ON THE GENERALIZED FRITZ JOHN OPTIMALITY CONDITIONS OF VECTOR OPTIMIZATION WITH SET-VALUED MAPS UNDER BENSON PROPER EFFICIENCY

A kind of tangent derivative and the concepts of strong and weak * pseudoconvexity for a set-valued map are introduced. By the standard separation theorems of the convex sets and cones the optimality Fritz John condition of set-valued optimization under Benson proper efficiency is established, its sufficience is discussed. The form of the optimality conditions obtained here completely tally with the classical results when the set-valued map is specialized to be a single-valued map.

The Optimality Conditions for Multiobjective Semi-infinite Programming Involving Generalized Unified （C, α, p, d）-convexity

The definition of generalized unified (C, α, ρ, d)-convex function is given. The concepts of generalized unified (C, α, ρ, d)-quasiconvexity, generalized unified (C, α, ρ, d)-pseudoconvexity and generalized unified (C, α, ρ, d)-strictly pseudoconvex functions are presented. The sufficient optimality conditions for multiobjective nonsmooth semi-infinite programming are obtained involving these generalized convexity lastly.

Benson真有效意义下向量集值优化的广义Fritz John条件

引入了一种有关集值映射的切导数和强、弱 伪凸的概念· 借助凸集分离定理及锥分离定理建立了Benson真有效意义下向量集值优化导数型的FritzJohn最优性条件 。

Benson真有效意义下向量集值优化的广义Fritz-John条件

借助Clarke切锥并用上图引入了关于集值映射的Clarke切导数 .借助于一种新的择一性定理建立了向量集值优化问题在弱Benson真有效意义下的广义Fritz-John最优性条件 ,而且证明在一种伪凸的假设下 。

集值优化问题Benson真有效解的高阶Fritz John型最优性条件(英文)

本文讨论的是集值优化问题Benson真有效解的高阶Fritz John型最优性条件.利用Aubin和Frankowska引入的高阶切集和凸集分离定理,在锥-似凸映射的假设条件下,获得了带广义不等式约束的集值优化问题Benson真有效解的高阶Fritz John型必要和充分性条件.

具有等式约束的拟可微规划的Fritz John型条件及其充分性

文中讨论具有等式约束的拟可微规划的ＦｒｉｔｚＪｏｈｎ型条件，定义了函数的Ｆη－凸性，研究了ＦｒｉｔｚＪｏｈｎ型条件的充分性．

多目标规划的Fritz John充分条件

本文首先对广义凸单目标规划的最优解提出一个 Fritz John充分条件 ,然后对广义凸多目标规划的有效解提出一个 Fritz

OPTIMALITY CONDITIONS AND DUALITY RESULTS FOR NONSMOOTH VECTOR OPTIMIZATION PROBLEMS WITH THE MULTIPLE INTERVAL-VALUED OBJECTIVE FUNCTION

In this paper, both Fritz John and Karush-Kuhn-Tucker necessary optimality conditions are established for a （weakly） LU-efficient solution in the considered nonsmooth multiobjective programming problem with the multiple interval-objective function. Further, the sufficient optimality conditions for a （weakly） LU-efficient solution and several duality results in Mond-Weir sense are proved under assumptions that the functions constituting the considered nondifferentiable multiobjective programming problem with the multiple interval- objective function are convex.

关于FRITZ JOHN条件

本文证明多目标问题的有效解总适合 Fritz John必要条件 ,并利用单目标规划问题最优解的一个新的 Fritz

NECESSARY CONDITIONS FOR MAJOR OPTIMAL SOLUTIONS AND MAJOR EFFICIENT SOLUTIONS OF MULTIOBJECTIVE PROGRAMMING

In this papers the Fritz John conditions and Kuhn-Tucker conditions for majoroptimal solutions and major efficient solutions of multiobjective programming are givenand proved.

Optimality Conditions for Generalized Convex Nonsmooth Uncertain Multi-objective Fractional Programming

This paper aims at studying optimality conditions of robust weak efficient solutions for a nonsmooth uncertain multi-objective fractional programming problem(NUMFP).The concepts of two types of generalized convex function pairs,called type-I functions and pseudo-quasi-type-I functions,are introduced in this paper for(NUMFP).Under the assumption that(NUMFP)satisfies the robust constraint qualification with respect to Clarke subdifferential,necessary optimality conditions of the robust weak efficient solution are given.Sufficient optimality conditions are obtained under pseudo-quasi-type-I generalized convexity assumption.Furthermore,we introduce the concept of robust weak saddle points to(NUMFP),and prove two theorems about robust weak saddle points.The main results in the present paper are verified by concrete examples.

类凸向量均衡问题解的最优性条件

在实的局部凸的Hausdorff拓扑线性空间中,考虑带约束的向量均衡问题,利用凸集分离定理,给出了带约束的类凸向量均衡问题的弱有效解,Henig有效解,全局有效解和超有效解的充分必要条件,并通过举例说明了锥类凸映射是比锥凸映射更弱的映射。

非凸非光滑规划的最优性与对偶性

利用Ｃｌａｒｋｅ广义梯度定义的Ｌｉｐｓｃｈｉｔｚ函数的广义凸性条件，首先讨论了非凸非光滑多目标规划的最优性，建立了其充分性条件与Ｋｕｈｎ－Ｔｕｃｋｅｒ型必要条件；然后讨论了非凸非光滑单目标规划的广义Ｍｏｎｄ－Ｗｅｉｒ型对偶，建立了相应的弱对偶定理、强对偶定理及逆对偶定理．

多目标规划αk—较多有效解的必要条件

本文给出并证明了多目标规划ak—较多有效解的Fritz John必要条件和Kuhn—Tucker必要条件。

关于(F,ρ)-不变凸性函数多目标规划的充分性条件(英文)

本文给出了一类更一般的广义凸性函数的定义：（Ｆ，ρ）－不变凸性函数，并论证了其多目标规划关于有效解的充分性条件．本文的一些主要结论是对文献［２］～［５］中相应结论的改进和推广．

非光滑半无限多目标优化问题的最优性充分条件

研究了一个非光滑半无限多目标优化问题(简记为SIMOP),并讨论了它的最优性条件.首先,通过对目标函数和约束函数的某种组合赋予Clarke F-凸性假设,获得了SIMOP(弱)有效解的最优性充分条件.接下来,用Chankong-Haimes方法建立了此SIMOP的一个标量问题并得到了这个标量问题的最优性充分条件.

一致F_(b,ε)-凸多目标半无限规划ε-有效解的充分性

利用C larke广义梯度,定义了一致Fb,ε-凸函数和严格一致Fb,ε-凸函数,得到了涉及这些广义凸性和一致Fb-伪凸函数、一致Fb-拟凸函数等一些非光滑非凸函数的一类非光滑多目标半无限规划的一些K uhn-Tucker型充分性条件.

一类广义弧式凸函数多目标规划的充分性条件

定义了一类更一般的弧式凸函数 ,并在此基础上论证了其多目标规划的充分性条件。

半凸多目标优化ε-拟弱有效解的最优性条件及对偶定理

本文在相关文献考虑MP问题的基础上,增加了等式约束条件,即本文考虑了VP问题,并将已有文献中的凸性假设改为半凸性假设,得到VP问题的ε-拟弱有效解的相应最优性条件.接着,本文定义了VP问题的拉格朗日函数及其ε-拟弱鞍点,得到VP问题的ε-拟弱鞍点相应定理.最后,本文考虑了VP问题的对偶问题,获得了VP问题的弱对偶和强对偶定理.

集值优化问题ε-严有效解的广义高阶Fritz John型最优性条件

在实赋范线性空间中研究集值优化问题ε-严有效解的广义高阶Fritz John型最优性条件.利用Wang等引入的广义高阶锥方向邻接导数,在内部锥类凸假设下,借助凸集分离定理,获得了带广义不等式约束的集值优化问题ε-严有效解的广义高阶Fritz John型必要和充分条件.