On minimal spheres of area 4π and rigidity

Abstract

Let M be a complete Riemannian 3-manifold with sectional curvatures between 0 and 1. A minimal 2-sphere immersed in M has area at least 4π. If an embedded minimal sphere has area 4π, then M is isometric to the unit 3-sphere or to a quotient of the product of the unit 2-sphere with R, with the product metric. We also obtain a rigidity theorem for the existence of hyperbolic cusps. Let M be a complete Riemannian 3-manifold with sectional curvatures bounded above by -1. Suppose there is a 2-torus T embedded in M with mean curvature one. Then the mean convex component of M bounded by T is a hyperbolic cusp;,i.e., it is isometric to T × R with the constant curvature -1 metric: e-2tdσ02+dt2 with dσ02 a flat metric on T.