The uncertain OWA aggregation with weighting functions having a constant level of orness

Since the ordered weighted averaging (OWA) operator was introduced by Yager [IEEE Trans Syst Man Cybern 1988;18:183–190], numerous aggregation operators have been presented in academic journals. Apart from a setting where exact numerical assessments on weights and input arguments can be obtained, the issue of generalizing the OWA to take into account uncertainties in weights and/or input arguments has been considered. Recently, Xu and Da [Int J Intell Syst 2002;17:569–575] proposed an uncertain OWA operator in which input arguments are given in the form of interval numbers. The interval numbers within the interval sometimes do not have the same meaning for the decision maker as is implied by the use of interval ranges. Thus, we present a way of prioritizing interval numbers, taking into account the strength of preference based on the probabilistic measure. Further, rank‐based weighting functions having constant values of orness irrespective of the number of objectives aggregated are presented and a final rank ordering of courses of action is performed by the use of those weighing functions. © 2006 Wiley Periodicals, Inc. Int J Int Syst 21: 469–483, 2006.

[1]  H. B. Mitchell,et al.  On ordering fuzzy numbers , 2000, International Journal of Intelligent Systems.

[2]  G. Bortolan,et al.  A review of some methods for ranking fuzzy subsets , 1985 .

[3]  J. Buckley Ranking alternatives using fuzzy numbers , 1985 .

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

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

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

[7]  Huibert Kwakernaak,et al.  Rating and ranking of multiple-aspect alternatives using fuzzy sets , 1976, Autom..

[8]  Philippe Vincke,et al.  Multicriteria Decision-Aid , 1992 .

[9]  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.

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

[11]  Ching-Lai Hwang,et al.  Fuzzy Multiple Attribute Decision Making - Methods and Applications , 1992, Lecture Notes in Economics and Mathematical Systems.

[12]  Jean Pierre Brans,et al.  HOW TO SELECT AND HOW TO RANK PROJECTS: THE PROMETHEE METHOD , 1986 .

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

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

[15]  G. Facchinetti,et al.  Note on ranking fuzzy triangular numbers , 1998 .

[16]  Z. S. Xu,et al.  The uncertain OWA operator , 2002, Int. J. Intell. Syst..

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

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

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

[20]  Francisco Herrera,et al.  Direct approach processes in group decision making using linguistic OWA operators , 1996, Fuzzy Sets Syst..

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

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