We propose the definitions of many-body topological invariants to detect symmetry-protected topological phases protected by point group symmetry, using partial point group transformations on a given short-range entangled quantum ground state. Here, partial point group transformations g(D) are defined by point group transformations restricted to a spatial subregion D, which is closed under the point group transformations and sufficiently larger than the bulk correlation length.. By analytical and numerical calculations, we find that the ground state (GS) expectation value of the partial point group transformations behaves generically as < GS vertical bar g(D)vertical bar GS > similar to exp[i theta + gamma - alpha Area(partial derivative D)/xi(d-1)]. Here, Area(partial derivative D) is the area of the boundary of the subregion D, and alpha is a dimensionless constant. The complex phase of the expectation value theta is quantized and serves as the topological invariant, and gamma is a scale-independent topological contribution to the amplitude. The examples we consider include the Z(8) and Z(16) invariants of topological superconductors protected by inversion symmetry in (1 + 1) and (3 + 1) dimensions, respectively, and the lens space topological invariants in (2 + 1)-dimensional fermionic topological phases. Connections to topological quantum field theories and cobordism classification of symmetry-protected topological phases are discussed.

• 出版日期2017-5-25