Related papers: Nonadiabatic transitions in Landau-Zener grids: integrability and semiclassical theory

Nonadiabatic transitions in Landau-Zener grids: integrability and semiclassical theory

URL: http://arxiv.org/abs/2101.04169v1
Date: Mon, 11 Jan 2021 19:59:31 GMT
Title: Nonadiabatic transitions in Landau-Zener grids: integrability and semiclassical theory
Authors: Rajesh K. Malla, Vladimir Y. Chernyak, and Nikolai A. Sinitsyn
Abstract summary: We show that the general model of a linearly time-dependent crossing of two energy bands is integrable. We apply this property to four-state Landau-Zener (LZ) models.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We demonstrate that the general model of a linearly time-dependent crossing of two energy bands is integrable. Namely, the Hamiltonian of this model has a quadratically time-dependent commuting operator. We apply this property to four-state Landau-Zener (LZ) models that have previously been used to describe the Landau-St\"uckelberg interferometry experiments with an electron shuttling between two semiconductor quantum dots. The integrability then leads to simple but nontrivial exact relations for the transition probabilities. In addition, the integrability leads to a semiclassical theory that provides analytical approximation for the transition probabilities in these models for all parameter values. The results predict a dynamic phase transition, and show that similarly-looking models belong to different topological classes.

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