Search results for "Mathematics::Group Theory"

showing 10 items of 174 documents

On nilpotent Moufang loops with central associators

2007

Abstract In this paper, we investigate Moufang p-loops of nilpotency class at least three for p > 3 . The smallest examples have order p 5 and satisfy the following properties: (1) They are of maximal nilpotency class, (2) their associators lie in the center, and (3) they can be constructed using a general form of the semidirect product of a cyclic group and a group of maximal class. We present some results concerning loops with these properties. As an application, we classify proper Moufang loops of order p 5 , p > 3 , and collect information on their multiplication groups.

Discrete mathematicsPure mathematicsSemidirect productAlgebra and Number TheoryLoops of maximal classGroup (mathematics)Moufang loopsMathematics::Rings and AlgebrasLoops of maximal claCyclic groupCenter (group theory)Nilpotent loopsSemidirect product of loopsNilpotent loopNilpotentMathematics::Group TheorySettore MAT/02 - AlgebraOrder (group theory)MultiplicationNilpotent groupMoufang loopMathematics
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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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On almost nilpotent varieties of subexponential growth

2015

Abstract Let N 2 be the variety of left-nilpotent algebras of index two, that is the variety of algebras satisfying the identity x ( y z ) ≡ 0 . We introduce two new varieties, denoted by V sym and V alt , contained in the variety N 2 and we prove that V sym and V alt are the only two varieties almost nilpotent of subexponential growth.

Discrete mathematicsSecondaryAlgebra and Number TheoryCodimensionPolynomial identityCombinatoricsSettore MAT/02 - AlgebraMathematics::Group TheoryIdentity (mathematics)NilpotentCodimensionVarietyVariety (universal algebra)Nilpotent groupAlmost nilpotentPrimaryPolinomial identities. Variety Codimensions Growth.MathematicsJournal of Algebra
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Automorphism groups of some affine and finite type Artin groups

2004

We observe that, for fixed n ≥ 3, each of the Artin groups of finite type An, Bn = Cn, and affine type ˜ An−1 and ˜ Cn−1 is a central extension of a finite index subgroup of the mapping class group of the (n + 2)-punctured sphere. (The centre is trivial in the affine case and infinite cyclic in the finite type cases). Using results of Ivanov and Korkmaz on abstract commensurators of surface mapping class groups we are able to determine the automorphism groups of each member of these four infinite families of Artin groups. A rank n Coxeter matrix is a symmetric n × n matrix M with integer entries mij ∈ N ∪ {∞} where mij ≥ 2 for ij, and mii = 1 for all 1 ≤ i ≤ n. Given any rank n Coxeter matr…

Discrete mathematics[ MATH.MATH-GR ] Mathematics [math]/Group Theory [math.GR]General Mathematics010102 general mathematicsCoxeter groupBraid group20F36Group Theory (math.GR)Automorphism01 natural sciences[MATH.MATH-GR]Mathematics [math]/Group Theory [math.GR]ConductorCombinatoricsMathematics::Group TheoryGroup of Lie typeSymmetric group0103 physical sciencesFOS: MathematicsRank (graph theory)Artin group010307 mathematical physics0101 mathematicsMathematics - Group Theory[MATH.MATH-GR] Mathematics [math]/Group Theory [math.GR]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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Quadratic characters in groups of odd order

2009

Abstract We prove that in a finite group of odd order, the number of irreducible quadratic characters is the number of quadratic conjugacy classes.

Finite groupAlgebra and Number TheoryQuadratic functionFinite groupsGalois actionCombinatoricsConjugacy classesQuadratic fieldsMathematics::Group TheoryConjugacy classQuadratic equationCharacter tableOrder (group theory)Binary quadratic formQuadratic fieldCharactersMathematicsJournal 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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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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Powers of conjugacy classes in a finite groups

2020

[EN] The aim of this paper is to show how the number of conjugacy classes appearing in the product of classes affect the structure of a finite group. The aim of this paper was to show several results about solvability concerning the case in which the power of a conjugacy class is a union of one or two conjugacy classes. Moreover, we show that the above conditions can be determined through the character table of the group.

Finite groupbusiness.industryApplied Mathematics010102 general mathematics4904 Pure MathematicsPower of conjugacy classes01 natural sciencesFinite groupsConjugacy classesMathematics::Group TheoryConjugacy classHospitalitySolvability0103 physical sciences49 Mathematical Sciences010307 mathematical physicsSociologyCharacters0101 mathematicsbusinessMATEMATICA APLICADAHumanitiesMatemàtica
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