Eigenmodes and scattering by an axial array of tape rings

Author

Shaohua Li ; Scharstein, R.W.

Author_Institution

Dept. of Electr. Eng., Alabama Univ., Tuscaloosa, AL, USA

Volume

54

Issue

7

fYear

2006

fDate

7/1/2006 12:00:00 AM

Firstpage

2096

Lastpage

2104

Abstract

Source-free and forced solutions for the electromagnetic fields in and around a periodic array of finite-length conducting cylinders are assembled from a Galerkin procedure using a Chebyshev polynomial basis with built-in edge-condition behavior. A localized source excites slow surface-waves under certain conditions on the electrical circumference and spacing of the tubular structure. These eigenmodes are the solutions to the homogeneous boundary value problem. A numerical search for the axial propagation constant that minimizes the smallest singular value of the governing Galerkin matrix provides the required dispersion relation.

Keywords

Chebyshev approximation; Galerkin method; antenna arrays; boundary-value problems; circular waveguides; eigenvalues and eigenfunctions; electromagnetic wave scattering; matrix algebra; periodic structures; Chebyshev polynomial basis; Galerkin matrix; axial propagation constant; boundary value problem; eigenmode; electromagnetic field scattering; finite-length conducting cylinder; periodic array; tape ring array; Arrayed waveguide gratings; Boundary value problems; Chebyshev approximation; Dispersion; Electromagnetic scattering; Periodic structures; Phased arrays; Polynomials; Propagation constant; Resonance; Eigenmodes; grating; periodic structure; scattering;

fLanguage

English

Journal_Title

Antennas and Propagation, IEEE Transactions on

Publisher

ieee

ISSN

0018-926X

Type

jour

DOI

10.1109/TAP.2006.877188

Filename

1650409