An overdetermined eigenvalue problem and the Critical Catenoid conjecture

Abstract

We consider the eigenvalue problem S2 + 2 =0 in and = 0 along ∂ , being the complement of a disjoint and finite union of smooth and bounded simply connected regions in the two-sphere S2. Imposing that |∇ | is locally constant along ∂ and that has infinitely many maximum points, we are able to classify positive solutions as the rotationally symmetric ones. As a consequence, we obtain a characterization of the critical catenoid as the only embedded free boundary minimal annulus in the unit ball whose support function has infinitely many critical points.

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