On the regularity criteria of weak solutions to the micropolar fluid equations in Lorentz space

Abstract

In this paper the regularity of weak solutions and the blow-up criteria of smooth solutions to the micropolar fluid equations on three dimension space are studied in the Lorentz space Lp,∞(R3). We obtain that if u∈ Lq(0,T;Lp,∞(R3)) for 2q+3p 1 with 3<p ∞; or ∇ u∈ Lq(0,T;Lp,∞(R3)) for 2q+3p 2 with 32<p ∞; or the pressure P∈ Lq(0,T;Lp,∞(R3)) for 2q+3p 2 with 32<p ∞; or ∇ P∈ Lq(0,T;Lp,∞(R3)) for 2q+3p 3 with 1<p ∞, then the weak solution (u,ω) satisfying the energy inequality is a smooth solution on [0,T).