In problems where shock waves move slowly relative to the grid, numerical errors in density and momentum may occur at the shock and propagate downstream, thereby con-taminating the solution. These errors are analyzed in the present work and a fix is pro-posed. The errors are divided into two classes: start-up errors and post-shock oscillations. It is shown that a traveling wave analysis of the isothermal Euler equations describes the spike formation in the momentum for the first-order accurate Lax-Friedrichs solver very well. By smearing the density and momentum profiles appropriately, the corresponding downstream-propagating wave can be removed. The post-shock oscillations have been characterized; as a fix for this problem, a lower bound o...
Current shock-capturing techniques for high-order discontinuous finite element methods based on moda...
AbstractHighly accurate shock wave problems are presented using a combination of numerical technique...
Numerical simulations of flows with shock waves typically use finite-difference shock-capturing algo...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/90738/1/AIAA-2011-657-601.pd
An accurate treatment of shockwaves is critical in computational fluid dynamics ap-plications, becau...
The numerical error produced when computing slowly moving shocks in a finite volume framework is stu...
AbstractGodunov-type methods and other shock capturing schemes can display pathological behavior in ...
We tackle, using the Isothermal Gas Equations, the problem of loss of monotonicity behind slowly mov...
Thesis: S.M., Massachusetts Institute of Technology, Department of Aeronautics and Astronautics, 201...
In this paper, we propose a simple and efficient shock-fitting solution algorithm for the LWR model ...
A common perspective on the numerical solution of the equation Euler equations for shock physics is ...
In solving steady-state problems (governed by the Euler equations) with unsteady solution process, e...
The presence of numerical shockwave anomalies appearing in the resolution of hyperbolic systems of c...
High-order methods that can resolve interactions of flow-disturbances with shock waves are critical ...
Abstract: The accuracy of the discontinuous Galerkin method of higher-order accuracy on sm...
Current shock-capturing techniques for high-order discontinuous finite element methods based on moda...
AbstractHighly accurate shock wave problems are presented using a combination of numerical technique...
Numerical simulations of flows with shock waves typically use finite-difference shock-capturing algo...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/90738/1/AIAA-2011-657-601.pd
An accurate treatment of shockwaves is critical in computational fluid dynamics ap-plications, becau...
The numerical error produced when computing slowly moving shocks in a finite volume framework is stu...
AbstractGodunov-type methods and other shock capturing schemes can display pathological behavior in ...
We tackle, using the Isothermal Gas Equations, the problem of loss of monotonicity behind slowly mov...
Thesis: S.M., Massachusetts Institute of Technology, Department of Aeronautics and Astronautics, 201...
In this paper, we propose a simple and efficient shock-fitting solution algorithm for the LWR model ...
A common perspective on the numerical solution of the equation Euler equations for shock physics is ...
In solving steady-state problems (governed by the Euler equations) with unsteady solution process, e...
The presence of numerical shockwave anomalies appearing in the resolution of hyperbolic systems of c...
High-order methods that can resolve interactions of flow-disturbances with shock waves are critical ...
Abstract: The accuracy of the discontinuous Galerkin method of higher-order accuracy on sm...
Current shock-capturing techniques for high-order discontinuous finite element methods based on moda...
AbstractHighly accurate shock wave problems are presented using a combination of numerical technique...
Numerical simulations of flows with shock waves typically use finite-difference shock-capturing algo...