Search results for "p-group"

showing 5 items of 25 documents

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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Finite groups with all minimal subgroups solitary

2016

We give a complete classification of the finite groups with a unique subgroup of order p for each prime p dividing its order. All the groups considered in this paper will be finite. One of the most fruitful lines in the research in abstract group theory during the last years has been the study of groups in which the members of a certain family of subgroups satisfy a certain subgroup embedding property. The family of the subgroups of prime order (also called minimal subgroups) has attracted the interest of many mathematicians. For example, a well-known result of Itˆo (see [8, Kapitel III, Satz 5.3; 9]) states that a group of odd order with all minimal subgroups in the center is nilpotent. Th…

p-groupNormal subgroupFinite groupAlgebra and Number TheoryApplied MathematicsAstrophysics::Instrumentation and Methods for AstrophysicsMinimal subgroupGrups Teoria deComputer Science::Computation and Language (Computational Linguistics and Natural Language and Speech Processing)Fitting subgroupCombinatoricsMathematics::Group TheoryLocally finite groupExtra special groupComputer Science::General LiteratureOmega and agemo subgroupSolitary subgroupÀlgebraIndex of a subgroupFinite groupMATEMATICA APLICADAMathematics
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On the Frattini subgroup of a finite group

2016

We study the class of finite groups $G$ satisfying $\Phi (G/N)= \Phi(G)N/N$ for all normal subgroups $N$ of $G$. As a consequence of our main results we extend and amplify a theorem of Doerk concerning this class from the soluble universe to all finite groups and answer in the affirmative a long-standing question of Christensen whether the class of finite groups which possess complements for each of their normal subgroups is subnormally closed.

p-groupNormal subgroupFinite groupClass (set theory)Algebra and Number Theory010102 general mathematicsFrattini subgroupGroup Theory (math.GR)01 natural sciences010101 applied mathematicsCombinatoricsMathematics::Group TheoryLocally finite groupFOS: Mathematics20D25 20D100101 mathematicsMathematics - Group TheoryUniverse (mathematics)Mathematics
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Algebraic singularities have maximal reductive automorphism groups

1989

LetX = On/ibe an analytic singularity where ṫ is an ideal of theC-algebraOnof germs of analytic functions on (Cn, 0). Letdenote the maximal ideal ofXandA= AutXits group of automorphisms. An abstract subgroupequipped with the structure of an algebraic group is calledalgebraic subgroupofAif the natural representations ofGon all “higher cotangent spaces”are rational. Letπbe the representation ofAon the first cotangent spaceandA1=π(A).

p-groupPure mathematics32B30010308 nuclear & particles physicsGeneral Mathematics010102 general mathematicsOuter automorphism groupCotangent spaceReductive groupAutomorphism01 natural sciences14B12Inner automorphismAlgebraic group0103 physical sciencesComputingMethodologies_DOCUMENTANDTEXTPROCESSINGMaximal ideal13J1520G200101 mathematics32M05MathematicsNagoya Mathematical Journal
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