ON THREE-DIMENSIONAL TOPOLOGICAL FIELD THEORIES CONSTRUCTED FROM Dω(G) FOR FINITE GROUPS
1994 ◽
Vol 09
(25)
◽
pp. 2359-2369
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Keyword(s):
We investigate the 3-D lattice topological field theories defined by Chung, Fukuma and Shapere. We concentrate on the model defined by taking a deformation Dω(G) of the quantum double of a finite commutative group G as the underlying Hopf algebra. It is suggested that Chung-Fukuma-Shapere partition function is related to that of Dijkgraaf-Witten by Z CFS =|Z DW |2 when G=ℤ2N+1. For G=ℤ2N, such a relation does not hold.
1991 ◽
Vol 06
(03)
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pp. 171-181
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Keyword(s):
1990 ◽
Vol 05
(19)
◽
pp. 3777-3786
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2017 ◽
Vol 29
(05)
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pp. 1750015
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