Symmetric differentials and jets extension of $L^2$ holomorphic functions

TL;DR

This paper explores the relationship between symmetric differentials on complex hyperbolic quotients and weighted $L^2$ holomorphic functions on associated fiber bundles, establishing existence results and conditions for bounded functions.

Contribution

It demonstrates the existence of symmetric differentials of any degree ≥ n+2 on certain hyperbolic quotients and constructs weighted $L^2$ functions from these differentials, linking geometric and analytic properties.

Findings

Existence of symmetric differentials of degree N ≥ n+2 on $ abla$-quotients.

Construction of weighted $L^2$ holomorphic functions from symmetric differentials.

Bounded holomorphic functions are constant under certain cohomological conditions.

Abstract

Let $\Sigma = \mathbb B^n/\Gamma$ be a complex hyperbolic space with discrete subgroup $\Gamma$ of the automorphism group of the unit ball $\mathbb B^n$ and $\Omega $ be a quotient of $\mathbb B^n \times\mathbb B^n$ under the diagonal action of $\Gamma$ which is a holomorphic $\mathbb B^n$-fiber bundle over $\Sigma$. The goal of this article is to investigate the relation between symmetric differentials of $\Sigma$ and the weighted $L^2$ holomorphic functions of $\Omega$. If there exists a holomorphic function on $\Omega$ and it vanishes up to $k$-th order on the maximal compact complex variety in $\Omega$, then there exists a symmetric differential of degree $k+1$ on $\Sigma$. Using this property, we show that $\Sigma$ always has a symmetric differential of degree $N$ for any $N \geq n+2$. Moreover if $\Sigma$ is compact, for each symmetric differential over $\Sigma$ we construct a weighted $L^2$ holomorphic function on $\Omega$. We also show that any bounded holomorphic function on $\Omega$ is constant when $H^0 (\Sigma, S^{m} T_{\Sigma}^* )=0$ for every $0 < m \leq n+1$.