1-minimal models for C∞-algebras and flat connections

Abstract

Given a smooth manifold M equipped with a properly and discontinuous smooth action of a discrete group G, the nerve MG is a simplicial manifold and its vector space of differential forms TotN(ADR(MG)) carry a C∞-algebra structure m. We show that each C∞-algebra 1-minimal model g\: : \: (W, m' ) ( TotN(ADR(MG)),m) gives a flat connection ∇ on a smooth trivial bundle E on M where the fiber is the Malcev Lie algebra of π1(M/G) and its monodromy representation is the Malcev completion of π1(M/G). This connection is unique in the sense that different 1-models give isomorphic connections. In particular, the resulting connections are isomorphic to Chen's flat connection on M/G. If the action is holomorphic and g has holomorphic image (with logarithmic singularities), (∇,E) is holomorphic and different 1-models give (holomorphically) isomorphic connections (with logarithmic singularities). These results are the equivariant and holomorphic version of Chen's theory of flat connections.