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from functools import wraps |
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from scipy._lib._util import _lazywhere |
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import numpy as np |
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from ._ufuncs import (_spherical_jn, _spherical_yn, _spherical_in, |
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_spherical_kn, _spherical_jn_d, _spherical_yn_d, |
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_spherical_in_d, _spherical_kn_d) |
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def use_reflection(sign_n_even=None, reflection_fun=None): |
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def decorator(fun): |
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def standard_reflection(n, z, derivative): |
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sign = np.where(n % 2 == 0, sign_n_even, -sign_n_even) |
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sign = -sign if derivative else sign |
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return fun(n, -z, derivative) * sign |
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@wraps(fun) |
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def wrapper(n, z, derivative=False): |
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z = np.asarray(z) |
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if np.issubdtype(z.dtype, np.complexfloating): |
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return fun(n, z, derivative) |
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f2 = standard_reflection if reflection_fun is None else reflection_fun |
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return _lazywhere(z.real >= 0, (n, z), |
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f=lambda n, z: fun(n, z, derivative), |
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f2=lambda n, z: f2(n, z, derivative))[()] |
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return wrapper |
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return decorator |
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@use_reflection(+1) |
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def spherical_jn(n, z, derivative=False): |
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r"""Spherical Bessel function of the first kind or its derivative. |
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Defined as [1]_, |
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.. math:: j_n(z) = \sqrt{\frac{\pi}{2z}} J_{n + 1/2}(z), |
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where :math:`J_n` is the Bessel function of the first kind. |
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Parameters |
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---------- |
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n : int, array_like |
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Order of the Bessel function (n >= 0). |
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z : complex or float, array_like |
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Argument of the Bessel function. |
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derivative : bool, optional |
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If True, the value of the derivative (rather than the function |
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itself) is returned. |
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Returns |
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------- |
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jn : ndarray |
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Notes |
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----- |
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For real arguments greater than the order, the function is computed |
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using the ascending recurrence [2]_. For small real or complex |
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arguments, the definitional relation to the cylindrical Bessel function |
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of the first kind is used. |
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The derivative is computed using the relations [3]_, |
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.. math:: |
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j_n'(z) = j_{n-1}(z) - \frac{n + 1}{z} j_n(z). |
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j_0'(z) = -j_1(z) |
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.. versionadded:: 0.18.0 |
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References |
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---------- |
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.. [1] https://dlmf.nist.gov/10.47.E3 |
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.. [2] https://dlmf.nist.gov/10.51.E1 |
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.. [3] https://dlmf.nist.gov/10.51.E2 |
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.. [AS] Milton Abramowitz and Irene A. Stegun, eds. |
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Handbook of Mathematical Functions with Formulas, |
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Graphs, and Mathematical Tables. New York: Dover, 1972. |
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Examples |
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-------- |
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The spherical Bessel functions of the first kind :math:`j_n` accept |
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both real and complex second argument. They can return a complex type: |
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>>> from scipy.special import spherical_jn |
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>>> spherical_jn(0, 3+5j) |
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(-9.878987731663194-8.021894345786002j) |
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>>> type(spherical_jn(0, 3+5j)) |
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<class 'numpy.complex128'> |
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We can verify the relation for the derivative from the Notes |
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for :math:`n=3` in the interval :math:`[1, 2]`: |
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>>> import numpy as np |
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>>> x = np.arange(1.0, 2.0, 0.01) |
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>>> np.allclose(spherical_jn(3, x, True), |
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... spherical_jn(2, x) - 4/x * spherical_jn(3, x)) |
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True |
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The first few :math:`j_n` with real argument: |
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>>> import matplotlib.pyplot as plt |
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>>> x = np.arange(0.0, 10.0, 0.01) |
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>>> fig, ax = plt.subplots() |
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>>> ax.set_ylim(-0.5, 1.5) |
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>>> ax.set_title(r'Spherical Bessel functions $j_n$') |
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>>> for n in np.arange(0, 4): |
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... ax.plot(x, spherical_jn(n, x), label=rf'$j_{n}$') |
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>>> plt.legend(loc='best') |
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>>> plt.show() |
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""" |
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n = np.asarray(n, dtype=np.dtype("long")) |
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if derivative: |
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return _spherical_jn_d(n, z) |
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else: |
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return _spherical_jn(n, z) |
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@use_reflection(-1) |
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def spherical_yn(n, z, derivative=False): |
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r"""Spherical Bessel function of the second kind or its derivative. |
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Defined as [1]_, |
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.. math:: y_n(z) = \sqrt{\frac{\pi}{2z}} Y_{n + 1/2}(z), |
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where :math:`Y_n` is the Bessel function of the second kind. |
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Parameters |
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---------- |
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n : int, array_like |
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Order of the Bessel function (n >= 0). |
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z : complex or float, array_like |
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Argument of the Bessel function. |
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derivative : bool, optional |
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If True, the value of the derivative (rather than the function |
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itself) is returned. |
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Returns |
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------- |
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yn : ndarray |
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Notes |
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----- |
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For real arguments, the function is computed using the ascending |
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recurrence [2]_. For complex arguments, the definitional relation to |
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the cylindrical Bessel function of the second kind is used. |
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The derivative is computed using the relations [3]_, |
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.. math:: |
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y_n' = y_{n-1} - \frac{n + 1}{z} y_n. |
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y_0' = -y_1 |
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.. versionadded:: 0.18.0 |
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References |
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---------- |
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.. [1] https://dlmf.nist.gov/10.47.E4 |
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.. [2] https://dlmf.nist.gov/10.51.E1 |
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.. [3] https://dlmf.nist.gov/10.51.E2 |
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.. [AS] Milton Abramowitz and Irene A. Stegun, eds. |
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Handbook of Mathematical Functions with Formulas, |
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Graphs, and Mathematical Tables. New York: Dover, 1972. |
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Examples |
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-------- |
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The spherical Bessel functions of the second kind :math:`y_n` accept |
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both real and complex second argument. They can return a complex type: |
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>>> from scipy.special import spherical_yn |
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>>> spherical_yn(0, 3+5j) |
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(8.022343088587197-9.880052589376795j) |
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>>> type(spherical_yn(0, 3+5j)) |
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<class 'numpy.complex128'> |
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We can verify the relation for the derivative from the Notes |
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for :math:`n=3` in the interval :math:`[1, 2]`: |
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>>> import numpy as np |
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>>> x = np.arange(1.0, 2.0, 0.01) |
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>>> np.allclose(spherical_yn(3, x, True), |
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... spherical_yn(2, x) - 4/x * spherical_yn(3, x)) |
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True |
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The first few :math:`y_n` with real argument: |
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>>> import matplotlib.pyplot as plt |
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>>> x = np.arange(0.0, 10.0, 0.01) |
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>>> fig, ax = plt.subplots() |
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>>> ax.set_ylim(-2.0, 1.0) |
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>>> ax.set_title(r'Spherical Bessel functions $y_n$') |
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>>> for n in np.arange(0, 4): |
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... ax.plot(x, spherical_yn(n, x), label=rf'$y_{n}$') |
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>>> plt.legend(loc='best') |
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>>> plt.show() |
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""" |
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n = np.asarray(n, dtype=np.dtype("long")) |
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if derivative: |
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return _spherical_yn_d(n, z) |
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else: |
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return _spherical_yn(n, z) |
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@use_reflection(+1) |
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def spherical_in(n, z, derivative=False): |
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r"""Modified spherical Bessel function of the first kind or its derivative. |
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Defined as [1]_, |
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.. math:: i_n(z) = \sqrt{\frac{\pi}{2z}} I_{n + 1/2}(z), |
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where :math:`I_n` is the modified Bessel function of the first kind. |
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Parameters |
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---------- |
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n : int, array_like |
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Order of the Bessel function (n >= 0). |
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z : complex or float, array_like |
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Argument of the Bessel function. |
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derivative : bool, optional |
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If True, the value of the derivative (rather than the function |
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itself) is returned. |
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Returns |
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------- |
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in : ndarray |
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Notes |
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----- |
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The function is computed using its definitional relation to the |
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modified cylindrical Bessel function of the first kind. |
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The derivative is computed using the relations [2]_, |
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.. math:: |
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i_n' = i_{n-1} - \frac{n + 1}{z} i_n. |
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i_1' = i_0 |
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.. versionadded:: 0.18.0 |
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References |
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---------- |
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.. [1] https://dlmf.nist.gov/10.47.E7 |
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.. [2] https://dlmf.nist.gov/10.51.E5 |
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.. [AS] Milton Abramowitz and Irene A. Stegun, eds. |
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Handbook of Mathematical Functions with Formulas, |
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Graphs, and Mathematical Tables. New York: Dover, 1972. |
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Examples |
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-------- |
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The modified spherical Bessel functions of the first kind :math:`i_n` |
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accept both real and complex second argument. |
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They can return a complex type: |
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>>> from scipy.special import spherical_in |
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>>> spherical_in(0, 3+5j) |
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(-1.1689867793369182-1.2697305267234222j) |
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>>> type(spherical_in(0, 3+5j)) |
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<class 'numpy.complex128'> |
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We can verify the relation for the derivative from the Notes |
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for :math:`n=3` in the interval :math:`[1, 2]`: |
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>>> import numpy as np |
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>>> x = np.arange(1.0, 2.0, 0.01) |
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>>> np.allclose(spherical_in(3, x, True), |
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... spherical_in(2, x) - 4/x * spherical_in(3, x)) |
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True |
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The first few :math:`i_n` with real argument: |
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>>> import matplotlib.pyplot as plt |
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>>> x = np.arange(0.0, 6.0, 0.01) |
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>>> fig, ax = plt.subplots() |
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>>> ax.set_ylim(-0.5, 5.0) |
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>>> ax.set_title(r'Modified spherical Bessel functions $i_n$') |
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>>> for n in np.arange(0, 4): |
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... ax.plot(x, spherical_in(n, x), label=rf'$i_{n}$') |
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>>> plt.legend(loc='best') |
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>>> plt.show() |
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""" |
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n = np.asarray(n, dtype=np.dtype("long")) |
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if derivative: |
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return _spherical_in_d(n, z) |
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else: |
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return _spherical_in(n, z) |
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def spherical_kn_reflection(n, z, derivative=False): |
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return spherical_kn(n, z + 0j, derivative=derivative).real |
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@use_reflection(reflection_fun=spherical_kn_reflection) |
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def spherical_kn(n, z, derivative=False): |
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r"""Modified spherical Bessel function of the second kind or its derivative. |
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Defined as [1]_, |
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.. math:: k_n(z) = \sqrt{\frac{\pi}{2z}} K_{n + 1/2}(z), |
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where :math:`K_n` is the modified Bessel function of the second kind. |
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Parameters |
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---------- |
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n : int, array_like |
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Order of the Bessel function (n >= 0). |
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z : complex or float, array_like |
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Argument of the Bessel function. |
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derivative : bool, optional |
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If True, the value of the derivative (rather than the function |
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itself) is returned. |
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Returns |
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------- |
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kn : ndarray |
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Notes |
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----- |
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The function is computed using its definitional relation to the |
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modified cylindrical Bessel function of the second kind. |
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The derivative is computed using the relations [2]_, |
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.. math:: |
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k_n' = -k_{n-1} - \frac{n + 1}{z} k_n. |
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k_0' = -k_1 |
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.. versionadded:: 0.18.0 |
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References |
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---------- |
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.. [1] https://dlmf.nist.gov/10.47.E9 |
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.. [2] https://dlmf.nist.gov/10.51.E5 |
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.. [AS] Milton Abramowitz and Irene A. Stegun, eds. |
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Handbook of Mathematical Functions with Formulas, |
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Graphs, and Mathematical Tables. New York: Dover, 1972. |
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Examples |
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-------- |
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The modified spherical Bessel functions of the second kind :math:`k_n` |
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accept both real and complex second argument. |
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They can return a complex type: |
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>>> from scipy.special import spherical_kn |
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>>> spherical_kn(0, 3+5j) |
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(0.012985785614001561+0.003354691603137546j) |
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>>> type(spherical_kn(0, 3+5j)) |
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<class 'numpy.complex128'> |
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We can verify the relation for the derivative from the Notes |
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for :math:`n=3` in the interval :math:`[1, 2]`: |
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>>> import numpy as np |
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>>> x = np.arange(1.0, 2.0, 0.01) |
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>>> np.allclose(spherical_kn(3, x, True), |
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... - 4/x * spherical_kn(3, x) - spherical_kn(2, x)) |
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True |
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The first few :math:`k_n` with real argument: |
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>>> import matplotlib.pyplot as plt |
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>>> x = np.arange(0.0, 4.0, 0.01) |
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>>> fig, ax = plt.subplots() |
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>>> ax.set_ylim(0.0, 5.0) |
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>>> ax.set_title(r'Modified spherical Bessel functions $k_n$') |
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>>> for n in np.arange(0, 4): |
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... ax.plot(x, spherical_kn(n, x), label=rf'$k_{n}$') |
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>>> plt.legend(loc='best') |
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>>> plt.show() |
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""" |
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n = np.asarray(n, dtype=np.dtype("long")) |
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if derivative: |
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return _spherical_kn_d(n, z) |
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else: |
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return _spherical_kn(n, z) |
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