Laplace copulas of multifactor gamma distributions are new generalized Farlie-Gumbel-Morgenstern copulas

Abstract

This paper provides bifactor gamma distribution, trivariate gamma distribution and two copula families on [0, 1] n obtained from the Laplace transforms of the multivariate gamma distribution and the multi-factor gamma distribution given by [P (θ)] --λ and [P (θ)] --λ n i=1 (1 + piθi) --(λ i --λ) respectively, where P is an affine polynomial with respect to the n variables θ1,. .. , θn. These copulas are new generalized Farlie-Gumbel-Morgenstern copulas and allow in particular to obtain multivariate gamma distributions for which the cumulative distribution functions and the probability distribution functions are known.