Clustering phenomena for linear perturbation of the Yamabe equation

Abstract

Let (M,g) be a non-locally conformally flat compact Riemannian manifold with dimension N7. We are interested in finding positive solutions to the linear perturbation of the Yamabe problem - Lg u+ε u=uN+2 N-2\ in\ (M,g) where the first eigenvalue of the conformal laplacian - Lg is positive and ε is a small positive parameter. We prove that for any point 0∈ M which is non-degenerate and non-vanishing minimum point of the Weyl's tensor and for any integer k there exists a family of solutions developing k peaks collapsing at 0 as ε goes to zero. In particular, 0 is a non-isolated blow-up point.