Non-conventional Anderson localization in a matched quarter stack with metamaterials

TL;DR

This paper investigates the unusual Anderson localization phenomena in bilayer structures with positive and negative refraction indices, deriving new expressions for localization length and analyzing effects of different disorder types.

Contribution

The authors develop a new theoretical approach to derive localization length in matched quarter stacks with weak disorder, revealing unique frequency dependence and effects of combined disorder types.

Findings

Localization length scales as σ^4ω^8 at low frequencies.

Weak compositional disorder causes enormous localization lengths.

Positional disorder restores conventional localization behavior.

Abstract

We study the problem of non-conventional Anderson localization emerging in bilayer periodic-on-average structures with alternating layers of materials with positive and negative refraction indices $n_a$ and $n_b$. Main attention is paid to the model of the so-called quarter stack with perfectly matched layers (the same unperturbed by disorder impedances, $Z_a=Z_b$, and optical path lengths, $n_ad_a=|n_b| d_b$, with $d_a$, $d_b$ being the thicknesses of basic layers). As was recently numerically discovered, in such structures with weak fluctuations of refractive indices (compositional disorder) the localization length $L_{loc}$ is enormously large in comparison with the conventional localization occurring in the structures with positive refraction indices only. In this paper we develop a new approach which allows us to derive the expression for $L_{loc}$ for weak disorder and any wave frequency $\omega$. In the limit $\omega \rightarrow 0$ one gets a quite specific dependence, $L^{-1}_{loc}\propto\sigma^4\omega^8$ which is obtained within the fourth order of perturbation theory. We also analyze the interplay between two types of disorder, when in addition to the fluctuations of $n_a$, $n_b$ the thicknesses $d_a$, $d_b$ slightly fluctuate as well (positional disorder). We show how the conventional localization recovers with an addition of positional disorder.