Arithmeticity of groups Zn Z

Abstract

We study when the group ZnA Z is arithmetic where A∈ GLn( Z) is hyperbolic and semisimple. We begin by giving a characterization of arithmeticity phrased in the language of algebraic tori, building on work of Grunewald-Platonov. We use this to prove several more concrete results that relate the arithmeticity of ZnA Z to the reducibility properties of the characteristic polynomial of A. Our tools include algebraic tori, representation theory of finite groups, Galois theory, and the inverse Galois problem.