Exit time and principal eigenvalue of non-reversible elliptic diffusions

Abstract

In this work, we analyse the metastability of non-reversible diffusion processes dXt=b(Xt)dt+ h\,dBt on a bounded domain when b admits the decomposition b=-(∇ f+) and ∇ f · =0. In this setting, we first show that, when h 0, the principal eigenvalue of the generator of (Xt)t 0 with Dirichlet boundary conditions on the boundary ∂ of is exponentially close to the inverse of the mean exit time from , uniformly in the initial conditions X0=x within the compacts of . The asymptotic behavior of the law of the exit time in this limit is also obtained. The main novelty of these first results follows from the consideration of non-reversible elliptic diffusions whose associated dynamical systems X=b(X) admit equilibrium points on ∂. In a second time, when in addition =0, we derive a new sharp asymptotic equivalent in the limit h 0 of the principal eigenvalue of the generator of the process and of its mean exit time from . Our proofs combine tools from large deviations theory and from semiclassical analysis, and truly relies on the notion of quasi-stationary distribution.