An adaptive wavelet viscosity method for hyperbolic conservation laws

We present and analyze the performance of a nonlinear, upwind flux split method for approximating solutions of hyperbolic conservation laws. The method is based on a new version of the single-state-approximate Riemann solver devised by Harten, Lax, and van Leer (HLL) and implemented by Einfeldt. It

In this paper, a class of essentially conservative scheme are constructed and analyzed. The numerical tests and theoretical analysis show that although these schemes can not be written in the usual conservation form, but the numerical solutions obtained with these schemes can converge, as the mesh s

A class of wave propagation algorithms for three-dimensional conservation laws and other hyperbolic systems is developed. These unsplit finite-volume methods are based on solving one-dimensional Riemann problems at the cell interfaces and applying flux-limiter functions to suppress oscillations aris

## Abstract The paper describes the use of numerical methods for hyperbolic conservation laws as an __embedded turbulence modelling__ approach. Different Godunov‐type schemes are utilized in computations of Burgers' turbulence and a two‐dimensional mixing layer. The schemes include a total variatio