An approximate Riemann solver for relativistic magnetohydrodynamics

To construct numerical schemes of the Godunov type for solving magnetohydrodynamical (MHO) problems, an approximate method of solving the MHD Riemann problem is required in order to calculate the time-averaged fluxes at the interfaces of numerical zones. Such an MHD Riemann solver is presented here

For simplicity we will restrict the following presentation to flows with statistically two space dimensions, i.e., a variable vector W = (ρ, ρU, ρV, ρ E, ρ R 11 , ρ R 22 , ρ R 33 , ρ R 12 ) t , such that we can write the system in matrix-vector notation

In this paper, we adapt to the ideal 1D lagrangian MHD equations a class of numerical schemes of order one in time and space presented in an earlier paper and applied to the gas dynamics system. They use some properties of systems of conservation laws with zero entropy flux which describe fluid mode