On the Serrin-type condition on one velocity component for the Navier-Stokes equations

Abstract

In this paper we consider the regularity problem of the Navier-Stokes equations in 3 . We show that the Serrin-type condition imposed on one component of the velocity u3∈ Lp(0,T; Lq(3 )) satisfying 2p+ 3q <1, 3<q +∞ implies the regularity of the weak Leray solution u: 3 × (0,T) → 3 with the initial data belonging to L2( R3) L3(3). The result is an immediate consequence of a new local regularity criterion in terms of one velocity component for suitable weak solutions.