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Classifying sufficiently connected PSC manifoldsin 4 and 5 dimensions

Otis Chodosh, Chao Li, Yevgeny Liokumovich

2023Geometry & Topology12 citationsDOIOpen Access PDF

Abstract

We show that if $N$ is a closed manifold of dimension $n=4$ (resp. $n=5$) with $\pi_2(N) = 0$ (resp. $\pi_2(N)=\pi_3(N)=0$) that admits a metric of positive scalar curvature, then a finite cover $\hat N$ of $N$ is homotopy equivalent to $S^n$ or connected sums of $S^{n-1}\times S^1$. Our approach combines recent advances in the study of positive scalar curvature with a novel argument of Alpert--Balitskiy--Guth. Additionally, we prove a more general mapping version of this result. In particular, this implies that if $N$ is a closed manifold of dimensions $4$ or $5$, and $N$ admits a map of nonzero degree to a closed aspherical manifold, then $N$ does not admit any Riemannian metric with positive scalar curvature.

Topics & Concepts

Scalar curvatureMathematicsPrescribed scalar curvature problemManifold (fluid mechanics)Metric (unit)Cover (algebra)HomotopyCurvatureDimension (graph theory)Covering spaceRiemannian manifoldCombinatoricsScalar (mathematics)Closed manifoldPure mathematicsSectional curvatureGeometryInvariant manifoldEconomicsEngineeringMechanical engineeringOperations managementGeometric Analysis and Curvature FlowsGeometry and complex manifoldsHomotopy and Cohomology in Algebraic Topology
Classifying sufficiently connected PSC manifoldsin 4 and 5 dimensions | Litcius