2-TYPES OF MINIMAX THEOREMS FOR VECTOR-VALUED FUNCTIONS

被引：16

作者：

TANAKA, T

机构：

[1] Department of Information Science, Faculty of Science, Hirosaki University, Aomori

来源：

JOURNAL OF OPTIMIZATION THEORY AND APPLICATIONS | 1991年 / 68卷 / 02期

关键词：

MINIMAX THEOREMS; VECTOR-VALUED OPTIMIZATION; C-CONVEX FUNCTIONS; PROPERLY QUASI C-CONVEX FUNCTIONS; WEAK CONE SADDLE POINTS; POINTED CONVEX CONES;

D O I：

10.1007/BF00941571

中图分类号：

C93 [管理学]; O22 [运筹学];

学科分类号：

070105 ; 12 ; 1201 ; 1202 ; 120202 ;

摘要：

It seems that minimax theorems for vector-valued functions found in recent papers have something in common. Taking note of this, we improve several results in the author's recent works and state two types of minimax theorems for vector-valued functions. One theorem refers to functions with some special convexity properties; the other theorem refers to separated functions of the type f(x, y) = u(x) + v(y). The proofs are based on the existence of weak cone saddle points of f and on a condition about a pointed convex cone which induces a partial ordering in the image space of f. We need the condition (C/{0}) + cl C subset-of C, which implies the Sterna-Karwat condition for a convex cone C of a Hausdorff topological vector space.

引用

页码：321 / 334

页数：14

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