Results 1 to 10 of about 1,134 (205)
Neutrosophic ℵ-bi-ideals in semigroups [PDF]
Neutrosophic Sets and Systems, 2020 In this paper, we introduce the notion of neutrosophic -bi-ideal for a semigroup. We infer different semigroups using neutrosophic -bi-ideal structures. Moreover, for regular semigroups, neutrosophic -product and intersection of neutrosophic -ideals are identical.
K. Porselvi +3 more
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Bifuzzy bi-ideals with operators in semigroups [PDF]
International Mathematical Forum, 2007 The concept of a (generalized) \(\omega\)-bifuzzy biideal in semigroups is introduced. A condition for a generalized \(\omega\)-bifuzzy biideal to be an \(\omega\)-bifuzzy biideal is provided.
Chae, Gyu Ihn +2 more
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On bi-ideals of Γ-semihyperrings [PDF]
Journal of Hyperstructures, 2023 The concept of Γ-semihyperrings is a generalization of semirings, semihyperrings and Γ-semirings. The notion of bi-ideals and minimal bi-ideals in Γ-semihyperrings is introduced with several examples. We also made some ideal theoretic characterization of bi-ideals and minimal bi-ideals in Γ-semihyperrings. Then the notion of bi-simple Γ-semihyperrings
Patil, Jitendrasing Jaysing +1 more
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From Bi-ideals to Periodicity [PDF]
RAIRO - Theoretical Informatics and Applications, 2008 Summary: Necessary and sufficient conditions are extracted for periodicity of bi-ideals. They cover infinitely and finitely generated bi-ideals.
Buls, Jānis, Lorencs, Aivars
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Bi-ideals and Weak Bi-ideals of Near Left Almost Rings
International Journal of Analysis and Applications, 2023 In this paper, we define bi-ideals and weak bi-ideals of nLA-ring. We investigate the properties of bi-ideals and weak bi-ideals of nLA-ring.
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Int‐Soft (Generalized) Bi‐Ideals of Semigroups [PDF]
The Scientific World Journal, 2015 The notions of int‐soft semigroups and int‐soft left (resp., right) ideals in semigroups are studied in the paper by Song et al. (2014). In this paper, further properties and characterizations of int‐soft left (right) ideals are studied, and the notion of int‐soft (generalized) bi‐ideals is introduced.
Young Bae Jun, Seok-Zun Song
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Fuzzy Generalized Bi-ideals of Γ-semigroups [PDF]
Fuzzy Information and Engineering, 2012 Let \(S\) and \(\Gamma\) be two non-empty sets. Then \(S\) is called a \(\Gamma\)-semigroup if there exists a mapping \(S\times\Gamma\times S\to S\) (images to be denoted by \(a\alpha b\)) that satisfies 1) \(x\gamma y\in S\), 2) \((x\beta y)\gamma z=x\beta(y\gamma z)\), \(\forall x,y,z\in S\), \(\forall\beta,\gamma\in\Gamma\).
Majumder, S. K., Mandal, M.
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BI-IDEALS IN TERNARY SEMINEAR RINGS
INTERNATIONAL JOURNAL OF MATHEMATICS AND COMPUTER RESEARCH, 2023 In this paper, we introduce the concept of Bi-ideal in ternary seminear rings as a generalization of quasi ideals in ternary seminear rings. We also study the notion of minimal bi-ideal in ternary seminear rings and derive some of their interesting properties.
R. Vijayakumar,, A. Dhivya Bharathi,
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Anti fuzzy bi-ideals on ordered AG-groupoids [PDF]
Journal of the Indonesian Mathematical Society, 2020 The purpose of this study is to initiate the notion of anti fuzzy left (resp. right, bi-, generalized bi-, (1,2)-) ideals in non-associative and non-commutative ordered semigroups. We characterize different classes of non-associative and non-commutative ordered semigroups in terms of such ideals.
Munir, Mohammad +4 more
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Anti-fuzzy Bi-ideals in Hypersemigroups
Ratio Mathematica, 2023 This study aims at defining the concept of anti-fuzzy bi-ideals of hypersemigroups. This study also defines the hypersemigroup bi-ideals in terms of anti-fuzzy bi-ideals additionally.
M, Vasu, S, Dhanasekaran
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