AbstractGodunov-type methods and other shock capturing schemes can display pathological behavior in certain flow situations. This paper discusses the numerical anomaly associated to slowly moving shocks. We present a series of numerical experiments that illustrate the formation and propagation of this pathology, and allows us to establish some conclusions and question some previous conjectures for the source of the numerical noise. A simple diagnosis on an explicit Steger-Warming scheme shows that some intermediate states in the first time steps deviate from the true direction and contaminate the flow structure. A remedy is presented in the form of a new flux split method with an entropy intermediate state that dissipates the oscillations t...
Shock capturing algorithms are widely used for simulations of compressible fluid flow. Though these ...
We introduce a standardized procedure for benchmarking shock-capturing schemes which is intended to ...
We address a numerical instability that arises in the directionally split computation of hydrodynami...
AbstractGodunov-type methods and other shock capturing schemes can display pathological behavior in ...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/90738/1/AIAA-2011-657-601.pd
We tackle, using the Isothermal Gas Equations, the problem of loss of monotonicity behind slowly mov...
An accurate treatment of shockwaves is critical in computational fluid dynamics ap-plications, becau...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/90691/1/AIAA-2011-3686-771.pd
Numerical simulations of flows with shock waves typically use finite-difference shock-capturing algo...
In problems where shock waves move slowly relative to the grid, numerical errors in density and mome...
The numerical error produced when computing slowly moving shocks in a finite volume framework is stu...
The reliable simulation of shockwaves is critical in the prediction and study of many phenomena, whe...
The overheating problem, first observed by von Neumann [1] and later studied extensively by Noh [2] ...
Among the various numerical schemes developed since the '80s for the computation of the compressible...
The presence of numerical shockwave anomalies appearing in the resolution of hyperbolic systems of c...
Shock capturing algorithms are widely used for simulations of compressible fluid flow. Though these ...
We introduce a standardized procedure for benchmarking shock-capturing schemes which is intended to ...
We address a numerical instability that arises in the directionally split computation of hydrodynami...
AbstractGodunov-type methods and other shock capturing schemes can display pathological behavior in ...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/90738/1/AIAA-2011-657-601.pd
We tackle, using the Isothermal Gas Equations, the problem of loss of monotonicity behind slowly mov...
An accurate treatment of shockwaves is critical in computational fluid dynamics ap-plications, becau...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/90691/1/AIAA-2011-3686-771.pd
Numerical simulations of flows with shock waves typically use finite-difference shock-capturing algo...
In problems where shock waves move slowly relative to the grid, numerical errors in density and mome...
The numerical error produced when computing slowly moving shocks in a finite volume framework is stu...
The reliable simulation of shockwaves is critical in the prediction and study of many phenomena, whe...
The overheating problem, first observed by von Neumann [1] and later studied extensively by Noh [2] ...
Among the various numerical schemes developed since the '80s for the computation of the compressible...
The presence of numerical shockwave anomalies appearing in the resolution of hyperbolic systems of c...
Shock capturing algorithms are widely used for simulations of compressible fluid flow. Though these ...
We introduce a standardized procedure for benchmarking shock-capturing schemes which is intended to ...
We address a numerical instability that arises in the directionally split computation of hydrodynami...