Self attracting diffusions on a sphere and application to a periodic case

Abstract

This paper proves almost-sure convergence for the self-attracting diffusion on the unit sphere dX(t)=σ dWt(X(t))-a∫0t∇SnVXs(Xt) dsdt, X(0)=x∈Sn %given by the stochastic differential equation: dXt=σ dWt+a∫0t(Xt-Xs)dsdt, where σ >0, a < 0, Vy(x)= x,y is the usual scalar product in Rn, and (Wt(.))t≥slant 0 is a Brownian motion on Sn. From this follows the almost-sure convergence of the real-valued self-attracting diffusion dt=σ dWt+a∫0t(t-s)dsdt, where (Wt)t≥slant 0 is a real Brownian motion.