Twisted K\"ahler-Einstein metrics on flag varieties

Abstract

In this paper, we describe invariant twisted K\"ahler-Einstein (tKE) metrics on flag varieties. We also explore some applications of the ideas involved in the proof of our main result to the existence of invariant twisted constant scalar curvature K\"ahler metrics. Also, we provide a precise description for the greatest Ricci lower bound of an arbitrary K\"ahler class on a flag variety. By means of this description, we establish some inequalities related to optimal volume upper bounds for K\"ahler metrics just using tools from Lie theory. Further, we describe the set of tKE metrics for several examples, including full flag varieties, the projectivization of the tangent bundle of Pn+1, and families of flag varieties with Picard number 2.