Symmetries of the C*-algebra of a vector bundle

Abstract

We consider C*-algebras constructed from compact group actions on complex vector bundles E X endowed with a Hermitian metric. An action of G by isometries on E X induces an action on the C*-correspondence (E) over C(X) consisting of continuous sections, and on the associated Cuntz-Pimsner algebra OE, so we can study the crossed product OE G. If the action is free and rank E=n, then we prove that OE G is Morita-Rieffel equivalent to a field of Cuntz algebras On over the orbit space X/G. If the action is fiberwise, then OE G becomes a continuous field of crossed products On G. For transitive actions, we show that OE G is Morita-Rieffel equivalent to a graph C*-algebra.