• 제목/요약/키워드: (quasi-associative) ideal

검색결과 7건 처리시간 0.016초

FUZZIFICATIONS OF FOLDNESS OF QUASI-ASSOCIATIVE IDEALS IN BCI-ALGEBRAS

  • Jun, Young-Bae;Kim, Kyung-Ho
    • Journal of applied mathematics & informatics
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    • 제11권1_2호
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    • pp.255-263
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    • 2003
  • Fuzzifications of n-fold quasi-associative ideals are considered. Conditions for a fuzzy ideal to be a fuzzy n-fold quasi-associative ideal are given. Using a collection of n-fold quasi-associative ideals, fuzzy n-fold quasi-associative ideals are constructed. Finally, the extension property for fuzzy n-fold quasi-associative ideals is established.

QUASI-ASSOCIATIVE IDEALS IN BCI-ALGEBRAS BASED ON BIPOLAR-VALUED FUZZY SETS

  • Jun, Young-Bae;Kim, Seon-Yu;Roh, Eun-Hwan
    • 호남수학학술지
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    • 제31권1호
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    • pp.125-136
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    • 2009
  • After the introduction of fuzzy sets by Zadeh, there have been a number of generaizations of this fundamental concept. The notion of bipolar-valued fuzzy sets introduced by Lee is one among them. In this paper, we apply the concept of a bipolar-valued fuzzy set to quasi-associative ideals in BCI-algebras. The notion of a bipolar fuzzy quasi-associative ideal of a BCI-algebra is introduced, and some related properties are investigated. Characterizations of a bipolar fuzzy quasi-associative ideal are given. Extension property for a bipolar fuzzy QA-ideal is established.

k-NIL RADICAL IN BCI-ALGEBRAS II

  • Jun, Y.B;Hong, S.M
    • 대한수학회논문집
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    • 제12권3호
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    • pp.499-505
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    • 1997
  • This paper is a continuation of [3]. We prove that if A is quasi-associative (resp. an implicative) ideal of a BCI-algebra X then the k-nil radical of A is a quasi-associative (resp. an implicative) ideal of X. We also construct the quotient algebra $X/[Z;k]$ of a BCI-algebra X by the k-nhil radical [A;k], and show that if A and B are closed ideals of BCI-algebras X and Y respectively, then

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HESITANT FUZZY p-IDEALS AND QUASI-ASSOCIATIVE IDEALS IN BCI-ALGEBRAS

  • Jun, Young Bae;Roh, Eun Hwan;Ahn, Sun Shin
    • 호남수학학술지
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    • 제44권2호
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    • pp.148-164
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    • 2022
  • The main purpose of this paper is to apply the notion of hesitant fuzzy sets to an algebraic structure, so called a BCI-algebra. The primary goal of the study is to define hesitant fuzzy p-ideals and hesitant fuzzy quasi-associative ideals in BCI-algebras, and to investigate their properties and relations.

ON QUASI-STABLE EXCHANGE IDEALS

  • Chen, Huanyin
    • 대한수학회지
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    • 제47권1호
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    • pp.1-15
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    • 2010
  • We introduce, in this article, the quasi-stable exchange ideal for associative rings. If I is a quasi-stable exchange ideal of a ring R, then so is $M_n$(I) as an ideal of $M_n$(R). As an application, we prove that every square regular matrix over quasi-stable exchange ideal admits a diagonal reduction by quasi invertible matrices. Examples of such ideals are given as well.

CONSTRUCTION OF QUOTIENT BCI(BCK)-ALGEBRA VIA A FUZZY IDEAL

  • Liu, Yong-Lin;Jie Meng
    • Journal of applied mathematics & informatics
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    • 제10권1_2호
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    • pp.51-62
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    • 2002
  • The present paper gives a new construction of a quotient BCI(BCK)-algebra X/${\mu}$ by a fuzzy ideal ${\mu}$ in X and establishes the Fuzzy Homomorphism Fundamental Theorem. We show that if ${\mu}$ is a fuzzy ideal (closed fuzzy ideal) of X, then X/${\mu}$ is a commutative (resp. positive implicative, implicative) BCK(BCI)-algebra if and only if It is a fuzzy commutative (resp. positive implicative, implicative) ideal of X Moreover we prove that a fuzzy ideal of a BCI-algebra is closed if and only if it is a fuzzy subalgebra of X We show that if the period of every element in a BCI-algebra X is finite, then any fuzzy ideal of X is closed. Especiatly, in a well (resp. finite, associative, quasi-associative, simple) BCI-algebra, any fuzzy ideal must be closed.

On weakly associative BCI-algebras

  • Wang, Y.Q.;Wei, S.N.;Jun, Y.B.
    • 대한수학회논문집
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    • 제11권3호
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    • pp.601-611
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    • 1996
  • In this paper, we introduce the notion of weakly associative BCI-algebras and investigate structure of it. Some of characterizations of elements of the quasi-associative part Q(X) of a BCI-algebra X are shown.

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