Convergence of dependent walks in a random scenery to fBm-local time fractional stable motions

Abstract

It is classical to approximate the distribution of fractional Brownian motion by a renormalized sum Sn of dependent Gaussian random variables. In this paper we consider such a walk Zn that collects random rewards j for j ∈ Z, when the ceiling of the walk Sn is located at j. The random reward (or scenery) j is independent of the walk and with heavy tail. We show the convergence of the sum of independent copies of Zn suitably renormalized to a stable motion with integral representation, whose kernel is the local time of a fractional Brownian motion (fBm). This work extends a previous work where the random walk Sn had independent increments limits.