A random integral calculus on generalized s-selfdecomposable probability measures

Abstract

It is known that the class Uβ, of generalized s-selfdecom-posable probability distributions, can be viewed as an image via random integral mapping Jβ of the class ID of all infinitely divisible measures. We prove that a composition of the mappings Jβ1, Jβ2, ..., Jβn is again random integral mapping but with a new inner time. In a proof some form of Lagrange interpolation formula is needed. Moreover, some elementary formulas concerning the distributions of products of powers of independent uniformly distributed random variables as established as well.