The time-harmonic Maxwell equations do not have an elliptic nature by themselves. Their regu-larization by a divergence term is a standard tool to obtain equivalent elliptic problems. Nodal finite element discretizations of Maxwell’s equations obtained from such a regularization con-verge to wrong solutions in any non-convex polygon. Modification of the regularization term con-sisting in the introduction of a weight restores the convergence of nodal FEM, providing optimal convergence rates for the h Version of Finite Elements, [21]. We prove exponential convergence of hp FEM for the weighted regularization of Maxwell’s equations in plane polygonal domains provided the hp-FE spaces satisfy a series of axioms. We verify these axioms for sever...
For functions u ∈ H 1(Ω) in an open, bounded polyhedron Ω⊂Rd of dimension d = 1, 2, 3, which are ana...
In this paper, a weighted regularization method for the time-harmonic Maxwell equations with perfect...
We consider the convergence theory of adaptive multigrid methods for second-order elliptic problems ...
Abstract. We present a new method of regularizing time harmonic Maxwell equations by a divergence pa...
The overall efficiency and accuracy of standard finite element methods may be severely reduced if th...
We develop a general convergence analysis for a class of inexact Newton-type regularizations for sta...
The hp version of the finite element method for a one-dimensional, singularly perturbed elliptic-ell...
The emhp/em version of the finite element method for a one dimensional, singularly perturbed ellipti...
AbstractWe prove exponential convergence of the hp-version of discontinuous Galerkin FEM on geometri...
We study approximation properties of hp-finite element subspaces of $oldsymbol{mathsf{H}}(mathop{{ m...
The goal of this paper is to establish exponential convergence of $hp$ -version interior penalty (IP...
We consider a non conforming hp-finite element approximation of a variational formulation of the tim...
Abstract. We investigate the finite element methods for solving time-dependent Maxwell equa-tions wi...
International audienceIn this paper, a weighted regularization method for the time-harmonic Maxwell ...
Edge elements are a popular method to solve Maxwell's equations especially in time-harmonic domain. ...
For functions u ∈ H 1(Ω) in an open, bounded polyhedron Ω⊂Rd of dimension d = 1, 2, 3, which are ana...
In this paper, a weighted regularization method for the time-harmonic Maxwell equations with perfect...
We consider the convergence theory of adaptive multigrid methods for second-order elliptic problems ...
Abstract. We present a new method of regularizing time harmonic Maxwell equations by a divergence pa...
The overall efficiency and accuracy of standard finite element methods may be severely reduced if th...
We develop a general convergence analysis for a class of inexact Newton-type regularizations for sta...
The hp version of the finite element method for a one-dimensional, singularly perturbed elliptic-ell...
The emhp/em version of the finite element method for a one dimensional, singularly perturbed ellipti...
AbstractWe prove exponential convergence of the hp-version of discontinuous Galerkin FEM on geometri...
We study approximation properties of hp-finite element subspaces of $oldsymbol{mathsf{H}}(mathop{{ m...
The goal of this paper is to establish exponential convergence of $hp$ -version interior penalty (IP...
We consider a non conforming hp-finite element approximation of a variational formulation of the tim...
Abstract. We investigate the finite element methods for solving time-dependent Maxwell equa-tions wi...
International audienceIn this paper, a weighted regularization method for the time-harmonic Maxwell ...
Edge elements are a popular method to solve Maxwell's equations especially in time-harmonic domain. ...
For functions u ∈ H 1(Ω) in an open, bounded polyhedron Ω⊂Rd of dimension d = 1, 2, 3, which are ana...
In this paper, a weighted regularization method for the time-harmonic Maxwell equations with perfect...
We consider the convergence theory of adaptive multigrid methods for second-order elliptic problems ...