English

Twofold twist defect chains at criticality

Strongly Correlated Electrons 2017-12-06 v1 Statistical Mechanics

Abstract

The twofold twist defects in the D(Zk)D(\mathbb{Z}_k) quantum double model (abelian topological phase) carry non-abelian fractional Majorana-like characteristics. We align these twist defects in a line and construct a one dimensional Hamiltonian which only includes the pairwise interaction. For the defect chain with even number of twist defects, it is equivalent to the Zk\mathbb{Z}_k clock model with periodic boundary condition (up to some phase factor for boundary term), while for odd number case, it maps to Zk\mathbb{Z}_k clock model with duality twisted boundary condition. At critical point, for both cases, the twist defect chain enjoys an additional translation symmetry, which corresponds to the Kramers-Wannier duality symmetry in the Zk\mathbb{Z}_k clock model and can be generated by a series of braiding operators for twist defects. We further numerically investigate the low energy excitation spectrum for k=3, 4, 5k=3,~4,~5 and 66. For even-defect chain, the critical points are the same as the Zk\mathbb{Z}_k clock conformal field theories (CFTs), while for odd-defect chain, when k4k\neq 4, the critical points correspond to orbifolding a Z2\mathbb{Z}_2 symmetry of CFTs of the even-defect chain. For k=4k=4 case, we numerically observe some similarity to the Z4\mathbb{Z}_4 twist fields in SU(2)1/D4SU(2)_1/D_4 orbifold CFT.

Keywords

Cite

@article{arxiv.1709.05560,
  title  = {Twofold twist defect chains at criticality},
  author = {Xiongjie Yu and Xiao Chen and Abhishek Roy and Jeffrey C. Y. Teo},
  journal= {arXiv preprint arXiv:1709.05560},
  year   = {2017}
}

Comments

18 pages, 15 figures

R2 v1 2026-06-22T21:45:31.960Z