Groups with finitely many long commutators of maximal order
Abstract
Given a group G and elements x1,x2,…, x∈ G, the commutator of the form [x1,x2,…, x] is called a commutator of length . The present paper deals with groups having only finitely many commutators of length of maximal order. We establish the following results. Let G be a residually finite group with finitely many commutators of length of maximal order. Then G contains a subgroup M of finite index such that γ(M)=1. Moreover, if G is finitely generated, then γ(G) is finite. Let ,m,n,r be positive integers and G an r-generator group with at most m commutators of length of maximal order n. Suppose that either n is a prime power, or n=pαqβ, where p and q are odd primes, or G is nilpotent. Then γ(G) is finite of (m,,r)-bounded order and there is a subgroup M G of (m,,r)-bounded index such that γ(M)=1.
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