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RESEARCH PRODUCT
Associative rings with metabelian adjoint group
Yaroslav P. SysakBernhard Ambergsubject
Discrete mathematicsPure mathematicsRing (mathematics)Algebra and Number TheoryGroup (mathematics)Metabelian groupMultiplicative groupLocal ringRadical ringJacobson radicalMetabelian groupAssociative ringLie metabelian ringAdjoint grouplaw.inventionInvertible matrixlawUnit (ring theory)Mathematicsdescription
Abstract The set of all elements of an associative ring R, not necessarily with a unit element, forms a monoid under the circle operation r∘s=r+s+rs on R whose group of all invertible elements is called the adjoint group of R and denoted by R°. The ring R is radical if R=R°. It is proved that a radical ring R is Lie metabelian if and only if its adjoint group R° is metabelian. This yields a positive answer to a question raised by S. Jennings and repeated later by A. Krasil'nikov. Furthermore, for a ring R with unity whose multiplicative group R ∗ is metabelian, it is shown that R is Lie metabelian, provided that R is generated by R ∗ and R modulo its Jacobson radical is commutative and artinian. This implies that a local ring is Lie metabelian if and only if its multiplicative group is metabelian.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2004-07-01 | Journal of Algebra |