English

Complex Eigenmodes and Eigenfrequencies in Electromagnetics

Applied Physics 2020-05-13 v1 Optics

Abstract

A first comprehensive treatment on complex eigenmodes is presented for general lossy traveling-wave electromagnetic structures where the per unit length propagation phase shift (β\beta) dependent complex eigenfrequencies Ω(β)\Omega(\beta) are mapped to the frequency dependent complex propagation constant γ(ω0)\gamma(\omega_0) for variety of electromagnetic structures. Rigorous procedures are presented to first compute the complex eigenmodes of both uniform and periodic electromagnetic structures which are confirmed using full-wave simulations and known analytical results. Two mapping procedures are further presented for arbitrary uniform and periodic structures, where the known {Ωβ}\{\Omega-\beta\} relationship is expressed using polynomial and Fourier series expansions, respectively. Consequently replacing {Ω, jβ}\{\Omega,~j\beta\} with {ω0,γ}\{\omega_0, \gamma\} in the known {Ωβ}\{\Omega-\beta\} relation, a characteristic equation is formed which is then numerically solved for the two unknowns, representing the physical dispersion relation ω0(β)\omega_0(\beta) and the frequency dependent propagation loss α(ω0)\alpha(\omega_0) of the structure. The mapping procedure is demonstrated for variety of cases including unbounded uniform media, rectangular waveguide, Drude dispersive metamaterial and a periodic dielectric stack, where exact propagation characteristics have been successfully retrieved in all cases across both passbands and stopbands across frequency.

Keywords

Cite

@article{arxiv.2005.05491,
  title  = {Complex Eigenmodes and Eigenfrequencies in Electromagnetics},
  author = {João G. Nizer Rahmeier and Ville Tiukuvaara and Shulabh Gupta},
  journal= {arXiv preprint arXiv:2005.05491},
  year   = {2020}
}

Comments

13 pages, 8 figures

R2 v1 2026-06-23T15:28:32.961Z