Z3 generalization of the Kitaev's spin-1/2 model

Abstract

We generalize the Kitaev's spin-1/2 model on the honeycomb by introducing a two-dimensional Z3 clock model on the triangular lattice with three body interaction. We discuss various properties of this model and show that the low energy theory of the Z3 generalized Kitaev model (GKM) is described by a single Z3 parafermion per lattice site coupled to a Z3 gauge field. We also introduce a slave-fermion approach for this GKM, treat the resulting fermionic Hamiltonian at the mean-field level, solve the mean field parameters self-consistently, and obtain the low energy effective Chern-Simons (CS) gauge theory. The resulting CS gauge theory is identical to that of a (221) fractional quantum Hall state. We then go beyond the mean-field approximation and demonstrate that fluctuations generate a uniform interlayer pairing for the dual (221) bilayer state. We argue that this perturbed system can undergo a phase transition to the Fibonacci phase by tuning the interlayer pairing strength.