Strategic transfers between cooperative games
研究同一组玩家参与多个合作博弈时,玩家可独立在不同博弈间转移价值,分析两种转移系统下非合作博弈的纳什均衡存在性与特征。
We consider a model where the same group of players is involved in more than one cooperative (transferable utility) game. A rule determines the payoffs per game, and for each player a utility function evaluates the resulting vector of payoffs. We assume that each player, independently, can make transfers of worth between different games, thereby affecting its payoff vector and, thus, utility. Two transfer systems are considered, resulting in two distinct noncooperative games, and the focus of the paper is on establishing existence and a characterization of Nash equilibria in these games.