We tackle, using the Isothermal Gas Equations, the problem of loss of monotonicity behind slowly moving shock waves as computed by Godunov-type schemes. A parameter by which slow-shocks can be detected within a flow-field is presented, along with a modification of Godunov’s scheme that introduces numerical dissipation into the flow to damp the oscillations. We also extend the scheme to second order in smooth flow.CI
An accurate treatment of shockwaves is critical in computational fluid dynamics ap-plications, becau...
International audienceShock capturing procedures are required to stabilise numerical simulations of ...
We consider Large Time Step (LTS) methods, i.e., the explicit finite volume methods not limited by t...
AbstractGodunov-type methods and other shock capturing schemes can display pathological behavior in ...
One of the most important and complex effects in compressible fluid flow simulation is a shock-captu...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/90738/1/AIAA-2011-657-601.pd
The numerical error produced when computing slowly moving shocks in a finite volume framework is stu...
Hyperbolic systems of partial differential equations with relaxation source terms arise in the model...
Application of the Godunov scheme to the Euler equations of gas dynamics based on the Eulerian formu...
In problems where shock waves move slowly relative to the grid, numerical errors in density and mome...
Thesis: S.M., Massachusetts Institute of Technology, Department of Aeronautics and Astronautics, 201...
International audienceThe purpose of this paper is to develop a high-order shock-capturing scheme ca...
International audienceWe present in this paper a new approximate Godunov solver called WFRoe which a...
We are interested in the numerical resolution of hyperbolic systems of conservation laws which don&a...
We study several schemes of rst or second-order accuracy based on kinetic approximations to solve pr...
An accurate treatment of shockwaves is critical in computational fluid dynamics ap-plications, becau...
International audienceShock capturing procedures are required to stabilise numerical simulations of ...
We consider Large Time Step (LTS) methods, i.e., the explicit finite volume methods not limited by t...
AbstractGodunov-type methods and other shock capturing schemes can display pathological behavior in ...
One of the most important and complex effects in compressible fluid flow simulation is a shock-captu...
Peer Reviewedhttp://deepblue.lib.umich.edu/bitstream/2027.42/90738/1/AIAA-2011-657-601.pd
The numerical error produced when computing slowly moving shocks in a finite volume framework is stu...
Hyperbolic systems of partial differential equations with relaxation source terms arise in the model...
Application of the Godunov scheme to the Euler equations of gas dynamics based on the Eulerian formu...
In problems where shock waves move slowly relative to the grid, numerical errors in density and mome...
Thesis: S.M., Massachusetts Institute of Technology, Department of Aeronautics and Astronautics, 201...
International audienceThe purpose of this paper is to develop a high-order shock-capturing scheme ca...
International audienceWe present in this paper a new approximate Godunov solver called WFRoe which a...
We are interested in the numerical resolution of hyperbolic systems of conservation laws which don&a...
We study several schemes of rst or second-order accuracy based on kinetic approximations to solve pr...
An accurate treatment of shockwaves is critical in computational fluid dynamics ap-plications, becau...
International audienceShock capturing procedures are required to stabilise numerical simulations of ...
We consider Large Time Step (LTS) methods, i.e., the explicit finite volume methods not limited by t...