Long range trap models on Z and quasistable processes

Abstract

Let X=\ Xt:\, t≥0,\, X0=0\ be a mean zero β-stable random walk on Z with inhomogeneous jump rates \τi-1: i∈Z\, with β∈(1,2] and \τi: i∈Z\ a family of independent random variables with common marginal distribution in the basin of attraction of an α-stable law, α∈(0,1). In this paper we derive results about the long time behavior of this process, in particular its scaling limit, given by a β-stable process time-changed by the inverse of another process, involving the local time of the β-stable process and an independent α-stable subordinator; we call the resulting process a quasistable process. Another such result concerns aging. We obtain an (integrated) aging result for X.