Rubinstein and Wolinsky (1990) show that a simple homogeneous market with exogenous matching has continuum of (non-competitive) perfect equilibria, but the unique Markov perfect equilibrium is competitive. By contrast, in the more general case of heterogeneous markets, we show there exists a continuum of (non-competitive) Markov perfect equilibria. However, a refinement of the Markov property, which we call monotonicity, does suffice to guarantee perfectly competitive equilibria, if, and only if, it is monotonic. The monotonicity property is closely related to the concept of Nash equilibrium with complexity costs
We study two-person extensive form games, or "matches," in which the only possible outcomes (if the ...
The paper proves, by construction, the existence of Markovian equilibria in a dynamic spatial legisl...
We study a decentralized trading model as in Peters (1984), where heterogeneous market participants ...
Rubinstein and Wolinsky [Rev. Econ. Stud. 57 (1990) 63] show that a simple homogeneous market with e...
The paper studies stationary Markov perfect equilibria in multidimensional models of dynamic bargain...
Rubinstein and Wolinsky (Rev. Econ. Stud. 57 (1990) 63-78) consider a simple decentralised market ga...
This paper uses the complexity of non-competitive behaviour to provide a new justification for compe...
peer reviewedThis paper studies stationary Markov perfect equilibria in multidimensional models of d...
Artículo de publicación ISIMotivated by recent developments in applied dynamic analysis, this paper ...
This paper extends the model developed in “Complexity and Competition” (Gale and Sabourian, Economet...
This paper extends the bargaining and matching literature such as Rubinstein (1985) and Gale (1986 a...
This paper shows the robust non-existence of competitive equilibria even in a simple three period re...
We study bargaining on the division of a surplus in the presence of monotonicity constraints. The mo...
I consider an alternating offer bargaining game which is played by a risk neutral buyer and seller, ...
We study two-person extensive form games, or “matches, ” in which the only possible out-comes (if th...
We study two-person extensive form games, or "matches," in which the only possible outcomes (if the ...
The paper proves, by construction, the existence of Markovian equilibria in a dynamic spatial legisl...
We study a decentralized trading model as in Peters (1984), where heterogeneous market participants ...
Rubinstein and Wolinsky [Rev. Econ. Stud. 57 (1990) 63] show that a simple homogeneous market with e...
The paper studies stationary Markov perfect equilibria in multidimensional models of dynamic bargain...
Rubinstein and Wolinsky (Rev. Econ. Stud. 57 (1990) 63-78) consider a simple decentralised market ga...
This paper uses the complexity of non-competitive behaviour to provide a new justification for compe...
peer reviewedThis paper studies stationary Markov perfect equilibria in multidimensional models of d...
Artículo de publicación ISIMotivated by recent developments in applied dynamic analysis, this paper ...
This paper extends the model developed in “Complexity and Competition” (Gale and Sabourian, Economet...
This paper extends the bargaining and matching literature such as Rubinstein (1985) and Gale (1986 a...
This paper shows the robust non-existence of competitive equilibria even in a simple three period re...
We study bargaining on the division of a surplus in the presence of monotonicity constraints. The mo...
I consider an alternating offer bargaining game which is played by a risk neutral buyer and seller, ...
We study two-person extensive form games, or “matches, ” in which the only possible out-comes (if th...
We study two-person extensive form games, or "matches," in which the only possible outcomes (if the ...
The paper proves, by construction, the existence of Markovian equilibria in a dynamic spatial legisl...
We study a decentralized trading model as in Peters (1984), where heterogeneous market participants ...