Solvable lattice model for (2+1)D bosonic topological insulator

Abstract

We construct an exactly sovable commuting projector Hamiltonian for (2+1)D bosonic topological insulator which is one of symmetry-protected topological (SPT) phases protected by U(1) and time-reversal Z2T symmetry, where the symmetry group is U(1)2T. The model construction is based on the decorated domain-wall interpretation of the E∞-page of a spectral sequence of a cobordism group that classifies the SPT phases in question. We demonstrate nontriviality of the model by showing an emergence of a Kramers doublet when the system is put on a semi-infinite cylinder (-∞,0]× S1 with an inserted π-flux. The surface anomaly manifests itself as a non-onsite representation of the U(1)2T symmetry. Anomaly matching on a boundary is discussed within a simple boundary theory.