Cohomologies of complex manifolds with symplectic (1, 1)-forms
Journal article, Peer reviewed
Accepted version
Permanent lenke
https://hdl.handle.net/11250/3134470Utgivelsesdato
2023Metadata
Vis full innførselSamlinger
- Institutt for matematiske fag [2581]
- Publikasjoner fra CRIStin - NTNU [39143]
Originalversjon
The Journal of Symplectic Geometry. 2023, 21 (1), 73-109. 10.4310/JSG.2023.v21.n1.a2Sammendrag
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 ∂ +∂Λ, where ∂Λ denotes the symplectic adjoint of the ∂-operator. Westudy the Hard Lefschetz Condition on the Dolbeault cohomology groups of X with respect to the symplectic form ω. In [29], we proved that such a condition is equivalent to a certain symplectic analogue of the ∂∂-Lemma, namely the ∂∂Λ-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 ∂ ∂Λ-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 ∂∂Λ-Lemma is stable.