Hyperbolicity and fundamental groups of complex quasi-projective varieties
Abstract
This paper investigates the relationship between the hyperbolicity of complex quasi-projective varieties X and the (topological) fundamental group π1(X) in the presence of a linear representation : π1(X) GLN(C). We present our main results in three parts. Firstly, we show that if is bigand the Zariski closure of (π1(X)) semisimple, then for any Xσ:=X×σC where σ∈ Aut(C/Q), there exists a proper Zariski closed subset Z ⊂neqq Xσ such that any closed irreducible subvariety V of Xσ not contained in Z is of log general type, and any holomorphic map from the punctured disk D* to Xσ with image not contained in Z does not have an essential singularity at the origin. In particular, all entire curves in Xσ lie on Z. We provide examples to illustrate the optimality of this condition. Secondly, assuming that is big and reductive, we prove the generalized Green-Griffiths-Lang conjecture for Xσ. Furthermore, if is large, we show that the special subsets of Xσ that capture the non-hyperbolicity locus of Xσ from different perspectives are equal, and this subset is proper if and only if X is of log general type. Lastly, we prove that if X is a special quasi-projective manifold in the sense of Campana or h-special, then (π1(X)) is virtually nilpotent. We provides examples to demonstrate that this result is sharp and thus revise Campana's abelianity conjecture for smooth quasi-projective varieties. To prove these theorems, we develop new features in non-abelian Hodge theory, geometric group theory, and Nevanlinna theory. Some byproducts are obtained.
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