Fractional Chern Insulator

TL;DR

This paper demonstrates that partially filled Chern insulators at 1/3 filling exhibit fractional quantum Hall effects with unique topological properties, confirmed through numerical analysis of interactions and entanglement spectra.

Contribution

It provides conclusive evidence of fractional quantum Hall states in Chern insulators and rules out charge-density wave states, highlighting the topological nature of these fractional states.

Findings

Incompressible 3-fold degenerate ground state with specific momentum properties

Fractional statistics excitations matching Laughlin quasiholes

Finite entanglement gap indicating topological order

Abstract

Chern insulators are band insulators exhibiting a nonzero Hall conductance but preserving the lattice translational symmetry. We conclusively show that a partially filled Chern insulator at 1/3 filling exhibits a fractional quantum Hall effect and rule out charge-density wave states that have not been ruled out by previous studies. By diagonalizing the Hubbard interaction in the flat-band limit of these insulators, we show the following: The system is incompressible and has a 3-fold degenerate ground state whose momenta can be computed by postulating an generalized Pauli principle with no more than 1 particle in 3 consecutive orbitals. The ground state density is constant, and equal to 1/3 in momentum space. Excitations of the system are fractional statistics particles whose total counting matches that of quasiholes in the Laughlin state based on the same generalized Pauli principle. The entanglement spectrum of the state has a clear entanglement gap which seems to remain finite in the thermodynamic limit. The levels below the gap exhibit counting identical to that of Laughlin 1/3 quasiholes. Both the 3 ground states and excited states exhibit spectral flow upon flux insertion. All the properties above disappear in the trivial state of the insulator - both the many-body energy gap and the entanglement gap close at the phase transition when the single-particle Hamiltonian goes from topologically nontrivial to topologically trivial. These facts clearly show that fractional many-body states are possible in topological insulators.