Non-Abelian Fusion Rules from an Abelian System

TL;DR

This paper constructs an exactly solvable lattice model extending the toric code with matter fields, demonstrating the emergence of non-Abelian fusion rules and anyons, which could be useful for quantum computation.

Contribution

It introduces a new class of models combining Abelian gauge fields and matter, showing non-Abelian fusion rules in a lattice system, with explicit examples for various parameters.

Findings

Non-Abelian fusion rules arise in Abelian-based lattice models.

Specific models produce non-Abelian anyons like Ising and quantum double of S_3.

Ground states exhibit higher symmetry, potential for quantum computing applications.

Abstract

We demonstrate the emergence of non-Abelian fusion rules for excitations of a two dimensional lattice model built out of Abelian degrees of freedom. It can be considered as an extension of the usual toric code model on a two dimensional lattice augmented with matter fields. It consists of the usual $\mathbb{C}(\mathbb{Z}_p)$ gauge degrees of freedom living on the links together with matter degrees of freedom living on the vertices. The matter part is described by a $n$ dimensional vector space which we call $H_n$. The $\mathbb{Z}_p$ gauge particles act on the vertex particles and thus $H_n$ can be thought of as a $\mathbb{C}(\mathbb{Z}_p)$ module. An exactly solvable model is built with operators acting in the corresponding Hilbert space. The vertex excitations for this model are studied and shown to obey non-Abelian fusion rules. We will show this for specific values of $n$ and $p$, though we believe this feature holds for all $n>p$. We will see that non-Abelian anyons of the quantum double of $\mathbb{C}(S_3)$ are obtained as part of the vertex excitations of the model with $n=6$ and $p=3$. Ising anyons are obtained in the model with $n=4$ and $p=2$. The $n=3$ and $p=2$ case is also worked out as this is the simplest model exhibiting non-Abelian fusion rules. Another common feature shared by these models is that the ground states have a higher symmetry than $\mathbb{Z}_p$. This makes them possible candidates for realizing quantum computation.