Convergence in distribution of some particular self-interacting diffusions: the simulated annealing method

Abstract

The present paper is concerned 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. The authors have still studied the ergodic behavior of X and proved that it is strongly related to g. We go further and give necessary and sufficient conditions (for small g's) in order that X converges in probability to X∞ (which is related to the global minima of V).