The doubles of a braided Hopf algebra

Abstract

Let A be a Hopf algebra in a braided rigid category B. In the case B admits a coend C, which is a Hopf algebra in B, we defined in 2008 the double D(A) of A, which is a quasitriangular Hopf algebra in B whose category of modules is isomorphic to the center of the category of A-modules as a braided category. Here, quasitriangular means endowed with an R-matrix (our notion of R-matrix for a Hopf algebra in B involves the coend C of B). In general, i.e. when B does not necessarily admit a coend, we construct a quasitriangular Hopf monad dA on the center Z(B) of B whose category of modules is isomorphic to the center of the category of A-modules as a braided category. We prove that the Hopf monad dA may not be representable by a Hopf algebra. If B has a coend C, then D(A) is the cross product of the Hopf monad dA by C. Equivalently, the Hopf monad dA is the cross quotient of the Hopf algebra D(A) by the Hopf algebra C.