A Sharp Comparison Theorem for Compact Manifolds with Mean Convex Boundary
Abstract
Let M be a compact n-dimensional Riemannian manifold with nonnegative Ricci curvature and mean convex boundary ∂ M. Assume that the mean curvature H of the boundary ∂ M satisfies H ≥ (n-1) k >0 for some positive constant k. In this paper, we prove that the distance function d to the boundary ∂ M is bounded from above by 1k and the upper bound is achieved if and only if M is isometric to an n-dimensional Euclidean ball of radius 1k.
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