Inviscid limit of vorticity distributions in Yudovich class

Abstract

We prove that given initial data ω0∈ L∞(T2), forcing g∈ L∞(0,T; L∞(T2)), and any T>0, the solutions u of Navier-Stokes converge strongly in L∞(0,T;W1,p(T2)) for any p∈ [1,∞) to the unique Yudovich weak solution u of the Euler equations. A consequence is that vorticity distribution functions converge to their inviscid counterparts. As a byproduct of the proof, we establish continuity of the Euler solution map for Yudovich solutions in the Lp vorticity topology. The main tool in these proofs is a uniformly controlled loss of regularity property of the linear transport by Yudovich solutions. Our results provide a partial foundation for the Miller--Robert statistical equilibrium theory of vortices as it applies to slightly viscous fluids.