Composite high resolution localized relaxation scheme based on upwinding for hyperbolic conservation laws

The present paper is a sequel to two previous papers in which rigorous, up to fourth-order, fully discrete (FD) upwind TVD schemes have been presented. In this paper we discuss in detail the extension of these schemes to solutions of non-linear hyperbolic systems. The performance of the schemes is a

This paper was a landmark; it introduced a new design main features of such a flow are recognizable in the numerical results presented. Subsequently, much effort was de-principle-total variation diminishing schemes-that led, in Harten's hands, and subsequently in the hands of others, voted by others

## 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

Fey's Method of Transport (MoT ) is a multidimensional flux-vector-splitting scheme for systems of conservation laws. Similarly to its one-dimensional forerunner, the Steger-Warming scheme, and several other upwind finite-difference schemes, the MoT suffers from an inconsistency at sonic points when