We consider the numerical approximation of the Shallow Water Equations (SWEs) in spherical geometry for oceanographic applications. To provide enhanced resolution of moving fronts present in the flow we consider adaptive discrete approximations on moving triangulations of the sphere. To this end, we restate all Arbitrary Lagrangian Eulerian (ALE) transport formulas, as well as the volume transformation laws, for a 2D manifold. Using these results, we write the set of ALE-SWEs on the sphere. We then propose a Residual Distribution discrete approximation of the governing equations. Classical properties as the DGCL and the C-property (well balancedness) are reformulated in this more general context. An adaptive mesh movement strategy is propos...
This article investigates the potential for an r-adaptation algorithm to improve the efficiency of s...
In this article we introduce a well-balanced discontinuous Galerkin method for the shallow water equ...
A structure-preserving discretization of the shallow-water equations on unstructured spherical grids...
International audienceWe consider the numerical approximation of the Shallow Water Equations (SWEs) ...
International audienceWe consider the numerical approximation of the Shallow Water Equations (SWEs) ...
We investigate the potential of the so-called "relocation" mesh adaptation in terms of resolution an...
In the first part of this talk, I discuss the generation of meshes adapted to a prescribed scalar 'm...
In the presented work the shallow water equations are derived in detail and their properties are pre...
We propose a well-balanced stable generalized Riemann problem (GRP) scheme for the shallow water equ...
In this thesis we implement the Shallow Water equations (SWEs) on unstructured grids in order to sim...
This paper extends an adaptive moving mesh method to multi-dimensional shallow water equations (SWE)...
In this work we consider an efficient discretization of the Shallow Water Equations in spherical geo...
The accurate representation of geostrophic balance is an essential requirement for numerical modelli...
International audienceThis article investigates the potential for an r-adaptation algorithm to impro...
This thesis describes the adaptive shallow water model PLASMA-FEMmE. It solves on the sphere the sha...
This article investigates the potential for an r-adaptation algorithm to improve the efficiency of s...
In this article we introduce a well-balanced discontinuous Galerkin method for the shallow water equ...
A structure-preserving discretization of the shallow-water equations on unstructured spherical grids...
International audienceWe consider the numerical approximation of the Shallow Water Equations (SWEs) ...
International audienceWe consider the numerical approximation of the Shallow Water Equations (SWEs) ...
We investigate the potential of the so-called "relocation" mesh adaptation in terms of resolution an...
In the first part of this talk, I discuss the generation of meshes adapted to a prescribed scalar 'm...
In the presented work the shallow water equations are derived in detail and their properties are pre...
We propose a well-balanced stable generalized Riemann problem (GRP) scheme for the shallow water equ...
In this thesis we implement the Shallow Water equations (SWEs) on unstructured grids in order to sim...
This paper extends an adaptive moving mesh method to multi-dimensional shallow water equations (SWE)...
In this work we consider an efficient discretization of the Shallow Water Equations in spherical geo...
The accurate representation of geostrophic balance is an essential requirement for numerical modelli...
International audienceThis article investigates the potential for an r-adaptation algorithm to impro...
This thesis describes the adaptive shallow water model PLASMA-FEMmE. It solves on the sphere the sha...
This article investigates the potential for an r-adaptation algorithm to improve the efficiency of s...
In this article we introduce a well-balanced discontinuous Galerkin method for the shallow water equ...
A structure-preserving discretization of the shallow-water equations on unstructured spherical grids...