Title :
Computation of Sommerfeld integrals via rational function fitting
Author :
Okhmatovski, Vladimir I. ; Cangellaris, Andreas C.
Author_Institution :
Neolinear Inc., Tempe, AZ, USA
Abstract :
A new methodology is proposed for the robust computation of the Sommerfeld integrals encountered in evaluating the electromagnetic Green´s function in planar layered media. The key attribute of the proposed methodology is that it yields a closed-form expression for the Green´s function in terms of both spherical waves and cylindrical waves. The former, representing the source and quasi-static terms, provide for the accurate description of the singularity and the near-field physics in the vicinity of the source, while the latter capture correctly the surface wave behavior that dominates in the far field.
Keywords :
Green´s function methods; computational electromagnetics; inhomogeneous media; surface electromagnetic waves; Sommerfeld integral computation; closed-form expression; cylindrical waves; electromagnetic Green function; far field; near-field physics; planar layered media; quasi-static terms; rational function fitting; singularity; spherical waves; surface wave behavior; Dielectric losses; Dielectric substrates; Fitting; Frequency; Function approximation; Green function; Integral equations; Nonhomogeneous media; Permittivity; Surface waves;
Conference_Titel :
Antennas and Propagation Society International Symposium, 2004. IEEE
Print_ISBN :
0-7803-8302-8
DOI :
10.1109/APS.2004.1330215
