Commutative Rings Over which Every Module has a Maximal Submodule
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Publication:5537469
DOI10.2307/2035815zbMath0156.04303OpenAlexW4234240859MaRDI QIDQ5537469
Publication date: 1967
Full work available at URL: https://doi.org/10.2307/2035815
Related Items (20)
Unnamed Item ⋮ Characterizations of commutative max rings and some applications ⋮ A generalization of the classical Krull dimension for modules. ⋮ The dual Baer criterion for non-perfect rings ⋮ Rings all of whose prime serial modules are serial ⋮ On quasi-duo rings ⋮ Torsionfree Projective Modules ⋮ Dual-square-free modules ⋮ The flat topology on the minimal and maximal prime spectrum of a commutative ring ⋮ Modules satisfying the weak Nakayama property ⋮ Modules satisfying the prime and maximal radical conditions ⋮ Additive decomposition of ideals ⋮ Noetherian rings whose modules are prime serial ⋮ C(X) AS AN Lc(X)-MODULE ⋮ Torsion theories of simple type ⋮ Rings over which each module possesses a maximal submodule ⋮ Maximal submodules and locally perfect rings ⋮ Some remarks on locally perfect rings ⋮ Ideals of étale groupoid algebras and Exel's Effros-Hahn conjecture ⋮ GENERALIZED PRINCIPAL IDEAL THEOREM FOR MODULES
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