On line and pseudoline configurations and ball-quotients

Abstract

In this note we show that there are no real configurations of d≥ 4 lines in the projective plane such that the associated Kummer covers of order 3d-1 are ball-quotients and there are no configurations of d≥ 4 lines such that the Kummer covers of order 4d-1 are ball-quotients. Moreover, we show that there exists only one configuration of real lines such that the associated Kummer cover of order 5d-1 is a ball-quotient. In the second part we consider the so-called topological (nk)-configurations and we show, using Shnurnikov's inequality, that for n < 27 there do not exist (n5)-configurations and and for n < 41 there do not exist (n6)-configurations.