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浙江大学学报(理学版)  2016, Vol. 43 Issue (6): 682-684    DOI: 10.3785/j.issn.1008-9497.2016.06.011
数学与计算机科学     
非光滑多目标分式规划的对偶条件
李向有
延安大学 数学与计算机学院, 陕西 延安 716000
Duality conditions of nonsmooth multi-objective fractional programming
LI Xiangyou
Institute of Mathematics and Computer Science of Yan'an University, Yan'an 716000, Shaanxi Province, China
 全文: PDF(500 KB)  
摘要: 最优性问题在研究博弈理论、目标规划、最低风险问题等方面有重要应用,利用非光滑分析,定义了一类新的广义不变凸函数,研究了涉及此类函数的多目标半无限分式规划问题, 得到了参数对偶问题的弱对偶和严格逆对偶条件,在新的凸性下得到了一些重要结论.
关键词: 广义不变凸函数多目标对偶分式规划    
Abstract: Optimization plays an important role in game theory, goal programming, minimum risk problems, etc. By nonsmooth analysis, a new class of invex functions are defined, and multi-objective semi-infinite fractional programming problems involving the new defined invex functions are investigated. Then, weak dual conditions and strictly converse dual conditions of parameter dual problems are obtained, and some important conclusions are also drawn under the new convexity.
Key words: generalized invex functions    multiobjective    duality    fractional programming
收稿日期: 2015-08-22 出版日期: 2017-03-07
CLC:  O221.6  
基金资助: 国家自然科学基金资助项目(11471007);陕西省教育厅科研项目资助课题(14JK1840).
作者简介: 李向有(1976-),ORCID:http://orcid.org/0000-0002-3761-1118,男,硕士,副教授,主要从事最优化理论与应用研究,E-mail:yadxlxy@163.com.
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引用本文:

李向有. 非光滑多目标分式规划的对偶条件[J]. 浙江大学学报(理学版), 2016, 43(6): 682-684.

LI Xiangyou. Duality conditions of nonsmooth multi-objective fractional programming. Journal of ZheJIang University(Science Edition), 2016, 43(6): 682-684.

链接本文:

https://www.zjujournals.com/sci/CN/10.3785/j.issn.1008-9497.2016.06.011        https://www.zjujournals.com/sci/CN/Y2016/V43/I6/682

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