Chern-Weil theory for ∞-local systems

Abstract

Let G be a compact connected Lie group. We show that the category Loc∞(BG) of ∞-local systems on the classifying space of G, can be described infinitesimally as the category InfLoc∞(g) of basic g-L∞ spaces. Moreover, we show that, given a principal bundle π P → X with structure group G and any connection θ on P, there is a DG functor CWθ InfLoc∞(g) Loc∞(X), which corresponds to the pullback functor by the classifying map of P. The DG functors associated to different connections are related by an A∞-natural isomorphism. This construction provides a categorification of the Chern-Weil homomorphism, which is recovered by applying the functor CWθ to the endomorphisms of the constant local system.