• Title/Summary/Keyword: rings

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A GENERALIZATION OF THE SYMMETRY PROPERTY OF A RING VIA ITS ENDOMORPHISM

  • Fatma Kaynarca;Halise Melis Tekin Akcin
    • Communications of the Korean Mathematical Society
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    • v.39 no.2
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    • pp.373-397
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    • 2024
  • Lambek introduced the concept of symmetric rings to expand the commutative ideal theory to noncommutative rings. In this study, we propose an extension of symmetric rings called strongly α-symmetric rings, which serves as both a generalization of strongly symmetric rings and an extension of symmetric rings. We define a ring R as strongly α-symmetric if the skew polynomial ring R[x; α] is symmetric. Consequently, we provide proofs for previously established outcomes regarding symmetric and strongly symmetric rings, directly derived from the results we have obtained. Furthermore, we explore various properties and extensions of strongly α-symmetric rings.

A REMARK ON IFP RINGS

  • Lee, Chang Hyeok;Lim, Hyo Jin;Park, Jae Hyoung;Kim, Jung Hyun;Kim, Jung Soo;Jeong, Min Joon;Song, Min Kyung;Kim, Si Hwan;Hwang, Su Min;Eom, Tae Kang;Lee, Min Jung;Lee, Yang;Ryu, Sung Ju
    • Korean Journal of Mathematics
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    • v.21 no.3
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    • pp.311-318
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    • 2013
  • We continue the study of power-Armendariz rings over IFP rings, introducing $k$-power Armendariz rings as a generalization of power-Armendariz rings. Han et al. showed that IFP rings are 1-power Armendariz. We prove that IFP rings are 2-power Armendariz. We moreover study a relationship between IFP rings and $k$-power Armendariz rings under a condition related to nilpotency of coefficients.

THE STRONG MORI PROPERTY IN RINGS WITH ZERO DIVISORS

  • ZHOU, DECHUAN;WANG, FANGGUI
    • Bulletin of the Korean Mathematical Society
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    • v.52 no.4
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    • pp.1285-1295
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    • 2015
  • An SM domain is an integral domain which satisfies the ascending chain condition on w-ideals. Then an SM domain also satisfies the descending chain condition on those chains of v-ideals whose intersection is not zero. In this paper, a study is begun to extend these properties to commutative rings with zero divisors. A $Q_0$-SM ring is defined to be a ring which satisfies the ascending chain condition on semiregular w-ideals and satisfies the descending chain condition on those chains of semiregular v-ideals whose intersection is semiregular. In this paper, some properties of $Q_0$-SM rings are discussed and examples are provided to show the difference between $Q_0$-SM rings and SM rings and the difference between $Q_0$-SM rings and $Q_0$-Mori rings.

ON JACOBSON AND NIL RADICALS RELATED TO POLYNOMIAL RINGS

  • Kwak, Tai Keun;Lee, Yang;Ozcan, A. Cigdem
    • Journal of the Korean Mathematical Society
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    • v.53 no.2
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    • pp.415-431
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    • 2016
  • This note is concerned with examining nilradicals and Jacobson radicals of polynomial rings when related factor rings are Armendariz. Especially we elaborate upon a well-known structural property of Armendariz rings, bringing into focus the Armendariz property of factor rings by Jacobson radicals. We show that J(R[x]) = J(R)[x] if and only if J(R) is nil when a given ring R is Armendariz, where J(A) means the Jacobson radical of a ring A. A ring will be called feckly Armendariz if the factor ring by the Jacobson radical is an Armendariz ring. It is shown that the polynomial ring over an Armendariz ring is feckly Armendariz, in spite of Armendariz rings being not feckly Armendariz in general. It is also shown that the feckly Armendariz property does not go up to polynomial rings.

NILRADICALS OF POWER SERIES RINGS AND NIL POWER SERIES RINGS

  • HUH, CHAN;KIM, CHOL ON;KIM, EUN JEONG;KIM, HONG KEE;LEE, YANG
    • Journal of the Korean Mathematical Society
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    • v.42 no.5
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    • pp.1003-1015
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    • 2005
  • Klein proved that polynomial rings over nil rings of bounded index are also nil of bounded index; while Puczylowski and Smoktunowicz described the nilradical of a power series ring with an indeterminate. We extend these results to those with any set of commuting indeterminates. We also study prime radicals of power series rings over some class of rings containing the case of bounded index, finding some examples which elaborate our arguments; and we prove that R is a PI ring of bounded index then the power series ring R[[X]], with X any set of indeterminates over R, is also a PI ring of bounded index, obtaining the Klein's result for polynomial rings as a corollary.

ON COMMUTATIVITY OF REGULAR PRODUCTS

  • Kwak, Tai Keun;Lee, Yang;Seo, Yeonsook
    • Bulletin of the Korean Mathematical Society
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    • v.55 no.6
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    • pp.1713-1726
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    • 2018
  • We study the one-sided regularity of matrices in upper triangular matrix rings in relation with the structure of diagonal entries. We next consider a ring theoretic condition that ab being regular implies ba being also regular for elements a, b in a given ring. Rings with such a condition are said to be commutative at regular product (simply, CRP rings). CRP rings are shown to be contained in the class of directly finite rings, and we prove that if R is a directly finite ring that satisfies the descending chain condition for principal right ideals or principal left ideals, then R is CRP. We obtain in particular that the upper triangular matrix rings over commutative rings are CRP.

ON STRONGLY 1-ABSORBING PRIMARY IDEALS OF COMMUTATIVE RINGS

  • Almahdi, Fuad Ali Ahmed;Bouba, El Mehdi;Koam, Ali N.A.
    • Bulletin of the Korean Mathematical Society
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    • v.57 no.5
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    • pp.1205-1213
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    • 2020
  • Let R be a commutative ring with 1 ≠ 0. In this paper, we introduce a subclass of the class of 1-absorbing primary ideals called the class of strongly 1-absorbing primary ideals. A proper ideal I of R is called strongly 1-absorbing primary if whenever nonunit elements a, b, c ∈ R and abc ∈ I, then ab ∈ I or c ∈ ${\sqrt{0}}$. Firstly, we investigate basic properties of strongly 1-absorbing primary ideals. Hence, we use strongly 1-absorbing primary ideals to characterize rings with exactly one prime ideal (the UN-rings) and local rings with exactly one non maximal prime ideal. Many other results are given to disclose the relations between this new concept and others that already exist. Namely, the prime ideals, the primary ideals and the 1-absorbing primary ideals. In the end of this paper, we give an idea about some strongly 1-absorbing primary ideals of the quotient rings, the polynomial rings, and the power series rings.

A STUDY ON QUASI-DUO RINGS

  • Kim, Chol-On;Kim, Hong-Kee;Jang, Sung-Hee
    • Bulletin of the Korean Mathematical Society
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    • v.36 no.3
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    • pp.579-588
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    • 1999
  • In this paper we study the connections between right quasi-duo rings and 2-primal rings, including several counterexamples for answers to some questions that occur naturally in the process. Actually we concern following three questions and modified ones: (1) Are right quasi-duo rings 2-primal$\ulcorner$, (2) Are formal power series rings over weakly right duo rings also weakly right duo\ulcorner and (3) Are 2-primal rings right quasi-duo\ulcorner Moreover we consider some conditions under which the answers of them may be affirmative, obtaining several results which are related to the questions.

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ON A GENERALIZATION OF RIGHT DUO RINGS

  • Kim, Nam Kyun;Kwak, Tai Keun;Lee, Yang
    • Bulletin of the Korean Mathematical Society
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    • v.53 no.3
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    • pp.925-942
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    • 2016
  • We study the structure of rings whose principal right ideals contain a sort of two-sided ideals, introducing right ${\pi}$-duo as a generalization of (weakly) right duo rings. Abelian ${\pi}$-regular rings are ${\pi}$-duo, which is compared with the fact that Abelian regular rings are duo. For a right ${\pi}$-duo ring R, it is shown that every prime ideal of R is maximal if and only if R is a (strongly) ${\pi}$-regular ring with $J(R)=N_*(R)$. This result may be helpful to develop several well-known results related to pm rings (i.e., rings whose prime ideals are maximal). We also extend the right ${\pi}$-duo property to several kinds of ring which have roles in ring theory.