Summary
URSI Commission B 2013 International Symposium on Electromagnetic Theory EMTS 2013
2013
Session Number:21PM1B
Session:
Number:21PM1B-01
Accurate and Highly Convergent Solution of Integral Equations for Electromagnetic Problems
Su Yan, Jian-Ming Jin, Zaiping Nie,
pp.135-138
Publication Date:2013/5/20
Online ISSN:2188-5079
DOI:10.34385/proc.30.21PM1B-01
Summary:
Surface integral equations (SIEs) are commonly used in the solution of electromagnetic scattering and radiation problems. Among various SIEs, the magnetic-field integral equation (MFIE) and the Müller formulation, when solved using a traditional moment method, are known to have worse accuracy but faster iterative convergence compared to the electric-field integral equation and the Poggio-Miller-Chang-Harrington-Wu-Tsai equations. In this paper, newly proposed techniques are adopted in the discretization of the MFIE and the Müller formulation, leading to numerical solutions with both excellent accuracy and fast convergence.