Empirical processes for recurrent and transient random walks in random scenery

Abstract

In this paper, we are interested in the asymptotic behaviour of the sequence of processes (Wn(s,t))s,t∈[0,1] with equation* Wn(s,t):=Σk=1 nt(1\Sk≤ s\-s) equation* where (x, x∈Zd) is a sequence of independent random variables uniformly distributed on [0,1] and (Sn)n∈ N is a random walk evolving in Zd, independent of the 's. In Wendler (2016), the case where (Sn)n∈ N is a recurrent random walk in Z such that (n- 1αSn)n≥ 1 converges in distribution to a stable distribution of index α, with α∈(1,2], has been investigated. Here, we consider the cases where (Sn)n∈ N is either: a) a transient random walk in Zd, b) a recurrent random walk in Zd such that (n- 1dSn)n≥ 1 converges in distribution to a stable distribution of index d∈\1,2\.