Asymptotic matrix theory of Bragg fibers

Author

Xu, Yong ; Ouyang, George X. ; Lee, Reginald K. ; Yariv, Amnon

Author_Institution

Dept. of Appl. Phys., California Inst. of Technol., Pasadena, CA, USA

Volume

20

Issue

3

fYear

2002

fDate

3/1/2002 12:00:00 AM

Firstpage

428

Lastpage

440

Abstract

We developed a matrix theory that applies to any cylindrically symmetric fiber surrounded with Bragg cladding, which includes both the Bragg fibers and the recently proposed dielectric coaxial fibers. In this formalism, an arbitrary number of inner dielectric layers are treated exactly and the outside cladding structure is approximated in the asymptotic limit. An estimate of the radiation loss of such fibers is given. We compare the asymptotic results with those obtained from the finite difference time domain calculations and find excellent agreement between the two approaches

Keywords

Maxwell equations; finite difference time-domain analysis; matrix algebra; optical fibre cladding; optical fibre dispersion; optical fibre losses; optical fibre theory; Bragg cladding; Bragg fibers; Bragg scattering; Maxwell equations; TE modes; TM modes; air core fiber; arbitrary number; asymptotic limit; asymptotic matrix theory; cylindrically symmetric fiber; dielectric coaxial fibers; finite difference time domain calculations; guided modes; inner dielectric layers; low-index material; modal dispersion; optical fiber dispersion; optical fiber losses; optical waveguide theory; periodic structures; radiation loss; Dielectrics; Finite difference methods; Optical fiber losses; Optical fiber polarization; Optical fiber theory; Optical fibers; Optical scattering; Propagation losses; Symmetric matrices; Transmission line matrix methods;

fLanguage

English

Journal_Title

Lightwave Technology, Journal of

Publisher

ieee

ISSN

0733-8724

Type

jour

DOI

10.1109/50.988991

Filename

988991