Characterization of f-extremal disks

Abstract

We show uniqueness for overdetermined elliptic problems defined on topological disks with C2 boundary, i.e., positive solutions u to u + f(u)=0 in ⊂ (M2,g) so that u = 0 and ∂ u∂ η = cte along ∂ , η the unit outward normal along ∂ under the assumption of the existence of a candidate family. To do so, we adapt the G\'alvez-Mira generalized Hopf-type Theorem to the realm of overdetermined elliptic problem. When (M2,g) is the standard sphere S2 and f is a C1 function so that f(x)>0 and f(x) x \, f'(x) for any x∈ R+*, we construct such candidate family considering rotationally symmetric solutions. This proves the Berestycki-Caffarelli-Nirenberg conjecture in S2 for this choice of f. More precisely, this shows that if u is a positive solution to u + f(u) = 0 on a topological disk ⊂ S2 with C2 boundary so that u = 0 and ∂ u∂ η = cte along ∂ , then must be a geodesic disk and u is rotationally symmetric. In particular, this gives a positive answer to the Schiffer conjecture D for the first Dirichlet eigenvalue and classifies simply-connected harmonic domains, also called Serrin Problem) in S 2.