On the vanishing viscosity limit for 2D incompressible flows with unbounded vorticity

Abstract

We show strong convergence of the vorticities in the vanishing viscosity limit for the incompressible Navier-Stokes equations on the two-dimensional torus, assuming only that the initial vorticity of the limiting Euler equations is in Lp for some p>1. This substantially extends a recent result of Constantin, Drivas and Elgindi, who proved strong convergence in the case p=∞. Our proof, which relies on the classical renormalization theory of DiPerna-Lions, is surprisingly simple.