Unoriented 3d TFTs
Abstract
This paper generalizes two facts about oriented 3d TFTs to the unoriented case. On one hand, it is known that oriented 3d TFTs having a topological boundary condition admit a state-sum construction known as the Turaev-Viro construction. This is related to the string-net construction of fermionic phases of matter. We show how Turaev-Viro construction can be generalized to unoriented 3d TFTs. On the other hand, it is known that the "fermionic" versions of oriented TFTs, known as Spin-TFTs, can be constructed in terms of "shadow" TFTs which are ordinary oriented TFTs with an anomalous 1-form symmetry. We generalize this correspondence to Pin-TFTs by showing that they can be constructed in terms of ordinary unoriented TFTs with anomalous 1-form symmetry having a mixed anomaly with time-reversal symmetry. The corresponding Pin-TFT does not have any anomaly for time-reversal symmetry however and hence it can be unambiguously defined on a non-orientable manifold. In case a Pin-TFT admits a topological boundary condition, one can combine the above two statements to obtain a Turaev-Viro-like construction of Pin-TFTs. As an application of these ideas, we construct a large class of Pin-SPT phases.
Keywords
Cite
@article{arxiv.1611.02728,
title = {Unoriented 3d TFTs},
author = {Lakshya Bhardwaj},
journal= {arXiv preprint arXiv:1611.02728},
year = {2017}
}
Comments
41 pages, 31 figures, v2: additional references, v3: minor revision