Density behaviour related to L\'evy processes

Abstract

Let pt(x), ft(x) and qt*(x) be the densities at time t of a real L\'evy process, its running supremum and the entrance law of the reflected excursions at the infimum. We provide relationships between the asymptotic behaviour of pt(x), ft(x) and qt*(x), when t is small and x is large. Then for large x, these asymptotic behaviours are compared to this of the density of the L\'evy measure. We show in particular that, under mild conditions, if pt(x) is comparable to t(x), as t→0 and x→∞, then so is ft(x).