Existence and characterization theorems in nonconvex vector optimization

被引:0
作者
Nergiz Kasimbeyli
机构
[1] Anadolu University,Department of Industrial Engineering, Faculty of Engineering
来源
Journal of Global Optimization | 2015年 / 62卷
关键词
Vector optimization; Nonlinear separation theorem; Augmented dual cone; Sublinear scalarizing functions; Conic scalarization method; Proper efficiency; Existence theorem;
D O I
暂无
中图分类号
学科分类号
摘要
This paper presents existence conditions and characterization theorems for minimal points of nonconvex vector optimization problems in reflexive Banach spaces. Characterization theorems use special class of monotonically increasing sublinear scalarizing functions which are defined by means of elements of augmented dual cones. It is shown that the Hartley cone-compactness is necessary and sufficient to guarantee the existence of a properly minimal point of the problem. The necessity is proven in the case of finite dimensional space.
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页码:155 / 165
页数:10
相关论文
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