Regularity criteria in weak L3 for 3D incompressible Navier-Stokes equations

Abstract

We study the regularity of a distributional solution (u,p) of the 3D incompressible evolution Navier-Stokes equations. Let Br denote concentric balls in R3 with radius r. We will show that if p∈ Lm (0,1; L1(B2)), m>2, and if u is sufficiently small in L∞ (0,1; L3,∞(B2)), without any assumption on its gradient, then u is bounded in B1× (110,1). It is an endpoint case of the usual Serrin-type regularity criteria, and extends the steady-state result of Kim-Kozono to the time dependent setting. In the appendix we also show some nonendpoint borderline regularity criteria.