Relaxation WENO schemes for multidimensional hyperbolic systems of conservation laws

We explore how the weighted average flux approach can be used to generate first-and second-order accurate finite volume schemes order accuracy can be achieved by solving the conventional for the linear advection equatons in one, two, and three space dipiecewise constant Riemann problem as in the fir

was studied by Hsiao and Liu [22] who showed that its solutions exhibit a long-time behavior governed by Hyperbolic systems often have relaxation terms that give them a partially conservative form and that lead to a long-time behavior governed by reduced systems that are parabolic in nature. In this

## Abstract We present a family of central‐upwind schemes on general triangular grids for solving two‐dimensional systems of conservation laws. The new schemes enjoy the main advantages of the Godunov‐type central schemes—simplicity, universality, and robustness and can be applied to problems with

## Abstract In this paper, we will give BV‐estimates of Lax–Friedrichs' scheme for a simple hyperbolic system of conservation laws with relaxation and get the global existence and uniqueness of BV‐solution by the BV‐estimates above. Furthermore, our results show that the solution converge towards t

All linear hyperbolic systerns of two conservation laws can be transformed to essentially one prototype system. This system can be identified with the Weyl equation of relativistic quantum mechanics. We derive a wave model for this equation and compare the resulting fluctuation splitting scheme with