The homotopy Lie algebra of a Tor-independent tensor product

Abstract

In this article we investigate a pair of surjective local ring maps S1← R S2 and their relation to the canonical projection R S1R S2, where S1,S2 are Tor-independent over R. Our main result asserts a structural connection between the homotopy Lie algebra of S:=S1R S2, denoted π(S), in terms of those of R,S1 and S2. Namely, π(S) is the pullback of (adjusted) Lie algebras along the maps π(Si) π(R) in various cases, including when the maps above have residual characteristic zero. Consequences to the main theorem include structural results on Andr\'e-Quillen cohomology, stable cohomology, and Tor algebras, as well as an equality relating the Poincar\'e series of the common residue field of R,S1,S2 and S.