A relative Yau-Tian-Donaldson conjecture and stability thresholds

TL;DR

This paper introduces a new stability criterion for Fano varieties based on a generalized invariant and a Riemann-Zariski formalism, linking the existence of Kähler-Einstein metrics with stability thresholds.

Contribution

It generalizes the Fujita-Odaka invariant, develops a new Riemann-Zariski formalism for K-stability, and establishes a novel connection between Kähler-Einstein metrics and stability conditions via the invariant $ ilde{oldsymbol{ extdelta}}$.

Findings

Characterizes uniform K-stability using the invariant $ ilde{oldsymbol{ extdelta}}$.

Proves the equivalence of existence of Kähler-Einstein metrics with a new stability notion.

Establishes strong openness of the uniform $oldsymbol{ extdelta}$-log Ding stability.

Abstract

Generalizing Fujita-Odaka invariant, we define a function $\tilde{\delta}$ on a set of generalized $b$-divisors over a smooth Fano variety. This allows us to provide a new characterization of uniform $K$-stability. A key role is played by a new Riemann-Zariski formalism for $K$-stability. For any generalized $b$-divisor $\mathbf{D}$, we introduce a (uniform) $\mathbf{D}$-log $K$-stability notion. We prove that the existence of a unique K\"ahler-Einstein metric with prescribed singularities implies this new $K$-stability notion when the prescribed singularities are given by the generalized $b$-divisor $\mathbf{D}$. We connect the existence of a unique K\"ahler-Einstein metric with prescribed singularities to a uniform $\mathbf{D}$-log Ding-stability notion which we introduce. We show that these conditions are satisfied exactly when $\tilde{\delta}(\mathbf{D})>1$, extending to the $\mathbf{D}$-log setting the $\delta$-valuative criterion of Fujita-Odaka and Blum-Jonsson. Finally we prove the strong openness of the uniform $\mathbf{D}$-log Ding stability as a consequence of the strong continuity of $\tilde{\delta}$.