Commutative rings in which every finitely generated ideal is quasi-projective
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Publication:635465
DOI10.1016/J.JPAA.2011.02.008zbMATH Open1226.13014arXiv0810.0359OpenAlexW2096219124MaRDI QIDQ635465
Author name not available (Why is that?)
Publication date: 19 August 2011
Published in: (Search for Journal in Brave)
Abstract: This paper studies the multiplicative ideal structure of commutative rings in which every finitely generated ideal is quasi-projective. Section 2 provides some preliminaries on quasi-projective modules over commutative rings. Section 3 investigates the correlation with well-known Prufer conditions; namely, we prove that this class of rings stands strictly between the two classes of arithmetical rings and Gaussian rings. Thereby, we generalize Osofsky's theorem on the weak global dimension of arithmetical rings and partially resolve Bazzoni-Glaz's related conjecture on Gaussian rings. We also establish an analogue of Bazzoni-Glaz results on the transfer of Prufer conditions between a ring and its total ring of quotients. Section 4 examines various contexts of trivial ring extensions in order to build new and original examples of rings where all finitely generated ideals are subject to quasi-projectivity, marking their distinction from related classes of Prufer rings.
Full work available at URL: https://arxiv.org/abs/0810.0359
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