In statistics, 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 data (and similar data from a larger population). A statistical model represents, often in considerably idealized form, ...

s. Specifically, a parametric model is a family of

probability distribution In probability theory and statistics, a probability distribution is the mathematical function that gives the probabilities of occurrence of different possible outcomes for an experiment. It is a mathematical description of a random phenomeno ...

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 In probability theory and statistics, the cumulative distribution function (CDF) of a real-valued random variable X, or just distribution function of X, evaluated at x, is the probability that X will take a value less than or equal to x. Ev ...

. 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 function In probability theory, a probability density function (PDF), or density of a continuous random variable, is a function whose value at any given sample (or point) in the sample space (the set of possible values taken by the random variable) c ...

s: :

\mathcal = \big\.

Examples

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

\mathcal = \Big\,

where is the probability mass function. 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 In mathematics, the cardinality of a set is a measure of the number of elements of the set. For example, the set A = \ contains 3 elements, and therefore A has a cardinality of 3. Beginning in the late 19th century, this concept was generalized ...

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