We provide game-theoretic foundations for the median voter theorem in a one-dimensional bargaining model based on Baron and Ferejohn’s (1989) model of distributive politics. We prove that, as the agents become arbitrarily patient, the set of proposals that can be passed in any subgame perfect equilibrium collapses to the median voter’s ideal point. While we leave the possibility of some delay, we prove that the agents’ equilibrium continuation payoffs converge to the utility from the median, so that delay, if it occurs, is inconsequential. We do not impose stationarity or any other refinements. Our result counters intuition based on the folk theorem for repeated games, and it contrasts with the known result for the distributive bargaining m...
We study the division of a surplus under majoritarian bargaining in the three-person case. In a stat...
We present a model of bargaining in which a committee searches over the policy space, successively a...
We study the division of a surplus under majoritarian bargaining in the three-person case. In a stat...
We provide strong game-theoretic foundations for the median voter theorem in a one-dimensional barga...
We give a game-theoretic foundation for the median voter theorem in a one-dimensional bargaining mod...
We present a general model of legislative bargaining in which the status quo is an arbitrary point i...
We consider negotiations selecting one-dimensional policies. Individuals have single-peaked preferen...
We present a general model of legislative bargaining in which the status quo is an arbitrary point ...
We study a process of bargaining over alternatives represented by points in the unit interval. The p...
We analyze a model of \u27postelection politics\u27, in which (unlike in the more common Downsian mo...
We address the problem of how a set of agents can decide to share a resource, represented as a unit-...
peer reviewedWe present a model of bargaining in which a committee searches over the pol-icy space, ...
We study dynamic committee bargaining over an infinite horizon with discounting. In each period a co...
We study the division of a surplus under majoritarian bargaining in the three-person case. In a stat...
We present a model of bargaining in which a committee searches over the policy space, successively a...
We study the division of a surplus under majoritarian bargaining in the three-person case. In a stat...
We provide strong game-theoretic foundations for the median voter theorem in a one-dimensional barga...
We give a game-theoretic foundation for the median voter theorem in a one-dimensional bargaining mod...
We present a general model of legislative bargaining in which the status quo is an arbitrary point i...
We consider negotiations selecting one-dimensional policies. Individuals have single-peaked preferen...
We present a general model of legislative bargaining in which the status quo is an arbitrary point ...
We study a process of bargaining over alternatives represented by points in the unit interval. The p...
We analyze a model of \u27postelection politics\u27, in which (unlike in the more common Downsian mo...
We address the problem of how a set of agents can decide to share a resource, represented as a unit-...
peer reviewedWe present a model of bargaining in which a committee searches over the pol-icy space, ...
We study dynamic committee bargaining over an infinite horizon with discounting. In each period a co...
We study the division of a surplus under majoritarian bargaining in the three-person case. In a stat...
We present a model of bargaining in which a committee searches over the policy space, successively a...
We study the division of a surplus under majoritarian bargaining in the three-person case. In a stat...