Proportional Fuzzy Set Extensions and Imprecise Proportions

IF 3.3 4区 计算机科学 Q2 COMPUTER SCIENCE, INFORMATION SYSTEMS
Informatica Pub Date : 2024-03-29 DOI:10.15388/24-infor550
Cengiz Kahraman
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引用次数: 0

Abstract

The extensions of ordinary fuzzy sets are problematic because they require decimal numbers for membership, non-membership and indecision degrees of an element from the experts, which cannot be easily determined. This will be more difficult when three or more digits’ membership degrees have to be assigned. Instead, proportional relations between the degrees of parameters of a fuzzy set extension will make it easier to determine the membership, non-membership, and indecision degrees. The objective of this paper is to present a simple but effective technique for determining these degrees with several decimal digits and to enable the expert to assign more stable values when asked at different time points. Some proportion-based models for the fuzzy sets extensions, intuitionistic fuzzy sets, Pythagorean fuzzy sets, picture fuzzy sets, and spherical fuzzy sets are proposed, including their arithmetic operations and aggregation operators. Proportional fuzzy sets require only the proportional relations between the parameters of the extensions of fuzzy sets. Their contribution is that these models will ease the use of fuzzy set extensions with the data better representing expert judgments. The imprecise definition of proportions is also incorporated into the given models. The application and comparative analyses result in that proportional fuzzy sets are easily applied to any problem and produce valid outcomes. Furthermore, proportional fuzzy sets clearly showed the role of the degree of indecision in the ranking of alternatives in binomial and trinomial fuzzy sets. In the considered car selection problem, it has been observed that there are minor changes in the ordering of intuitionistic and spherical fuzzy sets. PDF  XML
比例模糊集扩展和不精确比例
普通模糊集的扩展是有问题的,因为它们需要专家提供元素的成员度、非成员度和优柔寡断度的十进制数,而这是不容易确定的。当需要分配三个或更多数字的成员度时,这将更加困难。相反,模糊集扩展的参数度之间的比例关系将更容易确定成员度、非成员度和不确定度。本文的目的是提出一种简单而有效的技术,用于确定这些具有若干小数位的度数,并使专家在不同的时间点进行询问时能给出更稳定的值。本文提出了一些基于比例的模糊集扩展模型、直觉模糊集、毕达哥拉斯模糊集、图象模糊集和球形模糊集,包括它们的算术运算和聚合运算符。比例模糊集只需要模糊集扩展参数之间的比例关系。他们的贡献在于,这些模型将简化模糊集扩展的使用,数据更能代表专家的判断。比例的不精确定义也被纳入了给定的模型中。应用和比较分析的结果表明,比例模糊集很容易应用于任何问题,并产生有效的结果。此外,比例模糊集清楚地显示了二项式和三项式模糊集中优柔寡断程度在备选方案排序中的作用。在所考虑的汽车选择问题中,观察到直觉模糊集和球形模糊集的排序有细微变化。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Informatica
Informatica 工程技术-计算机:信息系统
CiteScore
5.90
自引率
6.90%
发文量
19
审稿时长
12 months
期刊介绍: The quarterly journal Informatica provides an international forum for high-quality original research and publishes papers on mathematical simulation and optimization, recognition and control, programming theory and systems, automation systems and elements. Informatica provides a multidisciplinary forum for scientists and engineers involved in research and design including experts who implement and manage information systems applications.
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