On distributions of exponential functionals of the processes with independent increments

Abstract

The aim of this paper is to study the laws of the exponential functionals of the processes X with independent increments, namely It= ∫ 0t(-Xs)ds, \,\, t≥ 0, and also I∞= ∫ 0∞(-Xs)ds. Under suitable conditions we derive the integro-differential equations for the density of It and I∞. We give sufficient conditions for the existence of smooth density of the laws of these functionals. In the particular case of Levy processes these equations can be simplified and, in a number of cases, solved explicitly.