Toric arrangements and Bloch-Kato pro-p groups

Abstract

We prove a purely combinatorial obstruction for the Bloch-Kato property within the class of fundamental groups of complement manifolds of toric arrangements (i.e., arrangements of hypersurfaces in the complex torus). As a stepping stone we obtain a combinatorial obstruction for the cohomology of a supersolvable arrangement to be generated in degree 1. Our result allows us to prove that - for all prime numbers p, the pro-p completion of the pure braid group on k strands has the Bloch-Kato property if and only if k≤ 3; - for all prime numbers p, the pro-p completion of the pure mapping class group of the sphere S2 with k punctures has the Bloch-Kato property if and only if k≤ 4.