What is it about?
Spherical fuzzy sets are an advanced tool of three-dimensional membership functions which consist of membership, non-membership and hesitancy degrees. In this paper, it is introduced a new approach via proximal spaces for spherical fuzzy sets. To do this, the spherical fuzzy proximity axioms are defined on proximal relator spaces. Also, spherical fuzzy spatial Lodato proximity relation is studied. By using spherical fuzzy proximity relation, it is defined that descriptive proximity relation. An example is given how people are proximal(near) to each other via their description features.
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Why is it important?
In this paper, it is introduced a new approach via proximal spaces for spherical fuzzy sets. To do this, the spherical fuzzy proximity axioms are defined on proximal relator spaces. Also, spherical fuzzy spatial Lodato proximity relation is studied. By using spherical fuzzy proximity relation, it is defined that descriptive proximity relation. An example is given how people are proximal(near) to each other via their description features.
Perspectives
Writing this article was a great pleasure for me. This article also lead to show how people can be near (proximal) without having distance.
Özlem Tekin
Adiyaman Universitesi
Read the Original
This page is a summary of: An approach for spherical fuzzy relations via relator spaces, Journal of Intelligent & Fuzzy Systems Applications in Engineering and Technology, October 2023, IOS Press,
DOI: 10.3233/jifs-230314.
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