Duality of the IE-MEI method and its application to 2-D perfect conducting scatterers

Author

Hirose, Masanobu ; Takada, Jun-ichi ; Arai, Ikuo

Author_Institution

Dept. of Electron. Eng., Univ. of Electro-Commun., Tokyo, Japan

fYear

2000

fDate

15-18 Aug. 2000

Firstpage

239

Lastpage

242

Abstract

We show that an integral equation formulation of the measured equation of invariance (IE-MEI) fulfils a duality and the duality is useful to solve the scattering problems of a 2-D object for TM and TE waves incident simultaneously. The duality of the IE-MEI is derived naturally from the formulation of the IE-MEI. From the formulation, we have found that the application range of the IE-MEI method is very wide: it can treat scattering problems for perfect electric conductors (PEC), lossy materials and lossless materials. The excitation source can be near or far from the scatterer. In the IE-MEI method, there exists an efficient computational algorithm using sparse matrices. We show the validity of the algorithm by numerical examples of a circular and a square PEC cylinders illuminated by a TM and a TE plane waves.

Keywords

conducting bodies; electromagnetic wave scattering; integral equations; sparse matrices; 2D perfect conducting scatterers; IE-MEI method; PEC cylinders; TE plane waves; TM plane waves; circular cylinders; duality; electromagnetic scattering; integral equation; lossless materials; lossy materials; measured equation of invariance; perfect electric conductors; square cylinders; Conducting materials; Electromagnetic scattering; Finite difference methods; Hair; Integral equations; Magnetic confinement; Magnetic fields; Magnetic materials; Sparse matrices; Tellurium;

fLanguage

English

Publisher

ieee

Conference_Titel

Antennas, Propagation and EM Theory, 2000. Proceedings. ISAPE 2000. 5th International Symposium on

Conference_Location

Beijing, China

Print_ISBN

0-7803-6377-9

Type

conf

DOI

10.1109/ISAPE.2000.894769

Filename

894769