The Quantum Double of Hopf Algebras Realized via Partial Dualization and the Tensor Category of Its Representations

Abstract

In this paper, we aim to study the (generalized) quantum double Kσ H determined by a (skew) pairing between finite-dimensional Hopf algebras K and H, especially the tensor category Rep(Kσ H) of its finite-dimensional representations. Specifically, we show that Kσ H is a left partially dualized (quasi-)Hopf algebra of Kop H, and use this formulation to establish tensor equivalences from Rep(Kσ H) to the categories KKMKH and KKMHK of two-sided two-cosided relative Hopf modules, as well as the category HYDK of relative Yetter-Drinfeld modules.

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