On Mixtures of Gamma Distributions, Distributions with Hyperbolically Monotone Densities and Generalized Gamma Convolutions (GGC)

Abstract

Let Y be a standard Gamma(k) distributed random variable, k>0, and let X be an independent positive random variable. We prove that if X has a hyperbolically monotone density of order k (HMk), then the distributions of Y· X and Y/X are generalized gamma convolutions (GGC). This result extends results of Roynette et al. and Behme and Bondesson, who treated respectively the cases k=1 and k an integer. We give a proof that covers all k>0 and gives explicit formulas for the relevant functions that extend those found by Behme and Bondesson in the integer case.