Stability of the Exit Time for L\'evy Processes

Abstract

This paper is concerned with the behaviour of a L\'evy process when it crosses over a positive level, u, starting from 0, both as u becomes large and as u becomes small. Our main focus is on the time, τu, it takes the process to transit above the level, and in particular, on the stability of this passage time; thus, essentially, whether or not τu behaves linearly as u 0 or u∞. We also consider conditional stability of τu when the process drifts to -∞, a.s. This provides information relevant to quantities associated with the ruin of an insurance risk process, which we analyse under a Cram\'er condition.