Limit theorems for one and two-dimensional random walks in random scenery

Abstract

Random walks in random scenery are processes defined by Zn:=Σk=1nX1+...+Xk, where (Xk,k 1) and (y,y∈ Zd) are two independent sequences of i.i.d. random variables with values in Zd and R respectively. We suppose that the distributions of X1 and 0 belong to the normal basin of attraction of stable distribution of index α∈(0,2] and β∈(0,2]. When d=1 and α 1, a functional limit theorem has been established in KestenSpitzer and a local limit theorem in BFFN. In this paper, we establish the convergence of the finite-dimensional distributions and a local limit theorem when α=d (i.e. α = d=1 or α=d=2) and β ∈ (0,2]. Let us mention that functional limit theorems have been established in bolthausen and recently in DU in the particular case where β=2 (respectively for α=d=2 and α=d=1).