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1.
本文研究Banach空间中扰动集值映射最优化的稳定性问题,在目标映射和约束映射均为半连续和锥凸的条件下,得到了扰动问题的锥有效点集和锥弱有效点集分别在锥次秃分和锥弱次微分意义下的稳定性结果。  相似文献   

2.
给出上半连续集值映射优化问题在图像拓扑逼近意义下的本质弱有效解和本质有效解的概念.利用通有稳定性研究的usco方法, 证明了上半连续集值映射优化问题.在图像拓扑逼近意义下,弱有效解映射在定义域和映射同时扰动下是紧值上半连续的,从而是通有下半连续的,即在Baire纲意义下, 绝大多数上半连续集值映射优化问题, 在图像逼近意义下其弱有效解是稳定的,或者说是本质的. 证明了上半连续集值映射优化问题在图像逼近意义下有效解映射上半连续的一个充要条件,也即是有效解通有稳定的一个重要条件.  相似文献   

3.
扰动多目标规划的次微分稳定性   总被引:9,自引:0,他引:9  
胡毓达  徐永明 《数学学报》1992,35(5):577-586
本文利用共轭对偶算子定义了次微分,在一般拓扑向量空间中系统地讨论了多目标规划次微分稳定性.在目标函数为锥严格凸,约束函数为拟凸以及锥半连续的条件下,得到扰动多目标规划问题的整体稳定性.另外,通过引进点集,映射在一点凸的定义,得到问题的局部稳定性.我们将所得到的结论应用于有限维欧氏空间中控制结构为正锥的情形,还得到一些特殊结果.  相似文献   

4.
关于多目标规划解的稳定性问题,一些学者在半连续意义下曾得到比较系统的结果.以后,在锥次微分意义下又获得了更深入的描述.近年,则进一步对目标和约束,以及确定目标空间序的控制锥均受扰动的多目标规划研究其解的稳定性问题,并在Banach空间和半连续的意义下,得到了很好的刻划.本文则对这类双扰动多目标规划问题,在局部凸拓扑向量空间和锥次微分的意义下,获得了相应的稳定性结论。  相似文献   

5.
在自由支配集下,对一类近似平衡约束向量优化问题(AOPVF)的稳定性进行研究.首先,在较弱的凸性假设下获得了约束集映射的Berge-半连续性和约束集的闭性、凸性和紧性结果.然后,在目标函数列Gamma-收敛的假设下,分别得到了AOPVF弱有效解映射Berge 半连续和弱有效解集下Painlevé-Kuratowski收敛的充分条件,并给出例子说明结论是新颖和有意义的.  相似文献   

6.
主要研究有限理性下参数最优化问题解的稳定性.即在两类扰动即目标函数及可行集二者,目标函数、可行集及参数三者分别同时发生扰动的情形下,对参数最优化问题引入一个抽象的理性函数,分别建立了参数最优化问题的有限理性模型M,运用"通有"的方法,得到了上述两种扰动情形下相应的有限理性模型M的结构稳定性及对ε-平衡(解)的鲁棒性,即有限理性下绝大多数的参数最优化问题的解都是稳定的,并以一个例子说明所得的稳定性结果均是正确的.  相似文献   

7.
在锥序Banach向量空间引入了集值映射在超有效意下的次微分(次梯度);在一定的条件下,证明次微分(次梯度)的存在性;得到了序扰动、双扰动集值优化问题超有效点集在次微分意义下的稳定性.  相似文献   

8.
Banach空间中一类扰动优化问题最优解的特征与存在性   总被引:2,自引:0,他引:2  
何金苏 《数学学报》2007,50(3):669-678
设(X,‖·‖)是Banach空间,x∈X,Z是X的非空子集,J是Z→R的下半连续下有界函数.本文研究扰动优化问题min_(z∈Z)(J(z)+‖x-z‖)(记作(J,x)-inf)的最优解的特征和最优解的存在性等问题.我们引入J-太阳集的概念,同时在Z是J-太阳集的情形下,给出了扰动优化问题(J,x)-inf的最优解的“Kolmogorov”型特征刻画.并借助于集合的若干紧性概念和最优值函数的方向导数研究了扰动优化问题(J,x)-inf的最优解的存在性.  相似文献   

9.
本文主要研究欧几里德若当代数向量优化的谱标量化.引入了一个新的标量函数一谱标量函数,给出了此谱函数在欧儿里德若当代数中具有K-增性(相应的,严格K-增性)的充分条件,从而使得满足此条件的谱标量优化问题的解(即谱标量解)为向量优化问题的K-弱有效解(相应的,K-有效解).在适当的条件下,我们证明了谱标量解集值映射的上半连续性.同时,还给出了谱标量解集值映射满足下半连续的充分必要条件.  相似文献   

10.
在Banach空间中讨论了超有效点的稳定性.在半连续的意义下,给出了当约束集和控制锥同时扰动时,超有效点的稳定性.  相似文献   

11.
《Optimization》2012,61(1):155-165
In this article, we study well-posedness and stability aspects for vector optimization in terms of minimizing sequences defined using the notion of Henig proper efficiency. We justify the importance of set convergence in the study of well-posedness of vector problems by establishing characterization of well-posedness in terms of upper Hausdorff convergence of a minimizing sequence of sets to the set of Henig proper efficient solutions. Under certain compactness assumptions, a convex vector optimization problem is shown to be well-posed. Finally, the stability of vector optimization is discussed by considering a perturbed problem with the objective function being continuous. By assuming the upper semicontinuity of certain set-valued maps associated with the perturbed problem, we establish the upper semicontinuity of the solution map.  相似文献   

12.
The main goal of this paper is to establish the generic stability of Fan-Glicksberg type fixed points in hyperconvex metric spaces. In order to do so, we first give Fan-Glicksberg type fixed point theorem in hyperconvex metric spaces and then the generic stability of fixed points for upper semicontinuous set-valued mappings is obtained. Our generic stability results show that almost all of fixed points of upper semicontinuous set-valued mappings defined in compact hyperconvex metric spaces are stable in the sense of Baire category theory  相似文献   

13.
本文研究集值映射多目标优化超有效解集的连通性,在目标映射为锥上半连续和锥拟凸的条件下,证明了其超有效解集是连通的.  相似文献   

14.
《Optimization》2012,61(3):303-310
In this article, we use degree theory developed in Kien et al. [B.T. Kien, M.-M. Wong, N.C. Wong, and J.C. Yao, Degree theory for generalized variational inequalities and applications, Eur. J. Oper. Res. 193 (2009), pp. 12–22.] to prove a result on the existence of solutions to set-valued variational inequality under a weak coercivity condition, provided that the set-valued mapping is upper semicontinuous with nonempty compact convex values. If the set-valued mapping is pseudomonotone in the sense of Karamardian and upper semicontinuous with nonempty compact convex values, it is shown that the set-valued variational inequality is strictly feasible if and only if its solution set is nonempty and bounded.  相似文献   

15.
The main concern of this article is to study Ulam stability of the set of ε-approximate minima of a proper lower semicontinuous convex function bounded below on a real normed space X, when the objective function is subjected to small perturbations (in the sense of Attouch & Wets). More precisely, we characterize the class all proper lower semicontinuous convex functions bounded below such that the set-valued application which assigns to each function the set of its ε-approximate minima is Hausdorff upper semi-continuous for the Attouch–Wets topology when the set $\mathcal{C}(X)$ of all the closed and nonempty convex subsets of X is equipped with the Hausdorff topology. We prove that a proper lower semicontinuous convex function bounded below has Ulam-stable ε-approximate minima if and only if the boundary of any of its sublevel sets is bounded.  相似文献   

16.
Contingent epiderivatives and set-valued optimization   总被引:24,自引:0,他引:24  
In this paper we introduce the concept of the contingent epiderivative for a set-valued map which modifies a notion introduced by Aubin [2] as upper contingent derivative. It is shown that this kind of a derivative has important properties and is one possible generalization of directional derivatives in the single-valued convex case. For optimization problems with a set-valued objective function optimality conditions based on the concept of the contingent epiderivative are proved which are necessary and sufficient under suitable assumptions.  相似文献   

17.
研究了带约束条件集值优化问题近似Henig有效解集的连通性.在实局部凸Hausdorff空间中,讨论了可行域为弧连通紧的,目标函数为C-弧连通的条件下,带约束条件集值优化问题近似Henig有效解集的存在性和连通性.并给出了带约束条件集值优化问题近似Henig有效解集的连通性定理.  相似文献   

18.
张从军  李赛 《数学学报》2019,62(1):157-166
本文在K条件下,研究了所给标量泛函的连续性和拟凸性,并利用该标量泛函,将集值优化问题转化为均衡问题,进而研究了含约束的集值优化问题弱充分解的存在性和拟集值优化问题强逼近解映射的上半连续性与下半连续性.与最近的文献相比,我们的方法是新的,条件和结论也更具一般性.  相似文献   

19.
The paper considers upper semicontinuous behavior in distribution of sequences of random closed sets. Semiconvergence in distribution will be described via convergence in distribution of random variables with values in a suitable topological space. Convergence statements for suitable functions of random sets are proved and the results are employed to derive stability statements for random optimization problems where the objective function and the constraint set are approximated simultaneously. The author is grateful to two anonymous referees for helpful suggestions.  相似文献   

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