On the Representation Categories of Weak Hopf Algebras Arising from Levin-Wen Models

Abstract

In their study of Levin-Wen models [Commun. Math. Phys. 313 (2012) 351-373], Kitaev and Kong proposed a weak Hopf algebra associated with a unitary fusion category C and a unitary left C-module M, and sketched a proof that its representation category is monoidally equivalent to the unitary C-module functor category FunuC(M,M)rev. We give an independent proof of this result without the unitarity conditions. In particular, viewing C as a left C Crev-module, we obtain a quasi-triangular weak Hopf algebra whose representation category is braided equivalent to the Drinfeld center Z(C). In the appendix, we also compare this quasi-triangular weak Hopf algebra with the tube algebra TubeC of C when C is pivotal. These two algebras are Morita equivalent by the well-known equivalence Rep(TubeC)(C). However, we show that in general there is no weak Hopf algebra structure on TubeC such that the above equivalence is monoidal.

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