Multivariate Pareto distribution

In statistics, a multivariate Pareto distribution is a multivariate extension of a univariate Pareto distribution.^[1] There are several different types of univariate Pareto distributions including Pareto Types I−IV and Feller−Pareto.^[2] Multivariate Pareto distributions have been defined for many of these types.

Bivariate Pareto distributions

Bivariate Pareto distribution of the first kind

Mardia (1962)^[3] defined a bivariate distribution with cumulative distribution function (CDF) given by

${\displaystyle F(x_1,x_2)=1-{\displaystyle \sum _{i=1}^2}{\left(\frac{x_i}{{\theta }_i}\right)}^{-a}+{({\displaystyle \sum _{i=1}^2}\frac{x_i}{{\theta }_i}-1)}^{-a},x_i>{\theta }_i>0,i=1,2;a>0,}$

and joint density function

${\displaystyle f(x_1,x_2)=(a+1)a({\theta }_1{\theta }_2{)}^{a+1}({\theta }_2{x}_1+{\theta }_1{x}_2-{\theta }_1{\theta }_2{)}^{-(a+2)},x_i\ge {\theta }_i>0,i=1,2;a>0.}$

The marginal distributions are Pareto Type 1 with density functions

${\displaystyle f(x_i)=a{\theta }_i^a{x}_i^{-(a+1)},x_i\ge {\theta }_i>0,i=1,2.}$

The means and variances of the marginal distributions are

${\displaystyle E[X_i]=\frac{a{\theta }_i}{a-1},a>1;Var(X_i)=\frac{a{\theta }_i^2}{(a-1{)}^2(a-2)},a>2;i=1,2,}$

and for a > 2, X₁ and X₂ are positively correlated with

${\displaystyle \mathrm{cov}(X_1,X_2)=\frac{{\theta }_1{\theta }_2}{(a-1{)}^2(a-2)},\text{ and }\mathrm{cor}(X_1,X_2)=\frac{1}{a}.}$

Bivariate Pareto distribution of the second kind

Arnold^[4] suggests representing the bivariate Pareto Type I complementary CDF by

${\displaystyle \bar{F}(x_1,x_2)={(1+{\displaystyle \sum _{i=1}^2}\frac{x_i-{\theta }_i}{{\theta }_i})}^{-a},x_i>{\theta }_i,i=1,2.}$

If the location and scale parameter are allowed to differ, the complementary CDF is

${\displaystyle \bar{F}(x_1,x_2)={(1+{\displaystyle \sum _{i=1}^2}\frac{x_i-{\mu }_i}{{\sigma }_i})}^{-a},x_i>{\mu }_i,i=1,2,}$

which has Pareto Type II univariate marginal distributions. This distribution is called a multivariate Pareto distribution of type II by Arnold.^[4] (This definition is not equivalent to Mardia's bivariate Pareto distribution of the second kind.)^[3] For a > 1, the marginal means are

${\displaystyle E[X_i]={\mu }_i+\frac{{\sigma }_i}{a-1},i=1,2,}$

while for a > 2, the variances, covariance, and correlation are the same as for multivariate Pareto of the first kind.

Multivariate Pareto distributions

Multivariate Pareto distribution of the first kind

Mardia's^[3] Multivariate Pareto distribution of the First Kind has the joint probability density function given by

${\displaystyle f(x_1,\dots ,x_k)=a(a+1)\cdots (a+k-1){\left({\displaystyle \prod _{i=1}^k}{\theta }_i\right)}^{-1}{({\displaystyle \sum _{i=1}^k}\frac{x_i}{{\theta }_i}-k+1)}^{-(a+k)},x_i>{\theta }_i>0,a>0,(1)}$

The marginal distributions have the same form as (1), and the one-dimensional marginal distributions have a Pareto Type I distribution. The complementary CDF is

${\displaystyle \bar{F}(x_1,\dots ,x_k)={({\displaystyle \sum _{i=1}^k}\frac{x_i}{{\theta }_i}-k+1)}^{-a},x_i>{\theta }_i>0,i=1,\dots ,k;a>0.(2)}$

The marginal means and variances are given by

${\displaystyle E[X_i]=\frac{a{\theta }_i}{a-1},\text{ for }a>1,\text{ and }Var(X_i)=\frac{a{\theta }_i^2}{(a-1{)}^2(a-2)},\text{ for }a>2.}$

If a > 2 the covariances and correlations are positive with

${\displaystyle \mathrm{cov}(X_i,X_j)=\frac{{\theta }_i{\theta }_j}{(a-1{)}^2(a-2)},\mathrm{cor}(X_i,X_j)=\frac{1}{a},i\ne j.}$

Multivariate Pareto distribution of the second kind

Arnold^[4] suggests representing the multivariate Pareto Type I complementary CDF by

${\displaystyle \bar{F}(x_1,\dots ,x_k)={(1+{\displaystyle \sum _{i=1}^k}\frac{x_i-{\theta }_i}{{\theta }_i})}^{-a},x_i>{\theta }_i>0,i=1,\dots ,k.}$

If the location and scale parameter are allowed to differ, the complementary CDF is

${\displaystyle \bar{F}(x_1,\dots ,x_k)={(1+{\displaystyle \sum _{i=1}^k}\frac{x_i-{\mu }_i}{{\sigma }_i})}^{-a},x_i>{\mu }_i,i=1,\dots ,k,(3)}$

which has marginal distributions of the same type (3) and Pareto Type II univariate marginal distributions. This distribution is called a multivariate Pareto distribution of type II by Arnold.^[4] For a > 1, the marginal means are

${\displaystyle E[X_i]={\mu }_i+\frac{{\sigma }_i}{a-1},i=1,\dots ,k,}$

while for a > 2, the variances, covariances, and correlations are the same as for multivariate Pareto of the first kind.

Multivariate Pareto distribution of the fourth kind

A random vector X has a k-dimensional multivariate Pareto distribution of the Fourth Kind^[4] if its joint survival function is

${\displaystyle \bar{F}(x_1,\dots ,x_k)={(1+{\displaystyle \sum _{i=1}^k}{\left(\frac{x_i-{\mu }_i}{{\sigma }_i}\right)}^{1/{\gamma }_i})}^{-a},x_i>{\mu }_i,{\sigma }_i>0,i=1,\dots ,k;a>0.(4)}$

The k₁-dimensional marginal distributions (k₁<k) are of the same type as (4), and the one-dimensional marginal distributions are Pareto Type IV.

Multivariate Feller–Pareto distribution

A random vector X has a k-dimensional Feller–Pareto distribution if

${\displaystyle X_i={\mu }_i+(W_i/Z{)}^{{\gamma }_i},i=1,\dots ,k,(5)}$

where

${\displaystyle W_i\sim \mathrm{\Gamma }({\beta }_i,1),i=1,\dots ,k,Z\sim \mathrm{\Gamma }(\alpha ,1),}$

are independent gamma variables.^[4] The marginal distributions and conditional distributions are of the same type (5); that is, they are multivariate Feller–Pareto distributions. The one–dimensional marginal distributions are of Feller−Pareto type.

References