Green Dyadics for Self-Dual Bi-Anisotropic Media

Abstract

The class of self-dual linear bi-anisotropic media can be defined in three different ways. It consists of media which are invariant in a duality transformation, allow factorization of the second-order dyadic Helmholtz operator in terms of two first-order dyadic operators and allow decomposition of fields and sources in a way that is an extension of the Bohren decomposition for chiral media. It is shown that the Green dyadic can be solved in closed analytic form for any self-dual bi-anisotropic medium and its general expression is given in terms of the self-dual decomposition.

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Document Details

Document Type
Technical Report
Publication Date
Sep 29, 2000
Accession Number
ADP011625

Entities

People

  • F. Olyslager
  • I. V. Lindell

Organizations

  • Helsinki University of Technology

Tags

DTIC Thesaurus Topics

  • Computations
  • Constitutive Equations
  • Couplings
  • Decomposition
  • Electromagnetic Fields
  • Equations
  • Information Systems
  • Integrals
  • Mathematics
  • Notation
  • Permeability
  • Portugal
  • Symposia
  • Technical Information Centers
  • Universities

Fields of Study

  • Mathematics

Readers

  • Electromagnetic Wave Scattering and Antenna Radiation Engineering
  • Mathematical Modeling and Probability Theory.