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Sprout/sprout/math/lgamma.hpp
bolero-MURAKAMI 32c3ba02d4 add math::copysign
fix hyperbolic and exponental functions: for special values
2013-04-24 22:48:36 +09:00

210 lines
10 KiB
C++

#ifndef SPROUT_MATH_LGAMMA_HPP
#define SPROUT_MATH_LGAMMA_HPP
#include <limits>
#include <type_traits>
#include <sprout/config.hpp>
#include <sprout/math/detail/config.hpp>
#include <sprout/math/detail/float_compute.hpp>
#include <sprout/math/constants.hpp>
#include <sprout/math/factorial.hpp>
#include <sprout/math/log.hpp>
#include <sprout/math/sin.hpp>
#include <sprout/math/fabs.hpp>
#include <sprout/math/itrunc.hpp>
#include <sprout/type_traits/enabler_if.hpp>
namespace sprout {
namespace math {
namespace detail {
template<typename T>
inline SPROUT_CONSTEXPR T
lgamma_impl_3(T x, T y) {
return x < 0 ? sprout::math::log(sprout::math::pi<T>() / sprout::math::fabs(x * sprout::math::sin(x * sprout::math::pi<T>()))) - y
: y
;
}
template<typename T>
inline SPROUT_CONSTEXPR T
lgamma_impl_2_d_1(T x, T w, T v, T t) {
return sprout::math::detail::lgamma_impl_3(
x,
(((((-0.00163312359200500807 * t + 8.3644533703385956e-4) * t + -5.9518947575728181e-4) * t
+ 7.9365057505415415e-4) * t + -0.00277777777735463043) * t + 0.08333333333333309869) * v + 0.91893853320467274178
+ ((w - T(0.5)) * sprout::math::log(w) - w)
);
}
template<typename T>
inline SPROUT_CONSTEXPR T
lgamma_impl_2_d(T x, T w, T v) {
return sprout::math::detail::lgamma_impl_2_d_1(x, w, v, v * v);
}
template<typename T>
inline SPROUT_CONSTEXPR T
lgamma_impl_2_c_1(T x, T w, T t, int k) {
return sprout::math::detail::lgamma_impl_3(
x,
k == 0 ? (((((((((((
1.16333640008e-8 * t + -8.33156123568e-8) * t
+ 3.832869977018e-7) * t + -1.5814047847688e-6) * t + 6.50106723241e-6) * t
+ -2.74514060128677e-5) * t + 1.209015360925566e-4) * t + -5.666333178228163e-4) * t
+ 0.0029294103665559733) * t + -0.0180340086069185819) * t + 0.1651788780501166204) * t
+ 1.1031566406452431944) * t + 1.2009736023470742248
: k == 1 ? (((((((((((
1.3842760642e-9 * t + -6.9417501176e-9) * t
+ 3.42976459827e-8) * t + -1.785317236779e-7) * t + 9.525947257118e-7) * t
+ -5.2483007560905e-6) * t + 3.02364659535708e-5) * t + -1.858396115473822e-4) * t
+ 0.0012634378559425382) * t + -0.0102594702201954322) * t + 0.1243625515195050218) * t
+ 1.3888709263595291174) * t + 2.4537365708424422209
: k == 2 ? (((((((((((
1.298977078e-10 * t + -8.02957489e-10) * t
+ 4.945484615e-9) * t + -3.17563534834e-8) * t + 2.092136698089e-7) * t
+ -1.4252023958462e-6) * t + 1.01652510114008e-5) * t + -7.74550502862323e-5) * t
+ 6.537746948291078e-4) * t + -0.006601491253552183) * t + 0.0996711934948138193) * t
+ 1.6110931485817511402) * t + 3.9578139676187162939
: k == 3 ? (((((((((((
1.83995642e-11 * t + -1.353537034e-10) * t
+ 9.984676809e-10) * t + -7.6346363974e-9) * t + 5.99311464148e-8) * t
+ -4.868554120177e-7) * t + 4.1441957716669e-6) * t + -3.77160856623282e-5) * t
+ 3.805693126824884e-4) * t + -0.0045979851178130194) * t + 0.0831422678749791178) * t
+ 1.7929113303999329439) * t + 5.6625620598571415285
: (((((((((((
3.4858778e-12 * t + -2.97587783e-11) * t
+ 2.557677575e-10) * t + -2.2705728282e-9) * t + 2.0702499245e-8) * t
+ -1.954426390917e-7) * t + 1.9343161886722e-6) * t + -2.0479024910257e-5) * t
+ 2.405181940241215e-4) * t + -0.0033842087561074799) * t + 0.0713079483483518997) * t
+ 1.9467574842460867884) * t + 7.5343642367587329552
);
}
template<typename T>
inline SPROUT_CONSTEXPR T
lgamma_impl_2_c(T x, T w, int k) {
return sprout::math::detail::lgamma_impl_2_c_1(x, w, w - (static_cast<T>(k) + 3.5), k);
}
template<typename T>
inline SPROUT_CONSTEXPR T
lgamma_impl_2_b_2(T x, T w, T t, int k) {
return sprout::math::detail::lgamma_impl_3(
x,
k == 0 ? ((((((((((((
-4.587497028e-11 * t + 1.902363396e-10) * t
+ 8.6377323367e-10) * t + 1.15513678861e-8) * t + -2.556403058605e-8) * t
+ -1.5236723372486e-7) * t + -3.1680510638574e-6) * t + 1.22903704923381e-6) * t
+ 2.334372474572637e-5) * t + 0.00111544038088797696) * t + 0.00344717051723468982) * t
+ 0.03198287045148788384) * t + -0.32705333652955399526) * t + 0.40120442440953927615
: k == 1 ? ((((((((((((
-5.184290387e-11 * t + -8.3355121068e-10) * t
+ -2.56167239813e-9) * t + 1.455875381397e-8) * t + 1.3512178394703e-7) * t
+ 2.9898826810905e-7) * t + -3.58107254612779e-6) * t + -2.445260816156224e-5) * t
+ -4.417127762011821e-5) * t + 0.00112859455189416567) * t + 0.00804694454346728197) * t
+ 0.04919775747126691372) * t + -0.24818372840948854178) * t + 0.11071780856646862561
: k == 2 ? ((((((((((((
3.0279161576e-10 * t + 1.60742167357e-9) * t
+ -4.05596009522e-9) * t + -5.089259920266e-8) * t + -2.029496209743e-8) * t
+ 1.35130272477793e-6) * t + 3.91430041115376e-6) * t + -2.871505678061895e-5) * t
+ -2.3052137536922035e-4) * t + 4.5534656385400747e-4) * t + 0.01153444585593040046) * t
+ 0.07924014651650476036) * t + -0.12152192626936502982) * t + -0.07916438300260539592
: k == 3 ? ((((((((((((
-5.091914958e-10 * t + -1.15274986907e-9) * t
+ 1.237873512188e-8) * t + 2.937383549209e-8) * t + -3.0621450667958e-7) * t
+ -7.7409414949954e-7) * t + 8.16753874325579e-6) * t + 2.412433382517375e-5) * t
+ -2.60612176060637e-4) * t + -9.1000087658659231e-4) * t + 0.01068093850598380797) * t
+ 0.11395654404408482305) * t + 0.07209569059984075595) * t + -0.10971041451764266684
: k == 4 ? ((((((((((((
4.0119897187e-10 * t + -1.3224526679e-10) * t
+ -1.002723190355e-8) * t + 2.569249716518e-8) * t + 2.0336011868466e-7) * t
+ -1.1809768272606e-6) * t + -3.00660303810663e-6) * t + 4.402212897757763e-5) * t
+ -1.462405876235375e-5) * t + -0.0016487379559600128) * t + 0.00513927520866443706) * t
+ 0.13843580753590579416) * t + 0.32730190978254056722) * t + 0.08588339725978624973
: k == 5 ? ((((((((((((
-1.5413428348e-10 * t + 6.4905779353e-10) * t
+ 1.60702811151e-9) * t + -2.655645793815e-8) * t + 7.619544277956e-8) * t
+ 4.7604380765353e-7) * t + -4.90748870866195e-6) * t + 8.21513040821212e-6) * t
+ 1.4804944070262948e-4) * t + -0.00122152255762163238) * t + -8.7425289205498532e-4) * t
+ 0.1443870369965796831) * t + 0.61315889733595543766) * t + 0.55513708159976477557
: ((((((((((((
1.049740243e-11 * t + -2.5832017855e-10) * t
+ 1.39591845075e-9) * t + -2.1177278325e-10) * t + -5.082950464905e-8) * t
+ 3.7801785193343e-7) * t + -7.3982266659145e-7) * t + -1.088918441519888e-5) * t
+ 1.2491810452478905e-4) * t + -4.9171790705139895e-4) * t + -0.0042570708944826646) * t
+ 0.13595080378472757216) * t + 0.89518356003149514744) * t + 1.31073912535196238583
);
}
template<typename T>
inline SPROUT_CONSTEXPR T
lgamma_impl_2_b_1(T x, T w, T t, int k) {
return sprout::math::detail::lgamma_impl_2_b_2(x, w, t - (static_cast<T>(k) - T(3.5)), k);
}
template<typename T>
inline SPROUT_CONSTEXPR T
lgamma_impl_2_b(T x, T w, T t) {
return sprout::math::detail::lgamma_impl_2_b_1(x, w, t, sprout::itrunc(t) + 4);
}
template<typename T>
inline SPROUT_CONSTEXPR T
lgamma_impl_2_a(T x, T w, int k) {
return sprout::math::detail::lgamma_impl_3(
x,
-sprout::math::log(
k == 0 ? ((((((((((
9.967270908702825e-5 * w + -1.9831672170162227e-4) * w
+ -0.00117085315349625822) * w + 0.00722012810948319552) * w + -0.0096221300936780297) * w
+ -0.04219772092994235254) * w + 0.16653861065243609743) * w + -0.04200263501129018037) * w
+ -0.65587807152061930091) * w + 0.57721566490153514421) * w + 0.99999999999999999764) * w
: ((((((((((
4.67209725901142e-5 * w + -6.812300803992063e-5) * w
+ -0.00132531159076610073) * w + 0.0073352117810720277) * w + -0.00968095666383935949) * w
+ -0.0421764281187354028) * w + 0.16653313644244428256) * w + -0.04200165481709274859) * w
+ -0.65587818792782740945) * w + 0.57721567315209190522) * w + 0.99999999973565236061) * w
)
);
}
template<typename T>
inline SPROUT_CONSTEXPR T
lgamma_impl_1(T x, T w) {
return w < T(0.5) ? sprout::math::detail::lgamma_impl_2_a(x, w, w < T(0.25) ? 0 : 1)
: w < T(3.5) ? sprout::math::detail::lgamma_impl_2_b(x, w, w - T(4.5) / (w + T(0.5)))
: w < T(8) ? sprout::math::detail::lgamma_impl_2_c(x, w, sprout::itrunc(w) - 3)
: sprout::math::detail::lgamma_impl_2_d(x, w, T(1) / w)
;
}
template<typename T>
inline SPROUT_CONSTEXPR T
lgamma_impl(T x) {
return sprout::math::detail::lgamma_impl_1(x, x < 0 ? -x : x);
}
template<
typename FloatType,
typename sprout::enabler_if<std::is_floating_point<FloatType>::value>::type = sprout::enabler
>
inline SPROUT_CONSTEXPR FloatType
lgamma(FloatType x) {
typedef typename sprout::math::detail::float_compute<FloatType>::type type;
return x == 1 ? FloatType(0)
: x == 2 ? FloatType(0)
: x <= 0 && x == std::trunc(x) ? std::numeric_limits<FloatType>::infinity()
: x == -std::numeric_limits<FloatType>::infinity() ? std::numeric_limits<FloatType>::infinity()
: x == std::numeric_limits<FloatType>::infinity() ? std::numeric_limits<FloatType>::infinity()
: static_cast<FloatType>(sprout::math::detail::lgamma_impl(static_cast<type>(x)))
;
}
template<
typename IntType,
typename sprout::enabler_if<std::is_integral<IntType>::value>::type = sprout::enabler
>
inline SPROUT_CONSTEXPR double
lgamma(IntType x) {
return sprout::math::detail::lgamma(static_cast<double>(x));
}
} // namespace detail
using NS_SPROUT_MATH_DETAIL::lgamma;
} // namespace math
using sprout::math::lgamma;
} // namespace sprout
#endif // #ifndef SPROUT_MATH_LGAMMA_HPP