Heisenberg double H(B*) as a braided commutative Yetter-Drinfeld module algebra over the Drinfeld double

Abstract

We study the Yetter--Drinfeld D(B)-module algebra structure on the Heisenberg double H(B*) endowed with a "heterotic" action of the Drinfeld double D(B). This action can be interpreted in the spirit of Lu's description of H(B*) as a twist of D(B). In terms of the braiding of Yetter--Drinfeld modules, H(B*) is braided commutative. By the Brzezinski--Militaru theorem, H(B*)#D(B) is then a Hopf algebroid over H(B*). For B a particular Taft Hopf algebra at a 2p-th root of unity, the construction is adapted to yield Yetter--Drinfeld module algebras over the 2p3-dimensional quantum group Uq(sl(2)). In particular, it follows that Matp(C) is a braided commutative Yetter--Drinfeld Uq(sl(2))-module algebra and Matp(Uq(sl(2))) is a Hopf algebroid over Matp(C).