Rigidity of Free Boundary Surfaces in Compact 3-Manifolds with Strictly Convex Boundary

Abstract

In this paper we obtain an analogue of Toponogov theorem in dimension 3 for compact manifolds M3 with nonnegative Ricci curvature and strictly convex boundary ∂ M. Here we obtain a sharp upper bound for the length L(∂) of the boundary ∂ of a free boundary minimal surface 2 in M3 in terms of the genus of and the number of connected components of ∂, assuming has index one. After, under a natural hypothesis on the geometry of M along ∂ M, we prove that if L(∂) saturates the respective upper bound, then M3 is isometric to the Euclidean 3-ball and 2 is isometric to the Euclidean disk. In particular, we get a sharp upper bound for the area of , when M3 is a strictly convex body in R3, which is saturated only on the Euclidean 3-balls (by the Euclidean disks). We also consider similar results for stationary stable surfaces.