Periodically driven three-dimensional Kitaev model
Abstract
We study the dynamics of a three-dimensional generalization of Kitaev's honeycomb lattice spin model (defined on the hyperhoneycomb lattice) subjected to a harmonic driving of , one of the three types of spin-couplings in the Hamiltonian. Using numerical solutions supported by analytical calculations based on a rotating wave approximation, we find that the system responds nonmonotonically to variations in the frequency (while keeping the driving amplitude fixed) and undergoes dynamical freezing, where at specific values of , it gets almost completely locked in the initial state throughout the evolution. However, this freezing occurs only when a constant bias is present in the driving, i.e., when , with . Consequently, the bias acts as a switch that triggers the freezing phenomenon. Dynamical freezing has been previously observed in other integrable systems, such as the one-dimensional transverse-field Ising model.
Cite
@article{arxiv.2403.06123,
title = {Periodically driven three-dimensional Kitaev model},
author = {Soumya Sasidharan and Naveen Surendran},
journal= {arXiv preprint arXiv:2403.06123},
year = {2024}
}
Comments
10 pages, 4 figures