Structure-preserving Finite Element Methods for Stationary MHD Models

Abstract

In this paper, we develop a class of mixed finite element scheme for stationary magnetohydrodynamics (MHD) models, using magnetic field B and current density j as the discretization variables. We show that the Gauss's law for the magnetic field, namely ∇·B=0, and the energy law for the entire system are exactly preserved in the finite element schemes. Based on some new basic estimates for Hh(div), we show that the new finite element scheme is well-posed. Furthermore, we show the existence of solutions to the nonlinear problems and the convergence of Picard iterations and finite element methods under some conditions.