An integro-differential formulation for magnetic induction in bounded domains: Boundary element--finite volume method (Q598163)

This paper is concerned with the numerical resolution of MHD problems in bounded domains. An integral formulation is used on the boundary where the magnetic field has a global nature, and it is combined with a local discretization inside the domain. It is observed that to couple finite volumes with boundary elements allows a formulation of the global boundary conditions in arbitrary geometries that provides a convenient method for parallel computation. Finally, some examples of magnetic diffusion problems in a sphere as well as in a finite cylinder are presented.