Groups with many generalized \(FC\)-subgroup

Groups with many generalized \(FC\)-subgroup

Let \(FC^0\) be the class of all finite groups, and for each non-negative integer \(m\) define by induction the group class \(FC^{m+1}\) consisting of all groups \(G\) such that the factor group \(G/C_G(x^G)\) has the property \(FC^m\) for all elements \(x\) of \(G\). Clearly, \(FC^1\) is the class...

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Datum:2018
Hauptverfasser: Russo, Alessio, Vincenzi, Giovanni
Format: Artikel
Sprache:English
Veröffentlicht: Lugansk National Taras Shevchenko University 2018
Schlagworte:
Conjugacy class
\(FC\)-groups
normalizer subgroup
subnormal subgroup
20F24
Online Zugang:https://admjournal.luguniv.edu.ua/index.php/adm/article/view/802
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Назва журналу:Algebra and Discrete Mathematics

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Algebra and Discrete Mathematics
id admjournalluguniveduua-article-802
record_format ojs
spelling admjournalluguniveduua-article-8022018-04-04T08:49:22Z Groups with many generalized \(FC\)-subgroup Russo, Alessio Vincenzi, Giovanni Conjugacy class, \(FC\)-groups, normalizer subgroup, subnormal subgroup 20F24 Let \(FC^0\) be the class of all finite groups, and for each non-negative integer \(m\) define by induction the group class \(FC^{m+1}\) consisting of all groups \(G\) such that the factor group \(G/C_G(x^G)\) has the property \(FC^m\) for all elements \(x\) of \(G\). Clearly, \(FC^1\) is the class of \(FC\)-groups and every nilpotent group with class at most \(m\) belongs to \(FC^m\). The class of \(FC^m\)-groups was introduced in [6]. In this article the structure of groups with finitely many normalizers of non-\(FC^m\)-subgroups (respectively, the structure of groups whose subgroups either are subnormal with bounded defect or have the property \(FC^m\)) is investigated. Lugansk National Taras Shevchenko University 2018-04-04 Article Article Peer-reviewed Article application/pdf https://admjournal.luguniv.edu.ua/index.php/adm/article/view/802 Algebra and Discrete Mathematics; Vol 8, No 4 (2009) 2415-721X 1726-3255 en https://admjournal.luguniv.edu.ua/index.php/adm/article/view/802/332 Copyright (c) 2018 Algebra and Discrete Mathematics
institution Algebra and Discrete Mathematics
baseUrl_str
datestamp_date 2018-04-04T08:49:22Z
collection OJS
language English
topic Conjugacy class
\(FC\)-groups
normalizer subgroup
subnormal subgroup
20F24
spellingShingle Conjugacy class
\(FC\)-groups
normalizer subgroup
subnormal subgroup
20F24
Russo, Alessio
Vincenzi, Giovanni
Groups with many generalized \(FC\)-subgroup
topic_facet Conjugacy class
\(FC\)-groups
normalizer subgroup
subnormal subgroup
20F24
format Article
author Russo, Alessio
Vincenzi, Giovanni
author_facet Russo, Alessio
Vincenzi, Giovanni
author_sort Russo, Alessio
title Groups with many generalized \(FC\)-subgroup
title_short Groups with many generalized \(FC\)-subgroup
title_full Groups with many generalized \(FC\)-subgroup
title_fullStr Groups with many generalized \(FC\)-subgroup
title_full_unstemmed Groups with many generalized \(FC\)-subgroup
title_sort groups with many generalized \(fc\)-subgroup
description Let \(FC^0\) be the class of all finite groups, and for each non-negative integer \(m\) define by induction the group class \(FC^{m+1}\) consisting of all groups \(G\) such that the factor group \(G/C_G(x^G)\) has the property \(FC^m\) for all elements \(x\) of \(G\). Clearly, \(FC^1\) is the class of \(FC\)-groups and every nilpotent group with class at most \(m\) belongs to \(FC^m\). The class of \(FC^m\)-groups was introduced in [6]. In this article the structure of groups with finitely many normalizers of non-\(FC^m\)-subgroups (respectively, the structure of groups whose subgroups either are subnormal with bounded defect or have the property \(FC^m\)) is investigated.
publisher Lugansk National Taras Shevchenko University
publishDate 2018
url https://admjournal.luguniv.edu.ua/index.php/adm/article/view/802
work_keys_str_mv AT russoalessio groupswithmanygeneralizedfcsubgroup
AT vincenzigiovanni groupswithmanygeneralizedfcsubgroup
first_indexed 2025-12-02T15:32:46Z
last_indexed 2025-12-02T15:32:46Z
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