Add to ORKGWe introduce new finite differences schemes to approximate one dimensional dissipative semilinear hyperbolic systems with a BGK structure. Using accurate analytical time-decay properties of the local truncation error, it is possible to design schemes based on standard upwinding schemes, which are increasingly accurate for large times when computing small perturbations of constants asymptotic states
AbstractThe diffusive scaling of many finite-velocity kinetic models leads to a small-relaxation tim...
International audienceWe propose a new scheme for the long time approximation of a diffusion when th...
This paper is a continuation of the work of Joel Smoller, Takaaki Nishida, and David Hoff in analyzi...
We introduce a new class of finite differences schemes to approximate one dimensional dissipative se...
We study finite difference schemes which approximate $2\times 2$ linear one dimensional dissipative ...
We study finite difference schemes which approximate linear one dimensional dissipative hyperbolic s...
AbstractStandard error estimates for approximations to hyperbolic equations are only valid over a fi...
Hyperbolic systems of conservation laws often have diffusive relaxation terms that lead to a small r...
Hyperbolic systems of conservation laws often have diffusive relaxation terms that lead to a small-r...
Hyperbolic systems of conservation laws often have diffusive relaxation terms that lead to a small r...
We discuss finite difference techniques for hyperbolic equations in non-trivial domains, as those th...
AbstractStandard error estimates for approximations to hyperbolic equations are only valid over a fi...
International audienceIt is proved recently that partially dissipative hyperbolic systems converge g...
We study an asymptotic preserving scheme for the temporal discretization of a system of parabolic se...
We study an asymptotic preserving scheme for the temporal discretization of a system of parabolic se...
AbstractThe diffusive scaling of many finite-velocity kinetic models leads to a small-relaxation tim...
International audienceWe propose a new scheme for the long time approximation of a diffusion when th...
This paper is a continuation of the work of Joel Smoller, Takaaki Nishida, and David Hoff in analyzi...
We introduce a new class of finite differences schemes to approximate one dimensional dissipative se...
We study finite difference schemes which approximate $2\times 2$ linear one dimensional dissipative ...
We study finite difference schemes which approximate linear one dimensional dissipative hyperbolic s...
AbstractStandard error estimates for approximations to hyperbolic equations are only valid over a fi...
Hyperbolic systems of conservation laws often have diffusive relaxation terms that lead to a small r...
Hyperbolic systems of conservation laws often have diffusive relaxation terms that lead to a small-r...
Hyperbolic systems of conservation laws often have diffusive relaxation terms that lead to a small r...
We discuss finite difference techniques for hyperbolic equations in non-trivial domains, as those th...
AbstractStandard error estimates for approximations to hyperbolic equations are only valid over a fi...
International audienceIt is proved recently that partially dissipative hyperbolic systems converge g...
We study an asymptotic preserving scheme for the temporal discretization of a system of parabolic se...
We study an asymptotic preserving scheme for the temporal discretization of a system of parabolic se...
AbstractThe diffusive scaling of many finite-velocity kinetic models leads to a small-relaxation tim...
International audienceWe propose a new scheme for the long time approximation of a diffusion when th...
This paper is a continuation of the work of Joel Smoller, Takaaki Nishida, and David Hoff in analyzi...