Fibering flat manifolds of diagonal type and their fundamental groups

Abstract

An n-dimensional closed flat manifold is said to be of diagonal type if the standard representation of its holonomy group G is diagonal. An n-dimensional Bieberbach group of diagonal type is the fundamental group of such a manifold. We introduce the diagonal Vasquez invariant of G as the least integer nd(G) such that every flat manifold of diagonal type with holonomy G fibers over a flat manifold of dimension at most nd(G) with flat torus fibers. Using a combinatorial description of Bieberbach groups of diagonal type, we give both upper and lower bounds for this invariant. We show that the lower bounds are exact when G has low rank. We apply this to analyse diffuseness properties of Bieberbach groups of diagonal type. This leads to a complete classification of Bieberbach groups of diagonal type with Klein four-group holonomy and to an application to Kaplansky's Unit Conjecture.