Related papers: Quantum reservoir probing of quantum phase transitions

Quantum reservoir probing of quantum phase transitions

URL: http://arxiv.org/abs/2402.07097v2
Date: Tue, 11 Jun 2024 07:44:29 GMT
Title: Quantum reservoir probing of quantum phase transitions
Authors: Kaito Kobayashi, Yukitoshi Motome,
Abstract summary: We show that quantum phase transitions can be detected through localized out-of-equilibrium excitations induced by local quantum quenches. The impacts of the local quenches vary across different quantum phases and are significantly suppressed by quantum fluctuations amplified near quantum critical points. We demonstrate that the QRP can detect quantum phase transitions in the paradigmatic integrable and nonintegrable quantum systems, and even topological quantum phase transitions.
Score: 0.0
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Quantum phase transitions are highly remarkable phenomena manifesting in quantum many-body systems. However, their precise identifications in equilibrium systems pose significant theoretical and experimental challenges. Thus far, dynamical detection protocols employing global quantum quenches have been proposed, wherein transitions are discerned from global nonequilibrium excitations. In this work, we demonstrate that quantum phase transitions can be detected through localized out-of-equilibrium excitations induced by local quantum quenches. While the resulting dynamics after the quench are influenced by both the local quench operation and the intrinsic dynamics of the quantum system, the effects of the former are exclusively extracted through the cutting-edge framework called quantum reservoir probing (QRP). Through the QRP, we find that the impacts of the local quenches vary across different quantum phases and are significantly suppressed by quantum fluctuations amplified near quantum critical points, thereby precisely delineating phase boundaries. We demonstrate that the QRP can detect quantum phase transitions in the paradigmatic integrable and nonintegrable quantum systems, and even topological quantum phase transitions, all within the identical framework employing single-site observables.

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