Z-S- Coprime modules
DOI :
https://doi.org/10.5269/bspm.77519Résumé
In this essay, we present the idea - - coprime modules. is called an - - coprime modules. if .
In this work examines the characteristics of the - - coprime modules as a expanding upon of the coprime. This paper provides various characterizations and properties - - coprime modules
Références
[1] A. M.Inaam and I.K.Rasha “S-coprime modules,journal of basrah researchars.34. (4) 2019 .
[2] F.Kasch.,Moduls and rings, Acdimic Press, London 1989.
[3] I. Rasha Khalaf, Dual Notions of Prime submodules and prime Modules, M.Sc.Thesis, University of Baghdad. 2009.
[4]K.R.Goodreal “Ring Theory,NonSingular rings and Modules”,Maracel Dekker, New York, 1976.
[5]S.A.Saymach, On prime submodule, University Noc. Tucumare. Ser.A 29, (1979).121-136.
[6] S.Annin, (2002) Associated and Attached Primes Over non Commutative Rings, ph.D. Thesis, Univ. of Berkeley.
[7]S.Yassemi, The Dual Notion of prime submodule, Arch.Marth.(Bron) 37, 2001,273-278.
[8] T.Amina Hamad, A.Alaa Elewi , ðš-Small Submodules and ðš-Hollow Modules, Iraqi Journal of Science 62, No. 8, 2021, 2708-2713.
[2] F.Kasch.,Moduls and rings, Acdimic Press, London 1989.
[3] I. Rasha Khalaf, Dual Notions of Prime submodules and prime Modules, M.Sc.Thesis, University of Baghdad. 2009.
[4]K.R.Goodreal “Ring Theory,NonSingular rings and Modules”,Maracel Dekker, New York, 1976.
[5]S.A.Saymach, On prime submodule, University Noc. Tucumare. Ser.A 29, (1979).121-136.
[6] S.Annin, (2002) Associated and Attached Primes Over non Commutative Rings, ph.D. Thesis, Univ. of Berkeley.
[7]S.Yassemi, The Dual Notion of prime submodule, Arch.Marth.(Bron) 37, 2001,273-278.
[8] T.Amina Hamad, A.Alaa Elewi , ðš-Small Submodules and ðš-Hollow Modules, Iraqi Journal of Science 62, No. 8, 2021, 2708-2713.
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Publié
2025-12-06
Numéro
Rubrique
Research Articles
Licence
When the manuscript is accepted for publication, the authors agree automatically to transfer the copyright to the (SPM).
The journal utilize the Creative Common Attribution (CC-BY 4.0).
Comment citer
Shyaa, F. D. . (2025). Z-S- Coprime modules. Boletim Da Sociedade Paranaense De Matemática, 43, 1-6. https://doi.org/10.5269/bspm.77519



