Remarks on high Reynolds numbers hydrodynamics and the inviscid limit

Abstract

We prove that any weak space-time L2 vanishing viscosity limit of a sequence of strong solutions of Navier-Stokes equations in a bounded domain of R2 satisfies the Euler equation if the solutions' local enstrophies are uniformly bounded. We also prove that t-a.e. weak L2 inviscid limits of solutions of 3D Navier-Stokes equations in bounded domains are weak solutions of the Euler equation if they locally satisfy a scaling property of their second order structure function. The conditions imposed are far away from boundaries, and wild solutions of Euler equations are not a priori excluded in the limit.