Finite central extensions of type I

Abstract

Let G be a Lie group with solvable connected component and finitely-generated component group and α∈ H2(G,S1) a cohomology class. We prove that if (G,α) is of type I then the same holds for the finite central extensions of G. In particular, finite central extensions of type-I connected solvable Lie groups are again of type I. This is by contrast with the general case, whereby the type-I property does not survive under finite central extensions. We also show that ad-algebraic hulls of connected solvable Lie groups operate on these even when the latter are not simply connected, and give a group-theoretic characterization of the intersection of all Euclidean subgroups of a connected, simply-connected solvable group G containing a given central subgroup of G.