Search results for "Sylow theorems"

showing 5 items of 75 documents

On second minimal subgroups of Sylow subgroups of finite groups

2011

A subgroup H of a finite group G is a partial CAP-subgroup of G if there is a chief series of G such that H either covers or avoids its chief factors. Partial cover and avoidance property has turned out to be very useful to clear up the group structure. In this paper, finite groups in which the second minimal subgroups of their Sylow p-subgroups, p a fixed prime, are partial CAP-subgroups are completely classified.

p-groupComplement (group theory)Finite groupAlgebra and Number TheorySupersoluble groupSylow theoremsCombinatoricsNormal p-complementMathematics::Group TheorySecond minimal subgroupLocally finite groupSimple groupOmega and agemo subgroupFinite groupMATEMATICA APLICADAMathematicsPartial CAP-subgroupPartial cap-group
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The average number of Sylow subgroups of a finite group

2013

We prove that if the average Sylow number (ignoring the Sylow numbers that are one) of a finite group G is ⩽7, then G is solvable.

p-groupDiscrete mathematicsFinite groupComplement (group theory)General MathematicsSylow theoremsMathematics::Algebraic TopologyHall subgroupCombinatoricsMathematics::Group TheoryNormal p-complementLocally finite groupComponent (group theory)MathematicsMathematische Nachrichten
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A Gaschütz–Lubeseder Type Theorem in a Class of Locally Finite Groups

1999

The aim of this paper is to present a Gaschutz–Lubeseder type theorem in the class cL of all radical locally finite groups satisfying min−p for all primes p. Notice that these groups are countable and co-Hopfian by [1, (5.4.8)]. In retrospect, the theory of saturated formations of finite soluble groups began with the results of Gaschutz [3] in 1963. He introduced the concept of “covering subgroup” as a generalization of Sylow and Hall subgroups. These covering subgroups have many of the properties of Sylow and Hall subgroups other than the arithmetic ones. The main idea of Gaschutz’s work was concerned with group theoretical classes having the same properties. He defined a formation F to be…

p-groupDiscrete mathematicsPure mathematicsProfinite groupAlgebra and Number TheoryGroup of Lie typeLocally finite groupSymmetric groupSimple groupSylow theoremsClassification of finite simple groupsMathematicsJournal of Algebra
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A note on Sylow permutable subgroups of infinite groups

2014

Abstract A subgroup A of a periodic group G is said to be Sylow permutable, or S-permutable, subgroup of G if A P = P A for all Sylow subgroups P of G. The aim of this paper is to establish the local nilpotency of the section A G / Core G ( A ) for an S-permutable subgroup A of a locally finite group G.

p-groupNormal subgroupCombinatoricsMathematics::Group TheoryNormal p-complementComplement (group theory)Mathematics::CombinatoricsAlgebra and Number TheorySubgroupLocally finite groupSylow theoremsIndex of a subgroupMathematicsJournal of Algebra
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On some classes of supersoluble groups

2007

[EN] Finite groups G for which for every subgroup H and for all primes q dividing the index |G:H| there exists a subgroup K of G such that H is contained in K and |K:H|=q are called Y-groups. Groups in which subnormal subgroups permute with all Sylow subgroups are called PST-groups. In this paper a local version of the Y-property leading to a local characterisation of Y-groups, from which the classical characterisation emerges, is introduced. The relationship between PST-groups and Y-groups is also analysed.

p-groupNormal subgroupDiscrete mathematicsComplement (group theory)Lagrange theoremAlgebra and Number TheorySylow theoremsGrups Teoria deSylow subgroupFitting subgroupCombinatoricsSubgroupLocally finite groupPermutabilityÀlgebraIndex of a subgroupFinite groupMATEMATICA APLICADAMathematicsJournal of Algebra
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