On the density of exponential functionals of L\'evy processes

Abstract

In this paper, we study the existence of the density associated to the exponential functional of the L\'evy process , \[ I_q:=∫0q es \, ds, \] where q is an independent exponential r.v. with parameter q≥ 0. In the case when is the negative of a subordinator, we prove that the density of I_q, here denoted by k, satisfies an integral equation that generalizes the one found by Carmona et al. Carmona97. Finally when q=0, we describe explicitly the asymptotic behaviour at 0 of the density k when is the negative of a subordinator and at ∞ when is a spectrally positive L\'evy process that drifts to +∞.