Hamiltonian Analysis and Dual Vector Spectral Elements for 2D Maxwell Eigenproblems
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Published:2017-02
Issue:2
Volume:21
Page:515-525
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ISSN:1815-2406
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Container-title:Communications in Computational Physics
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language:en
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Short-container-title:Commun. Comput. Phys.
Author:
Yang Hongwei,Zhu Bao,Chen Jiefu
Abstract
AbstractThe 2D Maxwell eigenproblems are studied from a new point of view. An electromagnetic problem is cast from the Lagrangian system with single variable into the Hamiltonian system with dual variables. The electric and magnetic components transverse to the wave propagation direction are treated as dual variables to each other. Higher order curl-conforming and divergence-conforming vector basis functions are used to construct dual vector spectral elements. Numerical examples demonstrate some unique advantages of the proposed method.
Publisher
Global Science Press
Subject
Physics and Astronomy (miscellaneous)
Reference15 articles.
1. An Efficient Finite Element Method for Nonconvex Waveguide Based on Hermitian Polynomials
2. Semi-analytical dual edge element method and its application to waveguide discontinuities;Chen;Acta Phys. Sin.,2009