On the topology of stable minimal hypersurfaces in a homeomorphic S4
Abstract
We construct stable minimal hypersurfaces with simple topology in certain compact 4-manifolds X with boundary, where X embeds into a smooth manifold homeomorphic to S4. For example, if X is equipped with a Riemannian metric g with positive scalar curvature, we prove the existence of a stable minimal hypersurface M that is diffeomorphic to either S3 or a connected sum of S2× S1's, ruling out spherical space forms in its prime decomposition. These results imply new theorems on the topology of black holes in four dimensions. The proof involves techniques from geometric measure theory and 4-manifold topology.
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