Inclusions of Fell bundles C*-algebras and coaction crossed products

Abstract

Let p A G be a Fell bundle over a locally compact Hausdorff second countable groupoid G equipped with a Haar system, and let Γ be a discrete group. Given a continuous 1-cocycle c G Γ, we show that the C*-algebra of the restricted Fell bundle A|Ge embeds isometrically into C*(G;A), where Ge = c-1(e) is the clopen subgroupoid corresponding to the identity element. We exploit this embedding to show that C*(G;A) admits a natural structure of a topologically graded C*-algebra in the sense of Exel. As a consequence, we obtain a canonical coaction δ of Γ on C*(G; A). We further show that the associated coaction crossed product C*(G; A)δΓ is naturally isomorphic to the C*-algebra of a Fell bundle constructed from the cocycle data.