New a priori estimate for stochastic 2D Navier-Stokes equation with applications to invariant measure

Abstract

The paper deals with the stochastic two-dimensional Navier-Stokes equation for incompressible fluids, set in a bounded domain with Dirichlet boundary conditions. We consider additive noise in the form G\, dW, where W is a cylindrical Wiener process and G a bounded linear operator with range dense in the domain of Aγ, A being the Stokes operator. While it is known that existence of invariant measure holds for γ>1/4, previous results show its uniqueness only for γ > 3/8. We fill this gap and prove uniqueness and strong mixing property in the range γ ∈ (1/4, 3/8] by adapting the so-called Sobolevski-Kato-Fujita approach to the stochastic N-S equations. This method provides new a priori estimates, which entail both better regularity in space for the solution and strong Feller and irreducibility properties for the associated Markov semigroup.