Hyperbolicity and fundamental groups of complex quasi-projective varieties (II): via non-abelian Hodge theories

Abstract

This is Part II of a series of three papers. We studies the hyperbolicity of complex quasi-projective varieties X in the presence of a big and reductive representation : π1(X) GLN(C). For any Galois conjugate variety Xσ with σ ∈ Aut(C/Q), we prove the generalized Green-Griffiths-Lang conjecture. When is furthermore large, we show that the special subsets of Xσ describing the non-hyperbolicity locus coincide, and that this locus is proper exactly when X is of log general type. Moreover, if the Zariski closure of (π1(X)) is semisimple, we prove that there exists a proper Zariski closed subset Z ⊂neq Xσ such that every subvariety not contained in Z is of log general type and all entire curves in Xσ are contained in Z. This result extends the theorems of the third author (2010) and of Campana-Claudon-Eyssidieux (2015) from projective to quasi-projective varieties, and yields stronger conclusions even in the projective case.

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