Existence of global invariant jet differentials on projective hypersurfaces of high degree

TL;DR

This paper proves the existence of global invariant jet differentials on high-degree smooth projective hypersurfaces, with implications for complex geometry and hyperbolicity, especially in high dimensions.

Contribution

It establishes the existence of invariant jet differentials of order n on high-degree hypersurfaces, extending previous results and providing sharp bounds.

Findings

Existence of global sections of invariant jet differentials for large degree hypersurfaces

Sharpness of the order n for jet differentials

Effective logarithmic version in low dimensions

Abstract

Let $X\subset\mathbb P^{n+1}$ be a smooth complex projective hypersurface. In this paper we show that, if the degree of $X$ is large enough, then there exist global sections of the bundle of invariant jet differentials of order $n$ on $X$, vanishing on an ample divisor. We also prove a logarithmic version, effective in low dimension, for the log-pair $(\mathbb P^n,D)$, where $D$ is a smooth irreducible divisor of high degree. Moreover, these result are sharp, \emph{i.e.} one cannot have such jet differentials of order less than $n$.