Rigidity of Complete Free Boundary Minimal Hypersurfaces in Convex NNSC Manifolds

Abstract

We prove that in the unit ball of R4, there is no complete two-sided stable free boundary immersion. The result follows from a rigidity theorem of complete free boundary minimal hypersurfaces in complete 4-manifolds with non-negative intermediate Ricci curvature, convex boundary and weakly bounded geometry. The method uses warped θ-bubble, a generalization of capillary surfaces.

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