Metastability from the large deviations point of view: A -expansion of the level two large deviations rate functional of non-reversible finite-state Markov chains

Abstract

Consider a sequence of continuous-time Markov chains (X(n)t:t 0) evolving on a fixed finite state space V. Let In be the level two large deviations rate functional for X(n)t, as t∞. Under a hypothesis on the jump rates, 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). The weights θ(p)n correspond to the time-scales at which the sequence of Markov chains X(n)t exhibit a metastable behavior, and the zero level sets of the rate functionals I(p) identify the metastable states.