Abstract

In this paper, we are concerned with the regularity criterion for weak solutions to the 3D incompressible MHD equations. We show that if any two groups functions of $$(\partial _{1}u_{1}, \partial _{1}b_{1})$$ , $$(\partial _{2}u_{2}, \partial _{2}b_{2})$$ and $$(\partial _{3}u_{3}, \partial _{3}b_{3})$$ belong to the space $$L^{\theta }([0,T);L^{r}(\mathbb {R}^3)), \frac{2}{\theta }+\frac{3}{r}=2, \frac{3}{2}<r\le \infty $$ , then the solution (u, b) to the MHD equations actually is smooth on (0, T).

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