On the \(n\)-completeness of covering spaces with parameters (Q5947235)

We prove an \(n\)-completeness result concerning families of \(n\)-dimensional complex manifolds over a space of parameters which arise as coverings of families of compact \(n\)-dimensional manifolds. More precisely, we prove the following Theorem 1. Let \(\sigma : \widetilde{X}\to X\) be a covering map of a connected complex manifold \(X\) such that there exists a proper surjective holomorphic map \(\pi : X\to T\) of maximal rank, where \(T\) is a connected complex manifold. Let \(t_0\in T\) and \(n = \dim\pi^{-1}(t_0)\). If \((\pi\circ \sigma)^{-1}(t_0)\) has no compact connected component, then there exists an open neighborhod \(U\) of \(t_0\) in \(T\) such that \((\pi\circ\sigma)^{-1}(U)\) is \(n\)-complete.