Blow-up criteria for the Navier-Stokes equations in non-endpoint critical Besov spaces

Abstract

We obtain an improved blow-up criterion for solutions of the Navier-Stokes equations in critical Besov spaces. If a mild solution u has maximal existence time T* < ∞, then the non-endpoint critical Besov norms must become infinite at the blow-up time: t T* u(·,t) B-1+3/pp,q(R3) = ∞, 3 < p,q < ∞. In particular, we introduce a priori estimates for the solution based on elementary splittings of initial data in critical Besov spaces and energy methods. These estimates allow us to rescale around a potential singularity and apply backward uniqueness arguments. The proof does not use profile decomposition.