Wave propagation problems can be modeled by partial differential equations. In this thesis, we study wave propagation in fluids and in solids, modeled by the acoustic wave equation and the elastic wave equation, respectively. In real-world applications, waves often propagate in heterogeneous media with complex geometries, which makes it impossible to derive exact solutions to the governing equations. Alternatively, we seek approximated solutions by constructing numerical methods and implementing on modern computers. An efficient numerical method produces accurate approximations at low computational cost. There are many choices of numerical methods for solving partial differential equations. Which method is more efficient than the others de...
Wave propagation models are essential in many fields of physics, such as acoustics, electromagnetics...
Discontinuous Galerkin methods are widely used in many practical fields. In this thesis, we focus on...
Several special finite element methods have been proposed to solve Helmholtz problems in the mid-fre...
Wave propagation problems can be modeled by partial differential equations. In this thesis, we study...
We present a study of elastic wave propagation in isotropic media. The Discontinuous Galerkin Method...
This thesis analyzes the computational efficiency of two types of numerical methods: finite differen...
We consider wave propagation in a coupled fluid-solid region separated by a static but possibly curv...
We present the recent development of hybridizable and embedded discontinuous Galerkin (DG) methods f...
International audienceThis monograph presents numerical methods for solving transient wave equations...
We present a study of elastic wave propagation in heterogeneous media. The Discontinuous Galerkin Me...
The propagation of electromagnetic waves can be studied by solving Maxwell’s equations. Similarly, ...
International audienceIn the context of time harmonic acoustic wave propagation, the Discontinuous G...
In this work we review discontinuous Galerkin finite element methods on polytopal grids (PolydG) for...
In this report, we study the hybridizable discontinuous Galerkin (HDG) method for the resolution of ...
We address the spatial discretization of an evolution problem arising from the coupling of elastic a...
Wave propagation models are essential in many fields of physics, such as acoustics, electromagnetics...
Discontinuous Galerkin methods are widely used in many practical fields. In this thesis, we focus on...
Several special finite element methods have been proposed to solve Helmholtz problems in the mid-fre...
Wave propagation problems can be modeled by partial differential equations. In this thesis, we study...
We present a study of elastic wave propagation in isotropic media. The Discontinuous Galerkin Method...
This thesis analyzes the computational efficiency of two types of numerical methods: finite differen...
We consider wave propagation in a coupled fluid-solid region separated by a static but possibly curv...
We present the recent development of hybridizable and embedded discontinuous Galerkin (DG) methods f...
International audienceThis monograph presents numerical methods for solving transient wave equations...
We present a study of elastic wave propagation in heterogeneous media. The Discontinuous Galerkin Me...
The propagation of electromagnetic waves can be studied by solving Maxwell’s equations. Similarly, ...
International audienceIn the context of time harmonic acoustic wave propagation, the Discontinuous G...
In this work we review discontinuous Galerkin finite element methods on polytopal grids (PolydG) for...
In this report, we study the hybridizable discontinuous Galerkin (HDG) method for the resolution of ...
We address the spatial discretization of an evolution problem arising from the coupling of elastic a...
Wave propagation models are essential in many fields of physics, such as acoustics, electromagnetics...
Discontinuous Galerkin methods are widely used in many practical fields. In this thesis, we focus on...
Several special finite element methods have been proposed to solve Helmholtz problems in the mid-fre...