Green´s functions and integral equations for photonic crystals

Author

Davidovich, M.

Author_Institution

Dept. of Phys., Saratov State Univ.

fYear

0

fDate

0-0 0

Firstpage

599

Lastpage

601

Abstract

The scalar and tensor (dyadic) Green´s functions (GFs) for three-dimensional-periodic (3DP), two-dimensional- periodic (2DP) and one-dimensional-periodic (1DP) sources have been considered and corresponding volume, surface and coupled volume-surface integral equations (IEs) and integrodifferential equations (IDEs) have been derived. The 3DP, 2DP, and 1DP IEs have been used to simulate the photonic crystal (PC) structures with periodic dielectric body and metallic wire inclusions. The homogenization and photonic bandgap (PBG) structures in the lossy PCs have been considered and investigated

Keywords

Green´s function methods; inhomogeneous media; integral equations; photonic band gap; photonic crystals; Green functions; coupled volume-surface integral equations; homogenization; integrodifferential equations; metallic wire; periodic dielectric body; periodic sources; photonic bandgap structures; photonic crystals; surface integral equations; volume integral equations; Dielectrics; Green´s function methods; Integral equations; Integrodifferential equations; Optical losses; Periodic structures; Photonic band gap; Photonic crystals; Tensile stress; Wire;

fLanguage

English

Publisher

ieee

Conference_Titel

Mathematical Methods in Electromagnetic Theory, 2006 International Conference on

Conference_Location

Kharkiv

Print_ISBN

1-4244-0490-8

Type

conf

DOI

10.1109/MMET.2006.1689868

Filename

1689868