Search results for "Permutable"

showing 8 items of 28 documents

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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Z-permutable subgroups of finite groups

2016

Let Z be a complete set of Sylow subgroups of a finite group G, that is, a set composed of a Sylow p-subgroup of G for each p dividing the order of G. A subgroup H of G is called Z-permutable if H permutes with all members of Z. The main goal of this paper is to study the embedding of the Z-permutable subgroups and the influence of Z-permutability on the group structure.

P-soluble groupP-supersolubleGrups Teoria deFinite groupMATEMATICA APLICADAMatemàticaSubnormal subgroupZ-permutable subgroup
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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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Some classes of finite groups and mutually permutable products

2008

[EN] This paper is devoted to the study of mutually permutable products of finite groups. A factorised group G=AB is said to be a mutually permutable product of its factors A and B when each factor permutes with every subgroup of the other factor. We prove that mutually permutable products of Y-groups (groups satisfying a converse of Lagrange's theorem) and SC-groups (groups whose chief factors are simple) are SC-groups, by means of a local version. Next we show that the product of pairwise mutually permutable Y-groups is supersoluble. Finally, we give a local version of the result stating that when a mutually permutable product of two groups is a PST-group (that is, a group in which every …

Pst-groupFinite groupMathematics::CombinatoricsAlgebra and Number TheoryY-groupGrups Teoria deSc-groupAlgebraMathematics::Group TheoryPermutabilityMutually permutable productÀlgebraPermutable primeFinite groupAlgebra over a fieldMATEMATICA APLICADAMathematicsJournal of Algebra
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On the exponent of mutually permutable products of two abelian groups

2016

In this paper we obtain some bounds for the exponent of a finite group, and its derived subgroup, which is a mutually permutable product of two abelian subgroups. They improve the ones known for products of finite abelian groups, and they are used to derive some interesting structural properties of such products.

Pure mathematics01 natural sciences0103 physical sciencesNatural sciencemedia_common.cataloged_instancePermutable primeFinite group0101 mathematicsAbelian groupEuropean unionMathematicsmedia_commonFinite groupAlgebra and Number TheoryAbelian groupExponentFactorisations010102 general mathematicsFoundation (engineering)p-LegthAlgebraExponent010307 mathematical physicsMATEMATICA APLICADAp-SupersolubilityJournal of Algebra
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On finite minimal non-nilpotent groups

2005

[EN] A critical group for a class of groups X is a minimal non-X-group. The critical groups are determined for various classes of finite groups. As a consequence, a classification of the minimal non-nilpotent groups (also called Schmidt groups) is given, together with a complete proof of Gol¿fand¿s theorem on maximal Schmidt groups.

Pure mathematicsFinite groupPst-groupMathematical societyApplied MathematicsGeneral MathematicsGrups Teoria deSchmidt groupSylow subgroupSylow-permutable subgroupAlgebraMinimal non-nilpotent groupNilpotentCritical groupÀlgebraAlgebra over a fieldFinite groupClass of finite groupsMATEMATICA APLICADACritical groupVolume (compression)Mathematics
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SOME SOLUBILITY CRITERIA IN FACTORISED GROUPS

2012

In this paper, solubility of groups factorised as a product of two subgroups which are connected by certain permutability properties is studied.

Soluble groupComputational chemistryGeneral MathematicsProduct (mathematics)Mutually m-permutable productSolubilityMATEMATICA APLICADAFactorised groupMathematicsBulletin of the Australian Mathematical Society
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A note on finite PST-groups

2007

[EN] A finite group G is said to be a PST-group if, for subgroups H and K of G with H Sylow-permutable in K and K Sylow-permutable in G, it is always the case that H is Sylow-permutable in G. A group G is a T*-group if, for subgroups H and K of G with H normal in K and K normal in G, it is always the case that H is Sylow-permutable in G. In this paper, we show that finite PST-groups and finite T*-groups are one and the same. A new characterisation of soluble PST-groups is also presented.

Transitive normalityGrups Teoria deÀlgebraFinite groupMATEMATICA APLICADASylow-permutable subgroup
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