An Overdetermined Neumann boundary value problem with a general driving force
Abstract
In this paper, we prove the existence of a family of non trivial compact subdomains in the manifold M=N× /2π, N≥ 2 for which the overdetermined Neumann boundary value problem alignNeumann1 \ aligned - w&=μ g(w) && in , ∂ w∂η &=0 && on ∂ , w&=c 0 && on ∂ , aligned . align admits solutions for some μ > 0 and a C1, α function g: → . The domains we construct have nonconstant principal curvature, and therefore are not isoparametric nor homogeneous. The argument we develop applies for both linear and non-linear functions g. By this, we generalise a recent result obtained by Fall, Weth and the first named author in Fall-MinlendI-Weth4, where the overdetermined Neumann eigenvalue problem for the Laplacian was considered.
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