Fujiki class C

In algebraic geometry, a complex manifold is called Fujiki class ${\displaystyle 𝒞}$ if it is bimeromorphic to a compact Kähler manifold. This notion was defined by Akira Fujiki.^[1]

Let M be a compact manifold of Fujiki class ${\displaystyle 𝒞}$, and ${\displaystyle X\subset M}$ its complex subvariety. Then X is also in Fujiki class ${\displaystyle 𝒞}$ (,^[2] Lemma 4.6). Moreover, the Douady space of X (that is, the moduli of deformations of a subvariety ${\displaystyle X\subset M}$, M fixed) is compact and in Fujiki class ${\displaystyle 𝒞}$.^[3]

Fujiki class ${\displaystyle 𝒞}$ manifolds are examples of compact complex manifolds which are not necessarily Kähler, but for which the ${\displaystyle \partial \overline{\partial }}$-lemma holds.^[4]

J.-P. Demailly and M. Pǎun have shown that a manifold is in Fujiki class ${\displaystyle 𝒞}$ if and only if it supports a Kähler current.^[5] They also conjectured that a manifold M is in Fujiki class ${\displaystyle 𝒞}$ if it admits a nef current which is big, that is, satisfies

${\displaystyle \underset{M}{\int }{\omega }^{di{m}_{ℂ}M}>0.}$

For a cohomology class ${\displaystyle [\omega ]\in H^2(M)}$ which is rational, this statement is known: by Grauert-Riemenschneider conjecture, a holomorphic line bundle L with first Chern class

${\displaystyle c_1(L)=[\omega ]}$

nef and big has maximal Kodaira dimension, hence the corresponding rational map to

${\displaystyle \mathbb{P}{H}^0(L^N)}$

is generically finite onto its image, which is algebraic, and therefore Kähler.

Fujiki^[6] and Ueno^[7] asked whether the property ${\displaystyle 𝒞}$ is stable under deformations. This conjecture was disproven in 1992 by Y.-S. Poon and Claude LeBrun ^[8]