TY - JOUR
T1 - A characterization of singular electromagnetic fields by an inductive approach
AU - Assous, Franck
AU - Ciarlet, Patrick
AU - Garcia, Emmanuelle
PY - 2008
Y1 - 2008
N2 - 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 boundary 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 decompositions that are numerically computable.
AB - 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 boundary 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 decompositions that are numerically computable.
KW - Maxwell's equations
KW - Polyhedral domains
KW - Singular geometries
UR - http://www.scopus.com/inward/record.url?scp=46149103902&partnerID=8YFLogxK
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AN - SCOPUS:46149103902
SN - 1705-5105
VL - 5
SP - 491
EP - 515
JO - International Journal of Numerical Analysis and Modeling
JF - International Journal of Numerical Analysis and Modeling
IS - 3
ER -