约束品性与非光滑多目标优化问题
详细信息    查看全文 | 推荐本文 |
  • 英文篇名:Constraint qualification and nonsmooth multiobjective optimization probems
  • 作者:万轩 ; 陈华峰 ; 瞿先平 ; 沈玉玲
  • 英文作者:WAN Xuan;CHEN Huafeng;QU Xianping;SHEN Yuling;Department of Foundation,Chongqing Telecommunication Polytechnic College;
  • 关键词:非光滑多目标优化 ; 广义Abadie约束品性 ; 广义Kuhn-Tucker约束品性 ; Geoffrion真有效解 ; 广义Kuhn-Tucker真有效解
  • 英文关键词:nonsmooth multiobjective optimizations;;generalized Abadie constraint qualification;;Generalized Kuhn-Tucker constraint qualification;;Geoffrion proper efficient;;generalized Kuhn-Tucker properly efficient
  • 中文刊名:NATR
  • 英文刊名:Journal of Guizhou Normal University(Natural Sciences)
  • 机构:重庆电讯职业学院基础部;
  • 出版日期:2018-05-12 21:28
  • 出版单位:贵州师范大学学报(自然科学版)
  • 年:2018
  • 期:v.36;No.139
  • 基金:重庆市教委科学技术研究项目(NO.KJ1605201)
  • 语种:中文;
  • 页:NATR201803011
  • 页数:4
  • CN:03
  • ISSN:52-5006/N
  • 分类号:65-68
摘要
考虑带不等式和集约束的非光滑多目标优化问题。首先利用Clarke方向导数、切锥、可达方向锥和线性化锥等工具引入广义Abadie约束品性和广义Kuhn-Tucker约束品性。进一步,分别在广义Abadie约束品性成立和广义Kuhn-Tucker约束品性成立这两种情况下,证明了Geoffrion真有效解是广义Kuhn-Tucker真有效解。
        We considered a nonsmooth multiobjective optimization problem with inequality constraints and set constraint. We first introduced the generalized Abadie constraint qualification and generalized Kuhn-Tucker constraint qualification in terms of Clarke directional derivative,tangent cone,the cone of attainable directions and linearized cone. Furthermore,we proved that Geoffrion proper efficient is generalized Kuhn-Tucker properly efficient under generalized Abadie constraint qualification holds or generalized Kuhn-Tucker constraint qualification holds.
引文
[1]KUHN H W,TUCKER A W.Nonlinear programming[C].In Proceeding of the second berley symposium on mathematical statisties and probability.California:University of California press,1951:481-492.
    [2]GEOFFRION A M.Proper efficiency and the theory of vector maximization[J].Journal of Mathematical Analysis and Applications,1968,22:618-630.
    [3]ABADIE J M.On the Kuhn-Tucker theorem[M].Nonlinear Programming.New York:John Wiley,1967:21-36.
    [4]HOHEISEL T,KANZOW C.On the abadie and guignard constraint qualifications for mathematical programmes with vanishing constraints[J].Optimization,2009,58(4):431-448.
    [5]LI X F.Constraint qualifications in nonsmooth multiobjective optimization[J].Journal of Optimization Theory Application,2000,106(2):373-398.
    [6]KOSTYUKOVA O I,TCHEMISOVA T V.Optimality criteria without constraint qualifications for linear semidefinite Problems[J].Journal of Mathematical Sciences,2012,182(2):126-143.
    [7]ASADI M B,SOLEIMANI-DAMANEH M.Infinite alternative theorems and nonsmooth constraint qualification conditions[J].Set-Valued and Variational Analysis,2012,20(4):551-566.
    [8]GOLESTANI M,NOBAKHTIAN S.Nonsmooth multiobjective programming and constraint qualifications[J].Optimization,2013,62(6):783-795.
    [9]FANG D H.Some relationships among the constraint qualifications for Lagrangian dualities in DC infinite optimization problems[J].Journal of Inequalities and Applications,2015,2015(1):1-14.
    [10]瞿先平.广义Kuhn-Tucker真有效解在非光滑向量优化中的充分条件[J].重庆师范大学学报(自然科学版),2016,33(3):11-14.
    [11]CLARKE F H.Optimization and nonsmooth analysis[M].New York:Wiley,1983.
    [12]EHRGOTT M.Multicriteria optimization[M].Berlin:Springer,2005.
NGLC 2004-2010.National Geological Library of China All Rights Reserved.
Add:29 Xueyuan Rd,Haidian District,Beijing,PRC. Mail Add: 8324 mailbox 100083
For exchange or info please contact us via email.