Scalar curvature comparison and rigidity of 3-dimensional weakly convex domains
Abstract
For a compact Riemannian 3-manifold (M3, g) with mean convex boundary which is diffeomorphic to a weakly convex compact domain in R3, we prove that if scalar curvature is nonnegative and the scaled mean curvature comparison H2g H02 gEucl holds, then (M,g) is flat. Our result is a smooth analog of Gromov's dihedral rigidity conjecture and an effective version of extremity results on weakly convex balls in R3. More generally, we prove the comparison and rigidity theorem for several classes of manifold with corners. Our proof uses capillary minimal surfaces with prescribed contact angle together with the construction of foliation with nonnegative mean curvature and with prescribed contact angles.
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