Scalar curvature comparison of rotationally symmetric sets

Abstract

Let (M, g) be a compact 3-manifold with nonnegative scalar curvature Rg≥ 0. The boundary ∂ M is diffeomorphic to the boundary of a rotationally symmetric and weakly convex body M in R3. We call (M, δ) a model or a reference. Let H∂ M and H∂ M be respectively the mean curvatures of ∂ M in (M, g) and ∂ M in (M, δ), σ and σ be the induced metric from g and δ. We show that for some classes of ∂ M, if H∂ M ≥ H∂ M, σ ≥ σ and the dihedral angles at the nonsmooth part of ∂ M are no greater than the model, then M is flat. We also generalize this result to the hyperbolic case and some spaces with S1-symmetry. Our approach is inspired by Gromov.