Abstract. In this article, we are interested in the mathematical modeling of singular electromagnetic fields, in a non-convex polyhedral domain. We first describe the local trace (i. e. defined on a face) of the normal derivative of an L2 function, with L2 Laplacian. Among other things, this allows us to describe dual singularities of the Laplace problem with homogeneous Neumann bound-ary condition. We then provide generalized integration by parts formulae for the Laplace, divergence and curl operators. With the help of these results, one can split electromagnetic fields into regular and singular parts, which are then characterized. We also study the particular case of divergence-free and curl-free fields, and provide non-orthogonal decompo...
The research work done by several authors in order to incorporate the edge conditions in the numeric...
The problem of the electromagnetic field an open spiral conductive sphere is analyzing. The method o...
Abstract—In the first part of this work we show that, by working in Fourier space, the Bohren decomp...
International audienceIn a non-convex polyhedral domain, we describe the local trace (i.e. defined o...
International audienceIt is well known that in the case of a regular domain the solution of the time...
The solution fields of Maxwell’s equations are known to exhibit singularities near corners, crack ti...
International audienceAn original approach of the singular complement method for Maxwell's equations...
We study the regularity of the solution of the regularized electric Maxwell problem in a polygonal d...
Summary. We address the computation by finite elements of the non-zero eigenvalues of the (curl, cur...
We consider the time-harmonic eddy current problem in its electric formulation where the conductor i...
This dissertation presents new singular curl- and divergence- conforming vector bases that incorpora...
Thèse déposée le 8 Septembre 2005Maxwell equations are easily solved when the computational domain i...
International audienceIn this paper, the mathematical tools, which are required to solve the axisymm...
We propose a new numerical method to compute the singular solution of the Maxwell equations in axisy...
International audienceIn this article, we study the static and time-dependent Maxwell equations in a...
The research work done by several authors in order to incorporate the edge conditions in the numeric...
The problem of the electromagnetic field an open spiral conductive sphere is analyzing. The method o...
Abstract—In the first part of this work we show that, by working in Fourier space, the Bohren decomp...
International audienceIn a non-convex polyhedral domain, we describe the local trace (i.e. defined o...
International audienceIt is well known that in the case of a regular domain the solution of the time...
The solution fields of Maxwell’s equations are known to exhibit singularities near corners, crack ti...
International audienceAn original approach of the singular complement method for Maxwell's equations...
We study the regularity of the solution of the regularized electric Maxwell problem in a polygonal d...
Summary. We address the computation by finite elements of the non-zero eigenvalues of the (curl, cur...
We consider the time-harmonic eddy current problem in its electric formulation where the conductor i...
This dissertation presents new singular curl- and divergence- conforming vector bases that incorpora...
Thèse déposée le 8 Septembre 2005Maxwell equations are easily solved when the computational domain i...
International audienceIn this paper, the mathematical tools, which are required to solve the axisymm...
We propose a new numerical method to compute the singular solution of the Maxwell equations in axisy...
International audienceIn this article, we study the static and time-dependent Maxwell equations in a...
The research work done by several authors in order to incorporate the edge conditions in the numeric...
The problem of the electromagnetic field an open spiral conductive sphere is analyzing. The method o...
Abstract—In the first part of this work we show that, by working in Fourier space, the Bohren decomp...