Continuous actions on primitive ideal spaces lift to C-actions
Abstract
We prove that for any second-countable, locally compact group G, any continuous G-action on the primitive ideal space of a separable, nuclear C-algebra B such that B B2 is induced by an action on B. As a direct consequence, we establish that every continuous action on the primitive ideal space of a separable, nuclear C-algebra is induced by an action on a C-algebra with the same primitive ideal space. Moreover, we discuss an application to the classification of equivariantly O2-stable actions.
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