English

A Short Guide to Anyons and Modular Functors

Quantum Physics 2016-10-19 v1

Abstract

To the working physicist, anyon theory is meant to describe certain quasi-particle excitations occurring in two dimensional topologically ordered systems. A typical calculation using this theory will involve operations such as \otimes to combine anyons, FdabcF^{abc}_{d} to re-associate such combinations, and RcabR^{ab}_c to commute or braid these anyons. Although there is a powerful string-diagram notation that greatly assists these manipulations, we still appear to be operating on particles arranged on a one-dimensional line, algebraically ordered from left to right. The obvious question is, where is the other dimension? The topological framework for considering these anyons as truly living in a two dimensional space is known as a modular functor, or topological quantum field theory. In this work we show how the apparently one-dimensional algebraic anyon theory is secretly the theory of anyons living in a fully two-dimensional system. The mathematical literature covering this secret is vast, and we try to distill this down into something more manageable.

Keywords

Cite

@article{arxiv.1610.05384,
  title  = {A Short Guide to Anyons and Modular Functors},
  author = {Simon Burton},
  journal= {arXiv preprint arXiv:1610.05384},
  year   = {2016}
}

Comments

16 pages

R2 v1 2026-06-22T16:23:36.191Z