Interior and boundary regularity for the Navier-Stokes equations in the critical Lebesgue spaces

Abstract

We study regularity criteria for the d-dimensional incompressible Navier-Stokes equations. We prove if u∈ L∞tLdx((0,T)× Rd+) is a Leray-Hopf weak solution vanishing on the boundary and the pressure p satisfies a local condition \|p\|L2-1/d(Q(z0,1) (0,T)× Rd+)≤ K for some constant K>0 uniformly in z0, then u is regular up to the boundary in (0,T)× Rd+. Furthermore, when T=∞, u tends to zero as t→ ∞. We also study the local problem in half unit cylinder Q+ and prove that if u∈ Lt∞Lxd(Q+) and p∈ L2-1/d(Q+), then u is H\"older continuous in the closure of the set Q+(1/4). This generalizes a result by Escauriaza, Seregin, and Sver\'ak to higher dimensions and domains with boundary.