Nonsymmetric sign-changing solutions to overdetermined elliptic problems in bounded domains

Abstract

In 1971 J. Serrin proved that, given a smooth bounded domain ⊂ RN and u a positive solution of the problem: equation* arrayll - u = f(u) &in , u =0 &on ∂, ∂ u =constant &on ∂, array equation* then is necessarily a ball and u is radially symmetric. In this paper we prove that the positivity of u is necessary in that symmetry result. In fact we find a sign-changing solution to that problem for a C2 function f(u) in a bounded domain different from a ball. The proof uses a local bifurcation argument, based on the study of the associated linearized operator.

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