논문상세정보
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- 저자 권민재
- 형태사항 iii, 114 p.: 26 cm
- 일반주기 Thesis Advisor: 임정욱, Includes bibliographical references
- 학위논문사항 Thesis (doctoral)-, 수학부 가환대수학, 경북대학교 일반대학원, 2022. 8
- DDC 512, 23
- 발행지 대구
- 언어 eng
- 출판년 2022
- 발행사항 경북대학교 대학원
유사주제 논문( 34)
On a generalized class of Noetherian rings : 일반화된 노이더환
권민재
2022년
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On a generalized class of Noetherian rings : 일반화된 노이더환' 의 주제별 논문영향력
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' On a generalized class of Noetherian rings : 일반화된 노이더환' 의 참고문헌
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[4] D.D. Anderson and M. Winders, Idealization of a module, J. Commut. Algebra 1 (2009), 3-56.[2009]
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[3] M.F. Atiyah and I.G. MacDonald, Introduction to Commutative Algebra, Addison- Wesley Series in Math., Westview Press, 1969.[1969]
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[31] K.A. Loper. Almost Dedekind domains which are not Dedekind. In J.W. Brewer, S. Glaz, W.J. Heinzer, and B.M. Olberding, editors, Multiplicative Ideal Theory in Commutative Algebra, Springer, New York, 2006, 279–292.[2006]
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[30] Z. Liu, On S-Noetherian rings, Arch. Math. (Brno) 43 (2007), 55-60.[2007]
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[2] J.T. Arnold, Krull dimension in power series rings, Trans. Amer. Math. Soc (1973), 299-304.[1973]
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[27] J.W. Lim, A note on S-Noetherian rings, Kyungpook Math. J. 55 (2015), 507- 514.[2015]
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[26] O. Khani-Nasab, A. Hamed, Weakly S-Artinian Modules, Filomat 35:15 (2021), 5215-5226.
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[20] J.A. Huckaba, Commutative Rings with Zero Divisors, Marcel Dekker, New York and Basel, 1988.[1988]
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[1] D.D. Anderson and T. Dumitrescu, S-Noetherian rings, Comm. Algebra 30 (2002), 4407-4416.[2002]
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[19] A. Hamed, On rings with S-Noetherian spectrum. submitted for publication.
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[18] A. Hamed, S-Noetherian spectrum condition. Comm. Algebra 46 (2018), 3314– 3321.[2018]
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[17] A. Hamed and S. Hizem, S-Noetherian rings of the forms A[X] and A[[X]], Comm. Algebra 43 (2015), 3848-3856.[2015]
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[16] R. Gilmer, Multiplicative Ideal Theory, Queens Papers in Pure Appl. Math., vol. 90, Queens University, Kingston, Ontario, 1992.[1992]
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[15] M. Eljeri, S-strongly finite type rings, ARJOM. 9(4) (2018), 1–9[2018]
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[13] M. DAnna, C.A. Finocchiaro, and M. Fontana, Amalgamated algebras along an ideal, in: M. Fontana, et al. (Eds.), Commutative Algebra and Its Applications: Proceedings of the Fifth International Fez Conference on Commutative Algebra and Its Applications, Fez, Morocco, Walter de Gruyter, Berlin and New York, 2009, pp. 155-172.
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[12] G.W. Chang, B.G. Kang, P.T. Toan, The Krull dimension of power series rings over almost Dedekind domains, J. Algebra 438 (2015), 170-187.[2015]
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[10] A. Badawi and T.G. Lucas, Rings with prime nilradical, in: S.T. Chapman (Eds.), Arithmetical Properties of Commutative Rings and Monoids, Lecture Notes in Pure Appl. Math. 241, Chapman & Hall/CRC, Boca Raton, 2005, pp.198-212.[2005]
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The Cohen type theorem and the Eakin-Nagata type theorem for S-Noetherian rings revisited
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S-Noetherian rings and their extensions
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S-Noetherian properties on amalgamated algebras along an ideal1075-1080
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S-Noetherian properties of composite ring extensions2820 ? 2829
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Properties of chains of prime ideals in an amalgamated algebra along an ideal
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On nonnil-S-Noetherian rings1-14
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Nonnil-Noetherian rings and the SFT property
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A localization of a power series ring over a valuation domain