Deformation Stability of p-SKT and p-HS manifolds

Abstract

In this paper, we introduce the notions of p-Hermitian-symplectic and p-pluriclosed compact complex manifolds as generalisations for an arbitrary positive integer p not exceeding the complex dimension of the manifold of the standard notions of Hermitian-symplectic and SKT manifolds that correspond to the case p=1. We then notice that these two properties are equivalent on ∂∂-manifolds and go on to prove that in (smooth) complex analytic families of ∂∂-manifolds, they are deformation open. Concerning closedness results, we prove that the cones Ap, resp. Cp, of Aeppli cohomology classes of strictly weakly positive (p,p)-forms that are p-pluriclosed, resp. p-Hermitian-symplectic, must be equal on the limit fibre if they are equal on the other fibres and if some rather weak ∂∂-type assumptions are made on the other fibres.