6533b851fe1ef96bd12aa1df
RESEARCH PRODUCT
Some local properties defining $\mathcal T_0$-groups and related classes of groups
Adolfo Ballester-bolinchesM. F. RaglandRamon Esteban-romeroJames C. Beidlemansubject
Discrete mathematicsTransitive relation$\mathcal{T}$-groupGroup (mathematics)General Mathematics010102 general mathematics$\mathcal{PST}$-group010103 numerical & computational mathematics01 natural sciencesFitting subgroupCombinatoricsSubnormal subgroupNilpotentSubgroupT-group20D1020D350101 mathematicsAlgebra over a fieldfinite solvable groupSubnormal subgroup20D20Mathematicsdescription
We call $G$ a $\operatorname{Hall}_{\mathcal X}$-group if there exists a normal nilpotent subgroup $N$ of $G$ for which $G/N'$ is an ${\mathcal X}$-group. We call $G$ a ${\mathcal T}_0$-group provided $G/\Phi(G)$ is a ${\mathcal T}$-group, that is, one in which normality is a transitive relation. We present several new local classes of groups which locally define $\operatorname{Hall}_{\mathcal X}$-groups and ${\mathcal T}_0$-groups where ${\mathcal X}\in\{ {\mathcal T},\mathcal {PT},\mathcal {PST}\}$; the classes $\mathcal {PT}$ and $\mathcal {PST}$ denote, respectively, the classes of groups in which permutability and S-permutability are transitive relations.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2016-01-01 | Publicacions Matemàtiques |