A dichotomy for integral group rings via higher modular groups as amalgamated products

Abstract

We show that U(ZG), the unit group of the integral group ring Z G, either satisfies Kazhdan's property (T) or is, up to commensurability, a non-trivial amalgamated product, in case G is a finite group satisfying some mild conditions. Crucial in the proof is the construction of amalgamated decompositions of the elementary group E2(O), where O is an order in a rational division algebra. A major step is to introduce subgroups E2(n(Z)) inside the so-called higher modular groups SL+(n(Z)), which are discrete subgroups of certain 2 × 2 matrix groups with entries in a Clifford algebra. The groups E2(n(Z)) mimic the elementary groups in linear groups over rings. We prove that E2(n(Z)) has in general a non-trivial decomposition as a free product with amalgamated subgroup E2(n-1(Z)). From this we obtain that also the higher modular groups do have a very clearly structured amalgam decompositions in low dimensions.