| // 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_Y1_HPP |
| #define BOOST_MATH_BESSEL_Y1_HPP |
| |
| #ifdef _MSC_VER |
| #pragma once |
| #endif |
| |
| #include <boost/math/special_functions/detail/bessel_j1.hpp> |
| #include <boost/math/constants/constants.hpp> |
| #include <boost/math/tools/rational.hpp> |
| #include <boost/math/policies/error_handling.hpp> |
| #include <boost/assert.hpp> |
| |
| // Bessel function of the second kind of order one |
| // x <= 8, minimax rational approximations on root-bracketing intervals |
| // x > 8, Hankel asymptotic expansion in Hart, Computer Approximations, 1968 |
| |
| namespace boost { namespace math { namespace detail{ |
| |
| template <typename T, typename Policy> |
| T bessel_y1(T x, const Policy& pol) |
| { |
| static const T P1[] = { |
| static_cast<T>(4.0535726612579544093e+13L), |
| static_cast<T>(5.4708611716525426053e+12L), |
| static_cast<T>(-3.7595974497819597599e+11L), |
| static_cast<T>(7.2144548214502560419e+09L), |
| static_cast<T>(-5.9157479997408395984e+07L), |
| static_cast<T>(2.2157953222280260820e+05L), |
| static_cast<T>(-3.1714424660046133456e+02L), |
| }; |
| static const T Q1[] = { |
| static_cast<T>(3.0737873921079286084e+14L), |
| static_cast<T>(4.1272286200406461981e+12L), |
| static_cast<T>(2.7800352738690585613e+10L), |
| static_cast<T>(1.2250435122182963220e+08L), |
| static_cast<T>(3.8136470753052572164e+05L), |
| static_cast<T>(8.2079908168393867438e+02L), |
| static_cast<T>(1.0L), |
| }; |
| static const T P2[] = { |
| static_cast<T>(1.1514276357909013326e+19L), |
| static_cast<T>(-5.6808094574724204577e+18L), |
| static_cast<T>(-2.3638408497043134724e+16L), |
| static_cast<T>(4.0686275289804744814e+15L), |
| static_cast<T>(-5.9530713129741981618e+13L), |
| static_cast<T>(3.7453673962438488783e+11L), |
| static_cast<T>(-1.1957961912070617006e+09L), |
| static_cast<T>(1.9153806858264202986e+06L), |
| static_cast<T>(-1.2337180442012953128e+03L), |
| }; |
| static const T Q2[] = { |
| static_cast<T>(5.3321844313316185697e+20L), |
| static_cast<T>(5.6968198822857178911e+18L), |
| static_cast<T>(3.0837179548112881950e+16L), |
| static_cast<T>(1.1187010065856971027e+14L), |
| static_cast<T>(3.0221766852960403645e+11L), |
| static_cast<T>(6.3550318087088919566e+08L), |
| static_cast<T>(1.0453748201934079734e+06L), |
| static_cast<T>(1.2855164849321609336e+03L), |
| static_cast<T>(1.0L), |
| }; |
| static const T PC[] = { |
| static_cast<T>(-4.4357578167941278571e+06L), |
| static_cast<T>(-9.9422465050776411957e+06L), |
| static_cast<T>(-6.6033732483649391093e+06L), |
| static_cast<T>(-1.5235293511811373833e+06L), |
| static_cast<T>(-1.0982405543459346727e+05L), |
| static_cast<T>(-1.6116166443246101165e+03L), |
| static_cast<T>(0.0L), |
| }; |
| static const T QC[] = { |
| static_cast<T>(-4.4357578167941278568e+06L), |
| static_cast<T>(-9.9341243899345856590e+06L), |
| static_cast<T>(-6.5853394797230870728e+06L), |
| static_cast<T>(-1.5118095066341608816e+06L), |
| static_cast<T>(-1.0726385991103820119e+05L), |
| static_cast<T>(-1.4550094401904961825e+03L), |
| static_cast<T>(1.0L), |
| }; |
| static const T PS[] = { |
| static_cast<T>(3.3220913409857223519e+04L), |
| static_cast<T>(8.5145160675335701966e+04L), |
| static_cast<T>(6.6178836581270835179e+04L), |
| static_cast<T>(1.8494262873223866797e+04L), |
| static_cast<T>(1.7063754290207680021e+03L), |
| static_cast<T>(3.5265133846636032186e+01L), |
| static_cast<T>(0.0L), |
| }; |
| static const T QS[] = { |
| static_cast<T>(7.0871281941028743574e+05L), |
| static_cast<T>(1.8194580422439972989e+06L), |
| static_cast<T>(1.4194606696037208929e+06L), |
| static_cast<T>(4.0029443582266975117e+05L), |
| static_cast<T>(3.7890229745772202641e+04L), |
| static_cast<T>(8.6383677696049909675e+02L), |
| static_cast<T>(1.0L), |
| }; |
| static const T x1 = static_cast<T>(2.1971413260310170351e+00L), |
| x2 = static_cast<T>(5.4296810407941351328e+00L), |
| x11 = static_cast<T>(5.620e+02L), |
| x12 = static_cast<T>(1.8288260310170351490e-03L), |
| x21 = static_cast<T>(1.3900e+03L), |
| x22 = static_cast<T>(-6.4592058648672279948e-06L) |
| ; |
| T value, factor, r, rc, rs; |
| |
| BOOST_MATH_STD_USING |
| using namespace boost::math::tools; |
| using namespace boost::math::constants; |
| |
| if (x <= 0) |
| { |
| return policies::raise_domain_error<T>("bost::math::bessel_y1<%1%>(%1%,%1%)", |
| "Got x == %1%, but x must be > 0, complex result not supported.", x, pol); |
| } |
| if (x <= 4) // x in (0, 4] |
| { |
| T y = x * x; |
| T z = 2 * log(x/x1) * bessel_j1(x) / pi<T>(); |
| r = evaluate_rational(P1, Q1, y); |
| factor = (x + x1) * ((x - x11/256) - x12) / x; |
| value = z + factor * r; |
| } |
| else if (x <= 8) // x in (4, 8] |
| { |
| T y = x * x; |
| T z = 2 * log(x/x2) * bessel_j1(x) / pi<T>(); |
| r = evaluate_rational(P2, Q2, y); |
| factor = (x + x2) * ((x - x21/256) - x22) / x; |
| value = z + factor * r; |
| } |
| else // x in (8, \infty) |
| { |
| T y = 8 / x; |
| T y2 = y * y; |
| T z = x - 0.75f * pi<T>(); |
| rc = evaluate_rational(PC, QC, y2); |
| rs = evaluate_rational(PS, QS, y2); |
| factor = sqrt(2 / (x * pi<T>())); |
| value = factor * (rc * sin(z) + y * rs * cos(z)); |
| } |
| |
| return value; |
| } |
| |
| }}} // namespaces |
| |
| #endif // BOOST_MATH_BESSEL_Y1_HPP |
| |