On matrix groups with finite spectrum

We study groups of matrices SGL ‫⌫ޚ‬ of augmentation one over the integral n Ž . group ring ‫⌫ޚ‬ of a nilpotent group ⌫. We relate the torsion of SGL ‫⌫ޚ‬ to the n Ž . torsion of ⌫. We prove that all abelian p-subgroups of SGL ‫⌫ޚ‬ can be stably n Ž . diagonalized. Also, all finite subgroups of SGL

A group G of complex square invertible matrices is said to have submultiplicative spectrum if for any G, H in G we have that (GH ) ⊂ (G) (H ), where (G) denotes the spectrum of G. The question whether such a group can be irreducible arises in the study of the structure of matrix semigroups and is an

The Todd-Coxeter coset enumeration algorithm is one of the most important tools of computational group theory. It may be viewed as a means of constructing permutation representations of finitely presented groups. In this paper we present an analogous algorithm for directly constructing matrix repres

Given an abstract group G it is important to be able to find explicit generators for a concrete group isomorphic to G, in order to perform calculations with the group. In this paper we describe a method of using the "Meat-axe" to construct explicit matrix generators for a given group.