1) epiderivative
上导数
1.
By using the vector variational inequality related to radial epiderivative,we give a number of necessary and sufficient conditions for Henig efficiency,super efficiency and cone-super efficiency of set-valued optimization under the framework of locally convex topological vector spaces,which generalizes some known related results.
利用与仿射上导数相关的向量变分不等式的真有效性,对局部凸拓扑向量空间中的集值优化问题的Henig有效性、超有效性、锥超有效性等给出了一些充分、必要条件,从而推广了一些已知的相关结论。
2.
In the framework of locally convex topological vector spaces, we introduce the concepts of radial epiderivative and contingent epiderivative, and discuss the relationship between them.
本文在局部凸拓扑向量空间的框架下,介绍了仿射上导数、伴随上导数的概念,指出了两者的联系;提出了与仿射上导数相关的向量变分不等式问题(VVIP)_R,并给出了它的各种有效解对、真有效解对的定义;利用它们对无约束的集值映射向量优化问题的各种有效对、真有效对,分别给出了一系列充分、必要条件;此外还仿照[17]中f-伴随导数的概念,对集值映射提出了一种新的导数概念:f-仿射导数,利用它对集值映射向量优化问题的f-有效对给出了一个充分必要条件。
2) contingent epiderivative
切上导数
1.
In this paper, the necessary and sufficient conditions of Geoffrion efficient solutions in vector set-valued optimization problem with vector variational inequality are obtained by using the concept of contingent epiderivative, which has been introduced by Jahn and Rauh.
利用Jahn与Rauh提出的集值映射的切上导数概念,解决了以向量变分不等式的形式给出向量集值优化问题的Geoffrion有效解的充分必要条件。
2.
In this paper, the necessary and sufficient conditions of various proper efficient solutions in vector set-valued optimization problem are obtained by using the concept of contingent epiderivative,which has been introduced by Jahn and Rauh.
利用Jahn与Rauh提出的集值映射的切上导数概念 ,给出了向量集值映射最优化问题的各种有效解的充分与必要条
3.
By using the concept of contingent epiderivative,radial contingent epiderivative,it presents the necessary and sufficient conditions for weakly efficient solution,globally efficient solution,Henig efficient solution and C-superefficient solution to the vector equilibrium problems.
利用映射的切上导数,径向切上导数给出了向量均衡问题弱有效解,整体有效解,Hen ig有效解以及C-超有效解的充分必要条件。
3) Epiderivative
上图导数
1.
The concept of the generalized gradient in sense of strong efficiency is introduced by epiderivative for a set-valued map in ordered Banach spaces.
在锥序Banach空间中利用集值映射的上图导数引进了强有效意义下的广义梯度,在下C-半连续条件下,利用凸集分离定理证明了该广义梯度的存在性,由此建立了集值向量优化问题强有效解在广义梯度下的最优性条件。
4) upper(lower) derived function
上(下)导数
5) Right upper derivative
右上导数
6) contingent epiderivative
相依上导数
补充资料:delaVallée-Poussin导数
delaVallée-Poussin导数
de la VaDce - Poussin derivative
山hV团倪一P加石幽1.导数【de hVa肠纯一R版动l心由.dve;Ba服ny伙ella甲山即口.1,广义对称导数(罗nerali-欲互s脚四netric deriVa石ve) 由Ch.J.de h vall能一Poussin(【11)定义的一种导数.设r为偶数,并设存在占>O使对满足}t}<占的一切t,有 合{f(x。+‘,+f(x。一艺,,- 一刀。+冬:,口2+…+弄。r且+:(:):r,(*) 2一r名r!一rr‘、一,一,其中声:,…,戊为常数,下(t)~o(当t~O)且下(o)=0.数尽”f(r)(x0)称为函数f在点x。的:阶dehvallee-Poussin导数或;阶对称导数. 奇阶r的dehV么11阮一Po璐in导数可类似定义,只要把方程(*)代之为 冬仃(、+‘)一了(、一:)}- 2 一。。1十冬‘,。、十…十共:r坟十:(:):: 3!一厂Jr!一r”‘、一z一’ deh从山阮一Poussin导数左,帆)与R~nn二阶导数相同,后者常称为 Sch认么反导数.若关r)闻存在,则几一2)闻(r)2)也存在,但f(r一l)(x0)未必存在.若存在有限的通常双边导数f(r)帆),则人r)帆)二f‘r)(x0).例如,对函数f(x)二sgnx,f(川(0)=0,k=1,2,‘二,但左*+1)(。)(k=0,1,…不存在.若de h vall由一Po.in导数人。)(x0)存在,则由f的Fo~级数逐项微分r次所得级数S‘r)(f)在x。对于“>r是(C,的可和的,其和为寿)帆)([2〕)(见C威的求和法(。滋ms~·tion methods)).
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