Group decision making based on generalized intuitionistic fuzzy prioritized geometric operator
International Journal of Intelligent Systems
A Model for Decision Making with Missing, Imprecise, and Uncertain Evaluations of Multiple Criteria
International Journal of Intelligent Systems
A novel d-s theory based AHP decision apparatus under subjective factor disturbances
AI'12 Proceedings of the 25th Australasian joint conference on Advances in Artificial Intelligence
A quality evaluation model for the design quality of online shopping websites
Electronic Commerce Research and Applications
Induced continuous Choquet integral operators and their application to group decision making
Computers and Industrial Engineering
Journal of Intelligent & Fuzzy Systems: Applications in Engineering and Technology
Journal of Intelligent & Fuzzy Systems: Applications in Engineering and Technology
A multiple criteria hesitant fuzzy decision making with Shapley value-based VIKOR method
Journal of Intelligent & Fuzzy Systems: Applications in Engineering and Technology
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Yager (Fuzzy Sets, Syst 2003;137:59–69) extended the idea of order-induced aggregation to the Choquet aggregation and defined induced Choquet ordered averaging operator. In this paper, an induced intuitionistic fuzzy Choquet (IFC) integral operator is proposed for the multiple criteria decision making. Some of its properties are investigated. Furthermore, an induced generalized IFC integral operator is introduced. It is worth mentioning that most of the existing intuitionistic fuzzy aggregation operators are special cases of this induced aggregation operator. A decision procedure based on the proposed induced aggregation operator is developed for solving the multicriteria decision-making problem in which all the decision information is represented by intuitionistic fuzzy values. An illustrative example is given for demonstrating the applicability of the proposed decision procedure. © 2011 Wiley Periodicals, Inc. © 2011 Wiley Periodicals, Inc.