A note on a Poissonian functional and a q-deformed Dufresne identity

Abstract

In this note, we compute the Mellin transform of a Poissonian exponential functional, the underlying process being a simple continuous time random walk. It shows that the Poissonian functional can be expressed in term of the inverse of a q-gamma random variable. The result interpolates between two known results. When the random walk has only positive increments, we retrieve a theorem due to Bertoin, Biane and Yor. In the Brownian limit (q → 1-), one recovers Dufresne's identity involving an inverse gamma random variable. Hence, one can see it as a q-deformed Dufresne identity.