Blow-up of critical Besov norms at a potential Navier-Stokes singularity

Abstract

We prove that if an initial datum to the incompressible Navier-Stokes equations in any critical Besov space B-1+ 3pp,q(R3), with 3 <p,q< ∞, gives rise to a strong solution with a singularity at a finite time T>0, then the norm of the solution in that Besov space becomes unbounded at time T. This result, which treats all critical Besov spaces where local existence is known, generalizes the result of Escauriaza, Seregin and Sverak (Uspekhi Mat. Nauk 58(2(350)):3-44, 2003) concerning suitable weak solutions blowing up in L3(R3). Our proof uses profile decompositions and is based on our previous work (Math. Ann. 355(4):1527--1559, 2013) which provided an alternative proof of the L3(R3) result. For very large values of p, an iterative method, which may be of independent interest, enables us to use some techniques from the L3(R3) setting. (To appear in Communications in Mathematical Physics.)