A new reconstruction procedure in central schemes for hyperbolic conservation laws

## 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

We suggest a new technique for the numerical computation of the local residual of nonlinear hyperbolic conservation laws. This techniques relies on a discrete regularization of the numerical data.

Central schemes may serve as universal finite-difference methods for solving nonlinear convection-diffusion equations in the sense that they are not tied to the specific eigenstructure of the problem, and hence can be implemented in a straightforward manner as black-box solvers for general conservat

In this paper, we present a two-step, component-wise TVD scheme for nonlinear, hyperbolic conservation laws, which is obtained by combining the schemes of Mac Cormack and Warming-Beam. The scheme does not necessitate the characteristic decompositions of the usual TVD schemes. It employs component-wi