A regularity criterion to the 3D Boussinesq equations

The paper deals with the regularity criterion for the weak solutions to the 3D Boussinesq equations in terms of the partial derivatives in Besov spaces. It is proved that the weak solution $(u,\theta )$ becomes regular provided that $ (\nabla _{h}u,\nabla _{h}\theta )\in L^{\frac{8}{3}}(0,T;\overset{\cdot }{B} _{\infty ,\infty }^{-1}(\mathbb{R}^{3}))$. Our results improve and extend the well-known results of Fang-Qian [13] for the Navier–Stokes equations.