On Chernikov-by-nilpotent groups
Abstract
Let γk=[x1,…,xk] be the k-th lower central group-word. Given a group G, we write Xk(G) for the set of γk-values and γk(G) for the k-th term of the lower central of G. This paper deals with groups in which gXk(G) is a Chernikov group of size at most (m,n) for all g∈ G. The main result is that γk+1(G) is a Chernikov group and its size is (k,m,n)-bounded.
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