Universal semiclassical dynamics in disordered two-dimensional systems
Abstract
The dynamics of disordered two-dimensional systems is much less understood than the dynamics of disordered chains, mainly due to the lack of appropriate numerical methods. We demonstrate that a single-trajectory version of the fermionic truncated Wigner approximation (fTWA) gives unexpectedly accurate results for the dynamics of one-dimensional (1D) systems with moderate or strong disorder. Additionally, the computational complexity of calculations carried out within this approximation is small enough to enable studies of two-dimensional (2D) systems larger than standard fTWA. Using this method, we analyze the dynamics of interacting spinless fermions propagating on disordered 1D and 2D lattices. We find for both spatial dimensions that the imbalance exhibits a universal dependence on the rescaled time , where in 2D the time-scale follows a stretched-exponential dependence on disorder strength.
Cite
@article{arxiv.2409.12956,
title = {Universal semiclassical dynamics in disordered two-dimensional systems},
author = {Łukasz Iwanek and Marcin Mierzejewski and Anatoli Polkovnikov and Dries Sels and Adam S. Sajna},
journal= {arXiv preprint arXiv:2409.12956},
year = {2024}
}
Comments
11 pages, 8 figures