Singular chains on Lie groups and the Cartan relations II

Abstract

Let G be a simply connected Lie group with Lie algebra g and denote by C(G) the DG Hopf algebra of smooth singular chains on G. In a companion paper it was shown that the category of sufficiently smooth modules over C(G) is equivalent to the category of representations of T g, the DG Lie algebra which is universal for the Cartan relations. In this paper we show that, if G is compact, this equivalence of categories can be extended to an A∞-quasi-equivalence of the corresponding DG categories. As an intermediate step we construct an A∞-quasi-isomorphism between the Bott-Shulman-Stasheff DG algebra associated to G and the DG algebra of Hochschild cochains on C(G). The main ingredients in the proof are the Van Est map and Gugenheim's A∞ version of De Rham's theorem.