Results 251 to 260 of about 285,696 (284)
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Fuzzy Sets and Systems, 1996
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Kim, Jin Bai, Kim, Young Hee
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Kim, Jin Bai, Kim, Young Hee
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Fuzzy Sets and Systems, 1999
The paper examines families of fuzzy groups [cf. \textit{M. Asaad, S. Abou-Zaid}, Fuzzy Sets Syst. 60, No. 3, 321-323 (1993; Zbl 0814.20061); \textit{J.-G. Kim}, Inf. Sci. 83, No. 3-4, 161-174 (1995; Zbl 0870.20057); \textit{M.~A.~A. Mishref}, J. Fuzzy Math. 6, No. 4, 811-819 (1998; Zbl 0922.20067)].
Gupta, K. C., Sarma, B. K.
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The paper examines families of fuzzy groups [cf. \textit{M. Asaad, S. Abou-Zaid}, Fuzzy Sets Syst. 60, No. 3, 321-323 (1993; Zbl 0814.20061); \textit{J.-G. Kim}, Inf. Sci. 83, No. 3-4, 161-174 (1995; Zbl 0870.20057); \textit{M.~A.~A. Mishref}, J. Fuzzy Math. 6, No. 4, 811-819 (1998; Zbl 0922.20067)].
Gupta, K. C., Sarma, B. K.
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Fuzzy Sets and Systems, 1996
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Abd-Allah, A. M., Omar, R. A. K.
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Abd-Allah, A. M., Omar, R. A. K.
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Information Sciences, 1994
Quotients of fuzzy groups are examined by many authors [cf. e.g. \textit{N. P. Mukherjee, P. Bhattacharya}, Inf. Sci. 34, 225-239 (1984; Zbl 0568.20002), \textit{B. B. Makamba, V. Murali}, ibid. 59, 121-129 (1992; Zbl 0737.20041); \textit{N. Kuroki}, ibid. 60, 247-259 (1992; Zbl 0747.20038); \textit{N. Ajmal, A. S. Prajapati}, ibid.
Morsi, Nehad N., Yehia, Samy El-Badawy
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Quotients of fuzzy groups are examined by many authors [cf. e.g. \textit{N. P. Mukherjee, P. Bhattacharya}, Inf. Sci. 34, 225-239 (1984; Zbl 0568.20002), \textit{B. B. Makamba, V. Murali}, ibid. 59, 121-129 (1992; Zbl 0737.20041); \textit{N. Kuroki}, ibid. 60, 247-259 (1992; Zbl 0747.20038); \textit{N. Ajmal, A. S. Prajapati}, ibid.
Morsi, Nehad N., Yehia, Samy El-Badawy
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Fuzzy Sets and Systems, 1995
A fuzzy group \((G,\mu)\) is said to be continuous if \(G\) is a topological group and \(\mu: G\to [0,1]\) is continuous. The author defines a topological group \(G\) to be fuzzy trivial if all continuous functions \(\mu\) from \(G\) to \([0,1]\) such that \(\mu\) is a fuzzy subgroup of \(G\) are constants.
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A fuzzy group \((G,\mu)\) is said to be continuous if \(G\) is a topological group and \(\mu: G\to [0,1]\) is continuous. The author defines a topological group \(G\) to be fuzzy trivial if all continuous functions \(\mu\) from \(G\) to \([0,1]\) such that \(\mu\) is a fuzzy subgroup of \(G\) are constants.
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Fuzzy Sets and Systems, 1992
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Fuzzy discriminant analysis in fuzzy groups
Fuzzy Sets and Systems, 1986This paper deals with discriminant problems to classify samples with fuzzy multi-attribute into fuzzy groups. In this problem, the objective is to determine the linear discriminant function that provides the maximum separation of fuzzy groups in a real space.
Watada, Junzo +2 more
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Fuzzy ordered structures and fuzzy lattice ordered groups
Journal of Intelligent & Fuzzy Systems, 2014Fuzzy (lattice valued) posets are investigated with the order being a fuzzy relation on a fuzzy set. In this framework, fuzzy chains and generally fuzzy lattices are investigated. These are applied to fuzzy lattice ordered subgroups of lattice ordered groups.
Šešelja, Branimir +2 more
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Fuzzy Sets and Systems, 1999
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Fuzzy Sets and Systems, 1993
This is a continuation of the first author's part I [ibid. 39, 323-328 (1991; Zbl 0718.20036)]. The paper brings examples of characterizations of properties of finite groups by suitable properties of their fuzzy subgroups [cf. also the second author, Fuzzy Sets Syst. 47, 347-349 (1992; Zbl 0797.20064)].
Asaad, Mohamed, Abou-Zaid, Salah
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This is a continuation of the first author's part I [ibid. 39, 323-328 (1991; Zbl 0718.20036)]. The paper brings examples of characterizations of properties of finite groups by suitable properties of their fuzzy subgroups [cf. also the second author, Fuzzy Sets Syst. 47, 347-349 (1992; Zbl 0797.20064)].
Asaad, Mohamed, Abou-Zaid, Salah
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