English

Poincar\'e duality complexes with highly connected universal cover

Algebraic Topology 2021-02-24 v2 Geometric Topology

Abstract

Turaev conjectured that the classification, realization and splitting results for Poincar\'e duality complexes of dimension 33 (PD3_{3}-complexes) generalize to PDn_{n}-complexes with (n2)(n-2)-connected universal cover for n3n \ge 3. Baues and Bleile showed that such complexes are classified, up to oriented homotopy equivalence, by the triple consisting of their fundamental group, orientation class and the image of their fundamental class in the homology of the fundamental group, verifying Turaev's conjecture on classification. We prove Turaev's conjectures on realization and splitting. We show that a triple (G,ω,μ)(G, \omega, \mu), comprising a group, GG, a cohomology class ωH1(G,Z/2Z)\omega \in H^{1}\left(G, \mathbb{Z}/2\mathbb{Z}\right) and a homology class μHn(G,Zω)\mu \in H_{n}(G, \mathbb{Z}^{\omega}), can be realized by a PDn_{n}-complex with (n2)(n-2)-connected universal cover if and only if the Turaev map applied to μ\mu yields is an equivalence. We show that such a PDn_{n}-complex is a connected sum of two such complexes if and only if its fundamental group is a free product of groups. We then consider the indecomposable PDnPD_n-complexes of this type. When nn is odd the results are similar to those for the case n=3n=3. The indecomposables are either aspherical or have virtually free fundamental group. When nn is even the indecomposables include manifolds which are neither aspherical nor have virtually free fundamental group, but if the group is virtually free and has no dihedral subgroup of order >2>2 then it has two ends.

Keywords

Cite

@article{arxiv.1605.00096,
  title  = {Poincar\'e duality complexes with highly connected universal cover},
  author = {Beatrice Bleile and Imre Bokor and Jonathan A. Hillman},
  journal= {arXiv preprint arXiv:1605.00096},
  year   = {2021}
}

Comments

This paper incorporates and supersedes arXiv:1509.01928

R2 v1 2026-06-22T13:45:18.384Z