An Imprimitivity Theorem for finite algebraic quantum groups
Abstract
Let G be an algebraic quantum group and U a compact quantum subgroup. Given a left U-module algebra A with unit, we can endow A with a structure of a right U-module algebra. The algebra of invariants for this action (A)U has a left action of G. We prove that for finite G, (A)U\#G is Morita equivalent to A\#U.
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