TY - JOUR
T1 - Solving the 3D maxwell equations near conical singularities by a multiscale strategy
AU - Assous, Franck
AU - Ciarlet, Patrick
PY - 2009
Y1 - 2009
N2 - This article is concerned with the numerical solution of the time-dependent Maxwell equations in a three-dimensional domain that contains (sharp metallic) conical protuberances. These conical inclusions on the internal boundary of the domain, typically a waveguide, are geometrical singularities that generate, in their neighborhood, strong electromagnetic fields. Based on recent theoretical and practical developments on curl-free singular fields, we propose a method to compute the instationary electromagnetic field, including the effects of these conical vertices. The principle is based on a splitting of the spaces of solutions into a regular part and a singular part. The regular part is computed by a continuous finite element method, whereas the singular part involves a multiscale representation of the solution, written in the vicinity of the geometrical singularities. As an illustration, numerical results in a rectangular waveguide and comparisons with an axisymmetric problem are shown.
AB - This article is concerned with the numerical solution of the time-dependent Maxwell equations in a three-dimensional domain that contains (sharp metallic) conical protuberances. These conical inclusions on the internal boundary of the domain, typically a waveguide, are geometrical singularities that generate, in their neighborhood, strong electromagnetic fields. Based on recent theoretical and practical developments on curl-free singular fields, we propose a method to compute the instationary electromagnetic field, including the effects of these conical vertices. The principle is based on a splitting of the spaces of solutions into a regular part and a singular part. The regular part is computed by a continuous finite element method, whereas the singular part involves a multiscale representation of the solution, written in the vicinity of the geometrical singularities. As an illustration, numerical results in a rectangular waveguide and comparisons with an axisymmetric problem are shown.
KW - 3D Maxwell equations
KW - Conical singularities
KW - Continuous Galerkin method
KW - Multiscale representation
UR - http://www.scopus.com/inward/record.url?scp=70350064105&partnerID=8YFLogxK
U2 - 10.1615/IntJMultCompEng.v7.i5.40
DO - 10.1615/IntJMultCompEng.v7.i5.40
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AN - SCOPUS:70350064105
SN - 1543-1649
VL - 7
SP - 419
EP - 429
JO - International Journal for Multiscale Computational Engineering
JF - International Journal for Multiscale Computational Engineering
IS - 5
ER -