\({\mathfrak F}\)-sets and permutation groups
From MaRDI portal
Publication:1212993
DOI10.1016/0021-8693(74)90212-9zbMath0295.20005OpenAlexW2033033376MaRDI QIDQ1212993
Publication date: 1974
Published in: Journal of Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0021-8693(74)90212-9
Related Items
Reducibility behavior of polynomials with varying coefficients, Finite groups with a standard subgroup of type \(U_5(2^n)\), \(n>1\), Standard subgroups isomorphic to PSU(6,2) or SU(6,2), 2-transitive groups whose 2-point stabilizer has 2-rank 1, Doubly transitive groups with a solvable one point stabilizer, Doubly transitive groups of odd degree whose one point stabilizers are local, Eine Charakterisierung einiger endlicher einfacher Gruppen durch \(\mathfrak F\)-Mengen, On finite groups containing a CC-subgroup, On finite groups with \(\mathfrak F\)-sets, On a theorem of N. Ito on factorizable groups, Transitive permutation groups with a solvable one-point stabilizer
Cites Work
- Unnamed Item
- Unnamed Item
- A characterization of certain Frobenius groups
- A characterization of the unitary and symplectic groups over finite fields of characteristic at least 5
- Endliche zweifach transitive Permutationsgruppen, deren Involutionen keine Fixpunkte haben
- The characterization of finite groups with abelian Sylow 2-subgroups
- Some results on 2-transitive groups
- Transitive Gruppen gerader Ordnung, in denen jede Involution genau einen Punkt fest läßt
- On subgroups with trivial normalizer intersection
- Finite groups with a split BN-pair of rank 1. I
- On doubly transitive permutation groups of degree n \(\equiv\) 2 mod 4
- Groups generated by a class of elements of order 3
- A characterization of \(L_n(q)\) as a permutation group
- 2-transitive groups in which the stabilizer of two points is cyclic
- Finite Groups With a Proper 2-Generated Core
- On Ree's Series of Simple Groups
- The Multiplicators of Certain Simple Groups
- The Subgroups of PSL(3, q) for odd q
- Finite Groups with Quasi-Dihedral and Wreathed Sylow 2-Subgroups
