Annealed local limit theorem for Sinai's random walk in random environment

Abstract

We consider Sinai's random walk in random environment (Sn)n∈N. We prove a local limit theorem for (Sn)n∈N under the annealed law P. As a consequence, we get an equivalent for the annealed probability P(Sn=zn) as n goes to infinity, when zn=O(( n)2). To this aim, we develop a path decomposition for the potential of Sinai's walk, that is, for some random walks with i.i.d. increments. The proof also relies on renewal theory, a coupling argument, a very careful analysis of the environments and trajectories of Sinai's walk satisfying Sn=zn, and on precise estimates for random walks conditioned to stay positive or nonnegative.