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Hauptverfasser: Wang, Qian, Robnik, Marko
Format: Preprint
Veröffentlicht: 2023
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Online-Zugang:https://arxiv.org/abs/2309.11740
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author Wang, Qian
Robnik, Marko
author_facet Wang, Qian
Robnik, Marko
contents How the mixed eigenstates vary with approaching the semiclassical limit in mixed-type many-body quantum systems is an interesting but still less known question. Here, we address this question in the Dicke model, a celebrated many-body model that has a well defined semiclassical limit and undergoes a transition to chaos in both quantum and classical case. Using the Husimi function, we show that the eigenstates of the Dicke model with mixed-type classical phase space can be classified into different types. To quantitatively characterize the types of eigenstates, we study the phase space overlap index, which is defined in terms of Husimi function. We look at the probability distribution of the phase space overlap index and investigate how it changes with increasing system size, that is, when approaching the semiclassical limit. We show that increasing the system size gives rise to a power-law decay in the behavior of the relative proportion of mixed eigenstates. Our findings shed more light on the properties of eigenstates in mixed-type many-body systems and suggest that the principle of uniform semiclassical condensation of Husimi functions should also be valid for many-body quantum systems.
format Preprint
id arxiv_https___arxiv_org_abs_2309_11740
institution arXiv
publishDate 2023
record_format arxiv
spellingShingle Mixed eigenstates in the Dicke model: Statistics and power-law decay of the relative proportion in the semiclassical limit
Wang, Qian
Robnik, Marko
Quantum Physics
Chaotic Dynamics
How the mixed eigenstates vary with approaching the semiclassical limit in mixed-type many-body quantum systems is an interesting but still less known question. Here, we address this question in the Dicke model, a celebrated many-body model that has a well defined semiclassical limit and undergoes a transition to chaos in both quantum and classical case. Using the Husimi function, we show that the eigenstates of the Dicke model with mixed-type classical phase space can be classified into different types. To quantitatively characterize the types of eigenstates, we study the phase space overlap index, which is defined in terms of Husimi function. We look at the probability distribution of the phase space overlap index and investigate how it changes with increasing system size, that is, when approaching the semiclassical limit. We show that increasing the system size gives rise to a power-law decay in the behavior of the relative proportion of mixed eigenstates. Our findings shed more light on the properties of eigenstates in mixed-type many-body systems and suggest that the principle of uniform semiclassical condensation of Husimi functions should also be valid for many-body quantum systems.
title Mixed eigenstates in the Dicke model: Statistics and power-law decay of the relative proportion in the semiclassical limit
topic Quantum Physics
Chaotic Dynamics
url https://arxiv.org/abs/2309.11740