Lower bounds on blowing-up solutions of the 3D Navier--Stokes equations in H3/2, H5/2, and B5/22,1

Abstract

If u is a smooth solution of the Navier--Stokes equations on R3 with first blowup time T, we prove lower bounds for u in the Sobolev spaces H3/2, H5/2, and the Besov space B5/22,1, with optimal rates of blowup: we prove the strong lower bounds \|u(t)\| H3/2 c(T-t)-1/2 and \|u(t)\| B5/22,1 c(T-t)-1, but in H5/2 we only obtain the weaker result t T-(T-t)\|u(t)\| H5/2 c. The proofs involve new inequalities for the nonlinear term in Sobolev and Besov spaces, both of which are obtained using a dyadic decomposition of u.