Some particular self-interacting diffusions: Ergodic behaviour and almost sure convergence

Abstract

This paper deals with some self-interacting diffusions (Xt,t≥ 0) living on Rd. These diffusions are solutions to stochastic differential equations: \[dXt=dBt-g(t)∇ V(Xt-μt)\,dt,\] where μt is the empirical mean of the process X, V is an asymptotically strictly convex potential and g is a given function. We study the ergodic behaviour of X and prove that it is strongly related to g. Actually, we show that X is ergodic (in the limit quotient sense) if and only if μt converges a.s. We also give some conditions (on g and V) for the almost sure convergence of X.