Noncommutative numerable principal bundles from group actions on C*-algebras

Abstract

We introduce a definition of the locally trivial G-C*-algebra, which is a noncommutative counterpart of the total space of a locally compact Hausdorff numerable principal G-bundle. To obtain this generalization, we have to go beyond the Gelfand-Naimark duality and use the multipliers of the Pedersen ideal. Our new concept enables us to investigate local triviality of noncommutative principal bundles coming from group actions on non-unital C*-algebras, which we illustrate through examples coming from C0(Y)-algebras and graph C*-algebras. In the case of an action of a compact Hausdorff group on a unital C*-algebra, local triviality in our sense is implied by the finiteness of the local-triviality dimension of the action. Furthermore, we prove that if A is a locally trivial G-C*-algebra, then the G-action on A is free in a certain sense, which in many cases coincides with the known notions of freeness due to Rieffel and Ellwood.