Critical one component anisotropic regularity for 3-D Navier-Stokes system

Abstract

Let us consider an initial data v0 for the classical 3D Navier-Stokes equation with vorticity belonging to L 32 L2. We prove that if the solution associated with v0 blows up at a finite time T, then for any p∈]4,∞[,~q1∈[1,2[,~μ>0, ~q2∈[2,(1/p+μ)-1[,~∈ ]1,∞[, and any unit vector e, the Lp estimate in time of \|(v(t)|e)R3\|L3pp-2p +\|(v(t)|e)R3\|p (Bμ+2p+2q1-1q1,) h (B1q2-μq2,) v blows up at T.