Approximations of Intuitionistic Fuzzy Ideals over Dual Spaces by Soft Binary Relations
Copyright policy )Approximations of Intuitionistic Fuzzy Ideals over Dual Spaces by Soft Binary Relations
The major advantage of this proposed work is to investigate roughness of intuitionistic fuzzy subsemigroups (RIFSs) by using soft relations. In this way, two sets of intuitionistic fuzzy (IF) soft subsemigroups, named lower approximation and upper approximation regarding aftersets and foresets, have been introduced. In RIFSs, incomplete and insufficient information is handled in decision-making problems like symptom diagnosis in medical science. In addition, this new technique is more effective as compared to the previous literature because we use intuitionistic fuzzy set (IFS) instead of fuzzy set (FS). Since the FS describes the membership degree only but often in real-world problems, we need the description of nonmembership degree. That is why an IFS is a more useful set due to its nonmembership degree and hesitation degree. The above technique is applied for left (right) ideals, interior ideals, and bi-ideals in the same manner as described for subsemigroups.
- University of Gujrat Pakistan
- Quaid-i-Azam University Pakistan
- King Khalid University Saudi Arabia
Rough Sets Theory and Applications, Artificial intelligence, Fuzzy Rough Sets, Social Sciences, Set (abstract data type), Management Science and Operations Research, Decision Sciences, Soft set, Fuzzy Logic, Fuzzy Logic and Residuated Lattices, QA1-939, FOS: Mathematics, Degree (music), Algebra over a field, Ideal theory for semigroups, Arithmetic, Dual (grammatical number), Physics, Application of Soft Set Theory in Decision Making, Pure mathematics, Fuzzy groups, Linguistics, Acoustics, Discrete mathematics, Computer science, FOS: Philosophy, ethics and religion, Programming language, Fuzzy logic, Philosophy, Computational Theory and Mathematics, Fuzzy Sets, Interval-Valued Fuzzy Sets, Rough set, Computer Science, Physical Sciences, Soft Set Theory, Fuzzy set, FOS: Languages and literature, Binary number, Mathematics
Rough Sets Theory and Applications, Artificial intelligence, Fuzzy Rough Sets, Social Sciences, Set (abstract data type), Management Science and Operations Research, Decision Sciences, Soft set, Fuzzy Logic, Fuzzy Logic and Residuated Lattices, QA1-939, FOS: Mathematics, Degree (music), Algebra over a field, Ideal theory for semigroups, Arithmetic, Dual (grammatical number), Physics, Application of Soft Set Theory in Decision Making, Pure mathematics, Fuzzy groups, Linguistics, Acoustics, Discrete mathematics, Computer science, FOS: Philosophy, ethics and religion, Programming language, Fuzzy logic, Philosophy, Computational Theory and Mathematics, Fuzzy Sets, Interval-Valued Fuzzy Sets, Rough set, Computer Science, Physical Sciences, Soft Set Theory, Fuzzy set, FOS: Languages and literature, Binary number, Mathematics
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