Abstract
We prove that the spaces $\operatorname{tot}\big(\Gamma(\Lambda^\bullet A^\vee \otimes_R\mathcal{T}_{\operatorname{poly}}^{\bullet}\big)$ and $\operatorname{tot}\big(\Gamma(\Lambda^\bullet A^\vee)\otimes_R\mathcal{D}_{\operatorname{poly}}^{\bullet}\big)$ associated with a Lie pair $(L,A)$ each carry an $L_\infty$ algebra structure canonical up to an $L_\infty$ 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 $(L,A)$. Consequently, both $\mathbb{H}^\bullet_{\operatorname{CE}}(A,\mathcal{T}_{\operatorname{poly}}^{\bullet})$ and $\mathbb{H}^\bullet_{\operatorname{CE}}(A,\mathcal{D}_{\operatorname{poly}}^{\bullet})$ 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).
Highlights
We prove that the spaces tot Γ(ΛA∨) ⊗R Tpoly and tot Γ(ΛA∨) ⊗R Dpoly associated with a Lie pair (L, A) each carry an L∞ algebra structure canonical up to an L∞ isomorphism with the identity map as linear part
The algebraic structures of the spaces of polyvector fields and of polydifferential operators on a manifold play a crucial role in deformation quantization: Kontsevich’s famous formality theorem asserts that, for a smooth manifold M, the Hochschild–Kostant–Rosenberg map extends to an L∞ quasi-isomorphism from the dgla of polyvector fields on M to the dgla of polydifferential operators on M [25, 46, 13, 9, 10]
We study the algebraic structures of “polyvector fields” and “polydifferential operators” on Lie pairs
Summary
The algebraic structures of the spaces of polyvector fields and of polydifferential operators on a manifold play a crucial role in deformation quantization: Kontsevich’s famous formality theorem asserts that, for a smooth manifold M , the Hochschild–Kostant–Rosenberg map extends to an L∞ quasi-isomorphism from the dgla of polyvector fields on M to the dgla of polydifferential operators on M [25, 46, 13, 9, 10]. The notions of polyvector fields and of polydifferential operators can be extended further in an appropriate sense to the context of dg Lie algebroids This yields again a pair of dgla’s whose cohomologies are Gerstenhaber algebras. In the case of a matched pair, the dg manifold (A[1] ⊕ B, dBAott) is a dg Lie algebroid over the dg manifold (A[1], dA) whose associated cochain complexes of polyvector fields and polydifferential operators are isomorphic to tot Γ(ΛA∨⊗Λ+1B), dBAott and tot Γ(ΛA∨) ⊗R U (B)⊗+1 , dUA + dH , respectively, and are naturally dgla’s when endowed with the usual Schouten bracket and the usual Gerstenhaber bracket, respectively.
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