K-semistability is equivariant volume minimization

TL;DR

This paper establishes a deep connection between K-semistability of Fano varieties and the minimization of normalized volume at canonical valuations, providing new characterizations of stability via equivariant volume minimization.

Contribution

It proves that K-semistability is equivalent to normalized volume minimization at the canonical valuation among invariant valuations, linking geometric stability with valuation theory.

Findings

K-semistability is characterized by volume minimization at the canonical valuation.

The canonical valuation is the unique minimizer among invariant quasi-monomial valuations.

New criteria for K-semistability using inequalities involving divisorial valuations.

Abstract

This is a continuation to the paper [arXiv:1511.08164] in which a problem of minimizing normalized volumes over $\mathbb{Q}$-Gorenstein klt singularities was proposed. Here we consider its relation with K-semistability, which is an important concept in the study of K\"{a}hler-Einstein metrics on Fano varieties. In particular, we prove that for a $\mathbb{Q}$-Fano variety $V$, the K-semistability of $(V, -K_V)$ is equivalent to the condition that the normalized volume is minimized at the canonical valuation ${\rm ord}_V$ among all $\mathbb{C}^*$-invariant valuations on the cone associated to any positive Cartier multiple of $-K_V$. In this case, it's shown that ${\rm ord}_V$ is the unique minimizer among all $\mathbb{C}^*$-invariant quasi-monomial valuations. These results allow us to give characterizations of K-semistability by using equivariant volume minimization, and also by using inequalities involving divisorial valuations over $V$.