Exponential functionals of L\'evy processes with jumps

Abstract

We study the exponential functional ∫0∞ e-s- \, dηs of two one-dimensional independent L\'evy processes and η, where η is a subordinator. In particular, we derive an integro-differential equation for the density of the exponential functional whenever it exists. Further, we consider the mapping for a fixed L\'evy process , which maps the law of η1 to the law of the corresponding exponential functional ∫0∞ e-s- \, dηs, and study the behaviour of the range of for varying characteristics of . Moreover, we derive conditions for selfdecomposable distributions and generalized Gamma convolutions to be in the range. On the way we also obtain new characterizations of these classes of distributions.