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This article is cited in 8 scientific papers (total in 8 papers)
The axiomatic rank of Levi classes
S. A. Shakhova Altai State University, pr. Lenina 61, Barnaul, 656049 Russia
Abstract:
A Levi class $L(\mathcal M)$ generated by a class $\mathcal M$ of groups is a class of all groups in which the normal closure of each element belongs to $\mathcal M$.
It is stated that there exist finite groups $G$ such that a Levi class $L(qG)$, where $qG$ is a quasivariety generated by a group $G$, has infinite axiomatic rank. This is a solution for [The Kourovka Notebook, Quest. 15.36].
Moreover, it is proved that a Levi class $L(\mathcal M)$, where $\mathcal M$ is a quasivariety generated by a relatively free $2$-step nilpotent group of exponent ps with a commutator subgroup of order $p$, $p$ is a prime, $p\ne2$, $s\ge2$, is finitely axiomatizable.
Keywords:
quasivariety, nilpotent group, Levi class, axiomatic rank.
Received: 26.03.2017 Revised: 13.10.2017
Citation:
S. A. Shakhova, “The axiomatic rank of Levi classes”, Algebra Logika, 57:5 (2018), 587–600; Algebra and Logic, 57:5 (2018), 381–391
Linking options:
https://www.mathnet.ru/eng/al868 https://www.mathnet.ru/eng/al/v57/i5/p587
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