Exact C-algebras and C0(X)-structure

Abstract

We study tensor products of a C0 (X)-algebra A and a C0 (Y)-algebra B, and analyse the structure of their minimal tensor product A B as a C0 (X × Y)-algebra. We show that when A and B define continuous C-bundles, that continuity of the bundle arising from the C0 (X × Y)-algebra A B is a strictly weaker property than continuity of the `fibrewise tensor products' studied by Kirchberg and Wassermann. For a fixed quasi-standard C-algebra A, we show that A B is quasi-standard for all quasi-standard B precisely when A is exact, and exhibit some related equivalences.