Overdetermined elliptic problems in onduloid-type domains with general nonlinearities

Abstract

In this paper, we prove the existence of nontrivial unbounded domains ⊂Rn+1,n≥1, bifurcating from the straight cylinder B×R (where B is the unit ball of Rn), such that the overdetermined elliptic problem equation* cases u +f(u)=0 &in , u=0 &on ∂, ∂ u=constant &on ∂, cases equation* has a positive bounded solution. We will prove such result for a very general class of functions f: [0, +∞) R. Roughly speaking, we only ask that the Dirichlet problem in B admits a nondegenerate solution. The proof uses a local bifurcation argument.