Cohomologies of complex manifolds with symplectic (1,1)-forms

Abstract

Let (X, J) be a complex manifold with a non-degenerated smooth d-closed (1,1)-form ω. Then we have a natural double complex ∂+∂, where ∂ denotes the symplectic adjoint of the ∂-operator. We study the Hard Lefschetz Condition on the Dolbeault cohomology groups of X with respect to the symplectic form ω. In TW, we proved that such a condition is equivalent to a certain symplectic analogous of the ∂∂-Lemma, namely the ∂\, ∂-Lemma, which can be characterized in terms of Bott--Chern and Aeppli cohomologies associated to the above double complex. We obtain Nomizu type theorems for the Bott--Chern and Aeppli cohomologies and we show that the ∂\, ∂-Lemma is stable under small deformations of ω, but not stable under small deformations of the complex structure. However, if we further assume that X satisfies the ∂∂-Lemma then the ∂\, ∂-Lemma is stable.