Scalar curvature under weak limits of manifolds
Abstract
We show that scalar curvature lower bounds are preserved under certain weak convergence of smooth three manifolds to a smooth limit. More precisely, suppose that Mk and M are smooth, closed, Riemannian three manifolds. Assume that there are smooth, surjective, λk-Lipschitz maps fk Mk M and that Vol(Mk) Vol(M) and λk 1. Then if each Mk has scalar curvature bounded below by so does M. This result answers questions of Gromov, Sormani, Allen, and others. The proof relies on a delicate comparison between μ-bubbles in Mk and μ-bubbles in M.
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