Holomorphic Deformations of Balanced Calabi-Yau ∂∂-Manifolds

Abstract

Given a compact complex n-fold X satisfying the ∂∂-lemma and supposed to have a trivial canonical bundle KX and to admit a balanced (=semi-K\"ahler) Hermitian metric ω, we introduce the concept of deformations of X that are co-polarised by the balanced class [ωn-1]∈ Hn-1,\,n-1(X,\,)⊂ H2n-2(X,\,) and show that the resulting theory of balanced co-polarised deformations is a natural extension of the classical theory of K\"ahler polarised deformations in the context of Calabi-Yau or even holomorphic symplectic compact complex manifolds. The concept of Weil-Petersson metric still makes sense in this strictly more general, possibly non-K\"ahler context, while the Local Torelli Theorem still holds.