Topological and geometric aspects of almost K\"ahler manifolds via harmonic theory

TL;DR

This paper extends classical K"ahler identities to almost K"ahler manifolds, deriving new geometric and topological results, including dualities, Lefschetz properties, and obstructions to compatible symplectic forms.

Contribution

It introduces generalized identities and dualities for almost K"ahler manifolds, expanding the understanding of their geometric and topological structure.

Findings

Generalized Hodge and Serre dualities for almost K"ahler manifolds

A generalized hard Lefschetz duality and Lefschetz decomposition

Topological obstructions to compatible symplectic forms

Abstract

The well-known K\"ahler identities naturally extend to the non-integrable setting. This paper deduces several geometric and topological consequences of these extended identities for compact almost K\"ahler manifolds. Among these are identities of various Laplacians, generalized Hodge and Serre dualities, a generalized hard Lefschetz duality, and a Lefschetz decomposition, all on the space of $d$-harmonic forms of pure bidegree. There is also a generalization of Hodge Index Theorem for compact almost K\"ahler $4$-manifolds. In particular, these provide topological bounds on the dimension of the space of $d$-harmonic forms of pure bidegree, as well as several new obstructions to the existence of a symplectic form compatible with a given almost complex structure.