\(Q\)-operators for higher spin eight vertex models with a rational anisotropy parameter
From MaRDI portal
Publication:2318013
DOI10.1007/S11005-019-01179-7zbMath1425.82006arXiv1810.12969OpenAlexW2898813718MaRDI QIDQ2318013
Publication date: 13 August 2019
Published in: Letters in Mathematical Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1810.12969
Quantum groups and related algebraic methods applied to problems in quantum theory (81R50) Exactly solvable models; Bethe ansatz (82B23)
Cites Work
- Unnamed Item
- Unnamed Item
- \(Q\)-operators for higher spin eight vertex models with an even number of sites
- Some algebraic structures connected with the Yang-Baxter equation. Representations of quantum algebras
- \(Q\)-operators in the six-vertex model
- Baxter's relations and spectra of quantum integrable models
- New Q matrices and their functional equations for the eight vertex model at elliptic roots of unity
- Some algebraic structures connected with the Yang-Baxter equation
- Integrable structure of conformal field theory. II: \(Q\)-operator and DDV equation
- Integrable structure of conformal field theory. III: The Yang-Baxter relation
- Tata lectures on theta. I: Introduction and motivation: Theta functions in one variable. Basic results on theta functions in several variables. With the assistance of C. Musili, M. Nori, E. Previato, and M. Stillman
- New developments in the eight vertex model
- Baxter operators with deformed symmetry
- An elementary approach to \(6j\)-symbols (classical, quantum, rational, trigonometric, and elliptic)
- On the Yang-Baxter equation for the six-vertex model
- New developments in the eight vertex model. II: Chains of odd length
- Partition function of the eight-vertex lattice model
- The vertex-face correspondence and the elliptic \(6j\)-symbols
- New elliptic solutions of the Yang-Baxter equation
- Chiral Potts model as a descendant of the six-vertex model
- Fusion operators in the generalized τ(2)-model and root-of-unity symmetry of theXXZspin chain of higher spin
- A newQ-matrix in the eight-vertex model
- Generalized Bethe ansatz with the general spin representations of the Sklyanin algebra
- Bethe ansatz for higher spin eight-vertex models
- Bethe ansatz for higher-spinXYZmodels - low-lying excitations
- Commuting difference operators with elliptic coefficients from Baxter's vacuum vectors
- TheQ-operator and functional relations of the eight-vertex model at root-of-unity \eta = \frac{2m K}{N} for oddN
- On Baxter's Q operator of the higher spin XXZ chain at the Razumov-Stroganov point
- TheTQequation of the eight-vertex model for complex elliptic roots of unity
- Eight-vertex model in lattice statistics and one-dimensional anisotropic Heisenberg chain. I: Some fundamental eigenvectors.
- Eight-vertex model in lattice statistics and one-dimensional anisotropic Heisenberg chain. III: Eigenvectors of the transfer matrix and Hamiltonian.
- Eight-vertex model in lattice statistics and one-dimensional anisotropic Heisenberg chain. II: Equivalence to a generalized ice-type lattice model.
This page was built for publication: \(Q\)-operators for higher spin eight vertex models with a rational anisotropy parameter
