This article discusses the theory of intuitionistic fuzzy numbers and how to use priority degrees to establish operators in multicriteria decision-making problems. The study highlights the superiority of the provided work over other methods and thoroughly investigates the impact of priority degrees on the results.
In practise, intuitionistic fuzzy numbers (IFNs) are particularly useful for describing ambiguous data. We look at multicriteria decision-making (MCDM) problems with a prioritising relationship between the parameters. The concept of a priority degree is presented. The aggregation operators (AOs) are formed by assigning nonnegative real numbers to stringent priority levels, known as priority degrees. As a result, we construct intuitionistic fuzzy prioritized averaging operator with priority degrees and intuitionistic fuzzy prioritized geometric operator with priority degrees, which are both prioritized operators. The attributes of the existing method are frequently compared to those of other current approaches, stressing the superiority of the provided work over other methods now in use. In addition, the impact of priority degrees on the overall result is thoroughly investigated. Furthermore, in the intuitionistic fuzzy set (IFS) context, a decision-making strategy is proposed based on these operators. To highlight the efficacy of the proposed approach, an illustrative example relating to the selection of the best choice is considered.
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