Nonadiabatic nonlinear non-Hermitian quantized pumping
Abstract
We analyze a quantized pumping in a nonlinear non-Hermitian photonic system with nonadiabatic driving. The photonic system is made of a waveguide array, where the distances between adjacent waveguides are modulated. It is described by the Su-Schrieffer-Heeger model together with a saturated nonlinear gain term and a linear loss term. A topological interface state between the topological and trivial phases is stabilized by the combination of a saturated nonlinear gain term and a linear loss term. We study the pumping of the topological interface state. We define the transfer-speed ratio by the ratio of the pumping speed of the center of mass of the wave packet to the driving speed of the topological interface. It is quantized as in the adiabatic limit. It remains to be quantized for slow driving even in the nonadiabatic regime, which is a nonadiabatic quantized pump. On the other hand, there is almost no pump for fast driving. We find a transition in pumping as a function of the driving speed.
Cite
@article{arxiv.2310.17987,
title = {Nonadiabatic nonlinear non-Hermitian quantized pumping},
author = {Motohiko Ezawa and Natsuko Ishida and Yasutomo Ota and Satoshi Iwamoto},
journal= {arXiv preprint arXiv:2310.17987},
year = {2024}
}
Comments
6 pages, 6 figures