On ordered weighted averaging aggregation operators in multicriteria decisionmaking
IEEE Transactions on Systems, Man and Cybernetics
Applications of the linguistic OWA operators in group decision making
The ordered weighted averaging operators
Fuzzy Sets and Systems - Special issue: Preference modelling and applications
On Compatibility of Interval Fuzzy Preference Relations
Fuzzy Optimization and Decision Making
International Journal of Intelligent Systems
A preemptive goal programming method for aggregating OWA operator weights in group decision making
Information Sciences: an International Journal
Two new models for determining OWA operator weights
Computers and Industrial Engineering
Consensus-based intelligent group decision-making model for the selection of advanced technology
Decision Support Systems
Fuzzy preference relations: Aggregation and weight determination
Computers and Industrial Engineering
An automatic approach to reaching consensus in multiple attribute group decision making
Computers and Industrial Engineering
Computers and Industrial Engineering
The continuous ordered weighted geometric operator and its application to decision making
Fuzzy Sets and Systems
Induced ordered weighted averaging operators
IEEE Transactions on Systems, Man, and Cybernetics, Part B: Cybernetics
Group Decision-Making Model With Incomplete Fuzzy Preference Relations Based on Additive Consistency
IEEE Transactions on Systems, Man, and Cybernetics, Part B: Cybernetics
A consensus model for multiperson decision making with different preference structures
IEEE Transactions on Systems, Man, and Cybernetics, Part A: Systems and Humans
IEEE Transactions on Fuzzy Systems
A Consensus Model for Group Decision Making With Incomplete Fuzzy Preference Relations
IEEE Transactions on Fuzzy Systems
Computers and Industrial Engineering
Computers and Industrial Engineering
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In Computers and Industrial Engineering 56 (2009) 1545-1552, an induced continuous ordered weighted geometric (ICOWG) operator is presented to deal with group decision making (GDM) problems with interval multiplicative preference relations. But, we still do not know whether the ICOWG operator can improve the consensus among a group of decision makers. The aim of this paper is to study some desired properties of the ICOWG operator in GDM problems. Firstly, the concept of Compatibility Degree and Compatibility Index (CI) is defined. We then present the Compatibility Index induced COWG (CI-ICOWG) operator to aggregate interval multiplicative preference relations, which induces the order of argument values based on the Compatibility Index of decision makers (DMs). The main novelty of the CI-ICOWG operator is that it aggregates individual preference relation in such a way that more importance is placed on the most compatibility one. Thus, the CI-ICOWG operator can guarantee that the Compatibility Degree is at least as good as the arithmetic mean of all the individual Compatibility Degrees. Additionally, if the leading decision maker's interval multiplicative preference relation P and each of interval multiplicative preference relations R^(^1^),R^(^2^),...,R^(^m^) are of acceptable compatibility, then P and the collective judgement matrix (CJM) of R^(^1^),R^(^2^),...,R^(^m^) are of acceptable compatibility. Finally, an illustrative numerical example is used to verify the developed approaches.