Let N be the class of pronilpotent groups, or the class of locally nilpotent profinite groups, or the class of strongly locally nilpotent profinite groups. It is proved that a profinite group G is finite-by-N if and only if G is covered by countably many N-subgroups. The commutator subgroup Gâ²is finite-by-N if and only if the set of all commutators in G is covered by countably many N-subgroups. Here, a group is strongly locally nilpotent if it generates a locally nilpotent variety of groups. According to Zelmanov, a locally nilpotent group is strongly locally nilpotent if and only if it is n-Engel for some positive n.
Detomi, E., Morigi, M., Shumyatsky, P. (2017). On groups covered by locally nilpotent subgroups. ANNALI DI MATEMATICA PURA ED APPLICATA, 196(4), 1525-1535 [10.1007/s10231-016-0627-y].
On groups covered by locally nilpotent subgroups
Morigi, Marta;
2017
Abstract
Let N be the class of pronilpotent groups, or the class of locally nilpotent profinite groups, or the class of strongly locally nilpotent profinite groups. It is proved that a profinite group G is finite-by-N if and only if G is covered by countably many N-subgroups. The commutator subgroup Gâ²is finite-by-N if and only if the set of all commutators in G is covered by countably many N-subgroups. Here, a group is strongly locally nilpotent if it generates a locally nilpotent variety of groups. According to Zelmanov, a locally nilpotent group is strongly locally nilpotent if and only if it is n-Engel for some positive n.| File | Dimensione | Formato | |
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DMS_revised_2nov.pdf
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