JOURNAL ARTICLE
On commutative rings whose maximal ideals are idempotent
Year: 2019 Journal: Commentationes Mathematicae Universitatis Carolinae Vol: 60 (3)Pages: 313-322
Abstract
summary:We prove that for a commutative ring $R$, every noetherian (artinian) $R$-module is quasi-injective if and only if every noetherian (artinian) $R$-module is quasi-projective if and only if the class of noetherian (artinian) $R$-modules is socle-fine if and only if the class of noetherian (artinian) $R$-modules is radical-fine if and only if every maximal ideal of $R$ is idempotent.
Keywords:
Mathematics Artinian ring Noetherian Idempotence Pure mathematics Injective module Class (philosophy) Commutative property Commutative ring Semisimple module Radical of a ring Socle Noetherian ring Projective module Injective function Noncommutative ring Discrete mathematics Ring (chemistry) Finitely-generated abelian group Algebra over a field Principal ideal ring Inversion (geology) Computer science
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Topics
Rings, Modules, and Algebras
Physical Sciences → Mathematics → Algebra and Number Theory
Algebraic structures and combinatorial models
Physical Sciences → Mathematics → Geometry and Topology
Commutative Algebra and Its Applications
Physical Sciences → Mathematics → Algebra and Number Theory
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