Laplace's equation with concave and convex boundary nonlinearities on an exterior region

Abstract

This paper studies Laplace's equation -\,u=0 in an exterior region U RN, when N≥3, subject to the nonlinear boundary condition ∂ u∂=λuq-2u+μup-2u on ∂ U with 1<q<2<p<2*. In the function space H(U), one observes when λ>0 and μ∈ R arbitrary, then there exists a sequence \uk\ of solutions with negative energy converging to 0 as k∞; on the other hand, when λ∈ R and μ>0 arbitrary, then there exists a sequence \uk\ of solutions with positive and unbounded energy. Also, associated with the p-Laplacian equation -p\,u=0, the exterior p-harmonic Steklov eigenvalue problems are described.