Some remarks on biharmonic elliptic problems with a singular nonlinearity

Abstract

We study the following semilinear biharmonic equation \arraylllllll 2u=λ1-u, & in , u=∂ u∂ n=0, & on ∂, array . %(Mλ) where is the unit ball in n and n is the exterior unit normal vector. We prove the existence of λ*>0 such that for λ∈ (0,λ*) there exists a minimal (classical) solution uλ, which satisfies 0<uλ<1. In the extremal case λ=λ*, we prove the existence of a weak solution which is unique solution even in a very weak sense. Besides, several new difficulties arise and many problems still remain to be solved. we list those of particular interest in the final section.