WHEN SELF-INJECTIVE RINGS ARE QF: A REPORT ON A PROBLEM
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Publication:4416642
DOI10.1142/S0219498802000070zbMath1034.16005WikidataQ114072592 ScholiaQ114072592MaRDI QIDQ4416642
Publication date: 6 August 2003
Published in: Journal of Algebra and Its Applications (Search for Journal in Brave)
annihilatorsquasi-Frobenius ringspseudo-Frobenius ringsFaith conjectureself-injective ringscontinuous modules
Injective modules, self-injective associative rings (16D50) Quasi-Frobenius rings (16L60) Representations of associative Artinian rings (16G10) Artinian rings and modules (associative rings and algebras) (16P20) Research exposition (monographs, survey articles) pertaining to associative rings and algebras (16-02)
Related Items (29)
Every \(\aleph_1\)-\(\Sigma\)-CS module is \(\Sigma\)-CS. ⋮ On the number of zeros in the columns of the character table of a group. ⋮ Unnamed Item ⋮ Recent development of Faith conjecture ⋮ Flat-precover completing domains ⋮ Characterizing rings in terms of the extent of the injectivity and projectivity of their modules. ⋮ Generalization of CS condition ⋮ On projectivity of finitely generated modules ⋮ On two conjectures of Faith. ⋮ Subprojectivity domains of pure-projective modules ⋮ On subinjectivity domains of pure-injective modules ⋮ The Structure of Johns Rings ⋮ Modules with epimorphisms on chains of submodules ⋮ On Semi-Primary Self-Injective Rings and Faith's Quasi-Frobenius Conjecture ⋮ ON A CLASS OF SEMIPERFECT RINGS ⋮ WHEN IS A SEMIPERFECT RING RIGHT PF? ⋮ On maximal injectivity. ⋮ Some Results on Self-Injective Rings and Σ-CS Rings ⋮ On max-flat and max-cotorsion modules ⋮ A note on co-Harada rings ⋮ A note on generalizations of quasi-Frobenius rings ⋮ ON SMALL INJECTIVE RINGS AND MODULES ⋮ New Characterizations of Quasi-Frobenius Rings ⋮ On the equivalence of codes over rings and modules ⋮ FACTOR RINGS OF PSEUDO-FROBENIUS RINGS ⋮ A CHARACTERIZATION OF CO-HARADA RING ⋮ Rings whose modules have maximal or minimal subprojectivity domain ⋮ THE FGF CONJECTURE AND THE SINGULAR IDEAL OF A RING ⋮ A fuzzy characterization of QF rings.
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