Hodge decompositions and Poincare duality models

Abstract

We extend a CDGA V with a perfect pairing of degree n on cohomology to a CDGA V with a pairing of degree n on chain level such that V admits a Hodge decomposition and retracts onto V preserving the pairing on cohomology; here we suppose that V is either 1-connected, or that V is connected, of finite type, and n is odd. We show that a Hodge decomposition of V induces a differential Poincar\'e duality model of V in a natural way. Assuming that H(V) is 1-connected, we apply our extension to a Sullivan model of V in the proof of the existence and "uniqueness" of a 1-connected differential Poincar\'e duality model of V by Lambrechts & Stanley; we eliminate their extra assumptions in the uniqueness statement, including H2(V)=0 if n is odd.