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Main Authors: Bozkurt, Deniz N., García, Juan Miguel Nieto, Kong, Ziwen, Pomoni, Elli
Format: Preprint
Published: 2025
Subjects:
Online Access:https://arxiv.org/abs/2507.08934
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author Bozkurt, Deniz N.
García, Juan Miguel Nieto
Kong, Ziwen
Pomoni, Elli
author_facet Bozkurt, Deniz N.
García, Juan Miguel Nieto
Kong, Ziwen
Pomoni, Elli
contents We study the spin chain model capturing the one-loop spectral problem of the simplest $\mathcal{N}=2$ superconformal quiver gauge theory in four dimensions, obtained from a marginal deformation of the $\mathbb{Z}_2$ orbifold of $\mathcal{N}=4$ SYM. In Part I of this work \cite{Bozkurt:2024tpz}, we solved for the three-magnon eigenvector and found that it exhibits long-range behavior, despite the Hamiltonian being of nearest-neighbor type. In this paper, we extend the analysis to the four-magnon sector and construct explicit eigenvectors. These solutions are compatible with both untwisted and twisted periodic boundary conditions, and they allow for the computation of anomalous dimensions of single-trace operators of the gauge theory. We validate our results by direct comparison with brute-force diagonalization of the spin chain Hamiltonian. Additionally, we uncover a novel structural relation between eigenstates with different numbers of excitations. In particular, we show that the four-magnon eigenstates can be written in terms of the three-magnon solution, revealing a recursive pattern and hinting at a deeper underlying structure. Lastly, the four-magnon solution obeys an infinite tower of Yang-Baxter equations, as was the case for the three-magnon solution.
format Preprint
id arxiv_https___arxiv_org_abs_2507_08934
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Long-range to the Rescue of Yang-Baxter II
Bozkurt, Deniz N.
García, Juan Miguel Nieto
Kong, Ziwen
Pomoni, Elli
High Energy Physics - Theory
We study the spin chain model capturing the one-loop spectral problem of the simplest $\mathcal{N}=2$ superconformal quiver gauge theory in four dimensions, obtained from a marginal deformation of the $\mathbb{Z}_2$ orbifold of $\mathcal{N}=4$ SYM. In Part I of this work \cite{Bozkurt:2024tpz}, we solved for the three-magnon eigenvector and found that it exhibits long-range behavior, despite the Hamiltonian being of nearest-neighbor type. In this paper, we extend the analysis to the four-magnon sector and construct explicit eigenvectors. These solutions are compatible with both untwisted and twisted periodic boundary conditions, and they allow for the computation of anomalous dimensions of single-trace operators of the gauge theory. We validate our results by direct comparison with brute-force diagonalization of the spin chain Hamiltonian. Additionally, we uncover a novel structural relation between eigenstates with different numbers of excitations. In particular, we show that the four-magnon eigenstates can be written in terms of the three-magnon solution, revealing a recursive pattern and hinting at a deeper underlying structure. Lastly, the four-magnon solution obeys an infinite tower of Yang-Baxter equations, as was the case for the three-magnon solution.
title Long-range to the Rescue of Yang-Baxter II
topic High Energy Physics - Theory
url https://arxiv.org/abs/2507.08934