A systematic procedure for constructing semidiscrete, second order accurate, variation diminishing, five point band width, approximations to scalar conservation laws, is presented. These schemes are constructed to also satisfy a single discrete entropy inequality. Thus, in the convex flux case, convergence is proven to be the unique physically correct solution. For hyperbolic systems of conservation laws, this construction is used formally to extend the first author's first order accurate scheme, and show (under some minor technical hypotheses) that limit solutions satisfy an entropy inequality. Results concerning discrete shocks, a maximum principle, and maximal order of accuracy are obtained. Numerical applications are also presented
Abstract. We consider scalar conservation laws with the spatially varying flux H(x)f(u) + (1 −H(x))g...
Physical solutions to convex scalar conservation laws satisfy a one-sided Lipschitz condition (OSLC)...
Abstract. We consider scalar conservation laws with the spatially varying fluxH(x)f(u)+(1−H(x))g(u),...
Recently there have been numerous advances in the development of numerical algorithms to solve conse...
Summary. For the high-order numerical approximation of hyperbolic systems of conservation laws, we p...
Semi-discrete generalizations of the second order extension of Godunov's scheme, known as the MUSCL ...
We present a streamline diffusion shock capturing spacetime discontinuous Galerkin (DG) method to ap...
A convergence theory for semi-discrete approximations to nonlinear systems of conservation laws is d...
"There is no theory for the initial value problem for compressible flows in two space dimension...
A geometric approach, similar to Van Leer's MUSCL schemes, is used to construct a second-order accur...
Despite the classical well-posedness theorem for entropy weak solutions of scalar conservation laws,...
We present reliable a posteriori estimators for some fully discrete schemes applied to nonlinear sys...
We present a streamline diffusion shock capturing spacetime discontinuous Galerkin (DG) method to ap...
In several papers of Bouchut, Bourdarias, Perthame and Coquel, Le Floch a general methodology has be...
AbstractIn this note, we show that some standard Godunov type schemes cannot be both high-order accu...
Abstract. We consider scalar conservation laws with the spatially varying flux H(x)f(u) + (1 −H(x))g...
Physical solutions to convex scalar conservation laws satisfy a one-sided Lipschitz condition (OSLC)...
Abstract. We consider scalar conservation laws with the spatially varying fluxH(x)f(u)+(1−H(x))g(u),...
Recently there have been numerous advances in the development of numerical algorithms to solve conse...
Summary. For the high-order numerical approximation of hyperbolic systems of conservation laws, we p...
Semi-discrete generalizations of the second order extension of Godunov's scheme, known as the MUSCL ...
We present a streamline diffusion shock capturing spacetime discontinuous Galerkin (DG) method to ap...
A convergence theory for semi-discrete approximations to nonlinear systems of conservation laws is d...
"There is no theory for the initial value problem for compressible flows in two space dimension...
A geometric approach, similar to Van Leer's MUSCL schemes, is used to construct a second-order accur...
Despite the classical well-posedness theorem for entropy weak solutions of scalar conservation laws,...
We present reliable a posteriori estimators for some fully discrete schemes applied to nonlinear sys...
We present a streamline diffusion shock capturing spacetime discontinuous Galerkin (DG) method to ap...
In several papers of Bouchut, Bourdarias, Perthame and Coquel, Le Floch a general methodology has be...
AbstractIn this note, we show that some standard Godunov type schemes cannot be both high-order accu...
Abstract. We consider scalar conservation laws with the spatially varying flux H(x)f(u) + (1 −H(x))g...
Physical solutions to convex scalar conservation laws satisfy a one-sided Lipschitz condition (OSLC)...
Abstract. We consider scalar conservation laws with the spatially varying fluxH(x)f(u)+(1−H(x))g(u),...