Optimality and duality for nonsmooth semi-infinite E-convex multi-objective programming with support functions

被引:0
|
作者
Emam T. [1 ,2 ]
机构
[1] Department of Mathematics, Faculty of Science, Jouf University, P.O. Box 2014, Sakaka
[2] Department of Mathematics, Faculty of Science, Suez University, P.O. Box 43533, Suez
来源
International Journal for Simulation and Multidisciplinary Design Optimization | 2020年 / 11卷
关键词
Duality; Generalized e-convexity; Nonsmooth semi-infinite multi-objective optimization;
D O I
10.1051/smdo/2020011
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
In this paper, we study a nonsmooth semi-infinite multi-objective E-convex programming problem involving support functions. We derive sufficient optimality conditions for the primal problem. We formulate Mond-Weir type dual for the primal problem and establish weak and strong duality theorems under various generalized E-convexity assumptions. © 2020 T. Emam, published by EDP Sciences.
引用
下载
收藏
相关论文
共 50 条
  • [31] Optimality conditions and duality for nonsmooth multiobjective semi-infinite programming problems with vanishing constraints on Hadamard manifolds
    Upadhyay, B. B.
    Ghosh, Arnav
    Treanta, Savin
    JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 2024, 531 (01)
  • [32] Convex composite multi-objective nonsmooth programming
    Jeyakumar, V.
    Yang, X.Q.
    Mathematical Programming, Series A, 1993, 59 (03): : 325 - 343
  • [33] On generalised convex multi-objective nonsmooth programming
    Mishra, SK
    Mukherjee, RN
    JOURNAL OF THE AUSTRALIAN MATHEMATICAL SOCIETY SERIES B-APPLIED MATHEMATICS, 1996, 38 : 140 - 148
  • [34] OPTIMALITY AND DUALITY FOR COMPLEX MULTI-OBJECTIVE PROGRAMMING
    Huang, Tone-Yau
    Tanaka, Tamaki
    NUMERICAL ALGEBRA CONTROL AND OPTIMIZATION, 2022, 12 (01): : 121 - 134
  • [35] Optimality, scalarization and duality in linear vector semi-infinite programming
    Kanzi, Nader
    Ardekani, Javad Shaker
    Caristi, Giuseppe
    OPTIMIZATION, 2018, 67 (05) : 523 - 536
  • [36] Optimality Conditions of Approximate Solutions for Nonsmooth Semi-infinite Programming Problems
    Long X.-J.
    Xiao Y.-B.
    Huang N.-J.
    Journal of the Operations Research Society of China, 2018, 6 (02) : 289 - 299
  • [37] Necessary optimality conditions for nonsmooth generalized semi-infinite programming problems
    Kanzi, N.
    Nobakhtian, S.
    EUROPEAN JOURNAL OF OPERATIONAL RESEARCH, 2010, 205 (02) : 253 - 261
  • [38] OPTIMALITY CONDITIONS FOR CONVEX SEMI-INFINITE PROGRAMMING-PROBLEMS
    BENTAL, A
    KERZNER, L
    ZLOBEC, S
    NAVAL RESEARCH LOGISTICS, 1980, 27 (03) : 413 - 435
  • [39] Optimality and duality in nonsmooth semi-infinite optimization, using a weak constraint qualification
    David Barilla
    Giuseppe Caristi
    Nader Kanzi
    Decisions in Economics and Finance, 2022, 45 : 503 - 519
  • [40] Optimality and duality in nonsmooth semi-infinite optimization, using a weak constraint qualification
    Barilla, David
    Caristi, Giuseppe
    Kanzi, Nader
    DECISIONS IN ECONOMICS AND FINANCE, 2022, 45 (02) : 503 - 519
12345