We present a new third-order central scheme for approximating solutions of systems of conservation laws in one and two space dimensions. In the spirit of Godunov-type schemes, our method is based on reconstructing a piecewise-polynomial interpolant from cell-averages which is then advanced exactly in time
We introduce a family of new second-order Godunov-type central schemes for one-dimensional systems o...
In this work, a new formulation for central schemes based on staggered grids is proposed. It is base...
In this work, a new formulation for central schemes based on staggered grids is proposed. It is bas...
We present a new third-order central scheme for approximating solutions of systems of conservation l...
We present a new third-order central scheme for approximating solutions of systems of conservation l...
Abstract. We present new third- and fifth-order Godunov-type central schemes for approxi-mating solu...
We present the first fourth-order central scheme for two-dimensional hyperbolic systems of conservat...
We present a new third-order essentially non-oscillatory central scheme for approximating solutions ...
We present a family of high-order, essentially non-oscillatory, central schemes for approx- imating ...
We present a new third-order essentially non-oscillatory central scheme for approximating solutions ...
We present a new third-order, semidiscrete, central method for approximating solutions to multidimen...
We present a family of high-resolution, semi-discrete central schemes for hyperbolic systems of cons...
We present a family of high-order, essentially non-oscillatory, central schemes for approximating ...
We present new third- and fifth-order Godunov-type central schemes for approximating solutions of th...
We introduce a family of new second-order Godunov-type central schemes for one-dimensional systems o...
In this work, a new formulation for central schemes based on staggered grids is proposed. It is base...
In this work, a new formulation for central schemes based on staggered grids is proposed. It is bas...
We present a new third-order central scheme for approximating solutions of systems of conservation l...
We present a new third-order central scheme for approximating solutions of systems of conservation l...
Abstract. We present new third- and fifth-order Godunov-type central schemes for approxi-mating solu...
We present the first fourth-order central scheme for two-dimensional hyperbolic systems of conservat...
We present a new third-order essentially non-oscillatory central scheme for approximating solutions ...
We present a family of high-order, essentially non-oscillatory, central schemes for approx- imating ...
We present a new third-order essentially non-oscillatory central scheme for approximating solutions ...
We present a new third-order, semidiscrete, central method for approximating solutions to multidimen...
We present a family of high-resolution, semi-discrete central schemes for hyperbolic systems of cons...
We present a family of high-order, essentially non-oscillatory, central schemes for approximating ...
We present new third- and fifth-order Godunov-type central schemes for approximating solutions of th...
We introduce a family of new second-order Godunov-type central schemes for one-dimensional systems o...
In this work, a new formulation for central schemes based on staggered grids is proposed. It is base...
In this work, a new formulation for central schemes based on staggered grids is proposed. It is bas...