Pluriclosed Star Split Hermitian Metrics

TL;DR

This paper introduces pluriclosed star split Hermitian metrics, generalizing existing metrics, explores their properties, provides examples, and applies them to address the Fino-Vezzoni conjecture, along with studying a related elliptic differential operator.

Contribution

It defines a new class of Hermitian metrics called pluriclosed star split, generalizes existing metrics, and applies these concepts to complex geometry conjectures and differential operators.

Findings

Introduces pluriclosed star split metrics as a generalization of known metrics.

Provides examples and properties of these metrics.

Uses these metrics to affirm the Fino-Vezzoni conjecture under extra assumptions.

Abstract

We introduce a class of Hermitian metrics, that we call pluriclosed star split, generalising both the astheno-K\"ahler metrics of Jost and Yau and the $(n-2)$-Gauduchon metrics of Fu-Wang-Wu on complex manifolds. They have links with Gauduchon and balanced metrics through the properties of a smooth function associated with any Hermitian metric. After pointing out several examples, we generalise the property to pairs of Hermitian metrics and to triples consisting of a holomorphic map between two complex manifolds and two Hermitian metrics, one on each of these manifolds. Applications include an attack on the Fino-Vezzoni conjecture predicting that any compact complex manifold admitting both SKT and balanced metrics must be K\"ahler, that we answer affirmatively under extra assumptions. We also introduce and study a Laplace-like differential operator of order two acting on the smooth $(1,\,1)$-forms of a Hermitian manifold. We prove it to be elliptic and we point out its links with the pluriclosed star split metrics and pairs defined in the first part of the paper.