用于多标准决策的多 Q 立方双极模糊软集和余弦相似性方法

Symmetry Pub Date : 2024-08-12 DOI:10.3390/sym16081032
Khawla Abdullah Alqablan, Kholood Mohammad Alsager
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摘要

本研究介绍了一种用于表示不精确和模糊数据的新型数学工具:多q立方双极模糊软集。在已有的双极性模糊集和软集的基础上,本文首先定义了多 Q 立方双极性模糊集的概念及其基本属性。然后为这些集合开发了补集、并集和交集等数学运算。核心贡献在于引入了多q立方双极模糊软集。与现有方法相比,这一新工具可以更细致地表示不精确数据。定义了操作这些集的关键操作,包括补集、限制集和扩展集。多Q立方双极性模糊软集的适用性扩展到各个领域,包括多标准决策和问题解决。举例说明证明了这一创新概念的实用性。
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Multi-Q Cubic Bipolar Fuzzy Soft Sets and Cosine Similarity Methods for Multi-Criteria Decision Making
This study introduces a novel mathematical tool for representing imprecise and ambiguous data: the multi-q cubic bipolar fuzzy soft set. Building upon established bipolar fuzzy sets and soft sets, this paper fist defines the concept of multi-q cubic bipolar fuzzy sets and their fundamental properties. Mathematical operations such as complement, union, and intersection are then developed for these sets. The core contribution lies in the introduction of multi-q cubic bipolar fuzzy soft sets. This new tool allows for a more nuanced representation of imprecise data compared to existing approaches. Key operations for manipulating these sets, including complement, restriction, and expansion, are defined. The applicability of multi-q cubic bipolar fuzzy soft sets extends to various domains, including multi-criteria decision making and problem solving. Illustrative examples demonstrate the practical utility of this innovative concept.
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