An anisotropic regularity condition for the 3D incompressible Navier-Stokes equations for the entire exponent range

Abstract

We show that a suitable weak solution to the incompressible Navier-Stokes equations on R3×(-1,1) is regular on R3×(0,1] if ∂3 u belongs to M2p/(2p-3),α ((-1,0);Lp (R3 )) for any α >1 and p∈ (3/2,∞), which is a logarithmic-type variation of a Morrey space in time. For each α >1 this space is, up to a logarithm, critical with respect to the scaling of the equations, and contains all spaces Lq ((-1,0);Lp (R3 )) that are subcritical, that is for which 2/q+3/p<2.