Title :
Calderón Multiplicative Preconditioned EFIE With Perturbation Method
Author :
Sun, Sheng ; Liu, Yang G. ; Chew, Weng Cho ; Ma, Zuhui
Author_Institution :
Dept. of Electr. & Electron. Eng., Univ. of Hong Kong, Hong Kong, China
Abstract :
In this paper, we address the low-frequency breakdown and inaccuracy problems in the Calderón multiplicative preconditioned electric field integral equation (CMP-EFIE) operator, and propose the perturbation method as a remedy for three-dimensional perfect electric conductor (PEC) scatterers. The electric currents at different frequency orders as a power series can be obtained accurately in a recursive manner by solving the same matrix system with updated right hand side vectors. This method does not either require a search for the loops in the loop-tree/-star based method or include charge as additional unknown in the augmented EFIE method. Numerical examples show the far-field pattern can be accurately computed at extremely low frequencies by the proposed perturbation method.
Keywords :
electromagnetic wave scattering; integral equations; matrix algebra; recursive estimation; trees (mathematics); CMP-EFIE operator; Calderón multiplicative preconditioned electric field integral equation operator; augmented EFIE method; far-field pattern; frequency orders; loop-tree-star based method; low-frequency breakdown problems; low-frequency inaccuracy problems; matrix system; perturbation method; power series; three-dimensional PEC scatterers; three-dimensional perfect electric conductor scatterers; updated right hand side vectors; Electric breakdown; Impedance; Integral equations; Perturbation methods; Physics; Smoothing methods; Vectors; Calderón multiplicative preconditioner (CMP); electric field integral equation (EFIE); low-frequency breakdown; low-frequency inaccuracy; perturbation method;
Journal_Title :
Antennas and Propagation, IEEE Transactions on
DOI :
10.1109/TAP.2012.2220099
