On regularity and singularity for L∞(0,T;L3,w(R3)) solutions to the Navier-Stokes equations

Abstract

We study local regularity properties of a weak solution u to the Cauchy problem of the incompressible Navier-Stokes equations. We present a new regularity criterion for the weak solution u satisfying the condition L∞(0,T;L3,w(R3)) without any smallness assumption on that scale, where L3,w(R3) denotes the standard weak Lebesgue space. As an application, we conclude that there are at most a finite number of blowup points at any singular time t. The condition that the weak Lebesgue space norm of the veclocity field u is bounded in time is encompassing type I singularity and significantly weaker than the end point case of the so-called Ladyzhenskaya-Prodi-Serrin condition proved by Escauriaza-Sergin-Sver\'ak.