Abstract. We propose a unified discontinuous Petrov–Galerkin (DPG) framework with op-timal test functions for Friedrichs-like systems, which embrace a large class of elliptic, parabolic, and hyperbolic partial differential equations (PDEs). The well-posedness, i.e., existence, uniqueness, and stability, of the DPG solution is established on a single abstract DPG formulation, and two abstract DPG methods corresponding to two different, but equivalent, norms are devised. We then apply the single DPG framework to several linear(ized) PDEs including, but not limited to, scalar transport, Laplace, diffusion, convection-diffusion, convection-diffusion-reaction, linear(ized) contin-uum mechanics (e.g., linear(ized) elasticity, a version of lineari...
In this thesis, we consider the discretization of two different PDE which govern physical phenomenon...
International audienceThe Trefftz discontinuous Galerkin (TDG) method provides natural well-balanced...
Many nonequilibrium phenomena are spatially extended, and the most popular means to model them is th...
Abstract. This paper is an attempt in seeking a connection between the discontinuous Petrov– Galerki...
Summary. This work presents a unified analysis of Discontinuous Galerkin meth-ods to approximate Fri...
Abstract. This paper is the second part of a work attempting to give a unified analysis of discontin...
Abstract. This paper is the second part of a work attempting to give a unified analysis of Discontin...
We apply the discontinuous Petrov-Galerkin (DPG) method to linear acoustic waves in space and time u...
This work is concerned with the numerical solution of Friedrichs systems by discontinuous Galerkin “...
In these lectures, we will give a general introduction to the discontinuous Galerkin (DG) methods fo...
We study weak solutions and its approximation of hyperbolic linear symmetric Friedrichs systems desc...
In this paper, we design some efficient domain decomposition preconditioners for the discontinuous P...
We study weak solutions and its approximation of hyperbolic linear symmetric Friedrichs systems desc...
We revisit the finite element analysis of convection-dominated flow problems within the recently dev...
In this paper we will review a recent emerging paradigm shift in the construction and analysis of hi...
In this thesis, we consider the discretization of two different PDE which govern physical phenomenon...
International audienceThe Trefftz discontinuous Galerkin (TDG) method provides natural well-balanced...
Many nonequilibrium phenomena are spatially extended, and the most popular means to model them is th...
Abstract. This paper is an attempt in seeking a connection between the discontinuous Petrov– Galerki...
Summary. This work presents a unified analysis of Discontinuous Galerkin meth-ods to approximate Fri...
Abstract. This paper is the second part of a work attempting to give a unified analysis of discontin...
Abstract. This paper is the second part of a work attempting to give a unified analysis of Discontin...
We apply the discontinuous Petrov-Galerkin (DPG) method to linear acoustic waves in space and time u...
This work is concerned with the numerical solution of Friedrichs systems by discontinuous Galerkin “...
In these lectures, we will give a general introduction to the discontinuous Galerkin (DG) methods fo...
We study weak solutions and its approximation of hyperbolic linear symmetric Friedrichs systems desc...
In this paper, we design some efficient domain decomposition preconditioners for the discontinuous P...
We study weak solutions and its approximation of hyperbolic linear symmetric Friedrichs systems desc...
We revisit the finite element analysis of convection-dominated flow problems within the recently dev...
In this paper we will review a recent emerging paradigm shift in the construction and analysis of hi...
In this thesis, we consider the discretization of two different PDE which govern physical phenomenon...
International audienceThe Trefftz discontinuous Galerkin (TDG) method provides natural well-balanced...
Many nonequilibrium phenomena are spatially extended, and the most popular means to model them is th...