Linear Shafarevich Conjecture in positive characteristic, Hyperbolicity and Applications

Abstract

Given a complex quasi-projective normal variety X and a linear representation :π1(X) GLN(K) with K any field of positive characteristic, we mainly establish the following results: 1. the construction of the Shafarevich morphism sh:X Sh(X) associated with . 2. In cases where X is projective, is faithful and the -dimension of X is at most two (e.g. X=2), we prove that the Shafarevich conjecture holds for X. 3. In cases where is big, we prove that the Green-Griffiths-Lang conjecture holds for X. 4. When is big and the Zariski closure of (π1(X)) is a semisimple algebraic group, we prove that X is pseudo Picard hyperbolic, and strongly of log general type. 5. If X is special or h-special, then (π1(X)) is virtually abelian. We also prove Claudon-H\"oring-Koll\'ar's conjecture for complex projective manifolds with linear fundamental groups of any characteristic.