English

Polyvector fields and polydifferential operators associated with Lie pairs

Quantum Algebra 2022-04-20 v2

Abstract

We prove that the spaces tot(Γ(ΛARTpoly)\operatorname{tot}\big(\Gamma(\Lambda^\bullet A^\vee \otimes_R\mathcal{T}_{\operatorname{poly}}^{\bullet}\big) and tot(Γ(ΛA)RDpoly)\operatorname{tot}\big(\Gamma(\Lambda^\bullet A^\vee)\otimes_R\mathcal{D}_{\operatorname{poly}}^{\bullet}\big) associated with a Lie pair (L,A)(L,A) each carry an LL_\infty algebra structure canonical up to an LL_\infty isomorphism with the identity map as linear part. These two spaces serve, respectively, as replacements for the spaces of formal polyvector fields and formal polydifferential operators on the Lie pair (L,A)(L,A). Consequently, both HCE(A,Tpoly)\mathbb{H}^\bullet_{\operatorname{CE}}(A,\mathcal{T}_{\operatorname{poly}}^{\bullet}) and HCE(A,Dpoly)\mathbb{H}^\bullet_{\operatorname{CE}}(A,\mathcal{D}_{\operatorname{poly}}^{\bullet}) admit unique Gerstenhaber algebra structures. Our approach is based on homotopy transfer and the construction of a Fedosov dg Lie algebroid (i.e. a dg foliation on a Fedosov dg manifold).

Keywords

Cite

@article{arxiv.1901.04602,
  title  = {Polyvector fields and polydifferential operators associated with Lie pairs},
  author = {Ruggero Bandiera and Mathieu Stiénon and Ping Xu},
  journal= {arXiv preprint arXiv:1901.04602},
  year   = {2022}
}

Comments

[v2] 50 pages, paper was expanded; [v1] Paper arXiv:1605.09656v1 was expended and split into two papers. The first part is arXiv:1605.09656v2. The second part is the present paper. A new result addressing uniqueness of the constructed structures has been added

R2 v1 2026-06-23T07:11:48.086Z