Self-repelling diffusions on a Riemannian manifold

Abstract

Let M be a compact connected oriented Riemannian manifold. The purpose of this paper is to investigate the long time behavior of a degenerate stochastic differential equation on the state space M× Rn; which is obtained via a natural change of variable from a self-repelling diffusion taking the form dXt= σ dBt(Xt) -∫0t∇ VXs(Xt)dsdt, X0=x where \Bt\ is a Brownian vector field on M, σ >0 and Vx(y) = V(x,y) is a diagonal Mercer kernel. We prove that the induced semi-group enjoys the strong Feller property and has a unique invariant probability μ given as the product of the normalized Riemannian measure on M and a Gaussian measure on Rn. We then prove an exponential decay to this invariant probability in L2(μ) and in total variation.