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Reviving the Lieb–Schultz–Mattis theorem in open quantum systems

Yi-Neng Zhou, Xingyu Li, Hui Zhai, Chengshu Li, Yingfei Gu

2024National Science Review13 citationsDOIOpen Access PDF

Abstract

In closed systems, the celebrated Lieb-Schultz-Mattis (LSM) theorem states that a one-dimensional locally interacting half-integer spin chain with translation and spin rotation symmetries cannot have a non-degenerate gapped ground state. However, the applicability of this theorem is diminished when the system interacts with a bath and loses its energy conservation. In this letter, we propose that the LSM theorem can be revived in the entanglement Hamiltonian when the coupling to the bath renders the system short-range correlated. Specifically, we argue that the entanglement spectrum cannot have a non-degenerate minimum, isolated by a gap from other states. We further support the results with numerical examples where a spin-[Formula: see text] system is coupled to another spin-[Formula: see text] chain serving as the bath. Compared with the original LSM theorem that primarily addresses UV-IR correspondence, our findings reveal that the UV data and topological constraints also play a pivotal role in shaping the entanglement in open quantum many-body systems.

Topics & Concepts

Degenerate energy levelsQuantum entanglementHamiltonian (control theory)PhysicsHomogeneous spaceQuantum mechanicsTranslation (biology)QuantumSpin (aerodynamics)Theoretical physicsMathematical physicsMathematicsChemistryThermodynamicsGeneMathematical optimizationBiochemistryMessenger RNAGeometryQuantum many-body systemsAdvanced Condensed Matter PhysicsPhysics of Superconductivity and Magnetism
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