Hopf algebras arising from dg manifolds.

Let $(\mathcal{M}, Q)$ be a dg manifold. The space of shifted vector fields $(\mathscr{X}(\mathcal{M})[-1], L_Q)$ is a Lie algebra object in the homology category $\mathrm{H}(\mathbf{dg}\mathrm{-}\mathbf{mod})$ of dg modules over $(\mathcal{M},Q)$, the Atiyah class $\alpha_{\mathcal{M}}$ being its Lie bracket. The triple $(\mathscr{X}(\mathcal{M})[-1], L_Q; \alpha_{\mathcal{M}})$ is also a Lie algebra object in the Gabriel-Zisman homotopy category $\Pi(\mathbf{dg}\mathrm{-}\mathbf{mod})$. In this paper, we describe the universal enveloping algebra of $(\mathscr{X}(\mathcal{M})[-1], L_Q; \alpha_{\mathcal{M}})$ and prove that it is a Hopf algebra object in $\Pi(\mathbf{dg}\mathrm{-}\mathbf{mod})$. As an application, we study Fedosov dg Lie algebroids and recover a result of Chen, Sti\'enon and Xu on the Hopf algebra arising from a Lie pair.