An overdetermined problem for sign-changing eigenfunctions in unbounded domains

Abstract

We study the existence of non-trivial unbounded domains of ⊂ R2 where the equation align - λ uxx -utt &= u in , u &=0 on ∂ , align is solvable subject to the conditions align ∂ u∂ η =-1 on ∂ + and ∂ u∂ η =+1 on ∂ -. align For every integer m≥ 0, we prove the existence of a family of unbounded domains ⊂ R2 indexed by 0 ≤slant≤slant 2m, where the above problem admits periodic sign-changing solutions. The domains we construct are periodic in the first coordinate in R2, and they bifurcate from suitable strips.