A priori estimates for finite-energy sign-changing blowing-up solutions of critical elliptic equations

Abstract

We prove sharp pointwise blow-up estimates for finite-energy sign-changing solutions of critical equations of Schr\"odinger-Yamabe type on a closed Riemannian manifold (M,g) of dimension n 3. This is a generalisation of the so-called C0-theory for positive solutions of Schr\"odinger-Yamabe type equations. To deal with the sign-changing case we develop a method of proof that combines an a priori bubble-tree analysis with a finite-dimensional reduction, and reduces the proof to obtaining sharp a priori blow-up estimates for a linear problem.