Some induced generalized Einstein aggregating operators and their application to group decision-making problem using intuitionistic fuzzy numbers

Document Type : Original Article

Authors

1 Hazara University Mansehra

2 Department of Mathematics and Statistics, Riphah International University, Islamabad, Pakistan

3 Department of Mathematics, Abdul Wali Khan University, Mardan, Pakistan

Abstract

The paper aims to develop an idea of some inducing operators, namely induced intuitionistic fuzzy Einstein hybrid averaging operator, induced intuitionistic fuzzy Einstein hybrid geometric operator, induced generalized intuitionistic fuzzy Einstein hybrid averaging operator and induced generalized intuitionistic fuzzy Einstein hybrid geometric operator along with their wanted structure properties such as, monotonicity, idempotency and boundedness. The proposed operators are competent and able to reflect the complex attitudinal character of the decision maker by using order inducing variables and deliver more information to experts for decision-making. To show the legitimacy, practicality and effectiveness of the new operators, the proposed operators have been applied to decision making problems

Keywords

References

Zadeh, L. A. (1965). Fuzzy sets. Information and control8(3), 338-353.
Atanassov, K.T. (1986). Intuitionistic fuzzy sets. Fuzzy Sets Syst. 20(1), 87–96.
Atanassov, K. T. (1989). More on intuitionistic fuzzy sets. Fuzzy sets and systems33(1), 37-45.
Garg, H. (2020). Exponential operational laws and new aggregation operators for intuitionistic multiplicative set in multiple-attribute group decision making process. Information Sciences.
Garg, H., Arora, R. (2019). Generalized intuitionistic fuzzy soft power aggregation operator based on t‐norm and their application in multicriteria decision‐making. International Journal of Intelligent Systems34(2), 215-246.
Garg, H., Kumar, K. (2020). A novel possibility measure to interval-valued intuitionistic fuzzy set using connection number of set pair analysis and its applications. Neural Computing and Applications32(8), 3337-3348.
Xu, Z. S. (2007). Models for multiple attribute decision making with intuitionistic fuzzy information. International Journal of Uncertainty, Fuzziness and Knowledge-Based Systems15(03), 285-297.
Yu, D., Wu, Y., Lu, T. (2012). Interval-valued intuitionistic fuzzy prioritized operators and their application in group decision making. Knowledge-Based Systems30, 57-66.
Bustince, H., Burillo, P. (1995). Correlation of interval-valued intuitionistic fuzzy sets. Fuzzy sets and systems74(2), 237-244.
Xu, Z., Xia, M. (2011). Induced generalized intuitionistic fuzzy operators. Knowledge-Based Systems24(2), 197-209.
Tan, C. (2011). Generalized intuitionistic fuzzy geometric aggregation operator and its application to multi-criteria group decision making. Soft Computing15(5), 867-876.
Xia, M., Xu, Z. (2010). Some new similarity measures for intuitionistic fuzzy values and their application in group decision making. Journal of Systems Science and Systems Engineering19(4), 430-452.
Li, D. F. (2011). The GOWA operator based approach to multiattribute decision making using intuitionistic fuzzy sets. Mathematical and Computer Modelling53(5-6), 1182-1196.
Wei, G. W. (2008). Maximizing deviation method for multiple attribute decision making in intuitionistic fuzzy setting. Knowledge-Based Systems21(8), 833-836.
Wei, G. W. (2010). GRA method for multiple attribute decision making with incomplete weight information in intuitionistic fuzzy setting. Knowledge-Based Systems23(3), 243-247.
Wei, G. W. (2011). Gray relational analysis method for intuitionistic fuzzy multiple attribute decision making. Expert systems with Applications38(9), 11671-11677.
Wei, G., Zhao, X. (2011). Minimum deviation models for multiple attribute decision making in intuitionistic fuzzy setting. International Journal of Computational Intelligence Systems4(2), 174-183.
Wei, G. W., Wang, H. J., Lin, R. (2011). Application of correlation coefficient to interval-valued intuitionistic fuzzy multiple attribute decision-making with incomplete weight information. Knowledge and Information Systems26(2), 337-349.
Grzegorzewski, P. (2004). Distances between intuitionistic fuzzy sets and/or interval-valued fuzzy sets based on the Hausdorff metric. Fuzzy sets and systems148(2), 319-328.
Yager, R. R. (2009). Some aspects of intuitionistic fuzzy sets. Fuzzy Optimization and Decision Making8(1), 67-90.
Ye, J. (2010). Fuzzy decision-making method based on the weighted correlation coefficient under intuitionistic fuzzy environment. European Journal of Operational Research205(1), 202-204.
Ye, J. (2011). Fuzzy cross entropy of interval-valued intuitionistic fuzzy sets and its optimal decision-making method based on the weights of alternatives. Expert Systems with Applications38(5), 6179-6183.
Garg, H. (2016). Generalized intuitionistic fuzzy interactive geometric interaction operators using Einstein t-norm and t-conorm and their application to decision making. Computers & Industrial Engineering101, 53-69.
Garg, H. (2019). Intuitionistic fuzzy Hamacher aggregation operators with entropy weight and their applications to multicriteria decision-making problems. Iranian Journal of Science and Technology - Transactions of Electrical Engineering, 597-613.
Garg, H., Kumar, K. (2019). Power geometric aggregation operators based on connection number of set pair analysis under intuitionistic fuzzy environment, Arabian Journal for Science and Engineering.
Garg, H., Kumar, K. (2018). A novel correlation coefficient of intuitionistic fuzzy sets based on the connection number of set pair analysis and its application. Scientia Iranica. Transaction E, Industrial Engineering25(4), 2373-2388.
Garg, H., Rani, D. (2019). Generalized Geometric Aggregation Operators Based on T-Norm Operations for Complex Intuitionistic Fuzzy Sets and Their Application to Decision-making. Cognitive Computation, 1-20.
Xu, Z. (2007). Intuitionistic fuzzy aggregation operators. IEEE Transactions on fuzzy systems15(6), 1179-1187.
Xu, Z., Yager, R. R. (2006). Some geometric aggregation operators based on intuitionistic fuzzy sets. International journal of general systems35(4), 417-433.
Xu, Z. (2011). Approaches to multiple attribute group decision making based on intuitionistic fuzzy power aggregation operators. Knowledge-Based Systems24(6), 749-760.
Wang, W., Liu, X. (2011). Intuitionistic fuzzy geometric aggregation operators based on Einstein operations. International Journal of Intelligent Systems26(11), 1049-1075.
Wang, W., Liu, X. (2012). Intuitionistic fuzzy information aggregation using Einstein operations. IEEE Transactions on Fuzzy Systems20(5), 923-938.
Zhao, X., Wei, G. (2013). Some intuitionistic fuzzy Einstein hybrid aggregation operators and their application to multiple attribute decision making. Knowledge-Based Systems37, 472-479.
Zhao, H., Xu, Z., Ni, M., Liu, S. (2010). Generalized aggregation operators for intuitionistic fuzzy sets. International journal of intelligent systems25(1), 1-30.
Wei, G. (2010). Some induced geometric aggregation operators with intuitionistic fuzzy information and their application to group decision making. Applied soft computing10(2), 423-431.
Yu, X., Xu, Z. (2013). Prioritized intuitionistic fuzzy aggregation operators. Information Fusion14(1), 108-116.
Su, Z. X., Xia, G. P., Chen, M. Y. (2011). Some induced intuitionistic fuzzy aggregation operators applied to multi-attribute group decision making. International Journal of General Systems40(8), 805-835.
Xu, Y., Li, Y., Wang, H. (2013). The induced intuitionistic fuzzy Einstein aggregation and its application in group decision-making. Journal of Industrial and Production Engineering30(1), 2-14.
Rahman, K., Abdullah, S., Jamil, M., Khan, M. Y. (2018). Some generalized intuitionistic fuzzy Einstein hybrid aggregation operators and their application to multiple attribute group decision making. International Journal of Fuzzy Systems20(5), 1567-1575.
Rahman, K., Ayub, S., Abdullah, S. (2020). Generalized intuitionistic fuzzy aggregation operators based on confidence levels for group decision making. Granular Computing, 1-20.
Jamil, M., Rahman, K., Abdullah, S., Khan, M. Y. (2020). The induced generalized interval-valued intuitionistic fuzzy einstein hybrid geometric aggregation operator and their application to group decision-making. Journal of Intelligent & Fuzzy Systems, (Preprint), 1-16.
Annals of Optimization Theory and Practice
Volume 3, Issue 3
December 2020
Pages 15-49

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