Hopf algebras arising from dg manifolds

Abstract

Let (M, Q) be a dg manifold. The space of vector fields with shifted degrees (X(M)[-1], LQ) is a Lie algebra object in the homology category H((C∞M,Q)-mod) of dg modules over (M,Q), the Atiyah class αM being its Lie bracket. The triple (X(M)[-1], LQ; αM) is also a Lie algebra object in the Gabriel-Zisman homotopy category ((C∞M,Q)-mod). In this paper, we describe the universal enveloping algebra of (X(M)[-1], LQ; αM) and prove that it is a Hopf algebra object in ((C∞M,Q)-mod). As an application, we study Fedosov dg Lie algebroids and recover a result of Sti\'enon, Xu, and the second author on the Hopf algebra arising from a Lie pair.