On the solutions of the Z n -Belavin model with arbitrary number of sites

K. Hao; Junpeng Cao; Guang-Liang Li; Wen-Li Yang; K. Shi; Yupeng Wang

DOI:10.1016/j.nuclphysb.2017.04.019
Corpus ID: 119639849

On the solutions of the Z n -Belavin model with arbitrary number of sites

@article{Hao2016OnTS,
  title={On the solutions of the Z n -Belavin model with arbitrary number of sites},
  author={Kun Hao and Junpeng Cao and Guang-Liang Li and Wen-Li Yang and Kangjie Shi and Yupeng Wang},
  journal={Nuclear Physics},
  year={2016},
  volume={920},
  pages={419-441}
}

K. HaoJunpeng Cao Yupeng Wang
Published 4 September 2016
Mathematics
Nuclear Physics

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Spin-1/2 XYZ model revisit: General solutions via off-diagonal Bethe ansatz

Junpeng CaoS. CuiWen-Li YangK. ShiYupeng Wang
Mathematics
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Algebraic Bethe ansatz for the elliptic quantum group Eτ,η(sln) and its applications

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Mathematics
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The ℤn Baxter model is an exactly solvable lattice model in the special case of the Belavin parametrization. For this parametrization we calculate the partition function,κ, in an antiferromagnetic…

Off-diagonal Bethe ansatz and exact solution of a topological spin ring.

Junpeng CaoWen-Li YangK. ShiYupeng Wang
Physics
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A general method is proposed for constructing the Bethe ansatz equations of integrable models without U(1) symmetry and it is found that the excitation spectrum shows a nontrivial topological nature.

Off-diagonal Bethe ansatz solutions of the anisotropic spin-12 chains with arbitrary boundary fields

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M. JimboT. MiwaM. Okado
Mathematics
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A new hierarchy of solvable IRF models is presented. It is generated from Belavin's Zn×Znsymmetric model. The site variables take values in the set of level l dominant integral weights of A−1(1). It…

Partition function of the eight vertex lattice model

R. Baxter
Physics
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On the solutions of the Z n -Belavin model with arbitrary number of sites

Tables from this paper

References

Spin-1/2 XYZ model revisit: General solutions via off-diagonal Bethe ansatz

Algebraic Bethe ansatz for the elliptic quantum group Eτ,η(sln) and its applications

ℤn Baxter model: Symmetries and the Belavin parametrization

Off-diagonal Bethe ansatz and exact solution of a topological spin ring.

Off-diagonal Bethe ansatz solutions of the anisotropic spin-12 chains with arbitrary boundary fields

Solvable lattice models whose states are dominant integral weights of Ait−1(1)

Partition function of the eight vertex lattice model

Yang-Baxter equation and representation theory: I

Off-diagonal Bethe ansatz solution of the XXX spin chain with arbitrary boundary conditions

Exact solution of the Heisenberg XXZ model of spin s

On the solutions of the Z n -Belavin model with arbitrary number of sites

Tables from this paper

References

Spin-1/2 XYZ model revisit: General solutions via off-diagonal Bethe ansatz

Algebraic Bethe ansatz for the elliptic quantum group Eτ,η(sln) and its applications

ℤn Baxter model: Symmetries and the Belavin parametrization

Off-diagonal Bethe ansatz and exact solution of a topological spin ring.

Off-diagonal Bethe ansatz solutions of the anisotropic spin-12 chains with arbitrary boundary fields

Solvable lattice models whose states are dominant integral weights of Ait−1(1)

Partition function of the eight vertex lattice model

Yang-Baxter equation and representation theory: I

Off-diagonal Bethe ansatz solution of the XXX spin chain with arbitrary boundary conditions

Exact solution of the Heisenberg XXZ model of spin s

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