On Uniqueness And Existence of Conformally Compact Einstein Metrics with Homogeneous Conformal Infinity

TL;DR

This paper proves the uniqueness and existence of conformally compact Einstein metrics with certain symmetric conformal infinities, extending results to higher dimensions and specific symmetry conditions.

Contribution

It establishes uniqueness and existence results for conformally compact Einstein metrics with symmetric conformal infinities, especially for $ ext{SU}(k+1)$-invariant metrics on spheres.

Findings

Uniqueness of CCE metrics near the round metric on $S^3$

Uniqueness of non-positively curved CCE metrics on higher-dimensional balls with symmetric conformal infinity

Existence of such metrics using the continuity method

Abstract

In this paper we show that for a generalized Berger metric $\hat{g}$ on $S^3$ close to the round metric, the conformally compact Einstein (CCE) manifold $(M, g)$ with $(S^3, [\hat{g}])$ as its conformal infinity is unique up to isometries. For the high-dimensional case, we show that if $\hat{g}$ is an $\text{SU}(k+1)$-invariant metric on $S^{2k+1}$ for $k\geq1$, the non-positively curved CCE metric on the $(2k+1)$-ball $B_1(0)$ with $(S^{2k+1}, [\hat{g}])$ as its conformal infinity is unique up to isometries. In particular, since in \cite{LiQingShi}, we proved that if the Yamabe constant of the conformal infinity $Y(S^{2k+1}, [\hat{g}])$ is close to that of the round sphere then any CCE manifold filled in must be negatively curved and simply connected, therefore if $\hat{g}$ is an $\text{SU}(k+1)$-invariant metric on $S^{2k+1}$ which is close to the round metric, the CCE metric filled in is unique up to isometries. Using the continuity method, we prove an existence result of the non-positively curved CCE metric with prescribed conformal infinity $(S^{2k+1}, [\hat{g}])$ when the metric $\hat{g}$ is $\text{SU}(k+1)$-invariant.