A note on Gorenstein spaces

Abstract

Associated with an augmented differential graded algebra R= R≥ 0 is a homotopy invariant T(R). This is a graded vector space, and if H0(R) is the ground field and H>N(R)= 0 then dim\, T(R)= 1 if and only if H(R) is a Poincar\'e duality algebra. In the case of Sullivan extensions W W Z Z in which dim\, H( Z)<∞ we show that T( W Z)= T( W) T( Z). This is applied to finite dimensional CW complexes X where the fundamental group G acts nilpotently in the cohomology H(X; Q) of the universal covering space. If H(X; Q) is a Poincar\'e duality algebra and H(X; Q) and H(BG; Q) are finite dimensional then they are also Poincar\'e duality algebras.