Related papers: A Pedestrian's Way to Baxter's Bethe Ansatz for the Periodic XYZ Chain

A Pedestrian's Way to Baxter's Bethe Ansatz for the Periodic XYZ Chain

URL: http://arxiv.org/abs/2312.00161v2
Date: Wed, 20 Mar 2024 11:41:55 GMT
Title: A Pedestrian's Way to Baxter's Bethe Ansatz for the Periodic XYZ Chain
Authors: Xin Zhang, Andreas Klümper, Vladislav Popkov,
Abstract summary: We construct a set of chiral vectors with fixed number of kinks. Under roots of unity conditions, the Hilbert space has an invariant subspace. We propose a Bethe ansatz based on the action of the Hamiltonian on the chiral vectors.
Score: 2.1797546092115803
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: A chiral coordinate Bethe ansatz method is developed to study the periodic XYZ chain. We construct a set of chiral vectors with fixed number of kinks. All vectors are factorized and have simple structures. Under roots of unity conditions, the Hilbert space has an invariant subspace and our vectors form a basis of this subspace. We propose a Bethe ansatz solely based on the action of the Hamiltonian on the chiral vectors, avoiding the use of transfer matrix techniques. This allows to parameterize the expansion coefficients and derive the homogeneous Bethe ansatz equations whose solutions give the exact energies and eigenstates. Our analytic results agree with earlier approaches, notably by Baxter, and are supported by numerical calculations.

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