Regularity theory for the dissipative solutions of the MHD equations

We study here a new generalization of Caffarelli, Kohn and Nirenberg's partial regularity theory for weak solutions of the MHD equations. Indeed, in this framework some hypotheses on the pressure P are usually asked (for example P ∈ L q t L 1 x with q > 1) and then local Holder regularity, in time and space variables, for weak solutions can be obtained over small neighborhoods. By introducing the notion of dissipative solutions, we weaken the hypothesis on the pressure (we will only assume that P ∈ D) and we will obtain Holder regularity in the space variable for weak solutions.