Electromagnetic surface waves guided by the planar interface of isotropic chiral materials

Abstract

The propagation of electromagnetic surface waves guided by the planar interface of two isotropic chiral materials, namely materials and , was investigated by numerically solving the associated canonical boundary-value problem. Isotropic chiral material was modeled as a homogenized composite material, arising from the homogenization of an isotropic chiral component material and an isotropic achiral, nonmagnetic, component material characterized by the relative permittivity a. Changes in the nature of the surface waves were explored as the volume fraction fa of the achiral component material varied. Surface waves are supported only for certain ranges of fa; within these ranges only one surface wave, characterized by its relative wavenumber q, is supported at each value of fa. For Re a > 0 , as | Im a | increases surface waves are supported for larger ranges of fa and | Im q | for these surface waves increases. For Re a < 0 , as Im a increases the ranges of fa that support surface-wave propagation are almost unchanged but Im q for these surface waves decreases. The surface waves supported when Re a < 0 may be regarded as akin to surface-plasmon-polariton waves, but those supported for when Re a > 0 may not.