Duality in power-law localization in disordered one-dimensional systems
Abstract
The transport of excitations between pinned particles in many physical systems may be mapped to single-particle models with power-law hopping, . For randomly spaced particles, these models present an effective peculiar disorder that leads to surprising localization properties. We show that in one-dimensional systems almost all eigenstates (except for a few states close to the ground state) are power-law localized for any value of . Moreover, we show that our model is an example of a new universality class of models with power-law hopping, characterized by a duality between systems with long-range hops () and short-range hops () in which the wave function amplitude falls off algebraically with the same power from the localization center.
Cite
@article{arxiv.1706.04088,
title = {Duality in power-law localization in disordered one-dimensional systems},
author = {X. Deng and V. E. Kravtsov and G. V. Shlyapnikov and L. Santos},
journal= {arXiv preprint arXiv:1706.04088},
year = {2018}
}
Comments
5 pages, and Supplemental Material, revised, title changed