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带不等式约束的DC型切向凸优化问题的混合型对偶
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Abstract:
本文研究了带不等式约束的DC型切向凸优化问题的混合型对偶。首先利用约束规范条件建立了混合型对偶模型。其次,利用伪凸函数的性质建立了带不等式约束的DC型切向凸优化问题的弱对偶定理、强对偶定理和逆对偶定理。并且推广了前人已有的结论。
In this paper, we study mixed-type duality for DC-type tangentially convex optimization problems with inequality constraints. Firstly, we introduce constraint qualification conditions to establish a mixed-type dual model. Subsequently, leveraging properties of pseudoconvex functions, we derive weak duality, strong duality, and converse duality theorems for the proposed optimization problem. Furthermore, our results generalize and extend existing conclusions from prior studies.
| [1] | Boţ, R.I., Grad, S. and Wanka, G. (2008) On Strong and Total Lagrange Duality for Convex Optimization Problems. Journal of Mathematical Analysis and Applications, 337, 1315-1325. https://doi.org/10.1016/j.jmaa.2007.04.071 |
| [2] | Fang, D., Luo, X. and Wang, X. (2014) Strong and Total Lagrange Dualities for Quasiconvex Programming. Journal of Applied Mathematics, 2014, 1-8. https://doi.org/10.1155/2014/453912 |
| [3] | Wang, M., Fang, D. and Chen, Z. (2015) Strong and Total Fenchel Dualities for Robust Convex Optimization Problems. Journal of Inequalities and Applications, 2015, Article No. 70. https://doi.org/10.1186/s13660-015-0592-9 |
| [4] | Dinh, N. and Son, T.Q. (2007) Approximate Optimality Conditions and Duality for Convex Infinite Programming Problems. Science and Technology Development Journal, 12, 29-38. |
| [5] | Fajardo, M.D. and Vidal, J. (2016) Stable Strong Fenchel and Lagrange Duality for Evenly Convex Optimization Problems. Optimization, 65, 1675-1691. https://doi.org/10.1080/02331934.2016.1167207 |
| [6] | Bector, C.R., Chandra, S. and Abha, (2001) On Mixed Duality in Mathematical Programming. Journal of Mathematical Analysis and Applications, 259, 346-356. https://doi.org/10.1006/jmaa.2001.7518 |
| [7] | Boţ, R.I. and Grad, S. (2010) Wolfe Duality and Mond-Weir Duality via Perturbations. Nonlinear Analysis: Theory, Methods & Applications, 73, 374-384. https://doi.org/10.1016/j.na.2010.03.026 |
| [8] | Yang, X.M., Yang, X.Q. and Teo, K.L. (2005) Mixed Type Converse Duality in Multiobjective Programming Problems. Journal of Mathematical Analysis and Applications, 304, 394-398. https://doi.org/10.1016/j.jmaa.2004.09.031 |
| [9] | Fang, D. (2015) Some Relationships among the Constraint Qualifications for Lagrangian Dualities in DC Infinite Optimization Problems. Journal of Inequalities and Applications, 2015, Article No. 41. https://doi.org/10.1186/s13660-015-0561-3 |
| [10] | Fang, D.H. (2012) Stable Zero Lagrange Duality for DC Conic Programming. Journal of Applied Mathematics, 2012, 1-17. https://doi.org/10.1155/2012/606457 |
| [11] | Zhou, Y. and Li, G. (2014) The Toland-Fenchel-Lagrange Duality of DC Programs for Composite Convex Functions. Numerical Algebra, Control & Optimization, 4, 9-23. https://doi.org/10.3934/naco.2014.4.9 |
| [12] | Pshenichnyi, B.N. (2020) Necessary Conditions for an Extremum. Chemical Rubber Company Press. |
| [13] | Mashkoorzadeh, F., Movahedian, N. and Nobakhtian, S. (2020) Robustness in Nonsmooth Nonconvex Optimization Problems. Positivity, 25, 701-729. https://doi.org/10.1007/s11117-020-00783-5 |
| [14] | Long, X., Liu, J. and Huang, N. (2021) Characterizing the Solution Set for Nonconvex Semi-Infinite Programs Involving Tangential Subdifferentials. Numerical Functional Analysis and Optimization, 42, 279-297. https://doi.org/10.1080/01630563.2021.1873366 |
| [15] | Martínez-Legaz, J.E. (2014) Optimality Conditions for Pseudoconvex Minimization over Convex Sets Defined by Tangentially Convex Constraints. Optimization Letters, 9, 1017-1023. https://doi.org/10.1007/s11590-014-0822-y |
| [16] | Liu, J., Long, X. and Huang, N. (2023) Approximate Optimality Conditions and Mixed Type Duality for Semi-Infinite Multiobjective Programming Problems Involving Tangential Subdifferentials. Journal of Industrial and Management Optimization, 19, 6500-6519. https://doi.org/10.3934/jimo.2022224 |
| [17] | Bagirov, A., Karmitsa, N. and Mäkelä, M.M. (2014) Introduction to Nonsmooth Optimization: Theory, Practice and Software. Springer. |
| [18] | Lemaréchal, C. (1986) An Introduction to the Theory of Nonsmooth Optimization. Optimization, 17, 827-858. https://doi.org/10.1080/02331938608843204 |
| [19] | Dinh, N., Mordukhovich, B.S. and Nghia, T.T.A. (2009) Qualification and Optimality Conditions for DC Programs with Infinite Constraints. Acta Mathematica Vietnamica, 34, 125-155. |
