Add to ORKGPositivity preserving property of first and higher order finite volume schemes for one and two dimensional compressible Euler equations of gas dynamics is considered. A general framework is established which shows the positivity of density and pressure whenever the underlying one dimensional first order building block based on exact or approximate Riemann solver and the reconstruction are both positivity preserving. Appropriate limitation to achieve high order positivity preserving reconstruction is described
Numerical schemes for fluid flows must preserve the positivity of density and pressure. This is a we...
High-order entropy stable schemes are a popular method used in simulations with the compressible Eul...
Numerical schemes for fluid flows must preserve the positivity of density and pressure. This is a we...
International audienceWhen one solves PDEs modelling physical phenomena, it is of great importance t...
International audienceWhen one solves PDEs modelling physical phenomena, it is of great importance t...
International audienceWhen one solves PDEs modelling physical phenomena, it is of great importance t...
International audienceOne of the main issues in the field of numerical schemes is to ally robustness...
International audienceThis paper is the second part of a series of two. It follows [44], in which th...
High-order entropy-stable discontinuous Galerkin methods for the compressible Euler and Navier-Stoke...
International audienceThe present work deals with the establishment of stability conditions of finit...
International audienceThe present work deals with the establishment of stability conditions of finit...
International audienceThe present work deals with the establishment of stability conditions of finit...
International audienceThe present work deals with the establishment of stability conditions of finit...
International audienceThe present work deals with the establishment of stability conditions of finit...
In several papers of Bouchut, Bourdarias, Perthame and Coquel, Le Floch a general methodology has be...
Numerical schemes for fluid flows must preserve the positivity of density and pressure. This is a we...
High-order entropy stable schemes are a popular method used in simulations with the compressible Eul...
Numerical schemes for fluid flows must preserve the positivity of density and pressure. This is a we...
International audienceWhen one solves PDEs modelling physical phenomena, it is of great importance t...
International audienceWhen one solves PDEs modelling physical phenomena, it is of great importance t...
International audienceWhen one solves PDEs modelling physical phenomena, it is of great importance t...
International audienceOne of the main issues in the field of numerical schemes is to ally robustness...
International audienceThis paper is the second part of a series of two. It follows [44], in which th...
High-order entropy-stable discontinuous Galerkin methods for the compressible Euler and Navier-Stoke...
International audienceThe present work deals with the establishment of stability conditions of finit...
International audienceThe present work deals with the establishment of stability conditions of finit...
International audienceThe present work deals with the establishment of stability conditions of finit...
International audienceThe present work deals with the establishment of stability conditions of finit...
International audienceThe present work deals with the establishment of stability conditions of finit...
In several papers of Bouchut, Bourdarias, Perthame and Coquel, Le Floch a general methodology has be...
Numerical schemes for fluid flows must preserve the positivity of density and pressure. This is a we...
High-order entropy stable schemes are a popular method used in simulations with the compressible Eul...
Numerical schemes for fluid flows must preserve the positivity of density and pressure. This is a we...