First-passage times over moving boundaries for asymptotically stable walks

Abstract

Let \Sn, n≥1\ be a random walk wih independent and identically distributed increments and let \gn,n≥1\ be a sequence of real numbers. Let Tg denote the first time when Sn leaves (gn,∞). Assume that the random walk is oscillating and asymptotically stable, that is, there exists a sequence \cn,n≥1\ such that Sn/cn converges to a stable law. In this paper we determine the tail behaviour of Tg for all oscillating asymptotically stable walks and all boundary sequences satisfying gn=o(cn). Furthermore, we prove that the rescaled random walk conditioned to stay above the boundary up to time n converges, as n∞, towards the stable meander.