Abstract
In this paper, we are concerned with the following elliptic equation { -delta u =|u|(4/(n-2))u/[ln(e + |u|)](epsilon) in omega,u = 0 on & part;omega, where omega is a smooth bounded open domain in R-n, n >= 4 and epsilon > 0. By using a Ljapunov-Schmidt reduction method, Clapp et al. in Journal of Diff. Eq. (Vol 275) proved that there exists a single-peak positive solution for small epsilon. This solution blows up at a non-degenerate critical point of the Robin function as epsilon goes to 0. Here we construct positive as well as changing sign solutions concentrated at several points inside the domain 2 at the same time. More precisely, we build solutions which blow up (positively or negatively) at distinct points which form a non-degenerate critical point of a function defined explicitly in terms of the Green function and its regular part. Our proof follows the finite reduction method introduced by Bahri, Li and Rey in Calc. Var. and PDE (Vol 3).