A Calderon Multiplicative Preconditioner for the PMCHWT Equation for Scattering by Chiral Objects

A Calderon Multiplicative Preconditioner for the PMCHWT Equation for Scattering by Chiral Objects

Scattering of time-harmonic electromagnetic waves by chiral structures can be modeled via an extension of the Poggio-Miller-Chan-Harrington-Wu-Tsai (PMCHWT) boundary integral equation for analyzing scattering by dielectric objects. The classical PMCHWT equation however suffers from dense discretizat...

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Veröffentlicht in:IEEE transactions on antennas and propagation 2012-09, Vol.60 (9), p.4239-4248
Hauptverfasser: Beghein, Y., Cools, K., Andriulli, F. P., De Zutter, Daniel, Michielssen, E.
Format: Artikel
Sprache:eng
Schlagworte:
Applied classical electromagnetism
Applied sciences
Boundary element method
boundary integral equations
Calderón multiplicative preconditioner
Chiral media
dense discretization breakdown
Diffraction, scattering, reflection
Eigenvalues and eigenfunctions
Electric breakdown
Electromagnetic wave propagation, radiowave propagation
Electromagnetics
Electromagnetism
Electromagnetism
electron and ion optics
Engineering Sciences
Equations
Exact sciences and technology
Fundamental areas of phenomenology (including applications)
Mathematical model
Media
Physics
Poggio-Miller-Chan-Harrington-Wu-Tsai (PMCHWT) equation
Radiocommunications
Radiowave propagation
Scattering
Telecommunications
Telecommunications and information theory
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Beschreibung
Zusammenfassung:Scattering of time-harmonic electromagnetic waves by chiral structures can be modeled via an extension of the Poggio-Miller-Chan-Harrington-Wu-Tsai (PMCHWT) boundary integral equation for analyzing scattering by dielectric objects. The classical PMCHWT equation however suffers from dense discretization breakdown: the matrices resulting from its discretization become increasingly ill-conditioned when the mesh density increases. This contribution revisits the PMCHWT equation for chiral media. It is demonstrated that it also suffers from dense discretization breakdown. This dense discretization breakdown is mitigated by the construction of a Calderón multiplicative preconditioner. A stable discretization scheme is introduced, and the resulting algorithm's accuracy and efficiency are corroborated by numerical examples.
ISSN:0018-926X
1558-2221
DOI:10.1109/TAP.2012.2207061