New variations on the theme of Baer's theorem

Abstract

Let γs(G) and Zs(G) denote the s-th terms of the lower and upper central series of a group G, respectively. A classical theorem by R. Baer states that if Zs(G) has finite index n in G, then γs+1(G) is also finite. In this paper, we prove that if G is a generalized soluble group such that the quotient γs(G)/(γs(G) Zt(G)) has finite rank r for some s,t, then the rank of γs+t(G) is finite and (r,s,t)-bounded. Moreover, a corresponding result replacing the finite-rank assumption by the condition to be a Chernikov group of bounded size is also obtained. These results extend recent generalizations of the classical Baer's theorem.