Search results for "p-group"

showing 10 items of 25 documents

On generalised subnormal subgroups of finite groups

2013

Let be a formation of finite groups. A subgroup M of a finite group G is said to be -normal in G if belongs to . A subgroup U of a finite group G is called a K--subnormal subgroup of G if either U = G or there exist subgroups U = U0 ≤ U1 ≤ … ≤ Un = G such that Ui − 1 is either normal or -normal in Ui, for i = 1, 2, …, n. The K--subnormality could be regarded as the natural extension of the subnormality to formation theory and plays an important role in the structural study of finite groups. The main purpose of this paper is to analyse classes of finite groups whose K--subnormal subgroups are exactly the subnormal ones. Some interesting extensions of well-known classes of groups emerge.

AlgebraCombinatoricsSubnormal subgroupp-groupNormal subgroupSubgroupLocally finite groupGeneral MathematicsOmega and agemo subgroupIndex of a subgroupFitting subgroupMathematicsMathematische Nachrichten
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On permutations of class sums of alternating groups

1997

We prove a result concerning the class sums of the alternating group An; as a consequence we deduce that if θ is a normalized automorphism of the integral group ring then there exists such that is the identity on , where Sn:is the symmetric group and is the center of

Combinatoricsp-groupAlgebra and Number TheoryInner automorphismSymmetric groupOuter automorphism groupAlternating groupPermutation groupDihedral group of order 6Covering groups of the alternating and symmetric groupsMathematicsCommunications in Algebra
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The exact bounds for the degree of commutativity of a p-group of maximal class, I

2002

Abstract The first major study of p-groups of maximal class was made by Blackburn in 1958. He showed that an important invariant of these groups is the ‘degree of commutativity.’ Recently (1995) Fernandez-Alcober proved a best possible inequality for the degree of commutativity in terms of the order of the group. Recent computations for primes up to 43 show that sharper results can be obtained when an additional invariant is considered. A series of conjectures about this for all primes have been recorded in [A. Vera-Lopez et al., preprint]. In this paper, we prove two of these conjectures.

Combinatoricsp-groupClass (set theory)Pure mathematicsAlgebra and Number TheoryDegree (graph theory)Group (mathematics)Order (group theory)PreprintInvariant (mathematics)Commutative propertyMathematicsJournal of Algebra
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Sufficient conditions for supersolubility of finite groups

1998

Abstract In this paper sufficient conditions for the supersolubility of finite groups are given under the assumption that the maximal subgroups of Sylow subgroups of the group and the maximal subgroups of Sylow subgroups of the Fitting subgroup are well-situated in the group. That will improve earlier results of Srinivasan [7], Asaad et al. [1] and Ballester-Bolinches [2].

Combinatoricsp-groupMathematics::Group TheoryMaximal subgroupAlgebra and Number TheoryGroup (mathematics)Locally finite groupSylow theoremsOmega and agemo subgroupIndex of a subgroupFitting subgroupMathematicsJournal of Pure and Applied Algebra
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ON A PERMUTABILITY PROPERTY OF SUBGROUPS OF FINITE SOLUBLE GROUPS

2010

The structure and embedding of subgroups permuting with the system normalizers of a finite soluble group are studied in the paper. It is also proved that the class of all finite soluble groups in which every subnormal subgroup permutes with the Sylow subgroups is properly contained in the class of all soluble groups whose subnormal subgroups permute with the system normalizers while this latter is properly contained in the class of all supersoluble groups.

Combinatoricsp-groupSubnormal subgroupMathematics::Group TheoryFinite groupGroup (mathematics)Locally finite groupApplied MathematicsGeneral MathematicsSylow theoremsOmega and agemo subgroupComponent (group theory)MathematicsCommunications in Contemporary Mathematics
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On second maximal subgroups of Sylow subgroups of finite groups

2011

Abstract Finite groups in which the second maximal subgroups of the Sylow p -subgroups, p a fixed prime, cover or avoid the chief factors of some of its chief series are completely classified.

Discrete mathematicsp-groupAlgebra and Number TheoryComputer Science::Neural and Evolutionary ComputationMathematics::History and OverviewSylow theoremsChief seriesPhysics::History of PhysicsPrime (order theory)Physics::Popular PhysicsMathematics::Group TheoryMaximal subgroupLocally finite groupCover (algebra)MathematicsJournal of Pure and Applied Algebra
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Sylow numbers and nilpotent Hall subgroups

2013

Abstract Let π be a set of primes and G a finite group. We characterize the existence of a nilpotent Hall π-subgroup of G in terms of the number of Sylow subgroups for the primes in π.

Discrete mathematicsp-groupComplement (group theory)Pure mathematicsAlgebra and Number TheoryMathematics::Number TheorySylow theoremsCentral seriesHall subgroupMathematics::Group TheoryNormal p-complementLocally finite groupNilpotent groupMathematicsJournal of Algebra
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Permutable subnormal subgroups of finite groups

2009

The aim of this paper is to prove certain characterization theorems for groups in which permutability is a transitive relation, the so called PT -groups. In particular, it is shown that the finite solvable PT -groups, the finite solvable groups in which every subnormal subgroup of defect two is permutable, the finite solvable groups in which every normal subgroup is permutable sensitive, and the finite solvable groups in which conjugatepermutability and permutability coincide are all one and the same class. This follows from our main result which says that the finite modular p-groups, p a prime, are those p-groups in which every subnormal subgroup of defect two is permutable or, equivalentl…

Normal subgroupClass (set theory)PermutableMathematics::CombinatoricsGeneral MathematicsSubnormalModular p-groupGrups Teoria deCharacterization (mathematics)Prime (order theory)PT -groupSubnormal subgroupCombinatoricsMathematics::Group TheorySolvable groupPermutable primeÀlgebraAlgebra over a fieldMATEMATICA APLICADAMathematicsConjugate-Permutable
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p-grupos finitos

1997

In the first part, new bounds for the number of conjugacy classes of maximal length of a finite $p$-group $G$, $r(G)$, are obtained, and they are related with the length of these classes. If $r(G)=p^m-b-1$, there exists a unique normal subgroup of order $p^b$, $N_b$, which is characteristic, and structural properties of these groups are studied when $b\le 3$, by paying special attention to the relation between $N_b$, $Z(G)$ and $G$. In the second part, new bounds for the degree of commutativity of a $p$-group of maximal class are established. In Chapter 2, the bounds known for $c$ are reviewed. In Chapter 3, the reuslts obtained by Shepherd for $c_0\le 4$ are extended to $c_0\le 10$ by mean…

P-grup de classe maximalMatemáticasP-grups finitsUNESCO::MATEMÁTICAS::Álgebra::Grupos generalidadesFinite p-groupsP-group of maximal classP-grupo de clase maximalp-grup finit:MATEMÁTICAS::Álgebra::Grupos generalidades [UNESCO]Tesi doctoralTesis doctoralP-grupo finitoMatemàtiquesMATEMATICA APLICADAPhd thesisMathematics
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Sylow permutable subnormal subgroups of finite groups II

2001

[EN] In this paper a local version of Agrawal's theorem about the structure of finite groups in which Sylow permutability is transitive is given. The result is used to obtain new characterisations of this class of finite groups.

Permutability conditionsTransitive relationClass (set theory)Soluble groupGeneral MathematicsSubnormal p'-perfect subgroupSylow theoremsStructure (category theory)Grups Teoria dePst_p-groupHall subgroupsCombinatoricsLocally finite groupComponent (group theory)ÀlgebraPermutable primeAlgebra over a fieldMathematicsBulletin of the Australian Mathematical Society
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