The Dixmier-Douady class and an abelian extension of the homeomorphism group

Abstract

Let X be a connected topological space and c ∈ H2(X;Z) a non-zero cohomology class. A Homeo(X,c)-bundle is a fiber bundle with fiber X whose structure group reduces to the group Homeo(X,c) of c-preserving homeomorphisms of X. If H1(X;Z) = 0, then a characteristic class for Homeo(X,c)-bundles called the Dixmier-Douady class is defined via the Serre spectral sequence. We show a relation between the universal Dixmier-Douady class for foliated Homeo(X,c)-bundles and the gauge group extension of Homeo(X,c). Moreover, under some assumptions, we construct a central S1-extension and a group two-cocycle on Homeo(X,c) corresponding to the Dixmier-Douady class.