Topological Properties of Tensor Network States From Their Local Gauge and Local Symmetry Structures

Abstract

Tensor network states are capable of describing many-body systems with complex quantum entanglement, including systems with non-trivial topological order. In this paper, we study methods to calculate the topological properties of a tensor network state from the tensors that form the state. Motivated by the concepts of gauge group and projective symmetry group in the slave-particle/projective construction, and by the low-dimensional gauge-like symmetries of some exactly solvable Hamiltonians, we study the d-dimensional gauge structure and the d-dimensional symmetry structure of a tensor network state, where d≤ dspace with dspace the dimension of space. The d-dimensional gauge structure and d-dimensional symmetry structure allow us to calculate the string operators and d-brane operators of the tensor network state. This in turn allows us to calculate many topological properties of the tensor network state, such as ground state degeneracy and quasiparticle statistics.