Irrational pencils, and characterization of Varieties isogenous to a product, via the Profinite completion of the Fundamental group
Abstract
We give a very short proof of two Theorems, whose content is outlined in the title, and where g is the fundamental group of a compact complex curve of genus g: (1) Theorem 2.1 of the irrational pencil in the profinite version, saying that for a compact K\"ahler manifold an irrational pencil, that is, a fibration onto a curve of genus g ≥ 2, corresponds to a surjection of the profinite completion π1(X) g, which satisfies a maximality property; (2) Theorem 1.4 on the characterization of varieties isogenous to a product, profinite version, giving in particular a criterion for X a compact K\"ahler manifold to be isomorphic to a product of curves of genera at least 2: if and only if π1(X) Π1n gi, and some volume or cohomological condition is satisfied. Theorem 1.4 yields a stronger result than the Main Theorem A of a recent article by 5 authors.
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