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On K-stability of Fano weighted hypersurfaces

Taro Sano, Luca Tasin

Abstract

Let $X \subset \mathbb P(a_0,\ldots,a_n)$ be a quasi-smooth weighted Fano hypersurface of degree $d$ and index $I_X$ such that $a_i |d$ for all $i$, with $a_0 \le \ldots \le a_n$. 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 $\dim X \le 3$. 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.

On K-stability of Fano weighted hypersurfaces

Abstract

Let be a quasi-smooth weighted Fano hypersurface of degree and index such that for all , with . If , we show that, under a suitable condition, the -invariant of is greater than or equal to and is K-stable. This can be applied in particular to any as above such that . If is general and , then we show that is K-stable. We also give a sufficient condition for the finiteness of automorphism groups of quasi-smooth Fano weighted complete intersections.
Paper Structure (6 sections, 14 theorems, 80 equations, 1 table)

This paper contains 6 sections, 14 theorems, 80 equations, 1 table.

Key Result

Theorem 1.1

Let $X \subset \mathbb P(a_0,\ldots, a_n)$ be a well-formed quasi-smooth weighted hypersurface of degree $d$. Assume that $a_i |d$ for all $i$ and that $X$ is Fano of index 1. Assume also that (at least) one of the following conditions holds: Then we have Moreover, $X$ is K-stable and admits a Kähler-Einstein metric. If in addition $a_i \ge 2$ for any $i$ and we are not in the former case above,

Theorems & Definitions (46)

  • Theorem 1.1
  • Remark 1.2
  • Theorem 1.4
  • Corollary 1.5
  • Lemma 2.1
  • proof
  • Lemma 2.2
  • proof
  • Lemma 2.3
  • proof
  • ...and 36 more