Rigidity of area-minimizing two-spheres in three-manifolds
arXiv:1002.2814
Abstract
We give a sharp upper bound for the area of a minimal two-sphere in a three-manifold (M,g) with positive scalar curvature. If equality holds, we show that the universal cover of (M,g) is isometric to a cylinder.
Final version, to appear in Comm Anal Geom