This thesis studies local mesh refinement both in time and space for the second order elastodynamic equation in a high performance computing context. The objective is to develop numerical methods to treat small heterogeneities that have global impact on wave propagation. We use an internal penalty discontinuous Galerkin finite element approach for its flexibity and parallelization capabilities. The elasto-acoustic finite element formulation we discuss is elasto-acoustic in order to handle local acoustic heterogeneities. We also propose an optimized penalty term more suited to the elastodynamic equation that results in better CFL condition. We improve a second order PML formulation with an original time discretization that results in a more ...
The aim of this study is to improve the performances, in terms of memory space and computational tim...
International audienceThis monograph presents numerical methods for solving transient wave equations...
This paper deals with the numerical simulation of the acoustic wave propagation. It is well known to...
Cette thèse étudie le raffinement local de maillage à la fois en espace et en temps pour l’équation ...
The works presented concern the research, the analysis and the implementation of numerical methods f...
We propose and analyze a high-order Discontinuous Galerkin Finite Element Method for the approximate...
We address the spatial discretization of an evolution problem arising from the coupling of elastic a...
We introduce a high order interior penalty discontinuous Galerkin scheme for the nu- merical solutio...
International audienceWe present in this paper the formulation of a non-dissipative arbitrary high o...
In this paper, we introduce a second-order leap-frog time scheme combined with a high-order disconti...
In this work we review discontinuous Galerkin finite element methods on polytopal grids (PolydG) for...
We present a stable discontinuous Galerkin (DG) method with a perfectly matched layer (PML) for thre...
We present a study of elastic wave propagation in isotropic media. The Discontinuous Galerkin Method...
This paper presents a numerical scheme of arbitrary order of accuracy in both space and time, based ...
The aim of this study is to improve the performances, in terms of memory space and computational tim...
International audienceThis monograph presents numerical methods for solving transient wave equations...
This paper deals with the numerical simulation of the acoustic wave propagation. It is well known to...
Cette thèse étudie le raffinement local de maillage à la fois en espace et en temps pour l’équation ...
The works presented concern the research, the analysis and the implementation of numerical methods f...
We propose and analyze a high-order Discontinuous Galerkin Finite Element Method for the approximate...
We address the spatial discretization of an evolution problem arising from the coupling of elastic a...
We introduce a high order interior penalty discontinuous Galerkin scheme for the nu- merical solutio...
International audienceWe present in this paper the formulation of a non-dissipative arbitrary high o...
In this paper, we introduce a second-order leap-frog time scheme combined with a high-order disconti...
In this work we review discontinuous Galerkin finite element methods on polytopal grids (PolydG) for...
We present a stable discontinuous Galerkin (DG) method with a perfectly matched layer (PML) for thre...
We present a study of elastic wave propagation in isotropic media. The Discontinuous Galerkin Method...
This paper presents a numerical scheme of arbitrary order of accuracy in both space and time, based ...
The aim of this study is to improve the performances, in terms of memory space and computational tim...
International audienceThis monograph presents numerical methods for solving transient wave equations...
This paper deals with the numerical simulation of the acoustic wave propagation. It is well known to...