运筹学学报 >
2023 , Vol. 27 >Issue 3: 121 - 128
DOI: https://doi.org/10.15960/j.cnki.issn.1007-6093.2023.03.009
一类带映射差的非凸向量优化问题解的稳定性
收稿日期: 2022-01-28
网络出版日期: 2023-09-14
基金资助
国家自然科学基金青年基金(12001445);重庆市自然科学基金(基础研究与前沿探索专项)面上项目(cstc2019jcyj-msxmX0605);重庆市教委科学技术研究项目(KJQN201800837);重庆市研究生导师团队建设项目(yds223010);重庆工商大学创新团队项目(ZDPTTD201908);重庆工商大学研究生创新型科研项目(yjscxx2022-112-74)
Stability of solutions for a class of non-convex vector optimization problems with mapping differences
Received date: 2022-01-28
Online published: 2023-09-14
在实际生活中,问题数据常常受到干扰,求原问题解时,常常利用近似问题解去逼近原问题解。使用这种方法进行求解时,原问题解集的稳定性是一个重要的前提条件。本文考虑一类带映射差的非凸向量优化问题,研究了近似问题数据收敛于原问题数据时,通过对映射差的两个映射凸性和收敛性的限制,获得了带映射差的非凸向量优化问题在Painlevé-Kuratowski收敛性意义下有效解的稳定性结果。
关键词: 非凸优化; Painlevé-Kuratowski收敛; 稳定性; 真拟$C$-凹; $C$-凸
曾静, 丁若文 . 一类带映射差的非凸向量优化问题解的稳定性[J]. 运筹学学报, 2023 , 27(3) : 121 -128 . DOI: 10.15960/j.cnki.issn.1007-6093.2023.03.009
The data of problem are often perturbed in real life. We often calculate the solution of a perturbed problem to approximate the original problem solution. Therefore, the stability of the solution set of the original problem is an important issue. In this paper, we consider a class of non-convex vector optimization problems with two mapping differences. By taking advantage of appropriate convergence and convexity of the two mappings, the stability results of the nonconvex vector optimization problem is obtained, when the approximate problem data converge to the original problem data in the sense of Painlevé-Kuratowski's convergence.
| 1 | GuoX L,ZhaoC J,LiZ W.On generalized $\varepsilon$-subdifferential and radial epiderivative of set-valued mappings[J].Optimization Letters,2014,8(5):1707-1720. |
| 2 | GuoX L,LiS J.Optimality conditions for vector optimization problems with difference of convex maps[J].Journal of Optimization Theory and Applications,2014,162(3):821-844. |
| 3 | SunX K,ChaiY.Optimality conditions for DC fractional programming problems[J].Advances in Mathematics,2014,43(6):895-904. |
| 4 | Le ThiH A,Pham DinhT.DC programming and DCA: Thirty years of developments[J].Mathematical Programming,2018,169(1):5-68. |
| 5 | HorstR,ThoaiN V.DC programming: Overview[J].Journal of Optimization Theory and Applications,1999,103(1):1-43. |
| 6 | TuyH.Handbook of Global Optimization[M].Boston:Springer,1995:149-216. |
| 7 | ChenG Y,HuangX X.Stability results for Ekland's $\varepsilon$-variational principle for vector-valued functions[J].Mathematical Methods of Operations Research,1998,48(1):97-103. |
| 8 | HuangX X.Stability in vector-valued and set-valued optimization[J].Mathematical Methods of Operations Research,2000,52(2):185-193. |
| 9 | LucchettiR E,MiglierinaE.Stability for convex vector optimization problems[J].Optimization,2004,53(5/6):517-528. |
| 10 | ZengJ,LiS J,ZhangW Y,et al.Stability results for convex vector-valued optimization problems[J].Positivity,2011,15(3):441-453. |
| 11 | LiX B,WangQ L,LinZ.Stability results for properly quasiconvex vector optimization problems[J].Optimization,2013,64(5):1329-1347. |
| 12 | RockafellarR T,WetsR J B.Variational Analysis[M].Berlin Heidelberg:Springer-Verlag,1998:108-144. |
| 13 | LiX B,LinZ,PengZ Y.Convergence for vector optimization problems with variable ordering structure[J].Optimization,2016,65(8):1615-1627. |
| 14 | TanakaT.Generalized quasiconvexities, cone saddle points, and minimax theorem for vector-valued functions[J].Journal of Optimization Theory and Applications,1994,81(2):355-377. |
| 15 | Ferro,F.Minimax type theorems for $n$-valued functions[J].Annali di Matematica pura ed applicata,1982,132(1):113-130. |
| 16 | AuslenderA,TeboulleM.Asymptotic Cones and Functions in Optimization and Variational Inequalities[M].New York:Springer-Verlag,2003:26-31. |
| 17 | LucD T.Theory of Vector Optimization[M].Berlin Heidelberg:Spriger-Verlag,1998:62-77. |
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