标题:
集值优化问题的E-Henig真有效解E-Henig Proper Efficient Solution for Set-Valued Optimization Problems
作者:
林佩静, 李茂旺, 仇秋生
关键字:
E-Henig真有效解, 标量化, 真鞍点, 对偶E-Henig Proper Efficient Solution, Scalarization, Proper Saddle Point, Duality
期刊名称:
《Advances in Applied Mathematics》, Vol.5 No.3, 2016-08-31
摘要:
本文研究集值优化问题的E-Henig真有效解。首先,在实局部凸Hausdoff空间中引进了E-Henig真有效点的概念,给出了E-Henig真有效点的等价刻画,讨论了它与E-Benson真有效点和E-超有效点的关系。其次,在集值映射为近似E-次类凸的条件下,建立了E-Henig真有效解的标量化定理。最后,研究了E-Henig真有效解的鞍点定理和对偶定理。
In this paper, we study E-Henig proper efficient solution for set-valued optimization problem. Firstly, the concept of E-Henig proper efficient point in a real Hausdorff locally convex space is given. The relationships with E-Benson proper point and E-super point are discussed. Secondly, under the assumption of nearly subconvexlikeness, scalarization theorems of E-Henig proper efficient solution are established. Lastly, E-Henig saddle point theorem and E-Henig duality theorem are studied.