On the critical dimension of a fourth order elliptic problem with negative exponent

Abstract

We study the regularity of the extremal solution of the semilinear biharmonic equation β 2 u-τ u=λ(1-u)2 on a ball B ⊂ N, under Navier boundary conditions u= u=0 on ∂ B, where λ >0 is a parameter, while τ>0, β>0 are fixed constants. It is known that there exists a λ* such that for λ>λ* there is no solution while for λ<λ* there is a branch of minimal solutions. Our main result asserts that the extremal solution u* is regular (Bu*<1) for N≤ 8 and β, τ>0 and it is singular (Bu*=1) for N≥ 9, β>0, and τ>0 with τβ small. Our proof for the singularity of extremal solutions in dimensions N≥ 9 is based on certain improved Hardy-Rellich inequalities.