Some Remarks on Braided Group Reconstruction and Braided Doubles

Abstract

The cross coproduct braided group Aut(C) B is obtained by Tannaka-Krein reconstruction from CB C for a braided group B in braided category C. We apply this construction to obtain partial solutions to two problems in braided group theory, namely the tensor problem and the braided double. We obtain Aut(C) Aut(C) Aut(C) Aut(C) and higher braided group `spin chains'. The example of the braided group B(R) B(R)... B(R) is described explicitly by R-matrix relations. We also obtain Aut(C) Aut(C)* as a dual quasitriangular `codouble' braided group by reconstruction from the dual category C C. General braided double crossproducts B C are also considered.

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