Formal geometry and Tamarkin--Tsygan calculi of dg manifolds
Abstract
The main goal of this paper is to study the formal geometry of dg manifolds \`a la Fedosov. For any dg manifold (M, Q), we construct a Fedosov dg foliation (or dg Lie algebroid) FQ NQ. We establish homotopy contractions between their respective spaces of polyvector fields, differential forms, polydifferential operators, and polyjets. As a consequence, we prove that their respective Cartan calculi and noncommutative calculi, in the sense of Tamarkin--Tsygan, are isomorphic.
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