Existence of free boundary disks with constant mean curvature in R3

Abstract

Given a surface in R3 diffeomorphic to S2, Struwe (Acta Math., 1988) proved that for almost every H below the mean curvature of the smallest sphere enclosing , there exists a branched immersed disk which has constant mean curvature H and boundary meeting orthogonally. We reproduce this result using a different approach and improve it under additional convexity assumptions on . Specifically, when itself is convex and has mean curvature bounded below by H0, we obtain existence for all H ∈ (0, H0). Instead of the heat flow used by Struwe, we use a Sacks-Uhlenbeck type perturbation. As in previous joint work with Zhou (arXiv:2012.13379), a key ingredient for extending existence across the measure zero set of H's is a Morse index upper bound.