Photonic band structures of periodic arrays of pores in a metallic host: tight-binding beyond the quasistatic approximation

We have calculated the photonic band structures of metallic inverse opals and of periodic linear chains of spherical pores in a metallic host, below a plasma frequency \(\omega_{\text{p}}\). In both cases, we use a tight-binding approximation, assuming a Drude dielectric function for the metallic co...

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Bibliographic Details
Published in:arXiv.org 2011-11
Main Authors: Kim, Kwangmoo, Stroud, D
Format: Article
Language:English
Subjects:
Approximation
Atomic properties
Binding
Chains
Electromagnetic fields
Mathematical analysis
Photonic crystals
Plasma frequencies
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Summary:We have calculated the photonic band structures of metallic inverse opals and of periodic linear chains of spherical pores in a metallic host, below a plasma frequency \(\omega_{\text{p}}\). In both cases, we use a tight-binding approximation, assuming a Drude dielectric function for the metallic component, but without making the quasistatic approximation. The tight-binding modes are linear combinations of the single-cavity transverse magnetic (TM) modes. For the inverse-opal structures, the lowest modes are analogous to those constructed from the three degenerate atomic p-states in fcc crystals. For the linear chains, in the limit of small spheres compared to a wavelength, the results are the "inverse" of the dispersion relation for metal spheres in an insulating host, as calculated by Brongersma \textit{et al.} [Phys.\ Rev.\ B \textbf{62}, R16356 (2000)]. Because the electromagnetic fields of these modes decay exponentially in the metal, there are no radiative losses, in contrast to the case of arrays of metallic spheres in air. We suggest that this tight-binding approach to photonic band structures of such metallic inverse materials may be a useful approach for studying photonic crystals containing metallic components, even beyond the quasistatic approximation.
ISSN:2331-8422