Transmutation Theory and Quantization Approach for Quantum Groupoids

Abstract

Let H and L be quantum groupoids. If H has a quasitriangular structure, then we show that L induces a Hopf algebra CL(Ls) in the category HM, which generalizes the transmutation theory introduced by Majid. Furthermore, if H is commutative, we can construct a Hopf algebra CH(Hs)F in the category HMF for a weak invertible unit 2-cocycle F, which generalizes the results in D83. Finally, we consider the relation between two Hopf algebras: CH(Hs)F and C H(Hs), and obtain that they are isomorphic as objects in the category HM, where ( H, R) is a new quasitriangular quantum groupoid induced by (H, R).