The purpose of this work is to point out the relevance of the Rankine-Hugoniot jump relations regarding the numerical solution of the inviscid shallow water equations. To arrive at physically relevant solutions in rapidly varied flow, it is of crucial importance that continuity of mass flux and momentum flux across a steady discontinuity is fulfilled at the discrete level. By adopting this viewpoint, finite difference schemes can be studied that may be well suited to solve shallow water flow problems involving discontinuities, while they are not based on a characteristic decomposition of the governed hyperbolic equations. Three schemes on staggered grids with either the water level or the water depth at the cell centre and the flow velocity...
Abstract. In this paper, we propose implicit and semi-implicit schemes for the barotropic Euler equa...
Modelling of wave motion in a fluid is usually based on classical systems which are obtained by the ...
The motion of an initially quiescent shallow layer of fluid within an impulsively tilted flume is mo...
The purpose of this work is to point out the relevance of the Rankine-Hugoniot jump relations regard...
This paper provides a rationale for the commonly observed numerical efficiency of staggered C-grid d...
Finite volume methods have proven themselves a powerful tool for finding solutions to the shallow wa...
Unstructured grid models are receiving increased attention mainly because of their ability to provid...
International audienceUnstructured grid models are receiving increased attention mainly because of t...
International audienceWe present a first order scheme based on a staggered grid for the shallow wate...
When designing a numerical scheme for the resolution of conservation laws, the selection of a partic...
Riemann problems at geometric discontinuities are a classic and fascinating topic of hydraulics. In ...
International audienceIn this work we focus on the development and analysis of staggered schemes for...
Abstract. In this paper, we propose implicit and semi-implicit schemes for the barotropic Euler equa...
Modelling of wave motion in a fluid is usually based on classical systems which are obtained by the ...
The motion of an initially quiescent shallow layer of fluid within an impulsively tilted flume is mo...
The purpose of this work is to point out the relevance of the Rankine-Hugoniot jump relations regard...
This paper provides a rationale for the commonly observed numerical efficiency of staggered C-grid d...
Finite volume methods have proven themselves a powerful tool for finding solutions to the shallow wa...
Unstructured grid models are receiving increased attention mainly because of their ability to provid...
International audienceUnstructured grid models are receiving increased attention mainly because of t...
International audienceWe present a first order scheme based on a staggered grid for the shallow wate...
When designing a numerical scheme for the resolution of conservation laws, the selection of a partic...
Riemann problems at geometric discontinuities are a classic and fascinating topic of hydraulics. In ...
International audienceIn this work we focus on the development and analysis of staggered schemes for...
Abstract. In this paper, we propose implicit and semi-implicit schemes for the barotropic Euler equa...
Modelling of wave motion in a fluid is usually based on classical systems which are obtained by the ...
The motion of an initially quiescent shallow layer of fluid within an impulsively tilted flume is mo...