Exit-problem for a class of non-Markov processes with path dependency

Abstract

We study the exit-time of a self-interacting diffusion from an open domain G ⊂ Rd. In particular, we consider the equation dXt = - ( ∇ V(Xt) + 1t∫0t∇ F (Xt - Xs)ds ) dt + σ dWt. We are interested in the small-noise (σ 0) behaviour of the exit-time from the potentials' domain of attraction. In this work rather weak assumptions on the potentials V and F, and on the domain G are considered. In particular, we do not assume V nor F to be either convex or concave, which covers a wide range of self-attracting and self-repelling stochastic processes possibly moving in a complex multi-well landscape. The Large Deviation Principle for the Self-interacting diffusion with generalized initial conditions is established. The main result of the paper states that, under some assumptions on the potentials V and F, and on the domain G, the Kramers' type law for the exit-time holds. Finally, we provide a result concerning the exit-location of the diffusion.