Group compatible intuitionistic fuzzy matrices

  • E. G. EmamEmail author


Let G be a finite group. We define in this paper what is called G-compatible intuitionistic fuzzy matrices and we prove some of their fundamental properties. Of course, these matrices are square (since G is finite). However, the first row of our matrices play an important role in this study. The set of all G-compatible intuitionistic fuzzy matrices is a commutative semiring with respect to the operations \(\vee \) and \(\circ \), respectively. Also, we study the G-Min-compatible intuitionistic fuzzy matrices and prove some of their properties. We have also provide some examples to clarify our notions and results.


Intuitionistic fuzzy matrices Fuzzy matrices Compatible fuzzy matrices 

Mathematics Subject Classification

15B15 15B33 



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© SBMAC - Sociedade Brasileira de Matemática Aplicada e Computacional 2019

Authors and Affiliations

  1. 1.Department of Mathematics, Faculty of ScienceZagazig UniversityZagazigEgypt

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