Araştırma Makalesi
BibTex RIS Kaynak Göster

Yıl 2020, , 141 - 155, 14.07.2020

Ajim Uddin Ansarı B. K. Sharma Shiv Datt Kumar

https://doi.org/10.24330/ieja.768206

Öz

Kaynakça

  • D. D. Anderson, D. F. Anderson and G. W. Chang, Graded-valuation domains, Comm. Algebra, 45 (2017), 4018-4029.
  • D. F. Anderson, G. W. Chang and M. Zafrullah, Graded Prüfer domains, Comm. Algebra, 46 (2018), 792-809.
  • S. Behara and S. D. Kumar, Group graded associated ideals with at base change of rings and short exact sequences, Proc. Indian Acad. Sci. Math. Sci., 121 (2011), 111-120.
  • N. Bourbaki, Commutative Algebra, Chapters 1-7, Translated from the French, Reprint of the 1972 edition, Elements of Mathematics (Berlin), Springer-Verlag, Berlin, 1989.
  • D. A. Cox, The homogeneous coordinate ring of a toric variety, J. Algebraic Geom., 4 (1995), 17-50.
  • P. Dutton, Prime ideals attached to a module, Quart. J. Math. Oxford Ser. (2), 29(116) (1978), 403-413.
  • N. Epstein and J. Shapiro, Strong Krull primes and at modules, J. Pure Appl. Algebra, 218 (2014), 1712-1729.
  • L. Fuchs and E. Mosteig, Ideal theory in Prüfer domains - an unconventional approach, J. Algebra, 252 (2002), 411-430.
  • J. Iroz and D. E. Rush, Associated prime ideals in non-Noetherian rings, Canad. J. Math., 36(2) (1984), 344-360.
  • H. A. Khashan, Graded rings in which every graded ideal is a product of Gr-primary ideals, Int. J. Algebra, 2(13-16) (2008), 779-788.
  • S. D. Kumar and S. Behara, Uniqueness of graded primary decomposition of modules graded over finitely generated abelian groups, Comm. Algebra, 39(7) (2011), 2607-2614.
  • M. D. Larsen and P. J. McCarthy, Multiplicative Theory of Ideals, Pure and Applied Mathematics, 43, Academic Press, New York-London, 1971.
  • C. Nastasescu and F. Van Oystaeyen, Graded Ring Theory, North-Holland Mathematical Library, 28, North-Holland Publishing Co., Amsterdam-New York, 1982.
  • M. Perling and S. D. Kumar, Primary decomposition over rings graded by finitely generated abelian groups, J. Algebra, 318 (2007), 553-561.
  • M. Perling and G. Trautmann, Equivariant primary decomposition and toric sheaves, Manuscripta Math., 132 (2010), 103-143.
  • M. Refai and K. Al-Zoubi, On graded primary ideals, Turkish J. Math., 28 (2004), 217-229.

DIFFERENT TYPES OF G-PRIME IDEALS ASSOCIATED TO A GRADED MODULE AND GRADED PRIMARY DECOMPOSITION IN A GRADED PRÜFER DOMAIN

Yıl 2020, , 141 - 155, 14.07.2020

Ajim Uddin Ansarı B. K. Sharma Shiv Datt Kumar

https://doi.org/10.24330/ieja.768206

Öz

In this paper, we introduce the notion of graded Prüfer domain as a generalization of Prüfer domain to the graded case. We generalize several types of prime ideals associated to a module over a ring to the graded case and prove that most of them coincide over a graded Prüfer domain. Moreover, we investigate the graded primary decomposition of graded ideals in a graded Prüfer domain under certain conditions and give some applications of it. $~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~~$

Anahtar Kelimeler

Graded ring graded module graded Prüfer domain graded primary decomposition

Kaynakça

  • D. D. Anderson, D. F. Anderson and G. W. Chang, Graded-valuation domains, Comm. Algebra, 45 (2017), 4018-4029.
  • D. F. Anderson, G. W. Chang and M. Zafrullah, Graded Prüfer domains, Comm. Algebra, 46 (2018), 792-809.
  • S. Behara and S. D. Kumar, Group graded associated ideals with at base change of rings and short exact sequences, Proc. Indian Acad. Sci. Math. Sci., 121 (2011), 111-120.
  • N. Bourbaki, Commutative Algebra, Chapters 1-7, Translated from the French, Reprint of the 1972 edition, Elements of Mathematics (Berlin), Springer-Verlag, Berlin, 1989.
  • D. A. Cox, The homogeneous coordinate ring of a toric variety, J. Algebraic Geom., 4 (1995), 17-50.
  • P. Dutton, Prime ideals attached to a module, Quart. J. Math. Oxford Ser. (2), 29(116) (1978), 403-413.
  • N. Epstein and J. Shapiro, Strong Krull primes and at modules, J. Pure Appl. Algebra, 218 (2014), 1712-1729.
  • L. Fuchs and E. Mosteig, Ideal theory in Prüfer domains - an unconventional approach, J. Algebra, 252 (2002), 411-430.
  • J. Iroz and D. E. Rush, Associated prime ideals in non-Noetherian rings, Canad. J. Math., 36(2) (1984), 344-360.
  • H. A. Khashan, Graded rings in which every graded ideal is a product of Gr-primary ideals, Int. J. Algebra, 2(13-16) (2008), 779-788.
  • S. D. Kumar and S. Behara, Uniqueness of graded primary decomposition of modules graded over finitely generated abelian groups, Comm. Algebra, 39(7) (2011), 2607-2614.
  • M. D. Larsen and P. J. McCarthy, Multiplicative Theory of Ideals, Pure and Applied Mathematics, 43, Academic Press, New York-London, 1971.
  • C. Nastasescu and F. Van Oystaeyen, Graded Ring Theory, North-Holland Mathematical Library, 28, North-Holland Publishing Co., Amsterdam-New York, 1982.
  • M. Perling and S. D. Kumar, Primary decomposition over rings graded by finitely generated abelian groups, J. Algebra, 318 (2007), 553-561.
  • M. Perling and G. Trautmann, Equivariant primary decomposition and toric sheaves, Manuscripta Math., 132 (2010), 103-143.
  • M. Refai and K. Al-Zoubi, On graded primary ideals, Turkish J. Math., 28 (2004), 217-229.
Toplam 16 adet kaynakça vardır.

Ayrıntılar

Birincil Dil İngilizce
Konular Matematik
Bölüm Makaleler
Yazarlar

Ajim Uddin Ansarı Bu kişi benim

B. K. Sharma Bu kişi benim

Shiv Datt Kumar Bu kişi benim

Yayımlanma Tarihi 14 Temmuz 2020
Yayımlandığı Sayı Yıl 2020

Kaynak Göster

APA Ansarı, A. U., Sharma, B. K., & Kumar, S. D. (2020). DIFFERENT TYPES OF G-PRIME IDEALS ASSOCIATED TO A GRADED MODULE AND GRADED PRIMARY DECOMPOSITION IN A GRADED PRÜFER DOMAIN. International Electronic Journal of Algebra, 28(28), 141-155. https://doi.org/10.24330/ieja.768206
AMA Ansarı AU, Sharma BK, Kumar SD. DIFFERENT TYPES OF G-PRIME IDEALS ASSOCIATED TO A GRADED MODULE AND GRADED PRIMARY DECOMPOSITION IN A GRADED PRÜFER DOMAIN. IEJA. Temmuz 2020;28(28):141-155. doi:10.24330/ieja.768206
Chicago Ansarı, Ajim Uddin, B. K. Sharma, ve Shiv Datt Kumar. “DIFFERENT TYPES OF G-PRIME IDEALS ASSOCIATED TO A GRADED MODULE AND GRADED PRIMARY DECOMPOSITION IN A GRADED PRÜFER DOMAIN”. International Electronic Journal of Algebra 28, sy. 28 (Temmuz 2020): 141-55. https://doi.org/10.24330/ieja.768206.
EndNote Ansarı AU, Sharma BK, Kumar SD (01 Temmuz 2020) DIFFERENT TYPES OF G-PRIME IDEALS ASSOCIATED TO A GRADED MODULE AND GRADED PRIMARY DECOMPOSITION IN A GRADED PRÜFER DOMAIN. International Electronic Journal of Algebra 28 28 141–155.
IEEE A. U. Ansarı, B. K. Sharma, ve S. D. Kumar, “DIFFERENT TYPES OF G-PRIME IDEALS ASSOCIATED TO A GRADED MODULE AND GRADED PRIMARY DECOMPOSITION IN A GRADED PRÜFER DOMAIN”, IEJA, c. 28, sy. 28, ss. 141–155, 2020, doi: 10.24330/ieja.768206.
ISNAD Ansarı, Ajim Uddin vd. “DIFFERENT TYPES OF G-PRIME IDEALS ASSOCIATED TO A GRADED MODULE AND GRADED PRIMARY DECOMPOSITION IN A GRADED PRÜFER DOMAIN”. International Electronic Journal of Algebra 28/28 (Temmuz 2020), 141-155. https://doi.org/10.24330/ieja.768206.
JAMA Ansarı AU, Sharma BK, Kumar SD. DIFFERENT TYPES OF G-PRIME IDEALS ASSOCIATED TO A GRADED MODULE AND GRADED PRIMARY DECOMPOSITION IN A GRADED PRÜFER DOMAIN. IEJA. 2020;28:141–155.
MLA Ansarı, Ajim Uddin vd. “DIFFERENT TYPES OF G-PRIME IDEALS ASSOCIATED TO A GRADED MODULE AND GRADED PRIMARY DECOMPOSITION IN A GRADED PRÜFER DOMAIN”. International Electronic Journal of Algebra, c. 28, sy. 28, 2020, ss. 141-55, doi:10.24330/ieja.768206.
Vancouver Ansarı AU, Sharma BK, Kumar SD. DIFFERENT TYPES OF G-PRIME IDEALS ASSOCIATED TO A GRADED MODULE AND GRADED PRIMARY DECOMPOSITION IN A GRADED PRÜFER DOMAIN. IEJA. 2020;28(28):141-55.