Non-commutative branched covers and bundle unitarizability

Abstract

We prove that (a) the sections space of a continuous unital subhomogeneous C* bundle over compact metrizable X admits a finite-index expectation onto C(X), answering a question of Blanchard-Gogi\'c (in the metrizable case); (b) such expectations cannot, generally, have ``optimal index'', answering negatively a variant of the same question; and (c) a homogeneous continuous Banach bundle over a locally paracompact base space X can be renormed into a Hilbert bundle in such a manner that the original space of bounded sections is Cb(X)-linearly Banach-Mazur-close to the resulting Hilbert module over the algebra Cb(X) of continuous bounded functions on X. This last result resolves quantitatively another problem posed by Gogi\'c.