摘要
首先,给出了一些必要的基本概念和重要引理.其次,讨论了高阶广义切集的一些重要性质.最后,利用这些性质和Gerstewitz非凸分离泛函,在目标映射以及约束映射没有任何凸性假设的条件下,获得了带广义不等式约束的集值优化问题弱Benson真有效解的高阶必要和充分最优性条件.同时,给出例子说明了所获得的结果推广了文献中的相应结果.
Firstly,some necessarily basic concepts and an important lemma were given.Secondly,some important properties of generalized higher-order tangent sets were discussed.Finally,by virtue of those properties and the Gerstewitz's nonconvex separation functional,necessary and sufficient optimality conditions were obtained for weakly Benson proper efficient solutions of set-valued optimization problems without any convexity assumption on objective and constraint mappings.Moreover,two examples were given to show that the result obtained is a generalization to the corresponding results in literatures.
出处
《华东师范大学学报(自然科学版)》
CAS
CSCD
北大核心
2011年第3期59-67,99,共10页
Journal of East China Normal University(Natural Science)
基金
重庆市科委资助项目(2008BB0346)
关键词
集值优化
广义高阶相依集
非凸分离泛函
BENSON真有效解
高阶最优性条件
set-valued optimization
generalized higher order contingent sets
nonconvex separation functional
Benson proper efficient solutions
higher-order optimality conditions
