On characterizations of w-coherent rings
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Publication:5119191
DOI10.1080/00927872.2020.1769121zbMath1448.13020OpenAlexW3045112270MaRDI QIDQ5119191
Fanggui Wang, Wei Qi, Xiaolei Zhang
Publication date: 3 September 2020
Published in: Communications in Algebra (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1080/00927872.2020.1769121
Commutative Noetherian rings and modules (13E05) Injective and flat modules and ideals in commutative rings (13C11) Torsion modules and ideals in commutative rings (13C12)
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Some remarks on Nonnil-coherent rings and ϕ-IF rings, Unnamed Item, Relative FP-injective modules and relative IF rings, On characterizations of w-coherent rings II
Cites Work
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- Almost free modules and Mittag-Leffler conditions.
- Foundations of commutative rings and their modules
- Relative homological algebra. Vol. 2
- Approximations and endomorphism algebras of modules. Volume 1: Approximations. Volume 2: Predictions.
- Prüfer \(\bigstar \)-multiplication domains and \(\bigstar \)-coherence
- Covers, precovers, and purity.
- Two generalizations of projective modules and their applications
- Endlich präsentierbare Moduln
- Distributing tensor product over direct product
- The Direct and Inverse Limits ofw-Modules
- Products of flat modules and global dimension relative to ℱ-Mittag-Leffler modules
- INJECTIVE MODULES OVER ω-NOETHERIAN RINGS, II
- THE w-WEAK GLOBAL DIMENSION OF COMMUTATIVE RINGS
- ω-MODULES OVER COMMUTATIVE RINGS
- Direct Products of Modules
- Two applications of Nagata rings and modules
- Absolutely Pure Covers
- Mittat-Leffler conditions on modules
- On w-modules over strong mori domains
- Coherent rings and absolutely pure precovers
- ON LCM-STABLE MODULES
- w-INJECTIVE MODULES AND w-SEMI-HEREDITARY RINGS
- All tilting modules are of finite type
- A solution to the Baer splitting problem
- Coherent Rings and Fp -Injective Modules
- Absolutely Pure Modules
- Coherent rings and absolutely pure covers
