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460 lines
19 KiB
Plaintext
460 lines
19 KiB
Plaintext
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[/ def names all end in distrib to avoid clashes with names of functions]
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[def __binomial_distrib [link math_toolkit.dist_ref.dists.binomial_dist Binomial Distribution]]
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[def __chi_squared_distrib [link math_toolkit.dist_ref.dists.chi_squared_dist Chi Squared Distribution]]
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[def __normal_distrib [link math_toolkit.dist_ref.dists.normal_dist Normal Distribution]]
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[def __F_distrib [link math_toolkit.dist_ref.dists.f_dist Fisher F Distribution]]
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[def __students_t_distrib [link math_toolkit.dist_ref.dists.students_t_dist Students t Distribution]]
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[def __handbook [@http://www.itl.nist.gov/div898/handbook/
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NIST/SEMATECH e-Handbook of Statistical Methods.]]
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[section:stat_tut Statistical Distributions Tutorial]
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This library is centred around statistical distributions, this tutorial
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will give you an overview of what they are, how they can be used, and
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provides a few worked examples of applying the library to statistical tests.
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[section:overview Overview of Distributions]
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[section:headers Headers and Namespaces]
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All the code in this library is inside namespace boost::math.
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In order to use a distribution /my_distribution/ you will need to include
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either the header <boost/math/my_distribution.hpp> or
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the "include all the distributions" header: <boost/math/distributions.hpp>.
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For example, to use the Students-t distribution include either
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<boost/math/students_t.hpp> or
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<boost/math/distributions.hpp>
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You also need to bring distribution names into scope,
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perhaps with a `using namespace boost::math;` declaration,
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or specific `using` declarations like `using boost::math::normal;` (*recommended*).
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[caution Some math function names are also used in namespace std so including <random> could cause ambiguity!]
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[endsect] [/ section:headers Headers and Namespaces]
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[section:objects Distributions are Objects]
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Each kind of distribution in this library is a class type - an object.
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[link policy Policies] provide fine-grained control
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of the behaviour of these classes, allowing the user to customise
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behaviour such as how errors are handled, or how the quantiles
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of discrete distribtions behave.
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[tip If you are familiar with statistics libraries using functions,
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and 'Distributions as Objects' seem alien, see
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[link math_toolkit.stat_tut.weg.nag_library the comparison to
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other statistics libraries.]
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] [/tip]
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Making distributions class types does two things:
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* It encapsulates the kind of distribution in the C++ type system;
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so, for example, Students-t distributions are always a different C++ type from
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Chi-Squared distributions.
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* The distribution objects store any parameters associated with the
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distribution: for example, the Students-t distribution has a
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['degrees of freedom] parameter that controls the shape of the distribution.
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This ['degrees of freedom] parameter has to be provided
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to the Students-t object when it is constructed.
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Although the distribution classes in this library are templates, there
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are typedefs on type /double/ that mostly take the usual name of the
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distribution
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(except where there is a clash with a function of the same name: beta and gamma,
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in which case using the default template arguments - `RealType = double` -
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is nearly as convenient).
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Probably 95% of uses are covered by these typedefs:
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// using namespace boost::math; // Avoid potential ambiguity with names in std <random>
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// Safer to declare specific functions with using statement(s):
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using boost::math::beta_distribution;
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using boost::math::binomial_distribution;
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using boost::math::students_t;
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// Construct a students_t distribution with 4 degrees of freedom:
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students_t d1(4);
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// Construct a double-precision beta distribution
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// with parameters a = 10, b = 20
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beta_distribution<> d2(10, 20); // Note: _distribution<> suffix !
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If you need to use the distributions with a type other than `double`,
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then you can instantiate the template directly: the names of the
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templates are the same as the `double` typedef but with `_distribution`
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appended, for example: __students_t_distrib or __binomial_distrib:
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// Construct a students_t distribution, of float type,
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// with 4 degrees of freedom:
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students_t_distribution<float> d3(4);
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// Construct a binomial distribution, of long double type,
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// with probability of success 0.3
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// and 20 trials in total:
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binomial_distribution<long double> d4(20, 0.3);
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The parameters passed to the distributions can be accessed via getter member
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functions:
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d1.degrees_of_freedom(); // returns 4.0
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This is all well and good, but not very useful so far. What we often want
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is to be able to calculate the /cumulative distribution functions/ and
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/quantiles/ etc for these distributions.
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[endsect] [/section:objects Distributions are Objects]
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[section:generic Generic operations common to all distributions are non-member functions]
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Want to calculate the PDF (Probability Density Function) of a distribution?
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No problem, just use:
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pdf(my_dist, x); // Returns PDF (density) at point x of distribution my_dist.
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Or how about the CDF (Cumulative Distribution Function):
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cdf(my_dist, x); // Returns CDF (integral from -infinity to point x)
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// of distribution my_dist.
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And quantiles are just the same:
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quantile(my_dist, p); // Returns the value of the random variable x
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// such that cdf(my_dist, x) == p.
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If you're wondering why these aren't member functions, it's to
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make the library more easily extensible: if you want to add additional
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generic operations - let's say the /n'th moment/ - then all you have to
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do is add the appropriate non-member functions, overloaded for each
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implemented distribution type.
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[tip
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[*Random numbers that approximate Quantiles of Distributions]
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If you want random numbers that are distributed in a specific way,
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for example in a uniform, normal or triangular,
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see [@http://www.boost.org/libs/random/ Boost.Random].
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Whilst in principal there's nothing to prevent you from using the
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quantile function to convert a uniformly distributed random
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number to another distribution, in practice there are much more
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efficient algorithms available that are specific to random number generation.
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] [/tip Random numbers that approximate Quantiles of Distributions]
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For example, the binomial distribution has two parameters:
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n (the number of trials) and p (the probability of success on any one trial).
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The `binomial_distribution` constructor therefore has two parameters:
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`binomial_distribution(RealType n, RealType p);`
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For this distribution the __random_variate is k: the number of successes observed.
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The probability density\/mass function (pdf) is therefore written as ['f(k; n, p)].
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[note
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[*Random Variates and Distribution Parameters]
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The concept of a __random_variable is closely linked to the term __random_variate:
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a random variate is a particular value (outcome) of a random variable.
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and [@http://en.wikipedia.org/wiki/Parameter distribution parameters]
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are conventionally distinguished (for example in Wikipedia and Wolfram MathWorld)
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by placing a semi-colon or vertical bar)
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/after/ the __random_variable (whose value you 'choose'),
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to separate the variate from the parameter(s) that defines the shape of the distribution.[br]
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For example, the binomial distribution probability distribution function (PDF) is written as
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['f(k| n, p)] = Pr(K = k|n, p) = probability of observing k successes out of n trials.
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K is the __random_variable, k is the __random_variate,
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the parameters are n (trials) and p (probability).
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] [/tip Random Variates and Distribution Parameters]
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[note By convention, __random_variate are lower case, usually k is integral, x if real, and
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__random_variable are upper case, K if integral, X if real. But this implementation treats
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all as floating point values `RealType`, so if you really want an integral result,
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you must round: see note on Discrete Probability Distributions below for details.]
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As noted above the non-member function `pdf` has one parameter for the distribution object,
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and a second for the random variate. So taking our binomial distribution
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example, we would write:
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`pdf(binomial_distribution<RealType>(n, p), k);`
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The ranges of __random_variate values that are permitted and are supported can be
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tested by using two functions `range` and `support`.
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The distribution (effectively the __random_variate) is said to be 'supported'
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over a range that is
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[@http://en.wikipedia.org/wiki/Probability_distribution
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"the smallest closed set whose complement has probability zero"].
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MathWorld uses the word 'defined' for this range.
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Non-mathematicians might say it means the 'interesting' smallest range
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of random variate x that has the cdf going from zero to unity.
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Outside are uninteresting zones where the pdf is zero, and the cdf zero or unity.
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For most distributions, with probability distribution functions one might describe
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as 'well-behaved', we have decided that it is most useful for the supported range
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to *exclude* random variate values like exact zero *if the end point is discontinuous*.
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For example, the Weibull (scale 1, shape 1) distribution smoothly heads for unity
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as the random variate x declines towards zero.
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But at x = zero, the value of the pdf is suddenly exactly zero, by definition.
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If you are plotting the PDF, or otherwise calculating,
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zero is not the most useful value for the lower limit of supported, as we discovered.
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So for this, and similar distributions,
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we have decided it is most numerically useful to use
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the closest value to zero, min_value, for the limit of the supported range.
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(The `range` remains from zero, so you will still get `pdf(weibull, 0) == 0`).
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(Exponential and gamma distributions have similarly discontinuous functions).
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Mathematically, the functions may make sense with an (+ or -) infinite value,
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but except for a few special cases (in the Normal and Cauchy distributions)
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this implementation limits random variates to finite values from the `max`
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to `min` for the `RealType`.
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(See [link math_toolkit.sf_implementation.handling_of_floating_point_infin
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Handling of Floating-Point Infinity] for rationale).
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[note
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[*Discrete Probability Distributions]
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Note that the [@http://en.wikipedia.org/wiki/Discrete_probability_distribution
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discrete distributions], including the binomial, negative binomial, Poisson & Bernoulli,
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are all mathematically defined as discrete functions:
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that is to say the functions `cdf` and `pdf` are only defined for integral values
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of the random variate.
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However, because the method of calculation often uses continuous functions
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it is convenient to treat them as if they were continuous functions,
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and permit non-integral values of their parameters.
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Users wanting to enforce a strict mathematical model may use `floor`
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or `ceil` functions on the random variate prior to calling the distribution
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function.
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The quantile functions for these distributions are hard to specify
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in a manner that will satisfy everyone all of the time. The default
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behaviour is to return an integer result, that has been rounded
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/outwards/: that is to say, lower quantiles - where the probablity
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is less than 0.5 are rounded down, while upper quantiles - where
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the probability is greater than 0.5 - are rounded up. This behaviour
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ensures that if an X% quantile is requested, then /at least/ the requested
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coverage will be present in the central region, and /no more than/
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the requested coverage will be present in the tails.
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This behaviour can be changed so that the quantile functions are rounded
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differently, or return a real-valued result using
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[link math_toolkit.pol_overview Policies]. It is strongly
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recommended that you read the tutorial
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[link math_toolkit.pol_tutorial.understand_dis_quant
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Understanding Quantiles of Discrete Distributions] before
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using the quantile function on a discrete distribtion. The
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[link math_toolkit.pol_ref.discrete_quant_ref reference docs]
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describe how to change the rounding policy
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for these distributions.
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For similar reasons continuous distributions with parameters like
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"degrees of freedom"
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that might appear to be integral, are treated as real values
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(and are promoted from integer to floating-point if necessary).
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In this case however, there are a small number of situations where non-integral
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degrees of freedom do have a genuine meaning.
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]
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[endsect] [/ section:generic Generic operations common to all distributions are non-member functions]
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[section:complements Complements are supported too - and when to use them]
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Often you don't want the value of the CDF, but its complement, which is
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to say `1-p` rather than `p`. It is tempting to calculate the CDF and subtract
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it from `1`, but if `p` is very close to `1` then cancellation error
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will cause you to lose accuracy, perhaps totally.
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[link why_complements See below ['"Why and when to use complements?"]]
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In this library, whenever you want to receive a complement, just wrap
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all the function arguments in a call to `complement(...)`, for example:
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students_t dist(5);
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cout << "CDF at t = 1 is " << cdf(dist, 1.0) << endl;
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cout << "Complement of CDF at t = 1 is " << cdf(complement(dist, 1.0)) << endl;
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But wait, now that we have a complement, we have to be able to use it as well.
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Any function that accepts a probability as an argument can also accept a complement
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by wrapping all of its arguments in a call to `complement(...)`, for example:
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students_t dist(5);
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for(double i = 10; i < 1e10; i *= 10)
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{
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// Calculate the quantile for a 1 in i chance:
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double t = quantile(complement(dist, 1/i));
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// Print it out:
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cout << "Quantile of students-t with 5 degrees of freedom\n"
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"for a 1 in " << i << " chance is " << t << endl;
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}
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[tip
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[*Critical values are just quantiles]
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Some texts talk about quantiles, or percentiles or fractiles,
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others about critical values, the basic rule is:
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['Lower critical values] are the same as the quantile.
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['Upper critical values] are the same as the quantile from the complement
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of the probability.
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For example, suppose we have a Bernoulli process, giving rise to a binomial
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distribution with success ratio 0.1 and 100 trials in total. The
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['lower critical value] for a probability of 0.05 is given by:
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`quantile(binomial(100, 0.1), 0.05)`
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and the ['upper critical value] is given by:
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`quantile(complement(binomial(100, 0.1), 0.05))`
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which return 4.82 and 14.63 respectively.
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]
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[#why_complements]
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[tip
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[*Why bother with complements anyway?]
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It's very tempting to dispense with complements, and simply subtract
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the probability from 1 when required. However, consider what happens when
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the probability is very close to 1: let's say the probability expressed at
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float precision is `0.999999940f`, then `1 - 0.999999940f = 5.96046448e-008`,
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but the result is actually accurate to just ['one single bit]: the only
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bit that didn't cancel out!
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Or to look at this another way: consider that we want the risk of falsely
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rejecting the null-hypothesis in the Student's t test to be 1 in 1 billion,
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for a sample size of 10,000.
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This gives a probability of 1 - 10[super -9], which is exactly 1 when
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calculated at float precision. In this case calculating the quantile from
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the complement neatly solves the problem, so for example:
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`quantile(complement(students_t(10000), 1e-9))`
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returns the expected t-statistic `6.00336`, where as:
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`quantile(students_t(10000), 1-1e-9f)`
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raises an overflow error, since it is the same as:
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`quantile(students_t(10000), 1)`
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Which has no finite result.
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With all distributions, even for more reasonable probability
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(unless the value of p can be represented exactly in the floating-point type)
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the loss of accuracy quickly becomes significant if you simply calculate probability from 1 - p
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(because it will be mostly garbage digits for p ~ 1).
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So always avoid, for example, using a probability near to unity like 0.99999
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`quantile(my_distribution, 0.99999)`
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and instead use
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`quantile(complement(my_distribution, 0.00001))`
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since 1 - 0.99999 is not exactly equal to 0.00001 when using floating-point arithmetic.
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This assumes that the 0.00001 value is either a constant,
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or can be computed by some manner other than subtracting 0.99999 from 1.
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] [/ tip *Why bother with complements anyway?]
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[endsect] [/ section:complements Complements are supported too - and why]
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[section:parameters Parameters can be calculated]
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Sometimes it's the parameters that define the distribution that you
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need to find. Suppose, for example, you have conducted a Students-t test
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for equal means and the result is borderline. Maybe your two samples
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differ from each other, or maybe they don't; based on the result
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of the test you can't be sure. A legitimate question to ask then is
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"How many more measurements would I have to take before I would get
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an X% probability that the difference is real?" Parameter finders
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can answer questions like this, and are necessarily different for
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each distribution. They are implemented as static member functions
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of the distributions, for example:
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students_t::find_degrees_of_freedom(
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1.3, // difference from true mean to detect
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0.05, // maximum risk of falsely rejecting the null-hypothesis.
|
||
|
0.1, // maximum risk of falsely failing to reject the null-hypothesis.
|
||
|
0.13); // sample standard deviation
|
||
|
|
||
|
Returns the number of degrees of freedom required to obtain a 95%
|
||
|
probability that the observed differences in means is not down to
|
||
|
chance alone. In the case that a borderline Students-t test result
|
||
|
was previously obtained, this can be used to estimate how large the sample size
|
||
|
would have to become before the observed difference was considered
|
||
|
significant. It assumes, of course, that the sample mean and standard
|
||
|
deviation are invariant with sample size.
|
||
|
|
||
|
[endsect] [/ section:parameters Parameters can be calculated]
|
||
|
|
||
|
[section:summary Summary]
|
||
|
|
||
|
* Distributions are objects, which are constructed from whatever
|
||
|
parameters the distribution may have.
|
||
|
* Member functions allow you to retrieve the parameters of a distribution.
|
||
|
* Generic non-member functions provide access to the properties that
|
||
|
are common to all the distributions (PDF, CDF, quantile etc).
|
||
|
* Complements of probabilities are calculated by wrapping the function's
|
||
|
arguments in a call to `complement(...)`.
|
||
|
* Functions that accept a probability can accept a complement of the
|
||
|
probability as well, by wrapping the function's
|
||
|
arguments in a call to `complement(...)`.
|
||
|
* Static member functions allow the parameters of a distribution
|
||
|
to be found from other information.
|
||
|
|
||
|
Now that you have the basics, the next section looks at some worked examples.
|
||
|
|
||
|
[endsect] [/section:summary Summary]
|
||
|
[endsect] [/section:overview Overview]
|
||
|
|
||
|
[section:weg Worked Examples]
|
||
|
[include distribution_construction.qbk]
|
||
|
[include students_t_examples.qbk]
|
||
|
[include chi_squared_examples.qbk]
|
||
|
[include f_dist_example.qbk]
|
||
|
[include binomial_example.qbk]
|
||
|
[include geometric_example.qbk]
|
||
|
[include negative_binomial_example.qbk]
|
||
|
[include normal_example.qbk]
|
||
|
[/include inverse_gamma_example.qbk]
|
||
|
[/include inverse_gaussian_example.qbk]
|
||
|
[include inverse_chi_squared_eg.qbk]
|
||
|
[include nc_chi_squared_example.qbk]
|
||
|
[include error_handling_example.qbk]
|
||
|
[include find_location_and_scale.qbk]
|
||
|
[include nag_library.qbk]
|
||
|
[include c_sharp.qbk]
|
||
|
[endsect] [/section:weg Worked Examples]
|
||
|
|
||
|
[include background.qbk]
|
||
|
|
||
|
[endsect] [/ section:stat_tut Statistical Distributions Tutorial]
|
||
|
|
||
|
[/ dist_tutorial.qbk
|
||
|
Copyright 2006, 2010, 2011 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).
|
||
|
]
|
||
|
|