Adiabatic Limit and Deformations of Complex Structures

Abstract

Based on our recent adaptation of the adiabatic limit construction to the case of complex structures, we prove the fact that the deformation limiting manifold of any holomorphic family of Moishezon manifolds is Moishezon. Two new ingredients, hopefully of independent interest, are introduced. The first one associates with every compact complex manifold X, in every degree k, a holomorphic vector bundle over of rank equal to the k-th Betti number of X. This vector bundle, previously given an algebraic construction in the literature, shows that the degenerating page of the Fr\"olicher spectral sequence of X is the holomorphic limit, as h∈ tends to 0, of the dh-cohomology of X, where dh=h∂ + ∂. A relative version of this vector bundle is then associated with every holomorphic family of compact complex manifolds. The second ingredient is a relaxation of the notion of strongly Gauduchon (sG) metric that we introduced in 2009. For a given positive integer r, a Gauduchon metric γ on an n-dimensional compact complex manifold X is said to be Er-sG if ∂γn-1 represents the zero cohomology class on the r-th page of the Fr\"olicher spectral sequence of X. Strongly Gauduchon metrics coincide with E1-sG metrics.