Quasi-Kähler Bestvina-Brady groups
arXiv:math/0603446 · doi:10.1090/S1056-3911-07-00463-8
Abstract
A finite simple graph \G determines a right-angled Artin group G_\G, with one generator for each vertex v, and with one commutator relation vw=wv for each pair of vertices joined by an edge. The Bestvina-Brady group N_\G is the kernel of the projection G_\G \to \Z, which sends each generator v to 1. We establish precisely which graphs \G give rise to quasi-Kähler (respectively, Kähler) groups N_\G. This yields examples of quasi-projective groups which are not commensurable (up to finite kernels) to the fundamental group of any aspherical, quasi-projective variety.
11 pages, accepted for publication by the Journal of Algebraic Geometry