Search results for "Factorized group"

showing 4 items of 4 documents

Products of locally dihedral subgroups

2012

AbstractIt is shown that a group G=AB which is a product of two periodic locally dihedral subgroups A and B is soluble.

CombinatoricsAlgebra and Number TheoryGroup (mathematics)Product (mathematics)Locally dihedral groupsArithmeticDihedral angleProducts of groupsMathematicsFactorized groupsSoluble locally finite groupsJournal of Algebra
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Local nearrings with dihedral multiplicative group

2004

AbstractA not necessarily zero-symmetric nearring R with a unit element is called local if the set of all non-invertible elements of R forms a subgroup of the additive group of R. It is proved that every local nearring whose multiplicative group is dihedral is finite and its additive group is either a 3-group of order at most 9 or a 2-group of order at most 32.

Local nearringAlgebra and Number TheoryDicyclic groupMultiplicative groupDihedral angleCombinatoricsDihedral groupOrder (group theory)Element (category theory)Factorized groupDihedral group of order 6Unit (ring theory)Additive groupMathematicsJournal of Algebra
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On $MC$-hypercentral triply factorized groups

2007

A group G is called triply factorized in the product of two subgroups A, B and a normal subgroup K of G ,i fG = AB = AK = BK. This decomposition of G has been studied by several authors, investigating on those properties which can be carried from A, B and K to G .I t is known that if A, B and K are FC-groups and K has restrictions on the rank, then G is again an FC-group. The present paper extends this result to wider classes of FC-groups. Mathematics Subject Classification: 20F24; 20F14

Normal subgroupCombinatoricsSettore MAT/02 - Algebrageneralized $FC$-groupsMathematics Subject ClassificationGroup (mathematics)Product (mathematics)Rank (graph theory)triply factorized groupSettore MAT/03 - GeometriaGroups with soluble minimax conjugacy classeMathematics
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On the product of a nilpotent group and a group with non-trivial center

2007

Abstract It is proved that a finite group G = A B which is a product of a nilpotent subgroup A and a subgroup B with non-trivial center contains a non-trivial abelian normal subgroup.

Normal subgroupDiscrete mathematicsComplement (group theory)Algebra and Number TheorySoluble groupMetabelian groupCommutator subgroupCentral seriesFitting subgroupProduct of groupsCombinatoricsMathematics::Group TheorySolvable groupFactorized groupCharacteristic subgroupNilpotent groupMathematicsJournal of Algebra
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