Bosonic symmetry protected topological phases with reflection symmetry

Abstract

We study two-dimensional bosonic symmetry protected topological (SPT) phases which are protected by reflection symmetry and local symmetry [ZN R, ZN× R, U(1) R, or U(1)× R], in the search for two-dimensional bosonic analogs of topological crystalline insulators in integer-S spin systems with reflection and spin-rotation symmetries. To classify them, we employ a Chern-Simons approach and examine the stability of edge states against perturbations that preserve the assumed symmetries. We find that SPT phases protected by ZN R symmetry are classified as Z2×Z2 for even N and 0 (no SPT phase) for odd N while those protected by U(1) R symmetry are Z2. We point out that the two-dimensional Affleck-Kennedy-Lieb-Tasaki state of S=2 spins on the square lattice is a Z2 SPT phase protected by reflection and π-rotation symmetries.