Full -expansion of reversible Markov chains level two large deviations rate functionals

Abstract

Let n ⊂ Rd, n 1, be a sequence of finite sets and consider a n-valued, irreducible, reversible, continuous-time Markov chain (X(n)t:t 0). Denote by P( Rd) the set of probability measures on Rd and by In P( Rd) [0,+∞) the level two large deviations rate functional for X(n)t as t∞. We present a general method, based on tools used to prove the metastable behaviour of Markov chains, to derive a full expansion of In expressing it as In = I(0) \,+\, Σ1 p q (1/θ(p)n)\, I(p), where I(p) P( Rd) [0,+∞] represent rate functionals independent of n and θ(p)n sequences such that θ(1)n ∞, θ(p)n / θ(p+1)n 0 for 1 p< q. The speed θ(p)n corresponds to the time-scale at which the Markov chains X(n)t exhibits a metastable behavior, and the I(p-1) zero-level sets to the metastable states. To illustrate the theory we apply the method to random walks in potential fields.