Regularity criteria for the solutions to the 3D MHD equations in the multiplier space

In this paper, some improved regularity criteria for the 3D viscous MHD equations are established in multiplier spaces. It is proved that if the velocity field satisfies u is an element of L 2/1 - r (o, T, (X) over dot(r) (R-3)) with r is an element of [o, 1[, or the gradient field of velocity satisfies del u is an element of 2/2-gamma (0, T, (X)(gamma) (R-3)) with gamma is an element of [0, 1], then the solution remains smooth on [0, T].