QQ-system and Weyl-type transfer matrices in integrable SO(2r) spin chains

Ferrando, Gwenaël; Frassek, Rouven; Казаков, Владимир

doi:10.1007/jhep02(2021)193

Cited by 19 publications

(19 citation statements)

References 85 publications

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“…Another interesting direction is developing SoV for higher rank spin chains with different symmetry groups such as so(N ) where progress was made recently in [75,76]. Other natural extensions include the super-symmetric case (see [18,77] for related results), boundary problems and q-deformations (see [15,78] for recent work).…”

Section: Jhep05(2021)169mentioning

confidence: 99%

Determinant form of correlators in high rank integrable spin chains via separation of variables

Gromov

Levkovich-Maslyuk

Ryan

2021

J. High Energ. Phys.

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In this paper we take further steps towards developing the separation of variables program for integrable spin chains with $$ \mathfrak{gl}(N) $$ gl N symmetry. By finding, for the first time, the matrix elements of the SoV measure explicitly we were able to compute correlation functions and wave function overlaps in a simple determinant form. In particular, we show how an overlap between on-shell and off-shell algebraic Bethe states can be written as a determinant. Another result, particularly useful for AdS/CFT applications, is an overlap between two Bethe states with different twists, which also takes a determinant form in our approach. Our results also extend our previous works in collaboration with A. Cavaglia and D. Volin to general values of the spin, including the SoV construction in the higher-rank non-compact case for the first time.

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Section: Jhep05(2021)169mentioning

confidence: 99%

Determinant form of correlators in high rank integrable spin chains via separation of variables

Gromov

Levkovich-Maslyuk

Ryan

2021

J. High Energ. Phys.

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“…The authors provided explicit examples of spinorspinor R-matrices of low rank and commented on the corresponding cases of the algebraic Bethe ansatz. Similar spectral problems were also addressed by Reshetikhin in [4], De Vega and Karowski in [5], Babujian, Foerster and Karowski in [6,7], Ferrando, Frassek and Kazakov in [8], Liashyk and Pakuliak in [9], and Gerrard together with the author in [10].…”

Section: Introductionmentioning

confidence: 57%

“…in [17]. Moreover, it would be interesting to construct q-deformed spinor-oscillator R-matrices and investigate the spinor-type QQ-system following the steps of Ferrando, Frassek and Kazakov in [8]. Lastly, we believe this work might help to better undertstand the Bethe ansazt for fishnets and fishchains emerging in the AdS/CFT integrability framework, see [18][19][20][21] and references therein.…”

Section: Discussionmentioning

confidence: 99%

Algebraic Bethe Ansatz for spinor R-matrices

Regelskis

2022

SciPost Phys.

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“…For so 2r models, candidates for analogs of Q a can be spotted in the work [8] by G. Ferrando, R. Frassek, and V. Kazakov who considered Q-system on the Weyl orbit (we use the terminology of [5]) and proposed determinant-type formulae for transfer matrices in symmetric powers of the vector representation. These formulae feature only r Q-functions and, by simple inspection, are gl r -invariant, where gl r ⊂ so 2r corresponds to the standard embedding U(r) ⊂ SO(2r) (we do not need to specify real forms and hence select gl r for notation).…”

Section: Introductionmentioning

confidence: 99%

“…We build on the findings of [5] and [8] to offer and investigate the explicit gl r -covariant description of so 2r Bethe algebra. The key observation is the following: Because Qfunctions are Plücker coordinates, those of them who define maximal isotropic subspaces are components of pure spinors.…”

Section: Introductionmentioning

confidence: 99%