Sharp estimate of the mean exit time of a bounded domain in the zero white noise limit

Abstract

We prove a sharp asymptotic formula for the mean exit time from a bounded domain D⊂ Rd for the overdamped Langevin dynamics d Xt = -∇ f(Xt) d t + 2 \ d Bt when 0 and in the case when D contains a unique non degenerate minimum of f and nf>0 on D. This formula was actually first derived in~matkowsky-schuss-77 using formal computations and we thus provide, in the reversible case, the first proof of it. As a direct consequence, we obtain when 0, a sharp asymptotic estimate of the smallest eigenvalue of the operator L=- +∇ f· ∇ associated with Dirichlet boundary conditions on D. The approach does not require f|∂ D to be a Morse function. The proof is based on results from~Day2,Day4 and a formula for the mean exit time from D introduced in~BEGK, BGK.