K-polystability of Q-Fano varieties admitting Kahler-Einstein metrics

TL;DR

This paper proves that Fano varieties with Kahler-Einstein metrics are K-polystable, confirming part of the Yau-Tian-Donaldson conjecture, and explores implications for toric and singular cases, including stability and entropy bounds.

Contribution

It establishes K-polystability for Fano varieties with Kahler-Einstein metrics, extending results to singular, toric, and edge-cone cases, and provides new proofs and applications.

Findings

Fano varieties with Kahler-Einstein metrics are K-polystable.

K-polystability of toric Fano varieties characterized by barycenter condition.

Extensions to singular, logarithmic, and edge-cone Kahler-Einstein metrics.

Abstract

It is shown that any, possibly singular, Fano variety X admitting a Kahler-Einstein metric is K-polystable, thus confirming one direction of the Yau-Tian-Donaldson conjecture in the setting of Q-Fano varieties equipped with their anti-canonical polarization. The proof exploits convexity properties of the Ding functional along weak geodesic rays in the space of all bounded positively curved metrics on the anti-canonical line bundle of X and also gives a new proof in the non-singular case. One consequence is that a toric Fano variety X is K-polystable iff it is K-polystable along toric degenerations iff 0 is the barycenter of the canonical weight polytope P associated to X. The results also extend to the logarithmic setting and in particular to the setting of Kahler-Einstein metrics with edge-cone singularities. Furthermore, applications to geodesic stability, bounds on the Ricci potential and Perelman's entropy functional on K-unstable Fano manifolds are given.