Locally Inner Actions on C0(X)-Algebras

Abstract

We make a detailed study of locally inner actions on C*-algebras whose primitive ideal spaces have locally compact Hausdorff complete regularizations. We suppose that G has a representation group and compactly generated abelianization Gab. Then if the complete regularization of (A) is X, we show that the collection of exterior equivalence classes of locally inner actions of G on A is parameterized by the group G(X) of exterior equivalence classes of C0(X)-actions of G on C0(X,). Furthermore, we exhibit a group isomorphism of G(X) with the direct sum H1(X, Gab) C(X,H2(G,)). As a consequence, we can compute the equivariant Brauer group G(X) for G acting trivially on X$.

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