Summary. This work presents a unified analysis of Discontinuous Galerkin meth-ods to approximate Friedrichs ’ systems. A general set of boundary conditions is identified to guarantee existence and uniqueness of solutions to these systems. A formulation enforcing the boundary conditions weakly is proposed. This formulation is the starting point for the construction of Discontinuous Galerkin methods formu-lated in terms of boundary operators and of interface operators that mildly penalize interface jumps. A general convergence analysis is presented. The setting is subse-quently specialized to Friedrichs ’ systems endowed with a particular 2×2 structure in which some of the unknowns can be eliminated to yield a system of second-order elliptic-...
Abstract. The embedded discontinuous Galerkin methods are obtained from hybridizable dis-continuous ...
The aim of this project is to study discontinuous Galerkin methods applied to coupled systems of par...
Solutions of Friedrichs systems are in general not of Sobolev regularity and may possess discontinui...
Abstract. This paper is the second part of a work attempting to give a unified analysis of discontin...
Abstract. This paper presents a unified analysis of Discontinuous Galerkin methods to ap-proximate F...
Abstract. This paper is the second part of a work attempting to give a unified analysis of Discontin...
Abstract. We propose a unified discontinuous Petrov–Galerkin (DPG) framework with op-timal test func...
Abstract. We develop the convergence analysis of discontinuous Galerkin finite element approx-imatio...
Solutions of Friedrichs systems are in general not of Sobolev regularity and may possess discontinui...
Solutions of Friedrichs systems are in general not of Sobolev regularity and may possess discontinui...
This work is concerned with the numerical solution of Friedrichs systems by discontinuous Galerkin f...
We present a discontinuous Petrov–Galerkin (DPG) method for the finite element discretization of sec...
We provide a framework for the analysis of a large class of discontinuous methods for second-order e...
We present a Discontinuous Petrov-Galerkin method (DPG) for finite element discretization scheme of ...
We develop the convergence analysis of discontinuous Galerkin finite element approximations to symme...
Abstract. The embedded discontinuous Galerkin methods are obtained from hybridizable dis-continuous ...
The aim of this project is to study discontinuous Galerkin methods applied to coupled systems of par...
Solutions of Friedrichs systems are in general not of Sobolev regularity and may possess discontinui...
Abstract. This paper is the second part of a work attempting to give a unified analysis of discontin...
Abstract. This paper presents a unified analysis of Discontinuous Galerkin methods to ap-proximate F...
Abstract. This paper is the second part of a work attempting to give a unified analysis of Discontin...
Abstract. We propose a unified discontinuous Petrov–Galerkin (DPG) framework with op-timal test func...
Abstract. We develop the convergence analysis of discontinuous Galerkin finite element approx-imatio...
Solutions of Friedrichs systems are in general not of Sobolev regularity and may possess discontinui...
Solutions of Friedrichs systems are in general not of Sobolev regularity and may possess discontinui...
This work is concerned with the numerical solution of Friedrichs systems by discontinuous Galerkin f...
We present a discontinuous Petrov–Galerkin (DPG) method for the finite element discretization of sec...
We provide a framework for the analysis of a large class of discontinuous methods for second-order e...
We present a Discontinuous Petrov-Galerkin method (DPG) for finite element discretization scheme of ...
We develop the convergence analysis of discontinuous Galerkin finite element approximations to symme...
Abstract. The embedded discontinuous Galerkin methods are obtained from hybridizable dis-continuous ...
The aim of this project is to study discontinuous Galerkin methods applied to coupled systems of par...
Solutions of Friedrichs systems are in general not of Sobolev regularity and may possess discontinui...