This paper is concerned with the construction of high order schemes on irregular grids for balance laws, including a discussion of an a-posteriori error indicator based on the numerical entropy production. We also impose well-balancing on non uniform grids for the shallow water equations, which can be extended similarly to other balance laws, obtaining schemes up to fourth order of accuracy with very weak assumptions on the regularity of the grid. Our results show the expected convergence rates, the correct propagation of shocks across grid discontinuities and demonstrate the improved resolution achieved with a locally refined non-uniform grid. The schemes proposed in this work naturally can also be applied to systems of conservation laws. ...
We present a first order scheme based on a staggered grid for the shallow water equations with topog...
Abstract. This paper is the third of a series in which a general theory of a priori error estimates ...
We propose an adaptive numerical scheme for hyperbolic conservation laws based on the numerical dens...
This paper is concerned with the construction of high order schemes on irregular grids for balance l...
We propose an a-posteriori error/smoothness indicator for standard semi- discrete finite volume sche...
In this work we propose a novel strategy to define high-order fully well-balanced Lagrange-Projectio...
International audienceIn this work we propose a novel strategy to define high-order fully well-balan...
A numerical scheme for the entropy of the one dimensional shallow water wave equations is presented....
In this paper we propose a high order DGSEM formulation for balance laws which embeds a general well...
In some previous works, two of the authors introduced a technique to design high-order numerical met...
We extend the entropy stable high order nodal discontinuous Galerkin spectral element approximation ...
A well-designed numerical method for the shallow water equations (SWE) should ensure well-balancedne...
This thesis presents the construction, the analysis and the verication of compact residual discretiz...
Numerical entropy production can be used as a smoothness indicator of solutions to conservation laws...
We present a first order scheme based on a staggered grid for the shallow water equations with topog...
Abstract. This paper is the third of a series in which a general theory of a priori error estimates ...
We propose an adaptive numerical scheme for hyperbolic conservation laws based on the numerical dens...
This paper is concerned with the construction of high order schemes on irregular grids for balance l...
We propose an a-posteriori error/smoothness indicator for standard semi- discrete finite volume sche...
In this work we propose a novel strategy to define high-order fully well-balanced Lagrange-Projectio...
International audienceIn this work we propose a novel strategy to define high-order fully well-balan...
A numerical scheme for the entropy of the one dimensional shallow water wave equations is presented....
In this paper we propose a high order DGSEM formulation for balance laws which embeds a general well...
In some previous works, two of the authors introduced a technique to design high-order numerical met...
We extend the entropy stable high order nodal discontinuous Galerkin spectral element approximation ...
A well-designed numerical method for the shallow water equations (SWE) should ensure well-balancedne...
This thesis presents the construction, the analysis and the verication of compact residual discretiz...
Numerical entropy production can be used as a smoothness indicator of solutions to conservation laws...
We present a first order scheme based on a staggered grid for the shallow water equations with topog...
Abstract. This paper is the third of a series in which a general theory of a priori error estimates ...
We propose an adaptive numerical scheme for hyperbolic conservation laws based on the numerical dens...