Inviscid Limit of the Stochastic Hyperviscous Navier-Stokes Equations and Invariant Measures for the Euler Equations in R2

Abstract

We prove the existence and some moment estimates for an invariant measure μ for the two-dimensional (2D) deterministic Euler equations on the unbounded domain R2 and with highly regular initial data. The result is achieved by first showing the existence of Markov stationary processes which solve the hyperviscous 2D Navier-Stokes equations with kinematic viscosity >0 and an additive stochastic noise scaling as . We then study the inviscid limit and prove that, as tends to 0, these processes converge, in an appropriate trajectory space, to a pathwise stationary solution to the Euler equations. Its law is the sought invariant measure μ.