Classification of the Bounds on the Probability of Ruin for L\'evy Processes with Light-tailed Jumps

Abstract

In this note, we study the ultimate ruin probabilities of a real-valued L\'evy process X with light-tailed negative jumps. It is well-known that, for such L\'evy processes, the probability of ruin decreases as an exponential function with a rate given by the root of the Laplace exponent, when the initial value goes to infinity. Under the additional assumption that X has integrable positive jumps, we show how a finer analysis of the Laplace exponent gives in fact a complete description of the bounds on the probability of ruin for this class of L\'evy processes. This leads to the identification of a case that is not considered in the literature and for which we give an example. We then apply the result to various risk models and in particular the Cram\'er-Lundberg model perturbed by Brownian motion.