boost_1_45_0/libs/math/doc/sf_and_dist/bessel_spherical.qbk - nest-learning-thermostat/5.0/boost - Git at Google


 [section:sph_bessel Spherical Bessel Functions of the First and Second Kinds]

 [h4 Synopsis]

    template <class T1, class T2>
    ``__sf_result`` sph_bessel(unsigned v, T2 x);

    template <class T1, class T2, class ``__Policy``>
    ``__sf_result`` sph_bessel(unsigned v, T2 x, const ``__Policy``&);

    template <class T1, class T2>
    ``__sf_result`` sph_neumann(unsigned v, T2 x);

    template <class T1, class T2, class ``__Policy``>
    ``__sf_result`` sph_neumann(unsigned v, T2 x, const ``__Policy``&);

 [h4 Description]

 The functions __sph_bessel and __sph_neumann return the result of the
 Spherical Bessel functions of the first and second kinds respectively:

 sph_bessel(v, x) = j[sub v](x)

 sph_neumann(v, x) = y[sub v](x) = n[sub v](x)

 where:

 [equation sbessel2]

 The return type of these functions is computed using the __arg_pomotion_rules
 for the single argument type T.

 [optional_policy]

 The functions return the result of __domain_error whenever the result is
 undefined or complex: this occurs when `x < 0`.

 The j[sub v][space] function is cyclic like J[sub v][space] but differs
 in its behaviour at the origin:

 [graph sph_bessel]

 Likewise y[sub v][space] is also cyclic for large x, but tends to -[infin][space]
 for small /x/:

 [graph sph_neumann]

 [h4 Testing]

 There are two sets of test values: spot values calculated using
 [@http://functions.wolfram.com/ functions.wolfram.com],
 and a much larger set of tests computed using
 a simplified version of this implementation
 (with all the special case handling removed).

 [h4 Accuracy]

 Other than for some special cases, these functions are computed in terms of
 __cyl_bessel_j and __cyl_neumann: refer to these functions for accuracy data.

 [h4 Implementation]

 Other than error handling and a couple of special cases these functions
 are implemented directly in terms of their definitions:

 [equation sbessel2]

 The special cases occur for:

 j[sub 0][space]= __sinc_pi(x) = sin(x) / x

 and for small ['x < 1], we can use the series:

 [equation sbessel5]

 which neatly avoids the problem of calculating 0/0 that can occur with the
 main definition as x [rarr] 0.

 [endsect]

 [/
   Copyright 2006 John Maddock, Paul A. Bristow and Xiaogang Zhang.
   Distributed under the Boost Software License, Version 1.0.
   (See accompanying file LICENSE_1_0.txt or copy at
   http://www.boost.org/LICENSE_1_0.txt).
 ]

	[section:sph_bessel Spherical Bessel Functions of the First and Second Kinds]

	[h4 Synopsis]

	template <class T1, class T2>
	``__sf_result`` sph_bessel(unsigned v, T2 x);

	template <class T1, class T2, class ``__Policy``>
	``__sf_result`` sph_bessel(unsigned v, T2 x, const ``__Policy``&);

	template <class T1, class T2>
	``__sf_result`` sph_neumann(unsigned v, T2 x);

	template <class T1, class T2, class ``__Policy``>
	``__sf_result`` sph_neumann(unsigned v, T2 x, const ``__Policy``&);

	[h4 Description]

	The functions __sph_bessel and __sph_neumann return the result of the
	Spherical Bessel functions of the first and second kinds respectively:

	sph_bessel(v, x) = j[sub v](x)

	sph_neumann(v, x) = y[sub v](x) = n[sub v](x)

	where:

	[equation sbessel2]

	The return type of these functions is computed using the __arg_pomotion_rules
	for the single argument type T.

	[optional_policy]

	The functions return the result of __domain_error whenever the result is
	undefined or complex: this occurs when `x < 0`.

	The j[sub v][space] function is cyclic like J[sub v][space] but differs
	in its behaviour at the origin:

	[graph sph_bessel]

	Likewise y[sub v][space] is also cyclic for large x, but tends to -[infin][space]
	for small /x/:

	[graph sph_neumann]

	[h4 Testing]

	There are two sets of test values: spot values calculated using
	[@http://functions.wolfram.com/ functions.wolfram.com],
	and a much larger set of tests computed using
	a simplified version of this implementation
	(with all the special case handling removed).

	[h4 Accuracy]

	Other than for some special cases, these functions are computed in terms of
	__cyl_bessel_j and __cyl_neumann: refer to these functions for accuracy data.

	[h4 Implementation]

	Other than error handling and a couple of special cases these functions
	are implemented directly in terms of their definitions:

	[equation sbessel2]

	The special cases occur for:

	j[sub 0][space]= __sinc_pi(x) = sin(x) / x

	and for small ['x < 1], we can use the series:

	[equation sbessel5]

	which neatly avoids the problem of calculating 0/0 that can occur with the
	main definition as x [rarr] 0.

	[endsect]

	[/
	Copyright 2006 John Maddock, Paul A. Bristow and Xiaogang Zhang.
	Distributed under the Boost Software License, Version 1.0.
	(See accompanying file LICENSE_1_0.txt or copy at
	http://www.boost.org/LICENSE_1_0.txt).
	]