Singular chains on Lie groups and the Cartan relations I

Abstract

Let G be a simply connected Lie group with Lie algebra g. We show that the following categories are naturally equivalent. The category Mod(C(G)), of sufficiently smooth modules over the DG-algebra of singular chains on G. The category Rep(Tg) of representations of the DG-Lie algebra Tg, which is universal for the Cartan relations. This equivalence extends the correspondence between representations of G and representations of g. In a companion paper we show that in the compact case, the equivalence can be extended to an A∞ equivalence of DG-categories.