Mathematical theory of normal waves in an open metal-dielectric regular waveguide of arbitrary cross section

Mathematical theory of normal waves in an open metal-dielectric regular waveguide of arbitrary cross section

The problem of normal waves in an open metal-dielectric regular waveguide of arbitrary cross-section is considered. This problem is reduced to the boundary eigenvalue problem for longitudinal components of electromagnetic field in Sobolev spaces. To find the solution, we use the variational formula...

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Bibliographic Details
Main Authors: Eugene Smolkin, Yury Smirnov
Format: Article
Language:English
Published: Vilnius Gediminas Technical University 2020-05-01
Series:Mathematical Modelling and Analysis
Subjects:
non-linear eigenvalue problem
Maxwell's equations
operator-function
Sobolev spaces
discrete spectrum
Online Access:https://journals.vgtu.lt/index.php/MMA/article/view/10682
Description
Summary:The problem of normal waves in an open metal-dielectric regular waveguide of arbitrary cross-section is considered. This problem is reduced to the boundary eigenvalue problem for longitudinal components of electromagnetic field in Sobolev spaces. To find the solution, we use the variational formulation of the problem. The variational problem is reduced to study of an operator-function. Discreteness of the spectrum is proved and distribution of the characteristic numbers of the operatorfunction on the complex plane is found.
ISSN:1392-6292
1648-3510

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