折叠自旋1/2 XXZ模型:1 .对角化、干扰和基态性质

arXiv: Statistical Mechanics Pub Date : 2020-09-10 DOI:10.21468/SCIPOSTPHYSCORE.4.2.010

Lenart Zadnik, M. Fagotti

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引用次数: 42

摘要

本文研究了自旋-1/2 XXZ模型强耦合极限下中时间尺度状态的有效哈密顿生成时间演化。首先，它描述了一个具有局部相互作用的可积模型。我们用坐标Bethe Ansatz完全解决了这个问题，它明显打破了平移对称。我们证明了指数级多的阻塞态的存在，并估计了它们在有效哈密顿量的先导修正下的稳定性。讨论了该模型的一些基态性质。

本文章由计算机程序翻译，如有差异，请以英文原文为准。

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The Folded Spin-1/2 XXZ Model: I. Diagonalisation, Jamming, and Ground State Properties

We study an effective Hamiltonian generating time evolution of states on intermediate time scales in the strong-coupling limit of the spin-1/2 XXZ model. To leading order, it describes an integrable model with local interactions. We solve it completely by means of a coordinate Bethe Ansatz that manifestly breaks the translational symmetry. We demonstrate the existence of exponentially many jammed states and estimate their stability under the leading correction to the effective Hamiltonian. Some ground state properties of the model are discussed.

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