A topological invariant for continuous fields of Cuntz algebras II

Abstract

We investigate an invariant for continuous fields of the Cuntz algebra On+1 introduced in our previous work, and find a way to obtain a continuous field of Mn(O∞) from that of On+1 using the construction of the invariant. By Brown's representability theorem, this gives a bijection from the set of the isomorphism classes of continuous fields of On+1 to those of Mn(O∞). As a consequence, we obtain a new proof for M. Dadarlat's classification result of continuous fields of On+1 arising from vector bundles, which corresponds to those of Mn(O∞) stably isomorphic to the trivial field.