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Exponential membership function and duality gaps for I-fuzzy linear programming problems | ||
| Iranian Journal of Fuzzy Systems | ||
| مقاله 13، دوره 16، شماره 2، خرداد و تیر 2019، صفحه 147-163 اصل مقاله (1.33 MB) | ||
| نوع مقاله: Original Manuscript | ||
| شناسه دیجیتال (DOI): 10.22111/ijfs.2019.4549 | ||
| نویسندگان | ||
Indira P. Debnath  1؛ S. K. Gupta2
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| 1Indian Institute of Technology Roorkee | ||
| 2Indian Institute of Technology, Roorkee | ||
| چکیده | ||
| Fuzziness is ever presented in real life decision making problems. In this paper, we adapt the pessimistic approach to study a pair of linear primal-dual problem under intuitionistic fuzzy (I-fuzzy) environment and prove certain duality results. We generate the duality results using exponential membership and non-membership functions to represent the decision maker’s satisfaction and dissatisfaction level. Further, two numerical examples have been given. In each of these illustrations, varying the values of the shape variables in the exponential membership functions, various nonlinear optimization problems have been constructed, analyzed and solved. The duality gaps for all these optimization problems have been computed and compared with the duality gap under the linear membership function. We found that these gaps for the I-fuzzy linear primal-dual pair under the exponential membership functions are smaller as compared with the linear membership functions. The main advantage of using the exponential membership function is that it has the flexibility of altering the values of the shape parameters (as per the decision-maker’s satisfaction). Finally, with the help of a suitable ranking defuzzification function, we have extended our approach to the I-fuzzy linear problem with fuzzy parameters and fuzzy constraints. | ||
| کلیدواژهها | ||
| Fuzzy optimization؛ Intuitionistic fuzzy set (I-fuzzy set)؛ Primal-dual problems؛ Fuzzy duality theorems؛ Duality gaps | ||
| مراجع | ||
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[1] A. Aggarwal, D. Dubey, S. Chandra, A. Mehra, Application of Atanassovs I-fuzzy set theory to matrix games with fuzzy goals and fuzzy payoffs, Fuzzy Information and Engineering, 4 (2012), 401-414. [2] A. Aggarwal, A. Mehra, S. Chandra, Application of linear programming with I-fuzzy sets to matrix games with I-fuzzy goals, Fuzzy Optimization and Decision Making, 11 (2012), 465-480. [3] P. P. Angelov, Optimization in an intuitionistic fuzzy environment, Fuzzy Sets and Systems, 86 (1997), 299-306. [4] K. T. Atanassov, Intuitionistic fuzzy sets, Fuzzy Sets and Systems, 20 (1986), 87-96. [5] K. T. Atanassov, G. Pasi, R. R. Yager, Intuitionistic fuzzy interpretation of multi-criteria, multi-person and multimeasurement tool decision making, International Journal of Systems Science, 36(14) (2007), 859-868. [6] C. R. Bector, S. Chandra, On duality in linear programming under fuzzy environment, Fuzzy Sets and Systems, 125(3) (2002), 317-325. [7] C. R. Bector, S. Chandra, Fuzzy mathematical programming and fuzzy matrix games, Springer, Berlin, Heidelberg, 169 (2005), 1-235. [8] C. R. Bector, S. Chandra, V. Vijay, Matrix games with fuzzy goals and fuzzy linear programming duality, Fuzzy Optimization and Decision Making, 3(3) (2004), 255-269. [9] C. R. Bector, S. Chandra, V. Vijay, Duality in linear programming with fuzzy parameters and matrix games with fuzzy pay-offs, Fuzzy Sets and Systems, 146(2) (2004), 253-269. [10] R. E. Bellman, L. A. Zadeh, Decision-making in a fuzzy environment, Management Science, 17(4) (1970), 141-164. [11] G. Deschrijver, E. E. Keree, On the position of intuitionistic fuzzy set theory in the framework in the theories of modeling imprecision, Information Sciences, 177 (2007), 1860-1866. [12] D. Dubey, S. Chandra, A. Mehra, Fuzzy linear programming under interval uncertainity based on IFS representation, Fuzzy Sets and Systems, 188 (2012), 68-87. [13] P. Gupta, M. K. Mehlawat, Bector-Chandra type duality in fuzzy linear programming with exponential membership functions, Fuzzy Sets and Systems, 160 (2009), 3290-3308. [14] H. Hamacher, H. Leberling, H. J. Zimmermann, Sensitivity analysis in fuzzy linear programming, Fuzzy Sets and Systems, 1(4) (1978), 269-281. [15] L. V. Kantrovich, Mathematical methods of organizing and planing production, Management Science, 6 (1960), 366-422. [16] W. Liu, H. Liao, A bibliometric analysis of fuzzy decision research during 1970-2015, International Journal of Fuzzy Systems, 19(1) (2017), 1-14. [17] Y. J. Liu, Y. Shi, Y. H. Liu, Duality of fuzzy MC2 linear programming: a constructive approach, Journal of Mathematical Analysis and Applications, 194(2) (1995), 389-413. [18] J. Ramik, M. Vlach, Intuitionistic fuzzy linear programming and duality: a level sets approach, Fuzzy Optimization and Decision Making, 15(4) (2016), 457-489. [19] W. Rodder, H. J. Zimmermann, Duality in fuzzy linear programming in: A.V. Fiacco, K.O. Kortanek (Eds.), Extremal Methods and System Analysis, Springer, Berlin, Heidelberg, 174 (1980), 415-427. [20] M. R. Safi, H. R. Maleki, E. Zaeimazad, A note on the Zimmermann Method for solving fuzzy linear programming, Iranian Journal of Fuzzy Systems, 4(2) (2007), 31-45. [21] M. R. Safi, H. R. Maleki, E. Zaeimazad, A Geometric approach for solving fuzzy linear programming, Fuzzy Optimization and Decision Making, 4 (2007), 315-336. [22] M. R. Safi, A. Razmjoo, Illustrating the difficulties of Zimmermann Method for solving fuzzy linear programming by the Geometric approach, Proceedings of the 4th International Joint Conference on Computational Intelligence and Fuzzy Computation Theory and Application, ScitePress, 5-7 October, Barcelona, Spain, (2012), 435-438. [23] Z. Xu, H. Liao, A survey of approaches to decision making with intuitionistic fuzzy preference relations, Knowledge-Based Systems, 80 (2015), 131-142. [24] R. R. Yager, A procedure for ordering fuzzy subsets of the unit interval, Information Sciences, 24(2) (1981), 143-161. [25] D. Yu, H. Liao, Visualization and quantitative research on intuitionistic fuzzy studies, Journal of Intelligent & Fuzzy Systems , 30 (2016), 3653-3663. [26] L. A. Zadeh, Fuzzy sets, Information and Control, 8 (1965), 338-353. [27] H. J. Zimmermann, Description and optimization of fuzzy systems, International Journal of General Systems, 2 (1975), 209-215. [28] H. J. Zimmermann, Fuzzy set theory and its applications, Fourth edition, Kluwer Academic Publishers, Dordrecht, 2001. | ||
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