International audienceIn this paper, a weighted regularization method for the time-harmonic Maxwell equations with perfect conducting or impedance boundary condition in composite materials is presented. The computational domain Ω is the union of polygonal or polyhedral subdomains made of different materials. As a result, the electromagnetic field presents singularities near geometric singularities, which are the interior and exterior edges and corners. The variational formulation of the weighted regularized problem is given on the subspace of H(curl;Ω) whose fields u satisfy wα div(εu) ∈ L 2(Ω) and have vanishing tangential trace or tangential trace in L2(δΩ). The weight function w(x) is equivalent to the distance of x to the geometric sing...
International audienceIt is well known that in the case of a regular domain the solution of the time...
International audienceThe main purpose of this article is to study the two-scale behavior of the ele...
The focus of this paper is the study of the regularity properties of the time harmonic Maxwell's equ...
In this paper, a weighted regularization method for the time-harmonic Maxwell equations with perfect...
Abstract. We present a new method of regularizing time harmonic Maxwell equations by a divergence pa...
The problem consists in finding the non-zero frequencies ω> 0 such that there exists an electroma...
AbstractIn this paper, a discontinuous Galerkin method for the two-dimensional time-harmonic Maxwell...
Thèse déposée le 8 Septembre 2005Maxwell equations are easily solved when the computational domain i...
The time-harmonic Maxwell equations do not have an elliptic nature by themselves. Their regu-larizat...
The overall efficiency and accuracy of standard finite element methods may be severely reduced if th...
International audienceWe consider the time-harmonic Maxwell's equations with physical parameters, na...
Abstract. In a meta-material, the electric permittivity and/or the magnetic permeability can be nega...
Summary. We address the computation by finite elements of the non-zero eigenvalues of the (curl, cur...
©2018 IEEE. Personal use of this material is permitted. Permission from IEEE must be obtained for al...
International audienceThe purpose of this article is to study behavior of the electromagnetic field ...
International audienceIt is well known that in the case of a regular domain the solution of the time...
International audienceThe main purpose of this article is to study the two-scale behavior of the ele...
The focus of this paper is the study of the regularity properties of the time harmonic Maxwell's equ...
In this paper, a weighted regularization method for the time-harmonic Maxwell equations with perfect...
Abstract. We present a new method of regularizing time harmonic Maxwell equations by a divergence pa...
The problem consists in finding the non-zero frequencies ω> 0 such that there exists an electroma...
AbstractIn this paper, a discontinuous Galerkin method for the two-dimensional time-harmonic Maxwell...
Thèse déposée le 8 Septembre 2005Maxwell equations are easily solved when the computational domain i...
The time-harmonic Maxwell equations do not have an elliptic nature by themselves. Their regu-larizat...
The overall efficiency and accuracy of standard finite element methods may be severely reduced if th...
International audienceWe consider the time-harmonic Maxwell's equations with physical parameters, na...
Abstract. In a meta-material, the electric permittivity and/or the magnetic permeability can be nega...
Summary. We address the computation by finite elements of the non-zero eigenvalues of the (curl, cur...
©2018 IEEE. Personal use of this material is permitted. Permission from IEEE must be obtained for al...
International audienceThe purpose of this article is to study behavior of the electromagnetic field ...
International audienceIt is well known that in the case of a regular domain the solution of the time...
International audienceThe main purpose of this article is to study the two-scale behavior of the ele...
The focus of this paper is the study of the regularity properties of the time harmonic Maxwell's equ...