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GameServerX / MLPY /Lib /site-packages /mpmath /functions /zeta.py

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	from __future__ import print_function

	from ..libmp.backend import xrange
	from .functions import defun, defun_wrapped, defun_static

	@defun
	def stieltjes(ctx, n, a=1):
	n = ctx.convert(n)
	a = ctx.convert(a)
	if n < 0:
	return ctx.bad_domain("Stieltjes constants defined for n >= 0")
	if hasattr(ctx, "stieltjes_cache"):
	stieltjes_cache = ctx.stieltjes_cache
	else:
	stieltjes_cache = ctx.stieltjes_cache = {}
	if a == 1:
	if n == 0:
	return +ctx.euler
	if n in stieltjes_cache:
	prec, s = stieltjes_cache[n]
	if prec >= ctx.prec:
	return +s
	mag = 1
	def f(x):
	xa = x/a
	v = (xa-ctx.j)ctx.ln(a-ctx.jx)n/(1+xa2)/(ctx.exp(2ctx.pix)-1)
	return ctx._re(v) / mag
	orig = ctx.prec
	try:
	# Normalize integrand by approx. magnitude to
	# speed up quadrature (which uses absolute error)
	if n > 50:
	ctx.prec = 20
	mag = ctx.quad(f, [0,ctx.inf], maxdegree=3)
	ctx.prec = orig + 10 + int(n**0.5)
	s = ctx.quad(f, [0,ctx.inf], maxdegree=20)
	v = ctx.ln(a)*n/(2a) - ctx.ln(a)*(n+1)/(n+1) + 2s/a*mag
	finally:
	ctx.prec = orig
	if a == 1 and ctx.isint(n):
	stieltjes_cache[n] = (ctx.prec, v)
	return +v

	@defun_wrapped
	def siegeltheta(ctx, t, derivative=0):
	d = int(derivative)
	if (t == ctx.inf or t == ctx.ninf):
	if d < 2:
	if t == ctx.ninf and d == 0:
	return ctx.ninf
	return ctx.inf
	else:
	return ctx.zero
	if d == 0:
	if ctx._im(t):
	# XXX: cancellation occurs
	a = ctx.loggamma(0.25+0.5j*t)
	b = ctx.loggamma(0.25-0.5j*t)
	return -ctx.ln(ctx.pi)/2t - 0.5j(a-b)
	else:
	if ctx.isinf(t):
	return t
	return ctx._im(ctx.loggamma(0.25+0.5jt)) - ctx.ln(ctx.pi)/2t
	if d > 0:
	a = (-0.5j)*(d-1)ctx.polygamma(d-1, 0.25-0.5j*t)
	b = (0.5j)*(d-1)ctx.polygamma(d-1, 0.25+0.5j*t)
	if ctx._im(t):
	if d == 1:
	return -0.5ctx.log(ctx.pi)+0.25(a+b)
	else:
	return 0.25*(a+b)
	else:
	if d == 1:
	return ctx._re(-0.5ctx.log(ctx.pi)+0.25(a+b))
	else:
	return ctx._re(0.25*(a+b))

	@defun_wrapped
	def grampoint(ctx, n):
	# asymptotic expansion, from
	# http://mathworld.wolfram.com/GramPoint.html
	g = 2ctx.pictx.exp(1+ctx.lambertw((8n+1)/(8ctx.e)))
	return ctx.findroot(lambda t: ctx.siegeltheta(t)-ctx.pi*n, g)


	@defun_wrapped
	def siegelz(ctx, t, **kwargs):
	d = int(kwargs.get("derivative", 0))
	t = ctx.convert(t)
	t1 = ctx._re(t)
	t2 = ctx._im(t)
	prec = ctx.prec
	try:
	if abs(t1) > 500prec and t2*2 < t1:
	v = ctx.rs_z(t, d)
	if ctx._is_real_type(t):
	return ctx._re(v)
	return v
	except NotImplementedError:
	pass
	ctx.prec += 21
	e1 = ctx.expj(ctx.siegeltheta(t))
	z = ctx.zeta(0.5+ctx.j*t)
	if d == 0:
	v = e1*z
	ctx.prec=prec
	if ctx._is_real_type(t):
	return ctx._re(v)
	return +v
	z1 = ctx.zeta(0.5+ctx.j*t, derivative=1)
	theta1 = ctx.siegeltheta(t, derivative=1)
	if d == 1:
	v = ctx.je1(z1+z*theta1)
	ctx.prec=prec
	if ctx._is_real_type(t):
	return ctx._re(v)
	return +v
	z2 = ctx.zeta(0.5+ctx.j*t, derivative=2)
	theta2 = ctx.siegeltheta(t, derivative=2)
	comb1 = theta1*2-ctx.jtheta2
	if d == 2:
	def terms():
	return [2z1theta1, z2, z*comb1]
	v = ctx.sum_accurately(terms, 1)
	v = -e1*v
	ctx.prec = prec
	if ctx._is_real_type(t):
	return ctx._re(v)
	return +v
	ctx.prec += 10
	z3 = ctx.zeta(0.5+ctx.j*t, derivative=3)
	theta3 = ctx.siegeltheta(t, derivative=3)
	comb2 = theta1*3-3ctx.jtheta1theta2-theta3
	if d == 3:
	def terms():
	return [3theta1z2, 3z1comb1, z3+z*comb2]
	v = ctx.sum_accurately(terms, 1)
	v = -ctx.je1v
	ctx.prec = prec
	if ctx._is_real_type(t):
	return ctx._re(v)
	return +v
	z4 = ctx.zeta(0.5+ctx.j*t, derivative=4)
	theta4 = ctx.siegeltheta(t, derivative=4)
	def terms():
	return [theta1*4, -6ctx.jtheta12theta2, -3theta2*2,
	-4theta1theta3, ctx.j*theta4]
	comb3 = ctx.sum_accurately(terms, 1)
	if d == 4:
	def terms():
	return [6theta12z2, -6ctx.jz2theta2, 4theta1*z3,
	4z1comb2, z4, z*comb3]
	v = ctx.sum_accurately(terms, 1)
	v = e1*v
	ctx.prec = prec
	if ctx._is_real_type(t):
	return ctx._re(v)
	return +v
	if d > 4:
	h = lambda x: ctx.siegelz(x, derivative=4)
	return ctx.diff(h, t, n=d-4)


	_zeta_zeros = [
	14.134725142,21.022039639,25.010857580,30.424876126,32.935061588,
	37.586178159,40.918719012,43.327073281,48.005150881,49.773832478,
	52.970321478,56.446247697,59.347044003,60.831778525,65.112544048,
	67.079810529,69.546401711,72.067157674,75.704690699,77.144840069,
	79.337375020,82.910380854,84.735492981,87.425274613,88.809111208,
	92.491899271,94.651344041,95.870634228,98.831194218,101.317851006,
	103.725538040,105.446623052,107.168611184,111.029535543,111.874659177,
	114.320220915,116.226680321,118.790782866,121.370125002,122.946829294,
	124.256818554,127.516683880,129.578704200,131.087688531,133.497737203,
	134.756509753,138.116042055,139.736208952,141.123707404,143.111845808,
	146.000982487,147.422765343,150.053520421,150.925257612,153.024693811,
	156.112909294,157.597591818,158.849988171,161.188964138,163.030709687,
	165.537069188,167.184439978,169.094515416,169.911976479,173.411536520,
	174.754191523,176.441434298,178.377407776,179.916484020,182.207078484,
	184.874467848,185.598783678,187.228922584,189.416158656,192.026656361,
	193.079726604,195.265396680,196.876481841,198.015309676,201.264751944,
	202.493594514,204.189671803,205.394697202,207.906258888,209.576509717,
	211.690862595,213.347919360,214.547044783,216.169538508,219.067596349,
	220.714918839,221.430705555,224.007000255,224.983324670,227.421444280,
	229.337413306,231.250188700,231.987235253,233.693404179,236.524229666,
	]

	def _load_zeta_zeros(url):
	import urllib
	d = urllib.urlopen(url)
	L = [float(x) for x in d.readlines()]
	# Sanity check
	assert round(L[0]) == 14
	_zeta_zeros[:] = L

	@defun
	def oldzetazero(ctx, n, url='http://www.dtc.umn.edu/~odlyzko/zeta_tables/zeros1'):
	n = int(n)
	if n < 0:
	return ctx.zetazero(-n).conjugate()
	if n == 0:
	raise ValueError("n must be nonzero")
	if n > len(_zeta_zeros) and n <= 100000:
	_load_zeta_zeros(url)
	if n > len(_zeta_zeros):
	raise NotImplementedError("n too large for zetazeros")
	return ctx.mpc(0.5, ctx.findroot(ctx.siegelz, _zeta_zeros[n-1]))

	@defun_wrapped
	def riemannr(ctx, x):
	if x == 0:
	return ctx.zero
	# Check if a simple asymptotic estimate is accurate enough
	if abs(x) > 1000:
	a = ctx.li(x)
	b = 0.5*ctx.li(ctx.sqrt(x))
	if abs(b) < abs(a)*ctx.eps:
	return a
	if abs(x) < 0.01:
	# XXX
	ctx.prec += int(-ctx.log(abs(x),2))
	# Sum Gram's series
	s = t = ctx.one
	u = ctx.ln(x)
	k = 1
	while abs(t) > abs(s)*ctx.eps:
	t = t * u / k
	s += t / (k * ctx._zeta_int(k+1))
	k += 1
	return s

	@defun_static
	def primepi(ctx, x):
	x = int(x)
	if x < 2:
	return 0
	return len(ctx.list_primes(x))

	# TODO: fix the interface wrt contexts
	@defun_wrapped
	def primepi2(ctx, x):
	x = int(x)
	if x < 2:
	return ctx._iv.zero
	if x < 2657:
	return ctx._iv.mpf(ctx.primepi(x))
	mid = ctx.li(x)
	# Schoenfeld's estimate for x >= 2657, assuming RH
	err = ctx.sqrt(x,rounding='u')*ctx.ln(x,rounding='u')/8/ctx.pi(rounding='d')
	a = ctx.floor((ctx._iv.mpf(mid)-err).a, rounding='d')
	b = ctx.ceil((ctx._iv.mpf(mid)+err).b, rounding='u')
	return ctx._iv.mpf([a,b])

	@defun_wrapped
	def primezeta(ctx, s):
	if ctx.isnan(s):
	return s
	if ctx.re(s) <= 0:
	raise ValueError("prime zeta function defined only for re(s) > 0")
	if s == 1:
	return ctx.inf
	if s == 0.5:
	return ctx.mpc(ctx.ninf, ctx.pi)
	r = ctx.re(s)
	if r > ctx.prec:
	return 0.5**s
	else:
	wp = ctx.prec + int(r)
	def terms():
	orig = ctx.prec
	# zeta ~ 1+eps; need to set precision
	# to get logarithm accurately
	k = 0
	while 1:
	k += 1
	u = ctx.moebius(k)
	if not u:
	continue
	ctx.prec = wp
	t = uctx.ln(ctx.zeta(ks))/k
	if not t:
	return
	#print ctx.prec, ctx.nstr(t)
	ctx.prec = orig
	yield t
	return ctx.sum_accurately(terms)

	# TODO: for bernpoly and eulerpoly, ensure that all exact zeros are covered

	@defun_wrapped
	def bernpoly(ctx, n, z):
	# Slow implementation:
	#return sum(ctx.binomial(n,k)ctx.bernoulli(k)z**(n-k) for k in xrange(0,n+1))
	n = int(n)
	if n < 0:
	raise ValueError("Bernoulli polynomials only defined for n >= 0")
	if z == 0 or (z == 1 and n > 1):
	return ctx.bernoulli(n)
	if z == 0.5:
	return (ctx.ldexp(1,1-n)-1)*ctx.bernoulli(n)
	if n <= 3:
	if n == 0: return z ** 0
	if n == 1: return z - 0.5
	if n == 2: return (6z(z-1)+1)/6
	if n == 3: return z(z(z-1.5)+0.5)
	if ctx.isinf(z):
	return z ** n
	if ctx.isnan(z):
	return z
	if abs(z) > 2:
	def terms():
	t = ctx.one
	yield t
	r = ctx.one/z
	k = 1
	while k <= n:
	t = t(n+1-k)/kr
	if not (k > 2 and k & 1):
	yield t*ctx.bernoulli(k)
	k += 1
	return ctx.sum_accurately(terms) * z**n
	else:
	def terms():
	yield ctx.bernoulli(n)
	t = ctx.one
	k = 1
	while k <= n:
	t = t(n+1-k)/k z
	m = n-k
	if not (m > 2 and m & 1):
	yield t*ctx.bernoulli(m)
	k += 1
	return ctx.sum_accurately(terms)

	@defun_wrapped
	def eulerpoly(ctx, n, z):
	n = int(n)
	if n < 0:
	raise ValueError("Euler polynomials only defined for n >= 0")
	if n <= 2:
	if n == 0: return z ** 0
	if n == 1: return z - 0.5
	if n == 2: return z*(z-1)
	if ctx.isinf(z):
	return z**n
	if ctx.isnan(z):
	return z
	m = n+1
	if z == 0:
	return -2(ctx.ldexp(1,m)-1)ctx.bernoulli(m)/m * z**0
	if z == 1:
	return 2(ctx.ldexp(1,m)-1)ctx.bernoulli(m)/m * z**0
	if z == 0.5:
	if n % 2:
	return ctx.zero
	# Use exact code for Euler numbers
	if n < 100 or nctx.mag(0.46839865n) < ctx.prec*0.25:
	return ctx.ldexp(ctx._eulernum(n), -n)
	# http://functions.wolfram.com/Polynomials/EulerE2/06/01/02/01/0002/
	def terms():
	t = ctx.one
	k = 0
	w = ctx.ldexp(1,n+2)
	while 1:
	v = n-k+1
	if not (v > 2 and v & 1):
	yield (2-w)ctx.bernoulli(v)t
	k += 1
	if k > n:
	break
	t = tz(n-k+2)/k
	w *= 0.5
	return ctx.sum_accurately(terms) / m

	@defun
	def eulernum(ctx, n, exact=False):
	n = int(n)
	if exact:
	return int(ctx._eulernum(n))
	if n < 100:
	return ctx.mpf(ctx._eulernum(n))
	if n % 2:
	return ctx.zero
	return ctx.ldexp(ctx.eulerpoly(n,0.5), n)

	# TODO: this should be implemented low-level
	def polylog_series(ctx, s, z):
	tol = +ctx.eps
	l = ctx.zero
	k = 1
	zk = z
	while 1:
	term = zk / k**s
	l += term
	if abs(term) < tol:
	break
	zk *= z
	k += 1
	return l

	def polylog_continuation(ctx, n, z):
	if n < 0:
	return z*0
	twopij = 2j * ctx.pi
	a = -twopij*n/ctx.fac(n) ctx.bernpoly(n, ctx.ln(z)/twopij)
	if ctx._is_real_type(z) and z < 0:
	a = ctx._re(a)
	if ctx._im(z) < 0 or (ctx._im(z) == 0 and ctx._re(z) >= 1):
	a -= twopijctx.ln(z)*(n-1)/ctx.fac(n-1)
	return a

	def polylog_unitcircle(ctx, n, z):
	tol = +ctx.eps
	if n > 1:
	l = ctx.zero
	logz = ctx.ln(z)
	logmz = ctx.one
	m = 0
	while 1:
	if (n-m) != 1:
	term = ctx.zeta(n-m) * logmz / ctx.fac(m)
	if term and abs(term) < tol:
	break
	l += term
	logmz *= logz
	m += 1
	l += ctx.ln(z)*(n-1)/ctx.fac(n-1)(ctx.harmonic(n-1)-ctx.ln(-ctx.ln(z)))
	elif n < 1: # else
	l = ctx.fac(-n)(-ctx.ln(z))*(n-1)
	logz = ctx.ln(z)
	logkz = ctx.one
	k = 0
	while 1:
	b = ctx.bernoulli(k-n+1)
	if b:
	term = blogkz/(ctx.fac(k)(k-n+1))
	if abs(term) < tol:
	break
	l -= term
	logkz *= logz
	k += 1
	else:
	raise ValueError
	if ctx._is_real_type(z) and z < 0:
	l = ctx._re(l)
	return l

	def polylog_general(ctx, s, z):
	v = ctx.zero
	u = ctx.ln(z)
	if not abs(u) < 5: # theoretically \|u\| < 2*pi
	j = ctx.j
	v = 1-s
	y = ctx.ln(-z)/(2ctx.pij)
	return ctx.gamma(v)(jvctx.zeta(v,0.5+y) + j*-vctx.zeta(v,0.5-y))/(2ctx.pi)*v
	t = 1
	k = 0
	while 1:
	term = ctx.zeta(s-k) * t
	if abs(term) < ctx.eps:
	break
	v += term
	k += 1
	t *= u
	t /= k
	return ctx.gamma(1-s)(-u)*(s-1) + v

	@defun_wrapped
	def polylog(ctx, s, z):
	s = ctx.convert(s)
	z = ctx.convert(z)
	if z == 1:
	return ctx.zeta(s)
	if z == -1:
	return -ctx.altzeta(s)
	if s == 0:
	return z/(1-z)
	if s == 1:
	return -ctx.ln(1-z)
	if s == -1:
	return z/(1-z)**2
	if abs(z) <= 0.75 or (not ctx.isint(s) and abs(z) < 0.9):
	return polylog_series(ctx, s, z)
	if abs(z) >= 1.4 and ctx.isint(s):
	return (-1)*(s+1)polylog_series(ctx, s, 1/z) + polylog_continuation(ctx, int(ctx.re(s)), z)
	if ctx.isint(s):
	return polylog_unitcircle(ctx, int(ctx.re(s)), z)
	return polylog_general(ctx, s, z)

	@defun_wrapped
	def clsin(ctx, s, z, pi=False):
	if ctx.isint(s) and s < 0 and int(s) % 2 == 1:
	return z*0
	if pi:
	a = ctx.expjpi(z)
	else:
	a = ctx.expj(z)
	if ctx._is_real_type(z) and ctx._is_real_type(s):
	return ctx.im(ctx.polylog(s,a))
	b = 1/a
	return (-0.5j)*(ctx.polylog(s,a) - ctx.polylog(s,b))

	@defun_wrapped
	def clcos(ctx, s, z, pi=False):
	if ctx.isint(s) and s < 0 and int(s) % 2 == 0:
	return z*0
	if pi:
	a = ctx.expjpi(z)
	else:
	a = ctx.expj(z)
	if ctx._is_real_type(z) and ctx._is_real_type(s):
	return ctx.re(ctx.polylog(s,a))
	b = 1/a
	return 0.5*(ctx.polylog(s,a) + ctx.polylog(s,b))

	@defun
	def altzeta(ctx, s, **kwargs):
	try:
	return ctx._altzeta(s, **kwargs)
	except NotImplementedError:
	return ctx._altzeta_generic(s)

	@defun_wrapped
	def _altzeta_generic(ctx, s):
	if s == 1:
	return ctx.ln2 + 0*s
	return -ctx.powm1(2, 1-s) * ctx.zeta(s)

	@defun
	def zeta(ctx, s, a=1, derivative=0, method=None, **kwargs):
	d = int(derivative)
	if a == 1 and not (d or method):
	try:
	return ctx._zeta(s, **kwargs)
	except NotImplementedError:
	pass
	s = ctx.convert(s)
	prec = ctx.prec
	method = kwargs.get('method')
	verbose = kwargs.get('verbose')
	if (not s) and (not derivative):
	return ctx.mpf(0.5) - ctx._convert_param(a)[0]
	if a == 1 and method != 'euler-maclaurin':
	im = abs(ctx._im(s))
	re = abs(ctx._re(s))
	#if (im < prec or method == 'borwein') and not derivative:
	# try:
	# if verbose:
	# print "zeta: Attempting to use the Borwein algorithm"
	# return ctx._zeta(s, **kwargs)
	# except NotImplementedError:
	# if verbose:
	# print "zeta: Could not use the Borwein algorithm"
	# pass
	if abs(im) > 500prec and 10re < prec and derivative <= 4 or \
	method == 'riemann-siegel':
	try: # py2.4 compatible try block
	try:
	if verbose:
	print("zeta: Attempting to use the Riemann-Siegel algorithm")
	return ctx.rs_zeta(s, derivative, **kwargs)
	except NotImplementedError:
	if verbose:
	print("zeta: Could not use the Riemann-Siegel algorithm")
	pass
	finally:
	ctx.prec = prec
	if s == 1:
	return ctx.inf
	abss = abs(s)
	if abss == ctx.inf:
	if ctx.re(s) == ctx.inf:
	if d == 0:
	return ctx.one
	return ctx.zero
	return s*0
	elif ctx.isnan(abss):
	return 1/s
	if ctx.re(s) > 2*ctx.prec and a == 1 and not derivative:
	return ctx.one + ctx.power(2, -s)
	return +ctx._hurwitz(s, a, d, **kwargs)

	@defun
	def _hurwitz(ctx, s, a=1, d=0, **kwargs):
	prec = ctx.prec
	verbose = kwargs.get('verbose')
	try:
	extraprec = 10
	ctx.prec += extraprec
	# We strongly want to special-case rational a
	a, atype = ctx._convert_param(a)
	if ctx.re(s) < 0:
	if verbose:
	print("zeta: Attempting reflection formula")
	try:
	return _hurwitz_reflection(ctx, s, a, d, atype)
	except NotImplementedError:
	pass
	if verbose:
	print("zeta: Reflection formula failed")
	if verbose:
	print("zeta: Using the Euler-Maclaurin algorithm")
	while 1:
	ctx.prec = prec + extraprec
	T1, T2 = _hurwitz_em(ctx, s, a, d, prec+10, verbose)
	cancellation = ctx.mag(T1) - ctx.mag(T1+T2)
	if verbose:
	print("Term 1:", T1)
	print("Term 2:", T2)
	print("Cancellation:", cancellation, "bits")
	if cancellation < extraprec:
	return T1 + T2
	else:
	extraprec = max(2extraprec, min(cancellation + 5, 100prec))
	if extraprec > kwargs.get('maxprec', 100*prec):
	raise ctx.NoConvergence("zeta: too much cancellation")
	finally:
	ctx.prec = prec

	def _hurwitz_reflection(ctx, s, a, d, atype):
	# TODO: implement for derivatives
	if d != 0:
	raise NotImplementedError
	res = ctx.re(s)
	negs = -s
	# Integer reflection formula
	if ctx.isnpint(s):
	n = int(res)
	if n <= 0:
	return ctx.bernpoly(1-n, a) / (n-1)
	if not (atype == 'Q' or atype == 'Z'):
	raise NotImplementedError
	t = 1-s
	# We now require a to be standardized
	v = 0
	shift = 0
	b = a
	while ctx.re(b) > 1:
	b -= 1
	v -= b**negs
	shift -= 1
	while ctx.re(b) <= 0:
	v += b**negs
	b += 1
	shift += 1
	# Rational reflection formula
	try:
	p, q = a._mpq_
	except:
	assert a == int(a)
	p = int(a)
	q = 1
	p += shift*q
	assert 1 <= p <= q
	g = ctx.fsum(ctx.cospi(t/2-2kb)*ctx._hurwitz(t,(k,q)) \
	for k in range(1,q+1))
	g = 2ctx.gamma(t)/(2ctx.piq)**t
	v += g
	return v

	def _hurwitz_em(ctx, s, a, d, prec, verbose):
	# May not be converted at this point
	a = ctx.convert(a)
	tol = -prec
	# Estimate number of terms for Euler-Maclaurin summation; could be improved
	M1 = 0
	M2 = prec // 3
	N = M2
	lsum = 0
	# This speeds up the recurrence for derivatives
	if ctx.isint(s):
	s = int(ctx._re(s))
	s1 = s-1
	while 1:
	# Truncated L-series
	l = ctx._zetasum(s, M1+a, M2-M1-1, [d])[0][0]
	#if d:
	# l = ctx.fsum((-ctx.ln(n+a))*d (n+a)**negs for n in range(M1,M2))
	#else:
	# l = ctx.fsum((n+a)**negs for n in range(M1,M2))
	lsum += l
	M2a = M2+a
	logM2a = ctx.ln(M2a)
	logM2ad = logM2a**d
	logs = [logM2ad]
	logr = 1/logM2a
	rM2a = 1/M2a
	M2as = M2a**(-s)
	if d:
	tailsum = ctx.gammainc(d+1, s1logM2a) / s1*(d+1)
	else:
	tailsum = 1/((s1)(M2a)*s1)
	tailsum += 0.5 * logM2ad * M2as
	U = [1]
	r = M2as
	fact = 2
	for j in range(1, N+1):
	# TODO: the following could perhaps be tidied a bit
	j2 = 2*j
	if j == 1:
	upds = [1]
	else:
	upds = [j2-2, j2-1]
	for m in upds:
	D = min(m,d+1)
	if m <= d:
	logs.append(logs[-1] * logr)
	Un = [0]*(D+1)
	for i in xrange(D): Un[i] = (1-m-s)*U[i]
	for i in xrange(1,D+1): Un[i] += (d-(i-1))*U[i-1]
	U = Un
	r *= rM2a
	t = ctx.fdot(U, logs) * r * ctx.bernoulli(j2)/(-fact)
	tailsum += t
	if ctx.mag(t) < tol:
	return lsum, (-1)*d tailsum
	fact = (j2+1)(j2+2)
	if verbose:
	print("Sum range:", M1, M2, "term magnitude", ctx.mag(t), "tolerance", tol)
	M1, M2 = M2, M2*2
	if ctx.re(s) < 0:
	N += N//2



	@defun
	def _zetasum(ctx, s, a, n, derivatives=[0], reflect=False):
	"""
	Returns [xd0,xd1,...,xdr], [yd0,yd1,...ydr] where

	xdk = D^k ( 1/a^s + 1/(a+1)^s + ... + 1/(a+n)^s )
	ydk = D^k conj( 1/a^(1-s) + 1/(a+1)^(1-s) + ... + 1/(a+n)^(1-s) )

	D^k = kth derivative with respect to s, k ranges over the given list of
	derivatives (which should consist of either a single element
	or a range 0,1,...r). If reflect=False, the ydks are not computed.
	"""
	#print "zetasum", s, a, n
	# don't use the fixed-point code if there are large exponentials
	if abs(ctx.re(s)) < 0.5 * ctx.prec:
	try:
	return ctx._zetasum_fast(s, a, n, derivatives, reflect)
	except NotImplementedError:
	pass
	negs = ctx.fneg(s, exact=True)
	have_derivatives = derivatives != [0]
	have_one_derivative = len(derivatives) == 1
	if not reflect:
	if not have_derivatives:
	return [ctx.fsum((a+k)**negs for k in xrange(n+1))], []
	if have_one_derivative:
	d = derivatives[0]
	x = ctx.fsum(ctx.ln(a+k)*d (a+k)**negs for k in xrange(n+1))
	return [(-1)*d x], []
	maxd = max(derivatives)
	if not have_one_derivative:
	derivatives = range(maxd+1)
	xs = [ctx.zero for d in derivatives]
	if reflect:
	ys = [ctx.zero for d in derivatives]
	else:
	ys = []
	for k in xrange(n+1):
	w = a + k
	xterm = w ** negs
	if reflect:
	yterm = ctx.conj(ctx.one / (w * xterm))
	if have_derivatives:
	logw = -ctx.ln(w)
	if have_one_derivative:
	logw = logw ** maxd
	xs[0] += xterm * logw
	if reflect:
	ys[0] += yterm * logw
	else:
	t = ctx.one
	for d in derivatives:
	xs[d] += xterm * t
	if reflect:
	ys[d] += yterm * t
	t *= logw
	else:
	xs[0] += xterm
	if reflect:
	ys[0] += yterm
	return xs, ys

	@defun
	def dirichlet(ctx, s, chi=[1], derivative=0):
	s = ctx.convert(s)
	q = len(chi)
	d = int(derivative)
	if d > 2:
	raise NotImplementedError("arbitrary order derivatives")
	prec = ctx.prec
	try:
	ctx.prec += 10
	if s == 1:
	have_pole = True
	for x in chi:
	if x and x != 1:
	have_pole = False
	h = +ctx.eps
	ctx.prec = 2(d+1)
	s += h
	if have_pole:
	return +ctx.inf
	z = ctx.zero
	for p in range(1,q+1):
	if chi[p%q]:
	if d == 1:
	z += chi[p%q] * (ctx.zeta(s, (p,q), 1) - \
	ctx.zeta(s, (p,q))*ctx.log(q))
	else:
	z += chi[p%q] * ctx.zeta(s, (p,q))
	z /= q**s
	finally:
	ctx.prec = prec
	return +z


	def secondzeta_main_term(ctx, s, a, **kwargs):
	tol = ctx.eps
	f = lambda n: ctx.gammainc(0.5s, agamm*2, regularized=True)gamm**(-s)
	totsum = term = ctx.zero
	mg = ctx.inf
	n = 0
	while mg > tol:
	totsum += term
	n += 1
	gamm = ctx.im(ctx.zetazero_memoized(n))
	term = f(n)
	mg = abs(term)
	err = 0
	if kwargs.get("error"):
	sg = ctx.re(s)
	err = 0.5ctx.pi(-1)max(1,sg)a(sg-0.5)ctx.log(gamm/(2ctx.pi))\
	ctx.gammainc(-0.5, agamm*2)/abs(ctx.gamma(s/2))
	err = abs(err)
	return +totsum, err, n

	def secondzeta_prime_term(ctx, s, a, **kwargs):
	tol = ctx.eps
	f = lambda n: ctx.gammainc(0.5(1-s),0.25ctx.log(n)*2 a*(-1))\
	((0.5ctx.log(n))(s-1))ctx.mangoldt(n)/ctx.sqrt(n)/\
	(2ctx.gamma(0.5s)*ctx.sqrt(ctx.pi))
	totsum = term = ctx.zero
	mg = ctx.inf
	n = 1
	while mg > tol or n < 9:
	totsum += term
	n += 1
	term = f(n)
	if term == 0:
	mg = ctx.inf
	else:
	mg = abs(term)
	if kwargs.get("error"):
	err = mg
	return +totsum, err, n

	def secondzeta_exp_term(ctx, s, a):
	if ctx.isint(s) and ctx.re(s) <= 0:
	m = int(round(ctx.re(s)))
	if not m & 1:
	return ctx.mpf('-0.25')**(-m//2)
	tol = ctx.eps
	f = lambda n: (0.25a)n/((n+0.5s)*ctx.fac(n))
	totsum = ctx.zero
	term = f(0)
	mg = ctx.inf
	n = 0
	while mg > tol:
	totsum += term
	n += 1
	term = f(n)
	mg = abs(term)
	v = a*(0.5s)totsum/ctx.gamma(0.5s)
	return v

	def secondzeta_singular_term(ctx, s, a, **kwargs):
	factor = a*(0.5(s-1))/(4ctx.sqrt(ctx.pi)ctx.gamma(0.5*s))
	extraprec = ctx.mag(factor)
	ctx.prec += extraprec
	factor = a*(0.5(s-1))/(4ctx.sqrt(ctx.pi)ctx.gamma(0.5*s))
	tol = ctx.eps
	f = lambda n: ctx.bernpoly(n,0.75)(4ctx.sqrt(a))*n\
	ctx.gamma(0.5n)/((s+n-1)ctx.fac(n))
	totsum = ctx.zero
	mg1 = ctx.inf
	n = 1
	term = f(n)
	mg2 = abs(term)
	while mg2 > tol and mg2 <= mg1:
	totsum += term
	n += 1
	term = f(n)
	totsum += term
	n +=1
	term = f(n)
	mg1 = mg2
	mg2 = abs(term)
	totsum += term
	pole = -2(s-1)(-2)+(ctx.euler+ctx.log(16ctx.pi*2a))(s-1)*(-1)
	st = factor*(pole+totsum)
	err = 0
	if kwargs.get("error"):
	if not ((mg2 > tol) and (mg2 <= mg1)):
	if mg2 <= tol:
	err = ctx.mpf(10)*int(ctx.log(abs(factortol),10))
	if mg2 > mg1:
	err = ctx.mpf(10)*int(ctx.log(abs(factormg1),10))
	err = max(err, ctx.eps*1.)
	ctx.prec -= extraprec
	return +st, err

	@defun
	def secondzeta(ctx, s, a = 0.015, **kwargs):
	r"""
	Evaluates the secondary zeta function `Z(s)`, defined for
	`\mathrm{Re}(s)>1` by

	.. math ::

	Z(s) = \sum_{n=1}^{\infty} \frac{1}{\tau_n^s}

	where `\frac12+i\tau_n` runs through the zeros of `\zeta(s)` with
	imaginary part positive.

	`Z(s)` extends to a meromorphic function on `\mathbb{C}` with a
	double pole at `s=1` and simple poles at the points `-2n` for
	`n=0`, 1, 2, ...

	Examples

	>>> from mpmath import *
	>>> mp.pretty = True; mp.dps = 15
	>>> secondzeta(2)
	0.023104993115419
	>>> xi = lambda s: 0.5s(s-1)pi(-0.5s)gamma(0.5s)*zeta(s)
	>>> Xi = lambda t: xi(0.5+t*j)
	>>> chop(-0.5*diff(Xi,0,n=2)/Xi(0))
	0.023104993115419

	We may ask for an approximate error value::

	>>> secondzeta(0.5+100j, error=True)
	((-0.216272011276718 - 0.844952708937228j), 2.22044604925031e-16)

	The function has poles at the negative odd integers,
	and dyadic rational values at the negative even integers::

	>>> mp.dps = 30
	>>> secondzeta(-8)
	-0.67236328125
	>>> secondzeta(-7)
	+inf

	Implementation notes

	The function is computed as sum of four terms `Z(s)=A(s)-P(s)+E(s)-S(s)`
	respectively main, prime, exponential and singular terms.
	The main term `A(s)` is computed from the zeros of zeta.
	The prime term depends on the von Mangoldt function.
	The singular term is responsible for the poles of the function.

	The four terms depends on a small parameter `a`. We may change the
	value of `a`. Theoretically this has no effect on the sum of the four
	terms, but in practice may be important.

	A smaller value of the parameter `a` makes `A(s)` depend on
	a smaller number of zeros of zeta, but `P(s)` uses more values of
	von Mangoldt function.

	We may also add a verbose option to obtain data about the
	values of the four terms.

	>>> mp.dps = 10
	>>> secondzeta(0.5 + 40j, error=True, verbose=True)
	main term = (-30190318549.138656312556 - 13964804384.624622876523j)
	computed using 19 zeros of zeta
	prime term = (132717176.89212754625045 + 188980555.17563978290601j)
	computed using 9 values of the von Mangoldt function
	exponential term = (542447428666.07179812536 + 362434922978.80192435203j)
	singular term = (512124392939.98154322355 + 348281138038.65531023921j)
	((0.059471043 + 0.3463514534j), 1.455191523e-11)

	>>> secondzeta(0.5 + 40j, a=0.04, error=True, verbose=True)
	main term = (-151962888.19606243907725 - 217930683.90210294051982j)
	computed using 9 zeros of zeta
	prime term = (2476659342.3038722372461 + 28711581821.921627163136j)
	computed using 37 values of the von Mangoldt function
	exponential term = (178506047114.7838188264 + 819674143244.45677330576j)
	singular term = (175877424884.22441310708 + 790744630738.28669174871j)
	((0.059471043 + 0.3463514534j), 1.455191523e-11)

	Notice the great cancellation between the four terms. Changing `a`, the
	four terms are very different numbers but the cancellation gives
	the good value of Z(s).

	References

	A. Voros, Zeta functions for the Riemann zeros, Ann. Institute Fourier,
	53, (2003) 665--699.

	A. Voros, Zeta functions over Zeros of Zeta Functions, Lecture Notes
	of the Unione Matematica Italiana, Springer, 2009.
	"""
	s = ctx.convert(s)
	a = ctx.convert(a)
	tol = ctx.eps
	if ctx.isint(s) and ctx.re(s) <= 1:
	if abs(s-1) < tol*1000:
	return ctx.inf
	m = int(round(ctx.re(s)))
	if m & 1:
	return ctx.inf
	else:
	return ((-1)*(-m//2)\
	ctx.fraction(8-ctx.eulernum(-m,exact=True),2**(-m+3)))
	prec = ctx.prec
	try:
	t3 = secondzeta_exp_term(ctx, s, a)
	extraprec = max(ctx.mag(t3),0)
	ctx.prec += extraprec + 3
	t1, r1, gt = secondzeta_main_term(ctx,s,a,error='True', verbose='True')
	t2, r2, pt = secondzeta_prime_term(ctx,s,a,error='True', verbose='True')
	t4, r4 = secondzeta_singular_term(ctx,s,a,error='True')
	t3 = secondzeta_exp_term(ctx, s, a)
	err = r1+r2+r4
	t = t1-t2+t3-t4
	if kwargs.get("verbose"):
	print('main term =', t1)
	print(' computed using', gt, 'zeros of zeta')
	print('prime term =', t2)
	print(' computed using', pt, 'values of the von Mangoldt function')
	print('exponential term =', t3)
	print('singular term =', t4)
	finally:
	ctx.prec = prec
	if kwargs.get("error"):
	w = max(ctx.mag(abs(t)),0)
	err = max(err2w, ctx.eps1.2*w)
	return +t, err
	return +t


	@defun_wrapped
	def lerchphi(ctx, z, s, a):
	r"""
	Gives the Lerch transcendent, defined for `\|z\| < 1` and
	`\Re{a} > 0` by

	.. math ::

	\Phi(z,s,a) = \sum_{k=0}^{\infty} \frac{z^k}{(a+k)^s}

	and generally by the recurrence `\Phi(z,s,a) = z \Phi(z,s,a+1) + a^{-s}`
	along with the integral representation valid for `\Re{a} > 0`

	.. math ::

	\Phi(z,s,a) = \frac{1}{2 a^s} +
	\int_0^{\infty} \frac{z^t}{(a+t)^s} dt -
	2 \int_0^{\infty} \frac{\sin(t \log z - s
	\operatorname{arctan}(t/a)}{(a^2 + t^2)^{s/2}
	(e^{2 \pi t}-1)} dt.

	The Lerch transcendent generalizes the Hurwitz zeta function :func:`zeta`
	(`z = 1`) and the polylogarithm :func:`polylog` (`a = 1`).

	Examples

	Several evaluations in terms of simpler functions::

	>>> from mpmath import *
	>>> mp.dps = 25; mp.pretty = True
	>>> lerchphi(-1,2,0.5); 4*catalan
	3.663862376708876060218414
	3.663862376708876060218414
	>>> diff(lerchphi, (-1,-2,1), (0,1,0)); 7zeta(3)/(4pi**2)
	0.2131391994087528954617607
	0.2131391994087528954617607
	>>> lerchphi(-4,1,1); log(5)/4
	0.4023594781085250936501898
	0.4023594781085250936501898
	>>> lerchphi(-3+2j,1,0.5); 2*atanh(sqrt(-3+2j))/sqrt(-3+2j)
	(1.142423447120257137774002 + 0.2118232380980201350495795j)
	(1.142423447120257137774002 + 0.2118232380980201350495795j)

	Evaluation works for complex arguments and `\|z\| \ge 1`::

	>>> lerchphi(1+2j, 3-j, 4+2j)
	(0.002025009957009908600539469 + 0.003327897536813558807438089j)
	>>> lerchphi(-2,2,-2.5)
	-12.28676272353094275265944
	>>> lerchphi(10,10,10)
	(-4.462130727102185701817349e-11 - 1.575172198981096218823481e-12j)
	>>> lerchphi(10,10,-10.5)
	(112658784011940.5605789002 - 498113185.5756221777743631j)

	Some degenerate cases::

	>>> lerchphi(0,1,2)
	0.5
	>>> lerchphi(0,1,-2)
	-0.5

	Reduction to simpler functions::

	>>> lerchphi(1, 4.25+1j, 1)
	(1.044674457556746668033975 - 0.04674508654012658932271226j)
	>>> zeta(4.25+1j)
	(1.044674457556746668033975 - 0.04674508654012658932271226j)
	>>> lerchphi(1 - 0.5**10, 4.25+1j, 1)
	(1.044629338021507546737197 - 0.04667768813963388181708101j)
	>>> lerchphi(3, 4, 1)
	(1.249503297023366545192592 - 0.2314252413375664776474462j)
	>>> polylog(4, 3) / 3
	(1.249503297023366545192592 - 0.2314252413375664776474462j)
	>>> lerchphi(3, 4, 1 - 0.5**10)
	(1.253978063946663945672674 - 0.2316736622836535468765376j)

	References

	1. [DLMF]_ section 25.14

	"""
	if z == 0:
	return a ** (-s)
	# Faster, but these cases are useful for testing right now
	if z == 1:
	return ctx.zeta(s, a)
	if a == 1:
	return ctx.polylog(s, z) / z
	if ctx.re(a) < 1:
	if ctx.isnpint(a):
	raise ValueError("Lerch transcendent complex infinity")
	m = int(ctx.ceil(1-ctx.re(a)))
	v = ctx.zero
	zpow = ctx.one
	for n in xrange(m):
	v += zpow / (a+n)**s
	zpow *= z
	return zpow * ctx.lerchphi(z,s, a+m) + v
	g = ctx.ln(z)
	v = 1/(2as) + ctx.gammainc(1-s, -ag) * (-g)(s-1) / za
	h = s / 2
	r = 2*ctx.pi
	f = lambda t: ctx.sin(sctx.atan(t/a)-tg) / \
	((a2+t2)*h ctx.expm1(r*t))
	v += 2*ctx.quad(f, [0, ctx.inf])
	if not ctx.im(z) and not ctx.im(s) and not ctx.im(a) and ctx.re(z) < 1:
	v = ctx.chop(v)
	return v