Abstract
Abstract We apply Majid’s transmutation procedure to Hopf algebra maps $H \to {{\mathbb {C}}}[T]$, where $T$ is a compact abelian group, and explain how this construction gives rise to braided Hopf algebras over quotients of $T$ by subgroups that are cocentral in $H$. This allows us to unify and generalize a number of recent constructions of braided compact quantum groups, starting from the braided $SU_{q}(2)$ quantum group, and describe their bosonizations.
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