Shifted derived Poisson manifolds associated with Lie pairs

Abstract

We study the shifted analogue of the "Lie--Poisson" construction for L∞ algebroids and we prove that any L∞ algebroid naturally gives rise to shifted derived Poisson manifolds. We also investigate derived Poisson structures from a purely algebraic perspective and, in particular, we establish a homotopy transfer theorem for derived Poisson algebras. As an application, we prove that, given a Lie pair (L,A), the space totA((L/A)) admits a degree (+1) derived Poisson algebra structure with the wedge product as associative multiplication and the Chevalley--Eilenberg differential dABott:A((L/A)) +1A((L/A)) as unary L∞ bracket. This degree (+1) derived Poisson algebra structure on totA((L/A)) is unique up to an isomorphism having the identity map as first Taylor coefficient. Consequently, the Chevalley--Eilenberg hypercohomology H(A((L/A)),dABott) admits a canonical Gerstenhaber algebra structure.