Sign-changing blowing-up solutions for the Brezis--Nirenberg problem in dimensions four and five

Abstract

We consider the Brezis-Nirenberg problem: - u =λ u + |u|p-1u in\,\, , u=0\,\, on\,\,\ ∂, where is a smooth bounded domain in RN, N≥ 3, p=N+2N-2 and λ>0. In this paper we prove that, if is symmetric and N=4,5, there exists a sign-changing solution whose positive part concentrates and blows-up at the center of symmetry of the domain, while the negative part vanishes, as λ→ λ1, where λ1=λ1() denotes the first eigenvalue of - on , with zero Dirichlet boundary condition.