Higher-order Mond-Weir duality of set-valued fractional minimax programming problems

Authors

DOI:

https://doi.org/10.2298/YJOR231215046D

Keywords:

Contingent epiderivative, convex cone, arcwisely connectivity, duality, set valued map

Abstract

In this paper, we consider a set-valued fractional minimax programming problem (abbreviated as SVFMPP) (MFP), in which both the objective and constraint maps are set-valued. We use the concept of higher-order α-cone arcwisely connectivity, introduced by Das [1], as a generalization of higher-order cone arcwisely connected set-valued maps. We explore the higher-order Mond-Weir (MWD) form of duality based on the supposition of higher-order α-cone arcwisely connectivity and prove the associated higher-order converse, strong, and weak theorems of duality between the primary (MFP) and the analogous dual problem (MWD).

References

K. Das, “Set-valued parametric optimization problems with higher-order ρ-cone arcwise connectedness,” SeMA Journal, pp. 1-19, 2024. doi: 10.1007/s40324-023-00344-2

S. R. Yadav and R. N. Mukherjee, “Duality for fractional minimax programming problems,” Journal of the Australian Mathematical Society (Series B), vol. 31, no. 4, pp. 484-492, 1990. doi: 10.1017/S0334270000006809

S. Chandra and V. Kumar, “Duality in fractional minimax programming,” Journal of the Australian Mathematical Society (Series A), vol. 58, no. 3, pp. 376-386, 1995. doi: 10.1017/S1446788700038362

T.Weir, “Pseudoconvex minimax programming,” Utilitas Mathematica, vol. 42, pp. 234-240, 1992.

C. R. Bector and B. L. Bhatia, “Sufficient optimality conditions and duality for a minmax problem,” Utilitas Mathematica, vol. 27, pp. 229-247, 1985.

G. J. Zalmai, “Optimality criteria and duality for a class of minimax programming problems with generalized invexity conditions,” Utilitas Mathematica, vol. 32, pp. 35-57, 1987.

J. C. Liu and C. S. Wu, “On minimax fractional optimality conditions with (F,ρ)-convexity,” Journal of Mathematical Analysis and Applications, vol. 219, no. 1, pp. 36-51, 1998. doi: 10.1006/jmaa.1997.5785

I. Ahmad, “Optimality conditions and duality in fractional minimax programming involving generalized ρ-invexity,” Journal of Management Information Systems, vol. 19, pp. 165-180, 2003.

Z. A. Liang and Z. W. Shi, “Optimality conditions and duality for minimax fractional programming with generalized convexity,” Journal of Mathematical Analysis and Applications, vol. 277, no. 2, pp. 474-488, 2003. doi: 10.1016/S0022-247X(02)00553-X

H. C. Lai, J. C. Liu, and K. Tanaka, “Necessary and sufficient conditions for minimax fractional programming,” Journal of Mathematical Analysis and Applications, vol. 230, no. 2, pp. 311-328, 1999. doi: 10.1006/jmaa.1998.6204

H. C. Lai and J. C. Lee, “On duality theorems for nondifferentiable minimax fractional programming,” Journal of Computational and Applied Mathematics, vol. 146, no. 1, pp. 115-126, 2002. doi: 10.1016/S0377-0427(02)00422-3

I. Ahmad and Z. Husain, “Optimality conditions and duality in nondifferentiable minimax fractional programming with generalized convexity,” Journal of Optimization Theory and Applications, vol. 129, no. 2, pp. 255-275, 2006. doi: 10.1007/s10957-006-9057-0

S. J. Li, K. L. Teo, and X. Q. Yang, “Higher-order Mond-Weir duality for set-valued optimization,” Journal of Computational and Applied Mathematics, vol. 217, no. 2, pp. 339-349, 2008. doi: 10.1016/j.cam.2007.02.011

--, “Higher-order optimality conditions for set-valued optimization,” Journal of Optimization Theory and Applications, vol. 137, no. 3, pp. 533-553, 2008. doi: 10.1007/s10957-007- 9345-3

M. Avriel, Nonlinear Programming: Theory and Method. Englewood Cliffs, New Jersey: Prentice-Hall, 1976.

J. Y. Fu and Y. H. Wang, “Arcwise connected cone-convex functions and mathematical programming,” Journal of Optimization Theory and Applications, vol. 118, no. 2, pp. 339-352, 2003. doi: 10.1023/A:1025451422581

C. S. Lalitha, J. Dutta, and M. G. Govil, “Optimality criteria in set-valued optimization,” Journal of the Australian Mathematical Society, vol. 75, no. 2, pp. 221-232, 2003. doi: 10.1017/S1446788700003736

K. Das and C. Nahak, “Sufficiency and duality of set-valued optimization problems via higherorder contingent derivative,” Journal of Advanced Mathematical Studies, vol. 8, no. 1, pp. 137-151, 2015.

J. P. Aubin, Contingent Derivatives of Set-Valued Maps and Existence of Solutions to Nonlinear Inclusions and Differential Inclusions. Paris: Université Paris IX-Dauphine, Centre de recherche de mathématiques de la décision, 1980.

J. P. Aubin and H. Frankowska, Set-Valued Analysis. Boston: Birhäuser, 1990.

J. Jahn and R. Rauh, “Contingent epiderivatives and set-valued optimization,” Mathematical Methods of Operations Research, vol. 46, no. 2, pp. 193-211, 1997. doi: 10.1007/BF01217690

S. J. Li and C. R. Chen, “Higher order optimality conditions for Henig efficient solutions in set-valued optimization,” Journal of Mathematical Analysis and Applications, vol. 323, no. 2, pp. 1184-1200, 2006. doi: 10.1016/j.jmaa.2005.11.035

J. Borwein, “Multivalued convexity and optimization: a unified approach to inequality and equality constraints,” Mathematical Programming, vol. 13, no. 1, pp. 183-199, 1977. doi: 10.1007/BF01584336

P. Q. Khanh and N. M. Tung, “Optimality conditions and duality for nonsmooth vector equilibrium problems with constraints,” Optimization, vol. 64, no. 7, pp. 1547-1575, 2014. doi: 10.1080/02331934.2014.886036

K. Das, S. Treanta, and M. B. Khan, “Set-valued fractional programming problems with σ-arcwisely connectivity,” AIMS Mathematics, vol. 8, no. 6, pp. 13 181-13 204, 2023. doi: 10.3934/math.2023666

H. W. Corley, “Existence and Lagrangian duality for maximizations of set-valued functions,” Journal of Optimization Theory and Applications, vol. 54, no. 3, pp. 489-501, 1987. doi: 10.1007/BF00940198

K. Das, “Sufficiency and duality of set-valued fractional programming problems via secondorder contingent epiderivative,” Yugoslav Journal of Operations Research, vol. 32, no. 2, pp. 167-188, 2022. doi: 10.2298/YJOR210218019D

K. Das and C. Nahak, “Set-valued optimization problems via second-order contingent epiderivative,” Yugoslav Journal of Operations Research, vol. 31, no. 1, pp. 75-94, 2021. doi: 10.2298/YJOR191215041D

N. Pokharna and I. P. Tripathi, “Optimality and duality for E-minimax fractional programming: application to multiobjective optimization,” Journal of Applied Mathematics and Computing, vol. 69, no. 3, pp. 2361-2388, 2023. doi: 10.1007/s12190-023-01838-y

K. Das and C. Nahak, “Optimality conditions for set-valued minimax fractional programming problems,” SeMA Journal, vol. 77, no. 2, pp. 161-179, 2020. doi: 10.1007/s40324-019-00209- 7

K. Das, S. Treanta, and T. Saeed, “Mond-Weir andWolfe duality of set-valued fractional minimax problems in terms of contingent epi-derivative of second-order,” Mathematics, vol. 10, no. 6:938, pp. 1-21, 2022. doi: 10.3390/math10060938

K. Das, “Set-valued minimax fractional programming problems under ρ-cone arcwise connectedness,” Control & Cybernetics, vol. 51, no. 1, pp. 43-69, 2022. doi: 10.2478/candc- 2022-0004

Downloads

Published

2025-11-01

How to Cite

Das, K. (2025). Higher-order Mond-Weir duality of set-valued fractional minimax programming problems. Yugoslav Journal of Operations Research, 35(4), 749–774. https://doi.org/10.2298/YJOR231215046D

Issue

Vol. 35 No. 4 (2025)

Section

Research Articles

License

Copyright (c) YUJOR

Creative Commons License

This work is licensed under a Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 International License.