Sign-changing blow-up for scalar curvature type equations

Abstract

Given (M,g) a compact Riemannian manifold of dimension n≥ 3, we are interested in the existence of blowing-up sign-changing families ()>0∈ C2,θ(M), θ∈ (0,1), of solutions to g +h=||4n-2- in M\,, where g:=-divg(∇) and h∈ C0,θ(M) is a potential. We prove that such families exist in two main cases: in small dimension n∈ \3,4,5,6\ for any potential h or in dimension 3≤ n≤ 9 when hn-24(n-1)g. These examples yield a complete panorama of the compactness/noncompactness of critical elliptic equations of scalar curvature type on compact manifolds. The changing of the sign is necessary due to the compactness results of Druet and Khuri--Marques--Schoen.