A∞-Algebras from Lie Pairs

Abstract

Given an inclusion A L of Lie algebroids sharing the same base manifold M, i.e. a Lie pair, we prove that the space ( A)R U(L)U(L)·(A), where R=C∞(M), admits an A∞-algebra structure, unique up to A∞-isomorphisms. As a consequence, the Chevalley-Eilenberg cohomology HCE ( A, U(L)U(L)·(A) ) admits a canonical associative algebra structure. This A∞-algebra can be considered as the universal enveloping algebra of the L∞-algebroid A[1]×M L/A. Our construction is based on the homotopy equivalence of the L∞-algebroid A[1]×M L/A and the dg Lie algebroid corresponding to the comma double Lie algebroid of Jotz-Mackenzie.