An Operator-Algebraic Framework for Anyons and Defects in Quantum Spin Systems

Abstract

In this dissertation, we detail an operator algebraic approach to studying topological order in the infinite volume setting. We give a thorough and self-contained review of the DHR-style approach on quantum spin systems, which builds a category DHR of anyon sectors starting from microscopic lattice spin systems. In general, this category has the structure of a braided C*-tensor category. We will verify in full detail that DHR is the expected category in Kitaev's Quantum Double model, a paradigmatic model for studying topological order on the lattice. We will then extend the DHR-style analysis to systems in the presence of a global on-site symmetry, and introduce a category of symmetry defects, GSec, and show that it has the structure of a G-crossed braided C*-tensor category.