A Polycyclic Presentation for the q-Tensor Square of a Polycyclic Group

Abstract

Let G be a group and q a non-negative integer. We denote by q(G) a certain extension of the q-tensor square G q G by G × G. In this paper we derive a polycyclic presentation for G q G, when G is polycyclic, via its embedding into q(G). Furthermore, we derive presentations for the q-exterior square G q G and for the second homology group H2(G, Zq). Additionally, we establish a criterion for computing the q-exterior centre Zq (G) of a polycyclic group G, which is helpful for deciding whether G is capable modulo q. These results extend to all q ≥ 0 existing methods due to Eick and Nickel for the case q = 0.