TY - JOUR
T1 - Local Multiple Traces Formulation for electromagnetics
T2 - Stability and preconditioning for smooth geometries
AU - Ayala, Alan
AU - Claeys, Xavier
AU - Escapil-Inchauspé, Paul
AU - Jerez-Hanckes, Carlos
N1 - Publisher Copyright:
© 2022 Elsevier B.V.
PY - 2022/10/15
Y1 - 2022/10/15
N2 - We consider the time-harmonic electromagnetic transmission problem for the unit sphere. Appealing to a vector spherical harmonics analysis, we prove the first stability result of the local multiple traces formulation (MTF) for electromagnetics, originally introduced by Hiptmair and Jerez-Hanckes (2012) for the acoustic case, paving the way towards an extension to general piecewise homogeneous scatterers. Moreover, we investigate preconditioning techniques for the local MTF scheme and study the accumulation points of induced operators. In particular, we propose a novel second-order inverse approximation of the operator. Numerical experiments validate our claims and confirm the relevance of the preconditioning strategies proposed.
AB - We consider the time-harmonic electromagnetic transmission problem for the unit sphere. Appealing to a vector spherical harmonics analysis, we prove the first stability result of the local multiple traces formulation (MTF) for electromagnetics, originally introduced by Hiptmair and Jerez-Hanckes (2012) for the acoustic case, paving the way towards an extension to general piecewise homogeneous scatterers. Moreover, we investigate preconditioning techniques for the local MTF scheme and study the accumulation points of induced operators. In particular, we propose a novel second-order inverse approximation of the operator. Numerical experiments validate our claims and confirm the relevance of the preconditioning strategies proposed.
KW - Boundary element method
KW - Maxwell scattering
KW - Multiple Traces Formulation
KW - Preconditioning
KW - Vector spherical harmonics
UR - http://www.scopus.com/inward/record.url?scp=85129714165&partnerID=8YFLogxK
U2 - 10.1016/j.cam.2022.114356
DO - 10.1016/j.cam.2022.114356
M3 - Article
AN - SCOPUS:85129714165
SN - 0377-0427
VL - 413
JO - Journal of Computational and Applied Mathematics
JF - Journal of Computational and Applied Mathematics
M1 - 114356
ER -