OPERATOR ⊞A and ⊠A ON INTUITIONISTIC FUZZY RING

  • Dian Pratama Universitas Nahdlatul Ulama Purwokerto

Abstract

Intuitionistic fuzzy sets is a sets that are characterized by membership and non-membership function which  sum is less than one. When applied to ring theory, it will called intuitionistic fuzzy rings. The fuzzy set operator is a mapping between the membership function and the interval [0,1]. In this study, we will describe properties of operator  and  in intuitionistic fuzzy rings. The characteristics that will be studied include the structure of  and  if A is an intuitive and fuzzy ring and vice versa.

Published
2020-08-23
How to Cite
PRATAMA, Dian. OPERATOR ⊞A and ⊠A ON INTUITIONISTIC FUZZY RING. Jurnal Ilmiah Matematika dan Pendidikan Matematika, [S.l.], v. 12, n. 1, p. 35-46, aug. 2020. ISSN 2550-0422. Available at: <http://jos.unsoed.ac.id/index.php/jmp/article/view/2613>. Date accessed: 27 nov. 2022. doi: https://doi.org/10.20884/1.jmp.2020.12.1.2613.

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