Fundamental groups, coregularity, and low dimensional klt Calabi-Yau pairs

Abstract

In this article, we study how the absolute coregularity of a projective log pair reflects on its fundamental group. More precisely, we conjecture that for a projective klt log pair (X,D) of absolute coregularity c (and arbitrary dimension) the fundamental group π1 reg(X,D) admits a normal abelian subgroup of finite index and rank at most 2c. We prove this conjecture in the cases 0 ≤ c ≤ 3, building on the almost abelianity of the fundamental groups of klt Calabi-Yau pairs of dimension ≤ 3. In the cases c ∈ \0,1,2\ and fixed dimension, we can furthermore bound the index of a solvable normal subgroup. In dimension three, we are able to prove almost abelianity of the fundamental group of the regular locus for projective klt Calabi-Yau pairs.