Hyperbolicity and fundamental groups of complex quasi-projective varieties (III): applications

Abstract

This paper is Part III of a series of three. We begin by introducing the notion of h-special varieties, which can be seen as varieties "chain-connected by the Zariski closures of entire curves." We prove that if X is either a special complex quasi-projective variety in the sense of Campana or an h-special variety, then for any linear representation :π1(X) GLN(C), the image (π1(X)) is virtually nilpotent. We also provide examples showing that this result is sharp, leading to a revised form of Campana's abelianity conjecture for smooth quasi-projective varieties. In addition, we prove a structure theorem for quasi-projective varieties with big and semisimple representations of the fundamental groups, thereby addressing a conjecture by Koll\'ar in 1995. We also construct several examples of quasi-projective varieties that are special and h-special, highlighting certain atypical properties of the non-compact case in contrast with the projective setting.

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