The paper studies stationary Markov perfect equilibria in multidimensional models of dynamic bargaining, in which the alternative chosen in one period determines the status quo for the next. We generalize a sufficient condition for existence of equilibrium due to Anesi and Seidmann (2015). We then use this existence result to show that if a weak gradient restriction holds at an alternative, then when players are sufficiently patient, there is a continuum of equilibria with absorbing sets arbitrarily close to that alternative. A sufficient condition for our gradient restriction is that the gradients of all players' utilities are linearly independent at that alternative. When the dimensionality of the set of alternatives is high, this line...
We present a model of bargaining in which a committee searches over the pol-icy space, successively ...
Rubinstein and Wolinsky [Rev. Econ. Stud. 57 (1990) 63] show that a simple homogeneous market with e...
Abstract. We study dynamic markets in which participants are randomly matched to bargain over the pr...
The paper studies stationary Markov perfect equilibria in multidimensional models of dynamic bargain...
peer reviewedThis paper studies stationary Markov perfect equilibria in multidimensional models of d...
The paper proves, by construction, the existence of Markovian equilibria in a dynamic spatial legisl...
This note examines the structure of stationary bargaining equilibria in the finite framework of Anes...
peer reviewedThis note examines the structure of stationary bargaining equilibria in the finite fram...
Abstract We prove existence of stationary Markov perfect equilibria in an infinite-horizon model of ...
The paper proves, by construction, the existence of Markovian equilibria in a dynamic spatial legisl...
We analyze an infinitely repeated divide-the-dollar bargaining game with an endogenous reversion poi...
Rubinstein and Wolinsky (1990) show that a simple homogeneous market with exogenous matching has co...
This paper takes up the foundational issue of existence of stationary subgame perfect equi- libria i...
This paper examines existence of Markov equilibria in the class of dynamic political games (DPGs). D...
We study the Markov perfect equilibria (MPEs) of an infinite horizon game in which pairs of players ...
We present a model of bargaining in which a committee searches over the pol-icy space, successively ...
Rubinstein and Wolinsky [Rev. Econ. Stud. 57 (1990) 63] show that a simple homogeneous market with e...
Abstract. We study dynamic markets in which participants are randomly matched to bargain over the pr...
The paper studies stationary Markov perfect equilibria in multidimensional models of dynamic bargain...
peer reviewedThis paper studies stationary Markov perfect equilibria in multidimensional models of d...
The paper proves, by construction, the existence of Markovian equilibria in a dynamic spatial legisl...
This note examines the structure of stationary bargaining equilibria in the finite framework of Anes...
peer reviewedThis note examines the structure of stationary bargaining equilibria in the finite fram...
Abstract We prove existence of stationary Markov perfect equilibria in an infinite-horizon model of ...
The paper proves, by construction, the existence of Markovian equilibria in a dynamic spatial legisl...
We analyze an infinitely repeated divide-the-dollar bargaining game with an endogenous reversion poi...
Rubinstein and Wolinsky (1990) show that a simple homogeneous market with exogenous matching has co...
This paper takes up the foundational issue of existence of stationary subgame perfect equi- libria i...
This paper examines existence of Markov equilibria in the class of dynamic political games (DPGs). D...
We study the Markov perfect equilibria (MPEs) of an infinite horizon game in which pairs of players ...
We present a model of bargaining in which a committee searches over the pol-icy space, successively ...
Rubinstein and Wolinsky [Rev. Econ. Stud. 57 (1990) 63] show that a simple homogeneous market with e...
Abstract. We study dynamic markets in which participants are randomly matched to bargain over the pr...