Related papers: Numerical investigations of the extensive entanglement Hamiltonian in quantum spin ladders

Numerical investigations of the extensive entanglement Hamiltonian in quantum spin ladders

URL: http://arxiv.org/abs/2311.01699v2
Date: Thu, 23 May 2024 05:43:39 GMT
Title: Numerical investigations of the extensive entanglement Hamiltonian in quantum spin ladders
Authors: Chengshu Li, Xingyu Li, Yi-Neng Zhou,
Abstract summary: Entanglement constitutes one of the key concepts in quantum mechanics and serves as an indispensable tool in the understanding of quantum many-body systems. We perform extensive numerical investigations of extensive entanglement properties of coupled quantum spin chains.
Score: 9.617349193925188
License: http://creativecommons.org/licenses/by/4.0/
Abstract: Entanglement constitutes one of the key concepts in quantum mechanics and serves as an indispensable tool in the understanding of quantum many-body systems. In this work, we perform extensive numerical investigations of extensive entanglement properties of coupled quantum spin chains. This setup has proven useful for e.g. extending the Lieb-Schultz-Mattis theorem to open systems, and contrasts the majority of previous research where the entanglement cut has one lower dimension than the system. We focus on the cases where the entanglement Hamiltonian is either gapless or exhibits spontaneous symmetry breaking behavior. We further employ conformal field theoretical formulae to identify the universal behavior in the former case. The results in our work can serve as a paradigmatic starting point for more systematic exploration of the largely uncharted physics of extensive entanglement, both analytical and numerical.

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