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}
}

Tables from this paper

References

SHOWING 1-10 OF 51 REFERENCES

ℤn Baxter model: Symmetries and the Belavin parametrization

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.

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.

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

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

Yang-Baxter equation and representation theory: I

The problem of constructing the GL(N,ℂ) solutions to the Yang-Baxter equation (factorizedS-matrices) is considered. In caseN=2 all the solutions for arbitrarily finite-dimensional irreducible

Exact solution of the Heisenberg XXZ model of spin s

A generalization of the Heisenberg XXZ model to the case of arbitrary spin with anisotropy of “light-plane” type is investigated. The base state of the system, the spectrum of excitations over it,
...