Energy conservation for the non-resistive MHD equations with physical boundaries

Abstract

In this paper, we study the energy equality for weak solutions to the non-resistive MHD equations with physical boundaries. Although the equations of magnetic field b are of hyperbolic type, and the boundary effects are considered, we still prove the global energy equality provided that u ∈ Lqloc(0, T ; Lp()) for any 1q+1p ≤ 12, with p ≥ 4, and b ∈ Lrloc(0, T ; Ls()) for any 1r+1s ≤ 12, with s ≥ 4 . In particular, compared with the existed results, we do not require any boundary layer assumptions and additional conditions on the pressure P. Our result requires the regularity of boundary ∂ is only Lipschitz which is the minimum requirement to make the boundary condition b· n sense. The proof is based on the important properties of weak solutions of the nonstationary Stokes system and the separate mollification of weak solutions from the boundary effect by considering a non-standard local energy equality and transform the boundary effects into the estimates of the gradient of cut-off functions.