Moderate deviations for the self-normalized random walk in random scenery

Abstract

Let G be an infinite connected graph with vertex set V. Let \Sn: n ∈ N0 \ be the simple random walk on G and let \ (v) : v ∈ V \ be a collection of i.i.d. random variables which are independent of the random walk. Define the random walk in random scenery as Tn = Σk=0n (Sk), and the normalization variables Vn = (Σk=0n 2(Sk))1/2 and Ln,2 = (Σv ∈ V 2n(v))1/2. For G= Zd and G = Td, the d-ary tree, we provide large deviations results for the self-normalized process Tn n/(Ln,2Vn) under only finite moment assumptions on the scenery.