Regularity and uniqueness for a class of solutions to the hydrodynamic flow of nematic liquid crystals

Abstract

In this paper, we establish an ε-regularity criterion for any weak solution (u,d) to the nematic liquid crystal flow (1.1) such that (u,∇ d)∈ LptLqx for some p 2 and q n satisfying the condition (1.2). As consequences, we prove the interior smoothness of any such a solution when p>2 and q>n. We also show that uniqueness holds for the class of weak solutions (u,d) the Cauchy problem of the nematic liquid crystal flow (1.1) that satisfy (u,∇ d)∈ LptLqx for some p>2 and q>n satisfying (1.2).