Power and exponential moments of the number of visits and related quantities for perturbed random walks

Abstract

Let (1,η1),(2,η2),... be a sequence of i.i.d.\ copies of a random vector (,η) taking values in 2, and let Sn := 1+...+n. The sequence (Sn-1 + ηn)n ≥ 1 is then called perturbed random walk. We study random quantities defined in terms of the perturbed random walk: τ(x), the first time the perturbed random walk exits the interval (-∞,x], N(x), the number of visits to the interval (-∞,x], and (x), the last time the perturbed random walk visits the interval (-∞,x]. We provide criteria for the a.s.\ finiteness and for the finiteness of exponential moments of these quantities. Further, we provide criteria for the finiteness of power moments of N(x) and (x).