Abstract:
We prove that if all the fibres, except possibly one, in a
holomorphic family of compact complex manifolds are Moishezon (i.e.
bimeromorphically equivalent to projective manifolds), then the remaining,
limiting, fibre is again Moishezon. Two new ingredients are introduced for
this purpose. The first one is the Frölicher Approximating Vector Bundle
(FAVB) that displays the degenerating page of the Fröilicher spectral
sequence as the limit, when a complex constant $h$ tends to $0$, of what we
call the $d_h$-cohomology, where $d_h=h\partial + \bar\partial$. The second
ingredient is the introduction of $E_r$-sG metrics, for $r\geq 1$, that
generalise the strongly Gauduchon metrics we introduced in 2009.