Exponential ergodicity and Rayleigh-Schroedinger series for infinite dimensional diffusions

Abstract

We consider an infinite dimensional diffusion on T Zd, where T is the circle, defined by an infinitesimal generator of the form L=Σi∈ Zd(ai(η)2∂2i +bi(η)∂i), with η∈ T Zd, where the coefficients ai,bi are of finite range, bounded with uniformly bounded second order partial derivatives and the ellipticity assumption ∈fi,ηai(η)>0 is satisfied. We prove that whenever is an invariant Gibbs measure for this diffusion satisfying the logarithmic Sobolev inequality, then the dynamics is exponentially ergodic in the uniform norm, and hence is the unique invariant measure. As an application of this result, we prove that if A=Σi∈ Zdci(η)∂i, and ci satisfy the condition Σi∈ Zd ∫ ci2d<∞, then there is an εc>0, such that for every ε∈ (-εc,εc), the infinite dimensional diffusion with generator Lε=L+ε A, has a unique invariant measure ε having a Radon-Nikodym derivative gε with respect to , which admits the analytic expansion gε=Σk=0∞ εk fk, where fk∈ L2[] are defined through f0=1, ∫ fkd=0 and the recurrence equations L*fk+1=A*fk. We give an example where through this expansion we are able to quantify the effect on the invariant measure of a perturbation triggering interaction on independent diffusions.