Strong conciseness of coprime commutators in profinite groups

Abstract

Let G be a profinite group. The coprime commutators γj* and δj* are defined as follows. Every element of G is both a γ1*-value and a δ0*-value. For j≥ 2, let X be the set of all elements of G that are powers of γj-1*-values. An element a is a γj*-value if there exist x∈ X and g∈ G such that a=[x,g] and (|x|,|g|)=1. For j≥ 1, let Y be the set of all elements of G that are powers of δj-1*-values. The element a is a δj*-value if there exist x,y∈ Y such that a=[x,y] and (|x|,|y|)=1. In this paper we establish the following results. A profinite group G is finite-by-pronilpotent if and only if there is k such that the set of γk*-values in G has cardinality less than 20. A profinite group G is finite-by-(prosoluble of Fitting height at most k) if and only if there is k such that the set of δk*-values in G has cardinality less than 20.