Improved algebraic fibrations of high-dimensional hyperbolic groups

Abstract

For every d ≥ 3, we construct infinitely many quasi-isometry classes of hyperbolic groups G of cohomological dimension d that algebraically fibre with finitely presented kernel. All our groups arise as finite-index subgroups of right-angled Coxeter groups. In many cases, the L2-Betti numbers of the groups G provide obstructions to higher finiteness properties of the kernel. Our groups therefore expand the list of subgroups of hyperbolic groups with exotic finiteness properties.