Correlation coefficients of simplified neutrosophic multiplicative sets and their applications in clustering analysis

The use of fuzzy sets, intuitionistic fuzzy sets and neutrosophic sets can often handle with real-life problems that contain incomplete and uncertain information. The 0–1 scale is used to deal with such information which is graded symmetrically and uniformly but, some problems consist of unsymmetric...

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Bibliographic Details
Published inJournal of ambient intelligence and humanized computing Vol. 14; no. 4; pp. 3383 - 3404
Main Authors Köseoğlu, Ali, Şahin, Rıdvan
Format Journal Article
LanguageEnglish
Published Berlin/Heidelberg Springer Berlin Heidelberg 01.04.2023
Springer Nature B.V
Subjects
Algorithms
Artificial Intelligence
Cluster analysis
Clustering
Computational Intelligence
Correlation coefficients
Decision making
Diminishing marginal utility
Engineering
Fuzzy sets
Original Research
Robotics and Automation
User Interfaces and Human Computer Interaction
Variables
Clustering analysis
Simplified neutrosophic multiplicative set
Decision making
Correlation coefficients
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Summary:The use of fuzzy sets, intuitionistic fuzzy sets and neutrosophic sets can often handle with real-life problems that contain incomplete and uncertain information. The 0–1 scale is used to deal with such information which is graded symmetrically and uniformly but, some problems consist of unsymmetrical and non-uniform information. Although intuitionistic multiplicative set (IMS) is a powerful tool to deal with this kind of problems, due to the dependence of hesitant information to the membership and non-membership functions in IMS, it brings a restriction to decision-makers while working on the real-life problems such as applications of correlation coefficients and clustering. In this study, we propose novel correlation coefficients (CCs) of simplified neutrosophic multiplicative sets (SNMSs) which is defined recently by removing the shortages of IMSs. Firstly, we give SNMS-based operations, fulfil the deficiencies in the theoretical background of IMS and establish a theoretical structure for the SNMS. Then, we propose novel correlation coefficients (CC) of SNMS and show some of their important properties. Finally, we apply the CCs to a clustering problem to confirm the efficiency of the proposed SNMS and its correlation coefficients.
ISSN:1868-5137
1868-5145
DOI:10.1007/s12652-021-03475-4