Singularity of the extremal solution for supercritical biharmonic equations with power-type nonlinearity

Abstract

Let λ*>0 denote the largest possible value of λ such that \arraylllllll 2u=λ(1+u)p & in\ \ , %0<u≤ 1 & in\ \ , u=∂ u∂ n =0 & on\ \ ∂ array. has a solution, where is the unit ball in Rn centered at the origin, p>n+4n-4 and n is the exterior unit normal vector. We show that for λ=λ* this problem possesses a unique weak solution u*, called the extremal solution. We prove that u* is singular when n≥ 13 for p large enough, in which case u*(x)≤ r-4p-1-1 on the unit ball.