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paper

Fractional Quantum Hall Effect in Topological Flat Bands with Chern Number Two

arXiv:1204.1697 · doi:10.1103/PhysRevB.86.201101

Abstract

Recent theoretical works have demonstrated various robust Abelian and non-Abelian fractional topological phases in lattice models with topological flat bands carrying Chern number C=1. Here we study hard-core bosons and interacting fermions in a three-band triangular-lattice model with the lowest topological flat band of Chern number C=2. We find convincing numerical evidence of bosonic fractional quantum Hall effect at the $ν=1/3$ filling characterized by three-fold quasi-degeneracy of ground states on a torus, a fractional Chern number for each ground state, a robust spectrum gap, and a gap in quasihole excitation spectrum. We also observe numerical evidence of a robust fermionic fractional quantum Hall effect for spinless fermions at the $ν=1/5$ filling with short-range interactions.

5 pages, 7 figures, with Supplementary Material