Determining non-Abelian topological order from infinite projected
entangled pair states
- URL: http://arxiv.org/abs/2008.06391v2
- Date: Tue, 17 Nov 2020 16:56:33 GMT
- Title: Determining non-Abelian topological order from infinite projected
entangled pair states
- Authors: Anna Francuz and Jacek Dziarmaga
- Abstract summary: We find numerically symmetries of the iPEPS, represented by infinite matrix product operators (MPO)
A linear structure of the MPO projectors allows for efficient determination for each state its second Renyi topological entanglement entropy.
The algorithm is illustrated by examples of Fibonacci and Ising non-Abelian string net models.
- Score: 0.0
- License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
- Abstract: We generalize the method introduced in Phys. Rev. B 101, 041108 (2020) of
extracting information about topological order from the ground state of a
strongly correlated two-dimensional system represented by an infinite projected
entangled pair state (iPEPS) to non-Abelian topological order. When wrapped on
a torus the unique iPEPS becomes a superposition of degenerate and locally
indistinguishable ground states. We find numerically symmetries of the iPEPS,
represented by infinite matrix product operators (MPO), and their fusion rules.
The rules tell us how to combine the symmetries into projectors onto states
with well defined anyon flux. A linear structure of the MPO projectors allows
for efficient determination for each state its second Renyi topological
entanglement entropy on an infinitely long cylinder directly in the limit of
infinite cylinder's width. The same projectors are used to compute topological
$S$ and $T$ matrices encoding mutual- and self-statistics of emergent anyons.
The algorithm is illustrated by examples of Fibonacci and Ising non-Abelian
string net models.
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