A fast converging series expansion for the 2-D periodic Green´s function based on perfectly matched layers

Author

Rogier, Hendrik ; De Zutter, Daniël

Author_Institution

Inf. Technol. Dept., Ghent Univ., Belgium

Volume

52

Issue

4

fYear

2004

fDate

4/1/2004 12:00:00 AM

Firstpage

1199

Lastpage

1206

Abstract

A new formalism based on perfectly matched layers (PMLs) is proposed to derive a fast converging series expansion for the two-dimensional periodic Green´s function of layered media. The series combines a modal expansion for the waveguide formed by the layered medium terminated by PMLs with a truncated periodic Green´s function series in the spatial domain. The efficiency of the new approach is illustrated by studying the scattering by a grid of metallic wires, both in free space and embedded in a dielectric slab. It is shown that the new technique results in a significant speed up compared to existing approaches.

Keywords

Green´s function methods; dielectric waveguides; inhomogeneous media; integral equations; periodic structures; series (mathematics); waveguide theory; 2D periodic Green function; dielectric slab; fast converging series expansion; free space; metallic wires; modal expansion; perfectly matched layers; spatial domain; two-dimensional periodic Green´s function; waveguide; Arrayed waveguide gratings; Convergence; Dielectrics; Electromagnetic waveguides; Green´s function methods; Nonhomogeneous media; Perfectly matched layers; Periodic structures; Slabs; Two dimensional displays;

fLanguage

English

Journal_Title

Microwave Theory and Techniques, IEEE Transactions on

Publisher

ieee

ISSN

0018-9480

Type

jour

DOI

10.1109/TMTT.2004.825636

Filename

1284790