Least‐squared ordered weighted averaging operator weights

The ordered weighted averaging (OWA) operator by Yager (IEEE Trans Syst Man Cybern 1988; 18; 183–190) has received much more attention since its appearance. One key point in the OWA operator is to determine its associated weights. Among numerous methods that have appeared in the literature, we notice the maximum entropy OWA (MEOWA) weights that are determined by taking into account two appealing measures characterizing the OWA weights. Instead of maximizing the entropy in the formulation for determining the MEOWA weights, a new method in the paper tries to obtain the OWA weights that are evenly spread out around equal weights as much as possible while strictly satisfying the orness value provided in the program. This consideration leads to the least‐squared OWA (LSOWA) weighting method in which the program is to obtain the weights that minimize the sum of deviations from the equal weights since entropy is maximized when all the weights are equal. Above all, the LSOWA method allocates the positive and negative portions to the equal weights that are identical but opposite in sign from the middle point in the number of criteria. Furthermore, interval LSOWA weights can be constructed when a decision maker specifies his or her orness value in uncertain numerical bounds and we present a method, with those uncertain interval LSOWA weights, for prioritizing alternatives that are evaluated by multiple criteria. © 2008 Wiley Periodicals, Inc.

[1]  Claus Rinner,et al.  Web-enabled spatial decision analysis using Ordered Weighted Averaging (OWA) , 2002, J. Geogr. Syst..

[2]  Ronald R. Yager,et al.  On ordered weighted averaging aggregation operators in multicriteria decision-making , 1988 .

[3]  Sung-Bae Cho,et al.  Fuzzy aggregation of modular neural networks with ordered weighted averaging operators , 1995, Int. J. Approx. Reason..

[4]  Byeong Seok Ahn,et al.  Multiattribute decision aid with extended ISMAUT , 2006, IEEE Transactions on Systems, Man, and Cybernetics - Part A: Systems and Humans.

[5]  Francisco Herrera,et al.  A model of consensus in group decision making under linguistic assessments , 1996, Fuzzy Sets Syst..

[6]  Robert Fullér,et al.  On Obtaining Minimal Variability Owa Operator Weights , 2002, Fuzzy Sets Syst..

[7]  M. O’Hagan A Fuzzy Neuron Based on Maximum Entropy Ordered Weighted Averaging , 1990, 1990 Conference Record Twenty-Fourth Asilomar Conference on Signals, Systems and Computers, 1990..

[8]  Francisco Herrera,et al.  A Sequential Selection Process in Group Decision Making with a Linguistic Assessment Approach , 1995, Inf. Sci..

[9]  Z. S. Xu,et al.  An overview of operators for aggregating information , 2003, Int. J. Intell. Syst..

[10]  Zeshui Xu,et al.  An overview of methods for determining OWA weights , 2005, Int. J. Intell. Syst..

[11]  Ronald R. Yager,et al.  On ordered weighted averaging aggregation operators in multicriteria decisionmaking , 1988, IEEE Trans. Syst. Man Cybern..

[12]  Jesús Manuel Fernández Salido,et al.  Extending Yager's orness concept for the OWA aggregators to other mean operators , 2003, Fuzzy Sets Syst..

[13]  R. Yager Connectives and quantifiers in fuzzy sets , 1991 .

[14]  Ronald R. Yager A note on weighted queries in information retrieval systems , 1987, J. Am. Soc. Inf. Sci..

[15]  Byeong Seok Ahn,et al.  The OWA Aggregation With Uncertain Descriptions on Weights and Input Arguments , 2007, IEEE Transactions on Fuzzy Systems.

[16]  Ronald R. Yager On a semantics for neural networks based on fuzzy quantifiers , 1992, Int. J. Intell. Syst..

[17]  Byeong Seok Ahn,et al.  On the properties of OWA operator weights functions with constant level of orness , 2006, IEEE Transactions on Fuzzy Systems.

[18]  Robert Fullér,et al.  An Analytic Approach for Obtaining Maximal Entropy Owa Operator Weights , 2001, Fuzzy Sets Syst..

[19]  Byeong Seok Ahn,et al.  Extending Malakooti's model for ranking multicriteria alternatives with preference strength and partial information , 2003, IEEE Trans. Syst. Man Cybern. Part A.

[20]  Vicenç Torra,et al.  OWA operators in data modeling and reidentification , 2004, IEEE Transactions on Fuzzy Systems.

[21]  Hong Jiang,et al.  Application of fuzzy measures in multi-criteria evaluation in GIS , 2000, Int. J. Geogr. Inf. Sci..

[22]  Rinner Claus,et al.  Personalized Multi-Criteria Decision Strategies in Location-Based Decision Support , 2004 .

[23]  Dimitar Filev,et al.  Analytic Properties of Maximum Entropy OWA Operators , 1995, Inf. Sci..

[24]  Dimitar Filev,et al.  On the issue of obtaining OWA operator weights , 1998, Fuzzy Sets Syst..