Search results for "SYLOW"

showing 10 items of 79 documents

Restriction of odd degree characters and natural correspondences

2016

Let $q$ be an odd prime power, $n > 1$, and let $P$ denote a maximal parabolic subgroup of $GL_n(q)$ with Levi subgroup $GL_{n-1}(q) \times GL_1(q)$. We restrict the odd-degree irreducible characters of $GL_n(q)$ to $P$ to discover a natural correspondence of characters, both for $GL_n(q)$ and $SL_n(q)$. A similar result is established for certain finite groups with self-normalizing Sylow $p$-subgroups. We also construct a canonical bijection between the odd-degree irreducible characters of $S_n$ and those of $M$, where $M$ is any maximal subgroup of $S_n$ of odd index; as well as between the odd-degree irreducible characters of $G = GL_n(q)$ or $GU_n(q)$ with $q$ odd and those of $N_{G}…

Discrete mathematicsRational numberGeneral Mathematics010102 general mathematicsSylow theoremsGroup Theory (math.GR)Absolute Galois group01 natural sciencesCombinatoricsMaximal subgroupMathematics::Group TheoryCharacter (mathematics)0103 physical sciencesFOS: MathematicsBijection010307 mathematical physicsRepresentation Theory (math.RT)0101 mathematicsBijection injection and surjectionMathematics::Representation TheoryPrime powerMathematics - Group TheoryMathematics - Representation TheoryMathematics
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Finite Soluble Groups with Permutable Subnormal Subgroups

2001

Abstract A finite group G is said to be a PST -group if every subnormal subgroup of G permutes with every Sylow subgroup of G . We shall discuss the normal structure of soluble PST -groups, mainly defining a local version of this concept. A deep study of the local structure turns out to be crucial for obtaining information about the global property. Moreover, a new approach to soluble PT -groups, i.e., soluble groups in which permutability is a transitive relation, follows naturally from our vision of PST -groups. Our techniques and results provide a unified point of view for T -groups, PT -groups, and PST -groups in the soluble universe, showing that the difference between these classes is…

Discrete mathematicsSubnormal subgroupCombinatoricsComplement (group theory)Finite groupAlgebra and Number TheoryGroup (mathematics)Locally finite groupSylow theoremsComponent (group theory)Permutable primeMathematicsJournal of Algebra
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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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Characterizing normal Sylow p-subgroups by character degrees

2012

Abstract Suppose that G is a finite group, let p be a prime and let P ∈ Syl p ( G ) . We prove that P is normal in G if and only if all the irreducible constituents of the permutation character ( 1 P ) G have degree not divisible by p.

Finite groupAlgebra and Number TheoryDegree (graph theory)010102 general mathematicsSylow theoremsPrimitive permutation group01 natural sciencesPrime (order theory)Characters of finite groupsCharacter degrees010101 applied mathematicsCombinatoricsPermutationCharacter (mathematics)0101 mathematicsMathematicsJournal of Algebra
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New Refinements of the McKay Conjecture for Arbitrary Finite Groups

2004

Let $G$ be an arbitrary finite group and fix a prime number $p$. The McKay conjecture asserts that $G$ and the normalizer in $G$ of a Sylow $p$-subgroup have equal numbers of irreducible characters with degrees not divisible by $p$. The Alperin-McKay conjecture is a version of this as applied to individual Brauer $p$-blocks of $G$. We offer evidence that perhaps much stronger forms of both of these conjectures are true.

Finite groupConjecture20C15Sylow theoremsPrime numberGroup Theory (math.GR)Centralizer and normalizerCollatz conjectureCombinatoricsMathematics::Group TheoryMathematics (miscellaneous)Character (mathematics)Symmetric groupFOS: MathematicsStatistics Probability and UncertaintyMathematics::Representation TheoryMathematics - Group TheoryMathematicsThe Annals of Mathematics
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Notes on the average number of Sylow subgroups of finite groups

2021

We show that if the average number of (nonnormal) Sylow subgroups of a finite group is less than $${{29} \over 4}$$ then G is solvable or G/F(G) ≌ A5. This generalizes an earlier result by the third author.

Finite groupPure mathematicsOrdinary differential equation010102 general mathematicsSylow theorems0101 mathematics01 natural sciencesMathematicsCzechoslovak Mathematical Journal
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On finite soluble groups in which Sylow permutability is a transitive relation

2003

A characterisation of finite soluble groups in which Sylow permutability is a transitive relation by means of subgroup embedding properties enjoyed by all the subgroups is proved in the paper. The key point is an extension of a subnormality criterion due to Wielandt.

Finite groupTransitive relationGeneral MathematicsSylow theoremsGrups Teoria deExtension (predicate logic)CombinatoricsMathematics::Group TheoryKey pointLocally finite groupPermutabilitySubnormalityEmbeddingÀlgebraFinite groupAlgebra over a fieldMATEMATICA APLICADAMathematicsActa Mathematica Hungarica
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Algorithms for permutability in finite groups

2013

In this paper we describe some algorithms to identify permutable and Sylow-permutable subgroups of finite groups, Dedekind and Iwasawa finite groups, and finite T-groups (groups in which normality is transitive), PT-groups (groups in which permutability is transitive), and PST-groups (groups in which Sylow permutability is transitive). These algorithms have been implemented in a package for the computer algebra system GAP.

General MathematicsS-permutable subgroupIwasawa groups-permutable subgrouppermutable subgroupiwasawa groupdedekind grouppt-group20-04CombinatoricsMathematics::Group TheoryT-grouppst-groupT-groupQA1-93920d10MathematicsFinite groupDedekind groupMathematics::CombinatoricsalgorithmGroup (mathematics)Sylow theoremsGrups Teoria deDedekind groupAlgorithmt-groupPST-groupIwasawa groupfinite groupPermutable subgroup [Finite group]Classification of finite simple groupsCA-groupPT-groupÀlgebraFinite group: Permutable subgroupMATEMATICA APLICADAAlgorithm20d20MathematicsOpen Mathematics
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SATURATED FORMATIONS CLOSED UNDER SYLOW NORMALIZERS

2005

In this article we show that a finite soluble group possesses nilpotent Hall subgroups for well-defined sets of primes if and only if its Sylow normalizers satisfy the same property. In fact, this property of groups provides a characterization of the subgroup-closed saturated formations, whose elements are characterized by the Sylow normalizers belonging to the class, in the universe of all finite soluble groups.

Mathematics::Group TheoryPure mathematicsNilpotentClass (set theory)Algebra and Number TheoryProperty (philosophy)Group (mathematics)Locally finite groupSylow theoremsCharacterization (mathematics)MathematicsCommunications in Algebra
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