We consider augmented variational formulations for solving the static or time-harmonic Maxwell equations. For that, a term is added to the usual H (curl) conforming formulations. It consists of a (weighted) L2 scalar product between the divergence of the EM and the divergence of test fields. In this respect, the methods we present are H (curl, div) conforming. We also build mixed, augmented variational formulations, with either one or two Lagrange multipli-ers, to dualize the equation on the divergence and, when applicable, the relation on the tangential or normal trace of the field. It is proven that one can derive formulations, which are equivalent to the original static or time-harmonic Max-well equations. In the latter case, spurious mo...
This paper describes an electromagnetic field analogue of the classical Brayton-Moser formulation. I...
A widely used approach for the computation of time-harmonic electromag-netic fields is based on the ...
International audienceA few years ago, Costabel and Dauge proposed a variational setting, which allo...
International audienceWe consider augmented variational formulations for solving the static or time-...
International audienceWe consider the time-harmonic Maxwell's equations with physical parameters, na...
International audienceA few years ago, Costabel and Dauge proposed a variational setting, which allo...
Let Ω ⊂ R2 be a bounded polygonal domain, f ∈ [L2(Ω)]2, and k ≥ 0. Consider the time-harmonic Maxwel...
Abstract. We present a new method of regularizing time harmonic Maxwell equations by a divergence pa...
This book gives a concise introduction to the basic techniques needed for the theoretical analysis o...
AbstractWhen one wants to treat the time-harmonic Maxwell equations with variational methods, one ha...
A new form of time-harmonic Maxwell's equations is developed on the base of the standard ones and pr...
We propose an unfitted finite element method for numerically solving the time-harmonic Maxwell equat...
Variational expressions and saddle-point (or "mini-max") principles for linear problems in electroma...
When div j = 0 and! does not coincide with a resonant frequency, the solution E of the time harmonic...
. We will derive the H(curl; \Omega\Gamma and H(curl; div;\Omega\Gamma variational formulations for...
This paper describes an electromagnetic field analogue of the classical Brayton-Moser formulation. I...
A widely used approach for the computation of time-harmonic electromag-netic fields is based on the ...
International audienceA few years ago, Costabel and Dauge proposed a variational setting, which allo...
International audienceWe consider augmented variational formulations for solving the static or time-...
International audienceWe consider the time-harmonic Maxwell's equations with physical parameters, na...
International audienceA few years ago, Costabel and Dauge proposed a variational setting, which allo...
Let Ω ⊂ R2 be a bounded polygonal domain, f ∈ [L2(Ω)]2, and k ≥ 0. Consider the time-harmonic Maxwel...
Abstract. We present a new method of regularizing time harmonic Maxwell equations by a divergence pa...
This book gives a concise introduction to the basic techniques needed for the theoretical analysis o...
AbstractWhen one wants to treat the time-harmonic Maxwell equations with variational methods, one ha...
A new form of time-harmonic Maxwell's equations is developed on the base of the standard ones and pr...
We propose an unfitted finite element method for numerically solving the time-harmonic Maxwell equat...
Variational expressions and saddle-point (or "mini-max") principles for linear problems in electroma...
When div j = 0 and! does not coincide with a resonant frequency, the solution E of the time harmonic...
. We will derive the H(curl; \Omega\Gamma and H(curl; div;\Omega\Gamma variational formulations for...
This paper describes an electromagnetic field analogue of the classical Brayton-Moser formulation. I...
A widely used approach for the computation of time-harmonic electromag-netic fields is based on the ...
International audienceA few years ago, Costabel and Dauge proposed a variational setting, which allo...