Abstract As an extension of a previous work considering a fully advective formulation on Cartesian meshes, a mass conservative discretization approach is presented here for the shallow water equations, based on discontinuous finite elements on general structured meshes of quadrilaterals. A semi-implicit time integration is performed by employing the TR-BDF2 scheme and is combined with the semi-Lagrangian technique for the momentum equation only. Indeed, in order to simplify the derivation of the discrete linear Helmoltz equation to be solved at each time-step, a non-conservative formulation of the momentum equation is employed. The Eulerian flux form is considered instead for the continuity equation in order to ensure mass c...
We describe fully explicit residual based discretizations of the shallow water equations with fricti...
We investigate the potential of the so-called "relocation" mesh adaptation in terms of resolution an...
An innovating approach is proposed to solve vectorial conservation laws on curved manifolds using th...
Copyright © 2009 Royal Meteorological SocietyFor the shallow-water equations on the sphere, an inher...
A semi-implicit discretization for the shallow water equations is discussed, which uses triangular D...
The article of record as published may be found at https://doi.org/10.1137/070708470A Discontinuous ...
International audienceWe describe an explicit residual based discretization of the Shallow Water equ...
This work focuses on the numerical approximation of the Shallow Water Equations (SWE) using a Lagran...
Financiado para publicación en acceso aberto: Universidade da Coruña/CISUG[Abstract] In this work, a...
A new method for integrating shallow water equations, the contour-advective semi-Lagrangian (CASL) a...
Dans ce projet de recherche, on s'intéresse au développement et à l'évaluation de nouvelles méthodes...
International audienceIn the following lines we propose a numerical scheme for the shallow water sys...
International audienceThe rotating shallow water (RSW) equations are the usual testbed for the devel...
This work considers the Shallow Water equations (SWE) and proposes a high order conservative scheme ...
International audienceWe consider the numerical approximation of the Shallow Water Equations (SWEs) ...
We describe fully explicit residual based discretizations of the shallow water equations with fricti...
We investigate the potential of the so-called "relocation" mesh adaptation in terms of resolution an...
An innovating approach is proposed to solve vectorial conservation laws on curved manifolds using th...
Copyright © 2009 Royal Meteorological SocietyFor the shallow-water equations on the sphere, an inher...
A semi-implicit discretization for the shallow water equations is discussed, which uses triangular D...
The article of record as published may be found at https://doi.org/10.1137/070708470A Discontinuous ...
International audienceWe describe an explicit residual based discretization of the Shallow Water equ...
This work focuses on the numerical approximation of the Shallow Water Equations (SWE) using a Lagran...
Financiado para publicación en acceso aberto: Universidade da Coruña/CISUG[Abstract] In this work, a...
A new method for integrating shallow water equations, the contour-advective semi-Lagrangian (CASL) a...
Dans ce projet de recherche, on s'intéresse au développement et à l'évaluation de nouvelles méthodes...
International audienceIn the following lines we propose a numerical scheme for the shallow water sys...
International audienceThe rotating shallow water (RSW) equations are the usual testbed for the devel...
This work considers the Shallow Water equations (SWE) and proposes a high order conservative scheme ...
International audienceWe consider the numerical approximation of the Shallow Water Equations (SWEs) ...
We describe fully explicit residual based discretizations of the shallow water equations with fricti...
We investigate the potential of the so-called "relocation" mesh adaptation in terms of resolution an...
An innovating approach is proposed to solve vectorial conservation laws on curved manifolds using th...