Invariant Jet differentials and Asymptotic Serre duality

TL;DR

This paper extends the theory of invariant jet differentials, establishing asymptotic duality and Serre duality results, with implications for the Green-Griffiths conjecture in complex geometry.

Contribution

It generalizes previous results to invariant jet bundles and proves an asymptotic duality and Serre duality for sections, advancing the understanding of jet bundle structures.

Findings

Lower bounds on global sections of jet bundles established

Asymptotic duality along fibers proven

Serre duality for asymptotic sections demonstrated

Abstract

We generalize the main result of Demailly \cite{D2} for the bundles $E_{k,m}^{GG}(V^*)$ of jet differentials of order $k$ and weighted degree $m$ to the bundles $E_{k,m}(V^*)$ of the invariant jet differentials of order $k$ and weighted degree $m$. Namely, Theorem 0.5 from \cite{D2} and Theorem 9.3 from \cite{D1} provide a lower bound $\frac{c^k}{k}m^{n+kr-1}$ on the number of the linearly independent holomorphic global sections of $E_{k,m}^{GG} V^* \bigotimes \mathcal{O}(-m \delta A)$ for some ample divisor $A$. The group $G_k$ of local reparametrizations of $(\mathbb{C},0)$ acts on the $k$-jets by orbits of dimension $k$, so that there is an automatic lower bound $\frac{c^k}{k} m^{n+kr-1}$ on the number of the linearly independent holomorphic global sections of $E_{k,m}V^* \bigotimes \mathcal{O}(-m \delta A)$. We formulate and prove the existence of an asymptotic duality along the fibers of the Green-Griffiths jet bundles over projective manifolds. We also prove a Serre duality for asymptotic sections of jet bundles. An application is also given for partial application to the Green-Griffiths conjecture.