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Mathématiques   > Accueil   > Avancées en Mathématiques Pures et Appliquées   > Numéro 1 (Mai 2020)   > Article

Une nouvelle caractérisation des anneaux semi-réguliers commutatifs

A new characterization of commutative semiregular rings


Peter Danchev
Bulgarian Academy of Sciences
Bulgaria

Mahdi Samiei
Velayat University
Iran



Publié le 3 juillet 2020   DOI : 10.21494/ISTE.OP.2020.0552

Résumé

Abstract

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A commutative ring R is called J-rad clean in case, for any r ∈ R, there is an idempotent e ∈ R such that r−e ∈ U(R) and re ∈ J(R), where U(R) and J(R) denote the set of units and the Jacobson radical of R, respectively. Also, a ring R is called semiregular if R/J(R) is regular in the sense of von Neumann and idempotents lift modulo J(R). We demonstrate that these two concepts are, actually, equivalent and we portray a portion of the properties of this class of rings. In particular, as a direct application, we prove that the commutative group ring RG is J-rad clean if, and only if, R is a commutative J-rad clean ring and G is a torsion abelian group, provided that J(R) is nil.

A commutative ring R is called J-rad clean in case, for any r ∈ R, there is an idempotent e ∈ R such that r−e ∈ U(R) and re ∈ J(R), where U(R) and J(R) denote the set of units and the Jacobson radical of R, respectively. Also, a ring R is called semiregular if R/J(R) is regular in the sense of von Neumann and idempotents lift modulo J(R). We demonstrate that these two concepts are, actually, equivalent and we portray a portion of the properties of this class of rings. In particular, as a direct application, we prove that the commutative group ring RG is J-rad clean if, and only if, R is a commutative J-rad clean ring and G is a torsion abelian group, provided that J(R) is nil.

Semiregular rings J-clean rings J-rad clean rings

Semiregular rings J-clean rings J-rad clean rings