A Wiener-Hopf Type Factorization for the Exponential Functional of Levy Processes

Abstract

For a L\'evy process =(t)t≥0 drifting to -∞, we define the so-called exponential functional as follows \[I=∫0∞et dt.\] Under mild conditions on , we show that the following factorization of exponential functionals \[Id=IH- × IY\] holds, where, × stands for the product of independent random variables, H- is the descending ladder height process of and Y is a spectrally positive L\'evy process with a negative mean constructed from its ascending ladder height process. As a by-product, we generate an integral or power series representation for the law of I for a large class of L\'evy processes with two-sided jumps and also derive some new distributional properties. The proof of our main result relies on a fine Markovian study of a class of generalized Ornstein-Uhlenbeck processes which is of independent interest on its own. We use and refine an alternative approach of studying the stationary measure of a Markov process which avoids some technicalities and difficulties that appear in the classical method of employing the generator of the dual Markov process.