Stable solutions for the bilaplacian with exponential nonlinearity

Abstract

Let λ*>0 denote the largest possible value of λ such that align* \aligned 2 u & = eu && in B u &= un = 0 && on B aligned . align* has a solution, where B is the unit ball in N and n is the exterior unit normal vector. We show that for λ=λ* this problem possesses a unique weak solution u*. We prove that u* is smooth if N 12 and singular when N 13, in which case u*(r) = - 4 r + (8(N-2)(N-4) / λ*) + o(1) as r 0. We also consider the problem with general constant Dirichlet boundary conditions.