To make clear numerically the scattering characteristics for a body embedded in a random medium, we need to analyze the bistatic cross-section (BCS). The scattering problem can be analyzed as a boundary value problem by using current generator method. The fourth moment of Green's functions in the random medium, which is necessary for the analysis, is obtained approximately by two-scale method. We analyze numerically the BCS of conducting circular cylinders in continuous random media, which are assumed to fluctuate about the dielectric constant of free space. The numerical results agree well with the law of energy conservation. The effects of random media on the BCS are also clarified numerically.
The copyright of the original papers published on this site belongs to IEICE. Unauthorized use of the original or translated papers is prohibited. See IEICE Provisions on Copyright for details.
Copy
Zhi Qi MENG, Natsuki YAMASAKI, Mitsuo TATEIBA, "Numerical Analysis of Bistatic Cross-Sections of Conducting Circular Cylinders Embedded in Continuous Random Media" in IEICE TRANSACTIONS on Electronics,
vol. E83-C, no. 12, pp. 1814-1819, December 2000, doi: .
Abstract: To make clear numerically the scattering characteristics for a body embedded in a random medium, we need to analyze the bistatic cross-section (BCS). The scattering problem can be analyzed as a boundary value problem by using current generator method. The fourth moment of Green's functions in the random medium, which is necessary for the analysis, is obtained approximately by two-scale method. We analyze numerically the BCS of conducting circular cylinders in continuous random media, which are assumed to fluctuate about the dielectric constant of free space. The numerical results agree well with the law of energy conservation. The effects of random media on the BCS are also clarified numerically.
URL: https://global.ieice.org/en_transactions/electronics/10.1587/e83-c_12_1814/_p
Copy
@ARTICLE{e83-c_12_1814,
author={Zhi Qi MENG, Natsuki YAMASAKI, Mitsuo TATEIBA, },
journal={IEICE TRANSACTIONS on Electronics},
title={Numerical Analysis of Bistatic Cross-Sections of Conducting Circular Cylinders Embedded in Continuous Random Media},
year={2000},
volume={E83-C},
number={12},
pages={1814-1819},
abstract={To make clear numerically the scattering characteristics for a body embedded in a random medium, we need to analyze the bistatic cross-section (BCS). The scattering problem can be analyzed as a boundary value problem by using current generator method. The fourth moment of Green's functions in the random medium, which is necessary for the analysis, is obtained approximately by two-scale method. We analyze numerically the BCS of conducting circular cylinders in continuous random media, which are assumed to fluctuate about the dielectric constant of free space. The numerical results agree well with the law of energy conservation. The effects of random media on the BCS are also clarified numerically.},
keywords={},
doi={},
ISSN={},
month={December},}
Copy
TY - JOUR
TI - Numerical Analysis of Bistatic Cross-Sections of Conducting Circular Cylinders Embedded in Continuous Random Media
T2 - IEICE TRANSACTIONS on Electronics
SP - 1814
EP - 1819
AU - Zhi Qi MENG
AU - Natsuki YAMASAKI
AU - Mitsuo TATEIBA
PY - 2000
DO -
JO - IEICE TRANSACTIONS on Electronics
SN -
VL - E83-C
IS - 12
JA - IEICE TRANSACTIONS on Electronics
Y1 - December 2000
AB - To make clear numerically the scattering characteristics for a body embedded in a random medium, we need to analyze the bistatic cross-section (BCS). The scattering problem can be analyzed as a boundary value problem by using current generator method. The fourth moment of Green's functions in the random medium, which is necessary for the analysis, is obtained approximately by two-scale method. We analyze numerically the BCS of conducting circular cylinders in continuous random media, which are assumed to fluctuate about the dielectric constant of free space. The numerical results agree well with the law of energy conservation. The effects of random media on the BCS are also clarified numerically.
ER -