Point-group symmetry enriched topological orders
Abstract
We study the classification of two-dimensional (2D) topological orders enriched by point-group symmetries, by generalizing the folding appraoch which was previously developed for mirror-symmetry-enriched topological orders. We fold the 2D plane hosting the topological order into the foundamental domain of the group group, which is a sector with an angle 2π/n for the cyclic point group Cn and a sector with an angle π/n for the dihedral point group D2n, and the point-group symmetries becomes onsite unitary symmetries on the sector. The enrichment of the point-group symmetries is then fully encoded at the boundary of the sector and the apex of the section, which forms a junction between the two boundaries. The mirror-symmetry enrichment encoded on the boundaries is analyzed by the classification theory of symmetric gapped boundaries, and the point-group-symmetry enrichment encoded on the junction is analyzed by a framework for classifying symmetric gapped junctions between boundaries which we develop in this work. We show that at the junction, there are two potential obstructions, which we refer to as an H1 obstruction and an H2 obstruction, respectively. When the obstruction vanishes, the junction, and therefore the point-group-symmetry-enriched topological orders, are classified by an H0 cohomology class and an H1 cohomology class, which can be understood as an additional Abelian anyon and a symmetry charge attached to the rotation center, respectively. These results are consistent with the classification of onsite-symmetry-enriched topological orders, where the H1 and H2 obstructions and the junction corresponds to the H3 and H4 obstructions for onsite symmetries, respectively.
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