AN ALTERNATIVE PERSPECTIVE ON PROJECTIVITY OF MODULES
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Publication:2940229
DOI10.1017/S0017089514000135zbMath1320.16002arXiv1206.5556MaRDI QIDQ2940229
Unnamed Author, Chris Holston, Joseph Mastromatteo, Sergio R. López-Permouth
Publication date: 26 January 2015
Published in: Glasgow Mathematical Journal (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1206.5556
perfect ringscoherent ringsrelative projective modulessemi-primary ringssubprojective modulesgeneralizations of projectivity
Related Items (18)
Precover completing domains and approximations ⋮ RD-projective module whose subprojectivity domain is minimal ⋮ Flat-precover completing domains ⋮ On minimal absolutely pure domain of RD-flat modules ⋮ The opposite of injectivity by proper classes ⋮ On projectivity of finitely generated modules ⋮ An alternative perspective on pure-projectivity of modules ⋮ Subprojectivity domains of pure-projective modules ⋮ On the weak-injectivity profile of a ring ⋮ Subprojectivity in abelian categories ⋮ On subinjectivity domains of pure-injective modules ⋮ Rugged modules: The opposite of flatness ⋮ On subprojectivity domains of g-semiartinian modules ⋮ Max-projective modules ⋮ A new approach to projectivity in the categories of complexes. II ⋮ A new approach to projectivity in the categories of complexes ⋮ Rings whose modules have maximal or minimal subprojectivity domain ⋮ On subinjectivity domains of RD-injective modules
Cites Work
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- Rings whose modules have maximal or minimal projectivity domain.
- Rings whose modules have maximal or minimal injectivity domains.
- An alternative perspective on injectivity of modules.
- Characterizing rings in terms of the extent of the injectivity and projectivity of their modules.
- Abelian groups without elements of finite order
- POOR MODULES: THE OPPOSITE OF INJECTIVITY
- Soc-Injective Rings and Modules*
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