不确定凸优化问题鲁棒近似解的最优性

Acta mathematica scientia,Series A ›› 2020, Vol. 40 ›› Issue (4): 1007-1017.

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Optimality of Robust Approximation Solutions for Uncertain Convex Optimization Problems

Meng Li(),Guolin Yu*()

^{Institute of Applied Mathematics, North Minzu University, Yinchuan 750021}

Received:2019-03-20 Online:2020-08-26 Published:2020-08-20
Contact: Guolin Yu E-mail:601575330@qq.com;guolin_yu@126.com
Supported by:
the NSFC(11861002);the Nonlinear Analysis and Financial Optimization Research Center of North Minzu University and the Key Project of North Minzu University(ZDZX201804)

Abstract

Abstract:

This paper is devoted to study the optimality conditions of robust approximate solutions for a convex optimization problem, in which the objective and constraint functions are carried with uncertain data. First of all, under the assumption of a closed convex cone constraint qualification for the constraint functions, the optimality conditions of approximate solutions for the concerned uncertain optimization problem are presented. Then, the concept of robust approximate saddle point is introduced, and the characterization of robust approximate solutions are proposed by saddle points.

Key words: Robust convex optimization, Approximate solution, Approximate optimality condition, Approximate saddle point

CLC Number:

O224

Meng Li,Guolin Yu. Optimality of Robust Approximation Solutions for Uncertain Convex Optimization Problems[J].Acta mathematica scientia,Series A, 2020, 40(4): 1007-1017.

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References 14

1	Soyster A L . Convex programming with set-inclusive constraints and applications to inexact linear programming. Operations Research, 1973, 21 (5): 1154- 1157
2	Ben-Tal A , Bhadra S , Bhattacharyya C , et al. Efficient methods for robust classification under uncertainty in kernel matrices. Journal of Machine Learning Research, 2012, 13 (1): 2923- 2954
3	Ben-Tal A , Boyd S , Nemirovski A . Extending scope of robust optimization:comprehensive robust counterparts of uncertain problems. Mathematical Programming, 2006, 107 (1/2): 63- 89
4	孙祥凯. 不确定信息下凸优化问题的鲁棒解刻划. 数学物理学报, 2017, 37 (2): 257- 264 doi: 10.3969/j.issn.1003-3998.2017.02.005
	Sun X K . Characterizations of robust solution for convex optimization problems with data uncertainty. Acta Math Sci, 2017, 37 (2): 257- 264 doi: 10.3969/j.issn.1003-3998.2017.02.005
5	Sun X K , Peng Z Y , Guo X L . Some characterizations of robust optimal solutions for uncertain convex optimization problems. Optimization Letters, 2015, 10 (7): 1- 16
6	Lee J H , Jiao L . On quasi Q-solution for robust convex optimization problems. Optimization Letters, 2016, 11, 1- 14
7	Sun X K , Li X B , Long X J , et al. On robust approximate optimal solutions for uncertain convex optimization and applications to multi-objective optimization. Pacific Journal of Optimization, 2017, 13 (4): 621- 643
8	Kim M H . Duality theorem and vector saddle point theorem for robust multiobjective optimization problems. Communications of the Korean Mathematical Society, 2013, 28 (3): 597- 602 doi: 10.4134/CKMS.2013.28.3.597
9	Jeyakumar V . Asymptotic dual conditions characterizing optimality for convex programs. Optim Theory Appl, 1997, 93, 153- 165 doi: 10.1023/A:1022606002804
10	Bot R I . Conjugate duality in convex optimization. Lecture Notes in Economics Mathematical Systems, 2010, 637 (1): 31- 41
11	Jeyakumar V , Li G Y . Strong duality in robust convex programming:complete characterizations. SIAM J Optim, 2010, 20, 3384- 3407 doi: 10.1137/100791841
12	Jeyakumar V , Lee G M , Dinh N . New sequential Lagrange multiplier conditions characterizing optimality without constraint qualification for convex programs. SIAM Journal on Control and Optimization, 2003, 14, 534- 547 doi: 10.1137/S1052623402417699
13	XU Z K . On multiple-criteria fractional programming problems. Journal of Systems Science and Mathematical Sciences, 1994, 14 (3): 199- 208
14	李茹, 余国林, 刘伟, 刘三阳. 一类广义不变凸函数和向量变分不等式. 数学物理学报, 2017, 37A (6): 1029- 1039 doi: 10.3969/j.issn.1003-3998.2017.06.003
	Li R , Yu G L , Liu W , Liu S Y . A class of generalized invex functions and vector variational inequalities. Acta Math Sci, 2017, 37A (6): 1029- 1039 doi: 10.3969/j.issn.1003-3998.2017.06.003

[1]	LONG Xian-Jun. Optimality Conditions for Approximate Solutions on Nonconvex Vector Equilibrium Problems in Asplund Spaces [J]. Acta mathematica scientia,Series A, 2014, 34(3): 593-602.
[2]	Meng Chunjun; Hu Xiyan. The Inverse Eigenvalue Problem of Hamiltonian Matrices [J]. Acta mathematica scientia,Series A, 2007, 27(3): 442-448.
[3]	Yan Yubin, Li Chunli. The Expression of the Solution of the First Kind Ⅲ-Posed Operator Equation [J]. Acta mathematica scientia,Series A, 1998, 18(3): 264-269.
[4]	Wang Xiaolin. Indirect Approximate Solution With Complex Splines for Singular Integral Equations on A Closed Contour [J]. Acta mathematica scientia,Series A, 1997, 17(3): 348-355.

Optimality of Robust Approximation Solutions for Uncertain Convex Optimization Problems

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