[ceph.git] / ceph / src / boost / libs / math / include / boost / math / tools / rational.hpp

//  (C) Copyright John Maddock 2006.
//  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_TOOLS_RATIONAL_HPP
#define BOOST_MATH_TOOLS_RATIONAL_HPP

#ifdef _MSC_VER
#pragma once
#endif

#include <boost/array.hpp>
#include <boost/math/tools/config.hpp>
#include <boost/mpl/int.hpp>

#if BOOST_MATH_POLY_METHOD == 1
#  define BOOST_HEADER() <BOOST_JOIN(boost/math/tools/detail/polynomial_horner1_, BOOST_MATH_MAX_POLY_ORDER).hpp>
#  include BOOST_HEADER()
#  undef BOOST_HEADER
#elif BOOST_MATH_POLY_METHOD == 2
#  define BOOST_HEADER() <BOOST_JOIN(boost/math/tools/detail/polynomial_horner2_, BOOST_MATH_MAX_POLY_ORDER).hpp>
#  include BOOST_HEADER()
#  undef BOOST_HEADER
#elif BOOST_MATH_POLY_METHOD == 3
#  define BOOST_HEADER() <BOOST_JOIN(boost/math/tools/detail/polynomial_horner3_, BOOST_MATH_MAX_POLY_ORDER).hpp>
#  include BOOST_HEADER()
#  undef BOOST_HEADER
#endif
#if BOOST_MATH_RATIONAL_METHOD == 1
#  define BOOST_HEADER() <BOOST_JOIN(boost/math/tools/detail/rational_horner1_, BOOST_MATH_MAX_POLY_ORDER).hpp>
#  include BOOST_HEADER()
#  undef BOOST_HEADER
#elif BOOST_MATH_RATIONAL_METHOD == 2
#  define BOOST_HEADER() <BOOST_JOIN(boost/math/tools/detail/rational_horner2_, BOOST_MATH_MAX_POLY_ORDER).hpp>
#  include BOOST_HEADER()
#  undef BOOST_HEADER
#elif BOOST_MATH_RATIONAL_METHOD == 3
#  define BOOST_HEADER() <BOOST_JOIN(boost/math/tools/detail/rational_horner3_, BOOST_MATH_MAX_POLY_ORDER).hpp>
#  include BOOST_HEADER()
#  undef BOOST_HEADER
#endif

#if 0
//
// This just allows dependency trackers to find the headers
// used in the above PP-magic.
//
#include <boost/math/tools/detail/polynomial_horner1_2.hpp>
#include <boost/math/tools/detail/polynomial_horner1_3.hpp>
#include <boost/math/tools/detail/polynomial_horner1_4.hpp>
#include <boost/math/tools/detail/polynomial_horner1_5.hpp>
#include <boost/math/tools/detail/polynomial_horner1_6.hpp>
#include <boost/math/tools/detail/polynomial_horner1_7.hpp>
#include <boost/math/tools/detail/polynomial_horner1_8.hpp>
#include <boost/math/tools/detail/polynomial_horner1_9.hpp>
#include <boost/math/tools/detail/polynomial_horner1_10.hpp>
#include <boost/math/tools/detail/polynomial_horner1_11.hpp>
#include <boost/math/tools/detail/polynomial_horner1_12.hpp>
#include <boost/math/tools/detail/polynomial_horner1_13.hpp>
#include <boost/math/tools/detail/polynomial_horner1_14.hpp>
#include <boost/math/tools/detail/polynomial_horner1_15.hpp>
#include <boost/math/tools/detail/polynomial_horner1_16.hpp>
#include <boost/math/tools/detail/polynomial_horner1_17.hpp>
#include <boost/math/tools/detail/polynomial_horner1_18.hpp>
#include <boost/math/tools/detail/polynomial_horner1_19.hpp>
#include <boost/math/tools/detail/polynomial_horner1_20.hpp>
#include <boost/math/tools/detail/polynomial_horner2_2.hpp>
#include <boost/math/tools/detail/polynomial_horner2_3.hpp>
#include <boost/math/tools/detail/polynomial_horner2_4.hpp>
#include <boost/math/tools/detail/polynomial_horner2_5.hpp>
#include <boost/math/tools/detail/polynomial_horner2_6.hpp>
#include <boost/math/tools/detail/polynomial_horner2_7.hpp>
#include <boost/math/tools/detail/polynomial_horner2_8.hpp>
#include <boost/math/tools/detail/polynomial_horner2_9.hpp>
#include <boost/math/tools/detail/polynomial_horner2_10.hpp>
#include <boost/math/tools/detail/polynomial_horner2_11.hpp>
#include <boost/math/tools/detail/polynomial_horner2_12.hpp>
#include <boost/math/tools/detail/polynomial_horner2_13.hpp>
#include <boost/math/tools/detail/polynomial_horner2_14.hpp>
#include <boost/math/tools/detail/polynomial_horner2_15.hpp>
#include <boost/math/tools/detail/polynomial_horner2_16.hpp>
#include <boost/math/tools/detail/polynomial_horner2_17.hpp>
#include <boost/math/tools/detail/polynomial_horner2_18.hpp>
#include <boost/math/tools/detail/polynomial_horner2_19.hpp>
#include <boost/math/tools/detail/polynomial_horner2_20.hpp>
#include <boost/math/tools/detail/polynomial_horner3_2.hpp>
#include <boost/math/tools/detail/polynomial_horner3_3.hpp>
#include <boost/math/tools/detail/polynomial_horner3_4.hpp>
#include <boost/math/tools/detail/polynomial_horner3_5.hpp>
#include <boost/math/tools/detail/polynomial_horner3_6.hpp>
#include <boost/math/tools/detail/polynomial_horner3_7.hpp>
#include <boost/math/tools/detail/polynomial_horner3_8.hpp>
#include <boost/math/tools/detail/polynomial_horner3_9.hpp>
#include <boost/math/tools/detail/polynomial_horner3_10.hpp>
#include <boost/math/tools/detail/polynomial_horner3_11.hpp>
#include <boost/math/tools/detail/polynomial_horner3_12.hpp>
#include <boost/math/tools/detail/polynomial_horner3_13.hpp>
#include <boost/math/tools/detail/polynomial_horner3_14.hpp>
#include <boost/math/tools/detail/polynomial_horner3_15.hpp>
#include <boost/math/tools/detail/polynomial_horner3_16.hpp>
#include <boost/math/tools/detail/polynomial_horner3_17.hpp>
#include <boost/math/tools/detail/polynomial_horner3_18.hpp>
#include <boost/math/tools/detail/polynomial_horner3_19.hpp>
#include <boost/math/tools/detail/polynomial_horner3_20.hpp>
#include <boost/math/tools/detail/rational_horner1_2.hpp>
#include <boost/math/tools/detail/rational_horner1_3.hpp>
#include <boost/math/tools/detail/rational_horner1_4.hpp>
#include <boost/math/tools/detail/rational_horner1_5.hpp>
#include <boost/math/tools/detail/rational_horner1_6.hpp>
#include <boost/math/tools/detail/rational_horner1_7.hpp>
#include <boost/math/tools/detail/rational_horner1_8.hpp>
#include <boost/math/tools/detail/rational_horner1_9.hpp>
#include <boost/math/tools/detail/rational_horner1_10.hpp>
#include <boost/math/tools/detail/rational_horner1_11.hpp>
#include <boost/math/tools/detail/rational_horner1_12.hpp>
#include <boost/math/tools/detail/rational_horner1_13.hpp>
#include <boost/math/tools/detail/rational_horner1_14.hpp>
#include <boost/math/tools/detail/rational_horner1_15.hpp>
#include <boost/math/tools/detail/rational_horner1_16.hpp>
#include <boost/math/tools/detail/rational_horner1_17.hpp>
#include <boost/math/tools/detail/rational_horner1_18.hpp>
#include <boost/math/tools/detail/rational_horner1_19.hpp>
#include <boost/math/tools/detail/rational_horner1_20.hpp>
#include <boost/math/tools/detail/rational_horner2_2.hpp>
#include <boost/math/tools/detail/rational_horner2_3.hpp>
#include <boost/math/tools/detail/rational_horner2_4.hpp>
#include <boost/math/tools/detail/rational_horner2_5.hpp>
#include <boost/math/tools/detail/rational_horner2_6.hpp>
#include <boost/math/tools/detail/rational_horner2_7.hpp>
#include <boost/math/tools/detail/rational_horner2_8.hpp>
#include <boost/math/tools/detail/rational_horner2_9.hpp>
#include <boost/math/tools/detail/rational_horner2_10.hpp>
#include <boost/math/tools/detail/rational_horner2_11.hpp>
#include <boost/math/tools/detail/rational_horner2_12.hpp>
#include <boost/math/tools/detail/rational_horner2_13.hpp>
#include <boost/math/tools/detail/rational_horner2_14.hpp>
#include <boost/math/tools/detail/rational_horner2_15.hpp>
#include <boost/math/tools/detail/rational_horner2_16.hpp>
#include <boost/math/tools/detail/rational_horner2_17.hpp>
#include <boost/math/tools/detail/rational_horner2_18.hpp>
#include <boost/math/tools/detail/rational_horner2_19.hpp>
#include <boost/math/tools/detail/rational_horner2_20.hpp>
#include <boost/math/tools/detail/rational_horner3_2.hpp>
#include <boost/math/tools/detail/rational_horner3_3.hpp>
#include <boost/math/tools/detail/rational_horner3_4.hpp>
#include <boost/math/tools/detail/rational_horner3_5.hpp>
#include <boost/math/tools/detail/rational_horner3_6.hpp>
#include <boost/math/tools/detail/rational_horner3_7.hpp>
#include <boost/math/tools/detail/rational_horner3_8.hpp>
#include <boost/math/tools/detail/rational_horner3_9.hpp>
#include <boost/math/tools/detail/rational_horner3_10.hpp>
#include <boost/math/tools/detail/rational_horner3_11.hpp>
#include <boost/math/tools/detail/rational_horner3_12.hpp>
#include <boost/math/tools/detail/rational_horner3_13.hpp>
#include <boost/math/tools/detail/rational_horner3_14.hpp>
#include <boost/math/tools/detail/rational_horner3_15.hpp>
#include <boost/math/tools/detail/rational_horner3_16.hpp>
#include <boost/math/tools/detail/rational_horner3_17.hpp>
#include <boost/math/tools/detail/rational_horner3_18.hpp>
#include <boost/math/tools/detail/rational_horner3_19.hpp>
#include <boost/math/tools/detail/rational_horner3_20.hpp>
#endif

namespace boost{ namespace math{ namespace tools{

//
// Forward declaration to keep two phase lookup happy:
//
template <class T, class U>
U evaluate_polynomial(const T* poly, U const& z, std::size_t count) BOOST_MATH_NOEXCEPT(U);

namespace detail{

template <class T, class V, class Tag>
inline V evaluate_polynomial_c_imp(const T* a, const V& val, const Tag*) BOOST_MATH_NOEXCEPT(V)
{
   return evaluate_polynomial(a, val, Tag::value);
}

} // namespace detail

//
// Polynomial evaluation with runtime size.
// This requires a for-loop which may be more expensive than
// the loop expanded versions above:
//
template <class T, class U>
inline U evaluate_polynomial(const T* poly, U const& z, std::size_t count) BOOST_MATH_NOEXCEPT(U)
{
   BOOST_ASSERT(count > 0);
   U sum = static_cast<U>(poly[count - 1]);
   for(int i = static_cast<int>(count) - 2; i >= 0; --i)
   {
      sum *= z;
      sum += static_cast<U>(poly[i]);
   }
   return sum;
}
//
// Compile time sized polynomials, just inline forwarders to the
// implementations above:
//
template <std::size_t N, class T, class V>
inline V evaluate_polynomial(const T(&a)[N], const V& val) BOOST_MATH_NOEXCEPT(V)
{
   typedef mpl::int_<N> tag_type;
   return detail::evaluate_polynomial_c_imp(static_cast<const T*>(a), val, static_cast<tag_type const*>(0));
}

template <std::size_t N, class T, class V>
inline V evaluate_polynomial(const boost::array<T,N>& a, const V& val) BOOST_MATH_NOEXCEPT(V)
{
   typedef mpl::int_<N> tag_type;
   return detail::evaluate_polynomial_c_imp(static_cast<const T*>(a.data()), val, static_cast<tag_type const*>(0));
}
//
// Even polynomials are trivial: just square the argument!
//
template <class T, class U>
inline U evaluate_even_polynomial(const T* poly, U z, std::size_t count) BOOST_MATH_NOEXCEPT(U)
{
   return evaluate_polynomial(poly, U(z*z), count);
}

template <std::size_t N, class T, class V>
inline V evaluate_even_polynomial(const T(&a)[N], const V& z) BOOST_MATH_NOEXCEPT(V)
{
   return evaluate_polynomial(a, V(z*z));
}

template <std::size_t N, class T, class V>
inline V evaluate_even_polynomial(const boost::array<T,N>& a, const V& z) BOOST_MATH_NOEXCEPT(V)
{
   return evaluate_polynomial(a, V(z*z));
}
//
// Odd polynomials come next:
//
template <class T, class U>
inline U evaluate_odd_polynomial(const T* poly, U z, std::size_t count) BOOST_MATH_NOEXCEPT(U)
{
   return poly[0] + z * evaluate_polynomial(poly+1, U(z*z), count-1);
}

template <std::size_t N, class T, class V>
inline V evaluate_odd_polynomial(const T(&a)[N], const V& z) BOOST_MATH_NOEXCEPT(V)
{
   typedef mpl::int_<N-1> tag_type;
   return a[0] + z * detail::evaluate_polynomial_c_imp(static_cast<const T*>(a) + 1, V(z*z), static_cast<tag_type const*>(0));
}

template <std::size_t N, class T, class V>
inline V evaluate_odd_polynomial(const boost::array<T,N>& a, const V& z) BOOST_MATH_NOEXCEPT(V)
{
   typedef mpl::int_<N-1> tag_type;
   return a[0] + z * detail::evaluate_polynomial_c_imp(static_cast<const T*>(a.data()) + 1, V(z*z), static_cast<tag_type const*>(0));
}

template <class T, class U, class V>
V evaluate_rational(const T* num, const U* denom, const V& z_, std::size_t count) BOOST_MATH_NOEXCEPT(V);

namespace detail{

template <class T, class U, class V, class Tag>
inline V evaluate_rational_c_imp(const T* num, const U* denom, const V& z, const Tag*) BOOST_MATH_NOEXCEPT(V)
{
   return boost::math::tools::evaluate_rational(num, denom, z, Tag::value);
}

}
//
// Rational functions: numerator and denominator must be
// equal in size.  These always have a for-loop and so may be less
// efficient than evaluating a pair of polynomials. However, there
// are some tricks we can use to prevent overflow that might otherwise
// occur in polynomial evaluation, if z is large.  This is important
// in our Lanczos code for example.
//
template <class T, class U, class V>
V evaluate_rational(const T* num, const U* denom, const V& z_, std::size_t count) BOOST_MATH_NOEXCEPT(V)
{
   V z(z_);
   V s1, s2;
   if(z <= 1)
   {
      s1 = static_cast<V>(num[count-1]);
      s2 = static_cast<V>(denom[count-1]);
      for(int i = (int)count - 2; i >= 0; --i)
      {
         s1 *= z;
         s2 *= z;
         s1 += num[i];
         s2 += denom[i];
      }
   }
   else
   {
      z = 1 / z;
      s1 = static_cast<V>(num[0]);
      s2 = static_cast<V>(denom[0]);
      for(unsigned i = 1; i < count; ++i)
      {
         s1 *= z;
         s2 *= z;
         s1 += num[i];
         s2 += denom[i];
      }
   }
   return s1 / s2;
}

template <std::size_t N, class T, class U, class V>
inline V evaluate_rational(const T(&a)[N], const U(&b)[N], const V& z) BOOST_MATH_NOEXCEPT(V)
{
   return detail::evaluate_rational_c_imp(a, b, z, static_cast<const mpl::int_<N>*>(0));
}

template <std::size_t N, class T, class U, class V>
inline V evaluate_rational(const boost::array<T,N>& a, const boost::array<U,N>& b, const V& z) BOOST_MATH_NOEXCEPT(V)
{
   return detail::evaluate_rational_c_imp(a.data(), b.data(), z, static_cast<mpl::int_<N>*>(0));
}

} // namespace tools
} // namespace math
} // namespace boost

#endif // BOOST_MATH_TOOLS_RATIONAL_HPP
Commit	Line	Data
7c673cae FG	1	// (C) Copyright John Maddock 2006.
	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_TOOLS_RATIONAL_HPP
	7	#define BOOST_MATH_TOOLS_RATIONAL_HPP
	8
	9	#ifdef _MSC_VER
	10	#pragma once
	11	#endif
	12
	13	#include <boost/array.hpp>
	14	#include <boost/math/tools/config.hpp>
	15	#include <boost/mpl/int.hpp>
	16
	17	#if BOOST_MATH_POLY_METHOD == 1
	18	# define BOOST_HEADER() <BOOST_JOIN(boost/math/tools/detail/polynomial_horner1_, BOOST_MATH_MAX_POLY_ORDER).hpp>
	19	# include BOOST_HEADER()
	20	# undef BOOST_HEADER
	21	#elif BOOST_MATH_POLY_METHOD == 2
	22	# define BOOST_HEADER() <BOOST_JOIN(boost/math/tools/detail/polynomial_horner2_, BOOST_MATH_MAX_POLY_ORDER).hpp>
	23	# include BOOST_HEADER()
	24	# undef BOOST_HEADER
	25	#elif BOOST_MATH_POLY_METHOD == 3
	26	# define BOOST_HEADER() <BOOST_JOIN(boost/math/tools/detail/polynomial_horner3_, BOOST_MATH_MAX_POLY_ORDER).hpp>
	27	# include BOOST_HEADER()
	28	# undef BOOST_HEADER
	29	#endif
	30	#if BOOST_MATH_RATIONAL_METHOD == 1
	31	# define BOOST_HEADER() <BOOST_JOIN(boost/math/tools/detail/rational_horner1_, BOOST_MATH_MAX_POLY_ORDER).hpp>
	32	# include BOOST_HEADER()
	33	# undef BOOST_HEADER
	34	#elif BOOST_MATH_RATIONAL_METHOD == 2
	35	# define BOOST_HEADER() <BOOST_JOIN(boost/math/tools/detail/rational_horner2_, BOOST_MATH_MAX_POLY_ORDER).hpp>
	36	# include BOOST_HEADER()
	37	# undef BOOST_HEADER
	38	#elif BOOST_MATH_RATIONAL_METHOD == 3
	39	# define BOOST_HEADER() <BOOST_JOIN(boost/math/tools/detail/rational_horner3_, BOOST_MATH_MAX_POLY_ORDER).hpp>
	40	# include BOOST_HEADER()
	41	# undef BOOST_HEADER
	42	#endif
	43
	44	#if 0
	45	//
	46	// This just allows dependency trackers to find the headers
	47	// used in the above PP-magic.
	48	//
	49	#include <boost/math/tools/detail/polynomial_horner1_2.hpp>
	50	#include <boost/math/tools/detail/polynomial_horner1_3.hpp>
	51	#include <boost/math/tools/detail/polynomial_horner1_4.hpp>
	52	#include <boost/math/tools/detail/polynomial_horner1_5.hpp>
	53	#include <boost/math/tools/detail/polynomial_horner1_6.hpp>
	54	#include <boost/math/tools/detail/polynomial_horner1_7.hpp>
	55	#include <boost/math/tools/detail/polynomial_horner1_8.hpp>
	56	#include <boost/math/tools/detail/polynomial_horner1_9.hpp>
	57	#include <boost/math/tools/detail/polynomial_horner1_10.hpp>
	58	#include <boost/math/tools/detail/polynomial_horner1_11.hpp>
	59	#include <boost/math/tools/detail/polynomial_horner1_12.hpp>
	60	#include <boost/math/tools/detail/polynomial_horner1_13.hpp>
	61	#include <boost/math/tools/detail/polynomial_horner1_14.hpp>
	62	#include <boost/math/tools/detail/polynomial_horner1_15.hpp>
	63	#include <boost/math/tools/detail/polynomial_horner1_16.hpp>
	64	#include <boost/math/tools/detail/polynomial_horner1_17.hpp>
65	#include <boost/math/tools/detail/polynomial_horner1_18.hpp>
66	#include <boost/math/tools/detail/polynomial_horner1_19.hpp>
67	#include <boost/math/tools/detail/polynomial_horner1_20.hpp>
68	#include <boost/math/tools/detail/polynomial_horner2_2.hpp>
69	#include <boost/math/tools/detail/polynomial_horner2_3.hpp>
70	#include <boost/math/tools/detail/polynomial_horner2_4.hpp>
71	#include <boost/math/tools/detail/polynomial_horner2_5.hpp>
72	#include <boost/math/tools/detail/polynomial_horner2_6.hpp>
73	#include <boost/math/tools/detail/polynomial_horner2_7.hpp>
74	#include <boost/math/tools/detail/polynomial_horner2_8.hpp>
75	#include <boost/math/tools/detail/polynomial_horner2_9.hpp>
76	#include <boost/math/tools/detail/polynomial_horner2_10.hpp>
77	#include <boost/math/tools/detail/polynomial_horner2_11.hpp>
78	#include <boost/math/tools/detail/polynomial_horner2_12.hpp>
79	#include <boost/math/tools/detail/polynomial_horner2_13.hpp>
80	#include <boost/math/tools/detail/polynomial_horner2_14.hpp>
81	#include <boost/math/tools/detail/polynomial_horner2_15.hpp>
82	#include <boost/math/tools/detail/polynomial_horner2_16.hpp>
83	#include <boost/math/tools/detail/polynomial_horner2_17.hpp>
84	#include <boost/math/tools/detail/polynomial_horner2_18.hpp>
85	#include <boost/math/tools/detail/polynomial_horner2_19.hpp>
86	#include <boost/math/tools/detail/polynomial_horner2_20.hpp>
87	#include <boost/math/tools/detail/polynomial_horner3_2.hpp>
88	#include <boost/math/tools/detail/polynomial_horner3_3.hpp>
89	#include <boost/math/tools/detail/polynomial_horner3_4.hpp>
90	#include <boost/math/tools/detail/polynomial_horner3_5.hpp>
91	#include <boost/math/tools/detail/polynomial_horner3_6.hpp>
92	#include <boost/math/tools/detail/polynomial_horner3_7.hpp>
93	#include <boost/math/tools/detail/polynomial_horner3_8.hpp>
94	#include <boost/math/tools/detail/polynomial_horner3_9.hpp>
95	#include <boost/math/tools/detail/polynomial_horner3_10.hpp>
96	#include <boost/math/tools/detail/polynomial_horner3_11.hpp>
97	#include <boost/math/tools/detail/polynomial_horner3_12.hpp>
98	#include <boost/math/tools/detail/polynomial_horner3_13.hpp>
99	#include <boost/math/tools/detail/polynomial_horner3_14.hpp>
100	#include <boost/math/tools/detail/polynomial_horner3_15.hpp>
101	#include <boost/math/tools/detail/polynomial_horner3_16.hpp>
102	#include <boost/math/tools/detail/polynomial_horner3_17.hpp>
103	#include <boost/math/tools/detail/polynomial_horner3_18.hpp>
104	#include <boost/math/tools/detail/polynomial_horner3_19.hpp>
105	#include <boost/math/tools/detail/polynomial_horner3_20.hpp>
106	#include <boost/math/tools/detail/rational_horner1_2.hpp>
107	#include <boost/math/tools/detail/rational_horner1_3.hpp>
108	#include <boost/math/tools/detail/rational_horner1_4.hpp>
109	#include <boost/math/tools/detail/rational_horner1_5.hpp>
110	#include <boost/math/tools/detail/rational_horner1_6.hpp>
111	#include <boost/math/tools/detail/rational_horner1_7.hpp>
112	#include <boost/math/tools/detail/rational_horner1_8.hpp>
113	#include <boost/math/tools/detail/rational_horner1_9.hpp>
114	#include <boost/math/tools/detail/rational_horner1_10.hpp>
115	#include <boost/math/tools/detail/rational_horner1_11.hpp>
116	#include <boost/math/tools/detail/rational_horner1_12.hpp>
117	#include <boost/math/tools/detail/rational_horner1_13.hpp>
118	#include <boost/math/tools/detail/rational_horner1_14.hpp>
119	#include <boost/math/tools/detail/rational_horner1_15.hpp>
120	#include <boost/math/tools/detail/rational_horner1_16.hpp>
121	#include <boost/math/tools/detail/rational_horner1_17.hpp>
122	#include <boost/math/tools/detail/rational_horner1_18.hpp>
123	#include <boost/math/tools/detail/rational_horner1_19.hpp>
124	#include <boost/math/tools/detail/rational_horner1_20.hpp>
125	#include <boost/math/tools/detail/rational_horner2_2.hpp>
126	#include <boost/math/tools/detail/rational_horner2_3.hpp>
127	#include <boost/math/tools/detail/rational_horner2_4.hpp>
128	#include <boost/math/tools/detail/rational_horner2_5.hpp>
129	#include <boost/math/tools/detail/rational_horner2_6.hpp>
130	#include <boost/math/tools/detail/rational_horner2_7.hpp>
131	#include <boost/math/tools/detail/rational_horner2_8.hpp>
132	#include <boost/math/tools/detail/rational_horner2_9.hpp>
133	#include <boost/math/tools/detail/rational_horner2_10.hpp>
134	#include <boost/math/tools/detail/rational_horner2_11.hpp>
135	#include <boost/math/tools/detail/rational_horner2_12.hpp>
136	#include <boost/math/tools/detail/rational_horner2_13.hpp>
137	#include <boost/math/tools/detail/rational_horner2_14.hpp>
138	#include <boost/math/tools/detail/rational_horner2_15.hpp>
139	#include <boost/math/tools/detail/rational_horner2_16.hpp>
140	#include <boost/math/tools/detail/rational_horner2_17.hpp>
141	#include <boost/math/tools/detail/rational_horner2_18.hpp>
142	#include <boost/math/tools/detail/rational_horner2_19.hpp>
143	#include <boost/math/tools/detail/rational_horner2_20.hpp>
144	#include <boost/math/tools/detail/rational_horner3_2.hpp>
145	#include <boost/math/tools/detail/rational_horner3_3.hpp>
146	#include <boost/math/tools/detail/rational_horner3_4.hpp>
147	#include <boost/math/tools/detail/rational_horner3_5.hpp>
148	#include <boost/math/tools/detail/rational_horner3_6.hpp>
149	#include <boost/math/tools/detail/rational_horner3_7.hpp>
150	#include <boost/math/tools/detail/rational_horner3_8.hpp>
151	#include <boost/math/tools/detail/rational_horner3_9.hpp>
152	#include <boost/math/tools/detail/rational_horner3_10.hpp>
153	#include <boost/math/tools/detail/rational_horner3_11.hpp>
154	#include <boost/math/tools/detail/rational_horner3_12.hpp>
155	#include <boost/math/tools/detail/rational_horner3_13.hpp>
156	#include <boost/math/tools/detail/rational_horner3_14.hpp>
157	#include <boost/math/tools/detail/rational_horner3_15.hpp>
158	#include <boost/math/tools/detail/rational_horner3_16.hpp>
159	#include <boost/math/tools/detail/rational_horner3_17.hpp>
160	#include <boost/math/tools/detail/rational_horner3_18.hpp>
161	#include <boost/math/tools/detail/rational_horner3_19.hpp>
162	#include <boost/math/tools/detail/rational_horner3_20.hpp>
163	#endif
164
165	namespace boost{ namespace math{ namespace tools{
166
167	//
168	// Forward declaration to keep two phase lookup happy:
169	//
170	template <class T, class U>
171	U evaluate_polynomial(const T* poly, U const& z, std::size_t count) BOOST_MATH_NOEXCEPT(U);
172
173	namespace detail{
174
175	template <class T, class V, class Tag>
176	inline V evaluate_polynomial_c_imp(const T* a, const V& val, const Tag*) BOOST_MATH_NOEXCEPT(V)
177	{
178	return evaluate_polynomial(a, val, Tag::value);
179	}
180
181	} // namespace detail
182
183	//
184	// Polynomial evaluation with runtime size.
185	// This requires a for-loop which may be more expensive than
186	// the loop expanded versions above:
187	//
188	template <class T, class U>
189	inline U evaluate_polynomial(const T* poly, U const& z, std::size_t count) BOOST_MATH_NOEXCEPT(U)
190	{
191	BOOST_ASSERT(count > 0);
192	U sum = static_cast<U>(poly[count - 1]);
193	for(int i = static_cast<int>(count) - 2; i >= 0; --i)
194	{
195	sum *= z;
196	sum += static_cast<U>(poly[i]);
197	}
198	return sum;
199	}
200	//
201	// Compile time sized polynomials, just inline forwarders to the
202	// implementations above:
203	//
204	template <std::size_t N, class T, class V>
205	inline V evaluate_polynomial(const T(&a)[N], const V& val) BOOST_MATH_NOEXCEPT(V)
206	{
207	typedef mpl::int_<N> tag_type;
208	return detail::evaluate_polynomial_c_imp(static_cast<const T>(a), val, static_cast<tag_type const>(0));
209	}
210
211	template <std::size_t N, class T, class V>
212	inline V evaluate_polynomial(const boost::array<T,N>& a, const V& val) BOOST_MATH_NOEXCEPT(V)
213	{
214	typedef mpl::int_<N> tag_type;
215	return detail::evaluate_polynomial_c_imp(static_cast<const T>(a.data()), val, static_cast<tag_type const>(0));
216	}
217	//
218	// Even polynomials are trivial: just square the argument!
219	//
220	template <class T, class U>
221	inline U evaluate_even_polynomial(const T* poly, U z, std::size_t count) BOOST_MATH_NOEXCEPT(U)
222	{
223	return evaluate_polynomial(poly, U(z*z), count);
224	}
225
226	template <std::size_t N, class T, class V>
227	inline V evaluate_even_polynomial(const T(&a)[N], const V& z) BOOST_MATH_NOEXCEPT(V)
228	{
229	return evaluate_polynomial(a, V(z*z));
230	}
231
232	template <std::size_t N, class T, class V>
233	inline V evaluate_even_polynomial(const boost::array<T,N>& a, const V& z) BOOST_MATH_NOEXCEPT(V)
234	{
235	return evaluate_polynomial(a, V(z*z));
236	}
237	//
238	// Odd polynomials come next:
239	//
240	template <class T, class U>
241	inline U evaluate_odd_polynomial(const T* poly, U z, std::size_t count) BOOST_MATH_NOEXCEPT(U)
242	{
243	return poly[0] + z * evaluate_polynomial(poly+1, U(z*z), count-1);
244	}
245
246	template <std::size_t N, class T, class V>
247	inline V evaluate_odd_polynomial(const T(&a)[N], const V& z) BOOST_MATH_NOEXCEPT(V)
248	{
249	typedef mpl::int_<N-1> tag_type;
250	return a[0] + z * detail::evaluate_polynomial_c_imp(static_cast<const T>(a) + 1, V(zz), static_cast<tag_type const*>(0));
251	}
252
253	template <std::size_t N, class T, class V>
254	inline V evaluate_odd_polynomial(const boost::array<T,N>& a, const V& z) BOOST_MATH_NOEXCEPT(V)
255	{
256	typedef mpl::int_<N-1> tag_type;
257	return a[0] + z * detail::evaluate_polynomial_c_imp(static_cast<const T>(a.data()) + 1, V(zz), static_cast<tag_type const*>(0));
258	}
259
260	template <class T, class U, class V>
261	V evaluate_rational(const T* num, const U* denom, const V& z_, std::size_t count) BOOST_MATH_NOEXCEPT(V);
262
263	namespace detail{
264
265	template <class T, class U, class V, class Tag>
266	inline V evaluate_rational_c_imp(const T* num, const U* denom, const V& z, const Tag*) BOOST_MATH_NOEXCEPT(V)
267	{
268	return boost::math::tools::evaluate_rational(num, denom, z, Tag::value);
269	}
270
271	}
272	//
273	// Rational functions: numerator and denominator must be
274	// equal in size. These always have a for-loop and so may be less
275	// efficient than evaluating a pair of polynomials. However, there
276	// are some tricks we can use to prevent overflow that might otherwise
277	// occur in polynomial evaluation, if z is large. This is important
278	// in our Lanczos code for example.
279	//
280	template <class T, class U, class V>
281	V evaluate_rational(const T* num, const U* denom, const V& z_, std::size_t count) BOOST_MATH_NOEXCEPT(V)
282	{
283	V z(z_);
284	V s1, s2;
285	if(z <= 1)
286	{
287	s1 = static_cast<V>(num[count-1]);
288	s2 = static_cast<V>(denom[count-1]);
289	for(int i = (int)count - 2; i >= 0; --i)
290	{
291	s1 *= z;
292	s2 *= z;
293	s1 += num[i];
294	s2 += denom[i];
295	}
296	}
297	else
298	{
299	z = 1 / z;
300	s1 = static_cast<V>(num[0]);
301	s2 = static_cast<V>(denom[0]);
302	for(unsigned i = 1; i < count; ++i)
303	{
304	s1 *= z;
305	s2 *= z;
306	s1 += num[i];
307	s2 += denom[i];
308	}
309	}
310	return s1 / s2;
311	}
312
313	template <std::size_t N, class T, class U, class V>
314	inline V evaluate_rational(const T(&a)[N], const U(&b)[N], const V& z) BOOST_MATH_NOEXCEPT(V)
315	{
316	return detail::evaluate_rational_c_imp(a, b, z, static_cast<const mpl::int_<N>*>(0));
317	}
318
319	template <std::size_t N, class T, class U, class V>
320	inline V evaluate_rational(const boost::array<T,N>& a, const boost::array<U,N>& b, const V& z) BOOST_MATH_NOEXCEPT(V)
321	{
322	return detail::evaluate_rational_c_imp(a.data(), b.data(), z, static_cast<mpl::int_<N>*>(0));
323	}
324
325	} // namespace tools
326	} // namespace math
327	} // namespace boost
328
329	#endif // BOOST_MATH_TOOLS_RATIONAL_HPP
330
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332
333