English

A note on Gorenstein spaces

Algebraic Topology 2018-12-27 v1

Abstract

Associated with an augmented differential graded algebra R=R0R= R^{\geq 0} is a homotopy invariant T(R){\mathcal T}(R). This is a graded vector space, and if H0(R)H^0(R) is the ground field and H>N(R)=0H^{>N}(R)= 0 then dimT(R)=1\, {\mathcal T}(R)= 1 if and only if H(R)H(R) is a Poincar\'e duality algebra. In the case of Sullivan extensions WWZZ\land W\to \land W\otimes \land Z\to \land Z in which dimH(Z)<\, H(\land Z)<\infty we show that T(WZ)=T(W)T(Z).{\mathcal T}(\land W\otimes \land Z)= {\mathcal T}(\land W)\otimes {\mathcal T}(\land Z). This is applied to finite dimensional CW complexes XX where the fundamental group GG acts nilpotently in the cohomology H(X~;Q)H(\widetilde{X};\mathbb Q) of the universal covering space. If H(X;Q)H(X;\mathbb Q) is a Poincar\'e duality algebra and H(X~;Q)H(\widetilde{X};\mathbb Q) and H(BG;Q)H(BG;\mathbb Q) are finite dimensional then they are also Poincar\'e duality algebras.

Keywords

Cite

@article{arxiv.1812.09686,
  title  = {A note on Gorenstein spaces},
  author = {Yves Felix and Steve Halperin},
  journal= {arXiv preprint arXiv:1812.09686},
  year   = {2018}
}
R2 v1 2026-06-23T06:54:50.914Z