K\"ahler-Einstein metrics and Ding functional on Q-Fano group compactifications

Abstract

Let G be a complex, connect reductive Lie group which is the complexification of a compact Lie group K. Let M be a Q-Fano G-compactification. In this paper, we first prove the uniqueness of K× K-invariant (singular) K\"ahler-Einstein metric. Then we show the existence of (singular) K\"ahler-Einstein metric implies properness of the reduced Ding functional. Finally, we show that the barycenter condition is also necessary of properness.