The first passage time problem over a moving boundary for asymptotically stable L\'evy processes

Abstract

We study the asymptotic tail behaviour of the first-passage time over a moving boundary for asymptotically α-stable L\'evy processes with α<1. Our main result states that if the left tail of the L\'evy measure is regularly varying with index - α and the moving boundary is equal to 1 - tγ for some γ<1/α, then the probability that the process stays below the moving boundary has the same asymptotic polynomial order as in the case of a constant boundary. The same is true for the increasing boundary 1 + tγ with γ<1/α under the assumption of a regularly varying right tail with index - α.