On Steklov Eigenspaces for Free Boundary Minimal Surfaces in the Unit Ball

Abstract

We develop new methods to compare the span C() of the coordinate functions on a free boundary minimal submanifold embedded in the unit n-ball Bn with its first Steklov eigenspace Eσ1(). Using these methods, we show that C(A)=Eσ1(A) for any embedded free boundary minimal annulus A in B3 invariant under the antipodal map, and thus prove that A is congruent to the critical catenoid. We also confirm that C=Eσ1 for any free boundary minimal surface embedded in B3 with the symmetries of many known or expected examples, including: examples of any positive genus from stacking at least three disks; two infinite families of genus 0 examples with dihedral symmetry, as well as a finite family with the various Platonic symmetries; and examples of any genus by desingularizing several disks that meet at equal angles along a diameter of the ball.