A theory of 2+1D fermionic topological orders and fermionic/bosonic topological orders with symmetries

TL;DR

This paper develops a classification framework for 2+1D fermionic topological orders using unitary braided fusion categories over symmetric fusion categories, providing explicit realizations and a categorical classification method.

Contribution

It introduces a simplified theory of non-degenerate UBFC over SFC and classifies all 2+1D fermionic topological orders, including explicit realizations and a categorical classification approach.

Findings

Classified all 2+1D fermionic topological orders without symmetry.

Identified four main fermionic topological orders with one non-trivial excitation.

Proposed a categorical classification method for invertible fermionic topological orders.

Abstract

We propose that, up to invertible topological orders, 2+1D fermionic topological orders without symmetry and 2+1D fermionic/bosonic topological orders with symmetry $G$ are classified by non-degenerate unitary braided fusion categories (UBFC) over a symmetric fusion category (SFC); the SFC describes a fermionic product state without symmetry or a fermionic/bosonic product state with symmetry $G$, and the UBFC has a modular extension. We developed a simplified theory of non-degenerate UBFC over a SFC based on the fusion coefficients $N^{ij}_k$ and spins $s_i$. This allows us to obtain a list that contains all 2+1D fermionic topological orders (without symmetry). We find explicit realizations for all the fermionic topological orders in the table. For example, we find that, up to invertible $p+\hspace{1pt}\mathrm{i}\hspace{1pt} p$ fermionic topological orders, there are only four fermionic topological orders with one non-trivial topological excitation: (1) the $K={\scriptsize \begin{pmatrix} -1&0\\0&2\end{pmatrix}}$ fractional quantum Hall state, (2) a Fibonacci bosonic topological order $2^B_{14/5}$ stacking with a fermionic product state, (3) the time-reversal conjugate of the previous one, (4) a primitive fermionic topological order that has a chiral central charge $c=\frac14$, whose only topological excitation has a non-abelian statistics with a spin $s=\frac14$ and a quantum dimension $d=1+\sqrt{2}$. We also proposed a categorical way to classify 2+1D invertible fermionic topological orders using modular extensions.