On K-stability of Fano weighted hypersurfaces

Taro Sano; Luca Tasin

arXiv:2111.15209·math.AG·January 24, 2024

On K-stability of Fano weighted hypersurfaces

Taro Sano, Luca Tasin

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TL;DR

This paper investigates the K-stability of quasi-smooth weighted Fano hypersurfaces, establishing conditions under which these hypersurfaces are K-stable, especially in low dimensions and for general cases.

Contribution

It provides new criteria for K-stability of weighted Fano hypersurfaces and conditions for automorphism group finiteness, extending understanding in algebraic geometry.

Findings

01

For index I_X=1, the alpha-invariant exceeds a certain bound, implying K-stability.

02

General hypersurfaces with I_X < dimension are K-stable.

03

Sufficient conditions for finiteness of automorphism groups of weighted complete intersections.

Abstract

Let $X \subset P (a_{0}, \dots, a_{n})$ be a quasi-smooth weighted Fano hypersurface of degree $d$ and index $I_{X}$ such that $a_{i} ∣ d$ for all $i$ , with $a_{0} \leq \dots \leq a_{n}$ . If $I_{X} = 1$ , we show that, under a suitable condition, the $α$ -invariant of $X$ is greater than or equal to $dim X / (dim X + 1)$ and $X$ is K-stable. This can be applied in particular to any $X$ as above such that $dim X \leq 3$ . If $X$ is general and $I_{X} < dim X$ , then we show that $X$ is K-stable. We also give a sufficient condition for the finiteness of automorphism groups of quasi-smooth Fano weighted complete intersections.

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Taxonomy

TopicsGeometry and complex manifolds · Geometric Analysis and Curvature Flows · Algebraic Geometry and Number Theory