Rigidity of nonpositively curved manifolds with convex boundary

Abstract

We show that a compact Riemannian 3-manifold M with strictly convex simply connected boundary and sectional curvature K≤ a≤ 0 is isometric to a convex domain in a complete simply connected space of constant curvature a, provided that K a on planes tangent to the boundary of M. This yields a characterization of strictly convex surfaces with minimal total curvature in Cartan-Hadamard 3-manifolds, and extends some rigidity results of Greene-Wu, Gromov, and Schroeder-Strake. Our proof is based on a recent comparison formula for total curvature of Riemannian hypersurfaces, which also yields some dual results for K≥ a≥ 0.