2018
DOI: 10.1007/jhep10(2018)114
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Gapped boundary theory of the twisted gauge theory model of three-dimensional topological orders

Abstract: We extend the twisted gauge theory model of topological orders in three spatial dimensions to the case where the three spaces have two dimensional boundaries. We achieve this by systematically constructing the boundary Hamiltonians that are compatible with the bulk Hamoltonian. Given the bulk Hamiltonian defined by a gauge group G and a four-cocycle ω in the fourth cohomology group of G over U (1), a boundary Hamiltonian can be defined by a subgroup K of G and a three-cochain α in the third cochain group of K … Show more

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Cited by 23 publications
(24 citation statements)
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References 65 publications
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“…♦ Remark 5.3. More general construction of gapped boundaries of 3d twisted gauge theories can be found in [33]. ♦…”
Section: Remark 52mentioning
confidence: 99%
“…♦ Remark 5.3. More general construction of gapped boundaries of 3d twisted gauge theories can be found in [33]. ♦…”
Section: Remark 52mentioning
confidence: 99%
“…Although our study was done for the (extended) QD model only, we believe our results can be extended to other models of topological phases, such as the twisted quantum double model [26,30], the Levin-Wen model [6,[40][41][42][43] in two dimensions, and the twisted gauge theory model in three dimensions [44,45]. In such extensions, however, the dimension of group representations should be extended to the quantum dimensions of the anyons.…”
Section: Discussionmentioning
confidence: 95%
“…The corresponding lattice Hamiltonian models have been constructed in e.g. [WWH15,CCW17a,CCW17b,WLHW18]. They are classified by group cohomology.…”
Section: Anomalies and Symmetry-protected Topological Phasesmentioning
confidence: 99%