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イノウエ トモキ
INOUE Tomoki
井上 朋紀 所属 明治大学 政治経済学部 職種 専任講師 |
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| 言語種別 | 英語 |
| 発行・発表の年月 | 2021 |
| 形態種別 | 学術雑誌 |
| 査読 | 査読あり |
| 標題 | Coincidence theorem and the inner core |
| 執筆形態 | 単著 |
| 掲載誌名 | Pure and Applied Functional Analysis |
| 出版社・発行元 | Yokohama Publishers |
| 巻・号・頁 | 6(4),pp.761-775 |
| 総ページ数 | 15 |
| 概要 | We provide two coincidence theorems that are useful mathematical tools for proving the nonemptiness of the inner core. The inner core is a refinement of the core of non-transferable utility (NTU) games. Our first coincidence theorem is a synthesis of Brouwer's fixed point theorem and Debreu and Schmeidler's separation theorem for convex sets. Our second coincidence theorem is a modification of the first one in order for two correspondences to have a nonempty intersection at a strictly positive vector. Inoue's theorem on the nonemptiness of the inner core follows from our first coincidence theorem and an assumption on the efficient surface of payoff vectors for the grand coalition. Our coincidence theorems are suitable for proving the nonemptiness of the inner core in the sense that one of the assumptions in our first coincidence theorem is equivalence to the cardinal balancedness of an NTU game when two correspondences are defined properly. |