, sqrt(x))
# TODO this comes out as an amazing mess, but simplifies nicely
assert simplify(IMT(gamma(a + s)*gamma(S.Half - s)
/ (sqrt(pi)*gamma(1 - s)*gamma(1 + a - s)),
s, x, (-re(a), S.Half))) == \
besselj(a, sqrt(x))**2
assert simplify(IMT(gamma(s)*gamma(S.Half - s)
/ (sqrt(pi)*gamma(1 - s - a)*gamma(1 + a - s)),
s, x, (0, S.Half))) == \
besselj(-a, sqrt(x))*besselj(a, sqrt(x))
assert simplify(IMT(4**s*gamma(-2*s + 1)*gamma(a/2 + b/2 + s)
/ (gamma(-a/2 + b/2 - s + 1)*gamma(a/2 - b/2 - s + 1)
*gamma(a/2 + b/2 - s + 1)),
s, x, (-(re(a) + re(b))/2, S.Half))) == \
besselj(a, sqrt(x))*besselj(b, sqrt(x))
# Section 8.4.20
# TODO this can be further simplified!
assert simplify(IMT(-2**(2*s)*cos(pi*a/2 - pi*b/2 + pi*s)*gamma(-2*s + 1) *
gamma(a/2 - b/2 + s)*gamma(a/2 + b/2 + s) /
(pi*gamma(a/2 - b/2 - s + 1)*gamma(a/2 + b/2 - s + 1)),
s, x,
(Max(-re(a)/2 - re(b)/2, -re(a)/2 + re(b)/2), S.Half))) == \
besselj(a, sqrt(x))*-(besselj(-b, sqrt(x)) -
besselj(b, sqrt(x))*cos(pi*b))/sin(pi*b)
# TODO more
# for coverage
assert IMT(pi/cos(pi*s), s, x, (0, S.Half)) == sqrt(x)/(x + 1)
@slow
def test_laplace_transform():
from sympy import fresnels, fresnelc
LT = laplace_transform
a, b, c, = symbols('a b c', positive=True)
t = symbols('t')
w = Symbol("w")
f = Function("f")
# Test unevaluated form
assert laplace_transform(f(t), t, w) == LaplaceTransform(f(t), t, w)
assert inverse_laplace_transform(
f(w), w, t, plane=0) == InverseLaplaceTransform(f(w), w, t, 0)
# test a bug
spos = symbols('s', positive=True)
assert LT(exp(t), t, spos)[:2] == (1/(spos - 1), 1)
# basic tests from wikipedia
assert LT((t - a)**b*exp(-c*(t - a))*Heaviside(t - a), t, s) == \
((s + c)**(-b - 1)*exp(-a*s)*gamma(b + 1), -c, True)
assert LT(t**a, t, s) == (s**(-a - 1)*gamma(a + 1), 0, True)
assert LT(Heaviside(t), t, s) == (1/s, 0, True)
assert LT(Heaviside(t - a), t, s) == (exp(-a*s)/s, 0, True)
assert LT(1 - exp(-a*t), t, s) == (a/(s*(a + s)), 0, True)
assert LT((exp(2*t) - 1)*exp(-b - t)*Heaviside(t)/2, t, s, noconds=True) \
== exp(-b)/(s**2 - 1)
assert LT(exp(t), t, s)[:2] == (1/(s - 1), 1)
assert LT(exp(2*t), t, s)[:2] == (1/(s - 2), 2)
assert LT(exp(a*t), t, s)[:2] == (1/(s - a), a)
assert LT(log(t/a), t, s) == ((log(a*s) + EulerGamma)/s/-1, 0, True)
assert LT(erf(t), t, s) == (erfc(s/2)*exp(s**2/4)/s, 0, True)
assert LT(sin(a*t), t, s) == (a/(a**2 + s**2), 0, True)
assert LT(cos(a*t), t, s) == (s/(a**2 + s**2), 0, True)
# TODO would be nice to have these come out better
assert LT(exp(-a*t)*sin(b*t), t, s) == (b/(b**2 + (a + s)**2), -a, True)
assert LT(exp(-a*t)*cos(b*t), t, s) == \
((a + s)/(b**2 + (a + s)**2), -a, True)
assert LT(besselj(0, t), t, s) == (1/sqrt(1 + s**2), 0, True)
assert LT(besselj(1, t), t, s) == (1 - 1/sqrt(1 + 1/s**2), 0, True)
# TODO general order works, but is a *mess*
# TODO besseli also works, but is an even greater mess
# test a bug in conditions processing
# TODO the auxiliary condition should be recognised/simplified
assert LT(exp(t)*cos(t), t, s)[:-1] in [
((s - 1)/(s**2 - 2*s + 2), -oo),
((s - 1)/((s - 1)**2 + 1), -oo),
]
# Fresnel functions
assert laplace_transform(fresnels(t), t, s) == \
((-sin(s**2/(2*pi))*fresnels(s/pi) + sin(s**2/(2*pi))/2 -
cos(s**2/(2*pi))*fresnelc(s/pi) + cos(s**2/(2*pi))/2)/s, 0, True)
assert laplace_transform(fresnelc(t), t, s) == (
((2*sin(s**2/(2*pi))*fresnelc(s/pi) - 2*cos(s**2/(2*pi))*fresnels(s/pi)
+ sqrt(2)*cos(s**2/(2*pi) + pi/4))/(2*s), 0, True))
# What is this testing:
Ne(1/s, 1) & (0 < cos(Abs(periodic_argument(s, oo)))*Abs(s) - 1)
assert LT(Matrix([[exp(t), t*exp(-t)], [t*exp(-t), exp(t)]]), t, s) ==\
Matrix([
[(1/(s - 1), 1, True), ((s + 1)**(-2), 0, True)],
[((s + 1)**(-2), 0, True), (1/(s - 1), 1, True)]
])
def test_issue_8368_7173():
LT = laplace_transform
# hyperbolic
assert LT(sinh(x), x, s) == (1/(s**2 - 1), 1, True)
assert LT(cosh(x), x, s) == (s/(s**2 - 1), 1, True)
assert LT(sinh(x + 3), x, s) == (
(-s + (s + 1)*exp(6) + 1)*exp(-3)/(s - 1)/(s + 1)/2, 1, True)
assert LT(sinh(x)*cosh(x), x, s) == (
1/(s**2 - 4), 2, Ne(s/2, 1))
# trig (make sure they are not being rewritten in terms of exp)
assert LT(cos(x + 3), x, s) == ((s*cos(3) - sin(3))/(s**2 + 1), 0, True)
def test_inverse_laplace_transform():
from sympy import sinh, cosh, besselj, besseli, simplify, factor_terms
ILT = inverse_laplace_transform
a, b, c, = symbols('a b c', positive=True)
t = symbols('t')
def simp_hyp(expr):
return factor_terms(expand_mul(expr)).rewrite(sin)
# just test inverses of all of the above
assert ILT(1/s, s, t) == Heaviside(t)
assert ILT(1/s**2, s, t) == t*Heaviside(t)
assert ILT(1/s**5, s, t) == t**4*Heaviside(t)/24
assert ILT(exp(-a*s)/s, s, t) == Heaviside(t - a)
assert ILT(exp(-a*s)/(s + b), s, t) == exp(b*(a - t))*Heaviside(-a + t)
assert ILT(a/(s**2 + a**2), s, t) == sin(a*t)*Heaviside(t)
assert ILT(s/(s**2 + a**2), s, t) == cos(a*t)*Heaviside(t)
# TODO is there a way around simp_hyp?
assert simp_hyp(ILT(a/(s**2 - a**2), s, t)) == sinh(a*t)*Heaviside(t)
assert simp_hyp(ILT(s/(s**2 - a**2), s, t)) == cosh(a*t)*Heaviside(t)
assert ILT(a/((s + b)**2 + a**2), s, t) == exp(-b*t)*sin(a*t)*Heaviside(t)
assert ILT(
(s + b)/((s + b)**2 + a**2), s, t) == exp(-b*t)*cos(a*t)*Heaviside(t)
# TODO sinh/cosh shifted come out a mess. also delayed trig is a mess
# TODO should this simplify further?
assert ILT(exp(-a*s)/s**b, s, t) == \
(t - a)**(b - 1)*Heaviside(t - a)/gamma(b)
assert ILT(exp(-a*s)/sqrt(1 + s**2), s, t) == \
Heaviside(t - a)*besselj(0, a - t) # note: besselj(0, x) is even
# XXX ILT turns these branch factor into trig functions ...
assert simplify(ILT(a**b*(s + sqrt(s**2 - a**2))**(-b)/sqrt(s**2 - a**2),
s, t).rewrite(exp)) == \
Heaviside(t)*besseli(b, a*t)
assert ILT(a**b*(s + sqrt(s**2 + a**2))**(-b)/sqrt(s**2 + a**2),
s, t).rewrite(exp) == \
Heaviside(t)*besselj(b, a*t)
assert ILT(1/(s*sqrt(s + 1)), s, t) == Heaviside(t)*erf(sqrt(t))
# TODO can we make erf(t) work?
assert ILT(1/(s**2*(s**2 + 1)),s,t) == (t - sin(t))*Heaviside(t)
assert ILT( (s * eye(2) - Matrix([[1, 0], [0, 2]])).inv(), s, t) ==\
Matrix([[exp(t)*Heaviside(t), 0], [0, exp(2*t)*Heaviside(t)]])
def test_inverse_laplace_transform_delta():
from sympy import DiracDelta
ILT = inverse_laplace_transform
t = symbols('t')
assert ILT(2, s, t) == 2*DiracDelta(t)
assert ILT(2*exp(3*s) - 5*exp(-7*s), s, t) == \
2*DiracDelta(t + 3) - 5*DiracDelta(t - 7)
a = cos(sin(7)/2)
assert ILT(a*exp(-3*s), s, t) == a*DiracDelta(t - 3)
assert ILT(exp(2*s), s, t) == DiracDelta(t + 2)
r = Symbol('r', real=True)
assert ILT(exp(r*s), s, t) == DiracDelta(t + r)
def test_inverse_laplace_transform_delta_cond():
from sympy import DiracDelta, Eq, im, Heaviside
ILT = inverse_laplace_transform
t = symbols('t')
r = Symbol('r', real=True)
assert ILT(exp(r*s), s, t, noconds=False) == (DiracDelta(t + r), True)
z = Symbol('z')
assert ILT(exp(z*s), s, t, noconds=False) == \
(DiracDelta(t + z), Eq(im(z), 0))
# inversion does not exist: verify it doesn't evaluate to DiracDelta
for z in (Symbol('z', extended_real=False),
Symbol('z', imaginary=True, zero=False)):
f = ILT(exp(z*s), s, t, noconds=False)
f = f[0] if isinstance(f, tuple) else f
assert f.func != DiracDelta
# issue 15043
assert ILT(1/s + exp(r*s)/s, s, t, noconds=False) == (
Heaviside(t) + Heaviside(r + t), True)
def test_fourier_transform():
from sympy import simplify, expand, expand_complex, factor, expand_trig
FT = fourier_transform
IFT = inverse_fourier_transform
def simp(x):
return simplify(expand_trig(expand_complex(expand(x))))
def sinc(x):
return sin(pi*x)/(pi*x)
k = symbols('k', real=True)
f = Function("f")
# TODO for this to work with real a, need to expand abs(a*x) to abs(a)*abs(x)
a = symbols('a', positive=True)
b = symbols('b', positive=True)
posk = symbols('posk', positive=True)
# Test unevaluated form
assert fourier_transform(f(x), x, k) == FourierTransform(f(x), x, k)
assert inverse_fourier_transform(
f(k), k, x) == InverseFourierTransform(f(k), k, x)
# basic examples from wikipedia
assert simp(FT(Heaviside(1 - abs(2*a*x)), x, k)) == sinc(k/a)/a
# TODO IFT is a *mess*
assert simp(FT(Heaviside(1 - abs(a*x))*(1 - abs(a*x)), x, k)) == sinc(k/a)**2/a
# TODO IFT
assert factor(FT(exp(-a*x)*Heaviside(x), x, k), extension=I) == \
1/(a + 2*pi*I*k)
# NOTE: the ift comes out in pieces
assert IFT(1/(a + 2*pi*I*x), x, posk,
noconds=False) == (exp(-a*posk), True)
assert IFT(1/(a + 2*pi*I*x), x, -posk,
noconds=False) == (0, True)
assert IFT(1/(a + 2*pi*I*x), x, symbols('k', negative=True),
noconds=False) == (0, True)
# TODO IFT without factoring comes out as meijer g
assert factor(FT(x*exp(-a*x)*Heaviside(x), x, k), extension=I) == \
1/(a + 2*pi*I*k)**2
assert FT(exp(-a*x)*sin(b*x)*Heaviside(x), x, k) == \
b/(b**2 + (a + 2*I*pi*k)**2)
assert FT(exp(-a*x**2), x, k) == sqrt(pi)*exp(-pi**2*k**2/a)/sqrt(a)
assert IFT(sqrt(pi/a)*exp(-(pi*k)**2/a), k, x) == exp(-a*x**2)
assert FT(exp(-a*abs(x)), x, k) == 2*a/(a**2 + 4*pi**2*k**2)
# TODO IFT (comes out as meijer G)
# TODO besselj(n, x), n an integer > 0 actually can be done...
# TODO are there other common transforms (no distributions!)?
def test_sine_transform():
from sympy import EulerGamma
t = symbols("t")
w = symbols("w")
a = symbols("a")
f = Function("f")
# Test unevaluated form
assert sine_transform(f(t), t, w) == SineTransform(f(t), t, w)
assert inverse_sine_transform(
f(w), w, t) == InverseSineTransform(f(w), w, t)
assert sine_transform(1/sqrt(t), t, w) == 1/sqrt(w)
assert inverse_sine_transform(1/sqrt(w), w, t) == 1/sqrt(t)
assert sine_transform((1/sqrt(t))**3, t, w) == 2*sqrt(w)
assert sine_transform(t**(-a), t, w) == 2**(
-a + S.Half)*w**(a - 1)*gamma(-a/2 + 1)/gamma((a + 1)/2)
assert inverse_sine_transform(2**(-a + S(
1)/2)*w**(a - 1)*gamma(-a/2 + 1)/gamma(a/2 + S.Half), w, t) == t**(-a)
assert sine_transform(
exp(-a*t), t, w) == sqrt(2)*w/(sqrt(pi)*(a**2 + w**2))
assert inverse_sine_transform(
sqrt(2)*w/(sqrt(pi)*(a**2 + w**2)), w, t) == exp(-a*t)
assert sine_transform(
log(t)/t, t, w) == -sqrt(2)*sqrt(pi)*(log(w**2) + 2*EulerGamma)/4
assert sine_transform(
t*exp(-a*t**2), t, w) == sqrt(2)*w*exp(-w**2/(4*a))/(4*a**Rational(3, 2))
assert inverse_sine_transform(
sqrt(2)*w*exp(-w**2/(4*a))/(4*a**Rational(3, 2)), w, t) == t*exp(-a*t**2)
def test_cosine_transform():
from sympy import Si, Ci
t = symbols("t")
w = symbols("w")
a = symbols("a")
f = Function("f")
# Test unevaluated form
assert cosine_transform(f(t), t, w) == CosineTransform(f(t), t, w)
assert inverse_cosine_transform(
f(w), w, t) == InverseCosineTransform(f(w), w, t)
assert cosine_transform(1/sqrt(t), t, w) == 1/sqrt(w)
assert inverse_cosine_transform(1/sqrt(w), w, t) == 1/sqrt(t)
assert cosine_transform(1/(
a**2 + t**2), t, w) == sqrt(2)*sqrt(pi)*exp(-a*w)/(2*a)
assert cosine_transform(t**(
-a), t, w) == 2**(-a + S.Half)*w**(a - 1)*gamma((-a + 1)/2)/gamma(a/2)
assert inverse_cosine_transform(2**(-a + S(
1)/2)*w**(a - 1)*gamma(-a/2 + S.Half)/gamma(a/2), w, t) == t**(-a)
assert cosine_transform(
exp(-a*t), t, w) == sqrt(2)*a/(sqrt(pi)*(a**2 + w**2))
assert inverse_cosine_transform(
sqrt(2)*a/(sqrt(pi)*(a**2 + w**2)), w, t) == exp(-a*t)
assert cosine_transform(exp(-a*sqrt(t))*cos(a*sqrt(
t)), t, w) == a*exp(-a**2/(2*w))/(2*w**Rational(3, 2))
assert cosine_transform(1/(a + t), t, w) == sqrt(2)*(
(-2*Si(a*w) + pi)*sin(a*w)/2 - cos(a*w)*Ci(a*w))/sqrt(pi)
assert inverse_cosine_transform(sqrt(2)*meijerg(((S.Half, 0), ()), (
(S.Half, 0, 0), (S.Half,)), a**2*w**2/4)/(2*pi), w, t) == 1/(a + t)
assert cosine_transform(1/sqrt(a**2 + t**2), t, w) == sqrt(2)*meijerg(
((S.Half,), ()), ((0, 0), (S.Half,)), a**2*w**2/4)/(2*sqrt(pi))
assert inverse_cosine_transform(sqrt(2)*meijerg(((S.Half,), ()), ((0, 0), (S.Half,)), a**2*w**2/4)/(2*sqrt(pi)), w, t) == 1/(t*sqrt(a**2/t**2 + 1))
def test_hankel_transform():
from sympy import gamma, sqrt, exp
r = Symbol("r")
k = Symbol("k")
nu = Symbol("nu")
m = Symbol("m")
a = symbols("a")
assert hankel_transform(1/r, r, k, 0) == 1/k
assert inverse_hankel_transform(1/k, k, r, 0) == 1/r
assert hankel_transform(
1/r**m, r, k, 0) == 2**(-m + 1)*k**(m - 2)*gamma(-m/2 + 1)/gamma(m/2)
assert inverse_hankel_transform(
2**(-m + 1)*k**(m - 2)*gamma(-m/2 + 1)/gamma(m/2), k, r, 0) == r**(-m)
assert hankel_transform(1/r**m, r, k, nu) == (
2*2**(-m)*k**(m - 2)*gamma(-m/2 + nu/2 + 1)/gamma(m/2 + nu/2))
assert inverse_hankel_transform(2**(-m + 1)*k**(
m - 2)*gamma(-m/2 + nu/2 + 1)/gamma(m/2 + nu/2), k, r, nu) == r**(-m)
assert hankel_transform(r**nu*exp(-a*r), r, k, nu) == \
2**(nu + 1)*a*k**(-nu - 3)*(a**2/k**2 + 1)**(-nu - S(
3)/2)*gamma(nu + Rational(3, 2))/sqrt(pi)
assert inverse_hankel_transform(
2**(nu + 1)*a*k**(-nu - 3)*(a**2/k**2 + 1)**(-nu - Rational(3, 2))*gamma(
nu + Rational(3, 2))/sqrt(pi), k, r, nu) == r**nu*exp(-a*r)
def test_issue_7181():
assert mellin_transform(1/(1 - x), x, s) != None
def test_issue_8882():
# This is the original test.
# from sympy import diff, Integral, integrate
# r = Symbol('r')
# psi = 1/r*sin(r)*exp(-(a0*r))
# h = -1/2*diff(psi, r, r) - 1/r*psi
# f = 4*pi*psi*h*r**2
# assert integrate(f, (r, -oo, 3), meijerg=True).has(Integral) == True
# To save time, only the critical part is included.
F = -a**(-s + 1)*(4 + 1/a**2)**(-s/2)*sqrt(1/a**2)*exp(-s*I*pi)* \
sin(s*atan(sqrt(1/a**2)/2))*gamma(s)
raises(IntegralTransformError, lambda:
inverse_mellin_transform(F, s, x, (-1, oo),
**{'as_meijerg': True, 'needeval': True}))
def test_issue_7173():
from sympy import cse
x0, x1, x2, x3 = symbols('x:4')
ans = laplace_transform(sinh(a*x)*cosh(a*x), x, s)
r, e = cse(ans)
assert r == [
(x0, arg(a)),
(x1, Abs(x0)),
(x2, pi/2),
(x3, Abs(x0 + pi))]
assert e == [
a/(-4*a**2 + s**2),
0,
((x1 <= x2) | (x1 < x2)) & ((x3 <= x2) | (x3 < x2))]
def test_issue_8514():
from sympy import simplify
a, b, c, = symbols('a b c', positive=True)
t = symbols('t', positive=True)
ft = simplify(inverse_laplace_transform(1/(a*s**2+b*s+c),s, t))
assert ft == (I*exp(t*cos(atan2(0, -4*a*c + b**2)/2)*sqrt(Abs(4*a*c -
b**2))/a)*sin(t*sin(atan2(0, -4*a*c + b**2)/2)*sqrt(Abs(
4*a*c - b**2))/(2*a)) + exp(t*cos(atan2(0, -4*a*c + b**2)
/2)*sqrt(Abs(4*a*c - b**2))/a)*cos(t*sin(atan2(0, -4*a*c
+ b**2)/2)*sqrt(Abs(4*a*c - b**2))/(2*a)) + I*sin(t*sin(
atan2(0, -4*a*c + b**2)/2)*sqrt(Abs(4*a*c - b**2))/(2*a))
- cos(t*sin(atan2(0, -4*a*c + b**2)/2)*sqrt(Abs(4*a*c -
b**2))/(2*a)))*exp(-t*(b + cos(atan2(0, -4*a*c + b**2)/2)
*sqrt(Abs(4*a*c - b**2)))/(2*a))/sqrt(-4*a*c + b**2)
def test_issue_12591():
x, y = symbols("x y", real=True)
assert fourier_transform(exp(x), x, y) == FourierTransform(exp(x), x, y)
def test_issue_14692():
b = Symbol('b', negative=True)
assert laplace_transform(1/(I*x - b), x, s) == \
(-I*exp(I*b*s)*expint(1, b*s*exp_polar(I*pi/2)), 0, True)
|
28829910ed4d0fe51c7375d9977eeff3b00d6a7643cf14a7469fdeb5f78edd7b
|
"""Test whether all elements of cls.args are instances of Basic. """
# NOTE: keep tests sorted by (module, class name) key. If a class can't
# be instantiated, add it here anyway with @SKIP("abstract class) (see
# e.g. Function).
import os
import re
from sympy import (Basic, S, symbols, sqrt, sin, oo, Interval, exp, Lambda, pi,
Eq, log, Function, Rational)
from sympy.testing.pytest import XFAIL, SKIP
x, y, z = symbols('x,y,z')
def test_all_classes_are_tested():
this = os.path.split(__file__)[0]
path = os.path.join(this, os.pardir, os.pardir)
sympy_path = os.path.abspath(path)
prefix = os.path.split(sympy_path)[0] + os.sep
re_cls = re.compile(r"^class ([A-Za-z][A-Za-z0-9_]*)\s*\(", re.MULTILINE)
modules = {}
for root, dirs, files in os.walk(sympy_path):
module = root.replace(prefix, "").replace(os.sep, ".")
for file in files:
if file.startswith(("_", "test_", "bench_")):
continue
if not file.endswith(".py"):
continue
with open(os.path.join(root, file), "r", encoding='utf-8') as f:
text = f.read()
submodule = module + '.' + file[:-3]
names = re_cls.findall(text)
if not names:
continue
try:
mod = __import__(submodule, fromlist=names)
except ImportError:
continue
def is_Basic(name):
cls = getattr(mod, name)
if hasattr(cls, '_sympy_deprecated_func'):
cls = cls._sympy_deprecated_func
return issubclass(cls, Basic)
names = list(filter(is_Basic, names))
if names:
modules[submodule] = names
ns = globals()
failed = []
for module, names in modules.items():
mod = module.replace('.', '__')
for name in names:
test = 'test_' + mod + '__' + name
if test not in ns:
failed.append(module + '.' + name)
assert not failed, "Missing classes: %s. Please add tests for these to sympy/core/tests/test_args.py." % ", ".join(failed)
def _test_args(obj):
all_basic = all(isinstance(arg, Basic) for arg in obj.args)
# Ideally obj.func(*obj.args) would always recreate the object, but for
# now, we only require it for objects with non-empty .args
recreatable = not obj.args or obj.func(*obj.args) == obj
return all_basic and recreatable
def test_sympy__assumptions__assume__AppliedPredicate():
from sympy.assumptions.assume import AppliedPredicate, Predicate
from sympy import Q
assert _test_args(AppliedPredicate(Predicate("test"), 2))
assert _test_args(Q.is_true(True))
def test_sympy__assumptions__assume__Predicate():
from sympy.assumptions.assume import Predicate
assert _test_args(Predicate("test"))
def test_sympy__assumptions__sathandlers__UnevaluatedOnFree():
from sympy.assumptions.sathandlers import UnevaluatedOnFree
from sympy import Q
assert _test_args(UnevaluatedOnFree(Q.positive))
def test_sympy__assumptions__sathandlers__AllArgs():
from sympy.assumptions.sathandlers import AllArgs
from sympy import Q
assert _test_args(AllArgs(Q.positive))
def test_sympy__assumptions__sathandlers__AnyArgs():
from sympy.assumptions.sathandlers import AnyArgs
from sympy import Q
assert _test_args(AnyArgs(Q.positive))
def test_sympy__assumptions__sathandlers__ExactlyOneArg():
from sympy.assumptions.sathandlers import ExactlyOneArg
from sympy import Q
assert _test_args(ExactlyOneArg(Q.positive))
def test_sympy__assumptions__sathandlers__CheckOldAssump():
from sympy.assumptions.sathandlers import CheckOldAssump
from sympy import Q
assert _test_args(CheckOldAssump(Q.positive))
def test_sympy__assumptions__sathandlers__CheckIsPrime():
from sympy.assumptions.sathandlers import CheckIsPrime
from sympy import Q
# Input must be a number
assert _test_args(CheckIsPrime(Q.positive))
@SKIP("abstract Class")
def test_sympy__codegen__ast__AssignmentBase():
from sympy.codegen.ast import AssignmentBase
assert _test_args(AssignmentBase(x, 1))
@SKIP("abstract Class")
def test_sympy__codegen__ast__AugmentedAssignment():
from sympy.codegen.ast import AugmentedAssignment
assert _test_args(AugmentedAssignment(x, 1))
def test_sympy__codegen__ast__AddAugmentedAssignment():
from sympy.codegen.ast import AddAugmentedAssignment
assert _test_args(AddAugmentedAssignment(x, 1))
def test_sympy__codegen__ast__SubAugmentedAssignment():
from sympy.codegen.ast import SubAugmentedAssignment
assert _test_args(SubAugmentedAssignment(x, 1))
def test_sympy__codegen__ast__MulAugmentedAssignment():
from sympy.codegen.ast import MulAugmentedAssignment
assert _test_args(MulAugmentedAssignment(x, 1))
def test_sympy__codegen__ast__DivAugmentedAssignment():
from sympy.codegen.ast import DivAugmentedAssignment
assert _test_args(DivAugmentedAssignment(x, 1))
def test_sympy__codegen__ast__ModAugmentedAssignment():
from sympy.codegen.ast import ModAugmentedAssignment
assert _test_args(ModAugmentedAssignment(x, 1))
def test_sympy__codegen__ast__CodeBlock():
from sympy.codegen.ast import CodeBlock, Assignment
assert _test_args(CodeBlock(Assignment(x, 1), Assignment(y, 2)))
def test_sympy__codegen__ast__For():
from sympy.codegen.ast import For, CodeBlock, AddAugmentedAssignment
from sympy import Range
assert _test_args(For(x, Range(10), CodeBlock(AddAugmentedAssignment(y, 1))))
def test_sympy__codegen__ast__Token():
from sympy.codegen.ast import Token
assert _test_args(Token())
def test_sympy__codegen__ast__ContinueToken():
from sympy.codegen.ast import ContinueToken
assert _test_args(ContinueToken())
def test_sympy__codegen__ast__BreakToken():
from sympy.codegen.ast import BreakToken
assert _test_args(BreakToken())
def test_sympy__codegen__ast__NoneToken():
from sympy.codegen.ast import NoneToken
assert _test_args(NoneToken())
def test_sympy__codegen__ast__String():
from sympy.codegen.ast import String
assert _test_args(String('foobar'))
def test_sympy__codegen__ast__QuotedString():
from sympy.codegen.ast import QuotedString
assert _test_args(QuotedString('foobar'))
def test_sympy__codegen__ast__Comment():
from sympy.codegen.ast import Comment
assert _test_args(Comment('this is a comment'))
def test_sympy__codegen__ast__Node():
from sympy.codegen.ast import Node
assert _test_args(Node())
assert _test_args(Node(attrs={1, 2, 3}))
def test_sympy__codegen__ast__Type():
from sympy.codegen.ast import Type
assert _test_args(Type('float128'))
def test_sympy__codegen__ast__IntBaseType():
from sympy.codegen.ast import IntBaseType
assert _test_args(IntBaseType('bigint'))
def test_sympy__codegen__ast___SizedIntType():
from sympy.codegen.ast import _SizedIntType
assert _test_args(_SizedIntType('int128', 128))
def test_sympy__codegen__ast__SignedIntType():
from sympy.codegen.ast import SignedIntType
assert _test_args(SignedIntType('int128_with_sign', 128))
def test_sympy__codegen__ast__UnsignedIntType():
from sympy.codegen.ast import UnsignedIntType
assert _test_args(UnsignedIntType('unt128', 128))
def test_sympy__codegen__ast__FloatBaseType():
from sympy.codegen.ast import FloatBaseType
assert _test_args(FloatBaseType('positive_real'))
def test_sympy__codegen__ast__FloatType():
from sympy.codegen.ast import FloatType
assert _test_args(FloatType('float242', 242, nmant=142, nexp=99))
def test_sympy__codegen__ast__ComplexBaseType():
from sympy.codegen.ast import ComplexBaseType
assert _test_args(ComplexBaseType('positive_cmplx'))
def test_sympy__codegen__ast__ComplexType():
from sympy.codegen.ast import ComplexType
assert _test_args(ComplexType('complex42', 42, nmant=15, nexp=5))
def test_sympy__codegen__ast__Attribute():
from sympy.codegen.ast import Attribute
assert _test_args(Attribute('noexcept'))
def test_sympy__codegen__ast__Variable():
from sympy.codegen.ast import Variable, Type, value_const
assert _test_args(Variable(x))
assert _test_args(Variable(y, Type('float32'), {value_const}))
assert _test_args(Variable(z, type=Type('float64')))
def test_sympy__codegen__ast__Pointer():
from sympy.codegen.ast import Pointer, Type, pointer_const
assert _test_args(Pointer(x))
assert _test_args(Pointer(y, type=Type('float32')))
assert _test_args(Pointer(z, Type('float64'), {pointer_const}))
def test_sympy__codegen__ast__Declaration():
from sympy.codegen.ast import Declaration, Variable, Type
vx = Variable(x, type=Type('float'))
assert _test_args(Declaration(vx))
def test_sympy__codegen__ast__While():
from sympy.codegen.ast import While, AddAugmentedAssignment
assert _test_args(While(abs(x) < 1, [AddAugmentedAssignment(x, -1)]))
def test_sympy__codegen__ast__Scope():
from sympy.codegen.ast import Scope, AddAugmentedAssignment
assert _test_args(Scope([AddAugmentedAssignment(x, -1)]))
def test_sympy__codegen__ast__Stream():
from sympy.codegen.ast import Stream
assert _test_args(Stream('stdin'))
def test_sympy__codegen__ast__Print():
from sympy.codegen.ast import Print
assert _test_args(Print([x, y]))
assert _test_args(Print([x, y], "%d %d"))
def test_sympy__codegen__ast__FunctionPrototype():
from sympy.codegen.ast import FunctionPrototype, real, Declaration, Variable
inp_x = Declaration(Variable(x, type=real))
assert _test_args(FunctionPrototype(real, 'pwer', [inp_x]))
def test_sympy__codegen__ast__FunctionDefinition():
from sympy.codegen.ast import FunctionDefinition, real, Declaration, Variable, Assignment
inp_x = Declaration(Variable(x, type=real))
assert _test_args(FunctionDefinition(real, 'pwer', [inp_x], [Assignment(x, x**2)]))
def test_sympy__codegen__ast__Return():
from sympy.codegen.ast import Return
assert _test_args(Return(x))
def test_sympy__codegen__ast__FunctionCall():
from sympy.codegen.ast import FunctionCall
assert _test_args(FunctionCall('pwer', [x]))
def test_sympy__codegen__ast__Element():
from sympy.codegen.ast import Element
assert _test_args(Element('x', range(3)))
def test_sympy__codegen__cnodes__CommaOperator():
from sympy.codegen.cnodes import CommaOperator
assert _test_args(CommaOperator(1, 2))
def test_sympy__codegen__cnodes__goto():
from sympy.codegen.cnodes import goto
assert _test_args(goto('early_exit'))
def test_sympy__codegen__cnodes__Label():
from sympy.codegen.cnodes import Label
assert _test_args(Label('early_exit'))
def test_sympy__codegen__cnodes__PreDecrement():
from sympy.codegen.cnodes import PreDecrement
assert _test_args(PreDecrement(x))
def test_sympy__codegen__cnodes__PostDecrement():
from sympy.codegen.cnodes import PostDecrement
assert _test_args(PostDecrement(x))
def test_sympy__codegen__cnodes__PreIncrement():
from sympy.codegen.cnodes import PreIncrement
assert _test_args(PreIncrement(x))
def test_sympy__codegen__cnodes__PostIncrement():
from sympy.codegen.cnodes import PostIncrement
assert _test_args(PostIncrement(x))
def test_sympy__codegen__cnodes__struct():
from sympy.codegen.ast import real, Variable
from sympy.codegen.cnodes import struct
assert _test_args(struct(declarations=[
Variable(x, type=real),
Variable(y, type=real)
]))
def test_sympy__codegen__cnodes__union():
from sympy.codegen.ast import float32, int32, Variable
from sympy.codegen.cnodes import union
assert _test_args(union(declarations=[
Variable(x, type=float32),
Variable(y, type=int32)
]))
def test_sympy__codegen__cxxnodes__using():
from sympy.codegen.cxxnodes import using
assert _test_args(using('std::vector'))
assert _test_args(using('std::vector', 'vec'))
def test_sympy__codegen__fnodes__Program():
from sympy.codegen.fnodes import Program
assert _test_args(Program('foobar', []))
def test_sympy__codegen__fnodes__Module():
from sympy.codegen.fnodes import Module
assert _test_args(Module('foobar', [], []))
def test_sympy__codegen__fnodes__Subroutine():
from sympy.codegen.fnodes import Subroutine
x = symbols('x', real=True)
assert _test_args(Subroutine('foo', [x], []))
def test_sympy__codegen__fnodes__GoTo():
from sympy.codegen.fnodes import GoTo
assert _test_args(GoTo([10]))
assert _test_args(GoTo([10, 20], x > 1))
def test_sympy__codegen__fnodes__FortranReturn():
from sympy.codegen.fnodes import FortranReturn
assert _test_args(FortranReturn(10))
def test_sympy__codegen__fnodes__Extent():
from sympy.codegen.fnodes import Extent
assert _test_args(Extent())
assert _test_args(Extent(None))
assert _test_args(Extent(':'))
assert _test_args(Extent(-3, 4))
assert _test_args(Extent(x, y))
def test_sympy__codegen__fnodes__use_rename():
from sympy.codegen.fnodes import use_rename
assert _test_args(use_rename('loc', 'glob'))
def test_sympy__codegen__fnodes__use():
from sympy.codegen.fnodes import use
assert _test_args(use('modfoo', only='bar'))
def test_sympy__codegen__fnodes__SubroutineCall():
from sympy.codegen.fnodes import SubroutineCall
assert _test_args(SubroutineCall('foo', ['bar', 'baz']))
def test_sympy__codegen__fnodes__Do():
from sympy.codegen.fnodes import Do
assert _test_args(Do([], 'i', 1, 42))
def test_sympy__codegen__fnodes__ImpliedDoLoop():
from sympy.codegen.fnodes import ImpliedDoLoop
assert _test_args(ImpliedDoLoop('i', 'i', 1, 42))
def test_sympy__codegen__fnodes__ArrayConstructor():
from sympy.codegen.fnodes import ArrayConstructor
assert _test_args(ArrayConstructor([1, 2, 3]))
from sympy.codegen.fnodes import ImpliedDoLoop
idl = ImpliedDoLoop('i', 'i', 1, 42)
assert _test_args(ArrayConstructor([1, idl, 3]))
def test_sympy__codegen__fnodes__sum_():
from sympy.codegen.fnodes import sum_
assert _test_args(sum_('arr'))
def test_sympy__codegen__fnodes__product_():
from sympy.codegen.fnodes import product_
assert _test_args(product_('arr'))
@XFAIL
def test_sympy__combinatorics__graycode__GrayCode():
from sympy.combinatorics.graycode import GrayCode
# an integer is given and returned from GrayCode as the arg
assert _test_args(GrayCode(3, start='100'))
assert _test_args(GrayCode(3, rank=1))
def test_sympy__combinatorics__subsets__Subset():
from sympy.combinatorics.subsets import Subset
assert _test_args(Subset([0, 1], [0, 1, 2, 3]))
assert _test_args(Subset(['c', 'd'], ['a', 'b', 'c', 'd']))
def test_sympy__combinatorics__permutations__Permutation():
from sympy.combinatorics.permutations import Permutation
assert _test_args(Permutation([0, 1, 2, 3]))
def test_sympy__combinatorics__permutations__AppliedPermutation():
from sympy.combinatorics.permutations import Permutation
from sympy.combinatorics.permutations import AppliedPermutation
p = Permutation([0, 1, 2, 3])
assert _test_args(AppliedPermutation(p, 1))
def test_sympy__combinatorics__perm_groups__PermutationGroup():
from sympy.combinatorics.permutations import Permutation
from sympy.combinatorics.perm_groups import PermutationGroup
assert _test_args(PermutationGroup([Permutation([0, 1])]))
def test_sympy__combinatorics__polyhedron__Polyhedron():
from sympy.combinatorics.permutations import Permutation
from sympy.combinatorics.polyhedron import Polyhedron
from sympy.abc import w, x, y, z
pgroup = [Permutation([[0, 1, 2], [3]]),
Permutation([[0, 1, 3], [2]]),
Permutation([[0, 2, 3], [1]]),
Permutation([[1, 2, 3], [0]]),
Permutation([[0, 1], [2, 3]]),
Permutation([[0, 2], [1, 3]]),
Permutation([[0, 3], [1, 2]]),
Permutation([[0, 1, 2, 3]])]
corners = [w, x, y, z]
faces = [(w, x, y), (w, y, z), (w, z, x), (x, y, z)]
assert _test_args(Polyhedron(corners, faces, pgroup))
@XFAIL
def test_sympy__combinatorics__prufer__Prufer():
from sympy.combinatorics.prufer import Prufer
assert _test_args(Prufer([[0, 1], [0, 2], [0, 3]], 4))
def test_sympy__combinatorics__partitions__Partition():
from sympy.combinatorics.partitions import Partition
assert _test_args(Partition([1]))
@XFAIL
def test_sympy__combinatorics__partitions__IntegerPartition():
from sympy.combinatorics.partitions import IntegerPartition
assert _test_args(IntegerPartition([1]))
def test_sympy__concrete__products__Product():
from sympy.concrete.products import Product
assert _test_args(Product(x, (x, 0, 10)))
assert _test_args(Product(x, (x, 0, y), (y, 0, 10)))
@SKIP("abstract Class")
def test_sympy__concrete__expr_with_limits__ExprWithLimits():
from sympy.concrete.expr_with_limits import ExprWithLimits
assert _test_args(ExprWithLimits(x, (x, 0, 10)))
assert _test_args(ExprWithLimits(x*y, (x, 0, 10.),(y,1.,3)))
@SKIP("abstract Class")
def test_sympy__concrete__expr_with_limits__AddWithLimits():
from sympy.concrete.expr_with_limits import AddWithLimits
assert _test_args(AddWithLimits(x, (x, 0, 10)))
assert _test_args(AddWithLimits(x*y, (x, 0, 10),(y,1,3)))
@SKIP("abstract Class")
def test_sympy__concrete__expr_with_intlimits__ExprWithIntLimits():
from sympy.concrete.expr_with_intlimits import ExprWithIntLimits
assert _test_args(ExprWithIntLimits(x, (x, 0, 10)))
assert _test_args(ExprWithIntLimits(x*y, (x, 0, 10),(y,1,3)))
def test_sympy__concrete__summations__Sum():
from sympy.concrete.summations import Sum
assert _test_args(Sum(x, (x, 0, 10)))
assert _test_args(Sum(x, (x, 0, y), (y, 0, 10)))
def test_sympy__core__add__Add():
from sympy.core.add import Add
assert _test_args(Add(x, y, z, 2))
def test_sympy__core__basic__Atom():
from sympy.core.basic import Atom
assert _test_args(Atom())
def test_sympy__core__basic__Basic():
from sympy.core.basic import Basic
assert _test_args(Basic())
def test_sympy__core__containers__Dict():
from sympy.core.containers import Dict
assert _test_args(Dict({x: y, y: z}))
def test_sympy__core__containers__Tuple():
from sympy.core.containers import Tuple
assert _test_args(Tuple(x, y, z, 2))
def test_sympy__core__expr__AtomicExpr():
from sympy.core.expr import AtomicExpr
assert _test_args(AtomicExpr())
def test_sympy__core__expr__Expr():
from sympy.core.expr import Expr
assert _test_args(Expr())
def test_sympy__core__expr__UnevaluatedExpr():
from sympy.core.expr import UnevaluatedExpr
from sympy.abc import x
assert _test_args(UnevaluatedExpr(x))
def test_sympy__core__function__Application():
from sympy.core.function import Application
assert _test_args(Application(1, 2, 3))
def test_sympy__core__function__AppliedUndef():
from sympy.core.function import AppliedUndef
assert _test_args(AppliedUndef(1, 2, 3))
def test_sympy__core__function__Derivative():
from sympy.core.function import Derivative
assert _test_args(Derivative(2, x, y, 3))
@SKIP("abstract class")
def test_sympy__core__function__Function():
pass
def test_sympy__core__function__Lambda():
assert _test_args(Lambda((x, y), x + y + z))
def test_sympy__core__function__Subs():
from sympy.core.function import Subs
assert _test_args(Subs(x + y, x, 2))
def test_sympy__core__function__WildFunction():
from sympy.core.function import WildFunction
assert _test_args(WildFunction('f'))
def test_sympy__core__mod__Mod():
from sympy.core.mod import Mod
assert _test_args(Mod(x, 2))
def test_sympy__core__mul__Mul():
from sympy.core.mul import Mul
assert _test_args(Mul(2, x, y, z))
def test_sympy__core__numbers__Catalan():
from sympy.core.numbers import Catalan
assert _test_args(Catalan())
def test_sympy__core__numbers__ComplexInfinity():
from sympy.core.numbers import ComplexInfinity
assert _test_args(ComplexInfinity())
def test_sympy__core__numbers__EulerGamma():
from sympy.core.numbers import EulerGamma
assert _test_args(EulerGamma())
def test_sympy__core__numbers__Exp1():
from sympy.core.numbers import Exp1
assert _test_args(Exp1())
def test_sympy__core__numbers__Float():
from sympy.core.numbers import Float
assert _test_args(Float(1.23))
def test_sympy__core__numbers__GoldenRatio():
from sympy.core.numbers import GoldenRatio
assert _test_args(GoldenRatio())
def test_sympy__core__numbers__TribonacciConstant():
from sympy.core.numbers import TribonacciConstant
assert _test_args(TribonacciConstant())
def test_sympy__core__numbers__Half():
from sympy.core.numbers import Half
assert _test_args(Half())
def test_sympy__core__numbers__ImaginaryUnit():
from sympy.core.numbers import ImaginaryUnit
assert _test_args(ImaginaryUnit())
def test_sympy__core__numbers__Infinity():
from sympy.core.numbers import Infinity
assert _test_args(Infinity())
def test_sympy__core__numbers__Integer():
from sympy.core.numbers import Integer
assert _test_args(Integer(7))
@SKIP("abstract class")
def test_sympy__core__numbers__IntegerConstant():
pass
def test_sympy__core__numbers__NaN():
from sympy.core.numbers import NaN
assert _test_args(NaN())
def test_sympy__core__numbers__NegativeInfinity():
from sympy.core.numbers import NegativeInfinity
assert _test_args(NegativeInfinity())
def test_sympy__core__numbers__NegativeOne():
from sympy.core.numbers import NegativeOne
assert _test_args(NegativeOne())
def test_sympy__core__numbers__Number():
from sympy.core.numbers import Number
assert _test_args(Number(1, 7))
def test_sympy__core__numbers__NumberSymbol():
from sympy.core.numbers import NumberSymbol
assert _test_args(NumberSymbol())
def test_sympy__core__numbers__One():
from sympy.core.numbers import One
assert _test_args(One())
def test_sympy__core__numbers__Pi():
from sympy.core.numbers import Pi
assert _test_args(Pi())
def test_sympy__core__numbers__Rational():
from sympy.core.numbers import Rational
assert _test_args(Rational(1, 7))
@SKIP("abstract class")
def test_sympy__core__numbers__RationalConstant():
pass
def test_sympy__core__numbers__Zero():
from sympy.core.numbers import Zero
assert _test_args(Zero())
@SKIP("abstract class")
def test_sympy__core__operations__AssocOp():
pass
@SKIP("abstract class")
def test_sympy__core__operations__LatticeOp():
pass
def test_sympy__core__power__Pow():
from sympy.core.power import Pow
assert _test_args(Pow(x, 2))
def test_sympy__algebras__quaternion__Quaternion():
from sympy.algebras.quaternion import Quaternion
assert _test_args(Quaternion(x, 1, 2, 3))
def test_sympy__core__relational__Equality():
from sympy.core.relational import Equality
assert _test_args(Equality(x, 2))
def test_sympy__core__relational__GreaterThan():
from sympy.core.relational import GreaterThan
assert _test_args(GreaterThan(x, 2))
def test_sympy__core__relational__LessThan():
from sympy.core.relational import LessThan
assert _test_args(LessThan(x, 2))
@SKIP("abstract class")
def test_sympy__core__relational__Relational():
pass
def test_sympy__core__relational__StrictGreaterThan():
from sympy.core.relational import StrictGreaterThan
assert _test_args(StrictGreaterThan(x, 2))
def test_sympy__core__relational__StrictLessThan():
from sympy.core.relational import StrictLessThan
assert _test_args(StrictLessThan(x, 2))
def test_sympy__core__relational__Unequality():
from sympy.core.relational import Unequality
assert _test_args(Unequality(x, 2))
def test_sympy__sandbox__indexed_integrals__IndexedIntegral():
from sympy.tensor import IndexedBase, Idx
from sympy.sandbox.indexed_integrals import IndexedIntegral
A = IndexedBase('A')
i, j = symbols('i j', integer=True)
a1, a2 = symbols('a1:3', cls=Idx)
assert _test_args(IndexedIntegral(A[a1], A[a2]))
assert _test_args(IndexedIntegral(A[i], A[j]))
def test_sympy__calculus__util__AccumulationBounds():
from sympy.calculus.util import AccumulationBounds
assert _test_args(AccumulationBounds(0, 1))
def test_sympy__sets__ordinals__OmegaPower():
from sympy.sets.ordinals import OmegaPower
assert _test_args(OmegaPower(1, 1))
def test_sympy__sets__ordinals__Ordinal():
from sympy.sets.ordinals import Ordinal, OmegaPower
assert _test_args(Ordinal(OmegaPower(2, 1)))
def test_sympy__sets__ordinals__OrdinalOmega():
from sympy.sets.ordinals import OrdinalOmega
assert _test_args(OrdinalOmega())
def test_sympy__sets__ordinals__OrdinalZero():
from sympy.sets.ordinals import OrdinalZero
assert _test_args(OrdinalZero())
def test_sympy__sets__powerset__PowerSet():
from sympy.sets.powerset import PowerSet
from sympy.core.singleton import S
assert _test_args(PowerSet(S.EmptySet))
def test_sympy__sets__sets__EmptySet():
from sympy.sets.sets import EmptySet
assert _test_args(EmptySet())
def test_sympy__sets__sets__UniversalSet():
from sympy.sets.sets import UniversalSet
assert _test_args(UniversalSet())
def test_sympy__sets__sets__FiniteSet():
from sympy.sets.sets import FiniteSet
assert _test_args(FiniteSet(x, y, z))
def test_sympy__sets__sets__Interval():
from sympy.sets.sets import Interval
assert _test_args(Interval(0, 1))
def test_sympy__sets__sets__ProductSet():
from sympy.sets.sets import ProductSet, Interval
assert _test_args(ProductSet(Interval(0, 1), Interval(0, 1)))
@SKIP("does it make sense to test this?")
def test_sympy__sets__sets__Set():
from sympy.sets.sets import Set
assert _test_args(Set())
def test_sympy__sets__sets__Intersection():
from sympy.sets.sets import Intersection, Interval
from sympy.core.symbol import Symbol
x = Symbol('x')
y = Symbol('y')
S = Intersection(Interval(0, x), Interval(y, 1))
assert isinstance(S, Intersection)
assert _test_args(S)
def test_sympy__sets__sets__Union():
from sympy.sets.sets import Union, Interval
assert _test_args(Union(Interval(0, 1), Interval(2, 3)))
def test_sympy__sets__sets__Complement():
from sympy.sets.sets import Complement
assert _test_args(Complement(Interval(0, 2), Interval(0, 1)))
def test_sympy__sets__sets__SymmetricDifference():
from sympy.sets.sets import FiniteSet, SymmetricDifference
assert _test_args(SymmetricDifference(FiniteSet(1, 2, 3), \
FiniteSet(2, 3, 4)))
def test_sympy__sets__sets__DisjointUnion():
from sympy.sets.sets import FiniteSet, DisjointUnion
assert _test_args(DisjointUnion(FiniteSet(1, 2, 3), \
FiniteSet(2, 3, 4)))
def test_sympy__core__trace__Tr():
from sympy.core.trace import Tr
a, b = symbols('a b')
assert _test_args(Tr(a + b))
def test_sympy__sets__setexpr__SetExpr():
from sympy.sets.setexpr import SetExpr
assert _test_args(SetExpr(Interval(0, 1)))
def test_sympy__sets__fancysets__Rationals():
from sympy.sets.fancysets import Rationals
assert _test_args(Rationals())
def test_sympy__sets__fancysets__Naturals():
from sympy.sets.fancysets import Naturals
assert _test_args(Naturals())
def test_sympy__sets__fancysets__Naturals0():
from sympy.sets.fancysets import Naturals0
assert _test_args(Naturals0())
def test_sympy__sets__fancysets__Integers():
from sympy.sets.fancysets import Integers
assert _test_args(Integers())
def test_sympy__sets__fancysets__Reals():
from sympy.sets.fancysets import Reals
assert _test_args(Reals())
def test_sympy__sets__fancysets__Complexes():
from sympy.sets.fancysets import Complexes
assert _test_args(Complexes())
def test_sympy__sets__fancysets__ComplexRegion():
from sympy.sets.fancysets import ComplexRegion
from sympy import S
from sympy.sets import Interval
a = Interval(0, 1)
b = Interval(2, 3)
theta = Interval(0, 2*S.Pi)
assert _test_args(ComplexRegion(a*b))
assert _test_args(ComplexRegion(a*theta, polar=True))
def test_sympy__sets__fancysets__CartesianComplexRegion():
from sympy.sets.fancysets import CartesianComplexRegion
from sympy.sets import Interval
a = Interval(0, 1)
b = Interval(2, 3)
assert _test_args(CartesianComplexRegion(a*b))
def test_sympy__sets__fancysets__PolarComplexRegion():
from sympy.sets.fancysets import PolarComplexRegion
from sympy import S
from sympy.sets import Interval
a = Interval(0, 1)
theta = Interval(0, 2*S.Pi)
assert _test_args(PolarComplexRegion(a*theta))
def test_sympy__sets__fancysets__ImageSet():
from sympy.sets.fancysets import ImageSet
from sympy import S, Symbol
x = Symbol('x')
assert _test_args(ImageSet(Lambda(x, x**2), S.Naturals))
def test_sympy__sets__fancysets__Range():
from sympy.sets.fancysets import Range
assert _test_args(Range(1, 5, 1))
def test_sympy__sets__conditionset__ConditionSet():
from sympy.sets.conditionset import ConditionSet
from sympy import S, Symbol
x = Symbol('x')
assert _test_args(ConditionSet(x, Eq(x**2, 1), S.Reals))
def test_sympy__sets__contains__Contains():
from sympy.sets.fancysets import Range
from sympy.sets.contains import Contains
assert _test_args(Contains(x, Range(0, 10, 2)))
# STATS
from sympy.stats.crv_types import NormalDistribution
nd = NormalDistribution(0, 1)
from sympy.stats.frv_types import DieDistribution
die = DieDistribution(6)
def test_sympy__stats__crv__ContinuousDomain():
from sympy.stats.crv import ContinuousDomain
assert _test_args(ContinuousDomain({x}, Interval(-oo, oo)))
def test_sympy__stats__crv__SingleContinuousDomain():
from sympy.stats.crv import SingleContinuousDomain
assert _test_args(SingleContinuousDomain(x, Interval(-oo, oo)))
def test_sympy__stats__crv__ProductContinuousDomain():
from sympy.stats.crv import SingleContinuousDomain, ProductContinuousDomain
D = SingleContinuousDomain(x, Interval(-oo, oo))
E = SingleContinuousDomain(y, Interval(0, oo))
assert _test_args(ProductContinuousDomain(D, E))
def test_sympy__stats__crv__ConditionalContinuousDomain():
from sympy.stats.crv import (SingleContinuousDomain,
ConditionalContinuousDomain)
D = SingleContinuousDomain(x, Interval(-oo, oo))
assert _test_args(ConditionalContinuousDomain(D, x > 0))
def test_sympy__stats__crv__ContinuousPSpace():
from sympy.stats.crv import ContinuousPSpace, SingleContinuousDomain
D = SingleContinuousDomain(x, Interval(-oo, oo))
assert _test_args(ContinuousPSpace(D, nd))
def test_sympy__stats__crv__SingleContinuousPSpace():
from sympy.stats.crv import SingleContinuousPSpace
assert _test_args(SingleContinuousPSpace(x, nd))
@SKIP("abstract class")
def test_sympy__stats__crv__SingleContinuousDistribution():
pass
def test_sympy__stats__drv__SingleDiscreteDomain():
from sympy.stats.drv import SingleDiscreteDomain
assert _test_args(SingleDiscreteDomain(x, S.Naturals))
def test_sympy__stats__drv__ProductDiscreteDomain():
from sympy.stats.drv import SingleDiscreteDomain, ProductDiscreteDomain
X = SingleDiscreteDomain(x, S.Naturals)
Y = SingleDiscreteDomain(y, S.Integers)
assert _test_args(ProductDiscreteDomain(X, Y))
def test_sympy__stats__drv__SingleDiscretePSpace():
from sympy.stats.drv import SingleDiscretePSpace
from sympy.stats.drv_types import PoissonDistribution
assert _test_args(SingleDiscretePSpace(x, PoissonDistribution(1)))
def test_sympy__stats__drv__DiscretePSpace():
from sympy.stats.drv import DiscretePSpace, SingleDiscreteDomain
density = Lambda(x, 2**(-x))
domain = SingleDiscreteDomain(x, S.Naturals)
assert _test_args(DiscretePSpace(domain, density))
def test_sympy__stats__drv__ConditionalDiscreteDomain():
from sympy.stats.drv import ConditionalDiscreteDomain, SingleDiscreteDomain
X = SingleDiscreteDomain(x, S.Naturals0)
assert _test_args(ConditionalDiscreteDomain(X, x > 2))
def test_sympy__stats__joint_rv__JointPSpace():
from sympy.stats.joint_rv import JointPSpace, JointDistribution
assert _test_args(JointPSpace('X', JointDistribution(1)))
def test_sympy__stats__joint_rv__JointRandomSymbol():
from sympy.stats.joint_rv import JointRandomSymbol
assert _test_args(JointRandomSymbol(x))
def test_sympy__stats__joint_rv__JointDistributionHandmade():
from sympy import Indexed
from sympy.stats.joint_rv import JointDistributionHandmade
x1, x2 = (Indexed('x', i) for i in (1, 2))
assert _test_args(JointDistributionHandmade(x1 + x2, S.Reals**2))
def test_sympy__stats__joint_rv__MarginalDistribution():
from sympy.stats.rv import RandomSymbol
from sympy.stats.joint_rv import MarginalDistribution
r = RandomSymbol(S('r'))
assert _test_args(MarginalDistribution(r, (r,)))
def test_sympy__stats__joint_rv__CompoundDistribution():
from sympy.stats.joint_rv import CompoundDistribution
from sympy.stats.drv_types import PoissonDistribution
r = PoissonDistribution(x)
assert _test_args(CompoundDistribution(PoissonDistribution(r)))
@SKIP("abstract class")
def test_sympy__stats__drv__SingleDiscreteDistribution():
pass
@SKIP("abstract class")
def test_sympy__stats__drv__DiscreteDistribution():
pass
@SKIP("abstract class")
def test_sympy__stats__drv__DiscreteDomain():
pass
def test_sympy__stats__rv__RandomDomain():
from sympy.stats.rv import RandomDomain
from sympy.sets.sets import FiniteSet
assert _test_args(RandomDomain(FiniteSet(x), FiniteSet(1, 2, 3)))
def test_sympy__stats__rv__SingleDomain():
from sympy.stats.rv import SingleDomain
from sympy.sets.sets import FiniteSet
assert _test_args(SingleDomain(x, FiniteSet(1, 2, 3)))
def test_sympy__stats__rv__ConditionalDomain():
from sympy.stats.rv import ConditionalDomain, RandomDomain
from sympy.sets.sets import FiniteSet
D = RandomDomain(FiniteSet(x), FiniteSet(1, 2))
assert _test_args(ConditionalDomain(D, x > 1))
def test_sympy__stats__rv__PSpace():
from sympy.stats.rv import PSpace, RandomDomain
from sympy import FiniteSet
D = RandomDomain(FiniteSet(x), FiniteSet(1, 2, 3, 4, 5, 6))
assert _test_args(PSpace(D, die))
@SKIP("abstract Class")
def test_sympy__stats__rv__SinglePSpace():
pass
def test_sympy__stats__rv__RandomSymbol():
from sympy.stats.rv import RandomSymbol
from sympy.stats.crv import SingleContinuousPSpace
A = SingleContinuousPSpace(x, nd)
assert _test_args(RandomSymbol(x, A))
@SKIP("abstract Class")
def test_sympy__stats__rv__ProductPSpace():
pass
def test_sympy__stats__rv__IndependentProductPSpace():
from sympy.stats.rv import IndependentProductPSpace
from sympy.stats.crv import SingleContinuousPSpace
A = SingleContinuousPSpace(x, nd)
B = SingleContinuousPSpace(y, nd)
assert _test_args(IndependentProductPSpace(A, B))
def test_sympy__stats__rv__ProductDomain():
from sympy.stats.rv import ProductDomain, SingleDomain
D = SingleDomain(x, Interval(-oo, oo))
E = SingleDomain(y, Interval(0, oo))
assert _test_args(ProductDomain(D, E))
def test_sympy__stats__symbolic_probability__Probability():
from sympy.stats.symbolic_probability import Probability
from sympy.stats import Normal
X = Normal('X', 0, 1)
assert _test_args(Probability(X > 0))
def test_sympy__stats__symbolic_probability__Expectation():
from sympy.stats.symbolic_probability import Expectation
from sympy.stats import Normal
X = Normal('X', 0, 1)
assert _test_args(Expectation(X > 0))
def test_sympy__stats__symbolic_probability__Covariance():
from sympy.stats.symbolic_probability import Covariance
from sympy.stats import Normal
X = Normal('X', 0, 1)
Y = Normal('Y', 0, 3)
assert _test_args(Covariance(X, Y))
def test_sympy__stats__symbolic_probability__Variance():
from sympy.stats.symbolic_probability import Variance
from sympy.stats import Normal
X = Normal('X', 0, 1)
assert _test_args(Variance(X))
def test_sympy__stats__frv_types__DiscreteUniformDistribution():
from sympy.stats.frv_types import DiscreteUniformDistribution
from sympy.core.containers import Tuple
assert _test_args(DiscreteUniformDistribution(Tuple(*list(range(6)))))
def test_sympy__stats__frv_types__DieDistribution():
assert _test_args(die)
def test_sympy__stats__frv_types__BernoulliDistribution():
from sympy.stats.frv_types import BernoulliDistribution
assert _test_args(BernoulliDistribution(S.Half, 0, 1))
def test_sympy__stats__frv_types__BinomialDistribution():
from sympy.stats.frv_types import BinomialDistribution
assert _test_args(BinomialDistribution(5, S.Half, 1, 0))
def test_sympy__stats__frv_types__BetaBinomialDistribution():
from sympy.stats.frv_types import BetaBinomialDistribution
assert _test_args(BetaBinomialDistribution(5, 1, 1))
def test_sympy__stats__frv_types__HypergeometricDistribution():
from sympy.stats.frv_types import HypergeometricDistribution
assert _test_args(HypergeometricDistribution(10, 5, 3))
def test_sympy__stats__frv_types__RademacherDistribution():
from sympy.stats.frv_types import RademacherDistribution
assert _test_args(RademacherDistribution())
def test_sympy__stats__frv__FiniteDomain():
from sympy.stats.frv import FiniteDomain
assert _test_args(FiniteDomain({(x, 1), (x, 2)})) # x can be 1 or 2
def test_sympy__stats__frv__SingleFiniteDomain():
from sympy.stats.frv import SingleFiniteDomain
assert _test_args(SingleFiniteDomain(x, {1, 2})) # x can be 1 or 2
def test_sympy__stats__frv__ProductFiniteDomain():
from sympy.stats.frv import SingleFiniteDomain, ProductFiniteDomain
xd = SingleFiniteDomain(x, {1, 2})
yd = SingleFiniteDomain(y, {1, 2})
assert _test_args(ProductFiniteDomain(xd, yd))
def test_sympy__stats__frv__ConditionalFiniteDomain():
from sympy.stats.frv import SingleFiniteDomain, ConditionalFiniteDomain
xd = SingleFiniteDomain(x, {1, 2})
assert _test_args(ConditionalFiniteDomain(xd, x > 1))
def test_sympy__stats__frv__FinitePSpace():
from sympy.stats.frv import FinitePSpace, SingleFiniteDomain
xd = SingleFiniteDomain(x, {1, 2, 3, 4, 5, 6})
assert _test_args(FinitePSpace(xd, {(x, 1): S.Half, (x, 2): S.Half}))
xd = SingleFiniteDomain(x, {1, 2})
assert _test_args(FinitePSpace(xd, {(x, 1): S.Half, (x, 2): S.Half}))
def test_sympy__stats__frv__SingleFinitePSpace():
from sympy.stats.frv import SingleFinitePSpace
from sympy import Symbol
assert _test_args(SingleFinitePSpace(Symbol('x'), die))
def test_sympy__stats__frv__ProductFinitePSpace():
from sympy.stats.frv import SingleFinitePSpace, ProductFinitePSpace
from sympy import Symbol
xp = SingleFinitePSpace(Symbol('x'), die)
yp = SingleFinitePSpace(Symbol('y'), die)
assert _test_args(ProductFinitePSpace(xp, yp))
@SKIP("abstract class")
def test_sympy__stats__frv__SingleFiniteDistribution():
pass
@SKIP("abstract class")
def test_sympy__stats__crv__ContinuousDistribution():
pass
def test_sympy__stats__frv_types__FiniteDistributionHandmade():
from sympy.stats.frv_types import FiniteDistributionHandmade
from sympy import Dict
assert _test_args(FiniteDistributionHandmade(Dict({1: 1})))
def test_sympy__stats__crv_types__ContinuousDistributionHandmade():
from sympy.stats.crv_types import ContinuousDistributionHandmade
from sympy import Interval, Lambda
from sympy.abc import x
assert _test_args(ContinuousDistributionHandmade(Lambda(x, 2*x),
Interval(0, 1)))
def test_sympy__stats__drv_types__DiscreteDistributionHandmade():
from sympy.stats.drv_types import DiscreteDistributionHandmade
from sympy import Lambda, FiniteSet
from sympy.abc import x
assert _test_args(DiscreteDistributionHandmade(Lambda(x, Rational(1, 10)),
FiniteSet(*range(10))))
def test_sympy__stats__rv__Density():
from sympy.stats.rv import Density
from sympy.stats.crv_types import Normal
assert _test_args(Density(Normal('x', 0, 1)))
def test_sympy__stats__crv_types__ArcsinDistribution():
from sympy.stats.crv_types import ArcsinDistribution
assert _test_args(ArcsinDistribution(0, 1))
def test_sympy__stats__crv_types__BeniniDistribution():
from sympy.stats.crv_types import BeniniDistribution
assert _test_args(BeniniDistribution(1, 1, 1))
def test_sympy__stats__crv_types__BetaDistribution():
from sympy.stats.crv_types import BetaDistribution
assert _test_args(BetaDistribution(1, 1))
def test_sympy__stats__crv_types__BetaNoncentralDistribution():
from sympy.stats.crv_types import BetaNoncentralDistribution
assert _test_args(BetaNoncentralDistribution(1, 1, 1))
def test_sympy__stats__crv_types__BetaPrimeDistribution():
from sympy.stats.crv_types import BetaPrimeDistribution
assert _test_args(BetaPrimeDistribution(1, 1))
def test_sympy__stats__crv_types__BoundedParetoDistribution():
from sympy.stats.crv_types import BoundedParetoDistribution
assert _test_args(BoundedParetoDistribution(1, 1, 2))
def test_sympy__stats__crv_types__CauchyDistribution():
from sympy.stats.crv_types import CauchyDistribution
assert _test_args(CauchyDistribution(0, 1))
def test_sympy__stats__crv_types__ChiDistribution():
from sympy.stats.crv_types import ChiDistribution
assert _test_args(ChiDistribution(1))
def test_sympy__stats__crv_types__ChiNoncentralDistribution():
from sympy.stats.crv_types import ChiNoncentralDistribution
assert _test_args(ChiNoncentralDistribution(1,1))
def test_sympy__stats__crv_types__ChiSquaredDistribution():
from sympy.stats.crv_types import ChiSquaredDistribution
assert _test_args(ChiSquaredDistribution(1))
def test_sympy__stats__crv_types__DagumDistribution():
from sympy.stats.crv_types import DagumDistribution
assert _test_args(DagumDistribution(1, 1, 1))
def test_sympy__stats__crv_types__ExGaussianDistribution():
from sympy.stats.crv_types import ExGaussianDistribution
assert _test_args(ExGaussianDistribution(1, 1, 1))
def test_sympy__stats__crv_types__ExponentialDistribution():
from sympy.stats.crv_types import ExponentialDistribution
assert _test_args(ExponentialDistribution(1))
def test_sympy__stats__crv_types__ExponentialPowerDistribution():
from sympy.stats.crv_types import ExponentialPowerDistribution
assert _test_args(ExponentialPowerDistribution(0, 1, 1))
def test_sympy__stats__crv_types__FDistributionDistribution():
from sympy.stats.crv_types import FDistributionDistribution
assert _test_args(FDistributionDistribution(1, 1))
def test_sympy__stats__crv_types__FisherZDistribution():
from sympy.stats.crv_types import FisherZDistribution
assert _test_args(FisherZDistribution(1, 1))
def test_sympy__stats__crv_types__FrechetDistribution():
from sympy.stats.crv_types import FrechetDistribution
assert _test_args(FrechetDistribution(1, 1, 1))
def test_sympy__stats__crv_types__GammaInverseDistribution():
from sympy.stats.crv_types import GammaInverseDistribution
assert _test_args(GammaInverseDistribution(1, 1))
def test_sympy__stats__crv_types__GammaDistribution():
from sympy.stats.crv_types import GammaDistribution
assert _test_args(GammaDistribution(1, 1))
def test_sympy__stats__crv_types__GumbelDistribution():
from sympy.stats.crv_types import GumbelDistribution
assert _test_args(GumbelDistribution(1, 1, False))
def test_sympy__stats__crv_types__GompertzDistribution():
from sympy.stats.crv_types import GompertzDistribution
assert _test_args(GompertzDistribution(1, 1))
def test_sympy__stats__crv_types__KumaraswamyDistribution():
from sympy.stats.crv_types import KumaraswamyDistribution
assert _test_args(KumaraswamyDistribution(1, 1))
def test_sympy__stats__crv_types__LaplaceDistribution():
from sympy.stats.crv_types import LaplaceDistribution
assert _test_args(LaplaceDistribution(0, 1))
def test_sympy__stats__crv_types__LevyDistribution():
from sympy.stats.crv_types import LevyDistribution
assert _test_args(LevyDistribution(0, 1))
def test_sympy__stats__crv_types__LogisticDistribution():
from sympy.stats.crv_types import LogisticDistribution
assert _test_args(LogisticDistribution(0, 1))
def test_sympy__stats__crv_types__LogLogisticDistribution():
from sympy.stats.crv_types import LogLogisticDistribution
assert _test_args(LogLogisticDistribution(1, 1))
def test_sympy__stats__crv_types__LogNormalDistribution():
from sympy.stats.crv_types import LogNormalDistribution
assert _test_args(LogNormalDistribution(0, 1))
def test_sympy__stats__crv_types__LomaxDistribution():
from sympy.stats.crv_types import LomaxDistribution
assert _test_args(LomaxDistribution(1, 2))
def test_sympy__stats__crv_types__MaxwellDistribution():
from sympy.stats.crv_types import MaxwellDistribution
assert _test_args(MaxwellDistribution(1))
def test_sympy__stats__crv_types__MoyalDistribution():
from sympy.stats.crv_types import MoyalDistribution
assert _test_args(MoyalDistribution(1,2))
def test_sympy__stats__crv_types__NakagamiDistribution():
from sympy.stats.crv_types import NakagamiDistribution
assert _test_args(NakagamiDistribution(1, 1))
def test_sympy__stats__crv_types__NormalDistribution():
from sympy.stats.crv_types import NormalDistribution
assert _test_args(NormalDistribution(0, 1))
def test_sympy__stats__crv_types__GaussianInverseDistribution():
from sympy.stats.crv_types import GaussianInverseDistribution
assert _test_args(GaussianInverseDistribution(1, 1))
def test_sympy__stats__crv_types__ParetoDistribution():
from sympy.stats.crv_types import ParetoDistribution
assert _test_args(ParetoDistribution(1, 1))
def test_sympy__stats__crv_types__PowerFunctionDistribution():
from sympy.stats.crv_types import PowerFunctionDistribution
assert _test_args(PowerFunctionDistribution(2,0,1))
def test_sympy__stats__crv_types__QuadraticUDistribution():
from sympy.stats.crv_types import QuadraticUDistribution
assert _test_args(QuadraticUDistribution(1, 2))
def test_sympy__stats__crv_types__RaisedCosineDistribution():
from sympy.stats.crv_types import RaisedCosineDistribution
assert _test_args(RaisedCosineDistribution(1, 1))
def test_sympy__stats__crv_types__RayleighDistribution():
from sympy.stats.crv_types import RayleighDistribution
assert _test_args(RayleighDistribution(1))
def test_sympy__stats__crv_types__ReciprocalDistribution():
from sympy.stats.crv_types import ReciprocalDistribution
assert _test_args(ReciprocalDistribution(5, 30))
def test_sympy__stats__crv_types__ShiftedGompertzDistribution():
from sympy.stats.crv_types import ShiftedGompertzDistribution
assert _test_args(ShiftedGompertzDistribution(1, 1))
def test_sympy__stats__crv_types__StudentTDistribution():
from sympy.stats.crv_types import StudentTDistribution
assert _test_args(StudentTDistribution(1))
def test_sympy__stats__crv_types__TrapezoidalDistribution():
from sympy.stats.crv_types import TrapezoidalDistribution
assert _test_args(TrapezoidalDistribution(1, 2, 3, 4))
def test_sympy__stats__crv_types__TriangularDistribution():
from sympy.stats.crv_types import TriangularDistribution
assert _test_args(TriangularDistribution(-1, 0, 1))
def test_sympy__stats__crv_types__UniformDistribution():
from sympy.stats.crv_types import UniformDistribution
assert _test_args(UniformDistribution(0, 1))
def test_sympy__stats__crv_types__UniformSumDistribution():
from sympy.stats.crv_types import UniformSumDistribution
assert _test_args(UniformSumDistribution(1))
def test_sympy__stats__crv_types__VonMisesDistribution():
from sympy.stats.crv_types import VonMisesDistribution
assert _test_args(VonMisesDistribution(1, 1))
def test_sympy__stats__crv_types__WeibullDistribution():
from sympy.stats.crv_types import WeibullDistribution
assert _test_args(WeibullDistribution(1, 1))
def test_sympy__stats__crv_types__WignerSemicircleDistribution():
from sympy.stats.crv_types import WignerSemicircleDistribution
assert _test_args(WignerSemicircleDistribution(1))
def test_sympy__stats__drv_types__GeometricDistribution():
from sympy.stats.drv_types import GeometricDistribution
assert _test_args(GeometricDistribution(.5))
def test_sympy__stats__drv_types__HermiteDistribution():
from sympy.stats.drv_types import HermiteDistribution
assert _test_args(HermiteDistribution(1, 2))
def test_sympy__stats__drv_types__LogarithmicDistribution():
from sympy.stats.drv_types import LogarithmicDistribution
assert _test_args(LogarithmicDistribution(.5))
def test_sympy__stats__drv_types__NegativeBinomialDistribution():
from sympy.stats.drv_types import NegativeBinomialDistribution
assert _test_args(NegativeBinomialDistribution(.5, .5))
def test_sympy__stats__drv_types__PoissonDistribution():
from sympy.stats.drv_types import PoissonDistribution
assert _test_args(PoissonDistribution(1))
def test_sympy__stats__drv_types__SkellamDistribution():
from sympy.stats.drv_types import SkellamDistribution
assert _test_args(SkellamDistribution(1, 1))
def test_sympy__stats__drv_types__YuleSimonDistribution():
from sympy.stats.drv_types import YuleSimonDistribution
assert _test_args(YuleSimonDistribution(.5))
def test_sympy__stats__drv_types__ZetaDistribution():
from sympy.stats.drv_types import ZetaDistribution
assert _test_args(ZetaDistribution(1.5))
def test_sympy__stats__joint_rv__JointDistribution():
from sympy.stats.joint_rv import JointDistribution
assert _test_args(JointDistribution(1, 2, 3, 4))
def test_sympy__stats__joint_rv_types__MultivariateNormalDistribution():
from sympy.stats.joint_rv_types import MultivariateNormalDistribution
assert _test_args(
MultivariateNormalDistribution([0, 1], [[1, 0],[0, 1]]))
def test_sympy__stats__joint_rv_types__MultivariateLaplaceDistribution():
from sympy.stats.joint_rv_types import MultivariateLaplaceDistribution
assert _test_args(MultivariateLaplaceDistribution([0, 1], [[1, 0],[0, 1]]))
def test_sympy__stats__joint_rv_types__MultivariateTDistribution():
from sympy.stats.joint_rv_types import MultivariateTDistribution
assert _test_args(MultivariateTDistribution([0, 1], [[1, 0],[0, 1]], 1))
def test_sympy__stats__joint_rv_types__NormalGammaDistribution():
from sympy.stats.joint_rv_types import NormalGammaDistribution
assert _test_args(NormalGammaDistribution(1, 2, 3, 4))
def test_sympy__stats__joint_rv_types__GeneralizedMultivariateLogGammaDistribution():
from sympy.stats.joint_rv_types import GeneralizedMultivariateLogGammaDistribution
v, l, mu = (4, [1, 2, 3, 4], [1, 2, 3, 4])
assert _test_args(GeneralizedMultivariateLogGammaDistribution(S.Half, v, l, mu))
def test_sympy__stats__joint_rv_types__MultivariateBetaDistribution():
from sympy.stats.joint_rv_types import MultivariateBetaDistribution
assert _test_args(MultivariateBetaDistribution([1, 2, 3]))
def test_sympy__stats__joint_rv_types__MultivariateEwensDistribution():
from sympy.stats.joint_rv_types import MultivariateEwensDistribution
assert _test_args(MultivariateEwensDistribution(5, 1))
def test_sympy__stats__joint_rv_types__MultinomialDistribution():
from sympy.stats.joint_rv_types import MultinomialDistribution
assert _test_args(MultinomialDistribution(5, [0.5, 0.1, 0.3]))
def test_sympy__stats__joint_rv_types__NegativeMultinomialDistribution():
from sympy.stats.joint_rv_types import NegativeMultinomialDistribution
assert _test_args(NegativeMultinomialDistribution(5, [0.5, 0.1, 0.3]))
def test_sympy__stats__rv__RandomIndexedSymbol():
from sympy.stats.rv import RandomIndexedSymbol, pspace
from sympy.stats.stochastic_process_types import DiscreteMarkovChain
X = DiscreteMarkovChain("X")
assert _test_args(RandomIndexedSymbol(X[0].symbol, pspace(X[0])))
def test_sympy__stats__rv__RandomMatrixSymbol():
from sympy.stats.rv import RandomMatrixSymbol
from sympy.stats.random_matrix import RandomMatrixPSpace
pspace = RandomMatrixPSpace('P')
assert _test_args(RandomMatrixSymbol('M', 3, 3, pspace))
def test_sympy__stats__stochastic_process__StochasticPSpace():
from sympy.stats.stochastic_process import StochasticPSpace
from sympy.stats.stochastic_process_types import StochasticProcess
from sympy.stats.frv_types import BernoulliDistribution
assert _test_args(StochasticPSpace("Y", StochasticProcess("Y", [1, 2, 3]), BernoulliDistribution(S.Half, 1, 0)))
def test_sympy__stats__stochastic_process_types__StochasticProcess():
from sympy.stats.stochastic_process_types import StochasticProcess
assert _test_args(StochasticProcess("Y", [1, 2, 3]))
def test_sympy__stats__stochastic_process_types__MarkovProcess():
from sympy.stats.stochastic_process_types import MarkovProcess
assert _test_args(MarkovProcess("Y", [1, 2, 3]))
def test_sympy__stats__stochastic_process_types__DiscreteTimeStochasticProcess():
from sympy.stats.stochastic_process_types import DiscreteTimeStochasticProcess
assert _test_args(DiscreteTimeStochasticProcess("Y", [1, 2, 3]))
def test_sympy__stats__stochastic_process_types__ContinuousTimeStochasticProcess():
from sympy.stats.stochastic_process_types import ContinuousTimeStochasticProcess
assert _test_args(ContinuousTimeStochasticProcess("Y", [1, 2, 3]))
def test_sympy__stats__stochastic_process_types__TransitionMatrixOf():
from sympy.stats.stochastic_process_types import TransitionMatrixOf, DiscreteMarkovChain
from sympy import MatrixSymbol
DMC = DiscreteMarkovChain("Y")
assert _test_args(TransitionMatrixOf(DMC, MatrixSymbol('T', 3, 3)))
def test_sympy__stats__stochastic_process_types__GeneratorMatrixOf():
from sympy.stats.stochastic_process_types import GeneratorMatrixOf, ContinuousMarkovChain
from sympy import MatrixSymbol
DMC = ContinuousMarkovChain("Y")
assert _test_args(GeneratorMatrixOf(DMC, MatrixSymbol('T', 3, 3)))
def test_sympy__stats__stochastic_process_types__StochasticStateSpaceOf():
from sympy.stats.stochastic_process_types import StochasticStateSpaceOf, DiscreteMarkovChain
DMC = DiscreteMarkovChain("Y")
assert _test_args(StochasticStateSpaceOf(DMC, [0, 1, 2]))
def test_sympy__stats__stochastic_process_types__DiscreteMarkovChain():
from sympy.stats.stochastic_process_types import DiscreteMarkovChain
from sympy import MatrixSymbol
assert _test_args(DiscreteMarkovChain("Y", [0, 1, 2], MatrixSymbol('T', 3, 3)))
def test_sympy__stats__stochastic_process_types__ContinuousMarkovChain():
from sympy.stats.stochastic_process_types import ContinuousMarkovChain
from sympy import MatrixSymbol
assert _test_args(ContinuousMarkovChain("Y", [0, 1, 2], MatrixSymbol('T', 3, 3)))
def test_sympy__stats__stochastic_process_types__BernoulliProcess():
from sympy.stats.stochastic_process_types import BernoulliProcess
assert _test_args(BernoulliProcess("B", 0.5, 1, 0))
def test_sympy__stats__random_matrix__RandomMatrixPSpace():
from sympy.stats.random_matrix import RandomMatrixPSpace
from sympy.stats.random_matrix_models import RandomMatrixEnsemble
assert _test_args(RandomMatrixPSpace('P', RandomMatrixEnsemble('R', 3)))
def test_sympy__stats__random_matrix_models__RandomMatrixEnsemble():
from sympy.stats.random_matrix_models import RandomMatrixEnsemble
assert _test_args(RandomMatrixEnsemble('R', 3))
def test_sympy__stats__random_matrix_models__GaussianEnsemble():
from sympy.stats.random_matrix_models import GaussianEnsemble
assert _test_args(GaussianEnsemble('G', 3))
def test_sympy__stats__random_matrix_models__GaussianUnitaryEnsemble():
from sympy.stats import GaussianUnitaryEnsemble
assert _test_args(GaussianUnitaryEnsemble('U', 3))
def test_sympy__stats__random_matrix_models__GaussianOrthogonalEnsemble():
from sympy.stats import GaussianOrthogonalEnsemble
assert _test_args(GaussianOrthogonalEnsemble('U', 3))
def test_sympy__stats__random_matrix_models__GaussianSymplecticEnsemble():
from sympy.stats import GaussianSymplecticEnsemble
assert _test_args(GaussianSymplecticEnsemble('U', 3))
def test_sympy__stats__random_matrix_models__CircularEnsemble():
from sympy.stats import CircularEnsemble
assert _test_args(CircularEnsemble('C', 3))
def test_sympy__stats__random_matrix_models__CircularUnitaryEnsemble():
from sympy.stats import CircularUnitaryEnsemble
assert _test_args(CircularUnitaryEnsemble('U', 3))
def test_sympy__stats__random_matrix_models__CircularOrthogonalEnsemble():
from sympy.stats import CircularOrthogonalEnsemble
assert _test_args(CircularOrthogonalEnsemble('O', 3))
def test_sympy__stats__random_matrix_models__CircularSymplecticEnsemble():
from sympy.stats import CircularSymplecticEnsemble
assert _test_args(CircularSymplecticEnsemble('S', 3))
def test_sympy__stats__symbolic_multivariate_probability__ExpectationMatrix():
from sympy.stats import ExpectationMatrix
from sympy.stats.rv import RandomMatrixSymbol
assert _test_args(ExpectationMatrix(RandomMatrixSymbol('R', 2, 1)))
def test_sympy__stats__symbolic_multivariate_probability__VarianceMatrix():
from sympy.stats import VarianceMatrix
from sympy.stats.rv import RandomMatrixSymbol
assert _test_args(VarianceMatrix(RandomMatrixSymbol('R', 3, 1)))
def test_sympy__stats__symbolic_multivariate_probability__CrossCovarianceMatrix():
from sympy.stats import CrossCovarianceMatrix
from sympy.stats.rv import RandomMatrixSymbol
assert _test_args(CrossCovarianceMatrix(RandomMatrixSymbol('R', 3, 1),
RandomMatrixSymbol('X', 3, 1)))
def test_sympy__core__symbol__Dummy():
from sympy.core.symbol import Dummy
assert _test_args(Dummy('t'))
def test_sympy__core__symbol__Symbol():
from sympy.core.symbol import Symbol
assert _test_args(Symbol('t'))
def test_sympy__core__symbol__Wild():
from sympy.core.symbol import Wild
assert _test_args(Wild('x', exclude=[x]))
@SKIP("abstract class")
def test_sympy__functions__combinatorial__factorials__CombinatorialFunction():
pass
def test_sympy__functions__combinatorial__factorials__FallingFactorial():
from sympy.functions.combinatorial.factorials import FallingFactorial
assert _test_args(FallingFactorial(2, x))
def test_sympy__functions__combinatorial__factorials__MultiFactorial():
from sympy.functions.combinatorial.factorials import MultiFactorial
assert _test_args(MultiFactorial(x))
def test_sympy__functions__combinatorial__factorials__RisingFactorial():
from sympy.functions.combinatorial.factorials import RisingFactorial
assert _test_args(RisingFactorial(2, x))
def test_sympy__functions__combinatorial__factorials__binomial():
from sympy.functions.combinatorial.factorials import binomial
assert _test_args(binomial(2, x))
def test_sympy__functions__combinatorial__factorials__subfactorial():
from sympy.functions.combinatorial.factorials import subfactorial
assert _test_args(subfactorial(1))
def test_sympy__functions__combinatorial__factorials__factorial():
from sympy.functions.combinatorial.factorials import factorial
assert _test_args(factorial(x))
def test_sympy__functions__combinatorial__factorials__factorial2():
from sympy.functions.combinatorial.factorials import factorial2
assert _test_args(factorial2(x))
def test_sympy__functions__combinatorial__numbers__bell():
from sympy.functions.combinatorial.numbers import bell
assert _test_args(bell(x, y))
def test_sympy__functions__combinatorial__numbers__bernoulli():
from sympy.functions.combinatorial.numbers import bernoulli
assert _test_args(bernoulli(x))
def test_sympy__functions__combinatorial__numbers__catalan():
from sympy.functions.combinatorial.numbers import catalan
assert _test_args(catalan(x))
def test_sympy__functions__combinatorial__numbers__genocchi():
from sympy.functions.combinatorial.numbers import genocchi
assert _test_args(genocchi(x))
def test_sympy__functions__combinatorial__numbers__euler():
from sympy.functions.combinatorial.numbers import euler
assert _test_args(euler(x))
def test_sympy__functions__combinatorial__numbers__carmichael():
from sympy.functions.combinatorial.numbers import carmichael
assert _test_args(carmichael(x))
def test_sympy__functions__combinatorial__numbers__fibonacci():
from sympy.functions.combinatorial.numbers import fibonacci
assert _test_args(fibonacci(x))
def test_sympy__functions__combinatorial__numbers__tribonacci():
from sympy.functions.combinatorial.numbers import tribonacci
assert _test_args(tribonacci(x))
def test_sympy__functions__combinatorial__numbers__harmonic():
from sympy.functions.combinatorial.numbers import harmonic
assert _test_args(harmonic(x, 2))
def test_sympy__functions__combinatorial__numbers__lucas():
from sympy.functions.combinatorial.numbers import lucas
assert _test_args(lucas(x))
def test_sympy__functions__combinatorial__numbers__partition():
from sympy.core.symbol import Symbol
from sympy.functions.combinatorial.numbers import partition
assert _test_args(partition(Symbol('a', integer=True)))
def test_sympy__functions__elementary__complexes__Abs():
from sympy.functions.elementary.complexes import Abs
assert _test_args(Abs(x))
def test_sympy__functions__elementary__complexes__adjoint():
from sympy.functions.elementary.complexes import adjoint
assert _test_args(adjoint(x))
def test_sympy__functions__elementary__complexes__arg():
from sympy.functions.elementary.complexes import arg
assert _test_args(arg(x))
def test_sympy__functions__elementary__complexes__conjugate():
from sympy.functions.elementary.complexes import conjugate
assert _test_args(conjugate(x))
def test_sympy__functions__elementary__complexes__im():
from sympy.functions.elementary.complexes import im
assert _test_args(im(x))
def test_sympy__functions__elementary__complexes__re():
from sympy.functions.elementary.complexes import re
assert _test_args(re(x))
def test_sympy__functions__elementary__complexes__sign():
from sympy.functions.elementary.complexes import sign
assert _test_args(sign(x))
def test_sympy__functions__elementary__complexes__polar_lift():
from sympy.functions.elementary.complexes import polar_lift
assert _test_args(polar_lift(x))
def test_sympy__functions__elementary__complexes__periodic_argument():
from sympy.functions.elementary.complexes import periodic_argument
assert _test_args(periodic_argument(x, y))
def test_sympy__functions__elementary__complexes__principal_branch():
from sympy.functions.elementary.complexes import principal_branch
assert _test_args(principal_branch(x, y))
def test_sympy__functions__elementary__complexes__transpose():
from sympy.functions.elementary.complexes import transpose
assert _test_args(transpose(x))
def test_sympy__functions__elementary__exponential__LambertW():
from sympy.functions.elementary.exponential import LambertW
assert _test_args(LambertW(2))
@SKIP("abstract class")
def test_sympy__functions__elementary__exponential__ExpBase():
pass
def test_sympy__functions__elementary__exponential__exp():
from sympy.functions.elementary.exponential import exp
assert _test_args(exp(2))
def test_sympy__functions__elementary__exponential__exp_polar():
from sympy.functions.elementary.exponential import exp_polar
assert _test_args(exp_polar(2))
def test_sympy__functions__elementary__exponential__log():
from sympy.functions.elementary.exponential import log
assert _test_args(log(2))
@SKIP("abstract class")
def test_sympy__functions__elementary__hyperbolic__HyperbolicFunction():
pass
@SKIP("abstract class")
def test_sympy__functions__elementary__hyperbolic__ReciprocalHyperbolicFunction():
pass
@SKIP("abstract class")
def test_sympy__functions__elementary__hyperbolic__InverseHyperbolicFunction():
pass
def test_sympy__functions__elementary__hyperbolic__acosh():
from sympy.functions.elementary.hyperbolic import acosh
assert _test_args(acosh(2))
def test_sympy__functions__elementary__hyperbolic__acoth():
from sympy.functions.elementary.hyperbolic import acoth
assert _test_args(acoth(2))
def test_sympy__functions__elementary__hyperbolic__asinh():
from sympy.functions.elementary.hyperbolic import asinh
assert _test_args(asinh(2))
def test_sympy__functions__elementary__hyperbolic__atanh():
from sympy.functions.elementary.hyperbolic import atanh
assert _test_args(atanh(2))
def test_sympy__functions__elementary__hyperbolic__asech():
from sympy.functions.elementary.hyperbolic import asech
assert _test_args(asech(2))
def test_sympy__functions__elementary__hyperbolic__acsch():
from sympy.functions.elementary.hyperbolic import acsch
assert _test_args(acsch(2))
def test_sympy__functions__elementary__hyperbolic__cosh():
from sympy.functions.elementary.hyperbolic import cosh
assert _test_args(cosh(2))
def test_sympy__functions__elementary__hyperbolic__coth():
from sympy.functions.elementary.hyperbolic import coth
assert _test_args(coth(2))
def test_sympy__functions__elementary__hyperbolic__csch():
from sympy.functions.elementary.hyperbolic import csch
assert _test_args(csch(2))
def test_sympy__functions__elementary__hyperbolic__sech():
from sympy.functions.elementary.hyperbolic import sech
assert _test_args(sech(2))
def test_sympy__functions__elementary__hyperbolic__sinh():
from sympy.functions.elementary.hyperbolic import sinh
assert _test_args(sinh(2))
def test_sympy__functions__elementary__hyperbolic__tanh():
from sympy.functions.elementary.hyperbolic import tanh
assert _test_args(tanh(2))
@SKIP("does this work at all?")
def test_sympy__functions__elementary__integers__RoundFunction():
from sympy.functions.elementary.integers import RoundFunction
assert _test_args(RoundFunction())
def test_sympy__functions__elementary__integers__ceiling():
from sympy.functions.elementary.integers import ceiling
assert _test_args(ceiling(x))
def test_sympy__functions__elementary__integers__floor():
from sympy.functions.elementary.integers import floor
assert _test_args(floor(x))
def test_sympy__functions__elementary__integers__frac():
from sympy.functions.elementary.integers import frac
assert _test_args(frac(x))
def test_sympy__functions__elementary__miscellaneous__IdentityFunction():
from sympy.functions.elementary.miscellaneous import IdentityFunction
assert _test_args(IdentityFunction())
def test_sympy__functions__elementary__miscellaneous__Max():
from sympy.functions.elementary.miscellaneous import Max
assert _test_args(Max(x, 2))
def test_sympy__functions__elementary__miscellaneous__Min():
from sympy.functions.elementary.miscellaneous import Min
assert _test_args(Min(x, 2))
@SKIP("abstract class")
def test_sympy__functions__elementary__miscellaneous__MinMaxBase():
pass
def test_sympy__functions__elementary__piecewise__ExprCondPair():
from sympy.functions.elementary.piecewise import ExprCondPair
assert _test_args(ExprCondPair(1, True))
def test_sympy__functions__elementary__piecewise__Piecewise():
from sympy.functions.elementary.piecewise import Piecewise
assert _test_args(Piecewise((1, x >= 0), (0, True)))
@SKIP("abstract class")
def test_sympy__functions__elementary__trigonometric__TrigonometricFunction():
pass
@SKIP("abstract class")
def test_sympy__functions__elementary__trigonometric__ReciprocalTrigonometricFunction():
pass
@SKIP("abstract class")
def test_sympy__functions__elementary__trigonometric__InverseTrigonometricFunction():
pass
def test_sympy__functions__elementary__trigonometric__acos():
from sympy.functions.elementary.trigonometric import acos
assert _test_args(acos(2))
def test_sympy__functions__elementary__trigonometric__acot():
from sympy.functions.elementary.trigonometric import acot
assert _test_args(acot(2))
def test_sympy__functions__elementary__trigonometric__asin():
from sympy.functions.elementary.trigonometric import asin
assert _test_args(asin(2))
def test_sympy__functions__elementary__trigonometric__asec():
from sympy.functions.elementary.trigonometric import asec
assert _test_args(asec(2))
def test_sympy__functions__elementary__trigonometric__acsc():
from sympy.functions.elementary.trigonometric import acsc
assert _test_args(acsc(2))
def test_sympy__functions__elementary__trigonometric__atan():
from sympy.functions.elementary.trigonometric import atan
assert _test_args(atan(2))
def test_sympy__functions__elementary__trigonometric__atan2():
from sympy.functions.elementary.trigonometric import atan2
assert _test_args(atan2(2, 3))
def test_sympy__functions__elementary__trigonometric__cos():
from sympy.functions.elementary.trigonometric import cos
assert _test_args(cos(2))
def test_sympy__functions__elementary__trigonometric__csc():
from sympy.functions.elementary.trigonometric import csc
assert _test_args(csc(2))
def test_sympy__functions__elementary__trigonometric__cot():
from sympy.functions.elementary.trigonometric import cot
assert _test_args(cot(2))
def test_sympy__functions__elementary__trigonometric__sin():
assert _test_args(sin(2))
def test_sympy__functions__elementary__trigonometric__sinc():
from sympy.functions.elementary.trigonometric import sinc
assert _test_args(sinc(2))
def test_sympy__functions__elementary__trigonometric__sec():
from sympy.functions.elementary.trigonometric import sec
assert _test_args(sec(2))
def test_sympy__functions__elementary__trigonometric__tan():
from sympy.functions.elementary.trigonometric import tan
assert _test_args(tan(2))
@SKIP("abstract class")
def test_sympy__functions__special__bessel__BesselBase():
pass
@SKIP("abstract class")
def test_sympy__functions__special__bessel__SphericalBesselBase():
pass
@SKIP("abstract class")
def test_sympy__functions__special__bessel__SphericalHankelBase():
pass
def test_sympy__functions__special__bessel__besseli():
from sympy.functions.special.bessel import besseli
assert _test_args(besseli(x, 1))
def test_sympy__functions__special__bessel__besselj():
from sympy.functions.special.bessel import besselj
assert _test_args(besselj(x, 1))
def test_sympy__functions__special__bessel__besselk():
from sympy.functions.special.bessel import besselk
assert _test_args(besselk(x, 1))
def test_sympy__functions__special__bessel__bessely():
from sympy.functions.special.bessel import bessely
assert _test_args(bessely(x, 1))
def test_sympy__functions__special__bessel__hankel1():
from sympy.functions.special.bessel import hankel1
assert _test_args(hankel1(x, 1))
def test_sympy__functions__special__bessel__hankel2():
from sympy.functions.special.bessel import hankel2
assert _test_args(hankel2(x, 1))
def test_sympy__functions__special__bessel__jn():
from sympy.functions.special.bessel import jn
assert _test_args(jn(0, x))
def test_sympy__functions__special__bessel__yn():
from sympy.functions.special.bessel import yn
assert _test_args(yn(0, x))
def test_sympy__functions__special__bessel__hn1():
from sympy.functions.special.bessel import hn1
assert _test_args(hn1(0, x))
def test_sympy__functions__special__bessel__hn2():
from sympy.functions.special.bessel import hn2
assert _test_args(hn2(0, x))
def test_sympy__functions__special__bessel__AiryBase():
pass
def test_sympy__functions__special__bessel__airyai():
from sympy.functions.special.bessel import airyai
assert _test_args(airyai(2))
def test_sympy__functions__special__bessel__airybi():
from sympy.functions.special.bessel import airybi
assert _test_args(airybi(2))
def test_sympy__functions__special__bessel__airyaiprime():
from sympy.functions.special.bessel import airyaiprime
assert _test_args(airyaiprime(2))
def test_sympy__functions__special__bessel__airybiprime():
from sympy.functions.special.bessel import airybiprime
assert _test_args(airybiprime(2))
def test_sympy__functions__special__bessel__marcumq():
from sympy.functions.special.bessel import marcumq
assert _test_args(marcumq(x, y, z))
def test_sympy__functions__special__elliptic_integrals__elliptic_k():
from sympy.functions.special.elliptic_integrals import elliptic_k as K
assert _test_args(K(x))
def test_sympy__functions__special__elliptic_integrals__elliptic_f():
from sympy.functions.special.elliptic_integrals import elliptic_f as F
assert _test_args(F(x, y))
def test_sympy__functions__special__elliptic_integrals__elliptic_e():
from sympy.functions.special.elliptic_integrals import elliptic_e as E
assert _test_args(E(x))
assert _test_args(E(x, y))
def test_sympy__functions__special__elliptic_integrals__elliptic_pi():
from sympy.functions.special.elliptic_integrals import elliptic_pi as P
assert _test_args(P(x, y))
assert _test_args(P(x, y, z))
def test_sympy__functions__special__delta_functions__DiracDelta():
from sympy.functions.special.delta_functions import DiracDelta
assert _test_args(DiracDelta(x, 1))
def test_sympy__functions__special__singularity_functions__SingularityFunction():
from sympy.functions.special.singularity_functions import SingularityFunction
assert _test_args(SingularityFunction(x, y, z))
def test_sympy__functions__special__delta_functions__Heaviside():
from sympy.functions.special.delta_functions import Heaviside
assert _test_args(Heaviside(x))
def test_sympy__functions__special__error_functions__erf():
from sympy.functions.special.error_functions import erf
assert _test_args(erf(2))
def test_sympy__functions__special__error_functions__erfc():
from sympy.functions.special.error_functions import erfc
assert _test_args(erfc(2))
def test_sympy__functions__special__error_functions__erfi():
from sympy.functions.special.error_functions import erfi
assert _test_args(erfi(2))
def test_sympy__functions__special__error_functions__erf2():
from sympy.functions.special.error_functions import erf2
assert _test_args(erf2(2, 3))
def test_sympy__functions__special__error_functions__erfinv():
from sympy.functions.special.error_functions import erfinv
assert _test_args(erfinv(2))
def test_sympy__functions__special__error_functions__erfcinv():
from sympy.functions.special.error_functions import erfcinv
assert _test_args(erfcinv(2))
def test_sympy__functions__special__error_functions__erf2inv():
from sympy.functions.special.error_functions import erf2inv
assert _test_args(erf2inv(2, 3))
@SKIP("abstract class")
def test_sympy__functions__special__error_functions__FresnelIntegral():
pass
def test_sympy__functions__special__error_functions__fresnels():
from sympy.functions.special.error_functions import fresnels
assert _test_args(fresnels(2))
def test_sympy__functions__special__error_functions__fresnelc():
from sympy.functions.special.error_functions import fresnelc
assert _test_args(fresnelc(2))
def test_sympy__functions__special__error_functions__erfs():
from sympy.functions.special.error_functions import _erfs
assert _test_args(_erfs(2))
def test_sympy__functions__special__error_functions__Ei():
from sympy.functions.special.error_functions import Ei
assert _test_args(Ei(2))
def test_sympy__functions__special__error_functions__li():
from sympy.functions.special.error_functions import li
assert _test_args(li(2))
def test_sympy__functions__special__error_functions__Li():
from sympy.functions.special.error_functions import Li
assert _test_args(Li(2))
@SKIP("abstract class")
def test_sympy__functions__special__error_functions__TrigonometricIntegral():
pass
def test_sympy__functions__special__error_functions__Si():
from sympy.functions.special.error_functions import Si
assert _test_args(Si(2))
def test_sympy__functions__special__error_functions__Ci():
from sympy.functions.special.error_functions import Ci
assert _test_args(Ci(2))
def test_sympy__functions__special__error_functions__Shi():
from sympy.functions.special.error_functions import Shi
assert _test_args(Shi(2))
def test_sympy__functions__special__error_functions__Chi():
from sympy.functions.special.error_functions import Chi
assert _test_args(Chi(2))
def test_sympy__functions__special__error_functions__expint():
from sympy.functions.special.error_functions import expint
assert _test_args(expint(y, x))
def test_sympy__functions__special__gamma_functions__gamma():
from sympy.functions.special.gamma_functions import gamma
assert _test_args(gamma(x))
def test_sympy__functions__special__gamma_functions__loggamma():
from sympy.functions.special.gamma_functions import loggamma
assert _test_args(loggamma(2))
def test_sympy__functions__special__gamma_functions__lowergamma():
from sympy.functions.special.gamma_functions import lowergamma
assert _test_args(lowergamma(x, 2))
def test_sympy__functions__special__gamma_functions__polygamma():
from sympy.functions.special.gamma_functions import polygamma
assert _test_args(polygamma(x, 2))
def test_sympy__functions__special__gamma_functions__digamma():
from sympy.functions.special.gamma_functions import digamma
assert _test_args(digamma(x))
def test_sympy__functions__special__gamma_functions__trigamma():
from sympy.functions.special.gamma_functions import trigamma
assert _test_args(trigamma(x))
def test_sympy__functions__special__gamma_functions__uppergamma():
from sympy.functions.special.gamma_functions import uppergamma
assert _test_args(uppergamma(x, 2))
def test_sympy__functions__special__gamma_functions__multigamma():
from sympy.functions.special.gamma_functions import multigamma
assert _test_args(multigamma(x, 1))
def test_sympy__functions__special__beta_functions__beta():
from sympy.functions.special.beta_functions import beta
assert _test_args(beta(x, x))
def test_sympy__functions__special__mathieu_functions__MathieuBase():
pass
def test_sympy__functions__special__mathieu_functions__mathieus():
from sympy.functions.special.mathieu_functions import mathieus
assert _test_args(mathieus(1, 1, 1))
def test_sympy__functions__special__mathieu_functions__mathieuc():
from sympy.functions.special.mathieu_functions import mathieuc
assert _test_args(mathieuc(1, 1, 1))
def test_sympy__functions__special__mathieu_functions__mathieusprime():
from sympy.functions.special.mathieu_functions import mathieusprime
assert _test_args(mathieusprime(1, 1, 1))
def test_sympy__functions__special__mathieu_functions__mathieucprime():
from sympy.functions.special.mathieu_functions import mathieucprime
assert _test_args(mathieucprime(1, 1, 1))
@SKIP("abstract class")
def test_sympy__functions__special__hyper__TupleParametersBase():
pass
@SKIP("abstract class")
def test_sympy__functions__special__hyper__TupleArg():
pass
def test_sympy__functions__special__hyper__hyper():
from sympy.functions.special.hyper import hyper
assert _test_args(hyper([1, 2, 3], [4, 5], x))
def test_sympy__functions__special__hyper__meijerg():
from sympy.functions.special.hyper import meijerg
assert _test_args(meijerg([1, 2, 3], [4, 5], [6], [], x))
@SKIP("abstract class")
def test_sympy__functions__special__hyper__HyperRep():
pass
def test_sympy__functions__special__hyper__HyperRep_power1():
from sympy.functions.special.hyper import HyperRep_power1
assert _test_args(HyperRep_power1(x, y))
def test_sympy__functions__special__hyper__HyperRep_power2():
from sympy.functions.special.hyper import HyperRep_power2
assert _test_args(HyperRep_power2(x, y))
def test_sympy__functions__special__hyper__HyperRep_log1():
from sympy.functions.special.hyper import HyperRep_log1
assert _test_args(HyperRep_log1(x))
def test_sympy__functions__special__hyper__HyperRep_atanh():
from sympy.functions.special.hyper import HyperRep_atanh
assert _test_args(HyperRep_atanh(x))
def test_sympy__functions__special__hyper__HyperRep_asin1():
from sympy.functions.special.hyper import HyperRep_asin1
assert _test_args(HyperRep_asin1(x))
def test_sympy__functions__special__hyper__HyperRep_asin2():
from sympy.functions.special.hyper import HyperRep_asin2
assert _test_args(HyperRep_asin2(x))
def test_sympy__functions__special__hyper__HyperRep_sqrts1():
from sympy.functions.special.hyper import HyperRep_sqrts1
assert _test_args(HyperRep_sqrts1(x, y))
def test_sympy__functions__special__hyper__HyperRep_sqrts2():
from sympy.functions.special.hyper import HyperRep_sqrts2
assert _test_args(HyperRep_sqrts2(x, y))
def test_sympy__functions__special__hyper__HyperRep_log2():
from sympy.functions.special.hyper import HyperRep_log2
assert _test_args(HyperRep_log2(x))
def test_sympy__functions__special__hyper__HyperRep_cosasin():
from sympy.functions.special.hyper import HyperRep_cosasin
assert _test_args(HyperRep_cosasin(x, y))
def test_sympy__functions__special__hyper__HyperRep_sinasin():
from sympy.functions.special.hyper import HyperRep_sinasin
assert _test_args(HyperRep_sinasin(x, y))
def test_sympy__functions__special__hyper__appellf1():
from sympy.functions.special.hyper import appellf1
a, b1, b2, c, x, y = symbols('a b1 b2 c x y')
assert _test_args(appellf1(a, b1, b2, c, x, y))
@SKIP("abstract class")
def test_sympy__functions__special__polynomials__OrthogonalPolynomial():
pass
def test_sympy__functions__special__polynomials__jacobi():
from sympy.functions.special.polynomials import jacobi
assert _test_args(jacobi(x, 2, 2, 2))
def test_sympy__functions__special__polynomials__gegenbauer():
from sympy.functions.special.polynomials import gegenbauer
assert _test_args(gegenbauer(x, 2, 2))
def test_sympy__functions__special__polynomials__chebyshevt():
from sympy.functions.special.polynomials import chebyshevt
assert _test_args(chebyshevt(x, 2))
def test_sympy__functions__special__polynomials__chebyshevt_root():
from sympy.functions.special.polynomials import chebyshevt_root
assert _test_args(chebyshevt_root(3, 2))
def test_sympy__functions__special__polynomials__chebyshevu():
from sympy.functions.special.polynomials import chebyshevu
assert _test_args(chebyshevu(x, 2))
def test_sympy__functions__special__polynomials__chebyshevu_root():
from sympy.functions.special.polynomials import chebyshevu_root
assert _test_args(chebyshevu_root(3, 2))
def test_sympy__functions__special__polynomials__hermite():
from sympy.functions.special.polynomials import hermite
assert _test_args(hermite(x, 2))
def test_sympy__functions__special__polynomials__legendre():
from sympy.functions.special.polynomials import legendre
assert _test_args(legendre(x, 2))
def test_sympy__functions__special__polynomials__assoc_legendre():
from sympy.functions.special.polynomials import assoc_legendre
assert _test_args(assoc_legendre(x, 0, y))
def test_sympy__functions__special__polynomials__laguerre():
from sympy.functions.special.polynomials import laguerre
assert _test_args(laguerre(x, 2))
def test_sympy__functions__special__polynomials__assoc_laguerre():
from sympy.functions.special.polynomials import assoc_laguerre
assert _test_args(assoc_laguerre(x, 0, y))
def test_sympy__functions__special__spherical_harmonics__Ynm():
from sympy.functions.special.spherical_harmonics import Ynm
assert _test_args(Ynm(1, 1, x, y))
def test_sympy__functions__special__spherical_harmonics__Znm():
from sympy.functions.special.spherical_harmonics import Znm
assert _test_args(Znm(1, 1, x, y))
def test_sympy__functions__special__tensor_functions__LeviCivita():
from sympy.functions.special.tensor_functions import LeviCivita
assert _test_args(LeviCivita(x, y, 2))
def test_sympy__functions__special__tensor_functions__KroneckerDelta():
from sympy.functions.special.tensor_functions import KroneckerDelta
assert _test_args(KroneckerDelta(x, y))
def test_sympy__functions__special__zeta_functions__dirichlet_eta():
from sympy.functions.special.zeta_functions import dirichlet_eta
assert _test_args(dirichlet_eta(x))
def test_sympy__functions__special__zeta_functions__zeta():
from sympy.functions.special.zeta_functions import zeta
assert _test_args(zeta(101))
def test_sympy__functions__special__zeta_functions__lerchphi():
from sympy.functions.special.zeta_functions import lerchphi
assert _test_args(lerchphi(x, y, z))
def test_sympy__functions__special__zeta_functions__polylog():
from sympy.functions.special.zeta_functions import polylog
assert _test_args(polylog(x, y))
def test_sympy__functions__special__zeta_functions__stieltjes():
from sympy.functions.special.zeta_functions import stieltjes
assert _test_args(stieltjes(x, y))
def test_sympy__integrals__integrals__Integral():
from sympy.integrals.integrals import Integral
assert _test_args(Integral(2, (x, 0, 1)))
def test_sympy__integrals__risch__NonElementaryIntegral():
from sympy.integrals.risch import NonElementaryIntegral
assert _test_args(NonElementaryIntegral(exp(-x**2), x))
@SKIP("abstract class")
def test_sympy__integrals__transforms__IntegralTransform():
pass
def test_sympy__integrals__transforms__MellinTransform():
from sympy.integrals.transforms import MellinTransform
assert _test_args(MellinTransform(2, x, y))
def test_sympy__integrals__transforms__InverseMellinTransform():
from sympy.integrals.transforms import InverseMellinTransform
assert _test_args(InverseMellinTransform(2, x, y, 0, 1))
def test_sympy__integrals__transforms__LaplaceTransform():
from sympy.integrals.transforms import LaplaceTransform
assert _test_args(LaplaceTransform(2, x, y))
def test_sympy__integrals__transforms__InverseLaplaceTransform():
from sympy.integrals.transforms import InverseLaplaceTransform
assert _test_args(InverseLaplaceTransform(2, x, y, 0))
@SKIP("abstract class")
def test_sympy__integrals__transforms__FourierTypeTransform():
pass
def test_sympy__integrals__transforms__InverseFourierTransform():
from sympy.integrals.transforms import InverseFourierTransform
assert _test_args(InverseFourierTransform(2, x, y))
def test_sympy__integrals__transforms__FourierTransform():
from sympy.integrals.transforms import FourierTransform
assert _test_args(FourierTransform(2, x, y))
@SKIP("abstract class")
def test_sympy__integrals__transforms__SineCosineTypeTransform():
pass
def test_sympy__integrals__transforms__InverseSineTransform():
from sympy.integrals.transforms import InverseSineTransform
assert _test_args(InverseSineTransform(2, x, y))
def test_sympy__integrals__transforms__SineTransform():
from sympy.integrals.transforms import SineTransform
assert _test_args(SineTransform(2, x, y))
def test_sympy__integrals__transforms__InverseCosineTransform():
from sympy.integrals.transforms import InverseCosineTransform
assert _test_args(InverseCosineTransform(2, x, y))
def test_sympy__integrals__transforms__CosineTransform():
from sympy.integrals.transforms import CosineTransform
assert _test_args(CosineTransform(2, x, y))
@SKIP("abstract class")
def test_sympy__integrals__transforms__HankelTypeTransform():
pass
def test_sympy__integrals__transforms__InverseHankelTransform():
from sympy.integrals.transforms import InverseHankelTransform
assert _test_args(InverseHankelTransform(2, x, y, 0))
def test_sympy__integrals__transforms__HankelTransform():
from sympy.integrals.transforms import HankelTransform
assert _test_args(HankelTransform(2, x, y, 0))
@XFAIL
def test_sympy__liealgebras__cartan_type__CartanType_generator():
from sympy.liealgebras.cartan_type import CartanType_generator
assert _test_args(CartanType_generator("A2"))
@XFAIL
def test_sympy__liealgebras__cartan_type__Standard_Cartan():
from sympy.liealgebras.cartan_type import Standard_Cartan
assert _test_args(Standard_Cartan("A", 2))
@XFAIL
def test_sympy__liealgebras__weyl_group__WeylGroup():
from sympy.liealgebras.weyl_group import WeylGroup
assert _test_args(WeylGroup("B4"))
@XFAIL
def test_sympy__liealgebras__root_system__RootSystem():
from sympy.liealgebras.root_system import RootSystem
assert _test_args(RootSystem("A2"))
@XFAIL
def test_sympy__liealgebras__type_a__TypeA():
from sympy.liealgebras.type_a import TypeA
assert _test_args(TypeA(2))
@XFAIL
def test_sympy__liealgebras__type_b__TypeB():
from sympy.liealgebras.type_b import TypeB
assert _test_args(TypeB(4))
@XFAIL
def test_sympy__liealgebras__type_c__TypeC():
from sympy.liealgebras.type_c import TypeC
assert _test_args(TypeC(4))
@XFAIL
def test_sympy__liealgebras__type_d__TypeD():
from sympy.liealgebras.type_d import TypeD
assert _test_args(TypeD(4))
@XFAIL
def test_sympy__liealgebras__type_e__TypeE():
from sympy.liealgebras.type_e import TypeE
assert _test_args(TypeE(6))
@XFAIL
def test_sympy__liealgebras__type_f__TypeF():
from sympy.liealgebras.type_f import TypeF
assert _test_args(TypeF(4))
@XFAIL
def test_sympy__liealgebras__type_g__TypeG():
from sympy.liealgebras.type_g import TypeG
assert _test_args(TypeG(2))
def test_sympy__logic__boolalg__And():
from sympy.logic.boolalg import And
assert _test_args(And(x, y, 1))
@SKIP("abstract class")
def test_sympy__logic__boolalg__Boolean():
pass
def test_sympy__logic__boolalg__BooleanFunction():
from sympy.logic.boolalg import BooleanFunction
assert _test_args(BooleanFunction(1, 2, 3))
@SKIP("abstract class")
def test_sympy__logic__boolalg__BooleanAtom():
pass
def test_sympy__logic__boolalg__BooleanTrue():
from sympy.logic.boolalg import true
assert _test_args(true)
def test_sympy__logic__boolalg__BooleanFalse():
from sympy.logic.boolalg import false
assert _test_args(false)
def test_sympy__logic__boolalg__Equivalent():
from sympy.logic.boolalg import Equivalent
assert _test_args(Equivalent(x, 2))
def test_sympy__logic__boolalg__ITE():
from sympy.logic.boolalg import ITE
assert _test_args(ITE(x, y, 1))
def test_sympy__logic__boolalg__Implies():
from sympy.logic.boolalg import Implies
assert _test_args(Implies(x, y))
def test_sympy__logic__boolalg__Nand():
from sympy.logic.boolalg import Nand
assert _test_args(Nand(x, y, 1))
def test_sympy__logic__boolalg__Nor():
from sympy.logic.boolalg import Nor
assert _test_args(Nor(x, y))
def test_sympy__logic__boolalg__Not():
from sympy.logic.boolalg import Not
assert _test_args(Not(x))
def test_sympy__logic__boolalg__Or():
from sympy.logic.boolalg import Or
assert _test_args(Or(x, y))
def test_sympy__logic__boolalg__Xor():
from sympy.logic.boolalg import Xor
assert _test_args(Xor(x, y, 2))
def test_sympy__logic__boolalg__Xnor():
from sympy.logic.boolalg import Xnor
assert _test_args(Xnor(x, y, 2))
def test_sympy__matrices__matrices__DeferredVector():
from sympy.matrices.matrices import DeferredVector
assert _test_args(DeferredVector("X"))
@SKIP("abstract class")
def test_sympy__matrices__expressions__matexpr__MatrixBase():
pass
def test_sympy__matrices__immutable__ImmutableDenseMatrix():
from sympy.matrices.immutable import ImmutableDenseMatrix
m = ImmutableDenseMatrix([[1, 2], [3, 4]])
assert _test_args(m)
assert _test_args(Basic(*list(m)))
m = ImmutableDenseMatrix(1, 1, [1])
assert _test_args(m)
assert _test_args(Basic(*list(m)))
m = ImmutableDenseMatrix(2, 2, lambda i, j: 1)
assert m[0, 0] is S.One
m = ImmutableDenseMatrix(2, 2, lambda i, j: 1/(1 + i) + 1/(1 + j))
assert m[1, 1] is S.One # true div. will give 1.0 if i,j not sympified
assert _test_args(m)
assert _test_args(Basic(*list(m)))
def test_sympy__matrices__immutable__ImmutableSparseMatrix():
from sympy.matrices.immutable import ImmutableSparseMatrix
m = ImmutableSparseMatrix([[1, 2], [3, 4]])
assert _test_args(m)
assert _test_args(Basic(*list(m)))
m = ImmutableSparseMatrix(1, 1, {(0, 0): 1})
assert _test_args(m)
assert _test_args(Basic(*list(m)))
m = ImmutableSparseMatrix(1, 1, [1])
assert _test_args(m)
assert _test_args(Basic(*list(m)))
m = ImmutableSparseMatrix(2, 2, lambda i, j: 1)
assert m[0, 0] is S.One
m = ImmutableSparseMatrix(2, 2, lambda i, j: 1/(1 + i) + 1/(1 + j))
assert m[1, 1] is S.One # true div. will give 1.0 if i,j not sympified
assert _test_args(m)
assert _test_args(Basic(*list(m)))
def test_sympy__matrices__expressions__slice__MatrixSlice():
from sympy.matrices.expressions.slice import MatrixSlice
from sympy.matrices.expressions import MatrixSymbol
X = MatrixSymbol('X', 4, 4)
assert _test_args(MatrixSlice(X, (0, 2), (0, 2)))
def test_sympy__matrices__expressions__applyfunc__ElementwiseApplyFunction():
from sympy.matrices.expressions.applyfunc import ElementwiseApplyFunction
from sympy.matrices.expressions import MatrixSymbol
X = MatrixSymbol("X", x, x)
func = Lambda(x, x**2)
assert _test_args(ElementwiseApplyFunction(func, X))
def test_sympy__matrices__expressions__blockmatrix__BlockDiagMatrix():
from sympy.matrices.expressions.blockmatrix import BlockDiagMatrix
from sympy.matrices.expressions import MatrixSymbol
X = MatrixSymbol('X', x, x)
Y = MatrixSymbol('Y', y, y)
assert _test_args(BlockDiagMatrix(X, Y))
def test_sympy__matrices__expressions__blockmatrix__BlockMatrix():
from sympy.matrices.expressions.blockmatrix import BlockMatrix
from sympy.matrices.expressions import MatrixSymbol, ZeroMatrix
X = MatrixSymbol('X', x, x)
Y = MatrixSymbol('Y', y, y)
Z = MatrixSymbol('Z', x, y)
O = ZeroMatrix(y, x)
assert _test_args(BlockMatrix([[X, Z], [O, Y]]))
def test_sympy__matrices__expressions__inverse__Inverse():
from sympy.matrices.expressions.inverse import Inverse
from sympy.matrices.expressions import MatrixSymbol
assert _test_args(Inverse(MatrixSymbol('A', 3, 3)))
def test_sympy__matrices__expressions__matadd__MatAdd():
from sympy.matrices.expressions.matadd import MatAdd
from sympy.matrices.expressions import MatrixSymbol
X = MatrixSymbol('X', x, y)
Y = MatrixSymbol('Y', x, y)
assert _test_args(MatAdd(X, Y))
def test_sympy__matrices__expressions__matexpr__Identity():
from sympy.matrices.expressions.matexpr import Identity
assert _test_args(Identity(3))
def test_sympy__matrices__expressions__matexpr__GenericIdentity():
from sympy.matrices.expressions.matexpr import GenericIdentity
assert _test_args(GenericIdentity())
@SKIP("abstract class")
def test_sympy__matrices__expressions__matexpr__MatrixExpr():
pass
def test_sympy__matrices__expressions__matexpr__MatrixElement():
from sympy.matrices.expressions.matexpr import MatrixSymbol, MatrixElement
from sympy import S
assert _test_args(MatrixElement(MatrixSymbol('A', 3, 5), S(2), S(3)))
def test_sympy__matrices__expressions__matexpr__MatrixSymbol():
from sympy.matrices.expressions.matexpr import MatrixSymbol
assert _test_args(MatrixSymbol('A', 3, 5))
def test_sympy__matrices__expressions__matexpr__ZeroMatrix():
from sympy.matrices.expressions.matexpr import ZeroMatrix
assert _test_args(ZeroMatrix(3, 5))
def test_sympy__matrices__expressions__matexpr__OneMatrix():
from sympy.matrices.expressions.matexpr import OneMatrix
assert _test_args(OneMatrix(3, 5))
def test_sympy__matrices__expressions__matexpr__GenericZeroMatrix():
from sympy.matrices.expressions.matexpr import GenericZeroMatrix
assert _test_args(GenericZeroMatrix())
def test_sympy__matrices__expressions__matmul__MatMul():
from sympy.matrices.expressions.matmul import MatMul
from sympy.matrices.expressions import MatrixSymbol
X = MatrixSymbol('X', x, y)
Y = MatrixSymbol('Y', y, x)
assert _test_args(MatMul(X, Y))
def test_sympy__matrices__expressions__dotproduct__DotProduct():
from sympy.matrices.expressions.dotproduct import DotProduct
from sympy.matrices.expressions import MatrixSymbol
X = MatrixSymbol('X', x, 1)
Y = MatrixSymbol('Y', x, 1)
assert _test_args(DotProduct(X, Y))
def test_sympy__matrices__expressions__diagonal__DiagonalMatrix():
from sympy.matrices.expressions.diagonal import DiagonalMatrix
from sympy.matrices.expressions import MatrixSymbol
x = MatrixSymbol('x', 10, 1)
assert _test_args(DiagonalMatrix(x))
def test_sympy__matrices__expressions__diagonal__DiagonalOf():
from sympy.matrices.expressions.diagonal import DiagonalOf
from sympy.matrices.expressions import MatrixSymbol
X = MatrixSymbol('x', 10, 10)
assert _test_args(DiagonalOf(X))
def test_sympy__matrices__expressions__diagonal__DiagMatrix():
from sympy.matrices.expressions.diagonal import DiagMatrix
from sympy.matrices.expressions import MatrixSymbol
x = MatrixSymbol('x', 10, 1)
assert _test_args(DiagMatrix(x))
def test_sympy__matrices__expressions__hadamard__HadamardProduct():
from sympy.matrices.expressions.hadamard import HadamardProduct
from sympy.matrices.expressions import MatrixSymbol
X = MatrixSymbol('X', x, y)
Y = MatrixSymbol('Y', x, y)
assert _test_args(HadamardProduct(X, Y))
def test_sympy__matrices__expressions__hadamard__HadamardPower():
from sympy.matrices.expressions.hadamard import HadamardPower
from sympy.matrices.expressions import MatrixSymbol
from sympy import Symbol
X = MatrixSymbol('X', x, y)
n = Symbol("n")
assert _test_args(HadamardPower(X, n))
def test_sympy__matrices__expressions__kronecker__KroneckerProduct():
from sympy.matrices.expressions.kronecker import KroneckerProduct
from sympy.matrices.expressions import MatrixSymbol
X = MatrixSymbol('X', x, y)
Y = MatrixSymbol('Y', x, y)
assert _test_args(KroneckerProduct(X, Y))
def test_sympy__matrices__expressions__matpow__MatPow():
from sympy.matrices.expressions.matpow import MatPow
from sympy.matrices.expressions import MatrixSymbol
X = MatrixSymbol('X', x, x)
assert _test_args(MatPow(X, 2))
def test_sympy__matrices__expressions__transpose__Transpose():
from sympy.matrices.expressions.transpose import Transpose
from sympy.matrices.expressions import MatrixSymbol
assert _test_args(Transpose(MatrixSymbol('A', 3, 5)))
def test_sympy__matrices__expressions__adjoint__Adjoint():
from sympy.matrices.expressions.adjoint import Adjoint
from sympy.matrices.expressions import MatrixSymbol
assert _test_args(Adjoint(MatrixSymbol('A', 3, 5)))
def test_sympy__matrices__expressions__trace__Trace():
from sympy.matrices.expressions.trace import Trace
from sympy.matrices.expressions import MatrixSymbol
assert _test_args(Trace(MatrixSymbol('A', 3, 3)))
def test_sympy__matrices__expressions__determinant__Determinant():
from sympy.matrices.expressions.determinant import Determinant
from sympy.matrices.expressions import MatrixSymbol
assert _test_args(Determinant(MatrixSymbol('A', 3, 3)))
def test_sympy__matrices__expressions__funcmatrix__FunctionMatrix():
from sympy.matrices.expressions.funcmatrix import FunctionMatrix
from sympy import symbols
i, j = symbols('i,j')
assert _test_args(FunctionMatrix(3, 3, Lambda((i, j), i - j) ))
def test_sympy__matrices__expressions__fourier__DFT():
from sympy.matrices.expressions.fourier import DFT
from sympy import S
assert _test_args(DFT(S(2)))
def test_sympy__matrices__expressions__fourier__IDFT():
from sympy.matrices.expressions.fourier import IDFT
from sympy import S
assert _test_args(IDFT(S(2)))
from sympy.matrices.expressions import MatrixSymbol
X = MatrixSymbol('X', 10, 10)
def test_sympy__matrices__expressions__factorizations__LofLU():
from sympy.matrices.expressions.factorizations import LofLU
assert _test_args(LofLU(X))
def test_sympy__matrices__expressions__factorizations__UofLU():
from sympy.matrices.expressions.factorizations import UofLU
assert _test_args(UofLU(X))
def test_sympy__matrices__expressions__factorizations__QofQR():
from sympy.matrices.expressions.factorizations import QofQR
assert _test_args(QofQR(X))
def test_sympy__matrices__expressions__factorizations__RofQR():
from sympy.matrices.expressions.factorizations import RofQR
assert _test_args(RofQR(X))
def test_sympy__matrices__expressions__factorizations__LofCholesky():
from sympy.matrices.expressions.factorizations import LofCholesky
assert _test_args(LofCholesky(X))
def test_sympy__matrices__expressions__factorizations__UofCholesky():
from sympy.matrices.expressions.factorizations import UofCholesky
assert _test_args(UofCholesky(X))
def test_sympy__matrices__expressions__factorizations__EigenVectors():
from sympy.matrices.expressions.factorizations import EigenVectors
assert _test_args(EigenVectors(X))
def test_sympy__matrices__expressions__factorizations__EigenValues():
from sympy.matrices.expressions.factorizations import EigenValues
assert _test_args(EigenValues(X))
def test_sympy__matrices__expressions__factorizations__UofSVD():
from sympy.matrices.expressions.factorizations import UofSVD
assert _test_args(UofSVD(X))
def test_sympy__matrices__expressions__factorizations__VofSVD():
from sympy.matrices.expressions.factorizations import VofSVD
assert _test_args(VofSVD(X))
def test_sympy__matrices__expressions__factorizations__SofSVD():
from sympy.matrices.expressions.factorizations import SofSVD
assert _test_args(SofSVD(X))
@SKIP("abstract class")
def test_sympy__matrices__expressions__factorizations__Factorization():
pass
def test_sympy__matrices__expressions__permutation__PermutationMatrix():
from sympy.combinatorics import Permutation
from sympy.matrices.expressions.permutation import PermutationMatrix
assert _test_args(PermutationMatrix(Permutation([2, 0, 1])))
def test_sympy__matrices__expressions__permutation__MatrixPermute():
from sympy.combinatorics import Permutation
from sympy.matrices.expressions.matexpr import MatrixSymbol
from sympy.matrices.expressions.permutation import MatrixPermute
A = MatrixSymbol('A', 3, 3)
assert _test_args(MatrixPermute(A, Permutation([2, 0, 1])))
def test_sympy__matrices__expressions__companion__CompanionMatrix():
from sympy.core.symbol import Symbol
from sympy.matrices.expressions.companion import CompanionMatrix
from sympy.polys.polytools import Poly
x = Symbol('x')
p = Poly([1, 2, 3], x)
assert _test_args(CompanionMatrix(p))
def test_sympy__physics__vector__frame__CoordinateSym():
from sympy.physics.vector import CoordinateSym
from sympy.physics.vector import ReferenceFrame
assert _test_args(CoordinateSym('R_x', ReferenceFrame('R'), 0))
def test_sympy__physics__paulialgebra__Pauli():
from sympy.physics.paulialgebra import Pauli
assert _test_args(Pauli(1))
def test_sympy__physics__quantum__anticommutator__AntiCommutator():
from sympy.physics.quantum.anticommutator import AntiCommutator
assert _test_args(AntiCommutator(x, y))
def test_sympy__physics__quantum__cartesian__PositionBra3D():
from sympy.physics.quantum.cartesian import PositionBra3D
assert _test_args(PositionBra3D(x, y, z))
def test_sympy__physics__quantum__cartesian__PositionKet3D():
from sympy.physics.quantum.cartesian import PositionKet3D
assert _test_args(PositionKet3D(x, y, z))
def test_sympy__physics__quantum__cartesian__PositionState3D():
from sympy.physics.quantum.cartesian import PositionState3D
assert _test_args(PositionState3D(x, y, z))
def test_sympy__physics__quantum__cartesian__PxBra():
from sympy.physics.quantum.cartesian import PxBra
assert _test_args(PxBra(x, y, z))
def test_sympy__physics__quantum__cartesian__PxKet():
from sympy.physics.quantum.cartesian import PxKet
assert _test_args(PxKet(x, y, z))
def test_sympy__physics__quantum__cartesian__PxOp():
from sympy.physics.quantum.cartesian import PxOp
assert _test_args(PxOp(x, y, z))
def test_sympy__physics__quantum__cartesian__XBra():
from sympy.physics.quantum.cartesian import XBra
assert _test_args(XBra(x))
def test_sympy__physics__quantum__cartesian__XKet():
from sympy.physics.quantum.cartesian import XKet
assert _test_args(XKet(x))
def test_sympy__physics__quantum__cartesian__XOp():
from sympy.physics.quantum.cartesian import XOp
assert _test_args(XOp(x))
def test_sympy__physics__quantum__cartesian__YOp():
from sympy.physics.quantum.cartesian import YOp
assert _test_args(YOp(x))
def test_sympy__physics__quantum__cartesian__ZOp():
from sympy.physics.quantum.cartesian import ZOp
assert _test_args(ZOp(x))
def test_sympy__physics__quantum__cg__CG():
from sympy.physics.quantum.cg import CG
from sympy import S
assert _test_args(CG(Rational(3, 2), Rational(3, 2), S.Half, Rational(-1, 2), 1, 1))
def test_sympy__physics__quantum__cg__Wigner3j():
from sympy.physics.quantum.cg import Wigner3j
assert _test_args(Wigner3j(6, 0, 4, 0, 2, 0))
def test_sympy__physics__quantum__cg__Wigner6j():
from sympy.physics.quantum.cg import Wigner6j
assert _test_args(Wigner6j(1, 2, 3, 2, 1, 2))
def test_sympy__physics__quantum__cg__Wigner9j():
from sympy.physics.quantum.cg import Wigner9j
assert _test_args(Wigner9j(2, 1, 1, Rational(3, 2), S.Half, 1, S.Half, S.Half, 0))
def test_sympy__physics__quantum__circuitplot__Mz():
from sympy.physics.quantum.circuitplot import Mz
assert _test_args(Mz(0))
def test_sympy__physics__quantum__circuitplot__Mx():
from sympy.physics.quantum.circuitplot import Mx
assert _test_args(Mx(0))
def test_sympy__physics__quantum__commutator__Commutator():
from sympy.physics.quantum.commutator import Commutator
A, B = symbols('A,B', commutative=False)
assert _test_args(Commutator(A, B))
def test_sympy__physics__quantum__constants__HBar():
from sympy.physics.quantum.constants import HBar
assert _test_args(HBar())
def test_sympy__physics__quantum__dagger__Dagger():
from sympy.physics.quantum.dagger import Dagger
from sympy.physics.quantum.state import Ket
assert _test_args(Dagger(Dagger(Ket('psi'))))
def test_sympy__physics__quantum__gate__CGate():
from sympy.physics.quantum.gate import CGate, Gate
assert _test_args(CGate((0, 1), Gate(2)))
def test_sympy__physics__quantum__gate__CGateS():
from sympy.physics.quantum.gate import CGateS, Gate
assert _test_args(CGateS((0, 1), Gate(2)))
def test_sympy__physics__quantum__gate__CNotGate():
from sympy.physics.quantum.gate import CNotGate
assert _test_args(CNotGate(0, 1))
def test_sympy__physics__quantum__gate__Gate():
from sympy.physics.quantum.gate import Gate
assert _test_args(Gate(0))
def test_sympy__physics__quantum__gate__HadamardGate():
from sympy.physics.quantum.gate import HadamardGate
assert _test_args(HadamardGate(0))
def test_sympy__physics__quantum__gate__IdentityGate():
from sympy.physics.quantum.gate import IdentityGate
assert _test_args(IdentityGate(0))
def test_sympy__physics__quantum__gate__OneQubitGate():
from sympy.physics.quantum.gate import OneQubitGate
assert _test_args(OneQubitGate(0))
def test_sympy__physics__quantum__gate__PhaseGate():
from sympy.physics.quantum.gate import PhaseGate
assert _test_args(PhaseGate(0))
def test_sympy__physics__quantum__gate__SwapGate():
from sympy.physics.quantum.gate import SwapGate
assert _test_args(SwapGate(0, 1))
def test_sympy__physics__quantum__gate__TGate():
from sympy.physics.quantum.gate import TGate
assert _test_args(TGate(0))
def test_sympy__physics__quantum__gate__TwoQubitGate():
from sympy.physics.quantum.gate import TwoQubitGate
assert _test_args(TwoQubitGate(0))
def test_sympy__physics__quantum__gate__UGate():
from sympy.physics.quantum.gate import UGate
from sympy.matrices.immutable import ImmutableDenseMatrix
from sympy import Integer, Tuple
assert _test_args(
UGate(Tuple(Integer(1)), ImmutableDenseMatrix([[1, 0], [0, 2]])))
def test_sympy__physics__quantum__gate__XGate():
from sympy.physics.quantum.gate import XGate
assert _test_args(XGate(0))
def test_sympy__physics__quantum__gate__YGate():
from sympy.physics.quantum.gate import YGate
assert _test_args(YGate(0))
def test_sympy__physics__quantum__gate__ZGate():
from sympy.physics.quantum.gate import ZGate
assert _test_args(ZGate(0))
@SKIP("TODO: sympy.physics")
def test_sympy__physics__quantum__grover__OracleGate():
from sympy.physics.quantum.grover import OracleGate
assert _test_args(OracleGate())
def test_sympy__physics__quantum__grover__WGate():
from sympy.physics.quantum.grover import WGate
assert _test_args(WGate(1))
def test_sympy__physics__quantum__hilbert__ComplexSpace():
from sympy.physics.quantum.hilbert import ComplexSpace
assert _test_args(ComplexSpace(x))
def test_sympy__physics__quantum__hilbert__DirectSumHilbertSpace():
from sympy.physics.quantum.hilbert import DirectSumHilbertSpace, ComplexSpace, FockSpace
c = ComplexSpace(2)
f = FockSpace()
assert _test_args(DirectSumHilbertSpace(c, f))
def test_sympy__physics__quantum__hilbert__FockSpace():
from sympy.physics.quantum.hilbert import FockSpace
assert _test_args(FockSpace())
def test_sympy__physics__quantum__hilbert__HilbertSpace():
from sympy.physics.quantum.hilbert import HilbertSpace
assert _test_args(HilbertSpace())
def test_sympy__physics__quantum__hilbert__L2():
from sympy.physics.quantum.hilbert import L2
from sympy import oo, Interval
assert _test_args(L2(Interval(0, oo)))
def test_sympy__physics__quantum__hilbert__TensorPowerHilbertSpace():
from sympy.physics.quantum.hilbert import TensorPowerHilbertSpace, FockSpace
f = FockSpace()
assert _test_args(TensorPowerHilbertSpace(f, 2))
def test_sympy__physics__quantum__hilbert__TensorProductHilbertSpace():
from sympy.physics.quantum.hilbert import TensorProductHilbertSpace, FockSpace, ComplexSpace
c = ComplexSpace(2)
f = FockSpace()
assert _test_args(TensorProductHilbertSpace(f, c))
def test_sympy__physics__quantum__innerproduct__InnerProduct():
from sympy.physics.quantum import Bra, Ket, InnerProduct
b = Bra('b')
k = Ket('k')
assert _test_args(InnerProduct(b, k))
def test_sympy__physics__quantum__operator__DifferentialOperator():
from sympy.physics.quantum.operator import DifferentialOperator
from sympy import Derivative, Function
f = Function('f')
assert _test_args(DifferentialOperator(1/x*Derivative(f(x), x), f(x)))
def test_sympy__physics__quantum__operator__HermitianOperator():
from sympy.physics.quantum.operator import HermitianOperator
assert _test_args(HermitianOperator('H'))
def test_sympy__physics__quantum__operator__IdentityOperator():
from sympy.physics.quantum.operator import IdentityOperator
assert _test_args(IdentityOperator(5))
def test_sympy__physics__quantum__operator__Operator():
from sympy.physics.quantum.operator import Operator
assert _test_args(Operator('A'))
def test_sympy__physics__quantum__operator__OuterProduct():
from sympy.physics.quantum.operator import OuterProduct
from sympy.physics.quantum import Ket, Bra
b = Bra('b')
k = Ket('k')
assert _test_args(OuterProduct(k, b))
def test_sympy__physics__quantum__operator__UnitaryOperator():
from sympy.physics.quantum.operator import UnitaryOperator
assert _test_args(UnitaryOperator('U'))
def test_sympy__physics__quantum__piab__PIABBra():
from sympy.physics.quantum.piab import PIABBra
assert _test_args(PIABBra('B'))
def test_sympy__physics__quantum__boson__BosonOp():
from sympy.physics.quantum.boson import BosonOp
assert _test_args(BosonOp('a'))
assert _test_args(BosonOp('a', False))
def test_sympy__physics__quantum__boson__BosonFockKet():
from sympy.physics.quantum.boson import BosonFockKet
assert _test_args(BosonFockKet(1))
def test_sympy__physics__quantum__boson__BosonFockBra():
from sympy.physics.quantum.boson import BosonFockBra
assert _test_args(BosonFockBra(1))
def test_sympy__physics__quantum__boson__BosonCoherentKet():
from sympy.physics.quantum.boson import BosonCoherentKet
assert _test_args(BosonCoherentKet(1))
def test_sympy__physics__quantum__boson__BosonCoherentBra():
from sympy.physics.quantum.boson import BosonCoherentBra
assert _test_args(BosonCoherentBra(1))
def test_sympy__physics__quantum__fermion__FermionOp():
from sympy.physics.quantum.fermion import FermionOp
assert _test_args(FermionOp('c'))
assert _test_args(FermionOp('c', False))
def test_sympy__physics__quantum__fermion__FermionFockKet():
from sympy.physics.quantum.fermion import FermionFockKet
assert _test_args(FermionFockKet(1))
def test_sympy__physics__quantum__fermion__FermionFockBra():
from sympy.physics.quantum.fermion import FermionFockBra
assert _test_args(FermionFockBra(1))
def test_sympy__physics__quantum__pauli__SigmaOpBase():
from sympy.physics.quantum.pauli import SigmaOpBase
assert _test_args(SigmaOpBase())
def test_sympy__physics__quantum__pauli__SigmaX():
from sympy.physics.quantum.pauli import SigmaX
assert _test_args(SigmaX())
def test_sympy__physics__quantum__pauli__SigmaY():
from sympy.physics.quantum.pauli import SigmaY
assert _test_args(SigmaY())
def test_sympy__physics__quantum__pauli__SigmaZ():
from sympy.physics.quantum.pauli import SigmaZ
assert _test_args(SigmaZ())
def test_sympy__physics__quantum__pauli__SigmaMinus():
from sympy.physics.quantum.pauli import SigmaMinus
assert _test_args(SigmaMinus())
def test_sympy__physics__quantum__pauli__SigmaPlus():
from sympy.physics.quantum.pauli import SigmaPlus
assert _test_args(SigmaPlus())
def test_sympy__physics__quantum__pauli__SigmaZKet():
from sympy.physics.quantum.pauli import SigmaZKet
assert _test_args(SigmaZKet(0))
def test_sympy__physics__quantum__pauli__SigmaZBra():
from sympy.physics.quantum.pauli import SigmaZBra
assert _test_args(SigmaZBra(0))
def test_sympy__physics__quantum__piab__PIABHamiltonian():
from sympy.physics.quantum.piab import PIABHamiltonian
assert _test_args(PIABHamiltonian('P'))
def test_sympy__physics__quantum__piab__PIABKet():
from sympy.physics.quantum.piab import PIABKet
assert _test_args(PIABKet('K'))
def test_sympy__physics__quantum__qexpr__QExpr():
from sympy.physics.quantum.qexpr import QExpr
assert _test_args(QExpr(0))
def test_sympy__physics__quantum__qft__Fourier():
from sympy.physics.quantum.qft import Fourier
assert _test_args(Fourier(0, 1))
def test_sympy__physics__quantum__qft__IQFT():
from sympy.physics.quantum.qft import IQFT
assert _test_args(IQFT(0, 1))
def test_sympy__physics__quantum__qft__QFT():
from sympy.physics.quantum.qft import QFT
assert _test_args(QFT(0, 1))
def test_sympy__physics__quantum__qft__RkGate():
from sympy.physics.quantum.qft import RkGate
assert _test_args(RkGate(0, 1))
def test_sympy__physics__quantum__qubit__IntQubit():
from sympy.physics.quantum.qubit import IntQubit
assert _test_args(IntQubit(0))
def test_sympy__physics__quantum__qubit__IntQubitBra():
from sympy.physics.quantum.qubit import IntQubitBra
assert _test_args(IntQubitBra(0))
def test_sympy__physics__quantum__qubit__IntQubitState():
from sympy.physics.quantum.qubit import IntQubitState, QubitState
assert _test_args(IntQubitState(QubitState(0, 1)))
def test_sympy__physics__quantum__qubit__Qubit():
from sympy.physics.quantum.qubit import Qubit
assert _test_args(Qubit(0, 0, 0))
def test_sympy__physics__quantum__qubit__QubitBra():
from sympy.physics.quantum.qubit import QubitBra
assert _test_args(QubitBra('1', 0))
def test_sympy__physics__quantum__qubit__QubitState():
from sympy.physics.quantum.qubit import QubitState
assert _test_args(QubitState(0, 1))
def test_sympy__physics__quantum__density__Density():
from sympy.physics.quantum.density import Density
from sympy.physics.quantum.state import Ket
assert _test_args(Density([Ket(0), 0.5], [Ket(1), 0.5]))
@SKIP("TODO: sympy.physics.quantum.shor: Cmod Not Implemented")
def test_sympy__physics__quantum__shor__CMod():
from sympy.physics.quantum.shor import CMod
assert _test_args(CMod())
def test_sympy__physics__quantum__spin__CoupledSpinState():
from sympy.physics.quantum.spin import CoupledSpinState
assert _test_args(CoupledSpinState(1, 0, (1, 1)))
assert _test_args(CoupledSpinState(1, 0, (1, S.Half, S.Half)))
assert _test_args(CoupledSpinState(
1, 0, (1, S.Half, S.Half), ((2, 3, S.Half), (1, 2, 1)) ))
j, m, j1, j2, j3, j12, x = symbols('j m j1:4 j12 x')
assert CoupledSpinState(
j, m, (j1, j2, j3)).subs(j2, x) == CoupledSpinState(j, m, (j1, x, j3))
assert CoupledSpinState(j, m, (j1, j2, j3), ((1, 3, j12), (1, 2, j)) ).subs(j12, x) == \
CoupledSpinState(j, m, (j1, j2, j3), ((1, 3, x), (1, 2, j)) )
def test_sympy__physics__quantum__spin__J2Op():
from sympy.physics.quantum.spin import J2Op
assert _test_args(J2Op('J'))
def test_sympy__physics__quantum__spin__JminusOp():
from sympy.physics.quantum.spin import JminusOp
assert _test_args(JminusOp('J'))
def test_sympy__physics__quantum__spin__JplusOp():
from sympy.physics.quantum.spin import JplusOp
assert _test_args(JplusOp('J'))
def test_sympy__physics__quantum__spin__JxBra():
from sympy.physics.quantum.spin import JxBra
assert _test_args(JxBra(1, 0))
def test_sympy__physics__quantum__spin__JxBraCoupled():
from sympy.physics.quantum.spin import JxBraCoupled
assert _test_args(JxBraCoupled(1, 0, (1, 1)))
def test_sympy__physics__quantum__spin__JxKet():
from sympy.physics.quantum.spin import JxKet
assert _test_args(JxKet(1, 0))
def test_sympy__physics__quantum__spin__JxKetCoupled():
from sympy.physics.quantum.spin import JxKetCoupled
assert _test_args(JxKetCoupled(1, 0, (1, 1)))
def test_sympy__physics__quantum__spin__JxOp():
from sympy.physics.quantum.spin import JxOp
assert _test_args(JxOp('J'))
def test_sympy__physics__quantum__spin__JyBra():
from sympy.physics.quantum.spin import JyBra
assert _test_args(JyBra(1, 0))
def test_sympy__physics__quantum__spin__JyBraCoupled():
from sympy.physics.quantum.spin import JyBraCoupled
assert _test_args(JyBraCoupled(1, 0, (1, 1)))
def test_sympy__physics__quantum__spin__JyKet():
from sympy.physics.quantum.spin import JyKet
assert _test_args(JyKet(1, 0))
def test_sympy__physics__quantum__spin__JyKetCoupled():
from sympy.physics.quantum.spin import JyKetCoupled
assert _test_args(JyKetCoupled(1, 0, (1, 1)))
def test_sympy__physics__quantum__spin__JyOp():
from sympy.physics.quantum.spin import JyOp
assert _test_args(JyOp('J'))
def test_sympy__physics__quantum__spin__JzBra():
from sympy.physics.quantum.spin import JzBra
assert _test_args(JzBra(1, 0))
def test_sympy__physics__quantum__spin__JzBraCoupled():
from sympy.physics.quantum.spin import JzBraCoupled
assert _test_args(JzBraCoupled(1, 0, (1, 1)))
def test_sympy__physics__quantum__spin__JzKet():
from sympy.physics.quantum.spin import JzKet
assert _test_args(JzKet(1, 0))
def test_sympy__physics__quantum__spin__JzKetCoupled():
from sympy.physics.quantum.spin import JzKetCoupled
assert _test_args(JzKetCoupled(1, 0, (1, 1)))
def test_sympy__physics__quantum__spin__JzOp():
from sympy.physics.quantum.spin import JzOp
assert _test_args(JzOp('J'))
def test_sympy__physics__quantum__spin__Rotation():
from sympy.physics.quantum.spin import Rotation
assert _test_args(Rotation(pi, 0, pi/2))
def test_sympy__physics__quantum__spin__SpinState():
from sympy.physics.quantum.spin import SpinState
assert _test_args(SpinState(1, 0))
def test_sympy__physics__quantum__spin__WignerD():
from sympy.physics.quantum.spin import WignerD
assert _test_args(WignerD(0, 1, 2, 3, 4, 5))
def test_sympy__physics__quantum__state__Bra():
from sympy.physics.quantum.state import Bra
assert _test_args(Bra(0))
def test_sympy__physics__quantum__state__BraBase():
from sympy.physics.quantum.state import BraBase
assert _test_args(BraBase(0))
def test_sympy__physics__quantum__state__Ket():
from sympy.physics.quantum.state import Ket
assert _test_args(Ket(0))
def test_sympy__physics__quantum__state__KetBase():
from sympy.physics.quantum.state import KetBase
assert _test_args(KetBase(0))
def test_sympy__physics__quantum__state__State():
from sympy.physics.quantum.state import State
assert _test_args(State(0))
def test_sympy__physics__quantum__state__StateBase():
from sympy.physics.quantum.state import StateBase
assert _test_args(StateBase(0))
def test_sympy__physics__quantum__state__OrthogonalBra():
from sympy.physics.quantum.state import OrthogonalBra
assert _test_args(OrthogonalBra(0))
def test_sympy__physics__quantum__state__OrthogonalKet():
from sympy.physics.quantum.state import OrthogonalKet
assert _test_args(OrthogonalKet(0))
def test_sympy__physics__quantum__state__OrthogonalState():
from sympy.physics.quantum.state import OrthogonalState
assert _test_args(OrthogonalState(0))
def test_sympy__physics__quantum__state__TimeDepBra():
from sympy.physics.quantum.state import TimeDepBra
assert _test_args(TimeDepBra('psi', 't'))
def test_sympy__physics__quantum__state__TimeDepKet():
from sympy.physics.quantum.state import TimeDepKet
assert _test_args(TimeDepKet('psi', 't'))
def test_sympy__physics__quantum__state__TimeDepState():
from sympy.physics.quantum.state import TimeDepState
assert _test_args(TimeDepState('psi', 't'))
def test_sympy__physics__quantum__state__Wavefunction():
from sympy.physics.quantum.state import Wavefunction
from sympy.functions import sin
from sympy import Piecewise
n = 1
L = 1
g = Piecewise((0, x < 0), (0, x > L), (sqrt(2//L)*sin(n*pi*x/L), True))
assert _test_args(Wavefunction(g, x))
def test_sympy__physics__quantum__tensorproduct__TensorProduct():
from sympy.physics.quantum.tensorproduct import TensorProduct
assert _test_args(TensorProduct(x, y))
def test_sympy__physics__quantum__identitysearch__GateIdentity():
from sympy.physics.quantum.gate import X
from sympy.physics.quantum.identitysearch import GateIdentity
assert _test_args(GateIdentity(X(0), X(0)))
def test_sympy__physics__quantum__sho1d__SHOOp():
from sympy.physics.quantum.sho1d import SHOOp
assert _test_args(SHOOp('a'))
def test_sympy__physics__quantum__sho1d__RaisingOp():
from sympy.physics.quantum.sho1d import RaisingOp
assert _test_args(RaisingOp('a'))
def test_sympy__physics__quantum__sho1d__LoweringOp():
from sympy.physics.quantum.sho1d import LoweringOp
assert _test_args(LoweringOp('a'))
def test_sympy__physics__quantum__sho1d__NumberOp():
from sympy.physics.quantum.sho1d import NumberOp
assert _test_args(NumberOp('N'))
def test_sympy__physics__quantum__sho1d__Hamiltonian():
from sympy.physics.quantum.sho1d import Hamiltonian
assert _test_args(Hamiltonian('H'))
def test_sympy__physics__quantum__sho1d__SHOState():
from sympy.physics.quantum.sho1d import SHOState
assert _test_args(SHOState(0))
def test_sympy__physics__quantum__sho1d__SHOKet():
from sympy.physics.quantum.sho1d import SHOKet
assert _test_args(SHOKet(0))
def test_sympy__physics__quantum__sho1d__SHOBra():
from sympy.physics.quantum.sho1d import SHOBra
assert _test_args(SHOBra(0))
def test_sympy__physics__secondquant__AnnihilateBoson():
from sympy.physics.secondquant import AnnihilateBoson
assert _test_args(AnnihilateBoson(0))
def test_sympy__physics__secondquant__AnnihilateFermion():
from sympy.physics.secondquant import AnnihilateFermion
assert _test_args(AnnihilateFermion(0))
@SKIP("abstract class")
def test_sympy__physics__secondquant__Annihilator():
pass
def test_sympy__physics__secondquant__AntiSymmetricTensor():
from sympy.physics.secondquant import AntiSymmetricTensor
i, j = symbols('i j', below_fermi=True)
a, b = symbols('a b', above_fermi=True)
assert _test_args(AntiSymmetricTensor('v', (a, i), (b, j)))
def test_sympy__physics__secondquant__BosonState():
from sympy.physics.secondquant import BosonState
assert _test_args(BosonState((0, 1)))
@SKIP("abstract class")
def test_sympy__physics__secondquant__BosonicOperator():
pass
def test_sympy__physics__secondquant__Commutator():
from sympy.physics.secondquant import Commutator
assert _test_args(Commutator(x, y))
def test_sympy__physics__secondquant__CreateBoson():
from sympy.physics.secondquant import CreateBoson
assert _test_args(CreateBoson(0))
def test_sympy__physics__secondquant__CreateFermion():
from sympy.physics.secondquant import CreateFermion
assert _test_args(CreateFermion(0))
@SKIP("abstract class")
def test_sympy__physics__secondquant__Creator():
pass
def test_sympy__physics__secondquant__Dagger():
from sympy.physics.secondquant import Dagger
from sympy import I
assert _test_args(Dagger(2*I))
def test_sympy__physics__secondquant__FermionState():
from sympy.physics.secondquant import FermionState
assert _test_args(FermionState((0, 1)))
def test_sympy__physics__secondquant__FermionicOperator():
from sympy.physics.secondquant import FermionicOperator
assert _test_args(FermionicOperator(0))
def test_sympy__physics__secondquant__FockState():
from sympy.physics.secondquant import FockState
assert _test_args(FockState((0, 1)))
def test_sympy__physics__secondquant__FockStateBosonBra():
from sympy.physics.secondquant import FockStateBosonBra
assert _test_args(FockStateBosonBra((0, 1)))
def test_sympy__physics__secondquant__FockStateBosonKet():
from sympy.physics.secondquant import FockStateBosonKet
assert _test_args(FockStateBosonKet((0, 1)))
def test_sympy__physics__secondquant__FockStateBra():
from sympy.physics.secondquant import FockStateBra
assert _test_args(FockStateBra((0, 1)))
def test_sympy__physics__secondquant__FockStateFermionBra():
from sympy.physics.secondquant import FockStateFermionBra
assert _test_args(FockStateFermionBra((0, 1)))
def test_sympy__physics__secondquant__FockStateFermionKet():
from sympy.physics.secondquant import FockStateFermionKet
assert _test_args(FockStateFermionKet((0, 1)))
def test_sympy__physics__secondquant__FockStateKet():
from sympy.physics.secondquant import FockStateKet
assert _test_args(FockStateKet((0, 1)))
def test_sympy__physics__secondquant__InnerProduct():
from sympy.physics.secondquant import InnerProduct
from sympy.physics.secondquant import FockStateKet, FockStateBra
assert _test_args(InnerProduct(FockStateBra((0, 1)), FockStateKet((0, 1))))
def test_sympy__physics__secondquant__NO():
from sympy.physics.secondquant import NO, F, Fd
assert _test_args(NO(Fd(x)*F(y)))
def test_sympy__physics__secondquant__PermutationOperator():
from sympy.physics.secondquant import PermutationOperator
assert _test_args(PermutationOperator(0, 1))
def test_sympy__physics__secondquant__SqOperator():
from sympy.physics.secondquant import SqOperator
assert _test_args(SqOperator(0))
def test_sympy__physics__secondquant__TensorSymbol():
from sympy.physics.secondquant import TensorSymbol
assert _test_args(TensorSymbol(x))
def test_sympy__physics__units__dimensions__Dimension():
from sympy.physics.units.dimensions import Dimension
assert _test_args(Dimension("length", "L"))
def test_sympy__physics__units__dimensions__DimensionSystem():
from sympy.physics.units.dimensions import DimensionSystem
from sympy.physics.units.definitions.dimension_definitions import length, time, velocity
assert _test_args(DimensionSystem((length, time), (velocity,)))
def test_sympy__physics__units__quantities__Quantity():
from sympy.physics.units.quantities import Quantity
assert _test_args(Quantity("dam"))
def test_sympy__physics__units__prefixes__Prefix():
from sympy.physics.units.prefixes import Prefix
assert _test_args(Prefix('kilo', 'k', 3))
def test_sympy__core__numbers__AlgebraicNumber():
from sympy.core.numbers import AlgebraicNumber
assert _test_args(AlgebraicNumber(sqrt(2), [1, 2, 3]))
def test_sympy__polys__polytools__GroebnerBasis():
from sympy.polys.polytools import GroebnerBasis
assert _test_args(GroebnerBasis([x, y, z], x, y, z))
def test_sympy__polys__polytools__Poly():
from sympy.polys.polytools import Poly
assert _test_args(Poly(2, x, y))
def test_sympy__polys__polytools__PurePoly():
from sympy.polys.polytools import PurePoly
assert _test_args(PurePoly(2, x, y))
@SKIP('abstract class')
def test_sympy__polys__rootoftools__RootOf():
pass
def test_sympy__polys__rootoftools__ComplexRootOf():
from sympy.polys.rootoftools import ComplexRootOf
assert _test_args(ComplexRootOf(x**3 + x + 1, 0))
def test_sympy__polys__rootoftools__RootSum():
from sympy.polys.rootoftools import RootSum
assert _test_args(RootSum(x**3 + x + 1, sin))
def test_sympy__series__limits__Limit():
from sympy.series.limits import Limit
assert _test_args(Limit(x, x, 0, dir='-'))
def test_sympy__series__order__Order():
from sympy.series.order import Order
assert _test_args(Order(1, x, y))
@SKIP('Abstract Class')
def test_sympy__series__sequences__SeqBase():
pass
def test_sympy__series__sequences__EmptySequence():
# Need to imort the instance from series not the class from
# series.sequence
from sympy.series import EmptySequence
assert _test_args(EmptySequence)
@SKIP('Abstract Class')
def test_sympy__series__sequences__SeqExpr():
pass
def test_sympy__series__sequences__SeqPer():
from sympy.series.sequences import SeqPer
assert _test_args(SeqPer((1, 2, 3), (0, 10)))
def test_sympy__series__sequences__SeqFormula():
from sympy.series.sequences import SeqFormula
assert _test_args(SeqFormula(x**2, (0, 10)))
def test_sympy__series__sequences__RecursiveSeq():
from sympy.series.sequences import RecursiveSeq
y = Function("y")
n = symbols("n")
assert _test_args(RecursiveSeq(y(n - 1) + y(n - 2), y(n), n, (0, 1)))
assert _test_args(RecursiveSeq(y(n - 1) + y(n - 2), y(n), n))
def test_sympy__series__sequences__SeqExprOp():
from sympy.series.sequences import SeqExprOp, sequence
s1 = sequence((1, 2, 3))
s2 = sequence(x**2)
assert _test_args(SeqExprOp(s1, s2))
def test_sympy__series__sequences__SeqAdd():
from sympy.series.sequences import SeqAdd, sequence
s1 = sequence((1, 2, 3))
s2 = sequence(x**2)
assert _test_args(SeqAdd(s1, s2))
def test_sympy__series__sequences__SeqMul():
from sympy.series.sequences import SeqMul, sequence
s1 = sequence((1, 2, 3))
s2 = sequence(x**2)
assert _test_args(SeqMul(s1, s2))
@SKIP('Abstract Class')
def test_sympy__series__series_class__SeriesBase():
pass
def test_sympy__series__fourier__FourierSeries():
from sympy.series.fourier import fourier_series
assert _test_args(fourier_series(x, (x, -pi, pi)))
def test_sympy__series__fourier__FiniteFourierSeries():
from sympy.series.fourier import fourier_series
assert _test_args(fourier_series(sin(pi*x), (x, -1, 1)))
def test_sympy__series__formal__FormalPowerSeries():
from sympy.series.formal import fps
assert _test_args(fps(log(1 + x), x))
def test_sympy__series__formal__Coeff():
from sympy.series.formal import fps
assert _test_args(fps(x**2 + x + 1, x))
@SKIP('Abstract Class')
def test_sympy__series__formal__FiniteFormalPowerSeries():
pass
def test_sympy__series__formal__FormalPowerSeriesProduct():
from sympy.series.formal import fps
f1, f2 = fps(sin(x)), fps(exp(x))
assert _test_args(f1.product(f2, x))
def test_sympy__series__formal__FormalPowerSeriesCompose():
from sympy.series.formal import fps
f1, f2 = fps(exp(x)), fps(sin(x))
assert _test_args(f1.compose(f2, x))
def test_sympy__series__formal__FormalPowerSeriesInverse():
from sympy.series.formal import fps
f1 = fps(exp(x))
assert _test_args(f1.inverse(x))
def test_sympy__simplify__hyperexpand__Hyper_Function():
from sympy.simplify.hyperexpand import Hyper_Function
assert _test_args(Hyper_Function([2], [1]))
def test_sympy__simplify__hyperexpand__G_Function():
from sympy.simplify.hyperexpand import G_Function
assert _test_args(G_Function([2], [1], [], []))
@SKIP("abstract class")
def test_sympy__tensor__array__ndim_array__ImmutableNDimArray():
pass
def test_sympy__tensor__array__dense_ndim_array__ImmutableDenseNDimArray():
from sympy.tensor.array.dense_ndim_array import ImmutableDenseNDimArray
densarr = ImmutableDenseNDimArray(range(10, 34), (2, 3, 4))
assert _test_args(densarr)
def test_sympy__tensor__array__sparse_ndim_array__ImmutableSparseNDimArray():
from sympy.tensor.array.sparse_ndim_array import ImmutableSparseNDimArray
sparr = ImmutableSparseNDimArray(range(10, 34), (2, 3, 4))
assert _test_args(sparr)
def test_sympy__tensor__array__array_comprehension__ArrayComprehension():
from sympy.tensor.array.array_comprehension import ArrayComprehension
arrcom = ArrayComprehension(x, (x, 1, 5))
assert _test_args(arrcom)
def test_sympy__tensor__array__array_comprehension__ArrayComprehensionMap():
from sympy.tensor.array.array_comprehension import ArrayComprehensionMap
arrcomma = ArrayComprehensionMap(lambda: 0, (x, 1, 5))
assert _test_args(arrcomma)
def test_sympy__tensor__array__arrayop__Flatten():
from sympy.tensor.array.arrayop import Flatten
from sympy.tensor.array.dense_ndim_array import ImmutableDenseNDimArray
fla = Flatten(ImmutableDenseNDimArray(range(24)).reshape(2, 3, 4))
assert _test_args(fla)
def test_sympy__tensor__functions__TensorProduct():
from sympy.tensor.functions import TensorProduct
A = MatrixSymbol('A', 3, 3)
B = MatrixSymbol('B', 3, 3)
tp = TensorProduct(A, B)
assert _test_args(tp)
def test_sympy__tensor__indexed__Idx():
from sympy.tensor.indexed import Idx
assert _test_args(Idx('test'))
assert _test_args(Idx(1, (0, 10)))
def test_sympy__tensor__indexed__Indexed():
from sympy.tensor.indexed import Indexed, Idx
assert _test_args(Indexed('A', Idx('i'), Idx('j')))
def test_sympy__tensor__indexed__IndexedBase():
from sympy.tensor.indexed import IndexedBase
assert _test_args(IndexedBase('A', shape=(x, y)))
assert _test_args(IndexedBase('A', 1))
assert _test_args(IndexedBase('A')[0, 1])
def test_sympy__tensor__tensor__TensorIndexType():
from sympy.tensor.tensor import TensorIndexType
assert _test_args(TensorIndexType('Lorentz'))
@SKIP("deprecated class")
def test_sympy__tensor__tensor__TensorType():
pass
def test_sympy__tensor__tensor__TensorSymmetry():
from sympy.tensor.tensor import TensorSymmetry, get_symmetric_group_sgs
assert _test_args(TensorSymmetry(get_symmetric_group_sgs(2)))
def test_sympy__tensor__tensor__TensorHead():
from sympy.tensor.tensor import TensorIndexType, TensorSymmetry, get_symmetric_group_sgs, TensorHead
Lorentz = TensorIndexType('Lorentz', dummy_name='L')
sym = TensorSymmetry(get_symmetric_group_sgs(1))
assert _test_args(TensorHead('p', [Lorentz], sym, 0))
def test_sympy__tensor__tensor__TensorIndex():
from sympy.tensor.tensor import TensorIndexType, TensorIndex
Lorentz = TensorIndexType('Lorentz', dummy_name='L')
assert _test_args(TensorIndex('i', Lorentz))
@SKIP("abstract class")
def test_sympy__tensor__tensor__TensExpr():
pass
def test_sympy__tensor__tensor__TensAdd():
from sympy.tensor.tensor import TensorIndexType, TensorSymmetry, get_symmetric_group_sgs, tensor_indices, TensAdd, tensor_heads
Lorentz = TensorIndexType('Lorentz', dummy_name='L')
a, b = tensor_indices('a,b', Lorentz)
sym = TensorSymmetry(get_symmetric_group_sgs(1))
p, q = tensor_heads('p,q', [Lorentz], sym)
t1 = p(a)
t2 = q(a)
assert _test_args(TensAdd(t1, t2))
def test_sympy__tensor__tensor__Tensor():
from sympy.tensor.tensor import TensorIndexType, TensorSymmetry, get_symmetric_group_sgs, tensor_indices, TensorHead
Lorentz = TensorIndexType('Lorentz', dummy_name='L')
a, b = tensor_indices('a,b', Lorentz)
sym = TensorSymmetry(get_symmetric_group_sgs(1))
p = TensorHead('p', [Lorentz], sym)
assert _test_args(p(a))
def test_sympy__tensor__tensor__TensMul():
from sympy.tensor.tensor import TensorIndexType, TensorSymmetry, get_symmetric_group_sgs, tensor_indices, tensor_heads
Lorentz = TensorIndexType('Lorentz', dummy_name='L')
a, b = tensor_indices('a,b', Lorentz)
sym = TensorSymmetry(get_symmetric_group_sgs(1))
p, q = tensor_heads('p, q', [Lorentz], sym)
assert _test_args(3*p(a)*q(b))
def test_sympy__tensor__tensor__TensorElement():
from sympy.tensor.tensor import TensorIndexType, TensorHead, TensorElement
L = TensorIndexType("L")
A = TensorHead("A", [L, L])
telem = TensorElement(A(x, y), {x: 1})
assert _test_args(telem)
def test_sympy__tensor__toperators__PartialDerivative():
from sympy.tensor.tensor import TensorIndexType, tensor_indices, TensorHead
from sympy.tensor.toperators import PartialDerivative
Lorentz = TensorIndexType('Lorentz', dummy_name='L')
a, b = tensor_indices('a,b', Lorentz)
A = TensorHead("A", [Lorentz])
assert _test_args(PartialDerivative(A(a), A(b)))
def test_as_coeff_add():
assert (7, (3*x, 4*x**2)) == (7 + 3*x + 4*x**2).as_coeff_add()
def test_sympy__geometry__curve__Curve():
from sympy.geometry.curve import Curve
assert _test_args(Curve((x, 1), (x, 0, 1)))
def test_sympy__geometry__point__Point():
from sympy.geometry.point import Point
assert _test_args(Point(0, 1))
def test_sympy__geometry__point__Point2D():
from sympy.geometry.point import Point2D
assert _test_args(Point2D(0, 1))
def test_sympy__geometry__point__Point3D():
from sympy.geometry.point import Point3D
assert _test_args(Point3D(0, 1, 2))
def test_sympy__geometry__ellipse__Ellipse():
from sympy.geometry.ellipse import Ellipse
assert _test_args(Ellipse((0, 1), 2, 3))
def test_sympy__geometry__ellipse__Circle():
from sympy.geometry.ellipse import Circle
assert _test_args(Circle((0, 1), 2))
def test_sympy__geometry__parabola__Parabola():
from sympy.geometry.parabola import Parabola
from sympy.geometry.line import Line
assert _test_args(Parabola((0, 0), Line((2, 3), (4, 3))))
@SKIP("abstract class")
def test_sympy__geometry__line__LinearEntity():
pass
def test_sympy__geometry__line__Line():
from sympy.geometry.line import Line
assert _test_args(Line((0, 1), (2, 3)))
def test_sympy__geometry__line__Ray():
from sympy.geometry.line import Ray
assert _test_args(Ray((0, 1), (2, 3)))
def test_sympy__geometry__line__Segment():
from sympy.geometry.line import Segment
assert _test_args(Segment((0, 1), (2, 3)))
@SKIP("abstract class")
def test_sympy__geometry__line__LinearEntity2D():
pass
def test_sympy__geometry__line__Line2D():
from sympy.geometry.line import Line2D
assert _test_args(Line2D((0, 1), (2, 3)))
def test_sympy__geometry__line__Ray2D():
from sympy.geometry.line import Ray2D
assert _test_args(Ray2D((0, 1), (2, 3)))
def test_sympy__geometry__line__Segment2D():
from sympy.geometry.line import Segment2D
assert _test_args(Segment2D((0, 1), (2, 3)))
@SKIP("abstract class")
def test_sympy__geometry__line__LinearEntity3D():
pass
def test_sympy__geometry__line__Line3D():
from sympy.geometry.line import Line3D
assert _test_args(Line3D((0, 1, 1), (2, 3, 4)))
def test_sympy__geometry__line__Segment3D():
from sympy.geometry.line import Segment3D
assert _test_args(Segment3D((0, 1, 1), (2, 3, 4)))
def test_sympy__geometry__line__Ray3D():
from sympy.geometry.line import Ray3D
assert _test_args(Ray3D((0, 1, 1), (2, 3, 4)))
def test_sympy__geometry__plane__Plane():
from sympy.geometry.plane import Plane
assert _test_args(Plane((1, 1, 1), (-3, 4, -2), (1, 2, 3)))
def test_sympy__geometry__polygon__Polygon():
from sympy.geometry.polygon import Polygon
assert _test_args(Polygon((0, 1), (2, 3), (4, 5), (6, 7)))
def test_sympy__geometry__polygon__RegularPolygon():
from sympy.geometry.polygon import RegularPolygon
assert _test_args(RegularPolygon((0, 1), 2, 3, 4))
def test_sympy__geometry__polygon__Triangle():
from sympy.geometry.polygon import Triangle
assert _test_args(Triangle((0, 1), (2, 3), (4, 5)))
def test_sympy__geometry__entity__GeometryEntity():
from sympy.geometry.entity import GeometryEntity
from sympy.geometry.point import Point
assert _test_args(GeometryEntity(Point(1, 0), 1, [1, 2]))
@SKIP("abstract class")
def test_sympy__geometry__entity__GeometrySet():
pass
def test_sympy__diffgeom__diffgeom__Manifold():
from sympy.diffgeom import Manifold
assert _test_args(Manifold('name', 3))
def test_sympy__diffgeom__diffgeom__Patch():
from sympy.diffgeom import Manifold, Patch
assert _test_args(Patch('name', Manifold('name', 3)))
def test_sympy__diffgeom__diffgeom__CoordSystem():
from sympy.diffgeom import Manifold, Patch, CoordSystem
assert _test_args(CoordSystem('name', Patch('name', Manifold('name', 3))))
@XFAIL
def test_sympy__diffgeom__diffgeom__Point():
from sympy.diffgeom import Manifold, Patch, CoordSystem, Point
assert _test_args(Point(
CoordSystem('name', Patch('name', Manifold('name', 3))), [x, y]))
def test_sympy__diffgeom__diffgeom__BaseScalarField():
from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField
cs = CoordSystem('name', Patch('name', Manifold('name', 3)))
assert _test_args(BaseScalarField(cs, 0))
def test_sympy__diffgeom__diffgeom__BaseVectorField():
from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseVectorField
cs = CoordSystem('name', Patch('name', Manifold('name', 3)))
assert _test_args(BaseVectorField(cs, 0))
def test_sympy__diffgeom__diffgeom__Differential():
from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField, Differential
cs = CoordSystem('name', Patch('name', Manifold('name', 3)))
assert _test_args(Differential(BaseScalarField(cs, 0)))
def test_sympy__diffgeom__diffgeom__Commutator():
from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseVectorField, Commutator
cs = CoordSystem('name', Patch('name', Manifold('name', 3)))
cs1 = CoordSystem('name1', Patch('name', Manifold('name', 3)))
v = BaseVectorField(cs, 0)
v1 = BaseVectorField(cs1, 0)
assert _test_args(Commutator(v, v1))
def test_sympy__diffgeom__diffgeom__TensorProduct():
from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField, Differential, TensorProduct
cs = CoordSystem('name', Patch('name', Manifold('name', 3)))
d = Differential(BaseScalarField(cs, 0))
assert _test_args(TensorProduct(d, d))
def test_sympy__diffgeom__diffgeom__WedgeProduct():
from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField, Differential, WedgeProduct
cs = CoordSystem('name', Patch('name', Manifold('name', 3)))
d = Differential(BaseScalarField(cs, 0))
d1 = Differential(BaseScalarField(cs, 1))
assert _test_args(WedgeProduct(d, d1))
def test_sympy__diffgeom__diffgeom__LieDerivative():
from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseScalarField, Differential, BaseVectorField, LieDerivative
cs = CoordSystem('name', Patch('name', Manifold('name', 3)))
d = Differential(BaseScalarField(cs, 0))
v = BaseVectorField(cs, 0)
assert _test_args(LieDerivative(v, d))
@XFAIL
def test_sympy__diffgeom__diffgeom__BaseCovarDerivativeOp():
from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseCovarDerivativeOp
cs = CoordSystem('name', Patch('name', Manifold('name', 3)))
assert _test_args(BaseCovarDerivativeOp(cs, 0, [[[0, ]*3, ]*3, ]*3))
def test_sympy__diffgeom__diffgeom__CovarDerivativeOp():
from sympy.diffgeom import Manifold, Patch, CoordSystem, BaseVectorField, CovarDerivativeOp
cs = CoordSystem('name', Patch('name', Manifold('name', 3)))
v = BaseVectorField(cs, 0)
_test_args(CovarDerivativeOp(v, [[[0, ]*3, ]*3, ]*3))
def test_sympy__categories__baseclasses__Class():
from sympy.categories.baseclasses import Class
assert _test_args(Class())
def test_sympy__categories__baseclasses__Object():
from sympy.categories import Object
assert _test_args(Object("A"))
@XFAIL
def test_sympy__categories__baseclasses__Morphism():
from sympy.categories import Object, Morphism
assert _test_args(Morphism(Object("A"), Object("B")))
def test_sympy__categories__baseclasses__IdentityMorphism():
from sympy.categories import Object, IdentityMorphism
assert _test_args(IdentityMorphism(Object("A")))
def test_sympy__categories__baseclasses__NamedMorphism():
from sympy.categories import Object, NamedMorphism
assert _test_args(NamedMorphism(Object("A"), Object("B"), "f"))
def test_sympy__categories__baseclasses__CompositeMorphism():
from sympy.categories import Object, NamedMorphism, CompositeMorphism
A = Object("A")
B = Object("B")
C = Object("C")
f = NamedMorphism(A, B, "f")
g = NamedMorphism(B, C, "g")
assert _test_args(CompositeMorphism(f, g))
def test_sympy__categories__baseclasses__Diagram():
from sympy.categories import Object, NamedMorphism, Diagram
A = Object("A")
B = Object("B")
f = NamedMorphism(A, B, "f")
d = Diagram([f])
assert _test_args(d)
def test_sympy__categories__baseclasses__Category():
from sympy.categories import Object, NamedMorphism, Diagram, Category
A = Object("A")
B = Object("B")
C = Object("C")
f = NamedMorphism(A, B, "f")
g = NamedMorphism(B, C, "g")
d1 = Diagram([f, g])
d2 = Diagram([f])
K = Category("K", commutative_diagrams=[d1, d2])
assert _test_args(K)
def test_sympy__ntheory__factor___totient():
from sympy.ntheory.factor_ import totient
k = symbols('k', integer=True)
t = totient(k)
assert _test_args(t)
def test_sympy__ntheory__factor___reduced_totient():
from sympy.ntheory.factor_ import reduced_totient
k = symbols('k', integer=True)
t = reduced_totient(k)
assert _test_args(t)
def test_sympy__ntheory__factor___divisor_sigma():
from sympy.ntheory.factor_ import divisor_sigma
k = symbols('k', integer=True)
n = symbols('n', integer=True)
t = divisor_sigma(n, k)
assert _test_args(t)
def test_sympy__ntheory__factor___udivisor_sigma():
from sympy.ntheory.factor_ import udivisor_sigma
k = symbols('k', integer=True)
n = symbols('n', integer=True)
t = udivisor_sigma(n, k)
assert _test_args(t)
def test_sympy__ntheory__factor___primenu():
from sympy.ntheory.factor_ import primenu
n = symbols('n', integer=True)
t = primenu(n)
assert _test_args(t)
def test_sympy__ntheory__factor___primeomega():
from sympy.ntheory.factor_ import primeomega
n = symbols('n', integer=True)
t = primeomega(n)
assert _test_args(t)
def test_sympy__ntheory__residue_ntheory__mobius():
from sympy.ntheory import mobius
assert _test_args(mobius(2))
def test_sympy__ntheory__generate__primepi():
from sympy.ntheory import primepi
n = symbols('n')
t = primepi(n)
assert _test_args(t)
def test_sympy__physics__optics__waves__TWave():
from sympy.physics.optics import TWave
A, f, phi = symbols('A, f, phi')
assert _test_args(TWave(A, f, phi))
def test_sympy__physics__optics__gaussopt__BeamParameter():
from sympy.physics.optics import BeamParameter
assert _test_args(BeamParameter(530e-9, 1, w=1e-3))
def test_sympy__physics__optics__medium__Medium():
from sympy.physics.optics import Medium
assert _test_args(Medium('m'))
def test_sympy__codegen__array_utils__CodegenArrayContraction():
from sympy.codegen.array_utils import CodegenArrayContraction
from sympy import IndexedBase
A = symbols("A", cls=IndexedBase)
assert _test_args(CodegenArrayContraction(A, (0, 1)))
def test_sympy__codegen__array_utils__CodegenArrayDiagonal():
from sympy.codegen.array_utils import CodegenArrayDiagonal
from sympy import IndexedBase
A = symbols("A", cls=IndexedBase)
assert _test_args(CodegenArrayDiagonal(A, (0, 1)))
def test_sympy__codegen__array_utils__CodegenArrayTensorProduct():
from sympy.codegen.array_utils import CodegenArrayTensorProduct
from sympy import IndexedBase
A, B = symbols("A B", cls=IndexedBase)
assert _test_args(CodegenArrayTensorProduct(A, B))
def test_sympy__codegen__array_utils__CodegenArrayElementwiseAdd():
from sympy.codegen.array_utils import CodegenArrayElementwiseAdd
from sympy import IndexedBase
A, B = symbols("A B", cls=IndexedBase)
assert _test_args(CodegenArrayElementwiseAdd(A, B))
def test_sympy__codegen__array_utils__CodegenArrayPermuteDims():
from sympy.codegen.array_utils import CodegenArrayPermuteDims
from sympy import IndexedBase
A = symbols("A", cls=IndexedBase)
assert _test_args(CodegenArrayPermuteDims(A, (1, 0)))
def test_sympy__codegen__ast__Assignment():
from sympy.codegen.ast import Assignment
assert _test_args(Assignment(x, y))
def test_sympy__codegen__cfunctions__expm1():
from sympy.codegen.cfunctions import expm1
assert _test_args(expm1(x))
def test_sympy__codegen__cfunctions__log1p():
from sympy.codegen.cfunctions import log1p
assert _test_args(log1p(x))
def test_sympy__codegen__cfunctions__exp2():
from sympy.codegen.cfunctions import exp2
assert _test_args(exp2(x))
def test_sympy__codegen__cfunctions__log2():
from sympy.codegen.cfunctions import log2
assert _test_args(log2(x))
def test_sympy__codegen__cfunctions__fma():
from sympy.codegen.cfunctions import fma
assert _test_args(fma(x, y, z))
def test_sympy__codegen__cfunctions__log10():
from sympy.codegen.cfunctions import log10
assert _test_args(log10(x))
def test_sympy__codegen__cfunctions__Sqrt():
from sympy.codegen.cfunctions import Sqrt
assert _test_args(Sqrt(x))
def test_sympy__codegen__cfunctions__Cbrt():
from sympy.codegen.cfunctions import Cbrt
assert _test_args(Cbrt(x))
def test_sympy__codegen__cfunctions__hypot():
from sympy.codegen.cfunctions import hypot
assert _test_args(hypot(x, y))
def test_sympy__codegen__fnodes__FFunction():
from sympy.codegen.fnodes import FFunction
assert _test_args(FFunction('f'))
def test_sympy__codegen__fnodes__F95Function():
from sympy.codegen.fnodes import F95Function
assert _test_args(F95Function('f'))
def test_sympy__codegen__fnodes__isign():
from sympy.codegen.fnodes import isign
assert _test_args(isign(1, x))
def test_sympy__codegen__fnodes__dsign():
from sympy.codegen.fnodes import dsign
assert _test_args(dsign(1, x))
def test_sympy__codegen__fnodes__cmplx():
from sympy.codegen.fnodes import cmplx
assert _test_args(cmplx(x, y))
def test_sympy__codegen__fnodes__kind():
from sympy.codegen.fnodes import kind
assert _test_args(kind(x))
def test_sympy__codegen__fnodes__merge():
from sympy.codegen.fnodes import merge
assert _test_args(merge(1, 2, Eq(x, 0)))
def test_sympy__codegen__fnodes___literal():
from sympy.codegen.fnodes import _literal
assert _test_args(_literal(1))
def test_sympy__codegen__fnodes__literal_sp():
from sympy.codegen.fnodes import literal_sp
assert _test_args(literal_sp(1))
def test_sympy__codegen__fnodes__literal_dp():
from sympy.codegen.fnodes import literal_dp
assert _test_args(literal_dp(1))
def test_sympy__codegen__matrix_nodes__MatrixSolve():
from sympy.matrices import MatrixSymbol
from sympy.codegen.matrix_nodes import MatrixSolve
A = MatrixSymbol('A', 3, 3)
v = MatrixSymbol('x', 3, 1)
assert _test_args(MatrixSolve(A, v))
def test_sympy__vector__coordsysrect__CoordSys3D():
from sympy.vector.coordsysrect import CoordSys3D
assert _test_args(CoordSys3D('C'))
def test_sympy__vector__point__Point():
from sympy.vector.point import Point
assert _test_args(Point('P'))
def test_sympy__vector__basisdependent__BasisDependent():
#from sympy.vector.basisdependent import BasisDependent
#These classes have been created to maintain an OOP hierarchy
#for Vectors and Dyadics. Are NOT meant to be initialized
pass
def test_sympy__vector__basisdependent__BasisDependentMul():
#from sympy.vector.basisdependent import BasisDependentMul
#These classes have been created to maintain an OOP hierarchy
#for Vectors and Dyadics. Are NOT meant to be initialized
pass
def test_sympy__vector__basisdependent__BasisDependentAdd():
#from sympy.vector.basisdependent import BasisDependentAdd
#These classes have been created to maintain an OOP hierarchy
#for Vectors and Dyadics. Are NOT meant to be initialized
pass
def test_sympy__vector__basisdependent__BasisDependentZero():
#from sympy.vector.basisdependent import BasisDependentZero
#These classes have been created to maintain an OOP hierarchy
#for Vectors and Dyadics. Are NOT meant to be initialized
pass
def test_sympy__vector__vector__BaseVector():
from sympy.vector.vector import BaseVector
from sympy.vector.coordsysrect import CoordSys3D
C = CoordSys3D('C')
assert _test_args(BaseVector(0, C, ' ', ' '))
def test_sympy__vector__vector__VectorAdd():
from sympy.vector.vector import VectorAdd, VectorMul
from sympy.vector.coordsysrect import CoordSys3D
C = CoordSys3D('C')
from sympy.abc import a, b, c, x, y, z
v1 = a*C.i + b*C.j + c*C.k
v2 = x*C.i + y*C.j + z*C.k
assert _test_args(VectorAdd(v1, v2))
assert _test_args(VectorMul(x, v1))
def test_sympy__vector__vector__VectorMul():
from sympy.vector.vector import VectorMul
from sympy.vector.coordsysrect import CoordSys3D
C = CoordSys3D('C')
from sympy.abc import a
assert _test_args(VectorMul(a, C.i))
def test_sympy__vector__vector__VectorZero():
from sympy.vector.vector import VectorZero
assert _test_args(VectorZero())
def test_sympy__vector__vector__Vector():
#from sympy.vector.vector import Vector
#Vector is never to be initialized using args
pass
def test_sympy__vector__vector__Cross():
from sympy.vector.vector import Cross
from sympy.vector.coordsysrect import CoordSys3D
C = CoordSys3D('C')
_test_args(Cross(C.i, C.j))
def test_sympy__vector__vector__Dot():
from sympy.vector.vector import Dot
from sympy.vector.coordsysrect import CoordSys3D
C = CoordSys3D('C')
_test_args(Dot(C.i, C.j))
def test_sympy__vector__dyadic__Dyadic():
#from sympy.vector.dyadic import Dyadic
#Dyadic is never to be initialized using args
pass
def test_sympy__vector__dyadic__BaseDyadic():
from sympy.vector.dyadic import BaseDyadic
from sympy.vector.coordsysrect import CoordSys3D
C = CoordSys3D('C')
assert _test_args(BaseDyadic(C.i, C.j))
def test_sympy__vector__dyadic__DyadicMul():
from sympy.vector.dyadic import BaseDyadic, DyadicMul
from sympy.vector.coordsysrect import CoordSys3D
C = CoordSys3D('C')
assert _test_args(DyadicMul(3, BaseDyadic(C.i, C.j)))
def test_sympy__vector__dyadic__DyadicAdd():
from sympy.vector.dyadic import BaseDyadic, DyadicAdd
from sympy.vector.coordsysrect import CoordSys3D
C = CoordSys3D('C')
assert _test_args(2 * DyadicAdd(BaseDyadic(C.i, C.i),
BaseDyadic(C.i, C.j)))
def test_sympy__vector__dyadic__DyadicZero():
from sympy.vector.dyadic import DyadicZero
assert _test_args(DyadicZero())
def test_sympy__vector__deloperator__Del():
from sympy.vector.deloperator import Del
assert _test_args(Del())
def test_sympy__vector__operators__Curl():
from sympy.vector.operators import Curl
from sympy.vector.coordsysrect import CoordSys3D
C = CoordSys3D('C')
assert _test_args(Curl(C.i))
def test_sympy__vector__operators__Laplacian():
from sympy.vector.operators import Laplacian
from sympy.vector.coordsysrect import CoordSys3D
C = CoordSys3D('C')
assert _test_args(Laplacian(C.i))
def test_sympy__vector__operators__Divergence():
from sympy.vector.operators import Divergence
from sympy.vector.coordsysrect import CoordSys3D
C = CoordSys3D('C')
assert _test_args(Divergence(C.i))
def test_sympy__vector__operators__Gradient():
from sympy.vector.operators import Gradient
from sympy.vector.coordsysrect import CoordSys3D
C = CoordSys3D('C')
assert _test_args(Gradient(C.x))
def test_sympy__vector__orienters__Orienter():
#from sympy.vector.orienters import Orienter
#Not to be initialized
pass
def test_sympy__vector__orienters__ThreeAngleOrienter():
#from sympy.vector.orienters import ThreeAngleOrienter
#Not to be initialized
pass
def test_sympy__vector__orienters__AxisOrienter():
from sympy.vector.orienters import AxisOrienter
from sympy.vector.coordsysrect import CoordSys3D
C = CoordSys3D('C')
assert _test_args(AxisOrienter(x, C.i))
def test_sympy__vector__orienters__BodyOrienter():
from sympy.vector.orienters import BodyOrienter
assert _test_args(BodyOrienter(x, y, z, '123'))
def test_sympy__vector__orienters__SpaceOrienter():
from sympy.vector.orienters import SpaceOrienter
assert _test_args(SpaceOrienter(x, y, z, '123'))
def test_sympy__vector__orienters__QuaternionOrienter():
from sympy.vector.orienters import QuaternionOrienter
a, b, c, d = symbols('a b c d')
assert _test_args(QuaternionOrienter(a, b, c, d))
def test_sympy__vector__parametricregion__ParametricRegion():
from sympy.abc import t
from sympy.vector.parametricregion import ParametricRegion
assert _test_args(ParametricRegion((t, t**3), (t, 0, 2)))
def test_sympy__vector__scalar__BaseScalar():
from sympy.vector.scalar import BaseScalar
from sympy.vector.coordsysrect import CoordSys3D
C = CoordSys3D('C')
assert _test_args(BaseScalar(0, C, ' ', ' '))
def test_sympy__physics__wigner__Wigner3j():
from sympy.physics.wigner import Wigner3j
assert _test_args(Wigner3j(0, 0, 0, 0, 0, 0))
def test_sympy__integrals__rubi__symbol__matchpyWC():
from sympy.integrals.rubi.symbol import matchpyWC
assert _test_args(matchpyWC(1, True, 'a'))
def test_sympy__integrals__rubi__utility_function__rubi_unevaluated_expr():
from sympy.integrals.rubi.utility_function import rubi_unevaluated_expr
a = symbols('a')
assert _test_args(rubi_unevaluated_expr(a))
def test_sympy__integrals__rubi__utility_function__rubi_exp():
from sympy.integrals.rubi.utility_function import rubi_exp
assert _test_args(rubi_exp(5))
def test_sympy__integrals__rubi__utility_function__rubi_log():
from sympy.integrals.rubi.utility_function import rubi_log
assert _test_args(rubi_log(5))
def test_sympy__integrals__rubi__utility_function__Int():
from sympy.integrals.rubi.utility_function import Int
assert _test_args(Int(5, x))
def test_sympy__integrals__rubi__utility_function__Util_Coefficient():
from sympy.integrals.rubi.utility_function import Util_Coefficient
a, x = symbols('a x')
assert _test_args(Util_Coefficient(a, x))
def test_sympy__integrals__rubi__utility_function__Gamma():
from sympy.integrals.rubi.utility_function import Gamma
assert _test_args(Gamma(5))
def test_sympy__integrals__rubi__utility_function__Util_Part():
from sympy.integrals.rubi.utility_function import Util_Part
a, b = symbols('a b')
assert _test_args(Util_Part(a + b, 0))
def test_sympy__integrals__rubi__utility_function__PolyGamma():
from sympy.integrals.rubi.utility_function import PolyGamma
assert _test_args(PolyGamma(1, 1))
def test_sympy__integrals__rubi__utility_function__ProductLog():
from sympy.integrals.rubi.utility_function import ProductLog
assert _test_args(ProductLog(1))
def test_sympy__combinatorics__schur_number__SchurNumber():
from sympy.combinatorics.schur_number import SchurNumber
assert _test_args(SchurNumber(1))
def test_sympy__combinatorics__perm_groups__SymmetricPermutationGroup():
from sympy.combinatorics.perm_groups import SymmetricPermutationGroup
assert _test_args(SymmetricPermutationGroup(5))
def test_sympy__combinatorics__perm_groups__Coset():
from sympy.combinatorics.permutations import Permutation
from sympy.combinatorics.perm_groups import PermutationGroup, Coset
a = Permutation(1, 2)
b = Permutation(0, 1)
G = PermutationGroup([a, b])
assert _test_args(Coset(a, G))
|
f6a582bcf792a706d8db60cdf3280f1717628cf7afedbf33b9a4109c656e1474
|
from sympy import (Lambda, Symbol, Function, Derivative, Subs, sqrt,
log, exp, Rational, Float, sin, cos, acos, diff, I, re, im,
E, expand, pi, O, Sum, S, polygamma, loggamma, expint,
Tuple, Dummy, Eq, Expr, symbols, nfloat, Piecewise, Indexed,
Matrix, Basic, Dict, oo, zoo, nan, Pow)
from sympy.core.basic import _aresame
from sympy.core.cache import clear_cache
from sympy.core.expr import unchanged
from sympy.core.function import (PoleError, _mexpand, arity,
BadSignatureError, BadArgumentsError)
from sympy.core.sympify import sympify
from sympy.matrices import MutableMatrix, ImmutableMatrix
from sympy.sets.sets import FiniteSet
from sympy.solvers.solveset import solveset
from sympy.tensor.array import NDimArray
from sympy.utilities.iterables import subsets, variations
from sympy.testing.pytest import XFAIL, raises, warns_deprecated_sympy
from sympy.abc import t, w, x, y, z
f, g, h = symbols('f g h', cls=Function)
_xi_1, _xi_2, _xi_3 = [Dummy() for i in range(3)]
def test_f_expand_complex():
x = Symbol('x', real=True)
assert f(x).expand(complex=True) == I*im(f(x)) + re(f(x))
assert exp(x).expand(complex=True) == exp(x)
assert exp(I*x).expand(complex=True) == cos(x) + I*sin(x)
assert exp(z).expand(complex=True) == cos(im(z))*exp(re(z)) + \
I*sin(im(z))*exp(re(z))
def test_bug1():
e = sqrt(-log(w))
assert e.subs(log(w), -x) == sqrt(x)
e = sqrt(-5*log(w))
assert e.subs(log(w), -x) == sqrt(5*x)
def test_general_function():
nu = Function('nu')
e = nu(x)
edx = e.diff(x)
edy = e.diff(y)
edxdx = e.diff(x).diff(x)
edxdy = e.diff(x).diff(y)
assert e == nu(x)
assert edx != nu(x)
assert edx == diff(nu(x), x)
assert edy == 0
assert edxdx == diff(diff(nu(x), x), x)
assert edxdy == 0
def test_general_function_nullary():
nu = Function('nu')
e = nu()
edx = e.diff(x)
edxdx = e.diff(x).diff(x)
assert e == nu()
assert edx != nu()
assert edx == 0
assert edxdx == 0
def test_derivative_subs_bug():
e = diff(g(x), x)
assert e.subs(g(x), f(x)) != e
assert e.subs(g(x), f(x)) == Derivative(f(x), x)
assert e.subs(g(x), -f(x)) == Derivative(-f(x), x)
assert e.subs(x, y) == Derivative(g(y), y)
def test_derivative_subs_self_bug():
d = diff(f(x), x)
assert d.subs(d, y) == y
def test_derivative_linearity():
assert diff(-f(x), x) == -diff(f(x), x)
assert diff(8*f(x), x) == 8*diff(f(x), x)
assert diff(8*f(x), x) != 7*diff(f(x), x)
assert diff(8*f(x)*x, x) == 8*f(x) + 8*x*diff(f(x), x)
assert diff(8*f(x)*y*x, x).expand() == 8*y*f(x) + 8*y*x*diff(f(x), x)
def test_derivative_evaluate():
assert Derivative(sin(x), x) != diff(sin(x), x)
assert Derivative(sin(x), x).doit() == diff(sin(x), x)
assert Derivative(Derivative(f(x), x), x) == diff(f(x), x, x)
assert Derivative(sin(x), x, 0) == sin(x)
assert Derivative(sin(x), (x, y), (x, -y)) == sin(x)
def test_diff_symbols():
assert diff(f(x, y, z), x, y, z) == Derivative(f(x, y, z), x, y, z)
assert diff(f(x, y, z), x, x, x) == Derivative(f(x, y, z), x, x, x) == Derivative(f(x, y, z), (x, 3))
assert diff(f(x, y, z), x, 3) == Derivative(f(x, y, z), x, 3)
# issue 5028
assert [diff(-z + x/y, sym) for sym in (z, x, y)] == [-1, 1/y, -x/y**2]
assert diff(f(x, y, z), x, y, z, 2) == Derivative(f(x, y, z), x, y, z, z)
assert diff(f(x, y, z), x, y, z, 2, evaluate=False) == \
Derivative(f(x, y, z), x, y, z, z)
assert Derivative(f(x, y, z), x, y, z)._eval_derivative(z) == \
Derivative(f(x, y, z), x, y, z, z)
assert Derivative(Derivative(f(x, y, z), x), y)._eval_derivative(z) == \
Derivative(f(x, y, z), x, y, z)
raises(TypeError, lambda: cos(x).diff((x, y)).variables)
assert cos(x).diff((x, y))._wrt_variables == [x]
def test_Function():
class myfunc(Function):
@classmethod
def eval(cls): # zero args
return
assert myfunc.nargs == FiniteSet(0)
assert myfunc().nargs == FiniteSet(0)
raises(TypeError, lambda: myfunc(x).nargs)
class myfunc(Function):
@classmethod
def eval(cls, x): # one arg
return
assert myfunc.nargs == FiniteSet(1)
assert myfunc(x).nargs == FiniteSet(1)
raises(TypeError, lambda: myfunc(x, y).nargs)
class myfunc(Function):
@classmethod
def eval(cls, *x): # star args
return
assert myfunc.nargs == S.Naturals0
assert myfunc(x).nargs == S.Naturals0
def test_nargs():
f = Function('f')
assert f.nargs == S.Naturals0
assert f(1).nargs == S.Naturals0
assert Function('f', nargs=2)(1, 2).nargs == FiniteSet(2)
assert sin.nargs == FiniteSet(1)
assert sin(2).nargs == FiniteSet(1)
assert log.nargs == FiniteSet(1, 2)
assert log(2).nargs == FiniteSet(1, 2)
assert Function('f', nargs=2).nargs == FiniteSet(2)
assert Function('f', nargs=0).nargs == FiniteSet(0)
assert Function('f', nargs=(0, 1)).nargs == FiniteSet(0, 1)
assert Function('f', nargs=None).nargs == S.Naturals0
raises(ValueError, lambda: Function('f', nargs=()))
def test_nargs_inheritance():
class f1(Function):
nargs = 2
class f2(f1):
pass
class f3(f2):
pass
class f4(f3):
nargs = 1,2
class f5(f4):
pass
class f6(f5):
pass
class f7(f6):
nargs=None
class f8(f7):
pass
class f9(f8):
pass
class f10(f9):
nargs = 1
class f11(f10):
pass
assert f1.nargs == FiniteSet(2)
assert f2.nargs == FiniteSet(2)
assert f3.nargs == FiniteSet(2)
assert f4.nargs == FiniteSet(1, 2)
assert f5.nargs == FiniteSet(1, 2)
assert f6.nargs == FiniteSet(1, 2)
assert f7.nargs == S.Naturals0
assert f8.nargs == S.Naturals0
assert f9.nargs == S.Naturals0
assert f10.nargs == FiniteSet(1)
assert f11.nargs == FiniteSet(1)
def test_arity():
f = lambda x, y: 1
assert arity(f) == 2
def f(x, y, z=None):
pass
assert arity(f) == (2, 3)
assert arity(lambda *x: x) is None
assert arity(log) == (1, 2)
def test_Lambda():
e = Lambda(x, x**2)
assert e(4) == 16
assert e(x) == x**2
assert e(y) == y**2
assert Lambda((), 42)() == 42
assert unchanged(Lambda, (), 42)
assert Lambda((), 42) != Lambda((), 43)
assert Lambda((), f(x))() == f(x)
assert Lambda((), 42).nargs == FiniteSet(0)
assert unchanged(Lambda, (x,), x**2)
assert Lambda(x, x**2) == Lambda((x,), x**2)
assert Lambda(x, x**2) != Lambda(x, x**2 + 1)
assert Lambda((x, y), x**y) != Lambda((y, x), y**x)
assert Lambda((x, y), x**y) != Lambda((x, y), y**x)
assert Lambda((x, y), x**y)(x, y) == x**y
assert Lambda((x, y), x**y)(3, 3) == 3**3
assert Lambda((x, y), x**y)(x, 3) == x**3
assert Lambda((x, y), x**y)(3, y) == 3**y
assert Lambda(x, f(x))(x) == f(x)
assert Lambda(x, x**2)(e(x)) == x**4
assert e(e(x)) == x**4
x1, x2 = (Indexed('x', i) for i in (1, 2))
assert Lambda((x1, x2), x1 + x2)(x, y) == x + y
assert Lambda((x, y), x + y).nargs == FiniteSet(2)
p = x, y, z, t
assert Lambda(p, t*(x + y + z))(*p) == t * (x + y + z)
eq = Lambda(x, 2*x) + Lambda(y, 2*y)
assert eq != 2*Lambda(x, 2*x)
assert eq.as_dummy() == 2*Lambda(x, 2*x).as_dummy()
assert Lambda(x, 2*x) not in [ Lambda(x, x) ]
raises(BadSignatureError, lambda: Lambda(1, x))
assert Lambda(x, 1)(1) is S.One
raises(BadSignatureError, lambda: Lambda((x, x), x + 2))
raises(BadSignatureError, lambda: Lambda(((x, x), y), x))
raises(BadSignatureError, lambda: Lambda(((y, x), x), x))
raises(BadSignatureError, lambda: Lambda(((y, 1), 2), x))
with warns_deprecated_sympy():
assert Lambda([x, y], x+y) == Lambda((x, y), x+y)
flam = Lambda( ((x, y),) , x + y)
assert flam((2, 3)) == 5
flam = Lambda( ((x, y), z) , x + y + z)
assert flam((2, 3), 1) == 6
flam = Lambda( (((x,y),z),) , x+y+z)
assert flam( ((2,3),1) ) == 6
raises(BadArgumentsError, lambda: flam(1, 2, 3))
flam = Lambda( (x,), (x, x))
assert flam(1,) == (1, 1)
assert flam((1,)) == ((1,), (1,))
flam = Lambda( ((x,),) , (x, x))
raises(BadArgumentsError, lambda: flam(1))
assert flam((1,)) == (1, 1)
# Previously TypeError was raised so this is potentially needed for
# backwards compatibility.
assert issubclass(BadSignatureError, TypeError)
assert issubclass(BadArgumentsError, TypeError)
# These are tested to see they don't raise:
hash(Lambda(x, 2*x))
hash(Lambda(x, x)) # IdentityFunction subclass
def test_IdentityFunction():
assert Lambda(x, x) is Lambda(y, y) is S.IdentityFunction
assert Lambda(x, 2*x) is not S.IdentityFunction
assert Lambda((x, y), x) is not S.IdentityFunction
def test_Lambda_symbols():
assert Lambda(x, 2*x).free_symbols == set()
assert Lambda(x, x*y).free_symbols == {y}
assert Lambda((), 42).free_symbols == set()
assert Lambda((), x*y).free_symbols == {x,y}
def test_functionclas_symbols():
assert f.free_symbols == set()
def test_Lambda_arguments():
raises(TypeError, lambda: Lambda(x, 2*x)(x, y))
raises(TypeError, lambda: Lambda((x, y), x + y)(x))
raises(TypeError, lambda: Lambda((), 42)(x))
def test_Lambda_equality():
assert Lambda((x, y), 2*x) == Lambda((x, y), 2*x)
# these, of course, should never be equal
assert Lambda(x, 2*x) != Lambda((x, y), 2*x)
assert Lambda(x, 2*x) != 2*x
# But it is tempting to want expressions that differ only
# in bound symbols to compare the same. But this is not what
# Python's `==` is intended to do; two objects that compare
# as equal means that they are indistibguishable and cache to the
# same value. We wouldn't want to expression that are
# mathematically the same but written in different variables to be
# interchanged else what is the point of allowing for different
# variable names?
assert Lambda(x, 2*x) != Lambda(y, 2*y)
def test_Subs():
assert Subs(1, (), ()) is S.One
# check null subs influence on hashing
assert Subs(x, y, z) != Subs(x, y, 1)
# neutral subs works
assert Subs(x, x, 1).subs(x, y).has(y)
# self mapping var/point
assert Subs(Derivative(f(x), (x, 2)), x, x).doit() == f(x).diff(x, x)
assert Subs(x, x, 0).has(x) # it's a structural answer
assert not Subs(x, x, 0).free_symbols
assert Subs(Subs(x + y, x, 2), y, 1) == Subs(x + y, (x, y), (2, 1))
assert Subs(x, (x,), (0,)) == Subs(x, x, 0)
assert Subs(x, x, 0) == Subs(y, y, 0)
assert Subs(x, x, 0).subs(x, 1) == Subs(x, x, 0)
assert Subs(y, x, 0).subs(y, 1) == Subs(1, x, 0)
assert Subs(f(x), x, 0).doit() == f(0)
assert Subs(f(x**2), x**2, 0).doit() == f(0)
assert Subs(f(x, y, z), (x, y, z), (0, 1, 1)) != \
Subs(f(x, y, z), (x, y, z), (0, 0, 1))
assert Subs(x, y, 2).subs(x, y).doit() == 2
assert Subs(f(x, y), (x, y, z), (0, 1, 1)) != \
Subs(f(x, y) + z, (x, y, z), (0, 1, 0))
assert Subs(f(x, y), (x, y), (0, 1)).doit() == f(0, 1)
assert Subs(Subs(f(x, y), x, 0), y, 1).doit() == f(0, 1)
raises(ValueError, lambda: Subs(f(x, y), (x, y), (0, 0, 1)))
raises(ValueError, lambda: Subs(f(x, y), (x, x, y), (0, 0, 1)))
assert len(Subs(f(x, y), (x, y), (0, 1)).variables) == 2
assert Subs(f(x, y), (x, y), (0, 1)).point == Tuple(0, 1)
assert Subs(f(x), x, 0) == Subs(f(y), y, 0)
assert Subs(f(x, y), (x, y), (0, 1)) == Subs(f(x, y), (y, x), (1, 0))
assert Subs(f(x)*y, (x, y), (0, 1)) == Subs(f(y)*x, (y, x), (0, 1))
assert Subs(f(x)*y, (x, y), (1, 1)) == Subs(f(y)*x, (x, y), (1, 1))
assert Subs(f(x), x, 0).subs(x, 1).doit() == f(0)
assert Subs(f(x), x, y).subs(y, 0) == Subs(f(x), x, 0)
assert Subs(y*f(x), x, y).subs(y, 2) == Subs(2*f(x), x, 2)
assert (2 * Subs(f(x), x, 0)).subs(Subs(f(x), x, 0), y) == 2*y
assert Subs(f(x), x, 0).free_symbols == set()
assert Subs(f(x, y), x, z).free_symbols == {y, z}
assert Subs(f(x).diff(x), x, 0).doit(), Subs(f(x).diff(x), x, 0)
assert Subs(1 + f(x).diff(x), x, 0).doit(), 1 + Subs(f(x).diff(x), x, 0)
assert Subs(y*f(x, y).diff(x), (x, y), (0, 2)).doit() == \
2*Subs(Derivative(f(x, 2), x), x, 0)
assert Subs(y**2*f(x), x, 0).diff(y) == 2*y*f(0)
e = Subs(y**2*f(x), x, y)
assert e.diff(y) == e.doit().diff(y) == y**2*Derivative(f(y), y) + 2*y*f(y)
assert Subs(f(x), x, 0) + Subs(f(x), x, 0) == 2*Subs(f(x), x, 0)
e1 = Subs(z*f(x), x, 1)
e2 = Subs(z*f(y), y, 1)
assert e1 + e2 == 2*e1
assert e1.__hash__() == e2.__hash__()
assert Subs(z*f(x + 1), x, 1) not in [ e1, e2 ]
assert Derivative(f(x), x).subs(x, g(x)) == Derivative(f(g(x)), g(x))
assert Derivative(f(x), x).subs(x, x + y) == Subs(Derivative(f(x), x),
x, x + y)
assert Subs(f(x)*cos(y) + z, (x, y), (0, pi/3)).n(2) == \
Subs(f(x)*cos(y) + z, (x, y), (0, pi/3)).evalf(2) == \
z + Rational('1/2').n(2)*f(0)
assert f(x).diff(x).subs(x, 0).subs(x, y) == f(x).diff(x).subs(x, 0)
assert (x*f(x).diff(x).subs(x, 0)).subs(x, y) == y*f(x).diff(x).subs(x, 0)
assert Subs(Derivative(g(x)**2, g(x), x), g(x), exp(x)
).doit() == 2*exp(x)
assert Subs(Derivative(g(x)**2, g(x), x), g(x), exp(x)
).doit(deep=False) == 2*Derivative(exp(x), x)
assert Derivative(f(x, g(x)), x).doit() == Derivative(
f(x, g(x)), g(x))*Derivative(g(x), x) + Subs(Derivative(
f(y, g(x)), y), y, x)
def test_doitdoit():
done = Derivative(f(x, g(x)), x, g(x)).doit()
assert done == done.doit()
@XFAIL
def test_Subs2():
# this reflects a limitation of subs(), probably won't fix
assert Subs(f(x), x**2, x).doit() == f(sqrt(x))
def test_expand_function():
assert expand(x + y) == x + y
assert expand(x + y, complex=True) == I*im(x) + I*im(y) + re(x) + re(y)
assert expand((x + y)**11, modulus=11) == x**11 + y**11
def test_function_comparable():
assert sin(x).is_comparable is False
assert cos(x).is_comparable is False
assert sin(Float('0.1')).is_comparable is True
assert cos(Float('0.1')).is_comparable is True
assert sin(E).is_comparable is True
assert cos(E).is_comparable is True
assert sin(Rational(1, 3)).is_comparable is True
assert cos(Rational(1, 3)).is_comparable is True
def test_function_comparable_infinities():
assert sin(oo).is_comparable is False
assert sin(-oo).is_comparable is False
assert sin(zoo).is_comparable is False
assert sin(nan).is_comparable is False
def test_deriv1():
# These all require derivatives evaluated at a point (issue 4719) to work.
# See issue 4624
assert f(2*x).diff(x) == 2*Subs(Derivative(f(x), x), x, 2*x)
assert (f(x)**3).diff(x) == 3*f(x)**2*f(x).diff(x)
assert (f(2*x)**3).diff(x) == 6*f(2*x)**2*Subs(
Derivative(f(x), x), x, 2*x)
assert f(2 + x).diff(x) == Subs(Derivative(f(x), x), x, x + 2)
assert f(2 + 3*x).diff(x) == 3*Subs(
Derivative(f(x), x), x, 3*x + 2)
assert f(3*sin(x)).diff(x) == 3*cos(x)*Subs(
Derivative(f(x), x), x, 3*sin(x))
# See issue 8510
assert f(x, x + z).diff(x) == (
Subs(Derivative(f(y, x + z), y), y, x) +
Subs(Derivative(f(x, y), y), y, x + z))
assert f(x, x**2).diff(x) == (
2*x*Subs(Derivative(f(x, y), y), y, x**2) +
Subs(Derivative(f(y, x**2), y), y, x))
# but Subs is not always necessary
assert f(x, g(y)).diff(g(y)) == Derivative(f(x, g(y)), g(y))
def test_deriv2():
assert (x**3).diff(x) == 3*x**2
assert (x**3).diff(x, evaluate=False) != 3*x**2
assert (x**3).diff(x, evaluate=False) == Derivative(x**3, x)
assert diff(x**3, x) == 3*x**2
assert diff(x**3, x, evaluate=False) != 3*x**2
assert diff(x**3, x, evaluate=False) == Derivative(x**3, x)
def test_func_deriv():
assert f(x).diff(x) == Derivative(f(x), x)
# issue 4534
assert f(x, y).diff(x, y) - f(x, y).diff(y, x) == 0
assert Derivative(f(x, y), x, y).args[1:] == ((x, 1), (y, 1))
assert Derivative(f(x, y), y, x).args[1:] == ((y, 1), (x, 1))
assert (Derivative(f(x, y), x, y) - Derivative(f(x, y), y, x)).doit() == 0
def test_suppressed_evaluation():
a = sin(0, evaluate=False)
assert a != 0
assert a.func is sin
assert a.args == (0,)
def test_function_evalf():
def eq(a, b, eps):
return abs(a - b) < eps
assert eq(sin(1).evalf(15), Float("0.841470984807897"), 1e-13)
assert eq(
sin(2).evalf(25), Float("0.9092974268256816953960199", 25), 1e-23)
assert eq(sin(1 + I).evalf(
15), Float("1.29845758141598") + Float("0.634963914784736")*I, 1e-13)
assert eq(exp(1 + I).evalf(15), Float(
"1.46869393991588") + Float("2.28735528717884239")*I, 1e-13)
assert eq(exp(-0.5 + 1.5*I).evalf(15), Float(
"0.0429042815937374") + Float("0.605011292285002")*I, 1e-13)
assert eq(log(pi + sqrt(2)*I).evalf(
15), Float("1.23699044022052") + Float("0.422985442737893")*I, 1e-13)
assert eq(cos(100).evalf(15), Float("0.86231887228768"), 1e-13)
def test_extensibility_eval():
class MyFunc(Function):
@classmethod
def eval(cls, *args):
return (0, 0, 0)
assert MyFunc(0) == (0, 0, 0)
def test_function_non_commutative():
x = Symbol('x', commutative=False)
assert f(x).is_commutative is False
assert sin(x).is_commutative is False
assert exp(x).is_commutative is False
assert log(x).is_commutative is False
assert f(x).is_complex is False
assert sin(x).is_complex is False
assert exp(x).is_complex is False
assert log(x).is_complex is False
def test_function_complex():
x = Symbol('x', complex=True)
xzf = Symbol('x', complex=True, zero=False)
assert f(x).is_commutative is True
assert sin(x).is_commutative is True
assert exp(x).is_commutative is True
assert log(x).is_commutative is True
assert f(x).is_complex is None
assert sin(x).is_complex is True
assert exp(x).is_complex is True
assert log(x).is_complex is None
assert log(xzf).is_complex is True
def test_function__eval_nseries():
n = Symbol('n')
assert sin(x)._eval_nseries(x, 2, None) == x + O(x**2)
assert sin(x + 1)._eval_nseries(x, 2, None) == x*cos(1) + sin(1) + O(x**2)
assert sin(pi*(1 - x))._eval_nseries(x, 2, None) == pi*x + O(x**2)
assert acos(1 - x**2)._eval_nseries(x, 2, None) == sqrt(2)*sqrt(x**2) + O(x**2)
assert polygamma(n, x + 1)._eval_nseries(x, 2, None) == \
polygamma(n, 1) + polygamma(n + 1, 1)*x + O(x**2)
raises(PoleError, lambda: sin(1/x)._eval_nseries(x, 2, None))
assert acos(1 - x)._eval_nseries(x, 2, None) == sqrt(2)*sqrt(x) + sqrt(2)*x**(S(3)/2)/12 + O(x**2)
assert acos(1 + x)._eval_nseries(x, 2, None) == sqrt(2)*sqrt(-x) + sqrt(2)*(-x)**(S(3)/2)/12 + O(x**2)
assert loggamma(1/x)._eval_nseries(x, 0, None) == \
log(x)/2 - log(x)/x - 1/x + O(1, x)
assert loggamma(log(1/x)).nseries(x, n=1, logx=y) == loggamma(-y)
# issue 6725:
assert expint(Rational(3, 2), -x)._eval_nseries(x, 5, None) == \
2 - 2*sqrt(pi)*sqrt(-x) - 2*x + x**2 + x**3/3 + x**4/12 + 4*I*x**(S(3)/2)*sqrt(-x)/3 + \
2*I*x**(S(5)/2)*sqrt(-x)/5 + 2*I*x**(S(7)/2)*sqrt(-x)/21 + O(x**5)
assert sin(sqrt(x))._eval_nseries(x, 3, None) == \
sqrt(x) - x**Rational(3, 2)/6 + x**Rational(5, 2)/120 + O(x**3)
def test_doit():
n = Symbol('n', integer=True)
f = Sum(2 * n * x, (n, 1, 3))
d = Derivative(f, x)
assert d.doit() == 12
assert d.doit(deep=False) == Sum(2*n, (n, 1, 3))
def test_evalf_default():
from sympy.functions.special.gamma_functions import polygamma
assert type(sin(4.0)) == Float
assert type(re(sin(I + 1.0))) == Float
assert type(im(sin(I + 1.0))) == Float
assert type(sin(4)) == sin
assert type(polygamma(2.0, 4.0)) == Float
assert type(sin(Rational(1, 4))) == sin
def test_issue_5399():
args = [x, y, S(2), S.Half]
def ok(a):
"""Return True if the input args for diff are ok"""
if not a:
return False
if a[0].is_Symbol is False:
return False
s_at = [i for i in range(len(a)) if a[i].is_Symbol]
n_at = [i for i in range(len(a)) if not a[i].is_Symbol]
# every symbol is followed by symbol or int
# every number is followed by a symbol
return (all(a[i + 1].is_Symbol or a[i + 1].is_Integer
for i in s_at if i + 1 < len(a)) and
all(a[i + 1].is_Symbol
for i in n_at if i + 1 < len(a)))
eq = x**10*y**8
for a in subsets(args):
for v in variations(a, len(a)):
if ok(v):
eq.diff(*v) # does not raise
else:
raises(ValueError, lambda: eq.diff(*v))
def test_derivative_numerically():
from random import random
z0 = random() + I*random()
assert abs(Derivative(sin(x), x).doit_numerically(z0) - cos(z0)) < 1e-15
def test_fdiff_argument_index_error():
from sympy.core.function import ArgumentIndexError
class myfunc(Function):
nargs = 1 # define since there is no eval routine
def fdiff(self, idx):
raise ArgumentIndexError
mf = myfunc(x)
assert mf.diff(x) == Derivative(mf, x)
raises(TypeError, lambda: myfunc(x, x))
def test_deriv_wrt_function():
x = f(t)
xd = diff(x, t)
xdd = diff(xd, t)
y = g(t)
yd = diff(y, t)
assert diff(x, t) == xd
assert diff(2 * x + 4, t) == 2 * xd
assert diff(2 * x + 4 + y, t) == 2 * xd + yd
assert diff(2 * x + 4 + y * x, t) == 2 * xd + x * yd + xd * y
assert diff(2 * x + 4 + y * x, x) == 2 + y
assert (diff(4 * x**2 + 3 * x + x * y, t) == 3 * xd + x * yd + xd * y +
8 * x * xd)
assert (diff(4 * x**2 + 3 * xd + x * y, t) == 3 * xdd + x * yd + xd * y +
8 * x * xd)
assert diff(4 * x**2 + 3 * xd + x * y, xd) == 3
assert diff(4 * x**2 + 3 * xd + x * y, xdd) == 0
assert diff(sin(x), t) == xd * cos(x)
assert diff(exp(x), t) == xd * exp(x)
assert diff(sqrt(x), t) == xd / (2 * sqrt(x))
def test_diff_wrt_value():
assert Expr()._diff_wrt is False
assert x._diff_wrt is True
assert f(x)._diff_wrt is True
assert Derivative(f(x), x)._diff_wrt is True
assert Derivative(x**2, x)._diff_wrt is False
def test_diff_wrt():
fx = f(x)
dfx = diff(f(x), x)
ddfx = diff(f(x), x, x)
assert diff(sin(fx) + fx**2, fx) == cos(fx) + 2*fx
assert diff(sin(dfx) + dfx**2, dfx) == cos(dfx) + 2*dfx
assert diff(sin(ddfx) + ddfx**2, ddfx) == cos(ddfx) + 2*ddfx
assert diff(fx**2, dfx) == 0
assert diff(fx**2, ddfx) == 0
assert diff(dfx**2, fx) == 0
assert diff(dfx**2, ddfx) == 0
assert diff(ddfx**2, dfx) == 0
assert diff(fx*dfx*ddfx, fx) == dfx*ddfx
assert diff(fx*dfx*ddfx, dfx) == fx*ddfx
assert diff(fx*dfx*ddfx, ddfx) == fx*dfx
assert diff(f(x), x).diff(f(x)) == 0
assert (sin(f(x)) - cos(diff(f(x), x))).diff(f(x)) == cos(f(x))
assert diff(sin(fx), fx, x) == diff(sin(fx), x, fx)
# Chain rule cases
assert f(g(x)).diff(x) == \
Derivative(g(x), x)*Derivative(f(g(x)), g(x))
assert diff(f(g(x), h(y)), x) == \
Derivative(g(x), x)*Derivative(f(g(x), h(y)), g(x))
assert diff(f(g(x), h(x)), x) == (
Derivative(f(g(x), h(x)), g(x))*Derivative(g(x), x) +
Derivative(f(g(x), h(x)), h(x))*Derivative(h(x), x))
assert f(
sin(x)).diff(x) == cos(x)*Subs(Derivative(f(x), x), x, sin(x))
assert diff(f(g(x)), g(x)) == Derivative(f(g(x)), g(x))
def test_diff_wrt_func_subs():
assert f(g(x)).diff(x).subs(g, Lambda(x, 2*x)).doit() == f(2*x).diff(x)
def test_subs_in_derivative():
expr = sin(x*exp(y))
u = Function('u')
v = Function('v')
assert Derivative(expr, y).subs(expr, y) == Derivative(y, y)
assert Derivative(expr, y).subs(y, x).doit() == \
Derivative(expr, y).doit().subs(y, x)
assert Derivative(f(x, y), y).subs(y, x) == Subs(Derivative(f(x, y), y), y, x)
assert Derivative(f(x, y), y).subs(x, y) == Subs(Derivative(f(x, y), y), x, y)
assert Derivative(f(x, y), y).subs(y, g(x, y)) == Subs(Derivative(f(x, y), y), y, g(x, y)).doit()
assert Derivative(f(x, y), y).subs(x, g(x, y)) == Subs(Derivative(f(x, y), y), x, g(x, y))
assert Derivative(f(x, y), g(y)).subs(x, g(x, y)) == Derivative(f(g(x, y), y), g(y))
assert Derivative(f(u(x), h(y)), h(y)).subs(h(y), g(x, y)) == \
Subs(Derivative(f(u(x), h(y)), h(y)), h(y), g(x, y)).doit()
assert Derivative(f(x, y), y).subs(y, z) == Derivative(f(x, z), z)
assert Derivative(f(x, y), y).subs(y, g(y)) == Derivative(f(x, g(y)), g(y))
assert Derivative(f(g(x), h(y)), h(y)).subs(h(y), u(y)) == \
Derivative(f(g(x), u(y)), u(y))
assert Derivative(f(x, f(x, x)), f(x, x)).subs(
f, Lambda((x, y), x + y)) == Subs(
Derivative(z + x, z), z, 2*x)
assert Subs(Derivative(f(f(x)), x), f, cos).doit() == sin(x)*sin(cos(x))
assert Subs(Derivative(f(f(x)), f(x)), f, cos).doit() == -sin(cos(x))
# Issue 13791. No comparison (it's a long formula) but this used to raise an exception.
assert isinstance(v(x, y, u(x, y)).diff(y).diff(x).diff(y), Expr)
# This is also related to issues 13791 and 13795; issue 15190
F = Lambda((x, y), exp(2*x + 3*y))
abstract = f(x, f(x, x)).diff(x, 2)
concrete = F(x, F(x, x)).diff(x, 2)
assert (abstract.subs(f, F).doit() - concrete).simplify() == 0
# don't introduce a new symbol if not necessary
assert x in f(x).diff(x).subs(x, 0).atoms()
# case (4)
assert Derivative(f(x,f(x,y)), x, y).subs(x, g(y)
) == Subs(Derivative(f(x, f(x, y)), x, y), x, g(y))
assert Derivative(f(x, x), x).subs(x, 0
) == Subs(Derivative(f(x, x), x), x, 0)
# issue 15194
assert Derivative(f(y, g(x)), (x, z)).subs(z, x
) == Derivative(f(y, g(x)), (x, x))
df = f(x).diff(x)
assert df.subs(df, 1) is S.One
assert df.diff(df) is S.One
dxy = Derivative(f(x, y), x, y)
dyx = Derivative(f(x, y), y, x)
assert dxy.subs(Derivative(f(x, y), y, x), 1) is S.One
assert dxy.diff(dyx) is S.One
assert Derivative(f(x, y), x, 2, y, 3).subs(
dyx, g(x, y)) == Derivative(g(x, y), x, 1, y, 2)
assert Derivative(f(x, x - y), y).subs(x, x + y) == Subs(
Derivative(f(x, x - y), y), x, x + y)
def test_diff_wrt_not_allowed():
# issue 7027 included
for wrt in (
cos(x), re(x), x**2, x*y, 1 + x,
Derivative(cos(x), x), Derivative(f(f(x)), x)):
raises(ValueError, lambda: diff(f(x), wrt))
# if we don't differentiate wrt then don't raise error
assert diff(exp(x*y), x*y, 0) == exp(x*y)
def test_klein_gordon_lagrangian():
m = Symbol('m')
phi = f(x, t)
L = -(diff(phi, t)**2 - diff(phi, x)**2 - m**2*phi**2)/2
eqna = Eq(
diff(L, phi) - diff(L, diff(phi, x), x) - diff(L, diff(phi, t), t), 0)
eqnb = Eq(diff(phi, t, t) - diff(phi, x, x) + m**2*phi, 0)
assert eqna == eqnb
def test_sho_lagrangian():
m = Symbol('m')
k = Symbol('k')
x = f(t)
L = m*diff(x, t)**2/2 - k*x**2/2
eqna = Eq(diff(L, x), diff(L, diff(x, t), t))
eqnb = Eq(-k*x, m*diff(x, t, t))
assert eqna == eqnb
assert diff(L, x, t) == diff(L, t, x)
assert diff(L, diff(x, t), t) == m*diff(x, t, 2)
assert diff(L, t, diff(x, t)) == -k*x + m*diff(x, t, 2)
def test_straight_line():
F = f(x)
Fd = F.diff(x)
L = sqrt(1 + Fd**2)
assert diff(L, F) == 0
assert diff(L, Fd) == Fd/sqrt(1 + Fd**2)
def test_sort_variable():
vsort = Derivative._sort_variable_count
def vsort0(*v, **kw):
reverse = kw.get('reverse', False)
return [i[0] for i in vsort([(i, 0) for i in (
reversed(v) if reverse else v)])]
for R in range(2):
assert vsort0(y, x, reverse=R) == [x, y]
assert vsort0(f(x), x, reverse=R) == [x, f(x)]
assert vsort0(f(y), f(x), reverse=R) == [f(x), f(y)]
assert vsort0(g(x), f(y), reverse=R) == [f(y), g(x)]
assert vsort0(f(x, y), f(x), reverse=R) == [f(x), f(x, y)]
fx = f(x).diff(x)
assert vsort0(fx, y, reverse=R) == [y, fx]
fy = f(y).diff(y)
assert vsort0(fy, fx, reverse=R) == [fx, fy]
fxx = fx.diff(x)
assert vsort0(fxx, fx, reverse=R) == [fx, fxx]
assert vsort0(Basic(x), f(x), reverse=R) == [f(x), Basic(x)]
assert vsort0(Basic(y), Basic(x), reverse=R) == [Basic(x), Basic(y)]
assert vsort0(Basic(y, z), Basic(x), reverse=R) == [
Basic(x), Basic(y, z)]
assert vsort0(fx, x, reverse=R) == [
x, fx] if R else [fx, x]
assert vsort0(Basic(x), x, reverse=R) == [
x, Basic(x)] if R else [Basic(x), x]
assert vsort0(Basic(f(x)), f(x), reverse=R) == [
f(x), Basic(f(x))] if R else [Basic(f(x)), f(x)]
assert vsort0(Basic(x, z), Basic(x), reverse=R) == [
Basic(x), Basic(x, z)] if R else [Basic(x, z), Basic(x)]
assert vsort([]) == []
assert _aresame(vsort([(x, 1)]), [Tuple(x, 1)])
assert vsort([(x, y), (x, z)]) == [(x, y + z)]
assert vsort([(y, 1), (x, 1 + y)]) == [(x, 1 + y), (y, 1)]
# coverage complete; legacy tests below
assert vsort([(x, 3), (y, 2), (z, 1)]) == [(x, 3), (y, 2), (z, 1)]
assert vsort([(h(x), 1), (g(x), 1), (f(x), 1)]) == [
(f(x), 1), (g(x), 1), (h(x), 1)]
assert vsort([(z, 1), (y, 2), (x, 3), (h(x), 1), (g(x), 1),
(f(x), 1)]) == [(x, 3), (y, 2), (z, 1), (f(x), 1), (g(x), 1),
(h(x), 1)]
assert vsort([(x, 1), (f(x), 1), (y, 1), (f(y), 1)]) == [(x, 1),
(y, 1), (f(x), 1), (f(y), 1)]
assert vsort([(y, 1), (x, 2), (g(x), 1), (f(x), 1), (z, 1),
(h(x), 1), (y, 2), (x, 1)]) == [(x, 3), (y, 3), (z, 1),
(f(x), 1), (g(x), 1), (h(x), 1)]
assert vsort([(z, 1), (y, 1), (f(x), 1), (x, 1), (f(x), 1),
(g(x), 1)]) == [(x, 1), (y, 1), (z, 1), (f(x), 2), (g(x), 1)]
assert vsort([(z, 1), (y, 2), (f(x), 1), (x, 2), (f(x), 2),
(g(x), 1), (z, 2), (z, 1), (y, 1), (x, 1)]) == [(x, 3), (y, 3),
(z, 4), (f(x), 3), (g(x), 1)]
assert vsort(((y, 2), (x, 1), (y, 1), (x, 1))) == [(x, 2), (y, 3)]
assert isinstance(vsort([(x, 3), (y, 2), (z, 1)])[0], Tuple)
assert vsort([(x, 1), (f(x), 1), (x, 1)]) == [(x, 2), (f(x), 1)]
assert vsort([(y, 2), (x, 3), (z, 1)]) == [(x, 3), (y, 2), (z, 1)]
assert vsort([(h(y), 1), (g(x), 1), (f(x), 1)]) == [
(f(x), 1), (g(x), 1), (h(y), 1)]
assert vsort([(x, 1), (y, 1), (x, 1)]) == [(x, 2), (y, 1)]
assert vsort([(f(x), 1), (f(y), 1), (f(x), 1)]) == [
(f(x), 2), (f(y), 1)]
dfx = f(x).diff(x)
self = [(dfx, 1), (x, 1)]
assert vsort(self) == self
assert vsort([
(dfx, 1), (y, 1), (f(x), 1), (x, 1), (f(y), 1), (x, 1)]) == [
(y, 1), (f(x), 1), (f(y), 1), (dfx, 1), (x, 2)]
dfy = f(y).diff(y)
assert vsort([(dfy, 1), (dfx, 1)]) == [(dfx, 1), (dfy, 1)]
d2fx = dfx.diff(x)
assert vsort([(d2fx, 1), (dfx, 1)]) == [(dfx, 1), (d2fx, 1)]
def test_multiple_derivative():
# Issue #15007
assert f(x, y).diff(y, y, x, y, x
) == Derivative(f(x, y), (x, 2), (y, 3))
def test_unhandled():
class MyExpr(Expr):
def _eval_derivative(self, s):
if not s.name.startswith('xi'):
return self
else:
return None
eq = MyExpr(f(x), y, z)
assert diff(eq, x, y, f(x), z) == Derivative(eq, f(x))
assert diff(eq, f(x), x) == Derivative(eq, f(x))
assert f(x, y).diff(x,(y, z)) == Derivative(f(x, y), x, (y, z))
assert f(x, y).diff(x,(y, 0)) == Derivative(f(x, y), x)
def test_nfloat():
from sympy.core.basic import _aresame
from sympy.polys.rootoftools import rootof
x = Symbol("x")
eq = x**Rational(4, 3) + 4*x**(S.One/3)/3
assert _aresame(nfloat(eq), x**Rational(4, 3) + (4.0/3)*x**(S.One/3))
assert _aresame(nfloat(eq, exponent=True), x**(4.0/3) + (4.0/3)*x**(1.0/3))
eq = x**Rational(4, 3) + 4*x**(x/3)/3
assert _aresame(nfloat(eq), x**Rational(4, 3) + (4.0/3)*x**(x/3))
big = 12345678901234567890
# specify precision to match value used in nfloat
Float_big = Float(big, 15)
assert _aresame(nfloat(big), Float_big)
assert _aresame(nfloat(big*x), Float_big*x)
assert _aresame(nfloat(x**big, exponent=True), x**Float_big)
assert nfloat(cos(x + sqrt(2))) == cos(x + nfloat(sqrt(2)))
# issue 6342
f = S('x*lamda + lamda**3*(x/2 + 1/2) + lamda**2 + 1/4')
assert not any(a.free_symbols for a in solveset(f.subs(x, -0.139)))
# issue 6632
assert nfloat(-100000*sqrt(2500000001) + 5000000001) == \
9.99999999800000e-11
# issue 7122
eq = cos(3*x**4 + y)*rootof(x**5 + 3*x**3 + 1, 0)
assert str(nfloat(eq, exponent=False, n=1)) == '-0.7*cos(3.0*x**4 + y)'
# issue 10933
for ti in (dict, Dict):
d = ti({S.Half: S.Half})
n = nfloat(d)
assert isinstance(n, ti)
assert _aresame(list(n.items()).pop(), (S.Half, Float(.5)))
for ti in (dict, Dict):
d = ti({S.Half: S.Half})
n = nfloat(d, dkeys=True)
assert isinstance(n, ti)
assert _aresame(list(n.items()).pop(), (Float(.5), Float(.5)))
d = [S.Half]
n = nfloat(d)
assert type(n) is list
assert _aresame(n[0], Float(.5))
assert _aresame(nfloat(Eq(x, S.Half)).rhs, Float(.5))
assert _aresame(nfloat(S(True)), S(True))
assert _aresame(nfloat(Tuple(S.Half))[0], Float(.5))
assert nfloat(Eq((3 - I)**2/2 + I, 0)) == S.false
# pass along kwargs
assert nfloat([{S.Half: x}], dkeys=True) == [{Float(0.5): x}]
# Issue 17706
A = MutableMatrix([[1, 2], [3, 4]])
B = MutableMatrix(
[[Float('1.0', precision=53), Float('2.0', precision=53)],
[Float('3.0', precision=53), Float('4.0', precision=53)]])
assert _aresame(nfloat(A), B)
A = ImmutableMatrix([[1, 2], [3, 4]])
B = ImmutableMatrix(
[[Float('1.0', precision=53), Float('2.0', precision=53)],
[Float('3.0', precision=53), Float('4.0', precision=53)]])
assert _aresame(nfloat(A), B)
def test_issue_7068():
from sympy.abc import a, b
f = Function('f')
y1 = Dummy('y')
y2 = Dummy('y')
func1 = f(a + y1 * b)
func2 = f(a + y2 * b)
func1_y = func1.diff(y1)
func2_y = func2.diff(y2)
assert func1_y != func2_y
z1 = Subs(f(a), a, y1)
z2 = Subs(f(a), a, y2)
assert z1 != z2
def test_issue_7231():
from sympy.abc import a
ans1 = f(x).series(x, a)
res = (f(a) + (-a + x)*Subs(Derivative(f(y), y), y, a) +
(-a + x)**2*Subs(Derivative(f(y), y, y), y, a)/2 +
(-a + x)**3*Subs(Derivative(f(y), y, y, y),
y, a)/6 +
(-a + x)**4*Subs(Derivative(f(y), y, y, y, y),
y, a)/24 +
(-a + x)**5*Subs(Derivative(f(y), y, y, y, y, y),
y, a)/120 + O((-a + x)**6, (x, a)))
assert res == ans1
ans2 = f(x).series(x, a)
assert res == ans2
def test_issue_7687():
from sympy.core.function import Function
from sympy.abc import x
f = Function('f')(x)
ff = Function('f')(x)
match_with_cache = ff.matches(f)
assert isinstance(f, type(ff))
clear_cache()
ff = Function('f')(x)
assert isinstance(f, type(ff))
assert match_with_cache == ff.matches(f)
def test_issue_7688():
from sympy.core.function import Function, UndefinedFunction
f = Function('f') # actually an UndefinedFunction
clear_cache()
class A(UndefinedFunction):
pass
a = A('f')
assert isinstance(a, type(f))
def test_mexpand():
from sympy.abc import x
assert _mexpand(None) is None
assert _mexpand(1) is S.One
assert _mexpand(x*(x + 1)**2) == (x*(x + 1)**2).expand()
def test_issue_8469():
# This should not take forever to run
N = 40
def g(w, theta):
return 1/(1+exp(w-theta))
ws = symbols(['w%i'%i for i in range(N)])
import functools
expr = functools.reduce(g, ws)
assert isinstance(expr, Pow)
def test_issue_12996():
# foo=True imitates the sort of arguments that Derivative can get
# from Integral when it passes doit to the expression
assert Derivative(im(x), x).doit(foo=True) == Derivative(im(x), x)
def test_should_evalf():
# This should not take forever to run (see #8506)
assert isinstance(sin((1.0 + 1.0*I)**10000 + 1), sin)
def test_Derivative_as_finite_difference():
# Central 1st derivative at gridpoint
x, h = symbols('x h', real=True)
dfdx = f(x).diff(x)
assert (dfdx.as_finite_difference([x-2, x-1, x, x+1, x+2]) -
(S.One/12*(f(x-2)-f(x+2)) + Rational(2, 3)*(f(x+1)-f(x-1)))).simplify() == 0
# Central 1st derivative "half-way"
assert (dfdx.as_finite_difference() -
(f(x + S.Half)-f(x - S.Half))).simplify() == 0
assert (dfdx.as_finite_difference(h) -
(f(x + h/S(2))-f(x - h/S(2)))/h).simplify() == 0
assert (dfdx.as_finite_difference([x - 3*h, x-h, x+h, x + 3*h]) -
(S(9)/(8*2*h)*(f(x+h) - f(x-h)) +
S.One/(24*2*h)*(f(x - 3*h) - f(x + 3*h)))).simplify() == 0
# One sided 1st derivative at gridpoint
assert (dfdx.as_finite_difference([0, 1, 2], 0) -
(Rational(-3, 2)*f(0) + 2*f(1) - f(2)/2)).simplify() == 0
assert (dfdx.as_finite_difference([x, x+h], x) -
(f(x+h) - f(x))/h).simplify() == 0
assert (dfdx.as_finite_difference([x-h, x, x+h], x-h) -
(-S(3)/(2*h)*f(x-h) + 2/h*f(x) -
S.One/(2*h)*f(x+h))).simplify() == 0
# One sided 1st derivative "half-way"
assert (dfdx.as_finite_difference([x-h, x+h, x + 3*h, x + 5*h, x + 7*h])
- 1/(2*h)*(-S(11)/(12)*f(x-h) + S(17)/(24)*f(x+h)
+ Rational(3, 8)*f(x + 3*h) - Rational(5, 24)*f(x + 5*h)
+ S.One/24*f(x + 7*h))).simplify() == 0
d2fdx2 = f(x).diff(x, 2)
# Central 2nd derivative at gridpoint
assert (d2fdx2.as_finite_difference([x-h, x, x+h]) -
h**-2 * (f(x-h) + f(x+h) - 2*f(x))).simplify() == 0
assert (d2fdx2.as_finite_difference([x - 2*h, x-h, x, x+h, x + 2*h]) -
h**-2 * (Rational(-1, 12)*(f(x - 2*h) + f(x + 2*h)) +
Rational(4, 3)*(f(x+h) + f(x-h)) - Rational(5, 2)*f(x))).simplify() == 0
# Central 2nd derivative "half-way"
assert (d2fdx2.as_finite_difference([x - 3*h, x-h, x+h, x + 3*h]) -
(2*h)**-2 * (S.Half*(f(x - 3*h) + f(x + 3*h)) -
S.Half*(f(x+h) + f(x-h)))).simplify() == 0
# One sided 2nd derivative at gridpoint
assert (d2fdx2.as_finite_difference([x, x+h, x + 2*h, x + 3*h]) -
h**-2 * (2*f(x) - 5*f(x+h) +
4*f(x+2*h) - f(x+3*h))).simplify() == 0
# One sided 2nd derivative at "half-way"
assert (d2fdx2.as_finite_difference([x-h, x+h, x + 3*h, x + 5*h]) -
(2*h)**-2 * (Rational(3, 2)*f(x-h) - Rational(7, 2)*f(x+h) + Rational(5, 2)*f(x + 3*h) -
S.Half*f(x + 5*h))).simplify() == 0
d3fdx3 = f(x).diff(x, 3)
# Central 3rd derivative at gridpoint
assert (d3fdx3.as_finite_difference() -
(-f(x - Rational(3, 2)) + 3*f(x - S.Half) -
3*f(x + S.Half) + f(x + Rational(3, 2)))).simplify() == 0
assert (d3fdx3.as_finite_difference(
[x - 3*h, x - 2*h, x-h, x, x+h, x + 2*h, x + 3*h]) -
h**-3 * (S.One/8*(f(x - 3*h) - f(x + 3*h)) - f(x - 2*h) +
f(x + 2*h) + Rational(13, 8)*(f(x-h) - f(x+h)))).simplify() == 0
# Central 3rd derivative at "half-way"
assert (d3fdx3.as_finite_difference([x - 3*h, x-h, x+h, x + 3*h]) -
(2*h)**-3 * (f(x + 3*h)-f(x - 3*h) +
3*(f(x-h)-f(x+h)))).simplify() == 0
# One sided 3rd derivative at gridpoint
assert (d3fdx3.as_finite_difference([x, x+h, x + 2*h, x + 3*h]) -
h**-3 * (f(x + 3*h)-f(x) + 3*(f(x+h)-f(x + 2*h)))).simplify() == 0
# One sided 3rd derivative at "half-way"
assert (d3fdx3.as_finite_difference([x-h, x+h, x + 3*h, x + 5*h]) -
(2*h)**-3 * (f(x + 5*h)-f(x-h) +
3*(f(x+h)-f(x + 3*h)))).simplify() == 0
# issue 11007
y = Symbol('y', real=True)
d2fdxdy = f(x, y).diff(x, y)
ref0 = Derivative(f(x + S.Half, y), y) - Derivative(f(x - S.Half, y), y)
assert (d2fdxdy.as_finite_difference(wrt=x) - ref0).simplify() == 0
half = S.Half
xm, xp, ym, yp = x-half, x+half, y-half, y+half
ref2 = f(xm, ym) + f(xp, yp) - f(xp, ym) - f(xm, yp)
assert (d2fdxdy.as_finite_difference() - ref2).simplify() == 0
def test_issue_11159():
# Tests Application._eval_subs
expr1 = E
expr0 = expr1 * expr1
expr1 = expr0.subs(expr1,expr0)
assert expr0 == expr1
def test_issue_12005():
e1 = Subs(Derivative(f(x), x), x, x)
assert e1.diff(x) == Derivative(f(x), x, x)
e2 = Subs(Derivative(f(x), x), x, x**2 + 1)
assert e2.diff(x) == 2*x*Subs(Derivative(f(x), x, x), x, x**2 + 1)
e3 = Subs(Derivative(f(x) + y**2 - y, y), y, y**2)
assert e3.diff(y) == 4*y
e4 = Subs(Derivative(f(x + y), y), y, (x**2))
assert e4.diff(y) is S.Zero
e5 = Subs(Derivative(f(x), x), (y, z), (y, z))
assert e5.diff(x) == Derivative(f(x), x, x)
assert f(g(x)).diff(g(x), g(x)) == Derivative(f(g(x)), g(x), g(x))
def test_issue_13843():
x = symbols('x')
f = Function('f')
m, n = symbols('m n', integer=True)
assert Derivative(Derivative(f(x), (x, m)), (x, n)) == Derivative(f(x), (x, m + n))
assert Derivative(Derivative(f(x), (x, m+5)), (x, n+3)) == Derivative(f(x), (x, m + n + 8))
assert Derivative(f(x), (x, n)).doit() == Derivative(f(x), (x, n))
def test_order_could_be_zero():
x, y = symbols('x, y')
n = symbols('n', integer=True, nonnegative=True)
m = symbols('m', integer=True, positive=True)
assert diff(y, (x, n)) == Piecewise((y, Eq(n, 0)), (0, True))
assert diff(y, (x, n + 1)) is S.Zero
assert diff(y, (x, m)) is S.Zero
def test_undefined_function_eq():
f = Function('f')
f2 = Function('f')
g = Function('g')
f_real = Function('f', is_real=True)
# This test may only be meaningful if the cache is turned off
assert f == f2
assert hash(f) == hash(f2)
assert f == f
assert f != g
assert f != f_real
def test_function_assumptions():
x = Symbol('x')
f = Function('f')
f_real = Function('f', real=True)
f_real1 = Function('f', real=1)
f_real_inherit = Function(Symbol('f', real=True))
assert f_real == f_real1 # assumptions are sanitized
assert f != f_real
assert f(x) != f_real(x)
assert f(x).is_real is None
assert f_real(x).is_real is True
assert f_real_inherit(x).is_real is True and f_real_inherit.name == 'f'
# Can also do it this way, but it won't be equal to f_real because of the
# way UndefinedFunction.__new__ works. Any non-recognized assumptions
# are just added literally as something which is used in the hash
f_real2 = Function('f', is_real=True)
assert f_real2(x).is_real is True
def test_undef_fcn_float_issue_6938():
f = Function('ceil')
assert not f(0.3).is_number
f = Function('sin')
assert not f(0.3).is_number
assert not f(pi).evalf().is_number
x = Symbol('x')
assert not f(x).evalf(subs={x:1.2}).is_number
def test_undefined_function_eval():
# Issue 15170. Make sure UndefinedFunction with eval defined works
# properly. The issue there was that the hash was determined before _nargs
# was set, which is included in the hash, hence changing the hash. The
# class is added to sympy.core.core.all_classes before the hash is
# changed, meaning "temp in all_classes" would fail, causing sympify(temp(t))
# to give a new class. We will eventually remove all_classes, but make
# sure this continues to work.
fdiff = lambda self, argindex=1: cos(self.args[argindex - 1])
eval = classmethod(lambda cls, t: None)
_imp_ = classmethod(lambda cls, t: sin(t))
temp = Function('temp', fdiff=fdiff, eval=eval, _imp_=_imp_)
expr = temp(t)
assert sympify(expr) == expr
assert type(sympify(expr)).fdiff.__name__ == "<lambda>"
assert expr.diff(t) == cos(t)
def test_issue_15241():
F = f(x)
Fx = F.diff(x)
assert (F + x*Fx).diff(x, Fx) == 2
assert (F + x*Fx).diff(Fx, x) == 1
assert (x*F + x*Fx*F).diff(F, x) == x*Fx.diff(x) + Fx + 1
assert (x*F + x*Fx*F).diff(x, F) == x*Fx.diff(x) + Fx + 1
y = f(x)
G = f(y)
Gy = G.diff(y)
assert (G + y*Gy).diff(y, Gy) == 2
assert (G + y*Gy).diff(Gy, y) == 1
assert (y*G + y*Gy*G).diff(G, y) == y*Gy.diff(y) + Gy + 1
assert (y*G + y*Gy*G).diff(y, G) == y*Gy.diff(y) + Gy + 1
def test_issue_15226():
assert Subs(Derivative(f(y), x, y), y, g(x)).doit() != 0
def test_issue_7027():
for wrt in (cos(x), re(x), Derivative(cos(x), x)):
raises(ValueError, lambda: diff(f(x), wrt))
def test_derivative_quick_exit():
assert f(x).diff(y) == 0
assert f(x).diff(y, f(x)) == 0
assert f(x).diff(x, f(y)) == 0
assert f(f(x)).diff(x, f(x), f(y)) == 0
assert f(f(x)).diff(x, f(x), y) == 0
assert f(x).diff(g(x)) == 0
assert f(x).diff(x, f(x).diff(x)) == 1
df = f(x).diff(x)
assert f(x).diff(df) == 0
dg = g(x).diff(x)
assert dg.diff(df).doit() == 0
def test_issue_15084_13166():
eq = f(x, g(x))
assert eq.diff((g(x), y)) == Derivative(f(x, g(x)), (g(x), y))
# issue 13166
assert eq.diff(x, 2).doit() == (
(Derivative(f(x, g(x)), (g(x), 2))*Derivative(g(x), x) +
Subs(Derivative(f(x, _xi_2), _xi_2, x), _xi_2, g(x)))*Derivative(g(x),
x) + Derivative(f(x, g(x)), g(x))*Derivative(g(x), (x, 2)) +
Derivative(g(x), x)*Subs(Derivative(f(_xi_1, g(x)), _xi_1, g(x)),
_xi_1, x) + Subs(Derivative(f(_xi_1, g(x)), (_xi_1, 2)), _xi_1, x))
# issue 6681
assert diff(f(x, t, g(x, t)), x).doit() == (
Derivative(f(x, t, g(x, t)), g(x, t))*Derivative(g(x, t), x) +
Subs(Derivative(f(_xi_1, t, g(x, t)), _xi_1), _xi_1, x))
# make sure the order doesn't matter when using diff
assert eq.diff(x, g(x)) == eq.diff(g(x), x)
def test_negative_counts():
# issue 13873
raises(ValueError, lambda: sin(x).diff(x, -1))
def test_Derivative__new__():
raises(TypeError, lambda: f(x).diff((x, 2), 0))
assert f(x, y).diff([(x, y), 0]) == f(x, y)
assert f(x, y).diff([(x, y), 1]) == NDimArray([
Derivative(f(x, y), x), Derivative(f(x, y), y)])
assert f(x,y).diff(y, (x, z), y, x) == Derivative(
f(x, y), (x, z + 1), (y, 2))
assert Matrix([x]).diff(x, 2) == Matrix([0]) # is_zero exit
def test_issue_14719_10150():
class V(Expr):
_diff_wrt = True
is_scalar = False
assert V().diff(V()) == Derivative(V(), V())
assert (2*V()).diff(V()) == 2*Derivative(V(), V())
class X(Expr):
_diff_wrt = True
assert X().diff(X()) == 1
assert (2*X()).diff(X()) == 2
def test_noncommutative_issue_15131():
x = Symbol('x', commutative=False)
t = Symbol('t', commutative=False)
fx = Function('Fx', commutative=False)(x)
ft = Function('Ft', commutative=False)(t)
A = Symbol('A', commutative=False)
eq = fx * A * ft
eqdt = eq.diff(t)
assert eqdt.args[-1] == ft.diff(t)
def test_Subs_Derivative():
a = Derivative(f(g(x), h(x)), g(x), h(x),x)
b = Derivative(Derivative(f(g(x), h(x)), g(x), h(x)),x)
c = f(g(x), h(x)).diff(g(x), h(x), x)
d = f(g(x), h(x)).diff(g(x), h(x)).diff(x)
e = Derivative(f(g(x), h(x)), x)
eqs = (a, b, c, d, e)
subs = lambda arg: arg.subs(f, Lambda((x, y), exp(x + y))
).subs(g(x), 1/x).subs(h(x), x**3)
ans = 3*x**2*exp(1/x)*exp(x**3) - exp(1/x)*exp(x**3)/x**2
assert all(subs(i).doit().expand() == ans for i in eqs)
assert all(subs(i.doit()).doit().expand() == ans for i in eqs)
def test_issue_15360():
f = Function('f')
assert f.name == 'f'
def test_issue_15947():
assert f._diff_wrt is False
raises(TypeError, lambda: f(f))
raises(TypeError, lambda: f(x).diff(f))
def test_Derivative_free_symbols():
f = Function('f')
n = Symbol('n', integer=True, positive=True)
assert diff(f(x), (x, n)).free_symbols == {n, x}
def test_issue_10503():
f = exp(x**3)*cos(x**6)
assert f.series(x, 0, 14) == 1 + x**3 + x**6/2 + x**9/6 - 11*x**12/24 + O(x**14)
|
880c8b3e54173af19a0d22de6b856eee135fa9f1a62618174cc55fb6f46357e5
|
from sympy.core import (
Basic, Rational, Symbol, S, Float, Integer, Mul, Number, Pow,
Expr, I, nan, pi, symbols, oo, zoo, N)
from sympy.core.tests.test_evalf import NS
from sympy.core.function import expand_multinomial
from sympy.functions.elementary.miscellaneous import sqrt, cbrt
from sympy.functions.elementary.exponential import exp, log
from sympy.functions.special.error_functions import erf
from sympy.functions.elementary.trigonometric import (
sin, cos, tan, sec, csc, sinh, cosh, tanh, atan)
from sympy.polys import Poly
from sympy.series.order import O
from sympy.sets import FiniteSet
from sympy.core.expr import unchanged
from sympy.testing.pytest import warns_deprecated_sympy
def test_rational():
a = Rational(1, 5)
r = sqrt(5)/5
assert sqrt(a) == r
assert 2*sqrt(a) == 2*r
r = a*a**S.Half
assert a**Rational(3, 2) == r
assert 2*a**Rational(3, 2) == 2*r
r = a**5*a**Rational(2, 3)
assert a**Rational(17, 3) == r
assert 2 * a**Rational(17, 3) == 2*r
def test_large_rational():
e = (Rational(123712**12 - 1, 7) + Rational(1, 7))**Rational(1, 3)
assert e == 234232585392159195136 * (Rational(1, 7)**Rational(1, 3))
def test_negative_real():
def feq(a, b):
return abs(a - b) < 1E-10
assert feq(S.One / Float(-0.5), -Integer(2))
def test_expand():
x = Symbol('x')
assert (2**(-1 - x)).expand() == S.Half*2**(-x)
def test_issue_3449():
#test if powers are simplified correctly
#see also issue 3995
x = Symbol('x')
assert ((x**Rational(1, 3))**Rational(2)) == x**Rational(2, 3)
assert (
(x**Rational(3))**Rational(2, 5)) == (x**Rational(3))**Rational(2, 5)
a = Symbol('a', real=True)
b = Symbol('b', real=True)
assert (a**2)**b == (abs(a)**b)**2
assert sqrt(1/a) != 1/sqrt(a) # e.g. for a = -1
assert (a**3)**Rational(1, 3) != a
assert (x**a)**b != x**(a*b) # e.g. x = -1, a=2, b=1/2
assert (x**.5)**b == x**(.5*b)
assert (x**.5)**.5 == x**.25
assert (x**2.5)**.5 != x**1.25 # e.g. for x = 5*I
k = Symbol('k', integer=True)
m = Symbol('m', integer=True)
assert (x**k)**m == x**(k*m)
assert Number(5)**Rational(2, 3) == Number(25)**Rational(1, 3)
assert (x**.5)**2 == x**1.0
assert (x**2)**k == (x**k)**2 == x**(2*k)
a = Symbol('a', positive=True)
assert (a**3)**Rational(2, 5) == a**Rational(6, 5)
assert (a**2)**b == (a**b)**2
assert (a**Rational(2, 3))**x == a**(x*Rational(2, 3)) != (a**x)**Rational(2, 3)
def test_issue_3866():
assert --sqrt(sqrt(5) - 1) == sqrt(sqrt(5) - 1)
def test_negative_one():
x = Symbol('x', complex=True)
y = Symbol('y', complex=True)
assert 1/x**y == x**(-y)
def test_issue_4362():
neg = Symbol('neg', negative=True)
nonneg = Symbol('nonneg', nonnegative=True)
any = Symbol('any')
num, den = sqrt(1/neg).as_numer_denom()
assert num == sqrt(-1)
assert den == sqrt(-neg)
num, den = sqrt(1/nonneg).as_numer_denom()
assert num == 1
assert den == sqrt(nonneg)
num, den = sqrt(1/any).as_numer_denom()
assert num == sqrt(1/any)
assert den == 1
def eqn(num, den, pow):
return (num/den)**pow
npos = 1
nneg = -1
dpos = 2 - sqrt(3)
dneg = 1 - sqrt(3)
assert dpos > 0 and dneg < 0 and npos > 0 and nneg < 0
# pos or neg integer
eq = eqn(npos, dpos, 2)
assert eq.is_Pow and eq.as_numer_denom() == (1, dpos**2)
eq = eqn(npos, dneg, 2)
assert eq.is_Pow and eq.as_numer_denom() == (1, dneg**2)
eq = eqn(nneg, dpos, 2)
assert eq.is_Pow and eq.as_numer_denom() == (1, dpos**2)
eq = eqn(nneg, dneg, 2)
assert eq.is_Pow and eq.as_numer_denom() == (1, dneg**2)
eq = eqn(npos, dpos, -2)
assert eq.is_Pow and eq.as_numer_denom() == (dpos**2, 1)
eq = eqn(npos, dneg, -2)
assert eq.is_Pow and eq.as_numer_denom() == (dneg**2, 1)
eq = eqn(nneg, dpos, -2)
assert eq.is_Pow and eq.as_numer_denom() == (dpos**2, 1)
eq = eqn(nneg, dneg, -2)
assert eq.is_Pow and eq.as_numer_denom() == (dneg**2, 1)
# pos or neg rational
pow = S.Half
eq = eqn(npos, dpos, pow)
assert eq.is_Pow and eq.as_numer_denom() == (npos**pow, dpos**pow)
eq = eqn(npos, dneg, pow)
assert eq.is_Pow is False and eq.as_numer_denom() == ((-npos)**pow, (-dneg)**pow)
eq = eqn(nneg, dpos, pow)
assert not eq.is_Pow or eq.as_numer_denom() == (nneg**pow, dpos**pow)
eq = eqn(nneg, dneg, pow)
assert eq.is_Pow and eq.as_numer_denom() == ((-nneg)**pow, (-dneg)**pow)
eq = eqn(npos, dpos, -pow)
assert eq.is_Pow and eq.as_numer_denom() == (dpos**pow, npos**pow)
eq = eqn(npos, dneg, -pow)
assert eq.is_Pow is False and eq.as_numer_denom() == (-(-npos)**pow*(-dneg)**pow, npos)
eq = eqn(nneg, dpos, -pow)
assert not eq.is_Pow or eq.as_numer_denom() == (dpos**pow, nneg**pow)
eq = eqn(nneg, dneg, -pow)
assert eq.is_Pow and eq.as_numer_denom() == ((-dneg)**pow, (-nneg)**pow)
# unknown exponent
pow = 2*any
eq = eqn(npos, dpos, pow)
assert eq.is_Pow and eq.as_numer_denom() == (npos**pow, dpos**pow)
eq = eqn(npos, dneg, pow)
assert eq.is_Pow and eq.as_numer_denom() == ((-npos)**pow, (-dneg)**pow)
eq = eqn(nneg, dpos, pow)
assert eq.is_Pow and eq.as_numer_denom() == (nneg**pow, dpos**pow)
eq = eqn(nneg, dneg, pow)
assert eq.is_Pow and eq.as_numer_denom() == ((-nneg)**pow, (-dneg)**pow)
eq = eqn(npos, dpos, -pow)
assert eq.as_numer_denom() == (dpos**pow, npos**pow)
eq = eqn(npos, dneg, -pow)
assert eq.is_Pow and eq.as_numer_denom() == ((-dneg)**pow, (-npos)**pow)
eq = eqn(nneg, dpos, -pow)
assert eq.is_Pow and eq.as_numer_denom() == (dpos**pow, nneg**pow)
eq = eqn(nneg, dneg, -pow)
assert eq.is_Pow and eq.as_numer_denom() == ((-dneg)**pow, (-nneg)**pow)
x = Symbol('x')
y = Symbol('y')
assert ((1/(1 + x/3))**(-S.One)).as_numer_denom() == (3 + x, 3)
notp = Symbol('notp', positive=False) # not positive does not imply real
b = ((1 + x/notp)**-2)
assert (b**(-y)).as_numer_denom() == (1, b**y)
assert (b**(-S.One)).as_numer_denom() == ((notp + x)**2, notp**2)
nonp = Symbol('nonp', nonpositive=True)
assert (((1 + x/nonp)**-2)**(-S.One)).as_numer_denom() == ((-nonp -
x)**2, nonp**2)
n = Symbol('n', negative=True)
assert (x**n).as_numer_denom() == (1, x**-n)
assert sqrt(1/n).as_numer_denom() == (S.ImaginaryUnit, sqrt(-n))
n = Symbol('0 or neg', nonpositive=True)
# if x and n are split up without negating each term and n is negative
# then the answer might be wrong; if n is 0 it won't matter since
# 1/oo and 1/zoo are both zero as is sqrt(0)/sqrt(-x) unless x is also
# zero (in which case the negative sign doesn't matter):
# 1/sqrt(1/-1) = -I but sqrt(-1)/sqrt(1) = I
assert (1/sqrt(x/n)).as_numer_denom() == (sqrt(-n), sqrt(-x))
c = Symbol('c', complex=True)
e = sqrt(1/c)
assert e.as_numer_denom() == (e, 1)
i = Symbol('i', integer=True)
assert ((1 + x/y)**i).as_numer_denom() == ((x + y)**i, y**i)
def test_Pow_Expr_args():
x = Symbol('x')
bases = [Basic(), Poly(x, x), FiniteSet(x)]
for base in bases:
with warns_deprecated_sympy():
Pow(base, S.One)
def test_Pow_signs():
"""Cf. issues 4595 and 5250"""
x = Symbol('x')
y = Symbol('y')
n = Symbol('n', even=True)
assert (3 - y)**2 != (y - 3)**2
assert (3 - y)**n != (y - 3)**n
assert (-3 + y - x)**2 != (3 - y + x)**2
assert (y - 3)**3 != -(3 - y)**3
def test_power_with_noncommutative_mul_as_base():
x = Symbol('x', commutative=False)
y = Symbol('y', commutative=False)
assert not (x*y)**3 == x**3*y**3
assert (2*x*y)**3 == 8*(x*y)**3
def test_power_rewrite_exp():
assert (I**I).rewrite(exp) == exp(-pi/2)
expr = (2 + 3*I)**(4 + 5*I)
assert expr.rewrite(exp) == exp((4 + 5*I)*(log(sqrt(13)) + I*atan(Rational(3, 2))))
assert expr.rewrite(exp).expand() == \
169*exp(5*I*log(13)/2)*exp(4*I*atan(Rational(3, 2)))*exp(-5*atan(Rational(3, 2)))
assert ((6 + 7*I)**5).rewrite(exp) == 7225*sqrt(85)*exp(5*I*atan(Rational(7, 6)))
expr = 5**(6 + 7*I)
assert expr.rewrite(exp) == exp((6 + 7*I)*log(5))
assert expr.rewrite(exp).expand() == 15625*exp(7*I*log(5))
assert Pow(123, 789, evaluate=False).rewrite(exp) == 123**789
assert (1**I).rewrite(exp) == 1**I
assert (0**I).rewrite(exp) == 0**I
expr = (-2)**(2 + 5*I)
assert expr.rewrite(exp) == exp((2 + 5*I)*(log(2) + I*pi))
assert expr.rewrite(exp).expand() == 4*exp(-5*pi)*exp(5*I*log(2))
assert ((-2)**S(-5)).rewrite(exp) == (-2)**S(-5)
x, y = symbols('x y')
assert (x**y).rewrite(exp) == exp(y*log(x))
assert (7**x).rewrite(exp) == exp(x*log(7), evaluate=False)
assert ((2 + 3*I)**x).rewrite(exp) == exp(x*(log(sqrt(13)) + I*atan(Rational(3, 2))))
assert (y**(5 + 6*I)).rewrite(exp) == exp(log(y)*(5 + 6*I))
assert all((1/func(x)).rewrite(exp) == 1/(func(x).rewrite(exp)) for func in
(sin, cos, tan, sec, csc, sinh, cosh, tanh))
def test_zero():
x = Symbol('x')
y = Symbol('y')
assert 0**x != 0
assert 0**(2*x) == 0**x
assert 0**(1.0*x) == 0**x
assert 0**(2.0*x) == 0**x
assert (0**(2 - x)).as_base_exp() == (0, 2 - x)
assert 0**(x - 2) != S.Infinity**(2 - x)
assert 0**(2*x*y) == 0**(x*y)
assert 0**(-2*x*y) == S.ComplexInfinity**(x*y)
def test_pow_as_base_exp():
x = Symbol('x')
assert (S.Infinity**(2 - x)).as_base_exp() == (S.Infinity, 2 - x)
assert (S.Infinity**(x - 2)).as_base_exp() == (S.Infinity, x - 2)
p = S.Half**x
assert p.base, p.exp == p.as_base_exp() == (S(2), -x)
# issue 8344:
assert Pow(1, 2, evaluate=False).as_base_exp() == (S.One, S(2))
def test_nseries():
x = Symbol('x')
assert sqrt(I*x - 1)._eval_nseries(x, 4, None, 1) == I + x/2 + I*x**2/8 - x**3/16 + O(x**4)
assert sqrt(I*x - 1)._eval_nseries(x, 4, None, -1) == -I - x/2 - I*x**2/8 + x**3/16 + O(x**4)
assert cbrt(I*x - 1)._eval_nseries(x, 4, None, 1) == (-1)**(S(1)/3) - (-1)**(S(5)/6)*x/3 + \
(-1)**(S(1)/3)*x**2/9 + 5*(-1)**(S(5)/6)*x**3/81 + O(x**4)
assert cbrt(I*x - 1)._eval_nseries(x, 4, None, -1) == (-1)**(S(1)/3)*exp(-2*I*pi/3) - \
(-1)**(S(5)/6)*x*exp(-2*I*pi/3)/3 + (-1)**(S(1)/3)*x**2*exp(-2*I*pi/3)/9 + \
5*(-1)**(S(5)/6)*x**3*exp(-2*I*pi/3)/81 + O(x**4)
def test_issue_6100_12942_4473():
x = Symbol('x')
y = Symbol('y')
assert x**1.0 != x
assert x != x**1.0
assert True != x**1.0
assert x**1.0 is not True
assert x is not True
assert x*y != (x*y)**1.0
# Pow != Symbol
assert (x**1.0)**1.0 != x
assert (x**1.0)**2.0 != x**2
b = Expr()
assert Pow(b, 1.0, evaluate=False) != b
# if the following gets distributed as a Mul (x**1.0*y**1.0 then
# __eq__ methods could be added to Symbol and Pow to detect the
# power-of-1.0 case.
assert ((x*y)**1.0).func is Pow
def test_issue_6208():
from sympy import root, Rational
I = S.ImaginaryUnit
assert sqrt(33**(I*Rational(9, 10))) == -33**(I*Rational(9, 20))
assert root((6*I)**(2*I), 3).as_base_exp()[1] == Rational(1, 3) # != 2*I/3
assert root((6*I)**(I/3), 3).as_base_exp()[1] == I/9
assert sqrt(exp(3*I)) == exp(I*Rational(3, 2))
assert sqrt(-sqrt(3)*(1 + 2*I)) == sqrt(sqrt(3))*sqrt(-1 - 2*I)
assert sqrt(exp(5*I)) == -exp(I*Rational(5, 2))
assert root(exp(5*I), 3).exp == Rational(1, 3)
def test_issue_6990():
x = Symbol('x')
a = Symbol('a')
b = Symbol('b')
assert (sqrt(a + b*x + x**2)).series(x, 0, 3).removeO() == \
sqrt(a)*x**2*(1/(2*a) - b**2/(8*a**2)) + sqrt(a) + b*x/(2*sqrt(a))
def test_issue_6068():
x = Symbol('x')
assert sqrt(sin(x)).series(x, 0, 7) == \
sqrt(x) - x**Rational(5, 2)/12 + x**Rational(9, 2)/1440 - \
x**Rational(13, 2)/24192 + O(x**7)
assert sqrt(sin(x)).series(x, 0, 9) == \
sqrt(x) - x**Rational(5, 2)/12 + x**Rational(9, 2)/1440 - \
x**Rational(13, 2)/24192 - 67*x**Rational(17, 2)/29030400 + O(x**9)
assert sqrt(sin(x**3)).series(x, 0, 19) == \
x**Rational(3, 2) - x**Rational(15, 2)/12 + x**Rational(27, 2)/1440 + O(x**19)
assert sqrt(sin(x**3)).series(x, 0, 20) == \
x**Rational(3, 2) - x**Rational(15, 2)/12 + x**Rational(27, 2)/1440 - \
x**Rational(39, 2)/24192 + O(x**20)
def test_issue_6782():
x = Symbol('x')
assert sqrt(sin(x**3)).series(x, 0, 7) == x**Rational(3, 2) + O(x**7)
assert sqrt(sin(x**4)).series(x, 0, 3) == x**2 + O(x**3)
def test_issue_6653():
x = Symbol('x')
assert (1 / sqrt(1 + sin(x**2))).series(x, 0, 3) == 1 - x**2/2 + O(x**3)
def test_issue_6429():
x = Symbol('x')
c = Symbol('c')
f = (c**2 + x)**(0.5)
assert f.series(x, x0=0, n=1) == (c**2)**0.5 + O(x)
assert f.taylor_term(0, x) == (c**2)**0.5
assert f.taylor_term(1, x) == 0.5*x*(c**2)**(-0.5)
assert f.taylor_term(2, x) == -0.125*x**2*(c**2)**(-1.5)
def test_issue_7638():
f = pi/log(sqrt(2))
assert ((1 + I)**(I*f/2))**0.3 == (1 + I)**(0.15*I*f)
# if 1/3 -> 1.0/3 this should fail since it cannot be shown that the
# sign will be +/-1; for the previous "small arg" case, it didn't matter
# that this could not be proved
assert (1 + I)**(4*I*f) == ((1 + I)**(12*I*f))**Rational(1, 3)
assert (((1 + I)**(I*(1 + 7*f)))**Rational(1, 3)).exp == Rational(1, 3)
r = symbols('r', real=True)
assert sqrt(r**2) == abs(r)
assert cbrt(r**3) != r
assert sqrt(Pow(2*I, 5*S.Half)) != (2*I)**Rational(5, 4)
p = symbols('p', positive=True)
assert cbrt(p**2) == p**Rational(2, 3)
assert NS(((0.2 + 0.7*I)**(0.7 + 1.0*I))**(0.5 - 0.1*I), 1) == '0.4 + 0.2*I'
assert sqrt(1/(1 + I)) == sqrt(1 - I)/sqrt(2) # or 1/sqrt(1 + I)
e = 1/(1 - sqrt(2))
assert sqrt(e) == I/sqrt(-1 + sqrt(2))
assert e**Rational(-1, 2) == -I*sqrt(-1 + sqrt(2))
assert sqrt((cos(1)**2 + sin(1)**2 - 1)**(3 + I)).exp in [S.Half,
Rational(3, 2) + I/2]
assert sqrt(r**Rational(4, 3)) != r**Rational(2, 3)
assert sqrt((p + I)**Rational(4, 3)) == (p + I)**Rational(2, 3)
assert sqrt((p - p**2*I)**2) == p - p**2*I
assert sqrt((p + r*I)**2) != p + r*I
e = (1 + I/5)
assert sqrt(e**5) == e**(5*S.Half)
assert sqrt(e**6) == e**3
assert sqrt((1 + I*r)**6) != (1 + I*r)**3
def test_issue_8582():
assert 1**oo is nan
assert 1**(-oo) is nan
assert 1**zoo is nan
assert 1**(oo + I) is nan
assert 1**(1 + I*oo) is nan
assert 1**(oo + I*oo) is nan
def test_issue_8650():
n = Symbol('n', integer=True, nonnegative=True)
assert (n**n).is_positive is True
x = 5*n + 5
assert (x**(5*(n + 1))).is_positive is True
def test_issue_13914():
b = Symbol('b')
assert (-1)**zoo is nan
assert 2**zoo is nan
assert (S.Half)**(1 + zoo) is nan
assert I**(zoo + I) is nan
assert b**(I + zoo) is nan
def test_better_sqrt():
n = Symbol('n', integer=True, nonnegative=True)
assert sqrt(3 + 4*I) == 2 + I
assert sqrt(3 - 4*I) == 2 - I
assert sqrt(-3 - 4*I) == 1 - 2*I
assert sqrt(-3 + 4*I) == 1 + 2*I
assert sqrt(32 + 24*I) == 6 + 2*I
assert sqrt(32 - 24*I) == 6 - 2*I
assert sqrt(-32 - 24*I) == 2 - 6*I
assert sqrt(-32 + 24*I) == 2 + 6*I
# triple (3, 4, 5):
# parity of 3 matches parity of 5 and
# den, 4, is a square
assert sqrt((3 + 4*I)/4) == 1 + I/2
# triple (8, 15, 17)
# parity of 8 doesn't match parity of 17 but
# den/2, 8/2, is a square
assert sqrt((8 + 15*I)/8) == (5 + 3*I)/4
# handle the denominator
assert sqrt((3 - 4*I)/25) == (2 - I)/5
assert sqrt((3 - 4*I)/26) == (2 - I)/sqrt(26)
# mul
# issue #12739
assert sqrt((3 + 4*I)/(3 - 4*I)) == (3 + 4*I)/5
assert sqrt(2/(3 + 4*I)) == sqrt(2)/5*(2 - I)
assert sqrt(n/(3 + 4*I)).subs(n, 2) == sqrt(2)/5*(2 - I)
assert sqrt(-2/(3 + 4*I)) == sqrt(2)/5*(1 + 2*I)
assert sqrt(-n/(3 + 4*I)).subs(n, 2) == sqrt(2)/5*(1 + 2*I)
# power
assert sqrt(1/(3 + I*4)) == (2 - I)/5
assert sqrt(1/(3 - I)) == sqrt(10)*sqrt(3 + I)/10
# symbolic
i = symbols('i', imaginary=True)
assert sqrt(3/i) == Mul(sqrt(3), 1/sqrt(i), evaluate=False)
# multiples of 1/2; don't make this too automatic
assert sqrt(3 + 4*I)**3 == (2 + I)**3
assert Pow(3 + 4*I, Rational(3, 2)) == 2 + 11*I
assert Pow(6 + 8*I, Rational(3, 2)) == 2*sqrt(2)*(2 + 11*I)
n, d = (3 + 4*I), (3 - 4*I)**3
a = n/d
assert a.args == (1/d, n)
eq = sqrt(a)
assert eq.args == (a, S.Half)
assert expand_multinomial(eq) == sqrt((-117 + 44*I)*(3 + 4*I))/125
assert eq.expand() == (7 - 24*I)/125
# issue 12775
# pos im part
assert sqrt(2*I) == (1 + I)
assert sqrt(2*9*I) == Mul(3, 1 + I, evaluate=False)
assert Pow(2*I, 3*S.Half) == (1 + I)**3
# neg im part
assert sqrt(-I/2) == Mul(S.Half, 1 - I, evaluate=False)
# fractional im part
assert Pow(Rational(-9, 2)*I, Rational(3, 2)) == 27*(1 - I)**3/8
def test_issue_2993():
x = Symbol('x')
assert str((2.3*x - 4)**0.3) == '1.5157165665104*(0.575*x - 1)**0.3'
assert str((2.3*x + 4)**0.3) == '1.5157165665104*(0.575*x + 1)**0.3'
assert str((-2.3*x + 4)**0.3) == '1.5157165665104*(1 - 0.575*x)**0.3'
assert str((-2.3*x - 4)**0.3) == '1.5157165665104*(-0.575*x - 1)**0.3'
assert str((2.3*x - 2)**0.3) == '1.28386201800527*(x - 0.869565217391304)**0.3'
assert str((-2.3*x - 2)**0.3) == '1.28386201800527*(-x - 0.869565217391304)**0.3'
assert str((-2.3*x + 2)**0.3) == '1.28386201800527*(0.869565217391304 - x)**0.3'
assert str((2.3*x + 2)**0.3) == '1.28386201800527*(x + 0.869565217391304)**0.3'
assert str((2.3*x - 4)**Rational(1, 3)) == '2**(2/3)*(0.575*x - 1)**(1/3)'
eq = (2.3*x + 4)
assert eq**2 == 16*(0.575*x + 1)**2
assert (1/eq).args == (eq, -1) # don't change trivial power
# issue 17735
q=.5*exp(x) - .5*exp(-x) + 0.1
assert int((q**2).subs(x, 1)) == 1
# issue 17756
y = Symbol('y')
assert len(sqrt(x/(x + y)**2 + Float('0.008', 30)).subs(y, pi.n(25)).atoms(Float)) == 2
# issue 17756
a, b, c, d, e, f, g = symbols('a:g')
expr = sqrt(1 + a*(c**4 + g*d - 2*g*e - f*(-g + d))**2/
(c**3*b**2*(d - 3*e + 2*f)**2))/2
r = [
(a, N('0.0170992456333788667034850458615', 30)),
(b, N('0.0966594956075474769169134801223', 30)),
(c, N('0.390911862903463913632151616184', 30)),
(d, N('0.152812084558656566271750185933', 30)),
(e, N('0.137562344465103337106561623432', 30)),
(f, N('0.174259178881496659302933610355', 30)),
(g, N('0.220745448491223779615401870086', 30))]
tru = expr.n(30, subs=dict(r))
seq = expr.subs(r)
# although `tru` is the right way to evaluate
# expr with numerical values, `seq` will have
# significant loss of precision if extraction of
# the largest coefficient of a power's base's terms
# is done improperly
assert seq == tru
def test_issue_17450():
assert (erf(cosh(1)**7)**I).is_real is None
assert (erf(cosh(1)**7)**I).is_imaginary is False
assert (Pow(exp(1+sqrt(2)), ((1-sqrt(2))*I*pi), evaluate=False)).is_real is None
assert ((-10)**(10*I*pi/3)).is_real is False
assert ((-5)**(4*I*pi)).is_real is False
def test_issue_18190():
assert sqrt(1 / tan(1 + I)) == 1 / sqrt(tan(1 + I))
def test_issue_14815():
x = Symbol('x', real=True)
assert sqrt(x).is_extended_negative is False
x = Symbol('x', real=False)
assert sqrt(x).is_extended_negative is None
x = Symbol('x', complex=True)
assert sqrt(x).is_extended_negative is False
x = Symbol('x', extended_real=True)
assert sqrt(x).is_extended_negative is False
assert sqrt(zoo, evaluate=False).is_extended_negative is None
assert sqrt(nan, evaluate=False).is_extended_negative is None
def test_issue_18509():
assert unchanged(Mul, oo, 1/pi**oo)
assert (1/pi**oo).is_extended_positive == False
def test_issue_18762():
e, p = symbols('e p')
g0 = sqrt(1 + e**2 - 2*e*cos(p))
assert len(g0.series(e, 1, 3).args) == 4
|
47e1a66ba107b1c5265572f89c999f469bc5dc998f62203aff2fd2df28eb4b97
|
from sympy.testing.pytest import XFAIL, raises, warns_deprecated_sympy
from sympy import (S, Symbol, symbols, nan, oo, I, pi, Float, And, Or,
Not, Implies, Xor, zoo, sqrt, Rational, simplify, Function,
log, cos, sin, Add, Mul, Pow, floor, ceiling, trigsimp, Reals)
from sympy.core.relational import (Relational, Equality, Unequality,
GreaterThan, LessThan, StrictGreaterThan,
StrictLessThan, Rel, Eq, Lt, Le,
Gt, Ge, Ne)
from sympy.sets.sets import Interval, FiniteSet
from itertools import combinations
x, y, z, t = symbols('x,y,z,t')
def rel_check(a, b):
from sympy.testing.pytest import raises
assert a.is_number and b.is_number
for do in range(len({type(a), type(b)})):
if S.NaN in (a, b):
v = [(a == b), (a != b)]
assert len(set(v)) == 1 and v[0] == False
assert not (a != b) and not (a == b)
assert raises(TypeError, lambda: a < b)
assert raises(TypeError, lambda: a <= b)
assert raises(TypeError, lambda: a > b)
assert raises(TypeError, lambda: a >= b)
else:
E = [(a == b), (a != b)]
assert len(set(E)) == 2
v = [
(a < b), (a <= b), (a > b), (a >= b)]
i = [
[True, True, False, False],
[False, True, False, True], # <-- i == 1
[False, False, True, True]].index(v)
if i == 1:
assert E[0] or (a.is_Float != b.is_Float) # ugh
else:
assert E[1]
a, b = b, a
return True
def test_rel_ne():
assert Relational(x, y, '!=') == Ne(x, y)
# issue 6116
p = Symbol('p', positive=True)
assert Ne(p, 0) is S.true
def test_rel_subs():
e = Relational(x, y, '==')
e = e.subs(x, z)
assert isinstance(e, Equality)
assert e.lhs == z
assert e.rhs == y
e = Relational(x, y, '>=')
e = e.subs(x, z)
assert isinstance(e, GreaterThan)
assert e.lhs == z
assert e.rhs == y
e = Relational(x, y, '<=')
e = e.subs(x, z)
assert isinstance(e, LessThan)
assert e.lhs == z
assert e.rhs == y
e = Relational(x, y, '>')
e = e.subs(x, z)
assert isinstance(e, StrictGreaterThan)
assert e.lhs == z
assert e.rhs == y
e = Relational(x, y, '<')
e = e.subs(x, z)
assert isinstance(e, StrictLessThan)
assert e.lhs == z
assert e.rhs == y
e = Eq(x, 0)
assert e.subs(x, 0) is S.true
assert e.subs(x, 1) is S.false
def test_wrappers():
e = x + x**2
res = Relational(y, e, '==')
assert Rel(y, x + x**2, '==') == res
assert Eq(y, x + x**2) == res
res = Relational(y, e, '<')
assert Lt(y, x + x**2) == res
res = Relational(y, e, '<=')
assert Le(y, x + x**2) == res
res = Relational(y, e, '>')
assert Gt(y, x + x**2) == res
res = Relational(y, e, '>=')
assert Ge(y, x + x**2) == res
res = Relational(y, e, '!=')
assert Ne(y, x + x**2) == res
def test_Eq_Ne():
assert Eq(x, x) # issue 5719
with warns_deprecated_sympy():
assert Eq(x) == Eq(x, 0)
# issue 6116
p = Symbol('p', positive=True)
assert Eq(p, 0) is S.false
# issue 13348; 19048
# SymPy is strict about 0 and 1 not being
# interpreted as Booleans
assert Eq(True, 1) is S.false
assert Eq(False, 0) is S.false
assert Eq(~x, 0) is S.false
assert Eq(~x, 1) is S.false
assert Ne(True, 1) is S.true
assert Ne(False, 0) is S.true
assert Ne(~x, 0) is S.true
assert Ne(~x, 1) is S.true
assert Eq((), 1) is S.false
assert Ne((), 1) is S.true
def test_as_poly():
from sympy.polys.polytools import Poly
# Only Eq should have an as_poly method:
assert Eq(x, 1).as_poly() == Poly(x - 1, x, domain='ZZ')
raises(AttributeError, lambda: Ne(x, 1).as_poly())
raises(AttributeError, lambda: Ge(x, 1).as_poly())
raises(AttributeError, lambda: Gt(x, 1).as_poly())
raises(AttributeError, lambda: Le(x, 1).as_poly())
raises(AttributeError, lambda: Lt(x, 1).as_poly())
def test_rel_Infinity():
# NOTE: All of these are actually handled by sympy.core.Number, and do
# not create Relational objects.
assert (oo > oo) is S.false
assert (oo > -oo) is S.true
assert (oo > 1) is S.true
assert (oo < oo) is S.false
assert (oo < -oo) is S.false
assert (oo < 1) is S.false
assert (oo >= oo) is S.true
assert (oo >= -oo) is S.true
assert (oo >= 1) is S.true
assert (oo <= oo) is S.true
assert (oo <= -oo) is S.false
assert (oo <= 1) is S.false
assert (-oo > oo) is S.false
assert (-oo > -oo) is S.false
assert (-oo > 1) is S.false
assert (-oo < oo) is S.true
assert (-oo < -oo) is S.false
assert (-oo < 1) is S.true
assert (-oo >= oo) is S.false
assert (-oo >= -oo) is S.true
assert (-oo >= 1) is S.false
assert (-oo <= oo) is S.true
assert (-oo <= -oo) is S.true
assert (-oo <= 1) is S.true
def test_infinite_symbol_inequalities():
x = Symbol('x', extended_positive=True, infinite=True)
y = Symbol('y', extended_positive=True, infinite=True)
z = Symbol('z', extended_negative=True, infinite=True)
w = Symbol('w', extended_negative=True, infinite=True)
inf_set = (x, y, oo)
ninf_set = (z, w, -oo)
for inf1 in inf_set:
assert (inf1 < 1) is S.false
assert (inf1 > 1) is S.true
assert (inf1 <= 1) is S.false
assert (inf1 >= 1) is S.true
for inf2 in inf_set:
assert (inf1 < inf2) is S.false
assert (inf1 > inf2) is S.false
assert (inf1 <= inf2) is S.true
assert (inf1 >= inf2) is S.true
for ninf1 in ninf_set:
assert (inf1 < ninf1) is S.false
assert (inf1 > ninf1) is S.true
assert (inf1 <= ninf1) is S.false
assert (inf1 >= ninf1) is S.true
assert (ninf1 < inf1) is S.true
assert (ninf1 > inf1) is S.false
assert (ninf1 <= inf1) is S.true
assert (ninf1 >= inf1) is S.false
for ninf1 in ninf_set:
assert (ninf1 < 1) is S.true
assert (ninf1 > 1) is S.false
assert (ninf1 <= 1) is S.true
assert (ninf1 >= 1) is S.false
for ninf2 in ninf_set:
assert (ninf1 < ninf2) is S.false
assert (ninf1 > ninf2) is S.false
assert (ninf1 <= ninf2) is S.true
assert (ninf1 >= ninf2) is S.true
def test_bool():
assert Eq(0, 0) is S.true
assert Eq(1, 0) is S.false
assert Ne(0, 0) is S.false
assert Ne(1, 0) is S.true
assert Lt(0, 1) is S.true
assert Lt(1, 0) is S.false
assert Le(0, 1) is S.true
assert Le(1, 0) is S.false
assert Le(0, 0) is S.true
assert Gt(1, 0) is S.true
assert Gt(0, 1) is S.false
assert Ge(1, 0) is S.true
assert Ge(0, 1) is S.false
assert Ge(1, 1) is S.true
assert Eq(I, 2) is S.false
assert Ne(I, 2) is S.true
raises(TypeError, lambda: Gt(I, 2))
raises(TypeError, lambda: Ge(I, 2))
raises(TypeError, lambda: Lt(I, 2))
raises(TypeError, lambda: Le(I, 2))
a = Float('.000000000000000000001', '')
b = Float('.0000000000000000000001', '')
assert Eq(pi + a, pi + b) is S.false
def test_rich_cmp():
assert (x < y) == Lt(x, y)
assert (x <= y) == Le(x, y)
assert (x > y) == Gt(x, y)
assert (x >= y) == Ge(x, y)
def test_doit():
from sympy import Symbol
p = Symbol('p', positive=True)
n = Symbol('n', negative=True)
np = Symbol('np', nonpositive=True)
nn = Symbol('nn', nonnegative=True)
assert Gt(p, 0).doit() is S.true
assert Gt(p, 1).doit() == Gt(p, 1)
assert Ge(p, 0).doit() is S.true
assert Le(p, 0).doit() is S.false
assert Lt(n, 0).doit() is S.true
assert Le(np, 0).doit() is S.true
assert Gt(nn, 0).doit() == Gt(nn, 0)
assert Lt(nn, 0).doit() is S.false
assert Eq(x, 0).doit() == Eq(x, 0)
def test_new_relational():
x = Symbol('x')
assert Eq(x, 0) == Relational(x, 0) # None ==> Equality
assert Eq(x, 0) == Relational(x, 0, '==')
assert Eq(x, 0) == Relational(x, 0, 'eq')
assert Eq(x, 0) == Equality(x, 0)
assert Eq(x, 0) != Relational(x, 1) # None ==> Equality
assert Eq(x, 0) != Relational(x, 1, '==')
assert Eq(x, 0) != Relational(x, 1, 'eq')
assert Eq(x, 0) != Equality(x, 1)
assert Eq(x, -1) == Relational(x, -1) # None ==> Equality
assert Eq(x, -1) == Relational(x, -1, '==')
assert Eq(x, -1) == Relational(x, -1, 'eq')
assert Eq(x, -1) == Equality(x, -1)
assert Eq(x, -1) != Relational(x, 1) # None ==> Equality
assert Eq(x, -1) != Relational(x, 1, '==')
assert Eq(x, -1) != Relational(x, 1, 'eq')
assert Eq(x, -1) != Equality(x, 1)
assert Ne(x, 0) == Relational(x, 0, '!=')
assert Ne(x, 0) == Relational(x, 0, '<>')
assert Ne(x, 0) == Relational(x, 0, 'ne')
assert Ne(x, 0) == Unequality(x, 0)
assert Ne(x, 0) != Relational(x, 1, '!=')
assert Ne(x, 0) != Relational(x, 1, '<>')
assert Ne(x, 0) != Relational(x, 1, 'ne')
assert Ne(x, 0) != Unequality(x, 1)
assert Ge(x, 0) == Relational(x, 0, '>=')
assert Ge(x, 0) == Relational(x, 0, 'ge')
assert Ge(x, 0) == GreaterThan(x, 0)
assert Ge(x, 1) != Relational(x, 0, '>=')
assert Ge(x, 1) != Relational(x, 0, 'ge')
assert Ge(x, 1) != GreaterThan(x, 0)
assert (x >= 1) == Relational(x, 1, '>=')
assert (x >= 1) == Relational(x, 1, 'ge')
assert (x >= 1) == GreaterThan(x, 1)
assert (x >= 0) != Relational(x, 1, '>=')
assert (x >= 0) != Relational(x, 1, 'ge')
assert (x >= 0) != GreaterThan(x, 1)
assert Le(x, 0) == Relational(x, 0, '<=')
assert Le(x, 0) == Relational(x, 0, 'le')
assert Le(x, 0) == LessThan(x, 0)
assert Le(x, 1) != Relational(x, 0, '<=')
assert Le(x, 1) != Relational(x, 0, 'le')
assert Le(x, 1) != LessThan(x, 0)
assert (x <= 1) == Relational(x, 1, '<=')
assert (x <= 1) == Relational(x, 1, 'le')
assert (x <= 1) == LessThan(x, 1)
assert (x <= 0) != Relational(x, 1, '<=')
assert (x <= 0) != Relational(x, 1, 'le')
assert (x <= 0) != LessThan(x, 1)
assert Gt(x, 0) == Relational(x, 0, '>')
assert Gt(x, 0) == Relational(x, 0, 'gt')
assert Gt(x, 0) == StrictGreaterThan(x, 0)
assert Gt(x, 1) != Relational(x, 0, '>')
assert Gt(x, 1) != Relational(x, 0, 'gt')
assert Gt(x, 1) != StrictGreaterThan(x, 0)
assert (x > 1) == Relational(x, 1, '>')
assert (x > 1) == Relational(x, 1, 'gt')
assert (x > 1) == StrictGreaterThan(x, 1)
assert (x > 0) != Relational(x, 1, '>')
assert (x > 0) != Relational(x, 1, 'gt')
assert (x > 0) != StrictGreaterThan(x, 1)
assert Lt(x, 0) == Relational(x, 0, '<')
assert Lt(x, 0) == Relational(x, 0, 'lt')
assert Lt(x, 0) == StrictLessThan(x, 0)
assert Lt(x, 1) != Relational(x, 0, '<')
assert Lt(x, 1) != Relational(x, 0, 'lt')
assert Lt(x, 1) != StrictLessThan(x, 0)
assert (x < 1) == Relational(x, 1, '<')
assert (x < 1) == Relational(x, 1, 'lt')
assert (x < 1) == StrictLessThan(x, 1)
assert (x < 0) != Relational(x, 1, '<')
assert (x < 0) != Relational(x, 1, 'lt')
assert (x < 0) != StrictLessThan(x, 1)
# finally, some fuzz testing
from random import randint
for i in range(100):
while 1:
strtype, length = (chr, 65535) if randint(0, 1) else (chr, 255)
relation_type = strtype(randint(0, length))
if randint(0, 1):
relation_type += strtype(randint(0, length))
if relation_type not in ('==', 'eq', '!=', '<>', 'ne', '>=', 'ge',
'<=', 'le', '>', 'gt', '<', 'lt', ':=',
'+=', '-=', '*=', '/=', '%='):
break
raises(ValueError, lambda: Relational(x, 1, relation_type))
assert all(Relational(x, 0, op).rel_op == '==' for op in ('eq', '=='))
assert all(Relational(x, 0, op).rel_op == '!='
for op in ('ne', '<>', '!='))
assert all(Relational(x, 0, op).rel_op == '>' for op in ('gt', '>'))
assert all(Relational(x, 0, op).rel_op == '<' for op in ('lt', '<'))
assert all(Relational(x, 0, op).rel_op == '>=' for op in ('ge', '>='))
assert all(Relational(x, 0, op).rel_op == '<=' for op in ('le', '<='))
def test_relational_arithmetic():
for cls in [Eq, Ne, Le, Lt, Ge, Gt]:
rel = cls(x, y)
raises(TypeError, lambda: 0+rel)
raises(TypeError, lambda: 1*rel)
raises(TypeError, lambda: 1**rel)
raises(TypeError, lambda: rel**1)
raises(TypeError, lambda: Add(0, rel))
raises(TypeError, lambda: Mul(1, rel))
raises(TypeError, lambda: Pow(1, rel))
raises(TypeError, lambda: Pow(rel, 1))
def test_relational_bool_output():
# https://github.com/sympy/sympy/issues/5931
raises(TypeError, lambda: bool(x > 3))
raises(TypeError, lambda: bool(x >= 3))
raises(TypeError, lambda: bool(x < 3))
raises(TypeError, lambda: bool(x <= 3))
raises(TypeError, lambda: bool(Eq(x, 3)))
raises(TypeError, lambda: bool(Ne(x, 3)))
def test_relational_logic_symbols():
# See issue 6204
assert (x < y) & (z < t) == And(x < y, z < t)
assert (x < y) | (z < t) == Or(x < y, z < t)
assert ~(x < y) == Not(x < y)
assert (x < y) >> (z < t) == Implies(x < y, z < t)
assert (x < y) << (z < t) == Implies(z < t, x < y)
assert (x < y) ^ (z < t) == Xor(x < y, z < t)
assert isinstance((x < y) & (z < t), And)
assert isinstance((x < y) | (z < t), Or)
assert isinstance(~(x < y), GreaterThan)
assert isinstance((x < y) >> (z < t), Implies)
assert isinstance((x < y) << (z < t), Implies)
assert isinstance((x < y) ^ (z < t), (Or, Xor))
def test_univariate_relational_as_set():
assert (x > 0).as_set() == Interval(0, oo, True, True)
assert (x >= 0).as_set() == Interval(0, oo)
assert (x < 0).as_set() == Interval(-oo, 0, True, True)
assert (x <= 0).as_set() == Interval(-oo, 0)
assert Eq(x, 0).as_set() == FiniteSet(0)
assert Ne(x, 0).as_set() == Interval(-oo, 0, True, True) + \
Interval(0, oo, True, True)
assert (x**2 >= 4).as_set() == Interval(-oo, -2) + Interval(2, oo)
@XFAIL
def test_multivariate_relational_as_set():
assert (x*y >= 0).as_set() == Interval(0, oo)*Interval(0, oo) + \
Interval(-oo, 0)*Interval(-oo, 0)
def test_Not():
assert Not(Equality(x, y)) == Unequality(x, y)
assert Not(Unequality(x, y)) == Equality(x, y)
assert Not(StrictGreaterThan(x, y)) == LessThan(x, y)
assert Not(StrictLessThan(x, y)) == GreaterThan(x, y)
assert Not(GreaterThan(x, y)) == StrictLessThan(x, y)
assert Not(LessThan(x, y)) == StrictGreaterThan(x, y)
def test_evaluate():
assert str(Eq(x, x, evaluate=False)) == 'Eq(x, x)'
assert Eq(x, x, evaluate=False).doit() == S.true
assert str(Ne(x, x, evaluate=False)) == 'Ne(x, x)'
assert Ne(x, x, evaluate=False).doit() == S.false
assert str(Ge(x, x, evaluate=False)) == 'x >= x'
assert str(Le(x, x, evaluate=False)) == 'x <= x'
assert str(Gt(x, x, evaluate=False)) == 'x > x'
assert str(Lt(x, x, evaluate=False)) == 'x < x'
def assert_all_ineq_raise_TypeError(a, b):
raises(TypeError, lambda: a > b)
raises(TypeError, lambda: a >= b)
raises(TypeError, lambda: a < b)
raises(TypeError, lambda: a <= b)
raises(TypeError, lambda: b > a)
raises(TypeError, lambda: b >= a)
raises(TypeError, lambda: b < a)
raises(TypeError, lambda: b <= a)
def assert_all_ineq_give_class_Inequality(a, b):
"""All inequality operations on `a` and `b` result in class Inequality."""
from sympy.core.relational import _Inequality as Inequality
assert isinstance(a > b, Inequality)
assert isinstance(a >= b, Inequality)
assert isinstance(a < b, Inequality)
assert isinstance(a <= b, Inequality)
assert isinstance(b > a, Inequality)
assert isinstance(b >= a, Inequality)
assert isinstance(b < a, Inequality)
assert isinstance(b <= a, Inequality)
def test_imaginary_compare_raises_TypeError():
# See issue #5724
assert_all_ineq_raise_TypeError(I, x)
def test_complex_compare_not_real():
# two cases which are not real
y = Symbol('y', imaginary=True)
z = Symbol('z', complex=True, extended_real=False)
for w in (y, z):
assert_all_ineq_raise_TypeError(2, w)
# some cases which should remain un-evaluated
t = Symbol('t')
x = Symbol('x', real=True)
z = Symbol('z', complex=True)
for w in (x, z, t):
assert_all_ineq_give_class_Inequality(2, w)
def test_imaginary_and_inf_compare_raises_TypeError():
# See pull request #7835
y = Symbol('y', imaginary=True)
assert_all_ineq_raise_TypeError(oo, y)
assert_all_ineq_raise_TypeError(-oo, y)
def test_complex_pure_imag_not_ordered():
raises(TypeError, lambda: 2*I < 3*I)
# more generally
x = Symbol('x', real=True, nonzero=True)
y = Symbol('y', imaginary=True)
z = Symbol('z', complex=True)
assert_all_ineq_raise_TypeError(I, y)
t = I*x # an imaginary number, should raise errors
assert_all_ineq_raise_TypeError(2, t)
t = -I*y # a real number, so no errors
assert_all_ineq_give_class_Inequality(2, t)
t = I*z # unknown, should be unevaluated
assert_all_ineq_give_class_Inequality(2, t)
def test_x_minus_y_not_same_as_x_lt_y():
"""
A consequence of pull request #7792 is that `x - y < 0` and `x < y`
are not synonymous.
"""
x = I + 2
y = I + 3
raises(TypeError, lambda: x < y)
assert x - y < 0
ineq = Lt(x, y, evaluate=False)
raises(TypeError, lambda: ineq.doit())
assert ineq.lhs - ineq.rhs < 0
t = Symbol('t', imaginary=True)
x = 2 + t
y = 3 + t
ineq = Lt(x, y, evaluate=False)
raises(TypeError, lambda: ineq.doit())
assert ineq.lhs - ineq.rhs < 0
# this one should give error either way
x = I + 2
y = 2*I + 3
raises(TypeError, lambda: x < y)
raises(TypeError, lambda: x - y < 0)
def test_nan_equality_exceptions():
# See issue #7774
import random
assert Equality(nan, nan) is S.false
assert Unequality(nan, nan) is S.true
# See issue #7773
A = (x, S.Zero, S.One/3, pi, oo, -oo)
assert Equality(nan, random.choice(A)) is S.false
assert Equality(random.choice(A), nan) is S.false
assert Unequality(nan, random.choice(A)) is S.true
assert Unequality(random.choice(A), nan) is S.true
def test_nan_inequality_raise_errors():
# See discussion in pull request #7776. We test inequalities with
# a set including examples of various classes.
for q in (x, S.Zero, S(10), S.One/3, pi, S(1.3), oo, -oo, nan):
assert_all_ineq_raise_TypeError(q, nan)
def test_nan_complex_inequalities():
# Comparisons of NaN with non-real raise errors, we're not too
# fussy whether its the NaN error or complex error.
for r in (I, zoo, Symbol('z', imaginary=True)):
assert_all_ineq_raise_TypeError(r, nan)
def test_complex_infinity_inequalities():
raises(TypeError, lambda: zoo > 0)
raises(TypeError, lambda: zoo >= 0)
raises(TypeError, lambda: zoo < 0)
raises(TypeError, lambda: zoo <= 0)
def test_inequalities_symbol_name_same():
"""Using the operator and functional forms should give same results."""
# We test all combinations from a set
# FIXME: could replace with random selection after test passes
A = (x, y, S.Zero, S.One/3, pi, oo, -oo)
for a in A:
for b in A:
assert Gt(a, b) == (a > b)
assert Lt(a, b) == (a < b)
assert Ge(a, b) == (a >= b)
assert Le(a, b) == (a <= b)
for b in (y, S.Zero, S.One/3, pi, oo, -oo):
assert Gt(x, b, evaluate=False) == (x > b)
assert Lt(x, b, evaluate=False) == (x < b)
assert Ge(x, b, evaluate=False) == (x >= b)
assert Le(x, b, evaluate=False) == (x <= b)
for b in (y, S.Zero, S.One/3, pi, oo, -oo):
assert Gt(b, x, evaluate=False) == (b > x)
assert Lt(b, x, evaluate=False) == (b < x)
assert Ge(b, x, evaluate=False) == (b >= x)
assert Le(b, x, evaluate=False) == (b <= x)
def test_inequalities_symbol_name_same_complex():
"""Using the operator and functional forms should give same results.
With complex non-real numbers, both should raise errors.
"""
# FIXME: could replace with random selection after test passes
for a in (x, S.Zero, S.One/3, pi, oo, Rational(1, 3)):
raises(TypeError, lambda: Gt(a, I))
raises(TypeError, lambda: a > I)
raises(TypeError, lambda: Lt(a, I))
raises(TypeError, lambda: a < I)
raises(TypeError, lambda: Ge(a, I))
raises(TypeError, lambda: a >= I)
raises(TypeError, lambda: Le(a, I))
raises(TypeError, lambda: a <= I)
def test_inequalities_cant_sympify_other():
# see issue 7833
from operator import gt, lt, ge, le
bar = "foo"
for a in (x, S.Zero, S.One/3, pi, I, zoo, oo, -oo, nan, Rational(1, 3)):
for op in (lt, gt, le, ge):
raises(TypeError, lambda: op(a, bar))
def test_ineq_avoid_wild_symbol_flip():
# see issue #7951, we try to avoid this internally, e.g., by using
# __lt__ instead of "<".
from sympy.core.symbol import Wild
p = symbols('p', cls=Wild)
# x > p might flip, but Gt should not:
assert Gt(x, p) == Gt(x, p, evaluate=False)
# Previously failed as 'p > x':
e = Lt(x, y).subs({y: p})
assert e == Lt(x, p, evaluate=False)
# Previously failed as 'p <= x':
e = Ge(x, p).doit()
assert e == Ge(x, p, evaluate=False)
def test_issue_8245():
a = S("6506833320952669167898688709329/5070602400912917605986812821504")
assert rel_check(a, a.n(10))
assert rel_check(a, a.n(20))
assert rel_check(a, a.n())
# prec of 30 is enough to fully capture a as mpf
assert Float(a, 30) == Float(str(a.p), '')/Float(str(a.q), '')
for i in range(31):
r = Rational(Float(a, i))
f = Float(r)
assert (f < a) == (Rational(f) < a)
# test sign handling
assert (-f < -a) == (Rational(-f) < -a)
# test equivalence handling
isa = Float(a.p,'')/Float(a.q,'')
assert isa <= a
assert not isa < a
assert isa >= a
assert not isa > a
assert isa > 0
a = sqrt(2)
r = Rational(str(a.n(30)))
assert rel_check(a, r)
a = sqrt(2)
r = Rational(str(a.n(29)))
assert rel_check(a, r)
assert Eq(log(cos(2)**2 + sin(2)**2), 0) == True
def test_issue_8449():
p = Symbol('p', nonnegative=True)
assert Lt(-oo, p)
assert Ge(-oo, p) is S.false
assert Gt(oo, -p)
assert Le(oo, -p) is S.false
def test_simplify_relational():
assert simplify(x*(y + 1) - x*y - x + 1 < x) == (x > 1)
assert simplify(x*(y + 1) - x*y - x - 1 < x) == (x > -1)
assert simplify(x < x*(y + 1) - x*y - x + 1) == (x < 1)
q, r = symbols("q r")
assert (((-q + r) - (q - r)) <= 0).simplify() == (q >= r)
root2 = sqrt(2)
equation = ((root2 * (-q + r) - root2 * (q - r)) <= 0).simplify()
assert equation == (q >= r)
r = S.One < x
# canonical operations are not the same as simplification,
# so if there is no simplification, canonicalization will
# be done unless the measure forbids it
assert simplify(r) == r.canonical
assert simplify(r, ratio=0) != r.canonical
# this is not a random test; in _eval_simplify
# this will simplify to S.false and that is the
# reason for the 'if r.is_Relational' in Relational's
# _eval_simplify routine
assert simplify(-(2**(pi*Rational(3, 2)) + 6**pi)**(1/pi) +
2*(2**(pi/2) + 3**pi)**(1/pi) < 0) is S.false
# canonical at least
assert Eq(y, x).simplify() == Eq(x, y)
assert Eq(x - 1, 0).simplify() == Eq(x, 1)
assert Eq(x - 1, x).simplify() == S.false
assert Eq(2*x - 1, x).simplify() == Eq(x, 1)
assert Eq(2*x, 4).simplify() == Eq(x, 2)
z = cos(1)**2 + sin(1)**2 - 1 # z.is_zero is None
assert Eq(z*x, 0).simplify() == S.true
assert Ne(y, x).simplify() == Ne(x, y)
assert Ne(x - 1, 0).simplify() == Ne(x, 1)
assert Ne(x - 1, x).simplify() == S.true
assert Ne(2*x - 1, x).simplify() == Ne(x, 1)
assert Ne(2*x, 4).simplify() == Ne(x, 2)
assert Ne(z*x, 0).simplify() == S.false
# No real-valued assumptions
assert Ge(y, x).simplify() == Le(x, y)
assert Ge(x - 1, 0).simplify() == Ge(x, 1)
assert Ge(x - 1, x).simplify() == S.false
assert Ge(2*x - 1, x).simplify() == Ge(x, 1)
assert Ge(2*x, 4).simplify() == Ge(x, 2)
assert Ge(z*x, 0).simplify() == S.true
assert Ge(x, -2).simplify() == Ge(x, -2)
assert Ge(-x, -2).simplify() == Le(x, 2)
assert Ge(x, 2).simplify() == Ge(x, 2)
assert Ge(-x, 2).simplify() == Le(x, -2)
assert Le(y, x).simplify() == Ge(x, y)
assert Le(x - 1, 0).simplify() == Le(x, 1)
assert Le(x - 1, x).simplify() == S.true
assert Le(2*x - 1, x).simplify() == Le(x, 1)
assert Le(2*x, 4).simplify() == Le(x, 2)
assert Le(z*x, 0).simplify() == S.true
assert Le(x, -2).simplify() == Le(x, -2)
assert Le(-x, -2).simplify() == Ge(x, 2)
assert Le(x, 2).simplify() == Le(x, 2)
assert Le(-x, 2).simplify() == Ge(x, -2)
assert Gt(y, x).simplify() == Lt(x, y)
assert Gt(x - 1, 0).simplify() == Gt(x, 1)
assert Gt(x - 1, x).simplify() == S.false
assert Gt(2*x - 1, x).simplify() == Gt(x, 1)
assert Gt(2*x, 4).simplify() == Gt(x, 2)
assert Gt(z*x, 0).simplify() == S.false
assert Gt(x, -2).simplify() == Gt(x, -2)
assert Gt(-x, -2).simplify() == Lt(x, 2)
assert Gt(x, 2).simplify() == Gt(x, 2)
assert Gt(-x, 2).simplify() == Lt(x, -2)
assert Lt(y, x).simplify() == Gt(x, y)
assert Lt(x - 1, 0).simplify() == Lt(x, 1)
assert Lt(x - 1, x).simplify() == S.true
assert Lt(2*x - 1, x).simplify() == Lt(x, 1)
assert Lt(2*x, 4).simplify() == Lt(x, 2)
assert Lt(z*x, 0).simplify() == S.false
assert Lt(x, -2).simplify() == Lt(x, -2)
assert Lt(-x, -2).simplify() == Gt(x, 2)
assert Lt(x, 2).simplify() == Lt(x, 2)
assert Lt(-x, 2).simplify() == Gt(x, -2)
def test_equals():
w, x, y, z = symbols('w:z')
f = Function('f')
assert Eq(x, 1).equals(Eq(x*(y + 1) - x*y - x + 1, x))
assert Eq(x, y).equals(x < y, True) == False
assert Eq(x, f(1)).equals(Eq(x, f(2)), True) == f(1) - f(2)
assert Eq(f(1), y).equals(Eq(f(2), y), True) == f(1) - f(2)
assert Eq(x, f(1)).equals(Eq(f(2), x), True) == f(1) - f(2)
assert Eq(f(1), x).equals(Eq(x, f(2)), True) == f(1) - f(2)
assert Eq(w, x).equals(Eq(y, z), True) == False
assert Eq(f(1), f(2)).equals(Eq(f(3), f(4)), True) == f(1) - f(3)
assert (x < y).equals(y > x, True) == True
assert (x < y).equals(y >= x, True) == False
assert (x < y).equals(z < y, True) == False
assert (x < y).equals(x < z, True) == False
assert (x < f(1)).equals(x < f(2), True) == f(1) - f(2)
assert (f(1) < x).equals(f(2) < x, True) == f(1) - f(2)
def test_reversed():
assert (x < y).reversed == (y > x)
assert (x <= y).reversed == (y >= x)
assert Eq(x, y, evaluate=False).reversed == Eq(y, x, evaluate=False)
assert Ne(x, y, evaluate=False).reversed == Ne(y, x, evaluate=False)
assert (x >= y).reversed == (y <= x)
assert (x > y).reversed == (y < x)
def test_canonical():
c = [i.canonical for i in (
x + y < z,
x + 2 > 3,
x < 2,
S(2) > x,
x**2 > -x/y,
Gt(3, 2, evaluate=False)
)]
assert [i.canonical for i in c] == c
assert [i.reversed.canonical for i in c] == c
assert not any(i.lhs.is_Number and not i.rhs.is_Number for i in c)
c = [i.reversed.func(i.rhs, i.lhs, evaluate=False).canonical for i in c]
assert [i.canonical for i in c] == c
assert [i.reversed.canonical for i in c] == c
assert not any(i.lhs.is_Number and not i.rhs.is_Number for i in c)
@XFAIL
def test_issue_8444_nonworkingtests():
x = symbols('x', real=True)
assert (x <= oo) == (x >= -oo) == True
x = symbols('x')
assert x >= floor(x)
assert (x < floor(x)) == False
assert x <= ceiling(x)
assert (x > ceiling(x)) == False
def test_issue_8444_workingtests():
x = symbols('x')
assert Gt(x, floor(x)) == Gt(x, floor(x), evaluate=False)
assert Ge(x, floor(x)) == Ge(x, floor(x), evaluate=False)
assert Lt(x, ceiling(x)) == Lt(x, ceiling(x), evaluate=False)
assert Le(x, ceiling(x)) == Le(x, ceiling(x), evaluate=False)
i = symbols('i', integer=True)
assert (i > floor(i)) == False
assert (i < ceiling(i)) == False
def test_issue_10304():
d = cos(1)**2 + sin(1)**2 - 1
assert d.is_comparable is False # if this fails, find a new d
e = 1 + d*I
assert simplify(Eq(e, 0)) is S.false
def test_issue_18412():
d = (Rational(1, 6) + z / 4 / y)
assert Eq(x, pi * y**3 * d).replace(y**3, z) == Eq(x, pi * z * d)
def test_issue_10401():
x = symbols('x')
fin = symbols('inf', finite=True)
inf = symbols('inf', infinite=True)
inf2 = symbols('inf2', infinite=True)
infx = symbols('infx', infinite=True, extended_real=True)
# Used in the commented tests below:
#infx2 = symbols('infx2', infinite=True, extended_real=True)
infnx = symbols('inf~x', infinite=True, extended_real=False)
infnx2 = symbols('inf~x2', infinite=True, extended_real=False)
infp = symbols('infp', infinite=True, extended_positive=True)
infp1 = symbols('infp1', infinite=True, extended_positive=True)
infn = symbols('infn', infinite=True, extended_negative=True)
zero = symbols('z', zero=True)
nonzero = symbols('nz', zero=False, finite=True)
assert Eq(1/(1/x + 1), 1).func is Eq
assert Eq(1/(1/x + 1), 1).subs(x, S.ComplexInfinity) is S.true
assert Eq(1/(1/fin + 1), 1) is S.false
T, F = S.true, S.false
assert Eq(fin, inf) is F
assert Eq(inf, inf2) not in (T, F) and inf != inf2
assert Eq(1 + inf, 2 + inf2) not in (T, F) and inf != inf2
assert Eq(infp, infp1) is T
assert Eq(infp, infn) is F
assert Eq(1 + I*oo, I*oo) is F
assert Eq(I*oo, 1 + I*oo) is F
assert Eq(1 + I*oo, 2 + I*oo) is F
assert Eq(1 + I*oo, 2 + I*infx) is F
assert Eq(1 + I*oo, 2 + infx) is F
# FIXME: The test below fails because (-infx).is_extended_positive is True
# (should be None)
#assert Eq(1 + I*infx, 1 + I*infx2) not in (T, F) and infx != infx2
#
assert Eq(zoo, sqrt(2) + I*oo) is F
assert Eq(zoo, oo) is F
r = Symbol('r', real=True)
i = Symbol('i', imaginary=True)
assert Eq(i*I, r) not in (T, F)
assert Eq(infx, infnx) is F
assert Eq(infnx, infnx2) not in (T, F) and infnx != infnx2
assert Eq(zoo, oo) is F
assert Eq(inf/inf2, 0) is F
assert Eq(inf/fin, 0) is F
assert Eq(fin/inf, 0) is T
assert Eq(zero/nonzero, 0) is T and ((zero/nonzero) != 0)
# The commented out test below is incorrect because:
assert zoo == -zoo
assert Eq(zoo, -zoo) is T
assert Eq(oo, -oo) is F
assert Eq(inf, -inf) not in (T, F)
assert Eq(fin/(fin + 1), 1) is S.false
o = symbols('o', odd=True)
assert Eq(o, 2*o) is S.false
p = symbols('p', positive=True)
assert Eq(p/(p - 1), 1) is F
def test_issue_10633():
assert Eq(True, False) == False
assert Eq(False, True) == False
assert Eq(True, True) == True
assert Eq(False, False) == True
def test_issue_10927():
x = symbols('x')
assert str(Eq(x, oo)) == 'Eq(x, oo)'
assert str(Eq(x, -oo)) == 'Eq(x, -oo)'
def test_issues_13081_12583_12534():
# 13081
r = Rational('905502432259640373/288230376151711744')
assert (r < pi) is S.false
assert (r > pi) is S.true
# 12583
v = sqrt(2)
u = sqrt(v) + 2/sqrt(10 - 8/sqrt(2 - v) + 4*v*(1/sqrt(2 - v) - 1))
assert (u >= 0) is S.true
# 12534; Rational vs NumberSymbol
# here are some precisions for which Rational forms
# at a lower and higher precision bracket the value of pi
# e.g. for p = 20:
# Rational(pi.n(p + 1)).n(25) = 3.14159265358979323846 2834
# pi.n(25) = 3.14159265358979323846 2643
# Rational(pi.n(p )).n(25) = 3.14159265358979323846 1987
assert [p for p in range(20, 50) if
(Rational(pi.n(p)) < pi) and
(pi < Rational(pi.n(p + 1)))] == [20, 24, 27, 33, 37, 43, 48]
# pick one such precision and affirm that the reversed operation
# gives the opposite result, i.e. if x < y is true then x > y
# must be false
for i in (20, 21):
v = pi.n(i)
assert rel_check(Rational(v), pi)
assert rel_check(v, pi)
assert rel_check(pi.n(20), pi.n(21))
# Float vs Rational
# the rational form is less than the floating representation
# at the same precision
assert [i for i in range(15, 50) if Rational(pi.n(i)) > pi.n(i)] == []
# this should be the same if we reverse the relational
assert [i for i in range(15, 50) if pi.n(i) < Rational(pi.n(i))] == []
def test_issue_18188():
from sympy.sets.conditionset import ConditionSet
result1 = Eq(x*cos(x) - 3*sin(x), 0)
assert result1.as_set() == ConditionSet(x, Eq(x*cos(x) - 3*sin(x), 0), Reals)
result2 = Eq(x**2 + sqrt(x*2) + sin(x), 0)
assert result2.as_set() == ConditionSet(x, Eq(sqrt(2)*sqrt(x) + x**2 + sin(x), 0), Reals)
def test_binary_symbols():
ans = {x}
for f in Eq, Ne:
for t in S.true, S.false:
eq = f(x, S.true)
assert eq.binary_symbols == ans
assert eq.reversed.binary_symbols == ans
assert f(x, 1).binary_symbols == set()
def test_rel_args():
# can't have Boolean args; this is automatic for True/False
# with Python 3 and we confirm that SymPy does the same
# for true/false
for op in ['<', '<=', '>', '>=']:
for b in (S.true, x < 1, And(x, y)):
for v in (0.1, 1, 2**32, t, S.One):
raises(TypeError, lambda: Relational(b, v, op))
def test_Equality_rewrite_as_Add():
eq = Eq(x + y, y - x)
assert eq.rewrite(Add) == 2*x
assert eq.rewrite(Add, evaluate=None).args == (x, x, y, -y)
assert eq.rewrite(Add, evaluate=False).args == (x, y, x, -y)
def test_issue_15847():
a = Ne(x*(x+y), x**2 + x*y)
assert simplify(a) == False
def test_negated_property():
eq = Eq(x, y)
assert eq.negated == Ne(x, y)
eq = Ne(x, y)
assert eq.negated == Eq(x, y)
eq = Ge(x + y, y - x)
assert eq.negated == Lt(x + y, y - x)
for f in (Eq, Ne, Ge, Gt, Le, Lt):
assert f(x, y).negated.negated == f(x, y)
def test_reversedsign_property():
eq = Eq(x, y)
assert eq.reversedsign == Eq(-x, -y)
eq = Ne(x, y)
assert eq.reversedsign == Ne(-x, -y)
eq = Ge(x + y, y - x)
assert eq.reversedsign == Le(-x - y, x - y)
for f in (Eq, Ne, Ge, Gt, Le, Lt):
assert f(x, y).reversedsign.reversedsign == f(x, y)
for f in (Eq, Ne, Ge, Gt, Le, Lt):
assert f(-x, y).reversedsign.reversedsign == f(-x, y)
for f in (Eq, Ne, Ge, Gt, Le, Lt):
assert f(x, -y).reversedsign.reversedsign == f(x, -y)
for f in (Eq, Ne, Ge, Gt, Le, Lt):
assert f(-x, -y).reversedsign.reversedsign == f(-x, -y)
def test_reversed_reversedsign_property():
for f in (Eq, Ne, Ge, Gt, Le, Lt):
assert f(x, y).reversed.reversedsign == f(x, y).reversedsign.reversed
for f in (Eq, Ne, Ge, Gt, Le, Lt):
assert f(-x, y).reversed.reversedsign == f(-x, y).reversedsign.reversed
for f in (Eq, Ne, Ge, Gt, Le, Lt):
assert f(x, -y).reversed.reversedsign == f(x, -y).reversedsign.reversed
for f in (Eq, Ne, Ge, Gt, Le, Lt):
assert f(-x, -y).reversed.reversedsign == \
f(-x, -y).reversedsign.reversed
def test_improved_canonical():
def test_different_forms(listofforms):
for form1, form2 in combinations(listofforms, 2):
assert form1.canonical == form2.canonical
def generate_forms(expr):
return [expr, expr.reversed, expr.reversedsign,
expr.reversed.reversedsign]
test_different_forms(generate_forms(x > -y))
test_different_forms(generate_forms(x >= -y))
test_different_forms(generate_forms(Eq(x, -y)))
test_different_forms(generate_forms(Ne(x, -y)))
test_different_forms(generate_forms(pi < x))
test_different_forms(generate_forms(pi - 5*y < -x + 2*y**2 - 7))
assert (pi >= x).canonical == (x <= pi)
def test_set_equality_canonical():
a, b, c = symbols('a b c')
A = Eq(FiniteSet(a, b, c), FiniteSet(1, 2, 3))
B = Ne(FiniteSet(a, b, c), FiniteSet(4, 5, 6))
assert A.canonical == A.reversed
assert B.canonical == B.reversed
def test_trigsimp():
# issue 16736
s, c = sin(2*x), cos(2*x)
eq = Eq(s, c)
assert trigsimp(eq) == eq # no rearrangement of sides
# simplification of sides might result in
# an unevaluated Eq
changed = trigsimp(Eq(s + c, sqrt(2)))
assert isinstance(changed, Eq)
assert changed.subs(x, pi/8) is S.true
# or an evaluated one
assert trigsimp(Eq(cos(x)**2 + sin(x)**2, 1)) is S.true
def test_polynomial_relation_simplification():
assert Ge(3*x*(x + 1) + 4, 3*x).simplify() in [Ge(x**2, -Rational(4,3)), Le(-x**2, Rational(4, 3))]
assert Le(-(3*x*(x + 1) + 4), -3*x).simplify() in [Ge(x**2, -Rational(4,3)), Le(-x**2, Rational(4, 3))]
assert ((x**2+3)*(x**2-1)+3*x >= 2*x**2).simplify() in [(x**4 + 3*x >= 3), (-x**4 - 3*x <= -3)]
def test_multivariate_linear_function_simplification():
assert Ge(x + y, x - y).simplify() == Ge(y, 0)
assert Le(-x + y, -x - y).simplify() == Le(y, 0)
assert Eq(2*x + y, 2*x + y - 3).simplify() == False
assert (2*x + y > 2*x + y - 3).simplify() == True
assert (2*x + y < 2*x + y - 3).simplify() == False
assert (2*x + y < 2*x + y + 3).simplify() == True
a, b, c, d, e, f, g = symbols('a b c d e f g')
assert Lt(a + b + c + 2*d, 3*d - f + g). simplify() == Lt(a, -b - c + d - f + g)
def test_nonpolymonial_relations():
assert Eq(cos(x), 0).simplify() == Eq(cos(x), 0)
|
d71a79b86b881ff8727a98c69435ae2f70a9a6c93fa65156a8c1af45922b9144
|
"""Implementation of :class:`AlgebraicField` class. """
from __future__ import print_function, division
from sympy.polys.domains.characteristiczero import CharacteristicZero
from sympy.polys.domains.field import Field
from sympy.polys.domains.simpledomain import SimpleDomain
from sympy.polys.polyclasses import ANP
from sympy.polys.polyerrors import CoercionFailed, DomainError, NotAlgebraic, IsomorphismFailed
from sympy.utilities import public
@public
class AlgebraicField(Field, CharacteristicZero, SimpleDomain):
"""A class for representing algebraic number fields. """
dtype = ANP
is_AlgebraicField = is_Algebraic = True
is_Numerical = True
has_assoc_Ring = False
has_assoc_Field = True
def __init__(self, dom, *ext):
if not dom.is_QQ:
raise DomainError("ground domain must be a rational field")
from sympy.polys.numberfields import to_number_field
if len(ext) == 1 and isinstance(ext[0], tuple):
self.orig_ext = ext[0][1:]
else:
self.orig_ext = ext
self.ext = to_number_field(ext)
self.mod = self.ext.minpoly.rep
self.domain = self.dom = dom
self.ngens = 1
self.symbols = self.gens = (self.ext,)
self.unit = self([dom(1), dom(0)])
self.zero = self.dtype.zero(self.mod.rep, dom)
self.one = self.dtype.one(self.mod.rep, dom)
def new(self, element):
return self.dtype(element, self.mod.rep, self.dom)
def __str__(self):
return str(self.dom) + '<' + str(self.ext) + '>'
def __hash__(self):
return hash((self.__class__.__name__, self.dtype, self.dom, self.ext))
def __eq__(self, other):
"""Returns ``True`` if two domains are equivalent. """
return isinstance(other, AlgebraicField) and \
self.dtype == other.dtype and self.ext == other.ext
def algebraic_field(self, *extension):
r"""Returns an algebraic field, i.e. `\mathbb{Q}(\alpha, \ldots)`. """
return AlgebraicField(self.dom, *((self.ext,) + extension))
def to_sympy(self, a):
"""Convert ``a`` to a SymPy object. """
from sympy.polys.numberfields import AlgebraicNumber
return AlgebraicNumber(self.ext, a).as_expr()
def from_sympy(self, a):
"""Convert SymPy's expression to ``dtype``. """
try:
return self([self.dom.from_sympy(a)])
except CoercionFailed:
pass
from sympy.polys.numberfields import to_number_field
try:
return self(to_number_field(a, self.ext).native_coeffs())
except (NotAlgebraic, IsomorphismFailed):
raise CoercionFailed(
"%s is not a valid algebraic number in %s" % (a, self))
def from_ZZ_python(K1, a, K0):
"""Convert a Python ``int`` object to ``dtype``. """
return K1(K1.dom.convert(a, K0))
def from_QQ_python(K1, a, K0):
"""Convert a Python ``Fraction`` object to ``dtype``. """
return K1(K1.dom.convert(a, K0))
def from_ZZ_gmpy(K1, a, K0):
"""Convert a GMPY ``mpz`` object to ``dtype``. """
return K1(K1.dom.convert(a, K0))
def from_QQ_gmpy(K1, a, K0):
"""Convert a GMPY ``mpq`` object to ``dtype``. """
return K1(K1.dom.convert(a, K0))
def from_RealField(K1, a, K0):
"""Convert a mpmath ``mpf`` object to ``dtype``. """
return K1(K1.dom.convert(a, K0))
def get_ring(self):
"""Returns a ring associated with ``self``. """
raise DomainError('there is no ring associated with %s' % self)
def is_positive(self, a):
"""Returns True if ``a`` is positive. """
return self.dom.is_positive(a.LC())
def is_negative(self, a):
"""Returns True if ``a`` is negative. """
return self.dom.is_negative(a.LC())
def is_nonpositive(self, a):
"""Returns True if ``a`` is non-positive. """
return self.dom.is_nonpositive(a.LC())
def is_nonnegative(self, a):
"""Returns True if ``a`` is non-negative. """
return self.dom.is_nonnegative(a.LC())
def numer(self, a):
"""Returns numerator of ``a``. """
return a
def denom(self, a):
"""Returns denominator of ``a``. """
return self.one
def from_AlgebraicField(K1, a, K0):
"""Convert AlgebraicField element 'a' to another AlgebraicField """
return K1.from_sympy(K0.to_sympy(a))
def from_GaussianIntegerRing(K1, a, K0):
"""Convert a GaussianInteger element 'a' to ``dtype``. """
return K1.from_sympy(K0.to_sympy(a))
def from_GaussianRationalField(K1, a, K0):
"""Convert a GaussianRational element 'a' to ``dtype``. """
return K1.from_sympy(K0.to_sympy(a))
|
6836429daebd8eca0ffcbdd55c4c9a4dbdeb94f9348f440e52a7acceef993c94
|
"""Rational number type based on Python integers. """
from __future__ import print_function, division
import operator
from sympy.core.numbers import Rational, Integer
from sympy.core.sympify import converter
from sympy.polys.polyutils import PicklableWithSlots
from sympy.polys.domains.domainelement import DomainElement
from sympy.printing.defaults import DefaultPrinting
from sympy.utilities import public
@public
class PythonRational(DefaultPrinting, PicklableWithSlots, DomainElement):
"""
Rational number type based on Python integers.
This was supposed to be needed for compatibility with older Python
versions which don't support Fraction. However, Fraction is very
slow so we don't use it anyway.
Examples
========
>>> from sympy.polys.domains import PythonRational
>>> PythonRational(1)
1
>>> PythonRational(2, 3)
2/3
>>> PythonRational(14, 10)
7/5
"""
__slots__ = ('p', 'q')
def parent(self):
from sympy.polys.domains import PythonRationalField
return PythonRationalField()
def __init__(self, p, q=1, _gcd=True):
from sympy.polys.domains.groundtypes import python_gcd as gcd
if isinstance(p, Integer):
p = p.p
elif isinstance(p, Rational):
p, q = p.p, p.q
if not q:
raise ZeroDivisionError('rational number')
elif q < 0:
p, q = -p, -q
if not p:
self.p = 0
self.q = 1
elif p == 1 or q == 1:
self.p = p
self.q = q
else:
if _gcd:
x = gcd(p, q)
if x != 1:
p //= x
q //= x
self.p = p
self.q = q
@classmethod
def new(cls, p, q):
obj = object.__new__(cls)
obj.p = p
obj.q = q
return obj
def __hash__(self):
if self.q == 1:
return hash(self.p)
else:
return hash((self.p, self.q))
def __int__(self):
p, q = self.p, self.q
if p < 0:
return -(-p//q)
return p//q
def __float__(self):
return float(self.p)/self.q
def __abs__(self):
return self.new(abs(self.p), self.q)
def __pos__(self):
return self.new(+self.p, self.q)
def __neg__(self):
return self.new(-self.p, self.q)
def __add__(self, other):
from sympy.polys.domains.groundtypes import python_gcd as gcd
if isinstance(other, PythonRational):
ap, aq, bp, bq = self.p, self.q, other.p, other.q
g = gcd(aq, bq)
if g == 1:
p = ap*bq + aq*bp
q = bq*aq
else:
q1, q2 = aq//g, bq//g
p, q = ap*q2 + bp*q1, q1*q2
g2 = gcd(p, g)
p, q = (p // g2), q * (g // g2)
elif isinstance(other, int):
p = self.p + self.q*other
q = self.q
else:
return NotImplemented
return self.__class__(p, q, _gcd=False)
def __radd__(self, other):
if not isinstance(other, int):
return NotImplemented
p = self.p + self.q*other
q = self.q
return self.__class__(p, q, _gcd=False)
def __sub__(self, other):
from sympy.polys.domains.groundtypes import python_gcd as gcd
if isinstance(other, PythonRational):
ap, aq, bp, bq = self.p, self.q, other.p, other.q
g = gcd(aq, bq)
if g == 1:
p = ap*bq - aq*bp
q = bq*aq
else:
q1, q2 = aq//g, bq//g
p, q = ap*q2 - bp*q1, q1*q2
g2 = gcd(p, g)
p, q = (p // g2), q * (g // g2)
elif isinstance(other, int):
p = self.p - self.q*other
q = self.q
else:
return NotImplemented
return self.__class__(p, q, _gcd=False)
def __rsub__(self, other):
if not isinstance(other, int):
return NotImplemented
p = self.q*other - self.p
q = self.q
return self.__class__(p, q, _gcd=False)
def __mul__(self, other):
from sympy.polys.domains.groundtypes import python_gcd as gcd
if isinstance(other, PythonRational):
ap, aq, bp, bq = self.p, self.q, other.p, other.q
x1 = gcd(ap, bq)
x2 = gcd(bp, aq)
p, q = ((ap//x1)*(bp//x2), (aq//x2)*(bq//x1))
elif isinstance(other, int):
x = gcd(other, self.q)
p = self.p*(other//x)
q = self.q//x
else:
return NotImplemented
return self.__class__(p, q, _gcd=False)
def __rmul__(self, other):
from sympy.polys.domains.groundtypes import python_gcd as gcd
if not isinstance(other, int):
return NotImplemented
x = gcd(self.q, other)
p = self.p*(other//x)
q = self.q//x
return self.__class__(p, q, _gcd=False)
def __div__(self, other):
from sympy.polys.domains.groundtypes import python_gcd as gcd
if isinstance(other, PythonRational):
ap, aq, bp, bq = self.p, self.q, other.p, other.q
x1 = gcd(ap, bp)
x2 = gcd(bq, aq)
p, q = ((ap//x1)*(bq//x2), (aq//x2)*(bp//x1))
elif isinstance(other, int):
x = gcd(other, self.p)
p = self.p//x
q = self.q*(other//x)
else:
return NotImplemented
return self.__class__(p, q, _gcd=False)
__truediv__ = __div__
def __rdiv__(self, other):
from sympy.polys.domains.groundtypes import python_gcd as gcd
if not isinstance(other, int):
return NotImplemented
x = gcd(self.p, other)
p = self.q*(other//x)
q = self.p//x
return self.__class__(p, q)
__rtruediv__ = __rdiv__
def __mod__(self, other):
return self.__class__(0)
def __divmod__(self, other):
return (self//other, self % other)
def __pow__(self, exp):
p, q = self.p, self.q
if exp < 0:
p, q, exp = q, p, -exp
return self.__class__(p**exp, q**exp, _gcd=False)
def __nonzero__(self):
return self.p != 0
__bool__ = __nonzero__
def __eq__(self, other):
if isinstance(other, PythonRational):
return self.q == other.q and self.p == other.p
elif isinstance(other, int):
return self.q == 1 and self.p == other
else:
return NotImplemented
def __ne__(self, other):
return not self == other
def _cmp(self, other, op):
try:
diff = self - other
except TypeError:
return NotImplemented
else:
return op(diff.p, 0)
def __lt__(self, other):
return self._cmp(other, operator.lt)
def __le__(self, other):
return self._cmp(other, operator.le)
def __gt__(self, other):
return self._cmp(other, operator.gt)
def __ge__(self, other):
return self._cmp(other, operator.ge)
@property
def numer(self):
return self.p
@property
def denom(self):
return self.q
numerator = numer
denominator = denom
def sympify_pythonrational(arg):
return Rational(arg.p, arg.q)
converter[PythonRational] = sympify_pythonrational
|
b7d1b0063008cee5d81ee324b45fcabf6269b1b21f4e92d53bd7587fe6b8b98b
|
"""Implementation of mathematical domains. """
__all__ = [
'Domain', 'FiniteField', 'IntegerRing', 'RationalField', 'RealField',
'ComplexField', 'PythonFiniteField', 'GMPYFiniteField',
'PythonIntegerRing', 'GMPYIntegerRing', 'PythonRational',
'GMPYRationalField', 'AlgebraicField', 'PolynomialRing', 'FractionField',
'ExpressionDomain', 'PythonRational',
'FF_python', 'FF_gmpy', 'ZZ_python', 'ZZ_gmpy', 'QQ_python', 'QQ_gmpy',
'GF', 'FF', 'ZZ', 'QQ', 'ZZ_I', 'QQ_I', 'RR', 'CC', 'EX',
]
from .domain import Domain
from .finitefield import FiniteField
from .integerring import IntegerRing
from .rationalfield import RationalField
from .realfield import RealField
from .complexfield import ComplexField
from .pythonfinitefield import PythonFiniteField
from .gmpyfinitefield import GMPYFiniteField
from .pythonintegerring import PythonIntegerRing
from .gmpyintegerring import GMPYIntegerRing
from .pythonrationalfield import PythonRationalField
from .gmpyrationalfield import GMPYRationalField
from .algebraicfield import AlgebraicField
from .polynomialring import PolynomialRing
from .fractionfield import FractionField
from .expressiondomain import ExpressionDomain
from .pythonrational import PythonRational
FF_python = PythonFiniteField
FF_gmpy = GMPYFiniteField
ZZ_python = PythonIntegerRing
ZZ_gmpy = GMPYIntegerRing
QQ_python = PythonRationalField
QQ_gmpy = GMPYRationalField
RR = RealField()
CC = ComplexField()
from sympy.core.compatibility import GROUND_TYPES
_GROUND_TYPES_MAP = {
'gmpy': (FF_gmpy, ZZ_gmpy(), QQ_gmpy()),
'python': (FF_python, ZZ_python(), QQ_python()),
}
try:
FF, ZZ, QQ = _GROUND_TYPES_MAP[GROUND_TYPES]
except KeyError:
raise ValueError("invalid ground types: %s" % GROUND_TYPES)
# Needs to be after ZZ and QQ are defined:
from .gaussiandomains import ZZ_I, QQ_I
GF = FF
EX = ExpressionDomain()
|
918a64170642005431268dac3dde9df3dd6f6e894f5aaff33b1c8229672a1595
|
"""Implementation of :class:`GMPYRationalField` class. """
from __future__ import print_function, division
from sympy.polys.domains.groundtypes import (
GMPYRational, SymPyRational,
gmpy_numer, gmpy_denom, gmpy_factorial,
)
from sympy.polys.domains.rationalfield import RationalField
from sympy.polys.polyerrors import CoercionFailed
from sympy.utilities import public
@public
class GMPYRationalField(RationalField):
"""Rational field based on GMPY mpq class. """
dtype = GMPYRational
zero = dtype(0)
one = dtype(1)
tp = type(one)
alias = 'QQ_gmpy'
def __init__(self):
pass
def get_ring(self):
"""Returns ring associated with ``self``. """
from sympy.polys.domains import GMPYIntegerRing
return GMPYIntegerRing()
def to_sympy(self, a):
"""Convert `a` to a SymPy object. """
return SymPyRational(int(gmpy_numer(a)),
int(gmpy_denom(a)))
def from_sympy(self, a):
"""Convert SymPy's Integer to `dtype`. """
if a.is_Rational:
return GMPYRational(a.p, a.q)
elif a.is_Float:
from sympy.polys.domains import RR
return GMPYRational(*map(int, RR.to_rational(a)))
else:
raise CoercionFailed("expected `Rational` object, got %s" % a)
def from_ZZ_python(K1, a, K0):
"""Convert a Python `int` object to `dtype`. """
return GMPYRational(a)
def from_QQ_python(K1, a, K0):
"""Convert a Python `Fraction` object to `dtype`. """
return GMPYRational(a.numerator, a.denominator)
def from_ZZ_gmpy(K1, a, K0):
"""Convert a GMPY `mpz` object to `dtype`. """
return GMPYRational(a)
def from_QQ_gmpy(K1, a, K0):
"""Convert a GMPY `mpq` object to `dtype`. """
return a
def from_GaussianRationalField(K1, a, K0):
"""Convert a `GaussianElement` object to `dtype`. """
if a.y == 0:
return GMPYRational(a.x)
def from_RealField(K1, a, K0):
"""Convert a mpmath `mpf` object to `dtype`. """
return GMPYRational(*map(int, K0.to_rational(a)))
def exquo(self, a, b):
"""Exact quotient of `a` and `b`, implies `__div__`. """
return GMPYRational(a) / GMPYRational(b)
def quo(self, a, b):
"""Quotient of `a` and `b`, implies `__div__`. """
return GMPYRational(a) / GMPYRational(b)
def rem(self, a, b):
"""Remainder of `a` and `b`, implies nothing. """
return self.zero
def div(self, a, b):
"""Division of `a` and `b`, implies `__div__`. """
return GMPYRational(a) / GMPYRational(b), self.zero
def numer(self, a):
"""Returns numerator of `a`. """
return a.numerator
def denom(self, a):
"""Returns denominator of `a`. """
return a.denominator
def factorial(self, a):
"""Returns factorial of `a`. """
return GMPYRational(gmpy_factorial(int(a)))
|
8faf036b09a21948d057f4fcaa0df9e1c6f23b2abeb7c2edccf960c96579c3eb
|
"""Implementation of :class:`PolynomialRing` class. """
from __future__ import print_function, division
from sympy.polys.domains.ring import Ring
from sympy.polys.domains.compositedomain import CompositeDomain
from sympy.polys.polyerrors import CoercionFailed, GeneratorsError
from sympy.utilities import public
@public
class PolynomialRing(Ring, CompositeDomain):
"""A class for representing multivariate polynomial rings. """
is_PolynomialRing = is_Poly = True
has_assoc_Ring = True
has_assoc_Field = True
def __init__(self, domain_or_ring, symbols=None, order=None):
from sympy.polys.rings import PolyRing
if isinstance(domain_or_ring, PolyRing) and symbols is None and order is None:
ring = domain_or_ring
else:
ring = PolyRing(symbols, domain_or_ring, order)
self.ring = ring
self.dtype = ring.dtype
self.gens = ring.gens
self.ngens = ring.ngens
self.symbols = ring.symbols
self.domain = ring.domain
if symbols:
if ring.domain.is_Field and ring.domain.is_Exact and len(symbols)==1:
self.is_PID = True
# TODO: remove this
self.dom = self.domain
def new(self, element):
return self.ring.ring_new(element)
@property
def zero(self):
return self.ring.zero
@property
def one(self):
return self.ring.one
@property
def order(self):
return self.ring.order
def __str__(self):
return str(self.domain) + '[' + ','.join(map(str, self.symbols)) + ']'
def __hash__(self):
return hash((self.__class__.__name__, self.dtype.ring, self.domain, self.symbols))
def __eq__(self, other):
"""Returns `True` if two domains are equivalent. """
return isinstance(other, PolynomialRing) and \
(self.dtype.ring, self.domain, self.symbols) == \
(other.dtype.ring, other.domain, other.symbols)
def to_sympy(self, a):
"""Convert `a` to a SymPy object. """
return a.as_expr()
def from_sympy(self, a):
"""Convert SymPy's expression to `dtype`. """
return self.ring.from_expr(a)
def from_ZZ_python(K1, a, K0):
"""Convert a Python `int` object to `dtype`. """
return K1(K1.domain.convert(a, K0))
def from_QQ_python(K1, a, K0):
"""Convert a Python `Fraction` object to `dtype`. """
return K1(K1.domain.convert(a, K0))
def from_ZZ_gmpy(K1, a, K0):
"""Convert a GMPY `mpz` object to `dtype`. """
return K1(K1.domain.convert(a, K0))
def from_QQ_gmpy(K1, a, K0):
"""Convert a GMPY `mpq` object to `dtype`. """
return K1(K1.domain.convert(a, K0))
def from_GaussianIntegerRing(K1, a, K0):
"""Convert a `GaussianInteger` object to `dtype`. """
return K1(K1.domain.convert(a, K0))
def from_GaussianRationalField(K1, a, K0):
"""Convert a `GaussianRational` object to `dtype`. """
return K1(K1.domain.convert(a, K0))
def from_RealField(K1, a, K0):
"""Convert a mpmath `mpf` object to `dtype`. """
return K1(K1.domain.convert(a, K0))
def from_AlgebraicField(K1, a, K0):
"""Convert an algebraic number to ``dtype``. """
if K1.domain == K0:
return K1.new(a)
def from_PolynomialRing(K1, a, K0):
"""Convert a polynomial to ``dtype``. """
try:
return a.set_ring(K1.ring)
except (CoercionFailed, GeneratorsError):
return None
def from_FractionField(K1, a, K0):
"""Convert a rational function to ``dtype``. """
q, r = K0.numer(a).div(K0.denom(a))
if r.is_zero:
return K1.from_PolynomialRing(q, K0.field.ring.to_domain())
else:
return None
def get_field(self):
"""Returns a field associated with `self`. """
return self.ring.to_field().to_domain()
def is_positive(self, a):
"""Returns True if `LC(a)` is positive. """
return self.domain.is_positive(a.LC)
def is_negative(self, a):
"""Returns True if `LC(a)` is negative. """
return self.domain.is_negative(a.LC)
def is_nonpositive(self, a):
"""Returns True if `LC(a)` is non-positive. """
return self.domain.is_nonpositive(a.LC)
def is_nonnegative(self, a):
"""Returns True if `LC(a)` is non-negative. """
return self.domain.is_nonnegative(a.LC)
def gcdex(self, a, b):
"""Extended GCD of `a` and `b`. """
return a.gcdex(b)
def gcd(self, a, b):
"""Returns GCD of `a` and `b`. """
return a.gcd(b)
def lcm(self, a, b):
"""Returns LCM of `a` and `b`. """
return a.lcm(b)
def factorial(self, a):
"""Returns factorial of `a`. """
return self.dtype(self.domain.factorial(a))
|
5488f8c4d534d36f32afa129d499ce55400823448b10edf98fd9049a513a7c11
|
"""Implementation of :class:`FractionField` class. """
from __future__ import print_function, division
from sympy.polys.domains.compositedomain import CompositeDomain
from sympy.polys.domains.field import Field
from sympy.polys.polyerrors import CoercionFailed, GeneratorsError
from sympy.utilities import public
@public
class FractionField(Field, CompositeDomain):
"""A class for representing multivariate rational function fields. """
is_FractionField = is_Frac = True
has_assoc_Ring = True
has_assoc_Field = True
def __init__(self, domain_or_field, symbols=None, order=None):
from sympy.polys.fields import FracField
if isinstance(domain_or_field, FracField) and symbols is None and order is None:
field = domain_or_field
else:
field = FracField(symbols, domain_or_field, order)
self.field = field
self.dtype = field.dtype
self.gens = field.gens
self.ngens = field.ngens
self.symbols = field.symbols
self.domain = field.domain
# TODO: remove this
self.dom = self.domain
def new(self, element):
return self.field.field_new(element)
@property
def zero(self):
return self.field.zero
@property
def one(self):
return self.field.one
@property
def order(self):
return self.field.order
@property
def is_Exact(self):
return self.domain.is_Exact
def get_exact(self):
return FractionField(self.domain.get_exact(), self.symbols)
def __str__(self):
return str(self.domain) + '(' + ','.join(map(str, self.symbols)) + ')'
def __hash__(self):
return hash((self.__class__.__name__, self.dtype.field, self.domain, self.symbols))
def __eq__(self, other):
"""Returns `True` if two domains are equivalent. """
return isinstance(other, FractionField) and \
(self.dtype.field, self.domain, self.symbols) ==\
(other.dtype.field, other.domain, other.symbols)
def to_sympy(self, a):
"""Convert `a` to a SymPy object. """
return a.as_expr()
def from_sympy(self, a):
"""Convert SymPy's expression to `dtype`. """
return self.field.from_expr(a)
def from_ZZ_python(K1, a, K0):
"""Convert a Python `int` object to `dtype`. """
return K1(K1.domain.convert(a, K0))
def from_QQ_python(K1, a, K0):
"""Convert a Python `Fraction` object to `dtype`. """
return K1(K1.domain.convert(a, K0))
def from_ZZ_gmpy(K1, a, K0):
"""Convert a GMPY `mpz` object to `dtype`. """
return K1(K1.domain.convert(a, K0))
def from_QQ_gmpy(K1, a, K0):
"""Convert a GMPY `mpq` object to `dtype`. """
return K1(K1.domain.convert(a, K0))
def from_GaussianRationalField(K1, a, K0):
"""Convert a `GaussianRational` object to `dtype`. """
return K1(K1.domain.convert(a, K0))
def from_GaussianIntegerRing(K1, a, K0):
"""Convert a `GaussianInteger` object to `dtype`. """
return K1(K1.domain.convert(a, K0))
def from_RealField(K1, a, K0):
"""Convert a mpmath `mpf` object to `dtype`. """
return K1(K1.domain.convert(a, K0))
def from_AlgebraicField(K1, a, K0):
"""Convert an algebraic number to ``dtype``. """
if K1.domain == K0:
return K1.new(a)
def from_PolynomialRing(K1, a, K0):
"""Convert a polynomial to ``dtype``. """
try:
return K1.new(a)
except (CoercionFailed, GeneratorsError):
return None
def from_FractionField(K1, a, K0):
"""Convert a rational function to ``dtype``. """
try:
return a.set_field(K1.field)
except (CoercionFailed, GeneratorsError):
return None
def get_ring(self):
"""Returns a field associated with `self`. """
return self.field.to_ring().to_domain()
def is_positive(self, a):
"""Returns True if `LC(a)` is positive. """
return self.domain.is_positive(a.numer.LC)
def is_negative(self, a):
"""Returns True if `LC(a)` is negative. """
return self.domain.is_negative(a.numer.LC)
def is_nonpositive(self, a):
"""Returns True if `LC(a)` is non-positive. """
return self.domain.is_nonpositive(a.numer.LC)
def is_nonnegative(self, a):
"""Returns True if `LC(a)` is non-negative. """
return self.domain.is_nonnegative(a.numer.LC)
def numer(self, a):
"""Returns numerator of ``a``. """
return a.numer
def denom(self, a):
"""Returns denominator of ``a``. """
return a.denom
def factorial(self, a):
"""Returns factorial of `a`. """
return self.dtype(self.domain.factorial(a))
|
9d68d2b41696439dc50326364030ed20521eadb2ff848ae74337fe5bfdf87ecc
|
"""Implementation of :class:`ExpressionDomain` class. """
from __future__ import print_function, division
from sympy.core import sympify, SympifyError
from sympy.polys.domains.characteristiczero import CharacteristicZero
from sympy.polys.domains.field import Field
from sympy.polys.domains.simpledomain import SimpleDomain
from sympy.polys.polyutils import PicklableWithSlots
from sympy.utilities import public
eflags = dict(deep=False, mul=True, power_exp=False, power_base=False,
basic=False, multinomial=False, log=False)
@public
class ExpressionDomain(Field, CharacteristicZero, SimpleDomain):
"""A class for arbitrary expressions. """
is_SymbolicDomain = is_EX = True
class Expression(PicklableWithSlots):
"""An arbitrary expression. """
__slots__ = ('ex',)
def __init__(self, ex):
if not isinstance(ex, self.__class__):
self.ex = sympify(ex)
else:
self.ex = ex.ex
def __repr__(f):
return 'EX(%s)' % repr(f.ex)
def __str__(f):
return 'EX(%s)' % str(f.ex)
def __hash__(self):
return hash((self.__class__.__name__, self.ex))
def as_expr(f):
return f.ex
def numer(f):
return f.__class__(f.ex.as_numer_denom()[0])
def denom(f):
return f.__class__(f.ex.as_numer_denom()[1])
def simplify(f, ex):
return f.__class__(ex.cancel().expand(**eflags))
def __abs__(f):
return f.__class__(abs(f.ex))
def __neg__(f):
return f.__class__(-f.ex)
def _to_ex(f, g):
try:
return f.__class__(g)
except SympifyError:
return None
def __add__(f, g):
g = f._to_ex(g)
if g is not None:
return f.simplify(f.ex + g.ex)
else:
return NotImplemented
def __radd__(f, g):
return f.simplify(f.__class__(g).ex + f.ex)
def __sub__(f, g):
g = f._to_ex(g)
if g is not None:
return f.simplify(f.ex - g.ex)
else:
return NotImplemented
def __rsub__(f, g):
return f.simplify(f.__class__(g).ex - f.ex)
def __mul__(f, g):
g = f._to_ex(g)
if g is not None:
return f.simplify(f.ex*g.ex)
else:
return NotImplemented
def __rmul__(f, g):
return f.simplify(f.__class__(g).ex*f.ex)
def __pow__(f, n):
n = f._to_ex(n)
if n is not None:
return f.simplify(f.ex**n.ex)
else:
return NotImplemented
def __truediv__(f, g):
g = f._to_ex(g)
if g is not None:
return f.simplify(f.ex/g.ex)
else:
return NotImplemented
def __rtruediv__(f, g):
return f.simplify(f.__class__(g).ex/f.ex)
__div__ = __truediv__
__rdiv__ = __rtruediv__
def __eq__(f, g):
return f.ex == f.__class__(g).ex
def __ne__(f, g):
return not f == g
def __nonzero__(f):
return f.ex != 0
__bool__ = __nonzero__
def gcd(f, g):
from sympy.polys import gcd
return f.__class__(gcd(f.ex, f.__class__(g).ex))
def lcm(f, g):
from sympy.polys import lcm
return f.__class__(lcm(f.ex, f.__class__(g).ex))
dtype = Expression
zero = Expression(0)
one = Expression(1)
rep = 'EX'
has_assoc_Ring = False
has_assoc_Field = True
def __init__(self):
pass
def to_sympy(self, a):
"""Convert ``a`` to a SymPy object. """
return a.as_expr()
def from_sympy(self, a):
"""Convert SymPy's expression to ``dtype``. """
return self.dtype(a)
def from_ZZ_python(K1, a, K0):
"""Convert a Python ``int`` object to ``dtype``. """
return K1(K0.to_sympy(a))
def from_QQ_python(K1, a, K0):
"""Convert a Python ``Fraction`` object to ``dtype``. """
return K1(K0.to_sympy(a))
def from_ZZ_gmpy(K1, a, K0):
"""Convert a GMPY ``mpz`` object to ``dtype``. """
return K1(K0.to_sympy(a))
def from_QQ_gmpy(K1, a, K0):
"""Convert a GMPY ``mpq`` object to ``dtype``. """
return K1(K0.to_sympy(a))
def from_GaussianIntegerRing(K1, a, K0):
"""Convert a ``GaussianRational`` object to ``dtype``. """
return K1(K0.to_sympy(a))
def from_GaussianRationalField(K1, a, K0):
"""Convert a ``GaussianRational`` object to ``dtype``. """
return K1(K0.to_sympy(a))
def from_RealField(K1, a, K0):
"""Convert a mpmath ``mpf`` object to ``dtype``. """
return K1(K0.to_sympy(a))
def from_PolynomialRing(K1, a, K0):
"""Convert a ``DMP`` object to ``dtype``. """
return K1(K0.to_sympy(a))
def from_FractionField(K1, a, K0):
"""Convert a ``DMF`` object to ``dtype``. """
return K1(K0.to_sympy(a))
def from_ExpressionDomain(K1, a, K0):
"""Convert a ``EX`` object to ``dtype``. """
return a
def get_ring(self):
"""Returns a ring associated with ``self``. """
return self # XXX: EX is not a ring but we don't have much choice here.
def get_field(self):
"""Returns a field associated with ``self``. """
return self
def is_positive(self, a):
"""Returns True if ``a`` is positive. """
return a.ex.as_coeff_mul()[0].is_positive
def is_negative(self, a):
"""Returns True if ``a`` is negative. """
return a.ex.could_extract_minus_sign()
def is_nonpositive(self, a):
"""Returns True if ``a`` is non-positive. """
return a.ex.as_coeff_mul()[0].is_nonpositive
def is_nonnegative(self, a):
"""Returns True if ``a`` is non-negative. """
return a.ex.as_coeff_mul()[0].is_nonnegative
def numer(self, a):
"""Returns numerator of ``a``. """
return a.numer()
def denom(self, a):
"""Returns denominator of ``a``. """
return a.denom()
def gcd(self, a, b):
return a.gcd(b)
def lcm(self, a, b):
return a.lcm(b)
|
2ca03f1faac69adcc488e89e29aa28f1c15c37b3fe261ec08114c953eecbe89a
|
"""Domains of Gaussian type."""
from sympy.core.numbers import I
from sympy.polys.polyerrors import CoercionFailed
from sympy.polys.domains import ZZ, QQ
from sympy.polys.domains.algebraicfield import AlgebraicField
from sympy.polys.domains.domainelement import DomainElement
from sympy.polys.domains.field import Field
from sympy.polys.domains.ring import Ring
class GaussianElement(DomainElement):
"""Base class for elements of Gaussian type domains."""
base = None # base ring
_parent = None
__slots__ = ('x', 'y')
def __init__(self, x, y=0):
conv = self.base.convert
self.x = conv(x)
self.y = conv(y)
@classmethod
def new(cls, x, y):
"""Create a new GaussianElement of the same domain."""
return cls(x, y)
def parent(self):
"""The domain that this is an element of (ZZ_I or QQ_I)"""
return self._parent
def __hash__(self):
return hash((self.x, self.y))
def __eq__(self, other):
if isinstance(other, self.__class__):
return self.x == other.x and self.y == other.y
else:
return NotImplemented
def __lt__(self, other):
if not isinstance(other, GaussianElement):
return NotImplemented
return [self.y, self.x] < [other.y, other.x]
def __neg__(self):
return self.new(-self.x, -self.y)
def __repr__(self):
return "%s(%s, %s)" % (self._parent.rep, self.x, self.y)
def __str__(self):
return str(self._parent.to_sympy(self))
@classmethod
def _get_xy(cls, other):
if not isinstance(other, cls):
try:
other = cls._parent.convert(other)
except CoercionFailed:
return None, None
return other.x, other.y
def __add__(self, other):
x, y = self._get_xy(other)
if x is not None:
return self.new(self.x + x, self.y + y)
else:
return NotImplemented
__radd__ = __add__
def __sub__(self, other):
x, y = self._get_xy(other)
if x is not None:
return self.new(self.x - x, self.y - y)
else:
return NotImplemented
def __rsub__(self, other):
x, y = self._get_xy(other)
if x is not None:
return self.new(x - self.x, y - self.y)
else:
return NotImplemented
def __mul__(self, other):
x, y = self._get_xy(other)
if x is not None:
return self.new(self.x*x - self.y*y, self.x*y + self.y*x)
else:
return NotImplemented
__rmul__ = __mul__
def __pow__(self, exp):
if exp == 0:
return self.new(1, 0)
if exp < 0:
self, exp = 1/self, -exp
if exp == 1:
return self
pow2 = self
prod = self if exp % 2 else self._parent.one
exp //= 2
while exp:
pow2 *= pow2
if exp % 2:
prod *= pow2
exp //= 2
return prod
def __bool__(self):
return bool(self.x) or bool(self.y)
def quadrant(self):
"""Return quadrant index 0-3.
0 is included in quadrant 0.
"""
if self.y > 0:
return 0 if self.x > 0 else 1
elif self.y < 0:
return 2 if self.x < 0 else 3
else:
return 0 if self.x >= 0 else 2
def __rdivmod__(self, other):
try:
other = self._parent.convert(other)
except CoercionFailed:
return NotImplemented
else:
return other.__divmod__(self)
def __rtruediv__(self, other):
try:
other = QQ_I.convert(other)
except CoercionFailed:
return NotImplemented
else:
return other.__truediv__(self)
def __floordiv__(self, other):
qr = self.__divmod__(other)
return qr if qr is NotImplemented else qr[0]
def __rfloordiv__(self, other):
qr = self.__rdivmod__(other)
return qr if qr is NotImplemented else qr[0]
def __mod__(self, other):
qr = self.__divmod__(other)
return qr if qr is NotImplemented else qr[1]
def __rmod__(self, other):
qr = self.__rdivmod__(other)
return qr if qr is NotImplemented else qr[1]
class GaussianInteger(GaussianElement):
base = ZZ
def __truediv__(self, other):
"""Return a Gaussian rational."""
return QQ_I.convert(self)/other
def __divmod__(self, other):
if not other:
raise ZeroDivisionError('divmod({}, 0)'.format(self))
x, y = self._get_xy(other)
if x is None:
return NotImplemented
# multiply self and other by x - I*y
# self/other == (a + I*b)/c
a, b = self.x*x + self.y*y, -self.x*y + self.y*x
c = x*x + y*y
# find integers qx and qy such that
# |a - qx*c| <= c/2 and |b - qy*c| <= c/2
qx = (2*a + c) // (2*c) # -c <= 2*a - qx*2*c < c
qy = (2*b + c) // (2*c)
q = GaussianInteger(qx, qy)
# |self/other - q| < 1 since
# |a/c - qx|**2 + |b/c - qy|**2 <= 1/4 + 1/4 < 1
return q, self - q*other # |r| < |other|
class GaussianRational(GaussianElement):
base = QQ
def __truediv__(self, other):
"""Return a Gaussian rational."""
if not other:
raise ZeroDivisionError('{} / 0'.format(self))
x, y = self._get_xy(other)
if x is None:
return NotImplemented
c = x*x + y*y
return GaussianRational((self.x*x + self.y*y)/c,
(-self.x*y + self.y*x)/c)
def __divmod__(self, other):
try:
other = self._parent.convert(other)
except CoercionFailed:
return NotImplemented
if not other:
raise ZeroDivisionError('{} % 0'.format(self))
else:
return self/other, QQ_I.zero
class GaussianDomain():
"""Base class for Gaussian domains."""
dom = None # base domain, ZZ or QQ
is_Numerical = True
is_Exact = True
has_assoc_Ring = True
has_assoc_Field = True
def to_sympy(self, a):
"""Convert ``a`` to a SymPy object. """
conv = self.dom.to_sympy
return conv(a.x) + I*conv(a.y)
def from_sympy(self, a):
"""Convert a SymPy object to ``self.dtype``."""
r, b = a.as_coeff_Add()
x = self.dom.from_sympy(r) # may raise CoercionFailed
if not b:
return self.new(x, 0)
r, b = b.as_coeff_Mul()
y = self.dom.from_sympy(r)
if b is I:
return self.new(x, y)
else:
raise CoercionFailed("{} is not Gaussian".format(a))
def inject(self, *gens):
"""Inject generators into this domain. """
return self.poly_ring(*gens)
# Override the negative etc handlers because this isn't an ordered domain.
def is_negative(self, element):
"""Returns ``False`` for any ``GaussianElement``. """
return False
def is_positive(self, element):
"""Returns ``False`` for any ``GaussianElement``. """
return False
def is_nonnegative(self, element):
"""Returns ``False`` for any ``GaussianElement``. """
return False
def is_nonpositive(self, element):
"""Returns ``False`` for any ``GaussianElement``. """
return False
def from_ZZ_gmpy(K1, a, K0):
"""Convert a GMPY mpz to ``self.dtype``."""
return K1(a)
def from_ZZ_python(K1, a, K0):
"""Convert a ZZ_python element to ``self.dtype``."""
return K1(a)
def from_QQ_gmpy(K1, a, K0):
"""Convert a GMPY mpq to ``self.dtype``."""
return K1(a)
def from_QQ_python(K1, a, K0):
"""Convert a QQ_python element to ``self.dtype``."""
return K1(a)
def from_AlgebraicField(K1, a, K0):
"""Convert an element from ZZ<I> or QQ<I> to ``self.dtype``."""
if K0.ext.args[0] == I:
return K1.from_sympy(K0.to_sympy(a))
class GaussianIntegerRing(GaussianDomain, Ring):
"""Ring of Gaussian integers."""
dom = ZZ
dtype = GaussianInteger
zero = dtype(0, 0)
one = dtype(1, 0)
imag_unit = dtype(0, 1)
units = (one, imag_unit, -one, -imag_unit) # powers of i
rep = 'ZZ_I'
is_GaussianRing = True
is_ZZ_I = True
def __init__(self): # override Domain.__init__
"""For constructing ZZ_I."""
def get_ring(self):
"""Returns a ring associated with ``self``. """
return self
def get_field(self):
"""Returns a field associated with ``self``. """
return QQ_I
def normalize(self, d, *args):
"""Return first quadrant element associated with ``d``.
Also multiply the other arguments by the same power of i.
"""
unit = self.units[-d.quadrant()] # - for inverse power
d *= unit
args = tuple(a*unit for a in args)
return (d,) + args if args else d
def gcd(self, a, b):
"""Greatest common divisor of a and b over ZZ_I."""
while b:
a, b = b, a % b
return self.normalize(a)
def lcm(self, a, b):
"""Least common multiple of a and b over ZZ_I."""
return (a * b) // self.gcd(a, b)
def from_GaussianIntegerRing(K1, a, K0):
"""Convert a ZZ_I element to ZZ_I."""
return a
def from_GaussianRationalField(K1, a, K0):
"""Convert a QQ_I element to ZZ_I."""
return K1.new(ZZ.convert(a.x), ZZ.convert(a.y))
ZZ_I = GaussianInteger._parent = GaussianIntegerRing()
class GaussianRationalField(GaussianDomain, Field):
"""Field of Gaussian rational numbers."""
dom = QQ
dtype = GaussianRational
zero = dtype(0, 0)
one = dtype(1, 0)
rep = 'QQ_I'
is_GaussianField = True
is_QQ_I = True
def __init__(self): # override Domain.__init__
"""For constructing QQ_I."""
def get_ring(self):
"""Returns a ring associated with ``self``. """
return ZZ_I
def get_field(self):
"""Returns a field associated with ``self``. """
return self
def as_AlgebraicField(self):
"""Get equivalent domain as an ``AlgebraicField``. """
return AlgebraicField(self.dom, I)
def numer(self, a):
"""Get the numerator of ``a``."""
ZZ_I = self.get_ring()
return ZZ_I.convert(a * self.denom(a))
def denom(self, a):
"""Get the denominator of ``a``."""
ZZ = self.dom.get_ring()
QQ = self.dom
ZZ_I = self.get_ring()
denom_ZZ = ZZ.lcm(QQ.denom(a.x), QQ.denom(a.y))
return ZZ_I(denom_ZZ, ZZ.zero)
def from_GaussianIntegerRing(K1, a, K0):
"""Convert a ZZ_I element to QQ_I."""
return K1.new(a.x, a.y)
def from_GaussianRationalField(K1, a, K0):
"""Convert a QQ_I element to QQ_I."""
return a
QQ_I = GaussianRational._parent = GaussianRationalField()
|
abe6aac204ca98bddf23075a778dc617a98693b333e0caf44960cacf5692357b
|
"""Implementation of :class:`GMPYIntegerRing` class. """
from __future__ import print_function, division
from sympy.polys.domains.groundtypes import (
GMPYInteger, SymPyInteger,
gmpy_factorial,
gmpy_gcdex, gmpy_gcd, gmpy_lcm, gmpy_sqrt,
)
from sympy.polys.domains.integerring import IntegerRing
from sympy.polys.polyerrors import CoercionFailed
from sympy.utilities import public
@public
class GMPYIntegerRing(IntegerRing):
"""Integer ring based on GMPY's ``mpz`` type. """
dtype = GMPYInteger
zero = dtype(0)
one = dtype(1)
tp = type(one)
alias = 'ZZ_gmpy'
def __init__(self):
"""Allow instantiation of this domain. """
def to_sympy(self, a):
"""Convert ``a`` to a SymPy object. """
return SymPyInteger(int(a))
def from_sympy(self, a):
"""Convert SymPy's Integer to ``dtype``. """
if a.is_Integer:
return GMPYInteger(a.p)
elif a.is_Float and int(a) == a:
return GMPYInteger(int(a))
else:
raise CoercionFailed("expected an integer, got %s" % a)
def from_FF_python(K1, a, K0):
"""Convert ``ModularInteger(int)`` to GMPY's ``mpz``. """
return GMPYInteger(a.to_int())
def from_ZZ_python(K1, a, K0):
"""Convert Python's ``int`` to GMPY's ``mpz``. """
return GMPYInteger(a)
def from_QQ_python(K1, a, K0):
"""Convert Python's ``Fraction`` to GMPY's ``mpz``. """
if a.denominator == 1:
return GMPYInteger(a.numerator)
def from_FF_gmpy(K1, a, K0):
"""Convert ``ModularInteger(mpz)`` to GMPY's ``mpz``. """
return a.to_int()
def from_ZZ_gmpy(K1, a, K0):
"""Convert GMPY's ``mpz`` to GMPY's ``mpz``. """
return a
def from_QQ_gmpy(K1, a, K0):
"""Convert GMPY ``mpq`` to GMPY's ``mpz``. """
if a.denominator == 1:
return a.numerator
def from_RealField(K1, a, K0):
"""Convert mpmath's ``mpf`` to GMPY's ``mpz``. """
p, q = K0.to_rational(a)
if q == 1:
return GMPYInteger(p)
def from_GaussianIntegerRing(K1, a, K0):
if a.y == 0:
return a.x
def gcdex(self, a, b):
"""Compute extended GCD of ``a`` and ``b``. """
h, s, t = gmpy_gcdex(a, b)
return s, t, h
def gcd(self, a, b):
"""Compute GCD of ``a`` and ``b``. """
return gmpy_gcd(a, b)
def lcm(self, a, b):
"""Compute LCM of ``a`` and ``b``. """
return gmpy_lcm(a, b)
def sqrt(self, a):
"""Compute square root of ``a``. """
return gmpy_sqrt(a)
def factorial(self, a):
"""Compute factorial of ``a``. """
return gmpy_factorial(a)
|
49024d5e8087fee9138219f43ce5bbfd0fc729fd83280e451f060375f99663ae
|
"""Implementation of :class:`Domain` class. """
from __future__ import print_function, division
from typing import Any, Optional, Type
from sympy.core import Basic, sympify
from sympy.core.compatibility import HAS_GMPY, is_sequence
from sympy.core.decorators import deprecated
from sympy.polys.domains.domainelement import DomainElement
from sympy.polys.orderings import lex
from sympy.polys.polyerrors import UnificationFailed, CoercionFailed, DomainError
from sympy.polys.polyutils import _unify_gens, _not_a_coeff
from sympy.utilities import default_sort_key, public
@public
class Domain(object):
"""Represents an abstract domain. """
dtype = None # type: Optional[Type]
zero = None # type: Optional[Any]
one = None # type: Optional[Any]
is_Ring = False
is_Field = False
has_assoc_Ring = False
has_assoc_Field = False
is_FiniteField = is_FF = False
is_IntegerRing = is_ZZ = False
is_RationalField = is_QQ = False
is_GaussianRing = is_ZZ_I = False
is_GaussianField = is_QQ_I = False
is_RealField = is_RR = False
is_ComplexField = is_CC = False
is_AlgebraicField = is_Algebraic = False
is_PolynomialRing = is_Poly = False
is_FractionField = is_Frac = False
is_SymbolicDomain = is_EX = False
is_Exact = True
is_Numerical = False
is_Simple = False
is_Composite = False
is_PID = False
has_CharacteristicZero = False
rep = None # type: Optional[str]
alias = None # type: Optional[str]
@property # type: ignore
@deprecated(useinstead="is_Field", issue=12723, deprecated_since_version="1.1")
def has_Field(self):
return self.is_Field
@property # type: ignore
@deprecated(useinstead="is_Ring", issue=12723, deprecated_since_version="1.1")
def has_Ring(self):
return self.is_Ring
def __init__(self):
raise NotImplementedError
def __str__(self):
return self.rep
def __repr__(self):
return str(self)
def __hash__(self):
return hash((self.__class__.__name__, self.dtype))
def new(self, *args):
return self.dtype(*args)
@property
def tp(self):
return self.dtype
def __call__(self, *args):
"""Construct an element of ``self`` domain from ``args``. """
return self.new(*args)
def normal(self, *args):
return self.dtype(*args)
def convert_from(self, element, base):
"""Convert ``element`` to ``self.dtype`` given the base domain. """
if base.alias is not None:
method = "from_" + base.alias
else:
method = "from_" + base.__class__.__name__
_convert = getattr(self, method)
if _convert is not None:
result = _convert(element, base)
if result is not None:
return result
raise CoercionFailed("can't convert %s of type %s from %s to %s" % (element, type(element), base, self))
def convert(self, element, base=None):
"""Convert ``element`` to ``self.dtype``. """
if _not_a_coeff(element):
raise CoercionFailed('%s is not in any domain' % element)
if base is not None:
return self.convert_from(element, base)
if self.of_type(element):
return element
from sympy.polys.domains import PythonIntegerRing, GMPYIntegerRing, GMPYRationalField, RealField, ComplexField
if isinstance(element, int):
return self.convert_from(element, PythonIntegerRing())
if HAS_GMPY:
integers = GMPYIntegerRing()
if isinstance(element, integers.tp):
return self.convert_from(element, integers)
rationals = GMPYRationalField()
if isinstance(element, rationals.tp):
return self.convert_from(element, rationals)
if isinstance(element, float):
parent = RealField(tol=False)
return self.convert_from(parent(element), parent)
if isinstance(element, complex):
parent = ComplexField(tol=False)
return self.convert_from(parent(element), parent)
if isinstance(element, DomainElement):
return self.convert_from(element, element.parent())
# TODO: implement this in from_ methods
if self.is_Numerical and getattr(element, 'is_ground', False):
return self.convert(element.LC())
if isinstance(element, Basic):
try:
return self.from_sympy(element)
except (TypeError, ValueError):
pass
else: # TODO: remove this branch
if not is_sequence(element):
try:
element = sympify(element, strict=True)
if isinstance(element, Basic):
return self.from_sympy(element)
except (TypeError, ValueError):
pass
raise CoercionFailed("can't convert %s of type %s to %s" % (element, type(element), self))
def of_type(self, element):
"""Check if ``a`` is of type ``dtype``. """
return isinstance(element, self.tp) # XXX: this isn't correct, e.g. PolyElement
def __contains__(self, a):
"""Check if ``a`` belongs to this domain. """
try:
if _not_a_coeff(a):
raise CoercionFailed
self.convert(a) # this might raise, too
except CoercionFailed:
return False
return True
def to_sympy(self, a):
"""Convert ``a`` to a SymPy object. """
raise NotImplementedError
def from_sympy(self, a):
"""Convert a SymPy object to ``dtype``. """
raise NotImplementedError
def from_FF_python(K1, a, K0):
"""Convert ``ModularInteger(int)`` to ``dtype``. """
return None
def from_ZZ_python(K1, a, K0):
"""Convert a Python ``int`` object to ``dtype``. """
return None
def from_QQ_python(K1, a, K0):
"""Convert a Python ``Fraction`` object to ``dtype``. """
return None
def from_FF_gmpy(K1, a, K0):
"""Convert ``ModularInteger(mpz)`` to ``dtype``. """
return None
def from_ZZ_gmpy(K1, a, K0):
"""Convert a GMPY ``mpz`` object to ``dtype``. """
return None
def from_QQ_gmpy(K1, a, K0):
"""Convert a GMPY ``mpq`` object to ``dtype``. """
return None
def from_RealField(K1, a, K0):
"""Convert a real element object to ``dtype``. """
return None
def from_ComplexField(K1, a, K0):
"""Convert a complex element to ``dtype``. """
return None
def from_AlgebraicField(K1, a, K0):
"""Convert an algebraic number to ``dtype``. """
return None
def from_PolynomialRing(K1, a, K0):
"""Convert a polynomial to ``dtype``. """
if a.is_ground:
return K1.convert(a.LC, K0.dom)
def from_FractionField(K1, a, K0):
"""Convert a rational function to ``dtype``. """
return None
def from_ExpressionDomain(K1, a, K0):
"""Convert a ``EX`` object to ``dtype``. """
return K1.from_sympy(a.ex)
def from_GlobalPolynomialRing(K1, a, K0):
"""Convert a polynomial to ``dtype``. """
if a.degree() <= 0:
return K1.convert(a.LC(), K0.dom)
def from_GeneralizedPolynomialRing(K1, a, K0):
return K1.from_FractionField(a, K0)
def unify_with_symbols(K0, K1, symbols):
if (K0.is_Composite and (set(K0.symbols) & set(symbols))) or (K1.is_Composite and (set(K1.symbols) & set(symbols))):
raise UnificationFailed("can't unify %s with %s, given %s generators" % (K0, K1, tuple(symbols)))
return K0.unify(K1)
def unify(K0, K1, symbols=None):
"""
Construct a minimal domain that contains elements of ``K0`` and ``K1``.
Known domains (from smallest to largest):
- ``GF(p)``
- ``ZZ``
- ``QQ``
- ``RR(prec, tol)``
- ``CC(prec, tol)``
- ``ALG(a, b, c)``
- ``K[x, y, z]``
- ``K(x, y, z)``
- ``EX``
"""
if symbols is not None:
return K0.unify_with_symbols(K1, symbols)
if K0 == K1:
return K0
if K0.is_EX:
return K0
if K1.is_EX:
return K1
if K0.is_Composite or K1.is_Composite:
K0_ground = K0.dom if K0.is_Composite else K0
K1_ground = K1.dom if K1.is_Composite else K1
K0_symbols = K0.symbols if K0.is_Composite else ()
K1_symbols = K1.symbols if K1.is_Composite else ()
domain = K0_ground.unify(K1_ground)
symbols = _unify_gens(K0_symbols, K1_symbols)
order = K0.order if K0.is_Composite else K1.order
if ((K0.is_FractionField and K1.is_PolynomialRing or
K1.is_FractionField and K0.is_PolynomialRing) and
(not K0_ground.is_Field or not K1_ground.is_Field) and domain.is_Field):
domain = domain.get_ring()
if K0.is_Composite and (not K1.is_Composite or K0.is_FractionField or K1.is_PolynomialRing):
cls = K0.__class__
else:
cls = K1.__class__
from sympy.polys.domains.old_polynomialring import GlobalPolynomialRing
if cls == GlobalPolynomialRing:
return cls(domain, symbols)
return cls(domain, symbols, order)
def mkinexact(cls, K0, K1):
prec = max(K0.precision, K1.precision)
tol = max(K0.tolerance, K1.tolerance)
return cls(prec=prec, tol=tol)
if K1.is_ComplexField:
K0, K1 = K1, K0
if K0.is_ComplexField:
if K1.is_ComplexField or K1.is_RealField:
return mkinexact(K0.__class__, K0, K1)
else:
return K0
if K1.is_RealField:
K0, K1 = K1, K0
if K0.is_RealField:
if K1.is_RealField:
return mkinexact(K0.__class__, K0, K1)
elif K1.is_GaussianRing or K1.is_GaussianField:
from sympy.polys.domains.complexfield import ComplexField
return ComplexField(prec=K0.precision, tol=K0.tolerance)
else:
return K0
if K1.is_AlgebraicField:
K0, K1 = K1, K0
if K0.is_AlgebraicField:
if K1.is_GaussianRing:
K1 = K1.get_field()
if K1.is_GaussianField:
K1 = K1.as_AlgebraicField()
if K1.is_AlgebraicField:
return K0.__class__(K0.dom.unify(K1.dom), *_unify_gens(K0.orig_ext, K1.orig_ext))
else:
return K0
if K0.is_GaussianField:
return K0
if K1.is_GaussianField:
return K1
if K0.is_GaussianRing:
if K1.is_RationalField:
K0 = K0.get_field()
return K0
if K1.is_GaussianRing:
if K0.is_RationalField:
K1 = K1.get_field()
return K1
if K0.is_RationalField:
return K0
if K1.is_RationalField:
return K1
if K0.is_IntegerRing:
return K0
if K1.is_IntegerRing:
return K1
if K0.is_FiniteField and K1.is_FiniteField:
return K0.__class__(max(K0.mod, K1.mod, key=default_sort_key))
from sympy.polys.domains import EX
return EX
def __eq__(self, other):
"""Returns ``True`` if two domains are equivalent. """
return isinstance(other, Domain) and self.dtype == other.dtype
def __ne__(self, other):
"""Returns ``False`` if two domains are equivalent. """
return not self == other
def map(self, seq):
"""Rersively apply ``self`` to all elements of ``seq``. """
result = []
for elt in seq:
if isinstance(elt, list):
result.append(self.map(elt))
else:
result.append(self(elt))
return result
def get_ring(self):
"""Returns a ring associated with ``self``. """
raise DomainError('there is no ring associated with %s' % self)
def get_field(self):
"""Returns a field associated with ``self``. """
raise DomainError('there is no field associated with %s' % self)
def get_exact(self):
"""Returns an exact domain associated with ``self``. """
return self
def __getitem__(self, symbols):
"""The mathematical way to make a polynomial ring. """
if hasattr(symbols, '__iter__'):
return self.poly_ring(*symbols)
else:
return self.poly_ring(symbols)
def poly_ring(self, *symbols, **kwargs):
"""Returns a polynomial ring, i.e. `K[X]`. """
from sympy.polys.domains.polynomialring import PolynomialRing
return PolynomialRing(self, symbols, kwargs.get("order", lex))
def frac_field(self, *symbols, **kwargs):
"""Returns a fraction field, i.e. `K(X)`. """
from sympy.polys.domains.fractionfield import FractionField
return FractionField(self, symbols, kwargs.get("order", lex))
def old_poly_ring(self, *symbols, **kwargs):
"""Returns a polynomial ring, i.e. `K[X]`. """
from sympy.polys.domains.old_polynomialring import PolynomialRing
return PolynomialRing(self, *symbols, **kwargs)
def old_frac_field(self, *symbols, **kwargs):
"""Returns a fraction field, i.e. `K(X)`. """
from sympy.polys.domains.old_fractionfield import FractionField
return FractionField(self, *symbols, **kwargs)
def algebraic_field(self, *extension):
r"""Returns an algebraic field, i.e. `K(\alpha, \ldots)`. """
raise DomainError("can't create algebraic field over %s" % self)
def inject(self, *symbols):
"""Inject generators into this domain. """
raise NotImplementedError
def is_zero(self, a):
"""Returns True if ``a`` is zero. """
return not a
def is_one(self, a):
"""Returns True if ``a`` is one. """
return a == self.one
def is_positive(self, a):
"""Returns True if ``a`` is positive. """
return a > 0
def is_negative(self, a):
"""Returns True if ``a`` is negative. """
return a < 0
def is_nonpositive(self, a):
"""Returns True if ``a`` is non-positive. """
return a <= 0
def is_nonnegative(self, a):
"""Returns True if ``a`` is non-negative. """
return a >= 0
def abs(self, a):
"""Absolute value of ``a``, implies ``__abs__``. """
return abs(a)
def neg(self, a):
"""Returns ``a`` negated, implies ``__neg__``. """
return -a
def pos(self, a):
"""Returns ``a`` positive, implies ``__pos__``. """
return +a
def add(self, a, b):
"""Sum of ``a`` and ``b``, implies ``__add__``. """
return a + b
def sub(self, a, b):
"""Difference of ``a`` and ``b``, implies ``__sub__``. """
return a - b
def mul(self, a, b):
"""Product of ``a`` and ``b``, implies ``__mul__``. """
return a * b
def pow(self, a, b):
"""Raise ``a`` to power ``b``, implies ``__pow__``. """
return a ** b
def exquo(self, a, b):
"""Exact quotient of ``a`` and ``b``, implies something. """
raise NotImplementedError
def quo(self, a, b):
"""Quotient of ``a`` and ``b``, implies something. """
raise NotImplementedError
def rem(self, a, b):
"""Remainder of ``a`` and ``b``, implies ``__mod__``. """
raise NotImplementedError
def div(self, a, b):
"""Division of ``a`` and ``b``, implies something. """
raise NotImplementedError
def invert(self, a, b):
"""Returns inversion of ``a mod b``, implies something. """
raise NotImplementedError
def revert(self, a):
"""Returns ``a**(-1)`` if possible. """
raise NotImplementedError
def numer(self, a):
"""Returns numerator of ``a``. """
raise NotImplementedError
def denom(self, a):
"""Returns denominator of ``a``. """
raise NotImplementedError
def half_gcdex(self, a, b):
"""Half extended GCD of ``a`` and ``b``. """
s, t, h = self.gcdex(a, b)
return s, h
def gcdex(self, a, b):
"""Extended GCD of ``a`` and ``b``. """
raise NotImplementedError
def cofactors(self, a, b):
"""Returns GCD and cofactors of ``a`` and ``b``. """
gcd = self.gcd(a, b)
cfa = self.quo(a, gcd)
cfb = self.quo(b, gcd)
return gcd, cfa, cfb
def gcd(self, a, b):
"""Returns GCD of ``a`` and ``b``. """
raise NotImplementedError
def lcm(self, a, b):
"""Returns LCM of ``a`` and ``b``. """
raise NotImplementedError
def log(self, a, b):
"""Returns b-base logarithm of ``a``. """
raise NotImplementedError
def sqrt(self, a):
"""Returns square root of ``a``. """
raise NotImplementedError
def evalf(self, a, prec=None, **options):
"""Returns numerical approximation of ``a``. """
return self.to_sympy(a).evalf(prec, **options)
n = evalf
def real(self, a):
return a
def imag(self, a):
return self.zero
def almosteq(self, a, b, tolerance=None):
"""Check if ``a`` and ``b`` are almost equal. """
return a == b
def characteristic(self):
"""Return the characteristic of this domain. """
raise NotImplementedError('characteristic()')
__all__ = ['Domain']
|
e1fd73546fd2beff5d9feee55f9be21e05afcac5c3d6eae52400a79accb1150f
|
"""Tools for polynomial factorization routines in characteristic zero. """
from sympy.polys.rings import ring, xring
from sympy.polys.domains import FF, ZZ, QQ, ZZ_I, QQ_I, RR, EX
from sympy.polys import polyconfig as config
from sympy.polys.polyerrors import DomainError
from sympy.polys.polyclasses import ANP
from sympy.polys.specialpolys import f_polys, w_polys
from sympy import nextprime, sin, sqrt, I
from sympy.testing.pytest import raises, XFAIL
f_0, f_1, f_2, f_3, f_4, f_5, f_6 = f_polys()
w_1, w_2 = w_polys()
def test_dup_trial_division():
R, x = ring("x", ZZ)
assert R.dup_trial_division(x**5 + 8*x**4 + 25*x**3 + 38*x**2 + 28*x + 8, (x + 1, x + 2)) == [(x + 1, 2), (x + 2, 3)]
def test_dmp_trial_division():
R, x, y = ring("x,y", ZZ)
assert R.dmp_trial_division(x**5 + 8*x**4 + 25*x**3 + 38*x**2 + 28*x + 8, (x + 1, x + 2)) == [(x + 1, 2), (x + 2, 3)]
def test_dup_zz_mignotte_bound():
R, x = ring("x", ZZ)
assert R.dup_zz_mignotte_bound(2*x**2 + 3*x + 4) == 6
assert R.dup_zz_mignotte_bound(x**3 + 14*x**2 + 56*x + 64) == 152
def test_dmp_zz_mignotte_bound():
R, x, y = ring("x,y", ZZ)
assert R.dmp_zz_mignotte_bound(2*x**2 + 3*x + 4) == 32
def test_dup_zz_hensel_step():
R, x = ring("x", ZZ)
f = x**4 - 1
g = x**3 + 2*x**2 - x - 2
h = x - 2
s = -2
t = 2*x**2 - 2*x - 1
G, H, S, T = R.dup_zz_hensel_step(5, f, g, h, s, t)
assert G == x**3 + 7*x**2 - x - 7
assert H == x - 7
assert S == 8
assert T == -8*x**2 - 12*x - 1
def test_dup_zz_hensel_lift():
R, x = ring("x", ZZ)
f = x**4 - 1
F = [x - 1, x - 2, x + 2, x + 1]
assert R.dup_zz_hensel_lift(ZZ(5), f, F, 4) == \
[x - 1, x - 182, x + 182, x + 1]
def test_dup_zz_irreducible_p():
R, x = ring("x", ZZ)
assert R.dup_zz_irreducible_p(3*x**4 + 2*x**3 + 6*x**2 + 8*x + 7) is None
assert R.dup_zz_irreducible_p(3*x**4 + 2*x**3 + 6*x**2 + 8*x + 4) is None
assert R.dup_zz_irreducible_p(3*x**4 + 2*x**3 + 6*x**2 + 8*x + 10) is True
assert R.dup_zz_irreducible_p(3*x**4 + 2*x**3 + 6*x**2 + 8*x + 14) is True
def test_dup_cyclotomic_p():
R, x = ring("x", ZZ)
assert R.dup_cyclotomic_p(x - 1) is True
assert R.dup_cyclotomic_p(x + 1) is True
assert R.dup_cyclotomic_p(x**2 + x + 1) is True
assert R.dup_cyclotomic_p(x**2 + 1) is True
assert R.dup_cyclotomic_p(x**4 + x**3 + x**2 + x + 1) is True
assert R.dup_cyclotomic_p(x**2 - x + 1) is True
assert R.dup_cyclotomic_p(x**6 + x**5 + x**4 + x**3 + x**2 + x + 1) is True
assert R.dup_cyclotomic_p(x**4 + 1) is True
assert R.dup_cyclotomic_p(x**6 + x**3 + 1) is True
assert R.dup_cyclotomic_p(0) is False
assert R.dup_cyclotomic_p(1) is False
assert R.dup_cyclotomic_p(x) is False
assert R.dup_cyclotomic_p(x + 2) is False
assert R.dup_cyclotomic_p(3*x + 1) is False
assert R.dup_cyclotomic_p(x**2 - 1) is False
f = x**16 + x**14 - x**10 + x**8 - x**6 + x**2 + 1
assert R.dup_cyclotomic_p(f) is False
g = x**16 + x**14 - x**10 - x**8 - x**6 + x**2 + 1
assert R.dup_cyclotomic_p(g) is True
R, x = ring("x", QQ)
assert R.dup_cyclotomic_p(x**2 + x + 1) is True
assert R.dup_cyclotomic_p(QQ(1,2)*x**2 + x + 1) is False
R, x = ring("x", ZZ["y"])
assert R.dup_cyclotomic_p(x**2 + x + 1) is False
def test_dup_zz_cyclotomic_poly():
R, x = ring("x", ZZ)
assert R.dup_zz_cyclotomic_poly(1) == x - 1
assert R.dup_zz_cyclotomic_poly(2) == x + 1
assert R.dup_zz_cyclotomic_poly(3) == x**2 + x + 1
assert R.dup_zz_cyclotomic_poly(4) == x**2 + 1
assert R.dup_zz_cyclotomic_poly(5) == x**4 + x**3 + x**2 + x + 1
assert R.dup_zz_cyclotomic_poly(6) == x**2 - x + 1
assert R.dup_zz_cyclotomic_poly(7) == x**6 + x**5 + x**4 + x**3 + x**2 + x + 1
assert R.dup_zz_cyclotomic_poly(8) == x**4 + 1
assert R.dup_zz_cyclotomic_poly(9) == x**6 + x**3 + 1
def test_dup_zz_cyclotomic_factor():
R, x = ring("x", ZZ)
assert R.dup_zz_cyclotomic_factor(0) is None
assert R.dup_zz_cyclotomic_factor(1) is None
assert R.dup_zz_cyclotomic_factor(2*x**10 - 1) is None
assert R.dup_zz_cyclotomic_factor(x**10 - 3) is None
assert R.dup_zz_cyclotomic_factor(x**10 + x**5 - 1) is None
assert R.dup_zz_cyclotomic_factor(x + 1) == [x + 1]
assert R.dup_zz_cyclotomic_factor(x - 1) == [x - 1]
assert R.dup_zz_cyclotomic_factor(x**2 + 1) == [x**2 + 1]
assert R.dup_zz_cyclotomic_factor(x**2 - 1) == [x - 1, x + 1]
assert R.dup_zz_cyclotomic_factor(x**27 + 1) == \
[x + 1, x**2 - x + 1, x**6 - x**3 + 1, x**18 - x**9 + 1]
assert R.dup_zz_cyclotomic_factor(x**27 - 1) == \
[x - 1, x**2 + x + 1, x**6 + x**3 + 1, x**18 + x**9 + 1]
def test_dup_zz_factor():
R, x = ring("x", ZZ)
assert R.dup_zz_factor(0) == (0, [])
assert R.dup_zz_factor(7) == (7, [])
assert R.dup_zz_factor(-7) == (-7, [])
assert R.dup_zz_factor_sqf(0) == (0, [])
assert R.dup_zz_factor_sqf(7) == (7, [])
assert R.dup_zz_factor_sqf(-7) == (-7, [])
assert R.dup_zz_factor(2*x + 4) == (2, [(x + 2, 1)])
assert R.dup_zz_factor_sqf(2*x + 4) == (2, [x + 2])
f = x**4 + x + 1
for i in range(0, 20):
assert R.dup_zz_factor(f) == (1, [(f, 1)])
assert R.dup_zz_factor(x**2 + 2*x + 2) == \
(1, [(x**2 + 2*x + 2, 1)])
assert R.dup_zz_factor(18*x**2 + 12*x + 2) == \
(2, [(3*x + 1, 2)])
assert R.dup_zz_factor(-9*x**2 + 1) == \
(-1, [(3*x - 1, 1),
(3*x + 1, 1)])
assert R.dup_zz_factor_sqf(-9*x**2 + 1) == \
(-1, [3*x - 1,
3*x + 1])
assert R.dup_zz_factor(x**3 - 6*x**2 + 11*x - 6) == \
(1, [(x - 3, 1),
(x - 2, 1),
(x - 1, 1)])
assert R.dup_zz_factor_sqf(x**3 - 6*x**2 + 11*x - 6) == \
(1, [x - 3,
x - 2,
x - 1])
assert R.dup_zz_factor(3*x**3 + 10*x**2 + 13*x + 10) == \
(1, [(x + 2, 1),
(3*x**2 + 4*x + 5, 1)])
assert R.dup_zz_factor_sqf(3*x**3 + 10*x**2 + 13*x + 10) == \
(1, [x + 2,
3*x**2 + 4*x + 5])
assert R.dup_zz_factor(-x**6 + x**2) == \
(-1, [(x - 1, 1),
(x + 1, 1),
(x, 2),
(x**2 + 1, 1)])
f = 1080*x**8 + 5184*x**7 + 2099*x**6 + 744*x**5 + 2736*x**4 - 648*x**3 + 129*x**2 - 324
assert R.dup_zz_factor(f) == \
(1, [(5*x**4 + 24*x**3 + 9*x**2 + 12, 1),
(216*x**4 + 31*x**2 - 27, 1)])
f = -29802322387695312500000000000000000000*x**25 \
+ 2980232238769531250000000000000000*x**20 \
+ 1743435859680175781250000000000*x**15 \
+ 114142894744873046875000000*x**10 \
- 210106372833251953125*x**5 \
+ 95367431640625
assert R.dup_zz_factor(f) == \
(-95367431640625, [(5*x - 1, 1),
(100*x**2 + 10*x - 1, 2),
(625*x**4 + 125*x**3 + 25*x**2 + 5*x + 1, 1),
(10000*x**4 - 3000*x**3 + 400*x**2 - 20*x + 1, 2),
(10000*x**4 + 2000*x**3 + 400*x**2 + 30*x + 1, 2)])
f = x**10 - 1
config.setup('USE_CYCLOTOMIC_FACTOR', True)
F_0 = R.dup_zz_factor(f)
config.setup('USE_CYCLOTOMIC_FACTOR', False)
F_1 = R.dup_zz_factor(f)
assert F_0 == F_1 == \
(1, [(x - 1, 1),
(x + 1, 1),
(x**4 - x**3 + x**2 - x + 1, 1),
(x**4 + x**3 + x**2 + x + 1, 1)])
config.setup('USE_CYCLOTOMIC_FACTOR')
f = x**10 + 1
config.setup('USE_CYCLOTOMIC_FACTOR', True)
F_0 = R.dup_zz_factor(f)
config.setup('USE_CYCLOTOMIC_FACTOR', False)
F_1 = R.dup_zz_factor(f)
assert F_0 == F_1 == \
(1, [(x**2 + 1, 1),
(x**8 - x**6 + x**4 - x**2 + 1, 1)])
config.setup('USE_CYCLOTOMIC_FACTOR')
def test_dmp_zz_wang():
R, x,y,z = ring("x,y,z", ZZ)
UV, _x = ring("x", ZZ)
p = ZZ(nextprime(R.dmp_zz_mignotte_bound(w_1)))
assert p == 6291469
t_1, k_1, e_1 = y, 1, ZZ(-14)
t_2, k_2, e_2 = z, 2, ZZ(3)
t_3, k_3, e_3 = y + z, 2, ZZ(-11)
t_4, k_4, e_4 = y - z, 1, ZZ(-17)
T = [t_1, t_2, t_3, t_4]
K = [k_1, k_2, k_3, k_4]
E = [e_1, e_2, e_3, e_4]
T = zip([ t.drop(x) for t in T ], K)
A = [ZZ(-14), ZZ(3)]
S = R.dmp_eval_tail(w_1, A)
cs, s = UV.dup_primitive(S)
assert cs == 1 and s == S == \
1036728*_x**6 + 915552*_x**5 + 55748*_x**4 + 105621*_x**3 - 17304*_x**2 - 26841*_x - 644
assert R.dmp_zz_wang_non_divisors(E, cs, ZZ(4)) == [7, 3, 11, 17]
assert UV.dup_sqf_p(s) and UV.dup_degree(s) == R.dmp_degree(w_1)
_, H = UV.dup_zz_factor_sqf(s)
h_1 = 44*_x**2 + 42*_x + 1
h_2 = 126*_x**2 - 9*_x + 28
h_3 = 187*_x**2 - 23
assert H == [h_1, h_2, h_3]
LC = [ lc.drop(x) for lc in [-4*y - 4*z, -y*z**2, y**2 - z**2] ]
assert R.dmp_zz_wang_lead_coeffs(w_1, T, cs, E, H, A) == (w_1, H, LC)
factors = R.dmp_zz_wang_hensel_lifting(w_1, H, LC, A, p)
assert R.dmp_expand(factors) == w_1
@XFAIL
def test_dmp_zz_wang_fail():
R, x,y,z = ring("x,y,z", ZZ)
UV, _x = ring("x", ZZ)
p = ZZ(nextprime(R.dmp_zz_mignotte_bound(w_1)))
assert p == 6291469
H_1 = [44*x**2 + 42*x + 1, 126*x**2 - 9*x + 28, 187*x**2 - 23]
H_2 = [-4*x**2*y - 12*x**2 - 3*x*y + 1, -9*x**2*y - 9*x - 2*y, x**2*y**2 - 9*x**2 + y - 9]
H_3 = [-4*x**2*y - 12*x**2 - 3*x*y + 1, -9*x**2*y - 9*x - 2*y, x**2*y**2 - 9*x**2 + y - 9]
c_1 = -70686*x**5 - 5863*x**4 - 17826*x**3 + 2009*x**2 + 5031*x + 74
c_2 = 9*x**5*y**4 + 12*x**5*y**3 - 45*x**5*y**2 - 108*x**5*y - 324*x**5 + 18*x**4*y**3 - 216*x**4*y**2 - 810*x**4*y + 2*x**3*y**4 + 9*x**3*y**3 - 252*x**3*y**2 - 288*x**3*y - 945*x**3 - 30*x**2*y**2 - 414*x**2*y + 2*x*y**3 - 54*x*y**2 - 3*x*y + 81*x + 12*y
c_3 = -36*x**4*y**2 - 108*x**4*y - 27*x**3*y**2 - 36*x**3*y - 108*x**3 - 8*x**2*y**2 - 42*x**2*y - 6*x*y**2 + 9*x + 2*y
assert R.dmp_zz_diophantine(H_1, c_1, [], 5, p) == [-3*x, -2, 1]
assert R.dmp_zz_diophantine(H_2, c_2, [ZZ(-14)], 5, p) == [-x*y, -3*x, -6]
assert R.dmp_zz_diophantine(H_3, c_3, [ZZ(-14)], 5, p) == [0, 0, -1]
def test_issue_6355():
# This tests a bug in the Wang algorithm that occurred only with a very
# specific set of random numbers.
random_sequence = [-1, -1, 0, 0, 0, 0, -1, -1, 0, -1, 3, -1, 3, 3, 3, 3, -1, 3]
R, x, y, z = ring("x,y,z", ZZ)
f = 2*x**2 + y*z - y - z**2 + z
assert R.dmp_zz_wang(f, seed=random_sequence) == [f]
def test_dmp_zz_factor():
R, x = ring("x", ZZ)
assert R.dmp_zz_factor(0) == (0, [])
assert R.dmp_zz_factor(7) == (7, [])
assert R.dmp_zz_factor(-7) == (-7, [])
assert R.dmp_zz_factor(x**2 - 9) == (1, [(x - 3, 1), (x + 3, 1)])
R, x, y = ring("x,y", ZZ)
assert R.dmp_zz_factor(0) == (0, [])
assert R.dmp_zz_factor(7) == (7, [])
assert R.dmp_zz_factor(-7) == (-7, [])
assert R.dmp_zz_factor(x) == (1, [(x, 1)])
assert R.dmp_zz_factor(4*x) == (4, [(x, 1)])
assert R.dmp_zz_factor(4*x + 2) == (2, [(2*x + 1, 1)])
assert R.dmp_zz_factor(x*y + 1) == (1, [(x*y + 1, 1)])
assert R.dmp_zz_factor(y**2 + 1) == (1, [(y**2 + 1, 1)])
assert R.dmp_zz_factor(y**2 - 1) == (1, [(y - 1, 1), (y + 1, 1)])
assert R.dmp_zz_factor(x**2*y**2 + 6*x**2*y + 9*x**2 - 1) == (1, [(x*y + 3*x - 1, 1), (x*y + 3*x + 1, 1)])
assert R.dmp_zz_factor(x**2*y**2 - 9) == (1, [(x*y - 3, 1), (x*y + 3, 1)])
R, x, y, z = ring("x,y,z", ZZ)
assert R.dmp_zz_factor(x**2*y**2*z**2 - 9) == \
(1, [(x*y*z - 3, 1),
(x*y*z + 3, 1)])
R, x, y, z, u = ring("x,y,z,u", ZZ)
assert R.dmp_zz_factor(x**2*y**2*z**2*u**2 - 9) == \
(1, [(x*y*z*u - 3, 1),
(x*y*z*u + 3, 1)])
R, x, y, z = ring("x,y,z", ZZ)
assert R.dmp_zz_factor(f_1) == \
(1, [(x + y*z + 20, 1),
(x*y + z + 10, 1),
(x*z + y + 30, 1)])
assert R.dmp_zz_factor(f_2) == \
(1, [(x**2*y**2 + x**2*z**2 + y + 90, 1),
(x**3*y + x**3*z + z - 11, 1)])
assert R.dmp_zz_factor(f_3) == \
(1, [(x**2*y**2 + x*z**4 + x + z, 1),
(x**3 + x*y*z + y**2 + y*z**3, 1)])
assert R.dmp_zz_factor(f_4) == \
(-1, [(x*y**3 + z**2, 1),
(x**2*z + y**4*z**2 + 5, 1),
(x**3*y - z**2 - 3, 1),
(x**3*y**4 + z**2, 1)])
assert R.dmp_zz_factor(f_5) == \
(-1, [(x + y - z, 3)])
R, x, y, z, t = ring("x,y,z,t", ZZ)
assert R.dmp_zz_factor(f_6) == \
(1, [(47*x*y + z**3*t**2 - t**2, 1),
(45*x**3 - 9*y**3 - y**2 + 3*z**3 + 2*z*t, 1)])
R, x, y, z = ring("x,y,z", ZZ)
assert R.dmp_zz_factor(w_1) == \
(1, [(x**2*y**2 - x**2*z**2 + y - z**2, 1),
(x**2*y*z**2 + 3*x*z + 2*y, 1),
(4*x**2*y + 4*x**2*z + x*y*z - 1, 1)])
R, x, y = ring("x,y", ZZ)
f = -12*x**16*y + 240*x**12*y**3 - 768*x**10*y**4 + 1080*x**8*y**5 - 768*x**6*y**6 + 240*x**4*y**7 - 12*y**9
assert R.dmp_zz_factor(f) == \
(-12, [(y, 1),
(x**2 - y, 6),
(x**4 + 6*x**2*y + y**2, 1)])
def test_dup_qq_i_factor():
R, x = ring("x", QQ_I)
i = QQ_I(0, 1)
assert R.dup_qq_i_factor(x**2 - 2) == (QQ_I(1, 0), [(x**2 - 2, 1)])
assert R.dup_qq_i_factor(x**2 - 1) == (QQ_I(1, 0), [(x - 1, 1), (x + 1, 1)])
assert R.dup_qq_i_factor(x**2 + 1) == (QQ_I(1, 0), [(x - i, 1), (x + i, 1)])
assert R.dup_qq_i_factor(x**2/4 + 1) == \
(QQ_I(QQ(1, 4), 0), [(x - 2*i, 1), (x + 2*i, 1)])
assert R.dup_qq_i_factor(x**2 + 4) == \
(QQ_I(1, 0), [(x - 2*i, 1), (x + 2*i, 1)])
assert R.dup_qq_i_factor(x**2 + 2*x + 1) == \
(QQ_I(1, 0), [(x + 1, 2)])
assert R.dup_qq_i_factor(x**2 + 2*i*x - 1) == \
(QQ_I(1, 0), [(x + i, 2)])
f = 8192*x**2 + x*(22656 + 175232*i) - 921416 + 242313*i
assert R.dup_qq_i_factor(f) == \
(QQ_I(8192, 0), [(x + QQ_I(QQ(177, 128), QQ(1369, 128)), 2)])
def test_dmp_qq_i_factor():
R, x, y = ring("x, y", QQ_I)
i = QQ_I(0, 1)
assert R.dmp_qq_i_factor(x**2 + 2*y**2) == \
(QQ_I(1, 0), [(x**2 + 2*y**2, 1)])
assert R.dmp_qq_i_factor(x**2 + y**2) == \
(QQ_I(1, 0), [(x - i*y, 1), (x + i*y, 1)])
assert R.dmp_qq_i_factor(x**2 + y**2/4) == \
(QQ_I(1, 0), [(x - i*y/2, 1), (x + i*y/2, 1)])
assert R.dmp_qq_i_factor(4*x**2 + y**2) == \
(QQ_I(4, 0), [(x - i*y/2, 1), (x + i*y/2, 1)])
def test_dup_zz_i_factor():
R, x = ring("x", ZZ_I)
i = ZZ_I(0, 1)
assert R.dup_zz_i_factor(x**2 - 2) == (ZZ_I(1, 0), [(x**2 - 2, 1)])
assert R.dup_zz_i_factor(x**2 - 1) == (ZZ_I(1, 0), [(x - 1, 1), (x + 1, 1)])
assert R.dup_zz_i_factor(x**2 + 1) == (ZZ_I(1, 0), [(x - i, 1), (x + i, 1)])
assert R.dup_zz_i_factor(x**2 + 4) == \
(ZZ_I(1, 0), [(x - 2*i, 1), (x + 2*i, 1)])
assert R.dup_zz_i_factor(x**2 + 2*x + 1) == \
(ZZ_I(1, 0), [(x + 1, 2)])
assert R.dup_zz_i_factor(x**2 + 2*i*x - 1) == \
(ZZ_I(1, 0), [(x + i, 2)])
f = 8192*x**2 + x*(22656 + 175232*i) - 921416 + 242313*i
assert R.dup_zz_i_factor(f) == \
(ZZ_I(0, 1), [((64 - 64*i)*x + (773 + 596*i), 2)])
def test_dmp_zz_i_factor():
R, x, y = ring("x, y", ZZ_I)
i = ZZ_I(0, 1)
assert R.dmp_zz_i_factor(x**2 + 2*y**2) == \
(ZZ_I(1, 0), [(x**2 + 2*y**2, 1)])
assert R.dmp_zz_i_factor(x**2 + y**2) == \
(ZZ_I(1, 0), [(x - i*y, 1), (x + i*y, 1)])
assert R.dmp_zz_i_factor(4*x**2 + y**2) == \
(ZZ_I(1, 0), [(2*x - i*y, 1), (2*x + i*y, 1)])
def test_dup_ext_factor():
R, x = ring("x", QQ.algebraic_field(I))
def anp(element):
return ANP(element, [QQ(1), QQ(0), QQ(1)], QQ)
assert R.dup_ext_factor(0) == (anp([]), [])
f = anp([QQ(1)])*x + anp([QQ(1)])
assert R.dup_ext_factor(f) == (anp([QQ(1)]), [(f, 1)])
g = anp([QQ(2)])*x + anp([QQ(2)])
assert R.dup_ext_factor(g) == (anp([QQ(2)]), [(f, 1)])
f = anp([QQ(7)])*x**4 + anp([QQ(1, 1)])
g = anp([QQ(1)])*x**4 + anp([QQ(1, 7)])
assert R.dup_ext_factor(f) == (anp([QQ(7)]), [(g, 1)])
f = anp([QQ(1)])*x**4 + anp([QQ(1)])
assert R.dup_ext_factor(f) == \
(anp([QQ(1, 1)]), [(anp([QQ(1)])*x**2 + anp([QQ(-1), QQ(0)]), 1),
(anp([QQ(1)])*x**2 + anp([QQ( 1), QQ(0)]), 1)])
f = anp([QQ(4, 1)])*x**2 + anp([QQ(9, 1)])
assert R.dup_ext_factor(f) == \
(anp([QQ(4, 1)]), [(anp([QQ(1, 1)])*x + anp([-QQ(3, 2), QQ(0, 1)]), 1),
(anp([QQ(1, 1)])*x + anp([ QQ(3, 2), QQ(0, 1)]), 1)])
f = anp([QQ(4, 1)])*x**4 + anp([QQ(8, 1)])*x**3 + anp([QQ(77, 1)])*x**2 + anp([QQ(18, 1)])*x + anp([QQ(153, 1)])
assert R.dup_ext_factor(f) == \
(anp([QQ(4, 1)]), [(anp([QQ(1, 1)])*x + anp([-QQ(4, 1), QQ(1, 1)]), 1),
(anp([QQ(1, 1)])*x + anp([-QQ(3, 2), QQ(0, 1)]), 1),
(anp([QQ(1, 1)])*x + anp([ QQ(3, 2), QQ(0, 1)]), 1),
(anp([QQ(1, 1)])*x + anp([ QQ(4, 1), QQ(1, 1)]), 1)])
R, x = ring("x", QQ.algebraic_field(sqrt(2)))
def anp(element):
return ANP(element, [QQ(1), QQ(0), QQ(-2)], QQ)
f = anp([QQ(1)])*x**4 + anp([QQ(1, 1)])
assert R.dup_ext_factor(f) == \
(anp([QQ(1)]), [(anp([QQ(1)])*x**2 + anp([QQ(-1), QQ(0)])*x + anp([QQ(1)]), 1),
(anp([QQ(1)])*x**2 + anp([QQ( 1), QQ(0)])*x + anp([QQ(1)]), 1)])
f = anp([QQ(1, 1)])*x**2 + anp([QQ(2), QQ(0)])*x + anp([QQ(2, 1)])
assert R.dup_ext_factor(f) == \
(anp([QQ(1, 1)]), [(anp([1])*x + anp([1, 0]), 2)])
assert R.dup_ext_factor(f**3) == \
(anp([QQ(1, 1)]), [(anp([1])*x + anp([1, 0]), 6)])
f *= anp([QQ(2, 1)])
assert R.dup_ext_factor(f) == \
(anp([QQ(2, 1)]), [(anp([1])*x + anp([1, 0]), 2)])
assert R.dup_ext_factor(f**3) == \
(anp([QQ(8, 1)]), [(anp([1])*x + anp([1, 0]), 6)])
def test_dmp_ext_factor():
R, x,y = ring("x,y", QQ.algebraic_field(sqrt(2)))
def anp(x):
return ANP(x, [QQ(1), QQ(0), QQ(-2)], QQ)
assert R.dmp_ext_factor(0) == (anp([]), [])
f = anp([QQ(1)])*x + anp([QQ(1)])
assert R.dmp_ext_factor(f) == (anp([QQ(1)]), [(f, 1)])
g = anp([QQ(2)])*x + anp([QQ(2)])
assert R.dmp_ext_factor(g) == (anp([QQ(2)]), [(f, 1)])
f = anp([QQ(1)])*x**2 + anp([QQ(-2)])*y**2
assert R.dmp_ext_factor(f) == \
(anp([QQ(1)]), [(anp([QQ(1)])*x + anp([QQ(-1), QQ(0)])*y, 1),
(anp([QQ(1)])*x + anp([QQ( 1), QQ(0)])*y, 1)])
f = anp([QQ(2)])*x**2 + anp([QQ(-4)])*y**2
assert R.dmp_ext_factor(f) == \
(anp([QQ(2)]), [(anp([QQ(1)])*x + anp([QQ(-1), QQ(0)])*y, 1),
(anp([QQ(1)])*x + anp([QQ( 1), QQ(0)])*y, 1)])
def test_dup_factor_list():
R, x = ring("x", ZZ)
assert R.dup_factor_list(0) == (0, [])
assert R.dup_factor_list(7) == (7, [])
R, x = ring("x", QQ)
assert R.dup_factor_list(0) == (0, [])
assert R.dup_factor_list(QQ(1, 7)) == (QQ(1, 7), [])
R, x = ring("x", ZZ['t'])
assert R.dup_factor_list(0) == (0, [])
assert R.dup_factor_list(7) == (7, [])
R, x = ring("x", QQ['t'])
assert R.dup_factor_list(0) == (0, [])
assert R.dup_factor_list(QQ(1, 7)) == (QQ(1, 7), [])
R, x = ring("x", ZZ)
assert R.dup_factor_list_include(0) == [(0, 1)]
assert R.dup_factor_list_include(7) == [(7, 1)]
assert R.dup_factor_list(x**2 + 2*x + 1) == (1, [(x + 1, 2)])
assert R.dup_factor_list_include(x**2 + 2*x + 1) == [(x + 1, 2)]
# issue 8037
assert R.dup_factor_list(6*x**2 - 5*x - 6) == (1, [(2*x - 3, 1), (3*x + 2, 1)])
R, x = ring("x", QQ)
assert R.dup_factor_list(QQ(1,2)*x**2 + x + QQ(1,2)) == (QQ(1, 2), [(x + 1, 2)])
R, x = ring("x", FF(2))
assert R.dup_factor_list(x**2 + 1) == (1, [(x + 1, 2)])
R, x = ring("x", RR)
assert R.dup_factor_list(1.0*x**2 + 2.0*x + 1.0) == (1.0, [(1.0*x + 1.0, 2)])
assert R.dup_factor_list(2.0*x**2 + 4.0*x + 2.0) == (2.0, [(1.0*x + 1.0, 2)])
f = 6.7225336055071*x**2 - 10.6463972754741*x - 0.33469524022264
coeff, factors = R.dup_factor_list(f)
assert coeff == RR(10.6463972754741)
assert len(factors) == 1
assert factors[0][0].max_norm() == RR(1.0)
assert factors[0][1] == 1
Rt, t = ring("t", ZZ)
R, x = ring("x", Rt)
f = 4*t*x**2 + 4*t**2*x
assert R.dup_factor_list(f) == \
(4*t, [(x, 1),
(x + t, 1)])
Rt, t = ring("t", QQ)
R, x = ring("x", Rt)
f = QQ(1, 2)*t*x**2 + QQ(1, 2)*t**2*x
assert R.dup_factor_list(f) == \
(QQ(1, 2)*t, [(x, 1),
(x + t, 1)])
R, x = ring("x", QQ.algebraic_field(I))
def anp(element):
return ANP(element, [QQ(1), QQ(0), QQ(1)], QQ)
f = anp([QQ(1, 1)])*x**4 + anp([QQ(2, 1)])*x**2
assert R.dup_factor_list(f) == \
(anp([QQ(1, 1)]), [(anp([QQ(1, 1)])*x, 2),
(anp([QQ(1, 1)])*x**2 + anp([])*x + anp([QQ(2, 1)]), 1)])
R, x = ring("x", EX)
raises(DomainError, lambda: R.dup_factor_list(EX(sin(1))))
def test_dmp_factor_list():
R, x, y = ring("x,y", ZZ)
assert R.dmp_factor_list(0) == (ZZ(0), [])
assert R.dmp_factor_list(7) == (7, [])
R, x, y = ring("x,y", QQ)
assert R.dmp_factor_list(0) == (QQ(0), [])
assert R.dmp_factor_list(QQ(1, 7)) == (QQ(1, 7), [])
Rt, t = ring("t", ZZ)
R, x, y = ring("x,y", Rt)
assert R.dmp_factor_list(0) == (0, [])
assert R.dmp_factor_list(7) == (ZZ(7), [])
Rt, t = ring("t", QQ)
R, x, y = ring("x,y", Rt)
assert R.dmp_factor_list(0) == (0, [])
assert R.dmp_factor_list(QQ(1, 7)) == (QQ(1, 7), [])
R, x, y = ring("x,y", ZZ)
assert R.dmp_factor_list_include(0) == [(0, 1)]
assert R.dmp_factor_list_include(7) == [(7, 1)]
R, X = xring("x:200", ZZ)
f, g = X[0]**2 + 2*X[0] + 1, X[0] + 1
assert R.dmp_factor_list(f) == (1, [(g, 2)])
f, g = X[-1]**2 + 2*X[-1] + 1, X[-1] + 1
assert R.dmp_factor_list(f) == (1, [(g, 2)])
R, x = ring("x", ZZ)
assert R.dmp_factor_list(x**2 + 2*x + 1) == (1, [(x + 1, 2)])
R, x = ring("x", QQ)
assert R.dmp_factor_list(QQ(1,2)*x**2 + x + QQ(1,2)) == (QQ(1,2), [(x + 1, 2)])
R, x, y = ring("x,y", ZZ)
assert R.dmp_factor_list(x**2 + 2*x + 1) == (1, [(x + 1, 2)])
R, x, y = ring("x,y", QQ)
assert R.dmp_factor_list(QQ(1,2)*x**2 + x + QQ(1,2)) == (QQ(1,2), [(x + 1, 2)])
R, x, y = ring("x,y", ZZ)
f = 4*x**2*y + 4*x*y**2
assert R.dmp_factor_list(f) == \
(4, [(y, 1),
(x, 1),
(x + y, 1)])
assert R.dmp_factor_list_include(f) == \
[(4*y, 1),
(x, 1),
(x + y, 1)]
R, x, y = ring("x,y", QQ)
f = QQ(1,2)*x**2*y + QQ(1,2)*x*y**2
assert R.dmp_factor_list(f) == \
(QQ(1,2), [(y, 1),
(x, 1),
(x + y, 1)])
R, x, y = ring("x,y", RR)
f = 2.0*x**2 - 8.0*y**2
assert R.dmp_factor_list(f) == \
(RR(8.0), [(0.5*x - y, 1),
(0.5*x + y, 1)])
f = 6.7225336055071*x**2*y**2 - 10.6463972754741*x*y - 0.33469524022264
coeff, factors = R.dmp_factor_list(f)
assert coeff == RR(10.6463972754741)
assert len(factors) == 1
assert factors[0][0].max_norm() == RR(1.0)
assert factors[0][1] == 1
Rt, t = ring("t", ZZ)
R, x, y = ring("x,y", Rt)
f = 4*t*x**2 + 4*t**2*x
assert R.dmp_factor_list(f) == \
(4*t, [(x, 1),
(x + t, 1)])
Rt, t = ring("t", QQ)
R, x, y = ring("x,y", Rt)
f = QQ(1, 2)*t*x**2 + QQ(1, 2)*t**2*x
assert R.dmp_factor_list(f) == \
(QQ(1, 2)*t, [(x, 1),
(x + t, 1)])
R, x, y = ring("x,y", FF(2))
raises(NotImplementedError, lambda: R.dmp_factor_list(x**2 + y**2))
R, x, y = ring("x,y", EX)
raises(DomainError, lambda: R.dmp_factor_list(EX(sin(1))))
def test_dup_irreducible_p():
R, x = ring("x", ZZ)
assert R.dup_irreducible_p(x**2 + x + 1) is True
assert R.dup_irreducible_p(x**2 + 2*x + 1) is False
def test_dmp_irreducible_p():
R, x, y = ring("x,y", ZZ)
assert R.dmp_irreducible_p(x**2 + x + 1) is True
assert R.dmp_irreducible_p(x**2 + 2*x + 1) is False
|
ce7af0e85de098e78d722504b5f81ad743083a4b4689d9435cb01a6edf431788
|
"""Test sparse polynomials. """
from operator import add, mul
from sympy.polys.rings import ring, xring, sring, PolyRing, PolyElement
from sympy.polys.fields import field, FracField
from sympy.polys.domains import ZZ, QQ, RR, FF, EX
from sympy.polys.orderings import lex, grlex
from sympy.polys.polyerrors import GeneratorsError, \
ExactQuotientFailed, MultivariatePolynomialError, CoercionFailed
from sympy.testing.pytest import raises
from sympy.core import Symbol, symbols
from sympy.core.compatibility import reduce
from sympy import sqrt, pi, oo
def test_PolyRing___init__():
x, y, z, t = map(Symbol, "xyzt")
assert len(PolyRing("x,y,z", ZZ, lex).gens) == 3
assert len(PolyRing(x, ZZ, lex).gens) == 1
assert len(PolyRing(("x", "y", "z"), ZZ, lex).gens) == 3
assert len(PolyRing((x, y, z), ZZ, lex).gens) == 3
assert len(PolyRing("", ZZ, lex).gens) == 0
assert len(PolyRing([], ZZ, lex).gens) == 0
raises(GeneratorsError, lambda: PolyRing(0, ZZ, lex))
assert PolyRing("x", ZZ[t], lex).domain == ZZ[t]
assert PolyRing("x", 'ZZ[t]', lex).domain == ZZ[t]
assert PolyRing("x", PolyRing("t", ZZ, lex), lex).domain == ZZ[t]
raises(GeneratorsError, lambda: PolyRing("x", PolyRing("x", ZZ, lex), lex))
_lex = Symbol("lex")
assert PolyRing("x", ZZ, lex).order == lex
assert PolyRing("x", ZZ, _lex).order == lex
assert PolyRing("x", ZZ, 'lex').order == lex
R1 = PolyRing("x,y", ZZ, lex)
R2 = PolyRing("x,y", ZZ, lex)
R3 = PolyRing("x,y,z", ZZ, lex)
assert R1.x == R1.gens[0]
assert R1.y == R1.gens[1]
assert R1.x == R2.x
assert R1.y == R2.y
assert R1.x != R3.x
assert R1.y != R3.y
def test_PolyRing___hash__():
R, x, y, z = ring("x,y,z", QQ)
assert hash(R)
def test_PolyRing___eq__():
assert ring("x,y,z", QQ)[0] == ring("x,y,z", QQ)[0]
assert ring("x,y,z", QQ)[0] is ring("x,y,z", QQ)[0]
assert ring("x,y,z", QQ)[0] != ring("x,y,z", ZZ)[0]
assert ring("x,y,z", QQ)[0] is not ring("x,y,z", ZZ)[0]
assert ring("x,y,z", ZZ)[0] != ring("x,y,z", QQ)[0]
assert ring("x,y,z", ZZ)[0] is not ring("x,y,z", QQ)[0]
assert ring("x,y,z", QQ)[0] != ring("x,y", QQ)[0]
assert ring("x,y,z", QQ)[0] is not ring("x,y", QQ)[0]
assert ring("x,y", QQ)[0] != ring("x,y,z", QQ)[0]
assert ring("x,y", QQ)[0] is not ring("x,y,z", QQ)[0]
def test_PolyRing_ring_new():
R, x, y, z = ring("x,y,z", QQ)
assert R.ring_new(7) == R(7)
assert R.ring_new(7*x*y*z) == 7*x*y*z
f = x**2 + 2*x*y + 3*x + 4*z**2 + 5*z + 6
assert R.ring_new([[[1]], [[2], [3]], [[4, 5, 6]]]) == f
assert R.ring_new({(2, 0, 0): 1, (1, 1, 0): 2, (1, 0, 0): 3, (0, 0, 2): 4, (0, 0, 1): 5, (0, 0, 0): 6}) == f
assert R.ring_new([((2, 0, 0), 1), ((1, 1, 0), 2), ((1, 0, 0), 3), ((0, 0, 2), 4), ((0, 0, 1), 5), ((0, 0, 0), 6)]) == f
R, = ring("", QQ)
assert R.ring_new([((), 7)]) == R(7)
def test_PolyRing_drop():
R, x,y,z = ring("x,y,z", ZZ)
assert R.drop(x) == PolyRing("y,z", ZZ, lex)
assert R.drop(y) == PolyRing("x,z", ZZ, lex)
assert R.drop(z) == PolyRing("x,y", ZZ, lex)
assert R.drop(0) == PolyRing("y,z", ZZ, lex)
assert R.drop(0).drop(0) == PolyRing("z", ZZ, lex)
assert R.drop(0).drop(0).drop(0) == ZZ
assert R.drop(1) == PolyRing("x,z", ZZ, lex)
assert R.drop(2) == PolyRing("x,y", ZZ, lex)
assert R.drop(2).drop(1) == PolyRing("x", ZZ, lex)
assert R.drop(2).drop(1).drop(0) == ZZ
raises(ValueError, lambda: R.drop(3))
raises(ValueError, lambda: R.drop(x).drop(y))
def test_PolyRing___getitem__():
R, x,y,z = ring("x,y,z", ZZ)
assert R[0:] == PolyRing("x,y,z", ZZ, lex)
assert R[1:] == PolyRing("y,z", ZZ, lex)
assert R[2:] == PolyRing("z", ZZ, lex)
assert R[3:] == ZZ
def test_PolyRing_is_():
R = PolyRing("x", QQ, lex)
assert R.is_univariate is True
assert R.is_multivariate is False
R = PolyRing("x,y,z", QQ, lex)
assert R.is_univariate is False
assert R.is_multivariate is True
R = PolyRing("", QQ, lex)
assert R.is_univariate is False
assert R.is_multivariate is False
def test_PolyRing_add():
R, x = ring("x", ZZ)
F = [ x**2 + 2*i + 3 for i in range(4) ]
assert R.add(F) == reduce(add, F) == 4*x**2 + 24
R, = ring("", ZZ)
assert R.add([2, 5, 7]) == 14
def test_PolyRing_mul():
R, x = ring("x", ZZ)
F = [ x**2 + 2*i + 3 for i in range(4) ]
assert R.mul(F) == reduce(mul, F) == x**8 + 24*x**6 + 206*x**4 + 744*x**2 + 945
R, = ring("", ZZ)
assert R.mul([2, 3, 5]) == 30
def test_sring():
x, y, z, t = symbols("x,y,z,t")
R = PolyRing("x,y,z", ZZ, lex)
assert sring(x + 2*y + 3*z) == (R, R.x + 2*R.y + 3*R.z)
R = PolyRing("x,y,z", QQ, lex)
assert sring(x + 2*y + z/3) == (R, R.x + 2*R.y + R.z/3)
assert sring([x, 2*y, z/3]) == (R, [R.x, 2*R.y, R.z/3])
Rt = PolyRing("t", ZZ, lex)
R = PolyRing("x,y,z", Rt, lex)
assert sring(x + 2*t*y + 3*t**2*z, x, y, z) == (R, R.x + 2*Rt.t*R.y + 3*Rt.t**2*R.z)
Rt = PolyRing("t", QQ, lex)
R = PolyRing("x,y,z", Rt, lex)
assert sring(x + t*y/2 + t**2*z/3, x, y, z) == (R, R.x + Rt.t*R.y/2 + Rt.t**2*R.z/3)
Rt = FracField("t", ZZ, lex)
R = PolyRing("x,y,z", Rt, lex)
assert sring(x + 2*y/t + t**2*z/3, x, y, z) == (R, R.x + 2*R.y/Rt.t + Rt.t**2*R.z/3)
r = sqrt(2) - sqrt(3)
R, a = sring(r, extension=True)
assert R.domain == QQ.algebraic_field(r)
assert R.gens == ()
assert a == R.domain.from_sympy(r)
def test_PolyElement___hash__():
R, x, y, z = ring("x,y,z", QQ)
assert hash(x*y*z)
def test_PolyElement___eq__():
R, x, y = ring("x,y", ZZ, lex)
assert ((x*y + 5*x*y) == 6) == False
assert ((x*y + 5*x*y) == 6*x*y) == True
assert (6 == (x*y + 5*x*y)) == False
assert (6*x*y == (x*y + 5*x*y)) == True
assert ((x*y - x*y) == 0) == True
assert (0 == (x*y - x*y)) == True
assert ((x*y - x*y) == 1) == False
assert (1 == (x*y - x*y)) == False
assert ((x*y - x*y) == 1) == False
assert (1 == (x*y - x*y)) == False
assert ((x*y + 5*x*y) != 6) == True
assert ((x*y + 5*x*y) != 6*x*y) == False
assert (6 != (x*y + 5*x*y)) == True
assert (6*x*y != (x*y + 5*x*y)) == False
assert ((x*y - x*y) != 0) == False
assert (0 != (x*y - x*y)) == False
assert ((x*y - x*y) != 1) == True
assert (1 != (x*y - x*y)) == True
assert R.one == QQ(1, 1) == R.one
assert R.one == 1 == R.one
Rt, t = ring("t", ZZ)
R, x, y = ring("x,y", Rt)
assert (t**3*x/x == t**3) == True
assert (t**3*x/x == t**4) == False
def test_PolyElement__lt_le_gt_ge__():
R, x, y = ring("x,y", ZZ)
assert R(1) < x < x**2 < x**3
assert R(1) <= x <= x**2 <= x**3
assert x**3 > x**2 > x > R(1)
assert x**3 >= x**2 >= x >= R(1)
def test_PolyElement_copy():
R, x, y, z = ring("x,y,z", ZZ)
f = x*y + 3*z
g = f.copy()
assert f == g
g[(1, 1, 1)] = 7
assert f != g
def test_PolyElement_as_expr():
R, x, y, z = ring("x,y,z", ZZ)
f = 3*x**2*y - x*y*z + 7*z**3 + 1
X, Y, Z = R.symbols
g = 3*X**2*Y - X*Y*Z + 7*Z**3 + 1
assert f != g
assert f.as_expr() == g
X, Y, Z = symbols("x,y,z")
g = 3*X**2*Y - X*Y*Z + 7*Z**3 + 1
assert f != g
assert f.as_expr(X, Y, Z) == g
raises(ValueError, lambda: f.as_expr(X))
R, = ring("", ZZ)
R(3).as_expr() == 3
def test_PolyElement_from_expr():
x, y, z = symbols("x,y,z")
R, X, Y, Z = ring((x, y, z), ZZ)
f = R.from_expr(1)
assert f == 1 and isinstance(f, R.dtype)
f = R.from_expr(x)
assert f == X and isinstance(f, R.dtype)
f = R.from_expr(x*y*z)
assert f == X*Y*Z and isinstance(f, R.dtype)
f = R.from_expr(x*y*z + x*y + x)
assert f == X*Y*Z + X*Y + X and isinstance(f, R.dtype)
f = R.from_expr(x**3*y*z + x**2*y**7 + 1)
assert f == X**3*Y*Z + X**2*Y**7 + 1 and isinstance(f, R.dtype)
raises(ValueError, lambda: R.from_expr(1/x))
raises(ValueError, lambda: R.from_expr(2**x))
raises(ValueError, lambda: R.from_expr(7*x + sqrt(2)))
R, = ring("", ZZ)
f = R.from_expr(1)
assert f == 1 and isinstance(f, R.dtype)
def test_PolyElement_degree():
R, x,y,z = ring("x,y,z", ZZ)
assert R(0).degree() is -oo
assert R(1).degree() == 0
assert (x + 1).degree() == 1
assert (2*y**3 + z).degree() == 0
assert (x*y**3 + z).degree() == 1
assert (x**5*y**3 + z).degree() == 5
assert R(0).degree(x) is -oo
assert R(1).degree(x) == 0
assert (x + 1).degree(x) == 1
assert (2*y**3 + z).degree(x) == 0
assert (x*y**3 + z).degree(x) == 1
assert (7*x**5*y**3 + z).degree(x) == 5
assert R(0).degree(y) is -oo
assert R(1).degree(y) == 0
assert (x + 1).degree(y) == 0
assert (2*y**3 + z).degree(y) == 3
assert (x*y**3 + z).degree(y) == 3
assert (7*x**5*y**3 + z).degree(y) == 3
assert R(0).degree(z) is -oo
assert R(1).degree(z) == 0
assert (x + 1).degree(z) == 0
assert (2*y**3 + z).degree(z) == 1
assert (x*y**3 + z).degree(z) == 1
assert (7*x**5*y**3 + z).degree(z) == 1
R, = ring("", ZZ)
assert R(0).degree() is -oo
assert R(1).degree() == 0
def test_PolyElement_tail_degree():
R, x,y,z = ring("x,y,z", ZZ)
assert R(0).tail_degree() is -oo
assert R(1).tail_degree() == 0
assert (x + 1).tail_degree() == 0
assert (2*y**3 + x**3*z).tail_degree() == 0
assert (x*y**3 + x**3*z).tail_degree() == 1
assert (x**5*y**3 + x**3*z).tail_degree() == 3
assert R(0).tail_degree(x) is -oo
assert R(1).tail_degree(x) == 0
assert (x + 1).tail_degree(x) == 0
assert (2*y**3 + x**3*z).tail_degree(x) == 0
assert (x*y**3 + x**3*z).tail_degree(x) == 1
assert (7*x**5*y**3 + x**3*z).tail_degree(x) == 3
assert R(0).tail_degree(y) is -oo
assert R(1).tail_degree(y) == 0
assert (x + 1).tail_degree(y) == 0
assert (2*y**3 + x**3*z).tail_degree(y) == 0
assert (x*y**3 + x**3*z).tail_degree(y) == 0
assert (7*x**5*y**3 + x**3*z).tail_degree(y) == 0
assert R(0).tail_degree(z) is -oo
assert R(1).tail_degree(z) == 0
assert (x + 1).tail_degree(z) == 0
assert (2*y**3 + x**3*z).tail_degree(z) == 0
assert (x*y**3 + x**3*z).tail_degree(z) == 0
assert (7*x**5*y**3 + x**3*z).tail_degree(z) == 0
R, = ring("", ZZ)
assert R(0).tail_degree() is -oo
assert R(1).tail_degree() == 0
def test_PolyElement_degrees():
R, x,y,z = ring("x,y,z", ZZ)
assert R(0).degrees() == (-oo, -oo, -oo)
assert R(1).degrees() == (0, 0, 0)
assert (x**2*y + x**3*z**2).degrees() == (3, 1, 2)
def test_PolyElement_tail_degrees():
R, x,y,z = ring("x,y,z", ZZ)
assert R(0).tail_degrees() == (-oo, -oo, -oo)
assert R(1).tail_degrees() == (0, 0, 0)
assert (x**2*y + x**3*z**2).tail_degrees() == (2, 0, 0)
def test_PolyElement_coeff():
R, x, y, z = ring("x,y,z", ZZ, lex)
f = 3*x**2*y - x*y*z + 7*z**3 + 23
assert f.coeff(1) == 23
raises(ValueError, lambda: f.coeff(3))
assert f.coeff(x) == 0
assert f.coeff(y) == 0
assert f.coeff(z) == 0
assert f.coeff(x**2*y) == 3
assert f.coeff(x*y*z) == -1
assert f.coeff(z**3) == 7
raises(ValueError, lambda: f.coeff(3*x**2*y))
raises(ValueError, lambda: f.coeff(-x*y*z))
raises(ValueError, lambda: f.coeff(7*z**3))
R, = ring("", ZZ)
R(3).coeff(1) == 3
def test_PolyElement_LC():
R, x, y = ring("x,y", QQ, lex)
assert R(0).LC == QQ(0)
assert (QQ(1,2)*x).LC == QQ(1, 2)
assert (QQ(1,4)*x*y + QQ(1,2)*x).LC == QQ(1, 4)
def test_PolyElement_LM():
R, x, y = ring("x,y", QQ, lex)
assert R(0).LM == (0, 0)
assert (QQ(1,2)*x).LM == (1, 0)
assert (QQ(1,4)*x*y + QQ(1,2)*x).LM == (1, 1)
def test_PolyElement_LT():
R, x, y = ring("x,y", QQ, lex)
assert R(0).LT == ((0, 0), QQ(0))
assert (QQ(1,2)*x).LT == ((1, 0), QQ(1, 2))
assert (QQ(1,4)*x*y + QQ(1,2)*x).LT == ((1, 1), QQ(1, 4))
R, = ring("", ZZ)
assert R(0).LT == ((), 0)
assert R(1).LT == ((), 1)
def test_PolyElement_leading_monom():
R, x, y = ring("x,y", QQ, lex)
assert R(0).leading_monom() == 0
assert (QQ(1,2)*x).leading_monom() == x
assert (QQ(1,4)*x*y + QQ(1,2)*x).leading_monom() == x*y
def test_PolyElement_leading_term():
R, x, y = ring("x,y", QQ, lex)
assert R(0).leading_term() == 0
assert (QQ(1,2)*x).leading_term() == QQ(1,2)*x
assert (QQ(1,4)*x*y + QQ(1,2)*x).leading_term() == QQ(1,4)*x*y
def test_PolyElement_terms():
R, x,y,z = ring("x,y,z", QQ)
terms = (x**2/3 + y**3/4 + z**4/5).terms()
assert terms == [((2,0,0), QQ(1,3)), ((0,3,0), QQ(1,4)), ((0,0,4), QQ(1,5))]
R, x,y = ring("x,y", ZZ, lex)
f = x*y**7 + 2*x**2*y**3
assert f.terms() == f.terms(lex) == f.terms('lex') == [((2, 3), 2), ((1, 7), 1)]
assert f.terms(grlex) == f.terms('grlex') == [((1, 7), 1), ((2, 3), 2)]
R, x,y = ring("x,y", ZZ, grlex)
f = x*y**7 + 2*x**2*y**3
assert f.terms() == f.terms(grlex) == f.terms('grlex') == [((1, 7), 1), ((2, 3), 2)]
assert f.terms(lex) == f.terms('lex') == [((2, 3), 2), ((1, 7), 1)]
R, = ring("", ZZ)
assert R(3).terms() == [((), 3)]
def test_PolyElement_monoms():
R, x,y,z = ring("x,y,z", QQ)
monoms = (x**2/3 + y**3/4 + z**4/5).monoms()
assert monoms == [(2,0,0), (0,3,0), (0,0,4)]
R, x,y = ring("x,y", ZZ, lex)
f = x*y**7 + 2*x**2*y**3
assert f.monoms() == f.monoms(lex) == f.monoms('lex') == [(2, 3), (1, 7)]
assert f.monoms(grlex) == f.monoms('grlex') == [(1, 7), (2, 3)]
R, x,y = ring("x,y", ZZ, grlex)
f = x*y**7 + 2*x**2*y**3
assert f.monoms() == f.monoms(grlex) == f.monoms('grlex') == [(1, 7), (2, 3)]
assert f.monoms(lex) == f.monoms('lex') == [(2, 3), (1, 7)]
def test_PolyElement_coeffs():
R, x,y,z = ring("x,y,z", QQ)
coeffs = (x**2/3 + y**3/4 + z**4/5).coeffs()
assert coeffs == [QQ(1,3), QQ(1,4), QQ(1,5)]
R, x,y = ring("x,y", ZZ, lex)
f = x*y**7 + 2*x**2*y**3
assert f.coeffs() == f.coeffs(lex) == f.coeffs('lex') == [2, 1]
assert f.coeffs(grlex) == f.coeffs('grlex') == [1, 2]
R, x,y = ring("x,y", ZZ, grlex)
f = x*y**7 + 2*x**2*y**3
assert f.coeffs() == f.coeffs(grlex) == f.coeffs('grlex') == [1, 2]
assert f.coeffs(lex) == f.coeffs('lex') == [2, 1]
def test_PolyElement___add__():
Rt, t = ring("t", ZZ)
Ruv, u,v = ring("u,v", ZZ)
Rxyz, x,y,z = ring("x,y,z", Ruv)
assert dict(x + 3*y) == {(1, 0, 0): 1, (0, 1, 0): 3}
assert dict(u + x) == dict(x + u) == {(1, 0, 0): 1, (0, 0, 0): u}
assert dict(u + x*y) == dict(x*y + u) == {(1, 1, 0): 1, (0, 0, 0): u}
assert dict(u + x*y + z) == dict(x*y + z + u) == {(1, 1, 0): 1, (0, 0, 1): 1, (0, 0, 0): u}
assert dict(u*x + x) == dict(x + u*x) == {(1, 0, 0): u + 1}
assert dict(u*x + x*y) == dict(x*y + u*x) == {(1, 1, 0): 1, (1, 0, 0): u}
assert dict(u*x + x*y + z) == dict(x*y + z + u*x) == {(1, 1, 0): 1, (0, 0, 1): 1, (1, 0, 0): u}
raises(TypeError, lambda: t + x)
raises(TypeError, lambda: x + t)
raises(TypeError, lambda: t + u)
raises(TypeError, lambda: u + t)
Fuv, u,v = field("u,v", ZZ)
Rxyz, x,y,z = ring("x,y,z", Fuv)
assert dict(u + x) == dict(x + u) == {(1, 0, 0): 1, (0, 0, 0): u}
Rxyz, x,y,z = ring("x,y,z", EX)
assert dict(EX(pi) + x*y*z) == dict(x*y*z + EX(pi)) == {(1, 1, 1): EX(1), (0, 0, 0): EX(pi)}
def test_PolyElement___sub__():
Rt, t = ring("t", ZZ)
Ruv, u,v = ring("u,v", ZZ)
Rxyz, x,y,z = ring("x,y,z", Ruv)
assert dict(x - 3*y) == {(1, 0, 0): 1, (0, 1, 0): -3}
assert dict(-u + x) == dict(x - u) == {(1, 0, 0): 1, (0, 0, 0): -u}
assert dict(-u + x*y) == dict(x*y - u) == {(1, 1, 0): 1, (0, 0, 0): -u}
assert dict(-u + x*y + z) == dict(x*y + z - u) == {(1, 1, 0): 1, (0, 0, 1): 1, (0, 0, 0): -u}
assert dict(-u*x + x) == dict(x - u*x) == {(1, 0, 0): -u + 1}
assert dict(-u*x + x*y) == dict(x*y - u*x) == {(1, 1, 0): 1, (1, 0, 0): -u}
assert dict(-u*x + x*y + z) == dict(x*y + z - u*x) == {(1, 1, 0): 1, (0, 0, 1): 1, (1, 0, 0): -u}
raises(TypeError, lambda: t - x)
raises(TypeError, lambda: x - t)
raises(TypeError, lambda: t - u)
raises(TypeError, lambda: u - t)
Fuv, u,v = field("u,v", ZZ)
Rxyz, x,y,z = ring("x,y,z", Fuv)
assert dict(-u + x) == dict(x - u) == {(1, 0, 0): 1, (0, 0, 0): -u}
Rxyz, x,y,z = ring("x,y,z", EX)
assert dict(-EX(pi) + x*y*z) == dict(x*y*z - EX(pi)) == {(1, 1, 1): EX(1), (0, 0, 0): -EX(pi)}
def test_PolyElement___mul__():
Rt, t = ring("t", ZZ)
Ruv, u,v = ring("u,v", ZZ)
Rxyz, x,y,z = ring("x,y,z", Ruv)
assert dict(u*x) == dict(x*u) == {(1, 0, 0): u}
assert dict(2*u*x + z) == dict(x*2*u + z) == {(1, 0, 0): 2*u, (0, 0, 1): 1}
assert dict(u*2*x + z) == dict(2*x*u + z) == {(1, 0, 0): 2*u, (0, 0, 1): 1}
assert dict(2*u*x + z) == dict(x*2*u + z) == {(1, 0, 0): 2*u, (0, 0, 1): 1}
assert dict(u*x*2 + z) == dict(x*u*2 + z) == {(1, 0, 0): 2*u, (0, 0, 1): 1}
assert dict(2*u*x*y + z) == dict(x*y*2*u + z) == {(1, 1, 0): 2*u, (0, 0, 1): 1}
assert dict(u*2*x*y + z) == dict(2*x*y*u + z) == {(1, 1, 0): 2*u, (0, 0, 1): 1}
assert dict(2*u*x*y + z) == dict(x*y*2*u + z) == {(1, 1, 0): 2*u, (0, 0, 1): 1}
assert dict(u*x*y*2 + z) == dict(x*y*u*2 + z) == {(1, 1, 0): 2*u, (0, 0, 1): 1}
assert dict(2*u*y*x + z) == dict(y*x*2*u + z) == {(1, 1, 0): 2*u, (0, 0, 1): 1}
assert dict(u*2*y*x + z) == dict(2*y*x*u + z) == {(1, 1, 0): 2*u, (0, 0, 1): 1}
assert dict(2*u*y*x + z) == dict(y*x*2*u + z) == {(1, 1, 0): 2*u, (0, 0, 1): 1}
assert dict(u*y*x*2 + z) == dict(y*x*u*2 + z) == {(1, 1, 0): 2*u, (0, 0, 1): 1}
assert dict(3*u*(x + y) + z) == dict((x + y)*3*u + z) == {(1, 0, 0): 3*u, (0, 1, 0): 3*u, (0, 0, 1): 1}
raises(TypeError, lambda: t*x + z)
raises(TypeError, lambda: x*t + z)
raises(TypeError, lambda: t*u + z)
raises(TypeError, lambda: u*t + z)
Fuv, u,v = field("u,v", ZZ)
Rxyz, x,y,z = ring("x,y,z", Fuv)
assert dict(u*x) == dict(x*u) == {(1, 0, 0): u}
Rxyz, x,y,z = ring("x,y,z", EX)
assert dict(EX(pi)*x*y*z) == dict(x*y*z*EX(pi)) == {(1, 1, 1): EX(pi)}
def test_PolyElement___div__():
R, x,y,z = ring("x,y,z", ZZ)
assert (2*x**2 - 4)/2 == x**2 - 2
assert (2*x**2 - 3)/2 == x**2
assert (x**2 - 1).quo(x) == x
assert (x**2 - x).quo(x) == x - 1
assert (x**2 - 1)/x == x - x**(-1)
assert (x**2 - x)/x == x - 1
assert (x**2 - 1)/(2*x) == x/2 - x**(-1)/2
assert (x**2 - 1).quo(2*x) == 0
assert (x**2 - x)/(x - 1) == (x**2 - x).quo(x - 1) == x
R, x,y,z = ring("x,y,z", ZZ)
assert len((x**2/3 + y**3/4 + z**4/5).terms()) == 0
R, x,y,z = ring("x,y,z", QQ)
assert len((x**2/3 + y**3/4 + z**4/5).terms()) == 3
Rt, t = ring("t", ZZ)
Ruv, u,v = ring("u,v", ZZ)
Rxyz, x,y,z = ring("x,y,z", Ruv)
assert dict((u**2*x + u)/u) == {(1, 0, 0): u, (0, 0, 0): 1}
raises(TypeError, lambda: u/(u**2*x + u))
raises(TypeError, lambda: t/x)
raises(TypeError, lambda: x/t)
raises(TypeError, lambda: t/u)
raises(TypeError, lambda: u/t)
R, x = ring("x", ZZ)
f, g = x**2 + 2*x + 3, R(0)
raises(ZeroDivisionError, lambda: f.div(g))
raises(ZeroDivisionError, lambda: divmod(f, g))
raises(ZeroDivisionError, lambda: f.rem(g))
raises(ZeroDivisionError, lambda: f % g)
raises(ZeroDivisionError, lambda: f.quo(g))
raises(ZeroDivisionError, lambda: f / g)
raises(ZeroDivisionError, lambda: f.exquo(g))
R, x, y = ring("x,y", ZZ)
f, g = x*y + 2*x + 3, R(0)
raises(ZeroDivisionError, lambda: f.div(g))
raises(ZeroDivisionError, lambda: divmod(f, g))
raises(ZeroDivisionError, lambda: f.rem(g))
raises(ZeroDivisionError, lambda: f % g)
raises(ZeroDivisionError, lambda: f.quo(g))
raises(ZeroDivisionError, lambda: f / g)
raises(ZeroDivisionError, lambda: f.exquo(g))
R, x = ring("x", ZZ)
f, g = x**2 + 1, 2*x - 4
q, r = R(0), x**2 + 1
assert f.div(g) == divmod(f, g) == (q, r)
assert f.rem(g) == f % g == r
assert f.quo(g) == f / g == q
raises(ExactQuotientFailed, lambda: f.exquo(g))
f, g = 3*x**3 + x**2 + x + 5, 5*x**2 - 3*x + 1
q, r = R(0), f
assert f.div(g) == divmod(f, g) == (q, r)
assert f.rem(g) == f % g == r
assert f.quo(g) == f / g == q
raises(ExactQuotientFailed, lambda: f.exquo(g))
f, g = 5*x**4 + 4*x**3 + 3*x**2 + 2*x + 1, x**2 + 2*x + 3
q, r = 5*x**2 - 6*x, 20*x + 1
assert f.div(g) == divmod(f, g) == (q, r)
assert f.rem(g) == f % g == r
assert f.quo(g) == f / g == q
raises(ExactQuotientFailed, lambda: f.exquo(g))
f, g = 5*x**5 + 4*x**4 + 3*x**3 + 2*x**2 + x, x**4 + 2*x**3 + 9
q, r = 5*x - 6, 15*x**3 + 2*x**2 - 44*x + 54
assert f.div(g) == divmod(f, g) == (q, r)
assert f.rem(g) == f % g == r
assert f.quo(g) == f / g == q
raises(ExactQuotientFailed, lambda: f.exquo(g))
R, x = ring("x", QQ)
f, g = x**2 + 1, 2*x - 4
q, r = x/2 + 1, R(5)
assert f.div(g) == divmod(f, g) == (q, r)
assert f.rem(g) == f % g == r
assert f.quo(g) == f / g == q
raises(ExactQuotientFailed, lambda: f.exquo(g))
f, g = 3*x**3 + x**2 + x + 5, 5*x**2 - 3*x + 1
q, r = QQ(3, 5)*x + QQ(14, 25), QQ(52, 25)*x + QQ(111, 25)
assert f.div(g) == divmod(f, g) == (q, r)
assert f.rem(g) == f % g == r
assert f.quo(g) == f / g == q
raises(ExactQuotientFailed, lambda: f.exquo(g))
R, x,y = ring("x,y", ZZ)
f, g = x**2 - y**2, x - y
q, r = x + y, R(0)
assert f.div(g) == divmod(f, g) == (q, r)
assert f.rem(g) == f % g == r
assert f.quo(g) == f / g == q
assert f.exquo(g) == q
f, g = x**2 + y**2, x - y
q, r = x + y, 2*y**2
assert f.div(g) == divmod(f, g) == (q, r)
assert f.rem(g) == f % g == r
assert f.quo(g) == f / g == q
raises(ExactQuotientFailed, lambda: f.exquo(g))
f, g = x**2 + y**2, -x + y
q, r = -x - y, 2*y**2
assert f.div(g) == divmod(f, g) == (q, r)
assert f.rem(g) == f % g == r
assert f.quo(g) == f / g == q
raises(ExactQuotientFailed, lambda: f.exquo(g))
f, g = x**2 + y**2, 2*x - 2*y
q, r = R(0), f
assert f.div(g) == divmod(f, g) == (q, r)
assert f.rem(g) == f % g == r
assert f.quo(g) == f / g == q
raises(ExactQuotientFailed, lambda: f.exquo(g))
R, x,y = ring("x,y", QQ)
f, g = x**2 - y**2, x - y
q, r = x + y, R(0)
assert f.div(g) == divmod(f, g) == (q, r)
assert f.rem(g) == f % g == r
assert f.quo(g) == f / g == q
assert f.exquo(g) == q
f, g = x**2 + y**2, x - y
q, r = x + y, 2*y**2
assert f.div(g) == divmod(f, g) == (q, r)
assert f.rem(g) == f % g == r
assert f.quo(g) == f / g == q
raises(ExactQuotientFailed, lambda: f.exquo(g))
f, g = x**2 + y**2, -x + y
q, r = -x - y, 2*y**2
assert f.div(g) == divmod(f, g) == (q, r)
assert f.rem(g) == f % g == r
assert f.quo(g) == f / g == q
raises(ExactQuotientFailed, lambda: f.exquo(g))
f, g = x**2 + y**2, 2*x - 2*y
q, r = x/2 + y/2, 2*y**2
assert f.div(g) == divmod(f, g) == (q, r)
assert f.rem(g) == f % g == r
assert f.quo(g) == f / g == q
raises(ExactQuotientFailed, lambda: f.exquo(g))
def test_PolyElement___pow__():
R, x = ring("x", ZZ, grlex)
f = 2*x + 3
assert f**0 == 1
assert f**1 == f
raises(ValueError, lambda: f**(-1))
assert x**(-1) == x**(-1)
assert f**2 == f._pow_generic(2) == f._pow_multinomial(2) == 4*x**2 + 12*x + 9
assert f**3 == f._pow_generic(3) == f._pow_multinomial(3) == 8*x**3 + 36*x**2 + 54*x + 27
assert f**4 == f._pow_generic(4) == f._pow_multinomial(4) == 16*x**4 + 96*x**3 + 216*x**2 + 216*x + 81
assert f**5 == f._pow_generic(5) == f._pow_multinomial(5) == 32*x**5 + 240*x**4 + 720*x**3 + 1080*x**2 + 810*x + 243
R, x,y,z = ring("x,y,z", ZZ, grlex)
f = x**3*y - 2*x*y**2 - 3*z + 1
g = x**6*y**2 - 4*x**4*y**3 - 6*x**3*y*z + 2*x**3*y + 4*x**2*y**4 + 12*x*y**2*z - 4*x*y**2 + 9*z**2 - 6*z + 1
assert f**2 == f._pow_generic(2) == f._pow_multinomial(2) == g
R, t = ring("t", ZZ)
f = -11200*t**4 - 2604*t**2 + 49
g = 15735193600000000*t**16 + 14633730048000000*t**14 + 4828147466240000*t**12 \
+ 598976863027200*t**10 + 3130812416256*t**8 - 2620523775744*t**6 \
+ 92413760096*t**4 - 1225431984*t**2 + 5764801
assert f**4 == f._pow_generic(4) == f._pow_multinomial(4) == g
def test_PolyElement_div():
R, x = ring("x", ZZ, grlex)
f = x**3 - 12*x**2 - 42
g = x - 3
q = x**2 - 9*x - 27
r = -123
assert f.div([g]) == ([q], r)
R, x = ring("x", ZZ, grlex)
f = x**2 + 2*x + 2
assert f.div([R(1)]) == ([f], 0)
R, x = ring("x", QQ, grlex)
f = x**2 + 2*x + 2
assert f.div([R(2)]) == ([QQ(1,2)*x**2 + x + 1], 0)
R, x,y = ring("x,y", ZZ, grlex)
f = 4*x**2*y - 2*x*y + 4*x - 2*y + 8
assert f.div([R(2)]) == ([2*x**2*y - x*y + 2*x - y + 4], 0)
assert f.div([2*y]) == ([2*x**2 - x - 1], 4*x + 8)
f = x - 1
g = y - 1
assert f.div([g]) == ([0], f)
f = x*y**2 + 1
G = [x*y + 1, y + 1]
Q = [y, -1]
r = 2
assert f.div(G) == (Q, r)
f = x**2*y + x*y**2 + y**2
G = [x*y - 1, y**2 - 1]
Q = [x + y, 1]
r = x + y + 1
assert f.div(G) == (Q, r)
G = [y**2 - 1, x*y - 1]
Q = [x + 1, x]
r = 2*x + 1
assert f.div(G) == (Q, r)
R, = ring("", ZZ)
assert R(3).div(R(2)) == (0, 3)
R, = ring("", QQ)
assert R(3).div(R(2)) == (QQ(3, 2), 0)
def test_PolyElement_rem():
R, x = ring("x", ZZ, grlex)
f = x**3 - 12*x**2 - 42
g = x - 3
r = -123
assert f.rem([g]) == f.div([g])[1] == r
R, x,y = ring("x,y", ZZ, grlex)
f = 4*x**2*y - 2*x*y + 4*x - 2*y + 8
assert f.rem([R(2)]) == f.div([R(2)])[1] == 0
assert f.rem([2*y]) == f.div([2*y])[1] == 4*x + 8
f = x - 1
g = y - 1
assert f.rem([g]) == f.div([g])[1] == f
f = x*y**2 + 1
G = [x*y + 1, y + 1]
r = 2
assert f.rem(G) == f.div(G)[1] == r
f = x**2*y + x*y**2 + y**2
G = [x*y - 1, y**2 - 1]
r = x + y + 1
assert f.rem(G) == f.div(G)[1] == r
G = [y**2 - 1, x*y - 1]
r = 2*x + 1
assert f.rem(G) == f.div(G)[1] == r
def test_PolyElement_deflate():
R, x = ring("x", ZZ)
assert (2*x**2).deflate(x**4 + 4*x**2 + 1) == ((2,), [2*x, x**2 + 4*x + 1])
R, x,y = ring("x,y", ZZ)
assert R(0).deflate(R(0)) == ((1, 1), [0, 0])
assert R(1).deflate(R(0)) == ((1, 1), [1, 0])
assert R(1).deflate(R(2)) == ((1, 1), [1, 2])
assert R(1).deflate(2*y) == ((1, 1), [1, 2*y])
assert (2*y).deflate(2*y) == ((1, 1), [2*y, 2*y])
assert R(2).deflate(2*y**2) == ((1, 2), [2, 2*y])
assert (2*y**2).deflate(2*y**2) == ((1, 2), [2*y, 2*y])
f = x**4*y**2 + x**2*y + 1
g = x**2*y**3 + x**2*y + 1
assert f.deflate(g) == ((2, 1), [x**2*y**2 + x*y + 1, x*y**3 + x*y + 1])
def test_PolyElement_clear_denoms():
R, x,y = ring("x,y", QQ)
assert R(1).clear_denoms() == (ZZ(1), 1)
assert R(7).clear_denoms() == (ZZ(1), 7)
assert R(QQ(7,3)).clear_denoms() == (3, 7)
assert R(QQ(7,3)).clear_denoms() == (3, 7)
assert (3*x**2 + x).clear_denoms() == (1, 3*x**2 + x)
assert (x**2 + QQ(1,2)*x).clear_denoms() == (2, 2*x**2 + x)
rQQ, x,t = ring("x,t", QQ, lex)
rZZ, X,T = ring("x,t", ZZ, lex)
F = [x - QQ(17824537287975195925064602467992950991718052713078834557692023531499318507213727406844943097,413954288007559433755329699713866804710749652268151059918115348815925474842910720000)*t**7
- QQ(4882321164854282623427463828745855894130208215961904469205260756604820743234704900167747753,12936071500236232304854053116058337647210926633379720622441104650497671088840960000)*t**6
- QQ(36398103304520066098365558157422127347455927422509913596393052633155821154626830576085097433,25872143000472464609708106232116675294421853266759441244882209300995342177681920000)*t**5
- QQ(168108082231614049052707339295479262031324376786405372698857619250210703675982492356828810819,58212321751063045371843239022262519412449169850208742800984970927239519899784320000)*t**4
- QQ(5694176899498574510667890423110567593477487855183144378347226247962949388653159751849449037,1617008937529529038106756639507292205901365829172465077805138081312208886105120000)*t**3
- QQ(154482622347268833757819824809033388503591365487934245386958884099214649755244381307907779,60637835157357338929003373981523457721301218593967440417692678049207833228942000)*t**2
- QQ(2452813096069528207645703151222478123259511586701148682951852876484544822947007791153163,2425513406294293557160134959260938308852048743758697616707707121968313329157680)*t
- QQ(34305265428126440542854669008203683099323146152358231964773310260498715579162112959703,202126117191191129763344579938411525737670728646558134725642260164026110763140),
t**8 + QQ(693749860237914515552,67859264524169150569)*t**7
+ QQ(27761407182086143225024,610733380717522355121)*t**6
+ QQ(7785127652157884044288,67859264524169150569)*t**5
+ QQ(36567075214771261409792,203577793572507451707)*t**4
+ QQ(36336335165196147384320,203577793572507451707)*t**3
+ QQ(7452455676042754048000,67859264524169150569)*t**2
+ QQ(2593331082514399232000,67859264524169150569)*t
+ QQ(390399197427343360000,67859264524169150569)]
G = [3725588592068034903797967297424801242396746870413359539263038139343329273586196480000*X -
160420835591776763325581422211936558925462474417709511019228211783493866564923546661604487873*T**7 -
1406108495478033395547109582678806497509499966197028487131115097902188374051595011248311352864*T**6 -
5241326875850889518164640374668786338033653548841427557880599579174438246266263602956254030352*T**5 -
10758917262823299139373269714910672770004760114329943852726887632013485035262879510837043892416*T**4 -
13119383576444715672578819534846747735372132018341964647712009275306635391456880068261130581248*T**3 -
9491412317016197146080450036267011389660653495578680036574753839055748080962214787557853941760*T**2 -
3767520915562795326943800040277726397326609797172964377014046018280260848046603967211258368000*T -
632314652371226552085897259159210286886724229880266931574701654721512325555116066073245696000,
610733380717522355121*T**8 +
6243748742141230639968*T**7 +
27761407182086143225024*T**6 +
70066148869420956398592*T**5 +
109701225644313784229376*T**4 +
109009005495588442152960*T**3 +
67072101084384786432000*T**2 +
23339979742629593088000*T +
3513592776846090240000]
assert [ f.clear_denoms()[1].set_ring(rZZ) for f in F ] == G
def test_PolyElement_cofactors():
R, x, y = ring("x,y", ZZ)
f, g = R(0), R(0)
assert f.cofactors(g) == (0, 0, 0)
f, g = R(2), R(0)
assert f.cofactors(g) == (2, 1, 0)
f, g = R(-2), R(0)
assert f.cofactors(g) == (2, -1, 0)
f, g = R(0), R(-2)
assert f.cofactors(g) == (2, 0, -1)
f, g = R(0), 2*x + 4
assert f.cofactors(g) == (2*x + 4, 0, 1)
f, g = 2*x + 4, R(0)
assert f.cofactors(g) == (2*x + 4, 1, 0)
f, g = R(2), R(2)
assert f.cofactors(g) == (2, 1, 1)
f, g = R(-2), R(2)
assert f.cofactors(g) == (2, -1, 1)
f, g = R(2), R(-2)
assert f.cofactors(g) == (2, 1, -1)
f, g = R(-2), R(-2)
assert f.cofactors(g) == (2, -1, -1)
f, g = x**2 + 2*x + 1, R(1)
assert f.cofactors(g) == (1, x**2 + 2*x + 1, 1)
f, g = x**2 + 2*x + 1, R(2)
assert f.cofactors(g) == (1, x**2 + 2*x + 1, 2)
f, g = 2*x**2 + 4*x + 2, R(2)
assert f.cofactors(g) == (2, x**2 + 2*x + 1, 1)
f, g = R(2), 2*x**2 + 4*x + 2
assert f.cofactors(g) == (2, 1, x**2 + 2*x + 1)
f, g = 2*x**2 + 4*x + 2, x + 1
assert f.cofactors(g) == (x + 1, 2*x + 2, 1)
f, g = x + 1, 2*x**2 + 4*x + 2
assert f.cofactors(g) == (x + 1, 1, 2*x + 2)
R, x, y, z, t = ring("x,y,z,t", ZZ)
f, g = t**2 + 2*t + 1, 2*t + 2
assert f.cofactors(g) == (t + 1, t + 1, 2)
f, g = z**2*t**2 + 2*z**2*t + z**2 + z*t + z, t**2 + 2*t + 1
h, cff, cfg = t + 1, z**2*t + z**2 + z, t + 1
assert f.cofactors(g) == (h, cff, cfg)
assert g.cofactors(f) == (h, cfg, cff)
R, x, y = ring("x,y", QQ)
f = QQ(1,2)*x**2 + x + QQ(1,2)
g = QQ(1,2)*x + QQ(1,2)
h = x + 1
assert f.cofactors(g) == (h, g, QQ(1,2))
assert g.cofactors(f) == (h, QQ(1,2), g)
R, x, y = ring("x,y", RR)
f = 2.1*x*y**2 - 2.1*x*y + 2.1*x
g = 2.1*x**3
h = 1.0*x
assert f.cofactors(g) == (h, f/h, g/h)
assert g.cofactors(f) == (h, g/h, f/h)
def test_PolyElement_gcd():
R, x, y = ring("x,y", QQ)
f = QQ(1,2)*x**2 + x + QQ(1,2)
g = QQ(1,2)*x + QQ(1,2)
assert f.gcd(g) == x + 1
def test_PolyElement_cancel():
R, x, y = ring("x,y", ZZ)
f = 2*x**3 + 4*x**2 + 2*x
g = 3*x**2 + 3*x
F = 2*x + 2
G = 3
assert f.cancel(g) == (F, G)
assert (-f).cancel(g) == (-F, G)
assert f.cancel(-g) == (-F, G)
R, x, y = ring("x,y", QQ)
f = QQ(1,2)*x**3 + x**2 + QQ(1,2)*x
g = QQ(1,3)*x**2 + QQ(1,3)*x
F = 3*x + 3
G = 2
assert f.cancel(g) == (F, G)
assert (-f).cancel(g) == (-F, G)
assert f.cancel(-g) == (-F, G)
Fx, x = field("x", ZZ)
Rt, t = ring("t", Fx)
f = (-x**2 - 4)/4*t
g = t**2 + (x**2 + 2)/2
assert f.cancel(g) == ((-x**2 - 4)*t, 4*t**2 + 2*x**2 + 4)
def test_PolyElement_max_norm():
R, x, y = ring("x,y", ZZ)
assert R(0).max_norm() == 0
assert R(1).max_norm() == 1
assert (x**3 + 4*x**2 + 2*x + 3).max_norm() == 4
def test_PolyElement_l1_norm():
R, x, y = ring("x,y", ZZ)
assert R(0).l1_norm() == 0
assert R(1).l1_norm() == 1
assert (x**3 + 4*x**2 + 2*x + 3).l1_norm() == 10
def test_PolyElement_diff():
R, X = xring("x:11", QQ)
f = QQ(288,5)*X[0]**8*X[1]**6*X[4]**3*X[10]**2 + 8*X[0]**2*X[2]**3*X[4]**3 +2*X[0]**2 - 2*X[1]**2
assert f.diff(X[0]) == QQ(2304,5)*X[0]**7*X[1]**6*X[4]**3*X[10]**2 + 16*X[0]*X[2]**3*X[4]**3 + 4*X[0]
assert f.diff(X[4]) == QQ(864,5)*X[0]**8*X[1]**6*X[4]**2*X[10]**2 + 24*X[0]**2*X[2]**3*X[4]**2
assert f.diff(X[10]) == QQ(576,5)*X[0]**8*X[1]**6*X[4]**3*X[10]
def test_PolyElement___call__():
R, x = ring("x", ZZ)
f = 3*x + 1
assert f(0) == 1
assert f(1) == 4
raises(ValueError, lambda: f())
raises(ValueError, lambda: f(0, 1))
raises(CoercionFailed, lambda: f(QQ(1,7)))
R, x,y = ring("x,y", ZZ)
f = 3*x + y**2 + 1
assert f(0, 0) == 1
assert f(1, 7) == 53
Ry = R.drop(x)
assert f(0) == Ry.y**2 + 1
assert f(1) == Ry.y**2 + 4
raises(ValueError, lambda: f())
raises(ValueError, lambda: f(0, 1, 2))
raises(CoercionFailed, lambda: f(1, QQ(1,7)))
raises(CoercionFailed, lambda: f(QQ(1,7), 1))
raises(CoercionFailed, lambda: f(QQ(1,7), QQ(1,7)))
def test_PolyElement_evaluate():
R, x = ring("x", ZZ)
f = x**3 + 4*x**2 + 2*x + 3
r = f.evaluate(x, 0)
assert r == 3 and not isinstance(r, PolyElement)
raises(CoercionFailed, lambda: f.evaluate(x, QQ(1,7)))
R, x, y, z = ring("x,y,z", ZZ)
f = (x*y)**3 + 4*(x*y)**2 + 2*x*y + 3
r = f.evaluate(x, 0)
assert r == 3 and isinstance(r, R.drop(x).dtype)
r = f.evaluate([(x, 0), (y, 0)])
assert r == 3 and isinstance(r, R.drop(x, y).dtype)
r = f.evaluate(y, 0)
assert r == 3 and isinstance(r, R.drop(y).dtype)
r = f.evaluate([(y, 0), (x, 0)])
assert r == 3 and isinstance(r, R.drop(y, x).dtype)
r = f.evaluate([(x, 0), (y, 0), (z, 0)])
assert r == 3 and not isinstance(r, PolyElement)
raises(CoercionFailed, lambda: f.evaluate([(x, 1), (y, QQ(1,7))]))
raises(CoercionFailed, lambda: f.evaluate([(x, QQ(1,7)), (y, 1)]))
raises(CoercionFailed, lambda: f.evaluate([(x, QQ(1,7)), (y, QQ(1,7))]))
def test_PolyElement_subs():
R, x = ring("x", ZZ)
f = x**3 + 4*x**2 + 2*x + 3
r = f.subs(x, 0)
assert r == 3 and isinstance(r, R.dtype)
raises(CoercionFailed, lambda: f.subs(x, QQ(1,7)))
R, x, y, z = ring("x,y,z", ZZ)
f = x**3 + 4*x**2 + 2*x + 3
r = f.subs(x, 0)
assert r == 3 and isinstance(r, R.dtype)
r = f.subs([(x, 0), (y, 0)])
assert r == 3 and isinstance(r, R.dtype)
raises(CoercionFailed, lambda: f.subs([(x, 1), (y, QQ(1,7))]))
raises(CoercionFailed, lambda: f.subs([(x, QQ(1,7)), (y, 1)]))
raises(CoercionFailed, lambda: f.subs([(x, QQ(1,7)), (y, QQ(1,7))]))
def test_PolyElement_compose():
R, x = ring("x", ZZ)
f = x**3 + 4*x**2 + 2*x + 3
r = f.compose(x, 0)
assert r == 3 and isinstance(r, R.dtype)
assert f.compose(x, x) == f
assert f.compose(x, x**2) == x**6 + 4*x**4 + 2*x**2 + 3
raises(CoercionFailed, lambda: f.compose(x, QQ(1,7)))
R, x, y, z = ring("x,y,z", ZZ)
f = x**3 + 4*x**2 + 2*x + 3
r = f.compose(x, 0)
assert r == 3 and isinstance(r, R.dtype)
r = f.compose([(x, 0), (y, 0)])
assert r == 3 and isinstance(r, R.dtype)
r = (x**3 + 4*x**2 + 2*x*y*z + 3).compose(x, y*z**2 - 1)
q = (y*z**2 - 1)**3 + 4*(y*z**2 - 1)**2 + 2*(y*z**2 - 1)*y*z + 3
assert r == q and isinstance(r, R.dtype)
def test_PolyElement_is_():
R, x,y,z = ring("x,y,z", QQ)
assert (x - x).is_generator == False
assert (x - x).is_ground == True
assert (x - x).is_monomial == True
assert (x - x).is_term == True
assert (x - x + 1).is_generator == False
assert (x - x + 1).is_ground == True
assert (x - x + 1).is_monomial == True
assert (x - x + 1).is_term == True
assert x.is_generator == True
assert x.is_ground == False
assert x.is_monomial == True
assert x.is_term == True
assert (x*y).is_generator == False
assert (x*y).is_ground == False
assert (x*y).is_monomial == True
assert (x*y).is_term == True
assert (3*x).is_generator == False
assert (3*x).is_ground == False
assert (3*x).is_monomial == False
assert (3*x).is_term == True
assert (3*x + 1).is_generator == False
assert (3*x + 1).is_ground == False
assert (3*x + 1).is_monomial == False
assert (3*x + 1).is_term == False
assert R(0).is_zero is True
assert R(1).is_zero is False
assert R(0).is_one is False
assert R(1).is_one is True
assert (x - 1).is_monic is True
assert (2*x - 1).is_monic is False
assert (3*x + 2).is_primitive is True
assert (4*x + 2).is_primitive is False
assert (x + y + z + 1).is_linear is True
assert (x*y*z + 1).is_linear is False
assert (x*y + z + 1).is_quadratic is True
assert (x*y*z + 1).is_quadratic is False
assert (x - 1).is_squarefree is True
assert ((x - 1)**2).is_squarefree is False
assert (x**2 + x + 1).is_irreducible is True
assert (x**2 + 2*x + 1).is_irreducible is False
_, t = ring("t", FF(11))
assert (7*t + 3).is_irreducible is True
assert (7*t**2 + 3*t + 1).is_irreducible is False
_, u = ring("u", ZZ)
f = u**16 + u**14 - u**10 - u**8 - u**6 + u**2
assert f.is_cyclotomic is False
assert (f + 1).is_cyclotomic is True
raises(MultivariatePolynomialError, lambda: x.is_cyclotomic)
R, = ring("", ZZ)
assert R(4).is_squarefree is True
assert R(6).is_irreducible is True
def test_PolyElement_drop():
R, x,y,z = ring("x,y,z", ZZ)
assert R(1).drop(0).ring == PolyRing("y,z", ZZ, lex)
assert R(1).drop(0).drop(0).ring == PolyRing("z", ZZ, lex)
assert isinstance(R(1).drop(0).drop(0).drop(0), R.dtype) is False
raises(ValueError, lambda: z.drop(0).drop(0).drop(0))
raises(ValueError, lambda: x.drop(0))
def test_PolyElement_pdiv():
_, x, y = ring("x,y", ZZ)
f, g = x**2 - y**2, x - y
q, r = x + y, 0
assert f.pdiv(g) == (q, r)
assert f.prem(g) == r
assert f.pquo(g) == q
assert f.pexquo(g) == q
def test_PolyElement_gcdex():
_, x = ring("x", QQ)
f, g = 2*x, x**2 - 16
s, t, h = x/32, -QQ(1, 16), 1
assert f.half_gcdex(g) == (s, h)
assert f.gcdex(g) == (s, t, h)
def test_PolyElement_subresultants():
_, x = ring("x", ZZ)
f, g, h = x**2 - 2*x + 1, x**2 - 1, 2*x - 2
assert f.subresultants(g) == [f, g, h]
def test_PolyElement_resultant():
_, x = ring("x", ZZ)
f, g, h = x**2 - 2*x + 1, x**2 - 1, 0
assert f.resultant(g) == h
def test_PolyElement_discriminant():
_, x = ring("x", ZZ)
f, g = x**3 + 3*x**2 + 9*x - 13, -11664
assert f.discriminant() == g
F, a, b, c = ring("a,b,c", ZZ)
_, x = ring("x", F)
f, g = a*x**2 + b*x + c, b**2 - 4*a*c
assert f.discriminant() == g
def test_PolyElement_decompose():
_, x = ring("x", ZZ)
f = x**12 + 20*x**10 + 150*x**8 + 500*x**6 + 625*x**4 - 2*x**3 - 10*x + 9
g = x**4 - 2*x + 9
h = x**3 + 5*x
assert g.compose(x, h) == f
assert f.decompose() == [g, h]
def test_PolyElement_shift():
_, x = ring("x", ZZ)
assert (x**2 - 2*x + 1).shift(2) == x**2 + 2*x + 1
def test_PolyElement_sturm():
F, t = field("t", ZZ)
_, x = ring("x", F)
f = 1024/(15625*t**8)*x**5 - 4096/(625*t**8)*x**4 + 32/(15625*t**4)*x**3 - 128/(625*t**4)*x**2 + F(1)/62500*x - F(1)/625
assert f.sturm() == [
x**3 - 100*x**2 + t**4/64*x - 25*t**4/16,
3*x**2 - 200*x + t**4/64,
(-t**4/96 + F(20000)/9)*x + 25*t**4/18,
(-9*t**12 - 11520000*t**8 - 3686400000000*t**4)/(576*t**8 - 245760000*t**4 + 26214400000000),
]
def test_PolyElement_gff_list():
_, x = ring("x", ZZ)
f = x**5 + 2*x**4 - x**3 - 2*x**2
assert f.gff_list() == [(x, 1), (x + 2, 4)]
f = x*(x - 1)**3*(x - 2)**2*(x - 4)**2*(x - 5)
assert f.gff_list() == [(x**2 - 5*x + 4, 1), (x**2 - 5*x + 4, 2), (x, 3)]
def test_PolyElement_sqf_norm():
R, x = ring("x", QQ.algebraic_field(sqrt(3)))
X = R.to_ground().x
assert (x**2 - 2).sqf_norm() == (1, x**2 - 2*sqrt(3)*x + 1, X**4 - 10*X**2 + 1)
R, x = ring("x", QQ.algebraic_field(sqrt(2)))
X = R.to_ground().x
assert (x**2 - 3).sqf_norm() == (1, x**2 - 2*sqrt(2)*x - 1, X**4 - 10*X**2 + 1)
def test_PolyElement_sqf_list():
_, x = ring("x", ZZ)
f = x**5 - x**3 - x**2 + 1
g = x**3 + 2*x**2 + 2*x + 1
h = x - 1
p = x**4 + x**3 - x - 1
assert f.sqf_part() == p
assert f.sqf_list() == (1, [(g, 1), (h, 2)])
def test_PolyElement_factor_list():
_, x = ring("x", ZZ)
f = x**5 - x**3 - x**2 + 1
u = x + 1
v = x - 1
w = x**2 + x + 1
assert f.factor_list() == (1, [(u, 1), (v, 2), (w, 1)])
|
97e9ab15fe12073d73355a3260161e3fd970614bc7ed16a1ee0996cea2f15788
|
"""Tests for tools for constructing domains for expressions. """
from sympy.polys.constructor import construct_domain
from sympy.polys.domains import ZZ, QQ, ZZ_I, QQ_I, RR, EX
from sympy.polys.domains.realfield import RealField
from sympy import S, sqrt, sin, Float, E, I, GoldenRatio, pi, Catalan, Rational
from sympy.abc import x, y
def test_construct_domain():
assert construct_domain([1, 2, 3]) == (ZZ, [ZZ(1), ZZ(2), ZZ(3)])
assert construct_domain([1, 2, 3], field=True) == (QQ, [QQ(1), QQ(2), QQ(3)])
assert construct_domain([S.One, S(2), S(3)]) == (ZZ, [ZZ(1), ZZ(2), ZZ(3)])
assert construct_domain([S.One, S(2), S(3)], field=True) == (QQ, [QQ(1), QQ(2), QQ(3)])
assert construct_domain([S.Half, S(2)]) == (QQ, [QQ(1, 2), QQ(2)])
result = construct_domain([3.14, 1, S.Half])
assert isinstance(result[0], RealField)
assert result[1] == [RR(3.14), RR(1.0), RR(0.5)]
assert construct_domain([1, I]) == (ZZ_I, [ZZ_I(1, 0), ZZ_I(0, 1)])
assert construct_domain([1, I/2]) == (QQ_I, [QQ_I(1, 0), QQ_I(0, S.Half)])
assert construct_domain([3.14, sqrt(2)], extension=None) == (EX, [EX(3.14), EX(sqrt(2))])
assert construct_domain([3.14, sqrt(2)], extension=True) == (EX, [EX(3.14), EX(sqrt(2))])
assert construct_domain([1, sqrt(2)], extension=None) == (EX, [EX(1), EX(sqrt(2))])
assert construct_domain([x, sqrt(x)]) == (EX, [EX(x), EX(sqrt(x))])
assert construct_domain([x, sqrt(x), sqrt(y)]) == (EX, [EX(x), EX(sqrt(x)), EX(sqrt(y))])
alg = QQ.algebraic_field(sqrt(2))
assert construct_domain([7, S.Half, sqrt(2)], extension=True) == \
(alg, [alg.convert(7), alg.convert(S.Half), alg.convert(sqrt(2))])
alg = QQ.algebraic_field(sqrt(2) + sqrt(3))
assert construct_domain([7, sqrt(2), sqrt(3)], extension=True) == \
(alg, [alg.convert(7), alg.convert(sqrt(2)), alg.convert(sqrt(3))])
dom = ZZ[x]
assert construct_domain([2*x, 3]) == \
(dom, [dom.convert(2*x), dom.convert(3)])
dom = ZZ[x, y]
assert construct_domain([2*x, 3*y]) == \
(dom, [dom.convert(2*x), dom.convert(3*y)])
dom = QQ[x]
assert construct_domain([x/2, 3]) == \
(dom, [dom.convert(x/2), dom.convert(3)])
dom = QQ[x, y]
assert construct_domain([x/2, 3*y]) == \
(dom, [dom.convert(x/2), dom.convert(3*y)])
dom = ZZ_I[x]
assert construct_domain([2*x, I]) == \
(dom, [dom.convert(2*x), dom.convert(I)])
dom = ZZ_I[x, y]
assert construct_domain([2*x, I*y]) == \
(dom, [dom.convert(2*x), dom.convert(I*y)])
dom = QQ_I[x]
assert construct_domain([x/2, I]) == \
(dom, [dom.convert(x/2), dom.convert(I)])
dom = QQ_I[x, y]
assert construct_domain([x/2, I*y]) == \
(dom, [dom.convert(x/2), dom.convert(I*y)])
dom = RR[x]
assert construct_domain([x/2, 3.5]) == \
(dom, [dom.convert(x/2), dom.convert(3.5)])
dom = RR[x, y]
assert construct_domain([x/2, 3.5*y]) == \
(dom, [dom.convert(x/2), dom.convert(3.5*y)])
dom = ZZ.frac_field(x)
assert construct_domain([2/x, 3]) == \
(dom, [dom.convert(2/x), dom.convert(3)])
dom = ZZ.frac_field(x, y)
assert construct_domain([2/x, 3*y]) == \
(dom, [dom.convert(2/x), dom.convert(3*y)])
dom = RR.frac_field(x)
assert construct_domain([2/x, 3.5]) == \
(dom, [dom.convert(2/x), dom.convert(3.5)])
dom = RR.frac_field(x, y)
assert construct_domain([2/x, 3.5*y]) == \
(dom, [dom.convert(2/x), dom.convert(3.5*y)])
dom = RealField(prec=336)[x]
assert construct_domain([pi.evalf(100)*x]) == \
(dom, [dom.convert(pi.evalf(100)*x)])
assert construct_domain(2) == (ZZ, ZZ(2))
assert construct_domain(S(2)/3) == (QQ, QQ(2, 3))
assert construct_domain(Rational(2, 3)) == (QQ, QQ(2, 3))
assert construct_domain({}) == (ZZ, {})
def test_composite_option():
assert construct_domain({(1,): sin(y)}, composite=False) == \
(EX, {(1,): EX(sin(y))})
assert construct_domain({(1,): y}, composite=False) == \
(EX, {(1,): EX(y)})
assert construct_domain({(1, 1): 1}, composite=False) == \
(ZZ, {(1, 1): 1})
assert construct_domain({(1, 0): y}, composite=False) == \
(EX, {(1, 0): EX(y)})
def test_precision():
f1 = Float("1.01")
f2 = Float("1.0000000000000000000001")
for u in [1, 1e-2, 1e-6, 1e-13, 1e-14, 1e-16, 1e-20, 1e-100, 1e-300,
f1, f2]:
result = construct_domain([u])
v = float(result[1][0])
assert abs(u - v) / u < 1e-14 # Test relative accuracy
result = construct_domain([f1])
y = result[1][0]
assert y-1 > 1e-50
result = construct_domain([f2])
y = result[1][0]
assert y-1 > 1e-50
def test_issue_11538():
for n in [E, pi, Catalan]:
assert construct_domain(n)[0] == ZZ[n]
assert construct_domain(x + n)[0] == ZZ[x, n]
assert construct_domain(GoldenRatio)[0] == EX
assert construct_domain(x + GoldenRatio)[0] == EX
|
d48e3baed6e3a66ec7c57739fe54b2373cdfae5022941c0939b575d7f5b16a12
|
"""Tests for algorithms for partial fraction decomposition of rational
functions. """
from sympy.polys.partfrac import (
apart_undetermined_coeffs,
apart,
apart_list, assemble_partfrac_list
)
from sympy import (S, Poly, E, pi, I, Matrix, Eq, RootSum, Lambda,
Symbol, Dummy, factor, together, sqrt, Expr, Rational)
from sympy.testing.pytest import raises, ON_TRAVIS, skip, XFAIL
from sympy.abc import x, y, a, b, c
def test_apart():
assert apart(1) == 1
assert apart(1, x) == 1
f, g = (x**2 + 1)/(x + 1), 2/(x + 1) + x - 1
assert apart(f, full=False) == g
assert apart(f, full=True) == g
f, g = 1/(x + 2)/(x + 1), 1/(1 + x) - 1/(2 + x)
assert apart(f, full=False) == g
assert apart(f, full=True) == g
f, g = 1/(x + 1)/(x + 5), -1/(5 + x)/4 + 1/(1 + x)/4
assert apart(f, full=False) == g
assert apart(f, full=True) == g
assert apart((E*x + 2)/(x - pi)*(x - 1), x) == \
2 - E + E*pi + E*x + (E*pi + 2)*(pi - 1)/(x - pi)
assert apart(Eq((x**2 + 1)/(x + 1), x), x) == Eq(x - 1 + 2/(x + 1), x)
assert apart(x/2, y) == x/2
f, g = (x+y)/(2*x - y), Rational(3, 2)*y/((2*x - y)) + S.Half
assert apart(f, x, full=False) == g
assert apart(f, x, full=True) == g
f, g = (x+y)/(2*x - y), 3*x/(2*x - y) - 1
assert apart(f, y, full=False) == g
assert apart(f, y, full=True) == g
raises(NotImplementedError, lambda: apart(1/(x + 1)/(y + 2)))
def test_apart_matrix():
M = Matrix(2, 2, lambda i, j: 1/(x + i + 1)/(x + j))
assert apart(M) == Matrix([
[1/x - 1/(x + 1), (x + 1)**(-2)],
[1/(2*x) - (S.Half)/(x + 2), 1/(x + 1) - 1/(x + 2)],
])
def test_apart_symbolic():
f = a*x**4 + (2*b + 2*a*c)*x**3 + (4*b*c - a**2 + a*c**2)*x**2 + \
(-2*a*b + 2*b*c**2)*x - b**2
g = a**2*x**4 + (2*a*b + 2*c*a**2)*x**3 + (4*a*b*c + b**2 +
a**2*c**2)*x**2 + (2*c*b**2 + 2*a*b*c**2)*x + b**2*c**2
assert apart(f/g, x) == 1/a - 1/(x + c)**2 - b**2/(a*(a*x + b)**2)
assert apart(1/((x + a)*(x + b)*(x + c)), x) == \
1/((a - c)*(b - c)*(c + x)) - 1/((a - b)*(b - c)*(b + x)) + \
1/((a - b)*(a - c)*(a + x))
def _make_extension_example():
# https://github.com/sympy/sympy/issues/18531
from sympy.core import Mul
def mul2(expr):
# 2-arg mul hack...
return Mul(2, expr, evaluate=False)
f = ((x**2 + 1)**3/((x - 1)**2*(x + 1)**2*(-x**2 + 2*x + 1)*(x**2 + 2*x - 1)))
g = (1/mul2(x - sqrt(2) + 1)
- 1/mul2(x - sqrt(2) - 1)
+ 1/mul2(x + 1 + sqrt(2))
- 1/mul2(x - 1 + sqrt(2))
+ 1/mul2((x + 1)**2)
+ 1/mul2((x - 1)**2))
return f, g
def test_apart_extension():
f = 2/(x**2 + 1)
g = I/(x + I) - I/(x - I)
assert apart(f, extension=I) == g
assert apart(f, gaussian=True) == g
f = x/((x - 2)*(x + I))
assert factor(together(apart(f)).expand()) == f
f, g = _make_extension_example()
# XXX: Only works with dotprodsimp. See test_apart_extension_xfail below
from sympy.matrices import dotprodsimp
with dotprodsimp(True):
assert apart(f, x, extension={sqrt(2)}) == g
# XXX: This is XFAIL just because it is slow
@XFAIL
def test_apart_extension_xfail():
if ON_TRAVIS:
skip('Too slow for Travis')
f, g = _make_extension_example()
assert apart(f, x, extension={sqrt(2)}) == g
def test_apart_full():
f = 1/(x**2 + 1)
assert apart(f, full=False) == f
assert apart(f, full=True).dummy_eq(
-RootSum(x**2 + 1, Lambda(a, a/(x - a)), auto=False)/2)
f = 1/(x**3 + x + 1)
assert apart(f, full=False) == f
assert apart(f, full=True).dummy_eq(
RootSum(x**3 + x + 1,
Lambda(a, (a**2*Rational(6, 31) - a*Rational(9, 31) + Rational(4, 31))/(x - a)), auto=False))
f = 1/(x**5 + 1)
assert apart(f, full=False) == \
(Rational(-1, 5))*((x**3 - 2*x**2 + 3*x - 4)/(x**4 - x**3 + x**2 -
x + 1)) + (Rational(1, 5))/(x + 1)
assert apart(f, full=True).dummy_eq(
-RootSum(x**4 - x**3 + x**2 - x + 1,
Lambda(a, a/(x - a)), auto=False)/5 + (Rational(1, 5))/(x + 1))
def test_apart_undetermined_coeffs():
p = Poly(2*x - 3)
q = Poly(x**9 - x**8 - x**6 + x**5 - 2*x**2 + 3*x - 1)
r = (-x**7 - x**6 - x**5 + 4)/(x**8 - x**5 - 2*x + 1) + 1/(x - 1)
assert apart_undetermined_coeffs(p, q) == r
p = Poly(1, x, domain='ZZ[a,b]')
q = Poly((x + a)*(x + b), x, domain='ZZ[a,b]')
r = 1/((a - b)*(b + x)) - 1/((a - b)*(a + x))
assert apart_undetermined_coeffs(p, q) == r
def test_apart_list():
from sympy.utilities.iterables import numbered_symbols
def dummy_eq(i, j):
if type(i) in (list, tuple):
return all(dummy_eq(i, j) for i, j in zip(i, j))
return i == j or i.dummy_eq(j)
w0, w1, w2 = Symbol("w0"), Symbol("w1"), Symbol("w2")
_a = Dummy("a")
f = (-2*x - 2*x**2) / (3*x**2 - 6*x)
got = apart_list(f, x, dummies=numbered_symbols("w"))
ans = (-1, Poly(Rational(2, 3), x, domain='QQ'),
[(Poly(w0 - 2, w0, domain='ZZ'), Lambda(_a, 2), Lambda(_a, -_a + x), 1)])
assert dummy_eq(got, ans)
got = apart_list(2/(x**2-2), x, dummies=numbered_symbols("w"))
ans = (1, Poly(0, x, domain='ZZ'), [(Poly(w0**2 - 2, w0, domain='ZZ'),
Lambda(_a, _a/2),
Lambda(_a, -_a + x), 1)])
assert dummy_eq(got, ans)
f = 36 / (x**5 - 2*x**4 - 2*x**3 + 4*x**2 + x - 2)
got = apart_list(f, x, dummies=numbered_symbols("w"))
ans = (1, Poly(0, x, domain='ZZ'),
[(Poly(w0 - 2, w0, domain='ZZ'), Lambda(_a, 4), Lambda(_a, -_a + x), 1),
(Poly(w1**2 - 1, w1, domain='ZZ'), Lambda(_a, -3*_a - 6), Lambda(_a, -_a + x), 2),
(Poly(w2 + 1, w2, domain='ZZ'), Lambda(_a, -4), Lambda(_a, -_a + x), 1)])
assert dummy_eq(got, ans)
def test_assemble_partfrac_list():
f = 36 / (x**5 - 2*x**4 - 2*x**3 + 4*x**2 + x - 2)
pfd = apart_list(f)
assert assemble_partfrac_list(pfd) == -4/(x + 1) - 3/(x + 1)**2 - 9/(x - 1)**2 + 4/(x - 2)
a = Dummy("a")
pfd = (1, Poly(0, x, domain='ZZ'), [([sqrt(2),-sqrt(2)], Lambda(a, a/2), Lambda(a, -a + x), 1)])
assert assemble_partfrac_list(pfd) == -1/(sqrt(2)*(x + sqrt(2))) + 1/(sqrt(2)*(x - sqrt(2)))
@XFAIL
def test_noncommutative_pseudomultivariate():
# apart doesn't go inside noncommutative expressions
class foo(Expr):
is_commutative=False
e = x/(x + x*y)
c = 1/(1 + y)
assert apart(e + foo(e)) == c + foo(c)
assert apart(e*foo(e)) == c*foo(c)
def test_noncommutative():
class foo(Expr):
is_commutative=False
e = x/(x + x*y)
c = 1/(1 + y)
assert apart(e + foo()) == c + foo()
def test_issue_5798():
assert apart(
2*x/(x**2 + 1) - (x - 1)/(2*(x**2 + 1)) + 1/(2*(x + 1)) - 2/x) == \
(3*x + 1)/(x**2 + 1)/2 + 1/(x + 1)/2 - 2/x
|
Subsets and Splits
No community queries yet
The top public SQL queries from the community will appear here once available.