The energy conservation and regularity for the Navier-Stokes equations

Abstract

In this paper, we consider the energy conservation and regularity of the weak solution u to the Navier-Stokes equations in the endpoint case. We first construct a divergence-free field u(t,x) which satisfies t TT-t||u(t)||BMO<∞ and t TT-t||u(t)||L∞=∞ to demonstrate that the Type II singularity is admissible in the endpoint case u∈ L2,∞(BMO). Secondly, we prove that if a suitable weak solution u(t,x) satisfying ||u||L2,∞([0,T];BMO())<∞ for arbitrary ⊂eqR3 then the local energy equality is valid on [0,T]×. As a corollary, we also prove ||u||L2,∞([0,T];BMO(R3))<∞ implies the global energy equality on [0,T]. Thirdly, we show that as the solution u approaches a finite blowup time T, the norm ||u(t)||BMO must blow up at a rate faster than cT-t with some absolute constant c>0. Furthermore, we prove that if ||u3||L2,∞([0,T];BMO(R3))=M<∞ then there exists a small constant cM depended on M such that if ||uh||L2,∞([0,T];BMO(R3))≤ cM then u is regular on (0,T]×R3.