statistics Statistics (from German language, German: ', "description of a State (polity), state, a country") is the discipline that concerns the collection, organization, analysis, interpretation, and presentation of data. In applying statistics to a s ...

, a parametric model or parametric family or finite-dimensional model is a particular class of

statistical model A statistical model is a mathematical model that embodies a set of statistical assumptions concerning the generation of Sample (statistics), sample data (and similar data from a larger Statistical population, population). A statistical model repre ...

s. Specifically, a parametric model is a family of

probability distribution In probability theory and statistics, a probability distribution is a Function (mathematics), function that gives the probabilities of occurrence of possible events for an Experiment (probability theory), experiment. It is a mathematical descri ...

s that has a finite number of parameters.

Definition

is a collection of

s on some sample space. We assume that the collection, , is indexed by some set . The set is called the parameter set or, more commonly, the parameter space. For each , let denote the corresponding member of the collection; so is a cumulative distribution function. Then a statistical model can be written as :

\mathcal = \big\.

The model is a parametric model if for some positive integer . When the model consists of absolutely continuous distributions, it is often specified in terms of corresponding probability density functions: :

\mathcal = \big\.

Examples

* The Poisson family of distributions is parametrized by a single number : :

\mathcal = \Big\,

where is the

probability mass function In probability and statistics, a probability mass function (sometimes called ''probability function'' or ''frequency function'') is a function that gives the probability that a discrete random variable is exactly equal to some value. Sometimes i ...

. This family is an exponential family. * The normal family is parametrized by , where is a location parameter and is a scale parameter: :

\mathcal = \Big\.

This parametrized family is both an exponential family and a location-scale family. * The Weibull translation model has a three-dimensional parameter : :

\mathcal = \Big\.

* The binomial model is parametrized by , where is a non-negative integer and is a probability (i.e. and ): :

\mathcal = \Big\.

This example illustrates the definition for a model with some discrete parameters.

General remarks

A parametric model is called identifiable if the mapping is invertible, i.e. there are no two different parameter values and such that .

Comparisons with other classes of models

Parametric models are contrasted with the semi-parametric, semi-nonparametric, and non-parametric models, all of which consist of an infinite set of "parameters" for description. The distinction between these four classes is as follows: * in a "'' parametric''" model all the parameters are in finite-dimensional parameter spaces; * a model is "'' non-parametric''" if all the parameters are in infinite-dimensional parameter spaces; * a "''semi-parametric''" model contains finite-dimensional parameters of interest and infinite-dimensional nuisance parameters; * a "''semi-nonparametric''" model has both finite-dimensional and infinite-dimensional unknown parameters of interest. Some statisticians believe that the concepts "parametric", "non-parametric", and "semi-parametric" are ambiguous. It can also be noted that the set of all probability measures has

cardinality The thumb is the first digit of the hand, next to the index finger. When a person is standing in the medical anatomical position (where the palm is facing to the front), the thumb is the outermost digit. The Medical Latin English noun for thum ...

of continuum, and therefore it is possible to parametrize any model at all by a single number in (0,1) interval. This difficulty can be avoided by considering only "smooth" parametric models.

Notes

Bibliography