Accuracy Optimized Methods for Constrained Numerical Solutions of Hyperbolic Conservation Laws

## Abstract In the framework of finite volume approximations to the Euler equations of gas dynamics we introduce computationally cheap difference schemes in addition with efficient discrete filter operators correcting discrete values locally. After presentation of a classical discrete filter algori

## 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

We consider a nonlinear system of conservation laws, which is strictly hyperbolic, genuinely nonlinear in the large, equipped with a convex entropy function and global Riemann invariants. Nevertheless, for such a system of dimension five, it is shown that uniqueness of the similarity solution of a R

## Abstract We examine the existence and regularity results for a scalar conservation law with a convexity condition and solve its weak solution with shocks by using a special method of characterization combined with a representation formula for the weak solution.