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Keywords:
aggregation operators; induced aggregation; group decision- making; preference relations; rationality; consistency
aggregation operators; induced aggregation; group decision- making; preference relations; rationality; consistency
Summary:
References:
[1] Apostol T. M.: Mathematical Analysis. Second edition. Addison-Wesley, Massachusetts, 1974 MR 0344384 | Zbl 0309.26002
[2] Azcél J.: Lectures on Functional Equations and Their Applications. Academic Press, New York – London 1966 MR 0208210
[3] Azcél J., Alsina C.: Procedures for synthesizing ratio judgements. J. Mathematical Psychology 27 (1983), 93–102 MR 0721589
[4] Azcél J., Alsina C.: Synthesizing judgements: A functional equations approach. Mathematical Modelling 9 (1987), 311–320 MR 0902224
[5] Cutello V., Montero J.: Hierarchies of aggregation operators. Internat. J. Intelligent System 9 (1994), 1025–1045
[6] Cutello V., Montero J.: Fuzzy rationality measures. Fuzzy Sets and Systems 62 (1994), 39–54 MR 1259883 | Zbl 0828.90004
[7] Chiclana F., Herrera, F., Herrera-Viedma E.: Integrating multiplicative preference relations in a multipurpose decision making model based on fuzzy preference relations. Fuzzy Sets and Systems 112 (2001), 277–291 MR 1854819 | Zbl 1098.90523
[8] Chiclana F., Herrera, F., Herrera-Viedma E.: The ordered weighted geometric operator: Properties and application in MCDM problems. In: Technologies for Constructing Intelligent Systems 2: Tools, Series Studies in Fuzziness and Soft Computing 90 (B. B. Bouchon-Meunier, J. Gutierrez-Rios, L. Magdalena, R. R. Yager, eds.), Physica-Verlag, Heidelberg 2002, pp. 173–184 Zbl 1015.68182
[9] Chiclana F., Herrera F., Herrera-Viedma, E., Martínez L.: A note on the reciprocity in the aggregation of fuzzy preference relations using OWA operators. Fuzzy Sets and Systems 137 (2003), 71–83 MR 1992699 | Zbl 1056.91016
[10] Chiclana F., Herrera-Viedma E., Herrera, F., Alonso S.: Induced ordered weighted geometric operators and their use in the aggregation of multiplicative preference relations. Internat. J. Intelligent Systems 19 (2004), 233–255 Zbl 1105.68095
[11] Chiclana F., Herrera-Viedma E., Herrera, F., Alonso S.: Some Induced Ordered Weighted Averaging Operators and Their Use for Solving Group Decision Making Problems Based on Fuzzy Preference Relations. Technical Report DECSAI-SCI2S-03-01, Dept. of Computer Science and A.I., University of Granada, 2003 Zbl 1128.90513
[12] Dubois D., Prade H.: Fuzzy Sets and Systems: Theory and Application. Academic Press, New York 1980 MR 0589341
[13] Dubois D., Prade H.: A review of fuzzy sets aggregation connectives. Inform. Sci. 36 (1985), 85–121 MR 0813766
[14] Fodor J., Roubens M.: Fuzzy Preference Modelling and Multicriteria Decision Support. Kluwer, Dordrecht 1994 Zbl 0827.90002
[15] García-Lapresta J. L., Marques R. A.: Constructing reciprocal and stable aggregation operators. In: Proc. Summer School on Aggregation Operators 2003 (AGOP’2003), Alcalá de Henares, Spain 2003, pp. 73–78
[16] Herrera F., Herrera-Viedma, E., Chiclana F.: Multiperson decision making based on multiplicative preference relations. European J. Oper. Res. 129 (2001), 372–385 MR 1806004 | Zbl 0980.90041
[17] Herrera F., Herrera-Viedma, E., Chiclana F.: A study of the origin and uses of the ordered weighted geometric operator in multicriteria decision making. Internat. J. Intelligent Systems 18 (2003), 689–707 Zbl 1037.68133
[18] Herrera F., Herrera-Viedma, E., Verdegay J. L.: A rational consensus model in group decision making using linguistic assessments. Fuzzy Sets and Systems 88 (1997), 31–49
[19] Herrera F., Herrera-Viedma, E., Verdegay J. L.: Choice processes for non-homoge- neous group decision making in linguistic setting. Fuzzy Sets and Systems 94 (1998), 287–308 MR 1612282
[20] Herrera-Viedma E., Herrera F., Chiclana, F., Luque M.: Some issues on consistency of fuzzy preference relations. European J. Oper. Res. 154 (2004), 98–109 MR 2025664 | Zbl 1099.91508
[21] Kacprzyk J., Fedrizzi, M., Nurmi H.: Group decision making and consensus under fuzzy preference and fuzzy majority. Fuzzy Sets and Systems 49 (1992), 21–31 MR 1177944
[22] Saaty, Th. L.: The Analytic Hierarchy Process. McGraw-Hill, New York 1980 MR 0773297
[23] Tanino T.: Fuzzy preference orderings in group decision making. Fuzzy Sets and Systems 12 (1984), 117–131 MR 0734944 | Zbl 0567.90002
[24] Tanino T.: Fuzzy preference relations in group decision making. In: Non-Conventional Preference Relations in Decision Making (J. Kacprzyk, M. Roubens, eds.), Springer–Verlag, Berlin 1988, pp. 54–71 MR 1133648 | Zbl 0652.90010
[25] Yager R. R.: Fuzzy decision making including unequal objectives. Fuzzy Sets and Systems 1 (1978), 87–95 Zbl 0378.90011
[26] Yager R. R.: On ordered weighted averaging aggregation operators in multicriteria decision making. IEEE Trans. Systems, Man and Cybernetics 18 (1988), 183–190 MR 0931863
[27] Yager R. R.: Induced aggregation operators. Fuzzy Sets and Systems 137 (2003), 59–69 MR 1992698 | Zbl 1056.68146
[28] Yager R. R., Filev D. P.: Operations for granular computing: mixing words and numbers. Proc. FUZZ-IEEE World Congress on Computational Intelligence, Anchorage 1998, pp. 123–128
[29] Yager R. R., Filev D. P.: Induced ordered weighted averaging operators. IEEE Trans. Systems, Man and Cybernetics 29 (1999), 141–150
[30] Zadeh L. A.: A computational approach to fuzzy quantifiers in natural languages. Comput. Math. Appl. 9 (1983), 149–184 MR 0719073 | Zbl 0517.94028
[31] Zimmermann H.-J.: Fuzzy Set Theory and Its Applications. Kluwer, Dordrecht 1991 MR 1174743 | Zbl 0984.03042
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