Numerical Magnetohydrodynamics in Astrophysics: Algorithm and Tests for One-Dimensional Flow

We describe a numerical code to solve the equations for ideal magnetohydrodynamics (MHD). It is based on an explicit finite difference scheme on an Eulerian grid, called the Total Variation Diminishing (TVD) scheme, which is a second-order-accurate extension of the Roe-type upwind scheme. We also describe a nonlinear Riemann solver for ideal MHD, which includes rarefactions as well as shocks and produces exact solutions for two-dimensional magnetic field structures as well as for the three-dimensional ones. The numerical code and the Riemann solver have been used to test each other. Extensive tests encompassing all the possible ideal MHD structures with planar symmetries (i.e. one-dimensional flows) are presented. These include those for which the field structure is two-dimensional (i.e., those flows often called " 1 + 1/2 dimensional ") as well as those for which the magnetic field plane rotates (i.e.,, those flows often called " 1 + 1/2 + 1/2 dimensional "). Results indicate that the code can resolve strong fast, slow, and magnetosonic shocks within 2-4 cells while more cells are required if shocks become weak. With proper stiffening, rotational discontinuities are resolved within 3-5 cells. Contact discontinuities are also resolved within 3-5 cells with stiffening and 6-8 cells without stiffening, while the stiffening on contact discontinuities in some cases generates numerical oscillations. Tangential discontinuities spread over more than 10 cells. Our tests confirm that slow compound structures with two-dimensional magnetic field are composed of intermediate shocks (so called " 2-4 " intermediate shocks) followed by slow rarefaction waves. Finally, tests demonstrate that in two-dimensional magnetohydrody-namics fast compound structures, which are composed of intermediate shocks (so called " 1-3 " intermediate shocks) preceded by fast rarefaction waves, are also possible.