Some Structural and Closure Properties of an Extension of the q-tensor Product of Groups, q ≥ 0

Abstract

In this work we study some structural properties of the group ηq(G, H), q a non-negative integer, which is an extension of the q-tensor product G q H), where G and H are normal subgroups of some group L. We establish by simple arguments some closure properties of ηq(G,H) when G and H belong to certain Schur classes. This extends similar results concerning the case q = 0 found in the literature. Restricting our considerations to the case G = H, we compute the q-tensor square Dn q Dn for q odd, where Dn denotes the dihedral group of order 2n. Upper bounds to the exponent of G q G are also established for nilpotent groups G of class ≤ 3, which extend to all q ≥ 0 similar bound found by Moravec in [21].