Large deviations for random walk in a space--time product environment

Abstract

We consider random walk (Xn)n≥0 on Zd in a space--time product environment ω∈. We take the point of view of the particle and focus on the environment Markov chain (Tn,Xnω)n≥0 where T denotes the shift on . Conditioned on the particle having asymptotic mean velocity equal to any given , we show that the empirical process of the environment Markov chain converges to a stationary process μ∞ under the averaged measure. When d≥3 and is sufficiently close to the typical velocity, we prove that averaged and quenched large deviations are equivalent and when conditioned on the particle having asymptotic mean velocity , the empirical process of the environment Markov chain converges to μ∞ under the quenched measure as well. In this case, we show that μ∞ is a stationary Markov process whose kernel is obtained from the original kernel by a Doob h-transform.