A note on subnormal and abnormal chains
From MaRDI portal
Publication:1220580
DOI10.1016/0021-8693(75)90103-9zbMath0314.20019OpenAlexW2059341335MaRDI QIDQ1220580
Publication date: 1975
Published in: Journal of Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0021-8693(75)90103-9
Series and lattices of subgroups (20D30) Abstract finite groups (20D99) Finite nilpotent groups, (p)-groups (20D15) Subnormal subgroups of abstract finite groups (20D35)
Related Items (24)
Finite groups all of whose subgroups are \({\mathcal F}\)-subnormal or \({\mathcal F}\)-subabnormal ⋮ GROUPS WHOSE FINITELY GENERATED SUBGROUPS ARE EITHER PERMUTABLE OR PRONORMAL ⋮ Finite groups with \(f\)-abnormal or \(f\)-subnormal subgroups ⋮ On conormal subgroups ⋮ On some results in the theory of finite partially soluble groups ⋮ Gruppi minimali non in \(s\eta\vee\mathcal A\) ⋮ Finite groups with formation subnormal primary subgroups ⋮ Unnamed Item ⋮ Gruppi finiti i cui sottogruppi sono o subnormali o pronormali ⋮ Unnamed Item ⋮ Finite groups, whose primary subgroups are either \(F\)-subnormal or \(F\)-abnormal. ⋮ On some groups close to nilpotent groups. ⋮ Groups all cyclic subgroups of which are \textit{BNA}-subgroups ⋮ Groups with only {\(\sigma\)}-semipermutable and {\(\sigma\)}-abnormal subgroups ⋮ Finite groups with abnormal and \(\mathfrak{U}\)-subnormal subgroups ⋮ Groups whose all subgroups are ascendant or self-normalizing. ⋮ On some groups with only two types of subgroups ⋮ Groups with all subgroups either subnormal or self-normalizing. ⋮ Finite groups all of whose subgroups are σ-subnormal or σ-abnormal ⋮ Finite groups with abnormal or formational subnormal primary subgroups ⋮ \(\mathfrak F\)-subnormal and \(\mathfrak F\)-subabnormal chains in finite groups ⋮ Subgroups in T-groups ⋮ On the structure of groups whose non-normal subgroups are core-free ⋮ Finite groups with σ-abnormal or σ-subnormal σ-primary subgroups
Cites Work
This page was built for publication: A note on subnormal and abnormal chains
