In this work, we consider the magnetohydrodynamics system with the Hall and ion-slip effects in R3. The main result is a sufficient condition for regularity on a time interval [0,T] expressed in terms , of the norm of the homogeneous Besov space B˙,0{\dot{B}_{\infty,\infty}^0} with respect to the pressure and the BMO-norm with respect to the gradient of the magnetic field, respectively
 ∫0T(‖Δπ(t)‖B˙∞,∞02/3+‖ΔB(t)‖BMO2)dt∞{\int_{0}^{T} ({\| \Delta \pi(t)\|}^{2/3}_{\dot{B}_{\infty,\infty}^0} + {\| \Delta B (t)\|}^{2}_{BMO} ) dt