A note on rational homology vanishing theorem for hypersurfaces in aspherical manifolds
Abstract
In this note, we generalize Gromov's reduction Gro20 from the aspherical conjecture to the generalized filling radius conjecture to the smooth Q-homology vanishing conjecture for hypersurface. In particular, we can show that any continuous map from a closed 4-manifold admitting positive scalar curvature to an aspherical 5-manifold induces zero map in H4(·, Q). As a corollary, we obtain the following splitting theorem: if a complete aspherical 5-manifold has nonnegative scalar curvature and two ends, then it splits into the Riemannian product of a closed flat manifold and the real line.
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