New criteria for σ-subnormality in σ-solvable finite groups
Research output: Contribution to journal › Research article › Contributed › peer-review
Contributors
Abstract
Let P be the set of all prime numbers, I be a set and σ={σi∣i∈I} be a partition of P. A finite group is said to be σ-primary if it is a σi-group for some i∈I, and we say that a finite group is σ-solvable if all its chief factors are σ-primary. A subgroup H of a finite group G is said to be σ-subnormal in G if there is a chain H=H0≤H1≤⋯≤Hn=G of subgroups of G such that Hi-1 is normal in Hi or Hi/(Hi-1)Hi is σ-primary for all 1≤i≤n. Given subgroups H and A of a σ-solvable finite group G, we prove two criteria for H to be σ-subnormal in ⟨H,A⟩. Our criteria extend classical subnormality criteria of Fumagalli [5], which themselves generalize a classical subnormality criterion of Wielandt [13].
Details
Original language | English |
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Journal | Ricerche di Matematica |
Publication status | Accepted/In press - 2024 |
Peer-reviewed | Yes |
Keywords
ASJC Scopus subject areas
Keywords
- 20D10, 20D20, 20D30, 20D35, Finite group, σ-solvable, σ-subnormal