A Generalized KKM Theorem and its Applications to Saddle Point and Nash Equilibrium Problem

机译：广义KKM定理及其在鞍点和纳什平衡问题中的应用。

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The classical Knaster-Kuratowski-Mazurkiewicz (in short, KKM) theorem is a basic result for combinatorial mathematics; it is equivalent to many basic theorems such as Brouwer's fixed point theorem, Sperner's lemma, and Fan's minimax inequality. In 1961, Ky Fan generalized the classical KKM theorem from finite dimensional spaces to infinite dimensional spaces, and since then, this theorem has become a very versatile tool in nonlinear analysis. The main purpose of this paper is to generalize the KKM theorem under the non-convexity setting of topological space. Furthermore, as its applications, existence theorems for a saddle point problem and the Nash equilibrium problem for non-cooperative games are obtained in general topological spaces without any convexity structure and linear structure. Our results improve and unify the corresponding results in the recently existing literatures.

机译：经典的Knaster-Kuratowski-Mazurkiewicz（简称KKM）定理是组合数学的基本结果。它等效于许多基本定理，例如Brouwer的不动点定理，Sperner引理和Fan的极大极小不等式。 1961年，Ky Fan将经典的KKM定理从有限维空间推广到无限维空间，此后，该定理已成为非线性分析中非常通用的工具。本文的主要目的是在拓扑空间的非凸设置下推广KKM定理。此外，作为其应用，在没有任何凸结构和线性结构的一般拓扑空间中获得了鞍点问题的存在性定理和非合作博弈的纳什均衡问题。我们的结果改进并统一了最近已有文献中的相应结果。

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《International Workshop on Education Technology and Computer Science;ETCS 2009》|2009年|320-323|共4页
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Haishu Lu;
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combinatorial mathematics; fixed point arithmetic; game theory; minimax techniques; Brouwer fixed point theorem; Fan minimax inequality; Knaster-Kuratowski-Mazurkiewicz theorem; Nash equilibrium problem; Sperner lemma; convexity structure; finite dimensional spaces; generalized KKM theorem; infinite dimensional spaces; linear structure; noncooperative games; nonlinear analysis; saddle point; KKM mapping; Nash equilibrium; diagonally quasiconvex (quasiconcave); intersection theorem; topological spaces;

机译：组合数学;不动点算术;博弈论;极小极大值技术; Brouwer不动点定理; Fan极小极大不等式; Knaster-Kuratowski-Mazurkiewicz定理;纳什均衡问题; Sperner引理;凸性结构;有限维空间;广义KKM定理;无穷维空间线性结构非合作博弈非线性分析鞍点KKM映射Nash平衡对角拟凸（拟凹）交定理拓扑空间;
入库时间 2022-08-26 14:59:39

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1. Generalized KKM theorem with applications to generalized minimax inequalities and generalized equilibrium problems [J] . Zeng LC, Wu SY, Yao JC Taiwanese journal of mathematics . 2006,第6期

机译：广义KKM定理及其在广义极小不等式和广义平衡问题中的应用。
2. KKM type theorems with applications to generalized vector equilibrium problems in FC-spaces [J] . Min Fang, Nan-jing Huang Nonlinear Analysis: An International Multidisciplinary Journal . 2007,第3期

机译：KKM型定理及其在FC空间中的广义矢量平衡问题的应用
3. Generalized G-KKM theorems in generalized convex spaces and their applications [J] . Ding MP. Journal of Mathematical Analysis and Applications . 2002,第1期

机译：广义凸空间中的广义G-KKM定理及其应用
4. A Generalized KKM Theorem and its Applications to Saddle Point and Nash Equilibrium Problem [C] . Haishu Lu International Workshop on Education Technology and Computer Science . 2009

机译：广义KKM定理及其在鞍点和纳什均衡问题中的应用
5. Generalized Nash games with shared constraints: Existence, efficiency, refinement and equilibrium constraints. [D] . Kulkarni, Ankur A. 2010

机译：具有共享约束的广义Nash游戏：存在性，效率，细化和平衡约束。
6. Fixed Point Theorems for Generalized α-β-Weakly Contraction Mappings in Metric Spaces and Applications [O] . Abdul Latif, Chirasak Mongkolkeha, Wutiphol Sintunavarat -1

机译：度量空间中广义α-β-弱压缩映射的不动点定理及其应用
7. Generalized G-KKM Theorems in Generalized Convex Spaces and Their Applications [O] . Ding Xie Ping 2002

机译：广义凸空间中的广义G-KKM定理及其应用
8. A Further Generalization of the Kakutani Fixed Point Theorem, with Application to Nash Equilibrium Points [R] . Glicksberg, I. L. 1951

机译：Kakutani不动点定理的进一步推广及其在纳什均衡点上的应用

A Generalized KKM Theorem and its Applications to Saddle Point and Nash Equilibrium Problem

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