On the Areas of Genus Zero Free Boundary Minimal Surfaces Embedded in the Unit 3-ball
Abstract
We prove that the area of each nonflat genus zero free boundary minimal surface embedded in the unit 3-ball is less than the area of its radial projection to S2. The inequality is asymptotically sharp, and we prove any sequence of surfaces saturating it converges weakly to S2, as currents and as varifolds.
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