When are proper cyclics injective?
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Publication:2559438
DOI10.2140/pjm.1973.45.97zbMath0258.16024OpenAlexW2052434932WikidataQ114045292 ScholiaQ114045292MaRDI QIDQ2559438
Publication date: 1973
Published in: Pacific Journal of Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.2140/pjm.1973.45.97
Related Items (24)
On a class of QI-rings ⋮ On the Goldie dimension of rings and modules. ⋮ Rings and modules characterized by opposites of injectivity. ⋮ Rings whose modules have maximal or minimal projectivity domain. ⋮ Some results on V-rings and weakly V-rings. ⋮ AN AFFIRMATIVE ANSWER TO A QUESTION ON NOETHERIAN RINGS ⋮ Semiperfect rings whose proper cyclic modules are continuous ⋮ Rings with restricted injective condition ⋮ An approach to Boyle's conjecture ⋮ A characterization of noetherian rings by cyclic modules ⋮ Rings over which cyclic modules are almost self-injective ⋮ Injectives containihg no proper quasi-injective submodules ⋮ Quasi-projective modules over prime hereditary Noetherian V-rings are projective or injective. ⋮ POOR MODULES: THE OPPOSITE OF INJECTIVITY ⋮ Half-exact pre-radicals ⋮ Rings whose modules have maximal or minimal injectivity domains. ⋮ A NOTE ON PSEUDO-INJECTIVE MODULES ⋮ Rings for which every cyclic module is dual automorphism-invariant ⋮ A ONE-SIDED PRIME IDEAL PRINCIPLE FOR NONCOMMUTATIVE RINGS ⋮ Some results and questions on left-right symmetry ⋮ When cyclic singular modules over a simple ring are injective ⋮ When proper cyclics are homomorphic image of injectives ⋮ Modules ⋮ Structure of some Noetherian SI rings
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