Locations of Zeros for Electromagnetic Fields Scattered by Polygonal Objects(Basic Electromagnetic Analysis)(<Special Section>Wave Technologies for Wireless and Optical Communications)
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概要
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Scattering of the two dimensional electromagnetic waves is studied by the infinite sequences of zeros arising on the complex plane, which just correspond to the null points of the far field pattern given as a function of the azimuthal angle θ. The convergent sequences of zeros around the point of infinity are evaluated when the scattering objects are assumed to be N-polygonal cylinders. Every edge condition can be satisfied if the locations of zeros are determined appropriately. The parameters, which allow us to calculate the exact positions of zeros, are given by the asymptotic analysis. It is also shown that there are N-directions of convergence, which tend to infinity. An illustrative example is presented.
- 社団法人電子情報通信学会の論文
- 2004-09-01
著者
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Hashimoto Masahiro
The Department Of Applied Electronic Engineering Osaka Electro-communication University
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Hashimoto Masahiro
The Department Of Telecommunications And Computer Networks Osaka Electro-communication University
関連論文
- Locations of Zeros for Electromagnetic Fields Scattered by Polygonal Objects(Basic Electromagnetic Analysis)(Wave Technologies for Wireless and Optical Communications)
- Two Variational Principles in Geometrical Optics : Comparisons (Special Issue on Electromagnetic Theory : Foundations and Applications)
- Bicomplex Waves in Electromagnetic Scattering and Diffraction Problems