A Generalised Volume Invariant for Aeppli Cohomology Classes of Hermitian-Symplectic Metrics

Abstract

We investigate the class of compact complex Hermitian-symplectic manifolds X. For each Hermitian-symplectic metric ω on X, we introduce a functional acting on the metrics in the Aeppli cohomology class of ω and prove that its critical points (if any) must be K\"ahler when X is 3-dimensional. We go on to exhibit these critical points as maximisers of the volume of the metric in its Aeppli class and propose a Monge-Amp\`ere-type equation to study their existence. Our functional is further utilised to define a numerical invariant for any Aeppli cohomology class of Hermitian-symplectic metrics that generalises the volume of a K\"ahler class. We obtain two cohomological interpretations of this invariant. Meanwhile, we construct an invariant in the form of an E2-cohomology class, that we call the E2-torsion class, associated with every Aeppli class of Hermitian-symplectic metrics and show that its vanishing is a necessary condition for the existence of a K\"ahler metric in the given Hermitian-symplectic Aeppli class.