Profinite groups with restricted centralizers of powers
Abstract
A group G is said to have restricted centralizers if for every x∈ G the centralizer CG(x) either is finite or has finite index in G. Shalev showed that a profinite group with restricted centralizers is virtually abelian. Here we take interest in profinite groups G for which there is an integer n such that CG(xn) is either finite or open whenever x∈ G. It is shown that such a group G has an open normal subgroup T with the property that G/Z(T) has finite exponent.
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