L2-vanishing theorem and a conjecture of Koll\'ar

Abstract

In 1995, Koll\'ar conjectured that a smooth complex projective n-fold X with generically large fundamental group has Euler characteristic (X, KX)≥ 0. In this paper, we prove the conjecture assuming X has linear fundamental group, i.e., there exists a representation π1(X) GLN(C) with finite kernel. We deduce the conjecture by proving a stronger L2 vanishing theorem: for the universal cover X of such X, its L2-Dolbeault cohomology H(2)n,q(X)=0 for q≠ 0. The main ingredients of the proof are techniques from the linear Shafarevich conjecture along with some analytic methods.