The exit from a metastable state: concentration of the exit point distribution on the low energy saddle points, part 2

Abstract

We consider the first exit point distribution from a bounded domain of the stochastic process (Xt)t 0 solution to the overdamped Langevin dynamics d Xt = -∇ f(Xt) d t + h \ d Bt starting from deterministic initial conditions in , under rather general assumptions on f (for instance, f may have several critical points in ). This work is a continuation of the previous paper DLLN-saddle1 where the exit point distribution from is studied when X0 is initially distributed according to the quasi-stationary distribution of (Xt)t 0 in . The proofs are based on analytical results on the dependency of the exit point distribution on the initial condition, large deviation techniques and results on the genericity of Morse functions.