Metastable -expansion of finite state Markov chains level two large deviations rate functions
Abstract
We examine two analytical characterisation of the metastable behavior of a Markov chain. The first one expressed in terms of its transition probabilities, and the second one in terms of its large deviations rate functional. Consider a sequence of continuous-time Markov chains (X(n)t:t 0) evolving on a fixed finite state space V. Under a hypothesis on the jump rates, we prove the existence of times-scales θ(p)n and probability measures with disjoint supports π(p)j, j∈ Sp, 1 p q, such that (a) θ(1)n ∞, θ(k+1)n/θ(k)n ∞, (b) for all p, x∈ V, t>0, starting from x, the distribution of X(n)t θ(p)n converges, as n∞, to a convex combination of the probability measures π(p)j. The weights of the convex combination naturally depend on x and t. Let In be the level two large deviations rate functional for X(n)t, as t∞. Under the same hypothesis on the jump rates and assuming, furthermore, that the process is reversible, we prove that In can be written as In = I(0) \,+\, Σ1 p q (1/θ(p)n) \, I(p) for some rate functionals I(p) which take finite values only at convex combinations of the measures π(p)j: I(p)(μ) < ∞ if, and only if, μ = Σj∈ Sp ωj\, π(p)j for some probability measure ω in Sp.
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