A representation basis for the quantum integrable spin chain associated with the \(su(3)\) algebra
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Publication:1638695
DOI10.1007/JHEP05(2016)119zbMath1388.81541arXiv1601.04771MaRDI QIDQ1638695
Wen-Li Yang, Guang-Liang Li, Yupeng Wang, Junpeng Cao, Kun Hao, Kang-jie Shi
Publication date: 12 June 2018
Published in: Journal of High Energy Physics (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1601.04771
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Cites Work
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- Bethe states of the XXZ spin-\(\frac{1}{2}\) chain with arbitrary boundary fields
- Review of AdS/CFT integrability, chapter VI.1: Superconformal symmetry
- \(Q\)-operator and \(T\)-\(Q\) relation from the fusion hierarchy
- Generalized \(q\)-Onsager algebras and boundary affine Toda field theories
- Thermodynamic limit and surface energy of the \(XXZ\) spin chain with arbitrary boundary fields
- Drinfeld twists and algebraic Bethe ansatz of the supersymmetric model associated with \(U_q(\mathrm{gl}(m| n))\)
- Exact solution of the \(XXZ\) Gaudin model with generic open boundaries
- Magic in the spectra of the \(XXZ\) quantum chain with boundaries at \(\Delta =0\) and \(\Delta = - 1/2\)
- The \(q\)-deformed analogue of the Onsager algebra: beyond the Bethe ansatz approach
- Spin-\(\frac{1}{2}\) XYZ model revisit: general solutions via off-diagonal Bethe ansatz
- Modified algebraic Bethe ansatz for XXZ chain on the segment - I: Triangular cases
- Modified algebraic Bethe ansatz for XXZ chain on the segment. II: General cases
- Separation of variables in the open \(XXX\) chain
- Determinant representations of correlation functions for the supersymmetric \(t\)-\(J\) model
- Quantum R matrix for the generalized Toda system
- Goryachev-Chaplygin top and the inverse scattering method
- Diagonalization of the \(XXZ\) Hamiltonian by vertex operators
- The large \(N\) limit of superconformal field theories and supergravity
- Separation of variables in the quantum integrable models related to the Yangian \(\mathcal Y [sl (3)\)]
- Exact solution of XXZ spin chain with unparallel boundary fields
- \(XXZ\) chain with a boundary
- Difference equations in spin chains with a boundary
- The quantum inverse scattering method for Hubbard-like models.
- Functional relations and Bethe Ansatz for the \(XXZ\) chain
- Boundary quantum group generators of type A
- Algebraic Bethe ansatz for the eight-vertex model with general open boundary conditions
- Antiperiodic spin-1/2 \(XXZ\) quantum chains by separation of variables: complete spectrum and form factors
- The half-infinite XXZ chain in Onsager's approach
- Off-diagonal Bethe ansatz solution of the XXX spin chain with arbitrary boundary conditions
- Off-diagonal Bethe ansatz solutions of the anisotropic spin-\(\frac{1}{2}\) chains with arbitrary boundary fields
- Correlation functions of the half-infinite XXZ spin chain with a triangular boundary
- Bethe vectors of quantum integrable models with \(\mathrm{GL}(3)\) trigonometric \(R\)-matrix
- Heisenberg XXX model with general boundaries: eigenvectors from algebraic Bethe ansatz
- Bethe ansatz for an AdS/CFT open spin chain with non-diagonal boundaries
- Polarization-free generators for the Belavin model
- Equivalences between spin models induced by defects
- On quantum group symmetry and Bethe ansatz for the asymmetric twin spin chain with integrable boundary
- Functional Bethe ansatz methods for the openXXXchain
- Colloquium: Exactly solvable Richardson-Gaudin models for many-body quantum systems
- Bethe ansatz for the Temperley–Lieb loop model with open boundaries
- Non-diagonal open spin-1/2XXZquantum chains by separation of variables: complete spectrum and matrix elements of some quasi-local operators
- Exact solution of the one-dimensional super-symmetrict–Jmodel with unparallel boundary fields
- Open spin chains with generic integrable boundaries: Baxter equation and Bethe ansatz completeness from separation of variables
- Retrieve the Bethe states of quantum integrable models solved via the off-diagonal Bethe Ansatz
- Exact solution of ansu(n) spin torus
- The XXZ model with anti-periodic twisted boundary conditions
- Bethe ansatz solution of the open XXZ chain with nondiagonal boundary terms
- Exact solution of the Perk-Schultz model
- Resolution of the nested hierarchy for rationalsl(n) models
- Bethe ansatz solution of the openXXspin chain with non-diagonal boundary terms
- Boundary conditions for integrable quantum systems
- Exact solution and interfacial tension of the six-vertex model with anti-periodic boundary conditions
- An antiperiodic dynamical six-vertex model: I. Complete spectrum by SOV, matrix elements of the identity on separate states and connections to the periodic eight-vertex model
- One-boundary Temperley–Lieb algebras in the XXZ and loop models
- The openXXZand associated models atqroot of unity
- Exact spectrum of the XXZ open spin chain from theq-Onsager algebra representation theory
- Off-Diagonal Bethe Ansatz for Exactly Solvable Models
- Difference equations for the correlation functions of the eight-vertex model
- ON THE CONSTRUCTION OF CORRELATION FUNCTIONS FOR THE INTEGRABLE SUPERSYMMETRIC FERMION MODELS
- Solving the open \(XXZ\) spin chain with nondiagonal boundary terms at roots of unity
- Modified algebraic Bethe ansatz for XXZ chain on the segment. III. Proof
