Blowup criterion for Navier-Stokes equation in critical Besov space with spatial dimensions d ≥ 4

Abstract

This paper is concerned with the blowup criterion for mild solution to the incompressible Navier-Stokes equation in higher spatial dimensions d ≥ 4. By establishing an ε regularity criterion, we show that if the mild solution u with initial data in B-1+d/pp,q(Rd) , d<p,\,q<∞ becomes singular at a finite time T*, then t T* \|u(t)\| B-1+d/pp,q(Rd) = ∞. The corresponding result in 3D case has been obtained by I.Gallagher, G.S.KochandF.Planchon. As a by-product, we also prove a regularity criterion for the Leray-Hopf solution in the critical Besov space, which generalizes the results in~DoDu09, where blowup criterion in critical Lebesgue space Ld(Rd) is obtained.