[ceph.git] / ceph / src / boost / libs / math / include / boost / math / special_functions / detail / bessel_jn.hpp

//  Copyright (c) 2006 Xiaogang Zhang
//  Use, modification and distribution are subject to 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)

#ifndef BOOST_MATH_BESSEL_JN_HPP
#define BOOST_MATH_BESSEL_JN_HPP

#ifdef _MSC_VER
#pragma once
#endif

#include <boost/math/special_functions/detail/bessel_j0.hpp>
#include <boost/math/special_functions/detail/bessel_j1.hpp>
#include <boost/math/special_functions/detail/bessel_jy.hpp>
#include <boost/math/special_functions/detail/bessel_jy_asym.hpp>
#include <boost/math/special_functions/detail/bessel_jy_series.hpp>

// Bessel function of the first kind of integer order
// J_n(z) is the minimal solution
// n < abs(z), forward recurrence stable and usable
// n >= abs(z), forward recurrence unstable, use Miller's algorithm

namespace boost { namespace math { namespace detail{

template <typename T, typename Policy>
T bessel_jn(int n, T x, const Policy& pol)
{
    T value(0), factor, current, prev, next;

    BOOST_MATH_STD_USING

    //
    // Reflection has to come first:
    //
    if (n < 0)
    {
        factor = static_cast<T>((n & 0x1) ? -1 : 1);  // J_{-n}(z) = (-1)^n J_n(z)
        n = -n;
    }
    else
    {
        factor = 1;
    }
    if(x < 0)
    {
        factor *= (n & 0x1) ? -1 : 1;  // J_{n}(-z) = (-1)^n J_n(z)
        x = -x;
    }
    //
    // Special cases:
    //
    if(asymptotic_bessel_large_x_limit(T(n), x))
       return factor * asymptotic_bessel_j_large_x_2<T>(T(n), x);
    if (n == 0)
    {
        return factor * bessel_j0(x);
    }
    if (n == 1)
    {
        return factor * bessel_j1(x);
    }

    if (x == 0)                             // n >= 2
    {
        return static_cast<T>(0);
    }

    BOOST_ASSERT(n > 1);
    T scale = 1;
    if (n < abs(x))                         // forward recurrence
    {
        prev = bessel_j0(x);
        current = bessel_j1(x);
        policies::check_series_iterations<T>("boost::math::bessel_j_n<%1%>(%1%,%1%)", n, pol);
        for (int k = 1; k < n; k++)
        {
            T fact = 2 * k / x;
            //
            // rescale if we would overflow or underflow:
            //
            if((fabs(fact) > 1) && ((tools::max_value<T>() - fabs(prev)) / fabs(fact) < fabs(current)))
            {
               scale /= current;
               prev /= current;
               current = 1;
            }
            value = fact * current - prev;
            prev = current;
            current = value;
        }
    }
    else if((x < 1) || (n > x * x / 4) || (x < 5))
    {
       return factor * bessel_j_small_z_series(T(n), x, pol);
    }
    else                                    // backward recurrence
    {
        T fn; int s;                        // fn = J_(n+1) / J_n
        // |x| <= n, fast convergence for continued fraction CF1
        boost::math::detail::CF1_jy(static_cast<T>(n), x, &fn, &s, pol);
        prev = fn;
        current = 1;
        // Check recursion won't go on too far:
        policies::check_series_iterations<T>("boost::math::bessel_j_n<%1%>(%1%,%1%)", n, pol);
        for (int k = n; k > 0; k--)
        {
            T fact = 2 * k / x;
            if((fabs(fact) > 1) && ((tools::max_value<T>() - fabs(prev)) / fabs(fact) < fabs(current)))
            {
               prev /= current;
               scale /= current;
               current = 1;
            }
            next = fact * current - prev;
            prev = current;
            current = next;
        }
        value = bessel_j0(x) / current;       // normalization
        scale = 1 / scale;
    }
    value *= factor;

    if(tools::max_value<T>() * scale < fabs(value))
       return policies::raise_overflow_error<T>("boost::math::bessel_jn<%1%>(%1%,%1%)", 0, pol);

    return value / scale;
}

}}} // namespaces

#endif // BOOST_MATH_BESSEL_JN_HPP
Commit	Line	Data
7c673cae FG	1	// Copyright (c) 2006 Xiaogang Zhang
	2	// Use, modification and distribution are subject to the
	3	// Boost Software License, Version 1.0. (See accompanying file
	4	// LICENSE_1_0.txt or copy at http://www.boost.org/LICENSE_1_0.txt)
	5
	6	#ifndef BOOST_MATH_BESSEL_JN_HPP
	7	#define BOOST_MATH_BESSEL_JN_HPP
	8
	9	#ifdef _MSC_VER
	10	#pragma once
	11	#endif
	12
	13	#include <boost/math/special_functions/detail/bessel_j0.hpp>
	14	#include <boost/math/special_functions/detail/bessel_j1.hpp>
	15	#include <boost/math/special_functions/detail/bessel_jy.hpp>
	16	#include <boost/math/special_functions/detail/bessel_jy_asym.hpp>
	17	#include <boost/math/special_functions/detail/bessel_jy_series.hpp>
	18
	19	// Bessel function of the first kind of integer order
	20	// J_n(z) is the minimal solution
	21	// n < abs(z), forward recurrence stable and usable
	22	// n >= abs(z), forward recurrence unstable, use Miller's algorithm
	23
	24	namespace boost { namespace math { namespace detail{
	25
	26	template <typename T, typename Policy>
	27	T bessel_jn(int n, T x, const Policy& pol)
	28	{
	29	T value(0), factor, current, prev, next;
	30
	31	BOOST_MATH_STD_USING
	32
	33	//
	34	// Reflection has to come first:
	35	//
	36	if (n < 0)
	37	{
	38	factor = static_cast<T>((n & 0x1) ? -1 : 1); // J_{-n}(z) = (-1)^n J_n(z)
	39	n = -n;
	40	}
	41	else
	42	{
	43	factor = 1;
	44	}
	45	if(x < 0)
	46	{
	47	factor *= (n & 0x1) ? -1 : 1; // J_{n}(-z) = (-1)^n J_n(z)
	48	x = -x;
	49	}
	50	//
	51	// Special cases:
	52	//
	53	if(asymptotic_bessel_large_x_limit(T(n), x))
	54	return factor * asymptotic_bessel_j_large_x_2<T>(T(n), x);
	55	if (n == 0)
	56	{
	57	return factor * bessel_j0(x);
	58	}
	59	if (n == 1)
	60	{
	61	return factor * bessel_j1(x);
	62	}
	63
	64	if (x == 0) // n >= 2
65	{
66	return static_cast<T>(0);
67	}
68
69	BOOST_ASSERT(n > 1);
70	T scale = 1;
71	if (n < abs(x)) // forward recurrence
72	{
73	prev = bessel_j0(x);
74	current = bessel_j1(x);
75	policies::check_series_iterations<T>("boost::math::bessel_j_n<%1%>(%1%,%1%)", n, pol);
76	for (int k = 1; k < n; k++)
77	{
78	T fact = 2 * k / x;
79	//
80	// rescale if we would overflow or underflow:
81	//
82	if((fabs(fact) > 1) && ((tools::max_value<T>() - fabs(prev)) / fabs(fact) < fabs(current)))
83	{
84	scale /= current;
85	prev /= current;
86	current = 1;
87	}
88	value = fact * current - prev;
89	prev = current;
90	current = value;
91	}
92	}
93	else if((x < 1) \|\| (n > x * x / 4) \|\| (x < 5))
94	{
95	return factor * bessel_j_small_z_series(T(n), x, pol);
96	}
97	else // backward recurrence
98	{
99	T fn; int s; // fn = J_(n+1) / J_n
100	// \|x\| <= n, fast convergence for continued fraction CF1
101	boost::math::detail::CF1_jy(static_cast<T>(n), x, &fn, &s, pol);
102	prev = fn;
103	current = 1;
104	// Check recursion won't go on too far:
105	policies::check_series_iterations<T>("boost::math::bessel_j_n<%1%>(%1%,%1%)", n, pol);
106	for (int k = n; k > 0; k--)
107	{
108	T fact = 2 * k / x;
109	if((fabs(fact) > 1) && ((tools::max_value<T>() - fabs(prev)) / fabs(fact) < fabs(current)))
110	{
111	prev /= current;
112	scale /= current;
113	current = 1;
114	}
115	next = fact * current - prev;
116	prev = current;
117	current = next;
118	}
119	value = bessel_j0(x) / current; // normalization
120	scale = 1 / scale;
121	}
122	value *= factor;
123
124	if(tools::max_value<T>() * scale < fabs(value))
125	return policies::raise_overflow_error<T>("boost::math::bessel_jn<%1%>(%1%,%1%)", 0, pol);
126
127	return value / scale;
128	}
129
130	}}} // namespaces
131
132	#endif // BOOST_MATH_BESSEL_JN_HPP
133