Generalizing a theorem of P. Hall on finite-by-nilpotent groups
Abstract
Let γi(G) and Zi(G) denote the i-th terms of the lower and upper central series of a group G, respectively. P. Hall showed that if γi+1(G) is finite then the index |G:Z2i(G)| is finite. We prove that the same result holds under the weaker hypothesis that |γi+1(G):γi+1(G) Zi(G)| is finite.
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