Multi-attribute decision making method using advanced Pythagorean fuzzy weighted geometric operator and their applications for real estate company selection
- PMID: 34195440
- PMCID: PMC8239473
- DOI: 10.1016/j.heliyon.2021.e07340
Multi-attribute decision making method using advanced Pythagorean fuzzy weighted geometric operator and their applications for real estate company selection
Abstract
In this paper, a novel multi-attribute decision-making method using Advanced Pythagorean fuzzy weighted geometric operator in a Pythagorean fuzzy environment is developed. Pythagorean fuzzy aggregation operators have drawbacks that they give indeterminate results in some special cases when membership value or non-membership value gets 0 value or 1 value and the weight vector is of type or . The Advanced Pythagorean fuzzy geometric operator, the proposed operator can overcome the drawbacks. In some situations, for example, where the sum of squares of membership degree and non-membership degree gets unit value of a Pythagorean fuzzy number, multi-attribute decision making (MADM) methods using some existing aggregation operators give unreasonable ranking orders (ROs) of alternatives or can't discriminate the ROs of alternatives. But the present MADM method can get over the drawbacks of the existing MADM methods. The present MADM method is devoted to eliminate the drawbacks of the existing MADM methods and to select the best real estate company for investment.
Keywords: Advanced Pythagorean fuzzy weighted geometric operator; Multi-attribute decision making; Pythagorean fuzzy number; Pythagorean fuzzy set.
© 2021 Published by Elsevier Ltd.
Conflict of interest statement
The authors declare no conflict of interest.
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References
-
- Zadeh L.A. Fuzzy sets. Inf. Control. 1965;8(3):338–353.
-
- Atanassov K.T. vol. 283. Springer-Verlag; Berlin Heidelberg: 1999. On Intuitionistic Fuzzy Sets Theory; pp. 1–137. (Studies in Fuzziness and Soft Computing).
-
- Yager R.R., Abbasov A.M. Pythagorean membership grades, complex numbers and decision making. Int. J. Intell. Syst. 2013;28(5):436–452.
-
- Xu Z., Zhang X. Hesitant fuzzy multi-attribute decision making based on TOPSIS with incomplete weight information. Knowl.-Based Syst. 2013;52:53–64.
-
- Zulueta-Veliz Y., García-Cabrera L. A Choquet integral-based approach to multiattribute decision-making with correlated periods. Granul. Comput. 2018;3(3):245–256.
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