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

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[section:nag_library Comparison with C, R, FORTRAN-style Free Functions]
You are probably familiar with a statistics library that has free functions,
for example the classic [@http://nag.com/numeric/CL/CLdescription.asp NAG C library]
and matching [@http://nag.com/numeric/FL/FLdescription.asp NAG FORTRAN Library],
[@http://office.microsoft.com/en-us/excel/HP052090051033.aspx Microsoft Excel BINOMDIST(number_s,trials,probability_s,cumulative)],
[@http://www.r-project.org/ R], [@http://www.ptc.com/products/mathcad/mathcad14/mathcad_func_chart.htm MathCAD pbinom]
and many others.
If so, you may find 'Distributions as Objects' unfamiliar, if not alien.
However, *do not panic*, both definition and usage are not really very different.
A very simple example of generating the same values as the
[@http://nag.com/numeric/CL/CLdescription.asp NAG C library]
for the binomial distribution follows.
(If you find slightly different values, the Boost C++ version, using double or better,
is very likely to be the more accurate.
Of course, accuracy is not usually a concern for most applications of this function).
The [@http://www.nag.co.uk/numeric/cl/manual/pdf/G01/g01bjc.pdf NAG function specification] is
void nag_binomial_dist(Integer n, double p, Integer k,
double *plek, double *pgtk, double *peqk, NagError *fail)
and is called
g01bjc(n, p, k, &plek, &pgtk, &peqk, NAGERR_DEFAULT);
The equivalent using this Boost C++ library is:
using namespace boost::math; // Using declaration avoids very long names.
binomial my_dist(4, 0.5); // c.f. NAG n = 4, p = 0.5
and values can be output thus:
cout
<< my_dist.trials() << " " // Echo the NAG input n = 4 trials.
<< my_dist.success_fraction() << " " // Echo the NAG input p = 0.5
<< cdf(my_dist, 2) << " " // NAG plek with k = 2
<< cdf(complement(my_dist, 2)) << " " // NAG pgtk with k = 2
<< pdf(my_dist, 2) << endl; // NAG peqk with k = 2
`cdf(dist, k)` is equivalent to NAG library `plek`, lower tail probability of <= k
`cdf(complement(dist, k))` is equivalent to NAG library `pgtk`, upper tail probability of > k
`pdf(dist, k)` is equivalent to NAG library `peqk`, point probability of == k
See [@../../example/binomial_example_nag.cpp binomial_example_nag.cpp] for details.
[endsect] [/section:nag_library Comparison with C, R, FORTRAN-style Free Functions]
[/
Copyright 2006 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).
]