You cannot select more than 25 topics
Topics must start with a letter or number, can include dashes ('-') and dots ('.'), can be up to 35 characters long. Letters must be lowercase.
387 lines
14 KiB
387 lines
14 KiB
// 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_DISTRIBUTIONS_FISHER_F_HPP |
|
#define BOOST_MATH_DISTRIBUTIONS_FISHER_F_HPP |
|
|
|
#include <boost/math/distributions/fwd.hpp> |
|
#include <boost/math/special_functions/beta.hpp> // for incomplete beta. |
|
#include <boost/math/distributions/complement.hpp> // complements |
|
#include <boost/math/distributions/detail/common_error_handling.hpp> // error checks |
|
#include <boost/math/special_functions/fpclassify.hpp> |
|
|
|
#include <utility> |
|
|
|
namespace boost{ namespace math{ |
|
|
|
template <class RealType = double, class Policy = policies::policy<> > |
|
class fisher_f_distribution |
|
{ |
|
public: |
|
typedef RealType value_type; |
|
typedef Policy policy_type; |
|
|
|
fisher_f_distribution(const RealType& i, const RealType& j) : m_df1(i), m_df2(j) |
|
{ |
|
static const char* function = "fisher_f_distribution<%1%>::fisher_f_distribution"; |
|
RealType result; |
|
detail::check_df( |
|
function, m_df1, &result, Policy()); |
|
detail::check_df( |
|
function, m_df2, &result, Policy()); |
|
} // fisher_f_distribution |
|
|
|
RealType degrees_of_freedom1()const |
|
{ |
|
return m_df1; |
|
} |
|
RealType degrees_of_freedom2()const |
|
{ |
|
return m_df2; |
|
} |
|
|
|
private: |
|
// |
|
// Data members: |
|
// |
|
RealType m_df1; // degrees of freedom are a real number. |
|
RealType m_df2; // degrees of freedom are a real number. |
|
}; |
|
|
|
typedef fisher_f_distribution<double> fisher_f; |
|
|
|
template <class RealType, class Policy> |
|
inline const std::pair<RealType, RealType> range(const fisher_f_distribution<RealType, Policy>& /*dist*/) |
|
{ // Range of permissible values for random variable x. |
|
using boost::math::tools::max_value; |
|
return std::pair<RealType, RealType>(static_cast<RealType>(0), max_value<RealType>()); |
|
} |
|
|
|
template <class RealType, class Policy> |
|
inline const std::pair<RealType, RealType> support(const fisher_f_distribution<RealType, Policy>& /*dist*/) |
|
{ // Range of supported values for random variable x. |
|
// This is range where cdf rises from 0 to 1, and outside it, the pdf is zero. |
|
using boost::math::tools::max_value; |
|
return std::pair<RealType, RealType>(static_cast<RealType>(0), max_value<RealType>()); |
|
} |
|
|
|
template <class RealType, class Policy> |
|
RealType pdf(const fisher_f_distribution<RealType, Policy>& dist, const RealType& x) |
|
{ |
|
BOOST_MATH_STD_USING // for ADL of std functions |
|
RealType df1 = dist.degrees_of_freedom1(); |
|
RealType df2 = dist.degrees_of_freedom2(); |
|
// Error check: |
|
RealType error_result = 0; |
|
static const char* function = "boost::math::pdf(fisher_f_distribution<%1%> const&, %1%)"; |
|
if(false == detail::check_df( |
|
function, df1, &error_result, Policy()) |
|
&& detail::check_df( |
|
function, df2, &error_result, Policy())) |
|
return error_result; |
|
|
|
if((x < 0) || !(boost::math::isfinite)(x)) |
|
{ |
|
return policies::raise_domain_error<RealType>( |
|
function, "Random variable parameter was %1%, but must be > 0 !", x, Policy()); |
|
} |
|
|
|
if(x == 0) |
|
{ |
|
// special cases: |
|
if(df1 < 2) |
|
return policies::raise_overflow_error<RealType>( |
|
function, 0, Policy()); |
|
else if(df1 == 2) |
|
return 1; |
|
else |
|
return 0; |
|
} |
|
|
|
// |
|
// You reach this formula by direct differentiation of the |
|
// cdf expressed in terms of the incomplete beta. |
|
// |
|
// There are two versions so we don't pass a value of z |
|
// that is very close to 1 to ibeta_derivative: for some values |
|
// of df1 and df2, all the change takes place in this area. |
|
// |
|
RealType v1x = df1 * x; |
|
RealType result; |
|
if(v1x > df2) |
|
{ |
|
result = (df2 * df1) / ((df2 + v1x) * (df2 + v1x)); |
|
result *= ibeta_derivative(df2 / 2, df1 / 2, df2 / (df2 + v1x), Policy()); |
|
} |
|
else |
|
{ |
|
result = df2 + df1 * x; |
|
result = (result * df1 - x * df1 * df1) / (result * result); |
|
result *= ibeta_derivative(df1 / 2, df2 / 2, v1x / (df2 + v1x), Policy()); |
|
} |
|
return result; |
|
} // pdf |
|
|
|
template <class RealType, class Policy> |
|
inline RealType cdf(const fisher_f_distribution<RealType, Policy>& dist, const RealType& x) |
|
{ |
|
static const char* function = "boost::math::cdf(fisher_f_distribution<%1%> const&, %1%)"; |
|
RealType df1 = dist.degrees_of_freedom1(); |
|
RealType df2 = dist.degrees_of_freedom2(); |
|
// Error check: |
|
RealType error_result = 0; |
|
if(false == detail::check_df( |
|
function, df1, &error_result, Policy()) |
|
&& detail::check_df( |
|
function, df2, &error_result, Policy())) |
|
return error_result; |
|
|
|
if((x < 0) || !(boost::math::isfinite)(x)) |
|
{ |
|
return policies::raise_domain_error<RealType>( |
|
function, "Random Variable parameter was %1%, but must be > 0 !", x, Policy()); |
|
} |
|
|
|
RealType v1x = df1 * x; |
|
// |
|
// There are two equivalent formulas used here, the aim is |
|
// to prevent the final argument to the incomplete beta |
|
// from being too close to 1: for some values of df1 and df2 |
|
// the rate of change can be arbitrarily large in this area, |
|
// whilst the value we're passing will have lost information |
|
// content as a result of being 0.999999something. Better |
|
// to switch things around so we're passing 1-z instead. |
|
// |
|
return v1x > df2 |
|
? boost::math::ibetac(df2 / 2, df1 / 2, df2 / (df2 + v1x), Policy()) |
|
: boost::math::ibeta(df1 / 2, df2 / 2, v1x / (df2 + v1x), Policy()); |
|
} // cdf |
|
|
|
template <class RealType, class Policy> |
|
inline RealType quantile(const fisher_f_distribution<RealType, Policy>& dist, const RealType& p) |
|
{ |
|
static const char* function = "boost::math::quantile(fisher_f_distribution<%1%> const&, %1%)"; |
|
RealType df1 = dist.degrees_of_freedom1(); |
|
RealType df2 = dist.degrees_of_freedom2(); |
|
// Error check: |
|
RealType error_result = 0; |
|
if(false == detail::check_df( |
|
function, df1, &error_result, Policy()) |
|
&& detail::check_df( |
|
function, df2, &error_result, Policy()) |
|
&& detail::check_probability( |
|
function, p, &error_result, Policy())) |
|
return error_result; |
|
|
|
// With optimizations turned on, gcc wrongly warns about y being used |
|
// uninitializated unless we initialize it to something: |
|
RealType x, y(0); |
|
|
|
x = boost::math::ibeta_inv(df1 / 2, df2 / 2, p, &y, Policy()); |
|
|
|
return df2 * x / (df1 * y); |
|
} // quantile |
|
|
|
template <class RealType, class Policy> |
|
inline RealType cdf(const complemented2_type<fisher_f_distribution<RealType, Policy>, RealType>& c) |
|
{ |
|
static const char* function = "boost::math::cdf(fisher_f_distribution<%1%> const&, %1%)"; |
|
RealType df1 = c.dist.degrees_of_freedom1(); |
|
RealType df2 = c.dist.degrees_of_freedom2(); |
|
RealType x = c.param; |
|
// Error check: |
|
RealType error_result = 0; |
|
if(false == detail::check_df( |
|
function, df1, &error_result, Policy()) |
|
&& detail::check_df( |
|
function, df2, &error_result, Policy())) |
|
return error_result; |
|
|
|
if((x < 0) || !(boost::math::isfinite)(x)) |
|
{ |
|
return policies::raise_domain_error<RealType>( |
|
function, "Random Variable parameter was %1%, but must be > 0 !", x, Policy()); |
|
} |
|
|
|
RealType v1x = df1 * x; |
|
// |
|
// There are two equivalent formulas used here, the aim is |
|
// to prevent the final argument to the incomplete beta |
|
// from being too close to 1: for some values of df1 and df2 |
|
// the rate of change can be arbitrarily large in this area, |
|
// whilst the value we're passing will have lost information |
|
// content as a result of being 0.999999something. Better |
|
// to switch things around so we're passing 1-z instead. |
|
// |
|
return v1x > df2 |
|
? boost::math::ibeta(df2 / 2, df1 / 2, df2 / (df2 + v1x), Policy()) |
|
: boost::math::ibetac(df1 / 2, df2 / 2, v1x / (df2 + v1x), Policy()); |
|
} |
|
|
|
template <class RealType, class Policy> |
|
inline RealType quantile(const complemented2_type<fisher_f_distribution<RealType, Policy>, RealType>& c) |
|
{ |
|
static const char* function = "boost::math::quantile(fisher_f_distribution<%1%> const&, %1%)"; |
|
RealType df1 = c.dist.degrees_of_freedom1(); |
|
RealType df2 = c.dist.degrees_of_freedom2(); |
|
RealType p = c.param; |
|
// Error check: |
|
RealType error_result = 0; |
|
if(false == detail::check_df( |
|
function, df1, &error_result, Policy()) |
|
&& detail::check_df( |
|
function, df2, &error_result, Policy()) |
|
&& detail::check_probability( |
|
function, p, &error_result, Policy())) |
|
return error_result; |
|
|
|
RealType x, y; |
|
|
|
x = boost::math::ibetac_inv(df1 / 2, df2 / 2, p, &y, Policy()); |
|
|
|
return df2 * x / (df1 * y); |
|
} |
|
|
|
template <class RealType, class Policy> |
|
inline RealType mean(const fisher_f_distribution<RealType, Policy>& dist) |
|
{ // Mean of F distribution = v. |
|
static const char* function = "boost::math::mean(fisher_f_distribution<%1%> const&)"; |
|
RealType df1 = dist.degrees_of_freedom1(); |
|
RealType df2 = dist.degrees_of_freedom2(); |
|
// Error check: |
|
RealType error_result = 0; |
|
if(false == detail::check_df( |
|
function, df1, &error_result, Policy()) |
|
&& detail::check_df( |
|
function, df2, &error_result, Policy())) |
|
return error_result; |
|
if(df2 <= 2) |
|
{ |
|
return policies::raise_domain_error<RealType>( |
|
function, "Second degree of freedom was %1% but must be > 2 in order for the distribution to have a mean.", df2, Policy()); |
|
} |
|
return df2 / (df2 - 2); |
|
} // mean |
|
|
|
template <class RealType, class Policy> |
|
inline RealType variance(const fisher_f_distribution<RealType, Policy>& dist) |
|
{ // Variance of F distribution. |
|
static const char* function = "boost::math::variance(fisher_f_distribution<%1%> const&)"; |
|
RealType df1 = dist.degrees_of_freedom1(); |
|
RealType df2 = dist.degrees_of_freedom2(); |
|
// Error check: |
|
RealType error_result = 0; |
|
if(false == detail::check_df( |
|
function, df1, &error_result, Policy()) |
|
&& detail::check_df( |
|
function, df2, &error_result, Policy())) |
|
return error_result; |
|
if(df2 <= 4) |
|
{ |
|
return policies::raise_domain_error<RealType>( |
|
function, "Second degree of freedom was %1% but must be > 4 in order for the distribution to have a valid variance.", df2, Policy()); |
|
} |
|
return 2 * df2 * df2 * (df1 + df2 - 2) / (df1 * (df2 - 2) * (df2 - 2) * (df2 - 4)); |
|
} // variance |
|
|
|
template <class RealType, class Policy> |
|
inline RealType mode(const fisher_f_distribution<RealType, Policy>& dist) |
|
{ |
|
static const char* function = "boost::math::mode(fisher_f_distribution<%1%> const&)"; |
|
RealType df1 = dist.degrees_of_freedom1(); |
|
RealType df2 = dist.degrees_of_freedom2(); |
|
// Error check: |
|
RealType error_result = 0; |
|
if(false == detail::check_df( |
|
function, df1, &error_result, Policy()) |
|
&& detail::check_df( |
|
function, df2, &error_result, Policy())) |
|
return error_result; |
|
if(df2 <= 2) |
|
{ |
|
return policies::raise_domain_error<RealType>( |
|
function, "Second degree of freedom was %1% but must be > 2 in order for the distribution to have a mode.", df2, Policy()); |
|
} |
|
return df2 * (df1 - 2) / (df1 * (df2 + 2)); |
|
} |
|
|
|
//template <class RealType, class Policy> |
|
//inline RealType median(const fisher_f_distribution<RealType, Policy>& dist) |
|
//{ // Median of Fisher F distribution is not defined. |
|
// return tools::domain_error<RealType>(BOOST_CURRENT_FUNCTION, "Median is not implemented, result is %1%!", std::numeric_limits<RealType>::quiet_NaN()); |
|
// } // median |
|
|
|
// Now implemented via quantile(half) in derived accessors. |
|
|
|
template <class RealType, class Policy> |
|
inline RealType skewness(const fisher_f_distribution<RealType, Policy>& dist) |
|
{ |
|
static const char* function = "boost::math::skewness(fisher_f_distribution<%1%> const&)"; |
|
BOOST_MATH_STD_USING // ADL of std names |
|
// See http://mathworld.wolfram.com/F-Distribution.html |
|
RealType df1 = dist.degrees_of_freedom1(); |
|
RealType df2 = dist.degrees_of_freedom2(); |
|
// Error check: |
|
RealType error_result = 0; |
|
if(false == detail::check_df( |
|
function, df1, &error_result, Policy()) |
|
&& detail::check_df( |
|
function, df2, &error_result, Policy())) |
|
return error_result; |
|
if(df2 <= 6) |
|
{ |
|
return policies::raise_domain_error<RealType>( |
|
function, "Second degree of freedom was %1% but must be > 6 in order for the distribution to have a skewness.", df2, Policy()); |
|
} |
|
return 2 * (df2 + 2 * df1 - 2) * sqrt((2 * df2 - 8) / (df1 * (df2 + df1 - 2))) / (df2 - 6); |
|
} |
|
|
|
template <class RealType, class Policy> |
|
RealType kurtosis_excess(const fisher_f_distribution<RealType, Policy>& dist); |
|
|
|
template <class RealType, class Policy> |
|
inline RealType kurtosis(const fisher_f_distribution<RealType, Policy>& dist) |
|
{ |
|
return 3 + kurtosis_excess(dist); |
|
} |
|
|
|
template <class RealType, class Policy> |
|
inline RealType kurtosis_excess(const fisher_f_distribution<RealType, Policy>& dist) |
|
{ |
|
static const char* function = "boost::math::kurtosis_excess(fisher_f_distribution<%1%> const&)"; |
|
// See http://mathworld.wolfram.com/F-Distribution.html |
|
RealType df1 = dist.degrees_of_freedom1(); |
|
RealType df2 = dist.degrees_of_freedom2(); |
|
// Error check: |
|
RealType error_result = 0; |
|
if(false == detail::check_df( |
|
function, df1, &error_result, Policy()) |
|
&& detail::check_df( |
|
function, df2, &error_result, Policy())) |
|
return error_result; |
|
if(df2 <= 8) |
|
{ |
|
return policies::raise_domain_error<RealType>( |
|
function, "Second degree of freedom was %1% but must be > 8 in order for the distribution to have a kutosis.", df2, Policy()); |
|
} |
|
RealType df2_2 = df2 * df2; |
|
RealType df1_2 = df1 * df1; |
|
RealType n = -16 + 20 * df2 - 8 * df2_2 + df2_2 * df2 + 44 * df1 - 32 * df2 * df1 + 5 * df2_2 * df1 - 22 * df1_2 + 5 * df2 * df1_2; |
|
n *= 12; |
|
RealType d = df1 * (df2 - 6) * (df2 - 8) * (df1 + df2 - 2); |
|
return n / d; |
|
} |
|
|
|
} // namespace math |
|
} // namespace boost |
|
|
|
// This include must be at the end, *after* the accessors |
|
// for this distribution have been defined, in order to |
|
// keep compilers that support two-phase lookup happy. |
|
#include <boost/math/distributions/detail/derived_accessors.hpp> |
|
|
|
#endif // BOOST_MATH_DISTRIBUTIONS_FISHER_F_HPP
|
|
|