Effective Dielectric Response of Metamaterials

Abstract

We use a homogenization procedure for Maxwell's equations in order to obtain in the local limit the frequency (ω) dependent macroscopic dielectric response εM(ω) of metamaterials made of natural constituents with any geometrical shape repeated periodically with any structure. We illustrate the formalism calculating εM(ω) for several structures. For dielectric rectangular inclusions within a conducting material we obtained a very anisotropic response which changes along one direction from conductor-like at low ω to a resonant dielectric-like at large ω, attaining a very small reflectance at intermediate frequencies unrelated to surface plasmon excitation and which can be tuned through geometrycal tayloring. A similar behavior is obtained for other shapes close to the percolation threshold.