Uniqueness results for free-boundary minimal hypersurfaces in conformally Euclidean balls and annular domains
Abstract
In this paper we prove that a flat free-boundary minimal n-disk, n≥3, in the unit Euclidean ball Bn+1 is the unique compact free boundary minimal hypersurface in the unit Euclidean ball which the squared norm of the second fundamental form is less than either n24 or (n-2)24|x|2. Moreover, we prove analogous results for compact free boundary minimal hypersurfaces in annular domains with a conformally Euclidean metric.
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