• Title/Summary/Keyword: SFT-rings

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ON NONNIL-SFT RINGS

  • Ali Benhissi;Abdelamir Dabbabi
    • Communications of the Korean Mathematical Society
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    • v.38 no.3
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    • pp.663-677
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    • 2023
  • The purpose of this paper is to introduce a new class of rings containing the class of SFT-rings and contained in the class of rings with Noetherian prime spectrum. Let A be a commutative ring with unit and I be an ideal of A. We say that I is SFT if there exist an integer k ≥ 1 and a finitely generated ideal F ⊆ I of A such that xk ∈ F for every x ∈ I. The ring A is said to be nonnil-SFT, if each nonnil-ideal (i.e., not contained in the nilradical of A) is SFT. We investigate the nonnil-SFT variant of some well known theorems on SFT-rings. Also we study the transfer of this property to Nagata's idealization and the amalgamation algebra along an ideal. Many examples are given. In fact, using the amalgamation construction, we give an infinite family of nonnil-SFT rings which are not SFT.

AN ASSOCIATED SEQUENCE OF IDEALS OF AN INCREASING SEQUENCE OF RINGS

  • Ali, Benhissi;Abdelamir, Dabbabi
    • Bulletin of the Korean Mathematical Society
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    • v.59 no.6
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    • pp.1349-1357
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    • 2022
  • Let 𝒜 = (An)n≥0 be an increasing sequence of rings. We say that 𝓘 = (In)n≥0 is an associated sequence of ideals of 𝒜 if I0 = A0 and for each n ≥ 1, In is an ideal of An contained in In+1. We define the polynomial ring and the power series ring as follows: $I[X]\, = \,\{\, f \,=\, {\sum}_{i=0}^{n}a_iX^i\,{\in}\,A[X]\,:\,n\,{\in}\,\mathbb{N},\,a_i\,{\in}\,I_i \,\}$ and $I[[X]]\, = \,\{\, f \,=\, {\sum}_{i=0}^{+{\infty}}a_iX^i\,{\in}\,A[[X]]\,:\,a_i\,{\in}\,I_i \,\}$. In this paper we study the Noetherian and the SFT properties of these rings and their consequences.

ON NONNIL-m-FORMALLY NOETHERIAN RINGS

  • Abdelamir Dabbabi;Ahmed Maatallah
    • Communications of the Korean Mathematical Society
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    • v.39 no.3
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    • pp.611-622
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    • 2024
  • The purpose of this paper is to introduce a new class of rings containing the class of m-formally Noetherian rings and contained in the class of nonnil-SFT rings introduced and investigated by Benhissi and Dabbabi in 2023 [4]. Let A be a commutative ring with a unit. The ring A is said to be nonnil-m-formally Noetherian, where m ≥ 1 is an integer, if for each increasing sequence of nonnil ideals (In)n≥0 of A the (increasing) sequence (∑i1+⋯+im=nIi1Ii2⋯Iim)n≥0 is stationnary. We investigate the nonnil-m-formally Noetherian variant of some well known theorems on Noetherian and m-formally Noetherian rings. Also we study the transfer of this property to the trivial extension and the amalgamation algebra along an ideal. Among other results, it is shown that A is a nonnil-m-formally Noetherian ring if and only if the m-power of each nonnil radical ideal is finitely generated. Also, we prove that a flat overring of a nonnil-m-formally Noetherian ring is a nonnil-m-formally Noetherian. In addition, several characterizations are given. We establish some other results concerning m-formally Noetherian rings.

POWER SERIES RINGS OVER PRÜFER v-MULTIPLICATION DOMAINS

  • Chang, Gyu Whan
    • Journal of the Korean Mathematical Society
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    • v.53 no.2
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    • pp.447-459
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    • 2016
  • Let D be an integral domain, {$X_{\alpha}$} be a nonempty set of indeterminates over D, and $D{\mathbb{[}}\{X_{\alpha}\}{\mathbb{]}_1}$ be the first type power series ring over D. We show that if D is a t-SFT $Pr{\ddot{u}}fer$ v-multiplication domain, then $D{\mathbb{[}}\{X_{\alpha}\}{\mathbb{]}}_{1_{D-\{0\}}}$ is a Krull domain, and $D{\mathbb{[}}\{X_{\alpha}\}{\mathbb{]}}_1$ is a $Pr{\ddot{u}}fer$ v-multiplication domain if and only if D is a Krull domain.

ON GENERALIZED KRULL POWER SERIES RINGS

  • Le, Thi Ngoc Giau;Phan, Thanh Toan
    • Bulletin of the Korean Mathematical Society
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    • v.55 no.4
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    • pp.1007-1012
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    • 2018
  • Let R be an integral domain. We prove that the power series ring R[[X]] is a Krull domain if and only if R[[X]] is a generalized Krull domain and t-dim $R{\leq}1$, which improves a well-known result of Paran and Temkin. As a consequence we show that one of the following statements holds: (1) the concepts "Krull domain" and "generalized Krull domain" are the same in power series rings, (2) there exists a non-t-SFT domain R with t-dim R > 1 such that t-dim R[[X]] = 1.