WSJT-X/boost/libs/math/doc/distributions/inverse_gamma.qbk

[section:inverse_gamma_dist Inverse Gamma Distribution]

``#include <boost/math/distributions/inverse_gamma.hpp>``

   namespace boost{ namespace math{ 
      
   template <class RealType = double, 
             class ``__Policy``   = ``__policy_class`` >
   class inverse_gamma_distribution
   {
   public:
      typedef RealType value_type;
      typedef Policy   policy_type;

      inverse_gamma_distribution(RealType shape, RealType scale = 1)

      RealType shape()const;
      RealType scale()const;
   };
   
   }} // namespaces
   
The inverse_gamma distribution is a continuous probability distribution
of the reciprocal of a variable distributed according to the gamma distribution.

The inverse_gamma distribution is used in Bayesian statistics.

See [@http://en.wikipedia.org/wiki/Inverse-gamma_distribution inverse gamma distribution].

[@http://rss.acs.unt.edu/Rdoc/library/pscl/html/igamma.html R inverse gamma distribution functions].

[@http://reference.wolfram.com/mathematica/ref/InverseGammaDistribution.html Wolfram inverse gamma distribution].

See also __gamma_distrib.


[note
In spite of potential confusion with the inverse gamma function, this
distribution *does* provide the typedef:

``typedef inverse_gamma_distribution<double> gamma;`` 

If you want a `double` precision gamma distribution you can use 

``boost::math::inverse_gamma_distribution<>``

or you can write `inverse_gamma my_ig(2, 3);`]

For shape parameter [alpha] and scale parameter [beta], it is defined 
by the probability density function (PDF):

__spaces f(x;[alpha], [beta]) = [beta][super [alpha]] * (1/x) [super [alpha]+1] exp(-[beta]/x) / [Gamma]([alpha])

and cumulative density function (CDF)

__spaces F(x;[alpha], [beta]) = [Gamma]([alpha], [beta]/x) / [Gamma]([alpha])

The following graphs illustrate how the PDF and CDF of the inverse gamma distribution
varies as the parameters vary:

[graph inverse_gamma_pdf]  [/png or svg]

[graph inverse_gamma_cdf]

[h4 Member Functions]

   inverse_gamma_distribution(RealType shape = 1, RealType scale = 1);
   
Constructs an inverse gamma distribution with shape [alpha] and scale [beta].

Requires that the shape and scale parameters are greater than zero, otherwise calls
__domain_error.

   RealType shape()const;
   
Returns the [alpha] shape parameter of this inverse gamma distribution.
   
   RealType scale()const;
      
Returns the [beta] scale parameter of this inverse gamma distribution.

[h4 Non-member Accessors]

All the [link math_toolkit.dist_ref.nmp usual non-member accessor functions] that are generic to all
distributions are supported: __usual_accessors.

The domain of the random variate is \[0,+[infin]\].
[note Unlike some definitions, this implementation supports a random variate 
equal to zero as a special case, returning zero for pdf and cdf.]

[h4 Accuracy]

The inverse gamma distribution is implemented in terms of the 
incomplete gamma functions __gamma_p and __gamma_q and their
inverses __gamma_p_inv and __gamma_q_inv: refer to the accuracy
data for those functions for more information.
But in general, inverse_gamma results are accurate to a few epsilon,
>14 decimal digits accuracy for 64-bit double.

[h4 Implementation]

In the following table [alpha] is the shape parameter of the distribution, 
[alpha][space] is its scale parameter, /x/ is the random variate, /p/ is the probability
and /q = 1-p/.

[table
[[Function][Implementation Notes]]
[[pdf][Using the relation: pdf = __gamma_p_derivative([alpha], [beta]/ x, [beta]) / x * x ]]
[[cdf][Using the relation: p = __gamma_q([alpha], [beta] / x) ]]
[[cdf complement][Using the relation: q = __gamma_p([alpha], [beta] / x) ]]
[[quantile][Using the relation: x = [beta][space]/ __gamma_q_inv([alpha], p) ]]
[[quantile from the complement][Using the relation: x = [alpha][space]/ __gamma_p_inv([alpha], q) ]]
[[mode][[beta] / ([alpha] + 1) ]]
[[median][no analytic equation is known, but is evaluated as quantile(0.5)]]
[[mean][[beta] / ([alpha] - 1) for [alpha] > 1, else a __domain_error]]
[[variance][([beta] * [beta]) / (([alpha] - 1) * ([alpha] - 1) * ([alpha] - 2)) for [alpha] >2, else a __domain_error]]
[[skewness][4 * sqrt ([alpha] -2) / ([alpha] -3) for [alpha] >3, else a __domain_error]]
[[kurtosis_excess][(30 * [alpha] - 66) / (([alpha]-3)*([alpha] - 4)) for [alpha] >4, else a __domain_error]]
] [/table]

[endsect][/section:inverse_gamma_dist Inverse Gamma Distribution]

[/ 
  Copyright 2010 John Maddock and Paul A. Bristow.
  Distributed under 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).
]
Squashed 'boost/' content from commit b4feb19f2 git-subtree-dir: boost git-subtree-split: b4feb19f287ee92d87a9624b5d36b7cf46aeadeb 2018-06-09 16:48:32 -04:00			`[section:inverse_gamma_dist Inverse Gamma Distribution]`

			``#include <boost/math/distributions/inverse_gamma.hpp>``

			`namespace boost{ namespace math{`

			`template <class RealType = double,`
			class ``__Policy`` = ``__policy_class`` >
			`class inverse_gamma_distribution`
			`{`
			`public:`
			`typedef RealType value_type;`
			`typedef Policy policy_type;`

			`inverse_gamma_distribution(RealType shape, RealType scale = 1)`

			`RealType shape()const;`
			`RealType scale()const;`
			`};`

			`}} // namespaces`

			`The inverse_gamma distribution is a continuous probability distribution`
			`of the reciprocal of a variable distributed according to the gamma distribution.`

			`The inverse_gamma distribution is used in Bayesian statistics.`

			`See [@http://en.wikipedia.org/wiki/Inverse-gamma_distribution inverse gamma distribution].`

			`[@http://rss.acs.unt.edu/Rdoc/library/pscl/html/igamma.html R inverse gamma distribution functions].`

			`[@http://reference.wolfram.com/mathematica/ref/InverseGammaDistribution.html Wolfram inverse gamma distribution].`

			`See also __gamma_distrib.`


			`[note`
			`In spite of potential confusion with the inverse gamma function, this`
			`distribution does provide the typedef:`

			``typedef inverse_gamma_distribution<double> gamma;``

			If you want a `double` precision gamma distribution you can use

			``boost::math::inverse_gamma_distribution<>``

			or you can write `inverse_gamma my_ig(2, 3);`]

			`For shape parameter [alpha] and scale parameter [beta], it is defined`
			`by the probability density function (PDF):`

			`__spaces f(x;[alpha], [beta]) = [beta][super [alpha]] * (1/x) [super [alpha]+1] exp(-[beta]/x) / [Gamma]([alpha])`

			`and cumulative density function (CDF)`

			`__spaces F(x;[alpha], [beta]) = [Gamma]([alpha], [beta]/x) / [Gamma]([alpha])`

			`The following graphs illustrate how the PDF and CDF of the inverse gamma distribution`
			`varies as the parameters vary:`

			`[graph inverse_gamma_pdf] [/png or svg]`

			`[graph inverse_gamma_cdf]`

			`[h4 Member Functions]`

			`inverse_gamma_distribution(RealType shape = 1, RealType scale = 1);`

			`Constructs an inverse gamma distribution with shape [alpha] and scale [beta].`

			`Requires that the shape and scale parameters are greater than zero, otherwise calls`
			`__domain_error.`

			`RealType shape()const;`

			`Returns the [alpha] shape parameter of this inverse gamma distribution.`

			`RealType scale()const;`

			`Returns the [beta] scale parameter of this inverse gamma distribution.`

			`[h4 Non-member Accessors]`

			`All the [link math_toolkit.dist_ref.nmp usual non-member accessor functions] that are generic to all`
			`distributions are supported: __usual_accessors.`

			`The domain of the random variate is \[0,+[infin]\].`
			`[note Unlike some definitions, this implementation supports a random variate`
			`equal to zero as a special case, returning zero for pdf and cdf.]`

			`[h4 Accuracy]`

			`The inverse gamma distribution is implemented in terms of the`
			`incomplete gamma functions __gamma_p and __gamma_q and their`
			`inverses __gamma_p_inv and __gamma_q_inv: refer to the accuracy`
			`data for those functions for more information.`
			`But in general, inverse_gamma results are accurate to a few epsilon,`
			`>14 decimal digits accuracy for 64-bit double.`

			`[h4 Implementation]`

			`In the following table [alpha] is the shape parameter of the distribution,`
			`[alpha][space] is its scale parameter, /x/ is the random variate, /p/ is the probability`
			`and /q = 1-p/.`

			`[table`
			`[[Function][Implementation Notes]]`
			`[[pdf][Using the relation: pdf = __gamma_p_derivative([alpha], [beta]/ x, [beta]) / x * x ]]`
			`[[cdf][Using the relation: p = __gamma_q([alpha], [beta] / x) ]]`
			`[[cdf complement][Using the relation: q = __gamma_p([alpha], [beta] / x) ]]`
			`[[quantile][Using the relation: x = [beta][space]/ __gamma_q_inv([alpha], p) ]]`
			`[[quantile from the complement][Using the relation: x = [alpha][space]/ __gamma_p_inv([alpha], q) ]]`
			`[[mode][[beta] / ([alpha] + 1) ]]`
			`[[median][no analytic equation is known, but is evaluated as quantile(0.5)]]`
			`[[mean][[beta] / ([alpha] - 1) for [alpha] > 1, else a __domain_error]]`
			`[[variance][([beta] * [beta]) / (([alpha] - 1) * ([alpha] - 1) * ([alpha] - 2)) for [alpha] >2, else a __domain_error]]`
			`[[skewness][4 * sqrt ([alpha] -2) / ([alpha] -3) for [alpha] >3, else a __domain_error]]`
			`[[kurtosis_excess][(30 * [alpha] - 66) / (([alpha]-3)*([alpha] - 4)) for [alpha] >4, else a __domain_error]]`
			`] [/table]`

			`[endsect][/section:inverse_gamma_dist Inverse Gamma Distribution]`

			`[/`
			`Copyright 2010 John Maddock and Paul A. Bristow.`
			`Distributed under 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).`
			`]`