Commutators, centralizers, and strong conciseness in profinite groups

Abstract

A group G is said to have restricted centralizers if for each g ∈ G the centralizer CG(g) either is finite or has finite index in G. Shalev showed that a profinite group with restricted centralizers is virtually abelian. We take interest in profinite groups with restricted centralizers of uniform commutators, that is, elements of the form [x1,…,xk], where π(x1)=π(x2)=…=π(xk). Here π(x) denotes the set of prime divisors of the order of x∈ G. It is shown that such a group necessarily has an open nilpotent subgroup. We use this result to deduce that γk(G) is finite if and only if the cardinality of the set of uniform k-step commutators in G is less than 20

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