Search results for "Local nearring"

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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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