Third Group Cohomology and Gerbes over Lie Groups

Abstract

The topological classification of gerbes, as principal bundles with the structure group the projective unitary group of a complex Hilbert space, over a topological space H is given by the third cohomology H3(H, Z). When H is a topological group the integral cohomology is often related to a locally continuous (or in the case of a Lie group, locally smooth) third group cohomology of H. We shall study in more detail this relation in the case of a group extension 1 N G H 1 when the gerbe is defined by an abelian extension 1 A N N 1 of N. In particular, when Hs1(N,A) vanishes we shall construct a transgression map H2s(N, A) H3s(H, AN), where AN is the subgroup of N-invariants in A and the subscript s denotes the locally smooth cohomology. Examples of this relation appear in gauge theory which are discussed in the paper.