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On the properties of equidifferent RIM quantifier with generating function
Authors:Xinwang Liu
Affiliation:1. School of Economics and Management , Southeast University Nanjing , 210096, Jiangsu, China xwliu@seu.edu.cn
Abstract:Comparing the large number of research papers on the ordered weighted averaging (OWA) operator, the researches on relative quantifier are relatively rare so far. In the present paper, based on the quantifier guided aggregation method with OWA operator which was proposed by Yager [“Quantifier guided aggregation using OWA operators”, Int. J. Intell. Syst., 11, pp. 49–73, 1996], a generating function representation method for regular increasing monotone (RIM) quantifiers is proposed. We extend the the properties of OWA operator to the RIM quantifier which is represented with a monotone function instead of the OWA weighting vector. A class of parameterized equidifferent RIM quantifier which has minimum variance generating function is proposed and its properties are also analyzed. The equidifferent RIM quantifier is consistent with its orness level for any aggregated elements, which can be used to represent the decision maker's preference.
Keywords:Aggregation  OWA operator  Equidifferent RIM quantifier  Minimum variance
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