For $k \ge 2,$ let $M^{4k-1}$ be a $(2k{-}2)$-connected closed manifold. If
$k \equiv 1$ mod $4$ assume further that $M$ is $(2k{-}1)$-parallelisable. Then
there is a homotopy sphere $\Sigma^{4k-1}$ such that $M \sharp \Sigma$ admits a
Ricci positive metric. This follows from a new description of these manifolds
as the boundaries of explicit plumbings.Comment: Corrected some minor typos and changed document class to amsart. The
  new document class added 10 pages, so the paper is now now 46 page

Crowley, Diarmuid

Wraith, David J.

English

arXiv

For k≥2, let M4k−1 be a (2k−2)-connected closed manifold. If k≡1 mod 4 assume further that M is (2k−1)-parallelisable. Then there is a homotopy sphere Σ4k−1 such that M♯Σ admits a Ricci positive metric. This follows from a new description of these manifolds as the boundaries of explicit plumbings

Wraith, David

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Positive Ricci Curvature on Highly Connected Manifolds

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Positive Ricci curvature on highly connected manifolds

Positive Ricci curvature on highly connected manifolds

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