Eloisa Detomi, Marta Morigi, Pavel Shumyatsky
Published 2013-01-17Version 1
We deal with the following conjecture. If w is a group word and G is a finite group in which any nilpotent subgroup generated by w-values has exponent dividing e, then the exponent of the verbal subgroup w(G) is bounded in terms of e and w only. We show that this is true in the case where w is either the nth Engel word or the word [x^n,y_1,y_2,...,y_k] (Theorem A). Further, we show that for any positive integer e there exists a number k=k(e) such that if w is a word and G is a finite group in which any nilpotent subgroup generated by products of k values of the word w has exponent dividing e, then the exponent of the verbal subgroup w(G) is bounded in terms of e and w only (Theorem B).
On finite groups in which coprime commutators are covered by few cyclic subgroups
On $Π$-supplemented subgroups of a finite group
Factorizations in finite groups
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