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Communications in Algebra Volume 48, 2020 - Issue 9
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Articles

Rings over which every semi-primary ideal is 1-absorbing primary

Fuad Ali Ahmed AlmahdiDepartment of Mathematics, Faculty of Sciences, King Khalid University, Abha, Saudi Arabia; Correspondence[email protected]
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,
Mohammed TamekkanteLaboratory MACS, Faculty of Science, University of Moulay Ismail, Meknes, Morocco; View further author information
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Abdellah MamouniDepartment of Mathematics, Faculty of Science and Technology Box 509-Boutalamine, University Moulay Ismail, Errachidia, MoroccoView further author information
Pages 3838-3845 | Received 07 Nov 2019, Published online: 10 Apr 2020

References

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  • Gilmer, R. W. (1962). Rings in which semi-primary ideals are primary. Pacific J. Math. 12(4):1273–1276. DOI: 10.2140/pjm.1962.12.1273.
  • Gilmer, R. W. (1964). Extensions of results concerning rings in which semi-primary ideals are primary. Duke Math. J. 31:73–78.
  • Gilmer, R. W., Mott, J. L. (1965). Multiplication rings as rings in which ideals with prime radical are primary. Trans. Am. Math. Soc. 114(1):40–52. DOI: 10.1090/S0002-9947-1965-0171803-X.
  • Glaz, S. (1989). Commutative coherent rings. Lecture Notes in Mathematics, Vol. 1371. Berlin: Springer-Verlag.
  • Krull, W. (1948). Idealtheore. New York: Chelsea Publishing Company.
  • Lam, T. Y. (1995). Exercises in Classical Ring Theory, Problem Books in Mathematics, 1st ed. New York: Springer-Verlag.
  • McCoy, N. H. (1948). Rings and Ideals. Carus Monograph 8, Buffalo, NY: Mathematical Association of America.
  • Tekir, U., Koc, S., Oral, K. H. (2017). n-Ideals of commutative rings. Filomat. 31(10):2933–2941. DOI: 10.2298/FIL1710933T.

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