Central extensions of Lie groups preserving a differential form

Abstract

Let M be a manifold with a closed, integral (k+1)-form ω, and let G be a Fr\'echet-Lie group acting on (M,ω). As a generalization of the Kostant-Souriau extension for symplectic manifolds, we consider a canonical class of central extensions of g by R, indexed by Hk-1(M,R)*. We show that the image of Hk-1(M,Z) in Hk-1(M,R)* corresponds to a lattice of Lie algebra extensions that integrate to smooth central extensions of G by the circle group T. The idea is to represent a class in Hk-1(M,Z) by a weighted submanifold (S,β), where β is a closed, integral form on S. We use transgression of differential characters from S and M to the mapping space C∞(S, M) , and apply the Kostant-Souriau construction on C∞(S, M) .