Sharp spectral asymptotics for non-reversible metastable diffusion processes

Abstract

Let Uh: Rd Rd be a smooth vector field and consider the associated overdamped Langevin equation dXt=-Uh(Xt)\,dt+2h\,dBt in the low temperature regime h→ 0. In this work, we study the spectrum of the associated diffusion L=-h+Uh·∇ under the assumptions that Uh=U0+h, where the vector fields U0: Rd Rd and : Rd Rd are independent of h∈(0,1], and that the dynamics admits e- Vh as an invariant measure for some smooth function V:Rd→R. Assuming additionally that V is a Morse function admitting n0 local minima, we prove that there exists ε>0 such that in the limit h 0, L admits exactly n0 eigenvalues in the strip \0≤ Re(z)< ε\, which have moreover exponentially small moduli. Under a generic assumption on the potential barriers of the Morse function V, we also prove that the asymptotic behaviors of these small eigenvalues are given by Eyring-Kramers type formulas.