The Journal of the Indian Mathematical Society

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Existence Theorems of Equilibria in G-Convex Spaces for GLC-Majorized Correspondences


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1 Department of Mathematics, The University of Queensland, Brisbane, Queensland-4072, Australia
     

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A fixed point theorem is proved in G-convex spaces (introduced by Park and Kim [17]). As applications of the fixed point theorem some existence theorems of maximal elements for GLC correspondences and GLC majorized correspondences are obtained. Applying the existence theorems of maximal elements, some equilibrium existence theorems for one-person games, qualitative games and non-compact generalized games are given. These results are generalization, into G-convex spaces, of the corresponding results due to Border, Borglin-Keiding, Chang, Ding-Tan, Ding-Kim-Tan, Shafer-Sonnenschein, Tan-Yuan. Toussaint, Tulcea and Yannaelis-Prabhakar.
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  • Existence Theorems of Equilibria in G-Convex Spaces for GLC-Majorized Correspondences

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Authors

Mohammad S. R. Chowdhury
Department of Mathematics, The University of Queensland, Brisbane, Queensland-4072, Australia
E. Tarafdar
Department of Mathematics, The University of Queensland, Brisbane, Queensland-4072, Australia
George X. Z. Yuan
Department of Mathematics, The University of Queensland, Brisbane, Queensland-4072, Australia

Abstract


A fixed point theorem is proved in G-convex spaces (introduced by Park and Kim [17]). As applications of the fixed point theorem some existence theorems of maximal elements for GLC correspondences and GLC majorized correspondences are obtained. Applying the existence theorems of maximal elements, some equilibrium existence theorems for one-person games, qualitative games and non-compact generalized games are given. These results are generalization, into G-convex spaces, of the corresponding results due to Border, Borglin-Keiding, Chang, Ding-Tan, Ding-Kim-Tan, Shafer-Sonnenschein, Tan-Yuan. Toussaint, Tulcea and Yannaelis-Prabhakar.