各种模糊集的多项式逼近下的精确去模糊化方法

Q3 Decision Sciences Yugoslav Journal of Operations Research Pub Date : 2023-01-01 DOI:10.2298/yjor2306017d
S. De, Somnath Nandi
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引用次数: 0

摘要

本文研究了寻找各种类型模糊集的去模糊化/排序指标的新方法。传统上,在大多数关于模糊决策的文章中,对于最高期望水平的去模糊化方法是不合理的。本研究强调了一种有效的去模糊化(排序)方法,该方法将使用模糊数-切割和不使用模糊数-切割获得的去模糊化值的差距联系起来。此外,对于给定的问题,不同的研究人员发现了不同的隶属度,这混淆了模糊集本身的概念唯一性。为了解决这些问题,我们首先利用插值多项式函数研究了一个多边形模糊集。然而,在模糊集理论中,我们通常寻求最高的隶属度来对任何一类决策问题进行排序,因此,最大化多项式函数,我们得到所提出的模糊集的指标值。一种基于人工智能(AI)的求解算法也被开发出来以找到精确的去模糊化值。事实上,考虑到两个数字例子,我们将这些排名值与更高期望水平下的一些现有技术水平进行了比较。最后,还做了一些图形说明来证明所提出的方法。
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The exact defuzzification method under polynomial approximation of various fuzzy sets
This article deals with the new approach of finding the defuzzification / ranking index of various types of fuzzy sets. Traditionally, in most of the articles on fuzzy decision making the defuzzification methods are not justified with respect to that of highest aspiration levels. This study highlights an efficient defuzzification (ranking) method which links between the gaps on the defuzzified values obtained using ?-cuts and without ?-cuts of fuzzy numbers. Moreover, for a given problem different membership grades are found by different researchers which are confusing and contradicts the conceptual uniqueness of fuzzy set itself. To resolve these issues, first of all, we have studied a polygonal fuzzy set by means of an interpolating polynomial function. However, in fuzzy set theory we usually seek the highest membership grade for ranking any kind of decision-making problem therefore, maximizing the polynomial function, we get the index value of the proposed fuzzy set. An artificial intelligence (AI) based solution algorithm has also been developed to find the exact defuzzified value. Indeed, considering two numerical examples we have compared these ranking values with some of the existing state of- arts under higher aspiration levels. Finally, some graphical illustrations have also been done to justify the proposed approach.
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来源期刊
Yugoslav Journal of Operations Research
Yugoslav Journal of Operations Research Decision Sciences-Management Science and Operations Research
CiteScore
2.50
自引率
0.00%
发文量
14
审稿时长
24 weeks
期刊最新文献
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