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Co-Circular Polarization Reflector Revisited: Reflection Properties, Polarization Transformations, and Matched Waves

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  • Ari Sihvola

    (Department of Electronics and Nanoengineering, Aalto University, 02150 Espoo, Finland)

Abstract

The variety of electromagnetic impedance boundaries is wide since the impedance boundary condition can have a two-dimensional matrix nature. In this article, a particular class of impedance boundary conditions is treated: a boundary condition that produces the so-called co-circular polarization reflector (CCPR). The analysis focuses on the possibilities of manipulating the polarization of the electromagnetic wave reflected from the CCPR surface as well as the so-called matched waves associated with it. The characteristics of CCPR and its special cases (perfectly anisotropic boundary (PAB) and soft-and-hard surface (SHS)) are compared against more classical lossless boundaries: perfect electric, perfect magnetic, and perfect electromagnetic conductors (PEC, PMC, and PEMC).

Suggested Citation

  • Ari Sihvola, 2022. "Co-Circular Polarization Reflector Revisited: Reflection Properties, Polarization Transformations, and Matched Waves," Mathematics, MDPI, vol. 10(4), pages 1-11, February.
    • Handle: RePEc:gam:jmathe:v:10:y:2022:i:4:p:641-:d:753133
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    Cited by:

    1. Nikolaos L. Tsitsas, 2023. "Analytical Methods in Wave Scattering and Diffraction Volume I," Mathematics, MDPI, vol. 11(4), pages 1-5, February.

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