On the volume of a pseudo-effective class and semi-positive properties of the Harder-Narasimhan filtration on a compact Hermitian manifold

TL;DR

This paper extends the concept of volume for cohomology classes to certain Hermitian manifolds, proves finiteness and a criterion analogous to Kähler cases, and explores semi-positive properties of the Harder-Narasimhan filtration on such manifolds.

Contribution

It generalizes volume and positivity results from Kähler to specific Hermitian manifolds and analyzes the Harder-Narasimhan filtration's slopes under these conditions.

Findings

Volume is finite under the new assumptions.

Grauert-Riemenschneider type criterion holds in the Hermitian setting.

Slopes of the Harder-Narasimhan filtration are non-negative.

Abstract

This paper divides into two parts. Let $(X,\omega)$ be a compact Hermitian manifold. Firstly, if the Hermitian metric $\omega$ satisfies the assumption that $\partial\overline{\partial}\omega^k=0$ for all $k$, we generalize the volume of the cohomology class in the K\"{a}hler setting to the Hermitian setting, and prove that the volume is always finite and the Grauert-Riemenschneider type criterion holds true, which is a partial answer to a conjecture posed by Boucksom. Secondly, we observe that if the anticanonical bundle $K^{-1}_X$ is nef, then for any $\varepsilon>0$, there is a smooth function $\phi_\varepsilon$ on $X$ such that $\omega_\varepsilon:=\omega+i\partial\overline{\partial}\phi_\varepsilon>0$ and Ricci$(\omega_\varepsilon)\geq-\varepsilon\omega_\varepsilon$. Furthermore, if $\omega$ satisfies the assumption as above, we prove that for a Harder-Narasimhan filtration of $T_X$ with respect to $\omega$, the slopes $\mu_\omega(\mathcal{F}_i/\mathcal{F}_{i-1})\geq 0$ for all $i$, which generalizes a result of Cao which plays a very important role in his studying of the structures of K\"{a}hler manifolds.