Title :
Spectral representations for rapid evaluation of periodic green’s functions
Author :
Lomakin, V. ; Van Orden, D.
Author_Institution :
Dept. of Electr. & Comput. Eng., Univ. of California, San Diego, La Jolla, CA
fDate :
June 29 2008-July 2 2008
Abstract :
Spectral representations are developed for the Green functions of 3D problems with a 1D periodicity. The periodic Greenpsilas functions are represented in terms of continuous transverse spectrum rather than conventional discrete (Floquet) longitudinal spectrum. In the framework of these expansions, the periodic Greenpsilas functions are obtained in terms of a small number of direct source contributions, a small number of pole (Floquet mode) contributions, and a rapidly convergent integral that can be evaluated using a small number of quadrature nodes. The presented scheme works seamlessly for any practical periodicities and observer location within the periodic unit cell.
Keywords :
Green´s function methods; electromagnetic wave diffraction; periodic structures; 1D periodicity; 3D problems; Floquet mode; continuous transverse spectrum; convergent integral; diffraction mode; periodic Greens function; quadrature nodes; spectral representation; Convergence; Electric breakdown; Green function; Green´s function methods; Integral equations; Linear antenna arrays; Nonhomogeneous media; Periodic structures; Phased arrays; Sensor arrays;
Conference_Titel :
Mathematical Methods in Electromagnetic Theory, 2008. MMET 2008. 12th International Conference on
Conference_Location :
Odesa
Print_ISBN :
978-1-4244-2284-5
DOI :
10.1109/MMET.2008.4580932
