Solutions to overdetermined elliptic problems in nontrivial exterior domains

Abstract

In this paper we construct nontrivial exterior domains ⊂ RN, for all N≥ 2, such that the problem \ ll - u +u -up=0,\ u >0 & in \; , 1mm] \ u= 0 & on \; ∂ , [1mm] \ ∂ u∂ = cte & on \; ∂ , . admits a positive bounded solution. This result gives a negative answer to the Berestycki-Caffarelli-Nirenberg conjecture on overdetermined elliptic problems in dimension 2, the only dimension in which the conjecture was still open. For higher dimensions, different counterexamples have been found in the literature; however, our example is the first one in the form of an exterior domain.