Sharp diameter estimates for compact manifold with boundary

Abstract

Let (N,g) be an n-dimensional complete Riemannian manifold with nonempty boundary N. Assume that the Ricci curvature of N has a negative lower bound Ric≥ -(n-1)c2 for some c>0, and the mean curvature of the boundary N satisfies H≥ (n-1)c0>(n-1)c for some c0>c>0. Then a known result (see LN) says that x∈ Nd(x, N)≤ 1c-1c0c. In this paper, we prove that if the boundary N is compact, then the equality holds if and only if N is isometric to the geodesic ball of radius 1c-1c0c in an n-dimensional hyperbolic space Hn(-c2) of constant sectional curvature -c2. Moreover, we also prove an analogous result for manifold with nonempty boundary and with m-Bakry-\'Emery Ricci curvature bounded below by a negative constant.