Title :
Global edge-conditioned basis functions from local solutions of Maxwell´s equations
Author :
Amari, S. ; Motamedi, A. ; Bornemann, J. ; Vahldieck, R.
Author_Institution :
Dept. of Electr. & Comput. Eng., Victoria Univ., BC, Canada
Abstract :
A new set of edge-conditioned basis functions for the moment method solutions of electromagnetic problems is introduced. The basis functions are themselves solutions to the differential forms of Maxwell´s equations and satisfy the local boundary conditions at metallic wedges. Numerical results using this new set are presented and compared with available data for a ridged rectangular waveguide to demonstrate its adequacy. An efficient technique to compute integrals of rapidly oscillating and singular integrands is also presented.
Keywords :
Bessel functions; Maxwell equations; functional analysis; integration; interpolation; method of moments; ridge waveguides; waveguide theory; Maxwell equations; electromagnetic problems; global edge-conditioned basis functions; integral computation; local boundary conditions; local solutions; metallic wedges; moment method solutions; numerical results; rapidly oscillating singular integrands; ridged rectangular waveguide; Boundary conditions; Differential equations; Electromagnetic waveguides; Integral equations; Magnetic analysis; Magnetic fields; Maxwell equations; Moment methods; Rectangular waveguides; Tellurium;
Conference_Titel :
Microwave Symposium Digest, 1997., IEEE MTT-S International
Conference_Location :
Denver, CO, USA
Print_ISBN :
0-7803-3814-6
DOI :
10.1109/MWSYM.1997.596584
