High-order centered difference methods with sharp shock resolution

We study centered finite difference methods of general order of accuracy \(2 p\). Boundary points are approximated by one sided operators. We give boundary operators which are stable for the linear advection equation. In cases where the approximation is unstable, we show how stability can be recover

A simple and efficient solution strategy is designed for fluid flows governed by the compressible Euler equations. It is constructed from a stable high-order central finite difference scheme on structured composite adaptive grids. This basic framework is suitable for solving smooth flows on complica

a plethora of problems in computational fluid dynamics that have these characteristics. Examples are the numerical We derive high-order finite difference schemes for the compressible Euler (and Navier-Stokes equations) that satisfy a semidiscrete • Addition of an artificial viscosity term in refine

This paper presents a family of finite difference schemes for the first and second derivatives of smooth functions. The schemes are Hermitian and symmetric and may be considered a more general version of the standard compact (Padé) schemes discussed by Lele. They are different from the standard Padé