Hierarchy Construction and Non-Abelian Families of Generic Topological Orders

Author(s)

Lan, Tian; Wen, Xiao-Gang

Abstract

We generalize the hierarchy construction to generic 2+1D topological orders (which can be non-Abelian) by condensing Abelian anyons in one topological order to construct a new one. We show that such construction is reversible and leads to a new equivalence relation between topological orders. We refer to the corresponding equivalence class (the orbit of the hierarchy construction) as “the non-Abelian family.” Each non-Abelian family has one or a few root topological orders with the smallest number of anyon types. All the Abelian topological orders belong to the trivial non-Abelian family whose root is the trivial topological order. We show that Abelian anyons in root topological orders must be bosons or fermions with trivial mutual statistics between them. The classification of topological orders is then greatly simplified, by focusing on the roots of each family: those roots are given by non-Abelian modular extensions of representation categories of Abelian groups.

Date issued

2017-07

URI

http://hdl.handle.net/1721.1/111597

Department

Massachusetts Institute of Technology. Department of Physics

Journal

Physical Review Letters

Publisher

American Physical Society

Citation

Lan, Tian and Wen, Xiao-Gang. "Hierarchy Construction and Non-Abelian Families of Generic Topological Orders." Physical Review Letters 119, 4: 040403 © 2017 American Physical Society

Version: Final published version

ISSN

0031-9007

1079-7114