Large deviations for invariant measures of white-forced 2D Navier-Stokes equation

Abstract

The paper is devoted to studying the asymptotics of the family (μ) of stationary measures of the Markov process generated by the flow of stochastic 2D Navier-Stokes equation with smooth white noise. By using the large deviations techniques, we prove that this family is exponentially tight in H1-γ(D) for any γ>0 and vanishes exponentially outside any neighborhood of the set O of ω-limit points of the deterministic equation. In particular, any of its weak limits is concentrated on the closure O. A key ingredient of the proof is a new formula that allows to recover the stationary measure μ of a Markov process with good mixing properties, knowing only some local information about μ. In the case of trivial limiting dynamics, our result implies that the family (μ) obeys the large deviations principle.