Related papers: Exact solutions of few-magnon problems in the spin-$S$ periodic XXZ chain

Exact solutions of few-magnon problems in the spin-$S$ periodic XXZ chain

URL: http://arxiv.org/abs/2106.14809v4
Date: Mon, 14 Feb 2022 17:09:50 GMT
Title: Exact solutions of few-magnon problems in the spin-$S$ periodic XXZ chain
Authors: Ning Wu, Hosho Katsura, Sheng-Wen Li, Xiaoming Cai, Xi-Wen Guan
Abstract summary: We solve few-magnon problems for a finite-size spin-$S$ periodic Heisenberg XXZ chain with single-ion anisotropy. In the absence of the single-ion anisotropy, we reveal the condition under which exact zero-energy states emerge.
Score: 3.4837954073338486
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: We solve few-magnon problems for a finite-size spin-$S$ periodic Heisenberg XXZ chain with single-ion anisotropy through constructing sets of exact Bloch states achieving block diagonalization of the system. Concretely, the two-magnon (three-magnon) problem is converted to a single-particle one on a one-dimensional (two-dimensional) effective lattice whose size depends linearly (quadratically) on the total number of sites. For parameters lying within certain ranges, various types of multimagnon bound states are manifested and shown to correspond to edge states on the effective lattices. In the absence of the single-ion anisotropy, we reveal the condition under which exact zero-energy states emerge. As applications of the formalism, we calculate the transverse dynamic structure factor for a higher-spin chain near saturation magnetization and find signatures of the multimagnon bound states. We also calculate the real-time three-magnon dynamics from certain localized states, which are relevant to cold-atom quantum simulations, by simulating single-particle quantum walks on the effective lattices. This provides a physically transparent interpretation of the observed dynamics in terms of propagation of bound state excitations. Our method can be directly applied to more general spin or itinerant particle systems possessing translational symmetry.

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