In this short paper, we intend to describe one way to construct arbitrarily high order kinetic schemes on regular meshes. The method can be arbitrarily high order in space and time, run at least CFL one, is asymptotic preserving and computationally explicit, i.e., the computational costs are of the same order of a fully explicit scheme. We also introduce a nonlinear stability method that enables to simulate problems with discontinuities, and it does not kill the accuracy for smooth regular solutions
A simple second-order scheme on Cartesian grids for kinetic equations is presented, with emphasis on...
In this paper we present and implement the Palindromic Discontinuous Galerkin (PDG) method in dimens...
International audienceIn this paper we present and implement the Palindromic Discontinuous Galerkin ...
In this short paper, we intend to describe one way to construct arbitrarily high order kinetic schem...
We investigate a high-order, fully explicit, asymptotic-preserving scheme for a kinetic equation wit...
International audienceWe investigate a high-order, fully explicit, asymptotic-preserving scheme for ...
We present a class of arbitrarily high order fully explicit kinetic numerical methods in compressibl...
high-order asymptotic-preserving scheme for kinetic equations using projective integratio
We study a projective integration scheme for a kinetic equation in both the diffusive and hydrodynam...
In this note we discuss the construction of high order asymptotic preserving numerical schemes for t...
We present a high order scheme for approximating kinetic equations with stiff relaxation. The object...
In this paper, we propose a general framework to design asymptotic preserving schemes for the Boltzm...
We consider the development of high order asymptotic-preserving linear multistep methods for kinetic...
International audienceIn this paper, we consider the numerical approximation of hyperbolic systems o...
We propose a new parallel Discontinuous Galerkin method for the approximation of hyperbolic systems ...
A simple second-order scheme on Cartesian grids for kinetic equations is presented, with emphasis on...
In this paper we present and implement the Palindromic Discontinuous Galerkin (PDG) method in dimens...
International audienceIn this paper we present and implement the Palindromic Discontinuous Galerkin ...
In this short paper, we intend to describe one way to construct arbitrarily high order kinetic schem...
We investigate a high-order, fully explicit, asymptotic-preserving scheme for a kinetic equation wit...
International audienceWe investigate a high-order, fully explicit, asymptotic-preserving scheme for ...
We present a class of arbitrarily high order fully explicit kinetic numerical methods in compressibl...
high-order asymptotic-preserving scheme for kinetic equations using projective integratio
We study a projective integration scheme for a kinetic equation in both the diffusive and hydrodynam...
In this note we discuss the construction of high order asymptotic preserving numerical schemes for t...
We present a high order scheme for approximating kinetic equations with stiff relaxation. The object...
In this paper, we propose a general framework to design asymptotic preserving schemes for the Boltzm...
We consider the development of high order asymptotic-preserving linear multistep methods for kinetic...
International audienceIn this paper, we consider the numerical approximation of hyperbolic systems o...
We propose a new parallel Discontinuous Galerkin method for the approximation of hyperbolic systems ...
A simple second-order scheme on Cartesian grids for kinetic equations is presented, with emphasis on...
In this paper we present and implement the Palindromic Discontinuous Galerkin (PDG) method in dimens...
International audienceIn this paper we present and implement the Palindromic Discontinuous Galerkin ...