Normal subgroups and relative centers of linearly reductive quantum groups

Abstract

We prove a number of structural and representation-theoretic results on linearly reductive quantum groups, i.e. objects dual to that of cosemisimple Hopf algebras: (a) a closed normal quantum subgroup is automatically linearly reductive if its squared antipode leaves invariant each simple subcoalgebra of the underlying Hopf algebra; (b) for a normal embedding H G there is a Clifford-style correspondence between two equivalence relations on irreducible G- and, respectively, H-representations; and (c) given an embedding H G of linearly reductive quantum groups the Pontryagin dual of the relative center Z(G) H can be described by generators and relations, with one generator gV for each irreducible G-representation V and one relation gU=gVgW whenever U and V W are not disjoint over H. This latter center-reconstruction result generalizes and recovers M\"uger's compact-group analogue and the author's quantum-group version of that earlier result by setting H=G.

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