Equivariant injectivity of crossed products
Abstract
We introduce the notion of a G-operator space (X, α), which consists of an action α: X G of a locally compact quantum group G on an operator space X, and we make a study of the notion of G-equivariant injectivity for such an operator space. Given a G-operator space (X, α), we define a natural associated crossed product operator space Xα G, which has canonical actions Xα G G (the adjoint action) and Xα G G (the dual action) where G is the dual quantum group. We then show that if X is a G-operator system, then Xα G is G-injective if and only if Xα G is injective and G is amenable, and that (under a mild assumption) Xα G is G-injective if and only if X is G-injective. We discuss how these results generalise and unify several recent results from the literature, and give new applications of these results.
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