On astheno-Kähler nilmanifolds with balanced metrics

Abstract

In this paper we study the structure of complex nilmanifolds X admitting some special classes of Hermitian metrics, namely, astheno-Kähler, strongly Gauduchon and balanced metrics. We prove that, in complex dimension 4, the existence of a (non necessarily invariant) astheno-Kähler metric on X implies that the nilmanifold is at most 2-step and it has first Betti number ≥ 6. Moreover, the complex structure has a very specific form, sometimes called "of special type" in the literature. We also study the interplay between the existence of astheno-Kähler metrics and that of strongly Gauduchon or balanced metrics. A key result is the use of some obstructions that are preserved by what we call b-extensions. This allows us to study the existence of these metrics on important classes of complex nilmanifolds, such as almost abelian, those having maximal nilpotent complex structures, and 8-dimensional nilmanifolds with non-nilpotent complex structures. We also construct, in every complex dimension n≥ 4, complex nilmanifolds admitting both an astheno-Kähler metric (possibly also being strongly Gauduchon) and another metric that is balanced. As an application, astheno-Kähler nilmanifolds with balanced metrics and with Frölicher spectral sequence not degenerating at the second or third pages are found. To our knowledge, these are the first compact astheno-Kähler manifolds with such properties.