Towering phenomena for the Yamabe equation on symmetric manifolds

Abstract

Let (M,g) be a compact smooth connected Riemannian manifold (without boundary) of dimension N7. Assume M is symmetric with respect to a point 0 with non-vanishing Weyl's tensor. We consider the linear perturbation of the Yamabe problem (Pε)- Lg u+ε u=uN+2 N-2\ in\ (M,g) . We prove that for any k∈ N, there exists εk>0 such that for all ε∈ (0, εk) the problem (Pε) has a symmetric solution uε , which looks like the superposition of k positive bubbles centered at the point 0 as ε 0. In particular, 0 is a towering blow-up point.