Abstract
The study presents a novel conception of aggregation operators (AOs) based on bipolar neutrosophic sets by using Hamacher operations and their application in modeling real-life multicriteria decision-making problems. The neutrosophic set represents incomplete, inconsistent, and indeterminate information effectively. For better understanding in this paper, we have explained all essential definitions and their respective derived neutrosophic sets (NSs) and generalization bipolar neutrosophic sets (BNSs). The primary focus of our work is Hamacher aggregation operators like BN Hamacher weighted geometric (BNHWG), BN Hamacher ordered weighted geometric (BNHOWG), and BN Hamacher hybrid geometric (BNHHG) and their required properties. The proposed scheme provides decision-makers with a comprehensive view of the complexities and vagueness in multicriteria decision-making. As compared to existing methods, these techniques provide comprehensive, increasingly exact, and precise results. Finally, we applied different types of newly introduced AOs and numerical representation on a practical example to demonstrate the effectiveness of the proposed method. Our proposed model and its application have shown improved utility and applicability in the complex decision-making process.
Highlights
In the current modern age of community decision-making, data is frequently inadequate, imprecise, and incompatible
(i) The bipolar neutrosophic ordered weighted geometric (BNOWG) operator is equivalent to the BN Hamacher ordered weighted geometric (BNHOWG) operator if γ = 1: BNOWGνðu1, u2, ⋯, unÞ =
The aim of this paper is to investigate various bipolar neutrosophic sets (BNSs) aggregation operators (AOs) and apply Hamacher t-norms/t-conorms to multicriteria community decision-making, with BNS values as the criteria
Summary
In the current modern age of community decision-making, data is frequently inadequate, imprecise, and incompatible. Jamil and others [9, 19] develop aggregation operators (AOs) based on bipolar neutrosophic values along with application to group decision-making issues. (1) SVNSs make it easier to deal with uncertain details This set incorporates the generality of previous sets like classical set, FS, and IFS (2) Bipolar fuzzy sets are extremely useful for dealing with unpredictable real-world situations and are useful in dealing with both positive and negative membership values (3) The main and foremost intention of the current study include (a) suggesting various bipolar neutrosophic Hamacher AOs and their related properties to our study (b) based on BNN, establishing a multicriteria decisionmaking (MCDM) approach toward real-life problems (c) giving a descriptive numerical example of MCDM program.
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