Related papers: Adiabatic-impulse approximation in non-Hermitian Landau-Zener Model

Adiabatic-impulse approximation in non-Hermitian Landau-Zener Model

URL: http://arxiv.org/abs/2210.12709v1
Date: Sun, 23 Oct 2022 12:11:30 GMT
Title: Adiabatic-impulse approximation in non-Hermitian Landau-Zener Model
Authors: Xianqi Tong, Gao Xianlong, and Su-peng Kou
Abstract summary: We investigate the transition from PT-symmetry to PT-symmetry breaking and vice versa in the non-Hermitian Landau-Zener (LZ) models. To illustrate the dynamics of phase transitions, the relative population is introduced to calculate the defect density in nonequilibrium phase transitions.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: We investigate the transition from PT-symmetry to PT-symmetry breaking and vice versa in the non-Hermitian Landau-Zener (LZ) models. The energy is generally complex, so the relaxation rate of the system is set by the absolute value of the gap. To illustrate the dynamics of phase transitions, the relative population is introduced to calculate the defect density in nonequilibrium phase transitions instead of the excitations in the Hermitian systems. The result shows that the adiabatic-impulse (AI) approximation, which is the key concept of the Kibble-Zurek (KZ) mechanism in the Hermitian systems, can be generalized to the PT-symmetric non-Hermitian LZ models to study the dynamics in the vicinity of a critical point. Therefore, the KZ mechanism in the simplest non-Hermitian two-level models is presented. Finally, an exact solution to the non-Hermitian LZ-like problem is also shown.

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