The Gamma Expansion of the Level Two Large Deviation Rate Functional for Reversible Diffusion Processes

Abstract

Fix a smooth Morse function U Rd with finitely many critical points, and consider the solution of the stochastic differential equation \[ dxε(t)=-∇ U(xε(t))\,dt \,+\,2ε\, dwt\,, \] where (wt)t0 represents a d-dimensional Brownian motion, and ε>0 a small parameter. Denote by P(Rd) the space of probability measures on Rd, and by Iε P(Rd)[0,\,∞] the Donsker--Varadhan level two large deviations rate functional. We express Iε as Iε = ε-1 J(-1) + J(0) + Σ1 p q (1/θ(p)ε) \, J(p), where J(p) P(Rd) [0,+∞] stand for rate functionals independent of ε and θ(p)ε for sequences such that θ(1)ε ∞, θ(p)ε / θ(p+1)ε 0 for 1 p< q. The speeds θ(p)ε correspond to the time-scales at which the diffusion xε(·) exhibits a metastable behaviour, while the functional J(p) represent the level two, large deviations rate functionals of the finite-state, continuous-time Markov chains which describe the evolution of the diffusion xε(·) among the wells in the time-scale θ(p)ε.