Non-Conventional Anderson Localization in Bilayered Structures with Metamaterials
arXiv:1111.3397 · doi:10.1209/0295-5075/98/27003
Abstract
We have developed an approach allowing us to resolve the problem of non-conventional Anderson localization emerging in bilayered periodic-on-average structures with alternating layers of right-handed and left-handed materials. Recently, it was numerically discovered that in such structures with weak fluctuations of refraction indices, the localization length $L_{loc}$ can be enormously large for small wave frequencies $Ï$. Within the fourth order of perturbation theory in disorder, $Ï^2 \ll 1$, we derive the expression for $L_{loc}$ valid for any $Ï$. In the limit $Ï\rightarrow 0$ one gets a quite specific dependence, $L^{-1}_{loc} \propto Ï^4 Ï^8$. Our approach allows one to establish the conditions under which this effect can be observed.
5 pages, 3 figures