Classes of probability density functions having Laplace transforms with negative zeros and poles

Abstract

We consider a class of functions on [0,∞), denoted by Ω, having Laplace transforms with only negative zeros and poles. Of special interest is the class Ω⁺of probability density functions in Ω. Simple and useful conditions are given for necessity and sufficiency off∊ Ω to be in Ω⁺. The class Ω⁺contains many classes of great importance such as mixtures ofnindependent exponential random variables(CM_n),sums ofnindependent exponential random variables(PF^∗_n), sums of two independent random variables, one inCM_rand the other inPF^∗₁(CMPF_nwithn=r+l)and sums of independent random variables inCM_n(SCM).Characterization theorems for these classes are given in terms of zeros and poles of Laplace transforms. The prevalence of these classes in applied probability models of practical importance is demonstrated. In particular, sufficient conditions are given for complete monotonicity and unimodality of modified renewal densities.