Higher Order Regularity and Blow-up Criterion for Semi-dissipative and Ideal Boussinesq Equations

Abstract

In this paper we establish local-in-time existence and uniqueness of strong solutions in Hs for s > n2 to the viscous, zero thermal-diffusive Boussinesq equations in Rn , n = 2,3. Beale-Kato-Majda type blow-up criterion has been established in three-dimensions with respect to the BMO-norm of the vorticity. We further prove the local-in-time existence and blow-up criterion for non-viscous and fully ideal Boussinesq systems. Commutator estimates due to Kato and Ponce (1988) KP and Fefferman et. al. (2014) Fe play important roles in the calculations.