Compactness Theorem of Complete k-Curvature Manifolds with Isolated Singularities

Abstract

In this paper we prove that the set of metrics conformal to the standard metric on Sn\p1,·s,pl\ is locally compact in Cm,α topology for any m>0, whenever the metrics have constant σk curvature and the k-Dilational Pohozaev invariants have positive lower bound for k<n/2. Here the k-Dilational Pohozaev invariants come from the Kazdan-Warner type identity for the σk curvature, which is derived by Viaclovsky Viac2000 and Han H1. When k=1, Pollack Pollack proved the compactness results for the complete metrics of constant positive scalar curvature on Sn\p1,·s,pl\.