On ordered weighted averaging aggregation operators in multicriteria decisionmaking
IEEE Transactions on Systems, Man and Cybernetics
The ordered weighted averaging operators: theory and applications
The ordered weighted averaging operators: theory and applications
An analytic approach for obtaining maximal entropy OWA operator weights
Fuzzy Sets and Systems
On obtaining minimal variability OWA operator weights
Fuzzy Sets and Systems - Theme: Multicriteria decision
An overview of methods for determining OWA weights: Research Articles
International Journal of Intelligent Systems
Modeling Decisions: Information Fusion and Aggregation Operators (Cognitive Technologies)
Modeling Decisions: Information Fusion and Aggregation Operators (Cognitive Technologies)
Aggregation Functions: A Guide for Practitioners
Aggregation Functions: A Guide for Practitioners
Information Sciences: an International Journal
Information Sciences: an International Journal
Group consensus algorithms based on preference relations
Information Sciences: an International Journal
Induced and uncertain heavy OWA operators
Computers and Industrial Engineering
Decision-making with distance measures and induced aggregation operators
Computers and Industrial Engineering
Fuzzy induced generalized aggregation operators and its application in multi-person decision making
Expert Systems with Applications: An International Journal
Decision-making in sport management based on the OWA operator
Expert Systems with Applications: An International Journal
A unified model between the weighted average and the induced OWA operator
Expert Systems with Applications: An International Journal
Parametric aggregation in ordered weighted averaging
International Journal of Approximate Reasoning
Uncertain induced aggregation operators and its application in tourism management
Expert Systems with Applications: An International Journal
A new method of obtaining the priority weights from an interval fuzzy preference relation
Information Sciences: an International Journal
Models to determine parameterized ordered weighted averaging operators using optimization criteria
Information Sciences: an International Journal
Probabilities in the OWA operator
Expert Systems with Applications: An International Journal
International Journal of Intelligent Systems
Determining OWA operator weights by mean absolute deviation minimization
ICAISC'12 Proceedings of the 11th international conference on Artificial Intelligence and Soft Computing - Volume Part I
Cluster-reliability-induced OWA operators
International Journal of Intelligent Systems
Intuitionistic fuzzy-valued Choquet integral and its application in multicriteria decision making
Information Sciences: an International Journal
Information Sciences: an International Journal
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We describe some basic features of the OWA operator. We turn to the problem of determining the weights associated with this operator and particularly the maximal dispersion (entropy) approach. We consider the possibility of using minimization of dispersion. After discussing concerns with both maximization and minimization of dispersion we investigate the possibility of finding an optimal solution intermediate to these extremes. We next consider alternative measures of dispersion. We introduce a fundamental requirement for a measure of dispersion called the Preference for Equal Division. A number of general classes of dispersion measures are provided notable among these are those based on t-norm and t-conorm operators.