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 $\mathbb{S}^{n}\backslash{p_{1},\cdots,p_{l}}$ is locally compact in $C^{m,\alpha}$ topology for any $m>0$, whenever the metrics have constant $\sigma_{k}$ 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 $\sigma_{k}$ curvature, which is derived by Viaclovsky \cite{Viac2000} and Han \cite{H1}. When $k=1$, Pollack \cite{Pollack} proved the compactness results for the complete metrics of constant positive scalar curvature on $\mathbb{S}^{n}\backslash{p_{1},\cdots,p_{l}}$.