A Central series associated with the vanishing off subgroup V(G)
Abstract
We generalize Lewis's result about a central series associated with the vanishing off subgroup. We write V1=V(G) for the vanishing off subgroup of G, and Vi=[Vi-1,G] for the terms in this central series. Lewis proved that there exists a positive integer n such that if V3 < G3, then |G:V1|=|G':V2|2=p2n. Let D3/V3 = CG/V3(G'/V3). He also showed that if V3 < G3, then either |G:D3|=pn or D3=V1. We show that if Vi <Gi for i 4, where Gi is the i-th term in the lower central series of G, then |Gi-1:Vi-1|=|G:D3|.
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