The inverse problem for primitive ideal spaces

Abstract

A pure topological characterization of primitive ideal spaces of separable nuclear C*-algebras is given. We show that a T0-space X is a primitive ideal space of a separable nuclear C*-algebra A if and only if X is point-complete second countable, and there is a continuous pseudo-open and pseudo-epimorphic map from a locally compact Polish space P into X. We use this pseudo-open map to construct a Hilbert bi-module H over C0(X) such that X is isomorphic to the primitive ideal space of the Cuntz--Pimsner algebra OH generated by H. Moreover, our OH is KK(X;.,.)-equivalent to C0(P) (with the action of X on C0(P) given be the natural map from O(X) into O(P), which is isomorphic to the ideal lattice of C0(P). Our construction becomes almost functorial in X if we tensor OH with the Cuntz algebra O2.