Parity-dependent localization in $N$ strongly coupled chains
Abstract
Anderson localization of wave-functions at zero energy in quasi-1D systems of disordered chains with inter-chain coupling is examined. Localization becomes weaker than for the 1D disordered chain () when is smaller than the longitudinal hopping , and localization becomes usually much stronger when . This is not so for all . We find "immunity" to strong localization for open (periodic) lateral boundary conditions when is odd (a multiple of four), with localization that is weaker than for and rather insensitive to when . The peculiar -dependence and a critical scaling with is explained by a perturbative treatment in , and the correspondence to a weakly disordered effective chain is shown. Our results could be relevant for experimental studies of localization in photonic waveguide arrays.
Keywords
Cite
@article{arxiv.1406.6594,
title = {Parity-dependent localization in $N$ strongly coupled chains},
author = {Dietmar Weinmann and S. N. Evangelou},
journal= {arXiv preprint arXiv:1406.6594},
year = {2014}
}
Comments
9 pages, 5 figures