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Coalitional Bargaining Games with Random Proposers: Theory and Application
http://hdl.handle.net/10086/16934
http://hdl.handle.net/10086/1693467d741cc-2cca-48ea-b862-6d77a699ebea
| 名前 / ファイル | ライセンス | アクション |
|---|---|---|
070econDP07-10.pdf (420694 bytes)
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| アイテムタイプ | デフォルトアイテムタイプ(フル)その2(1) | |||||||||
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| 公開日 | 2017-05-20 | |||||||||
| タイトル | ||||||||||
| タイトル | Coalitional Bargaining Games with Random Proposers: Theory and Application | |||||||||
| 言語 | en | |||||||||
| 作成者 |
岡田, 章
× 岡田, 章
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| アクセス権 | ||||||||||
| アクセス権 | open access | |||||||||
| アクセス権URI | http://purl.org/coar/access_right/c_abf2 | |||||||||
| 出版者 | ||||||||||
| 出版者 | Graduate School of Economics, Hitotsubashi University | |||||||||
| 日付 | ||||||||||
| 日付 | 2007-09 | |||||||||
| 日付タイプ | Issued | |||||||||
| 言語 | ||||||||||
| 言語 | eng | |||||||||
| 資源タイプ | ||||||||||
| 資源タイプ識別子 | http://purl.org/coar/resource_type/c_18gh | |||||||||
| 資源タイプ | technical report | |||||||||
| 出版タイプ | ||||||||||
| 出版タイプ | VoR | |||||||||
| 出版タイプResource | http://purl.org/coar/version/c_970fb48d4fbd8a85 | |||||||||
| 関連情報 | ||||||||||
| 関連タイプ | isPartOf | |||||||||
| 関連名称 | Discussion papers ; No. 2007-10 | |||||||||
| ページ数 | ||||||||||
| ページ数 | 47 | |||||||||
| 抄録(第三者提供不可) | ||||||||||
| 値 | We consider a noncooperative coalitional bargaining game with random proposers. In a general case that the recognition probability is arbitrary andplayers have different discount factors for future payoffs, the existence of a stationary subgame perfect equilibrium (SSPE) is proved, and the condition for the grand coalition to be formed is provided. We also prove that the grand-coalition SSPE is a unique symmetric SSPE for any discount factor in a symmetric game with nonempty core. In the last part of the paper, we apply the bargaining model to a production economy with one employer and multiple workers. When players are sufficiently patient, the economy has a unique SSPE payoff. The equilibrium allocation is compared with cooperative solutions such as the core, the Shapley value and the nucleolus. The SSPE payoff and the nucleolus have similar distributional properties. | |||||||||
