Probabilistic hesitant bipolar fuzzy Hamacher prioritized aggregation operators and their application in multi-criteria group decision-making

• Published in: Computational & applied mathematics Vol. 42; no. 6
• Main Author: Ali, Jawad
• Format: Journal Article
• Language: English
• Published: Cham Springer International Publishing 01.09.2023; Springer Nature B.V
• Subjects: Applications of Mathematics; Applied physics; Computational mathematics; Computational Mathematics and Numerical Analysis; Decision making; Fuzzy sets; Mathematical Applications in Computer Science; Mathematical Applications in the Physical Sciences; Mathematics; Mathematics and Statistics; Multiple criterion; Operators (mathematics); Prioritized operators; 03E72; MCGDM; Dual hesitant bipolar fuzzy sets; 68T30; 90B50; Probabilistic hesitant bipolar fuzzy sets; Hamacher operations
• ISSN: 2238-3603; 1807-0302
• DOI: 10.1007/s40314-023-02387-7

As a generalized fuzzy set, the dual hesitant bipolar fuzzy set (DHBFS) has received considerable attention and has recently become a widespread topic. The DHBFSs can reflect the disagreement and hesitancy of decision-makers flexibly and conveniently. However, we find that in DHBFS, all elements are endowed with the same importance, which indicates that multiple occurrence and appearance of some elements is neglected, which is evidently impractical. To circumvent this issue, this article aims to originate a new fuzzy tool, namely the probabilistic hesitant bipolar fuzzy set (PHBFS), which takes into account not only different grades of membership and negative membership but also their probabilistic data. Further, we outline some basic concepts, including score function, accuracy degree, normalization, comparison rule, and basic operations for PHBFS. Besides, we formulate some aggregation operators for aggregating probabilistic hesitant bipolar fuzzy information, including probabilistic hesitant bipolar fuzzy Hamacher prioritized average operator, probabilistic hesitant bipolar fuzzy Hamacher prioritized geometric operator and their weighted forms. Several special cases of these propound operators are also outlined. Based on these foundations, we develop a multi-criteria group decision-making method to cope with probabilistic hesitant bipolar fuzzy information-based problems. The proposed methodology is more reasonable for getting a better selection result and can overcome the disadvantage of information loss. At last, the proposed method is employed in the decision-making case related to recruiting foreign faculty members, and its practicality and effectiveness are verified.