Blowing-up solutions for second-order critical elliptic equations: the impact of the scalar curvature

Abstract

Given a closed manifold (Mn,g), n≥ 3, Olivier Druet proved that a necessary condition for the existence of energy-bounded blowing-up solutions to perturbations of the equation gu+h0u=un+2n-2,\ u>0 in M is that h0∈ C1(M) touches the Scalar curvature somewhere when n≥ 4 (the condition is different for n=6). In this paper, we prove that Druet's condition is also sufficient provided we add its natural differentiable version. For n≥ 6, our arguments are local. For the low dimensions n∈\4,5\, our proof requires the introduction of a suitable mass that is defined only where Druet's condition holds. This mass carries global information both on h0 and (M,g).