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On Introduction to (q1, q2)‐Linear Diophantine Fuzzy Sets and Their Applications

Author

Listed:
  • Muhammad Bilal Khan
  • Adrian Marius Deaconu
  • Javad Tayyebi
  • Bandar Bin-Mohsin
  • Loredana Ciurdariu
  • Miguel Vivas Cortez
  • Nurnadiah Zamri

Abstract

The notion of parameter mappings is about creating and managing a structured relationship between parameters across different systems or processes. This concept is vital in ensuring that data remains consistent, correctly interpreted, and accurately transformed as it moves through different parts of a system or between different systems. In this paper, the concept of reference parameter mappings is introduced to handle reference parameters that will help the decision makers. To overcome the uncertainty by giving direct value to reference parameters without any rule, a new class of fuzzy sets is presented which is known as (q1, q2)‐linear Diophantine fuzzy set ((q1, q2)LDFS), where q1 and q2 are reference parameter mappings. Because the q1 and q2 can reflect a wider variety of reference parameters than LDFSs and q‐rung LDFSs, (q1, q2)LDFSs can provide more ambiguous conditions. There is symmetry in the values of both the membership grades function and the nonmembership grades function. Furthermore, when discussing the symmetry between two or more objects, the evolution of a ((q1, q2)LDFSs via q1 and q2 is more adaptable than the diffused concept of a q‐rung orthopair fuzzy sets or a LDFSs. The primary benefit of (q1, q2)LDFSs, which are useful in a variety of decision‐making situations, is that they are able to characterize a greater number of uncertainties with respect to reference parameter mappings q1 and q2 than LDFSs. Next, we propose several geometric and averaging operators for a (q1, q2) linear Diophantine fuzzy numbers, based on established operating rules. In the latter half of the paper, different ranking algorithms based on proposed aggregation operators are presented to address a realistic assessment of the patient’s high blood pressure conditions is conducted to demonstrate the viability and value of the suggested strategies.

Suggested Citation

  • Muhammad Bilal Khan & Adrian Marius Deaconu & Javad Tayyebi & Bandar Bin-Mohsin & Loredana Ciurdariu & Miguel Vivas Cortez & Nurnadiah Zamri, 2025. "On Introduction to (q1, q2)‐Linear Diophantine Fuzzy Sets and Their Applications," International Journal of Mathematics and Mathematical Sciences, John Wiley & Sons, vol. 2025(1).
  • Handle: RePEc:wly:jijmms:v:2025:y:2025:i:1:n:9965947
    DOI: 10.1155/ijmm/9965947
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    References listed on IDEAS

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    1. Tahir Mahmood & Izatmand & Zeeshan Ali & Kifayat Ullah & Qaisar Khan & Ahmed Alsanad & Mogeeb A. A. Mosleh & Abdel-Haleem Abdel-Aty, 2021. "Linear Diophantine Uncertain Linguistic Power Einstein Aggregation Operators and Their Applications to Multiattribute Decision Making," Complexity, Hindawi, vol. 2021, pages 1-25, August.
    2. Aiyared Iampan & Gustavo Santos García & Muhammad Riaz & Hafiz Muhammad Athar Farid & Ronnason Chinram & Basil Papadopoulos, 2021. "Linear Diophantine Fuzzy Einstein Aggregation Operators for Multi-Criteria Decision-Making Problems," Journal of Mathematics, Hindawi, vol. 2021, pages 1-31, July.
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