The Navier-Stokes equations in nonendpoint borderline Lorentz spaces

Abstract

It is shown both locally and globally that Lt∞(Lx3,q) solutions to the three-dimensional Navier-Stokes equations are regular provided q=∞. Here Lx3,q, 0<q≤∞, is an increasing scale of Lorentz spaces containing L3x. Thus the result provides an improvement of a result by Escauriaza, Seregin and Sver\'ak ((Russian) Uspekhi Mat. Nauk 58 (2003), 3--44; translation in Russian Math. Surveys 58 (2003), 211--250), which treated the case q=3. A new local energy bound and a new ε-regularity criterion are combined with the backward uniqueness theory of parabolic equations to obtain the result. A weak-strong uniqueness of Leray-Hopf weak solutions in Lt∞(Lx3,q), q=∞, is also obtained as a consequence.