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$\mathbb{Z}_3$ Parafermionic Chain Emerging From Yang-Baxter Equation

Quantum Physics 2016-02-05 v3 Mathematical Physics math.MP

Abstract

We construct the 1D Z3\mathbb{Z}_3 parafermionic model based on the solution of Yang-Baxter equation and express the model by three types of fermions. It is shown that the Z3\mathbb{Z}_3 parafermionic chain possesses both triple degenerate ground states and non-trivial topological winding number. Hence, the Z3\mathbb{Z}_3 parafermionic model is a direct generalization of 1D Z2\mathbb{Z}_2 Kitaev model. Both the Z2\mathbb{Z}_2 and Z3\mathbb{Z}_3 model can be obtained from Yang-Baxter equation. On the other hand, to show the algebra of parafermionic tripling intuitively, we define a new 3-body Hamiltonian H^123\hat{H}_{123} based on Yang-Baxter equation. Different from the Majorana doubling, the H^123\hat{H}_{123} holds triple degeneracy at each of energy levels. The triple degeneracy is protected by two symmetry operators of the system, ω\omega-parity PP(ω=ei2π3\omega=e^{{\textrm{i}\frac{2\pi}{3}}}) and emergent parafermionic operator Γ\Gamma, which are the generalizations of parity PMP_{M} and emergent Majorana operator in Lee-Wilczek model, respectively. Both the Z3\mathbb{Z}_3 parafermionic model and H^123\hat{H}_{123} can be viewed as SU(3) models in color space. In comparison with the Majorana models for SU(2), it turns out that the SU(3) models are truly the generalization of Majorana models resultant from Yang-Baxter equation.

Keywords

Cite

@article{arxiv.1507.05269,
  title  = {$\mathbb{Z}_3$ Parafermionic Chain Emerging From Yang-Baxter Equation},
  author = {Li-Wei Yu and Mo-Lin Ge},
  journal= {arXiv preprint arXiv:1507.05269},
  year   = {2016}
}

Comments

Main text: 12 pages; Supplementary: 4 pages

R2 v1 2026-06-22T10:14:33.403Z