We study Bayesian Nash equilibria of stable mechanisms in centralized matching markets under incomplete information. We show that truth-telling is a Bayesian Nash equilibrium of the revelation game induced by a common belief and a stable mechanism if and only if all the profiles in the support of the common belief have singleton cores. Our result matches the observa-tions of Roth and Peranson (1999) in the National Resident Matching Program (NRMP) in the United States: (i) the cores of the profiles submitted to the clearinghouse are small and (ii) while truth-telling is not a dominant strategy most participants of the NRMP truthfully reveal their preferences
We consider a variant of the Tullock lottery contest. Each player’s constant marginal cost of effort...
The literature on imperfectly discriminating contests has almost exclusively focused on complete inf...
A large literature uses matching models to analyze markets with two-sided heterogeneity, studying pr...
We study Bayesian Nash equilibria of stable mechanisms in centralized matching markets under incompl...
We study Bayesian Nash equilibria of stable mechanisms in centralized matching markets under incompl...
We study ordinal Bayesian Nash equilibria of stable mechanisms in centralized matching markets under...
We are the first to introduce incomplete information to centralized many-to-one matching markets suc...
We are the first to introduce incomplete information to centralized many-to-one matching markets suc...
Many centralized two-sided markets form a matching between participantsby running a stable marriage ...
We analyze a dynamic search and matching model with non-transferable utility and asymmetric informat...
We relax the assumption that priors are common knowledge, in the stan-dard model of games of incompl...
We test the effect of the amount of information on the strategies played by others in the theoretica...
ABSTRACT:We construct an elementary mechanism (Dutta-Sen-Vohra (1995)) that Nash implements the Cons...
Studying games in the complete information model makes them analytically tractable. How-ever, large ...
We construct an elementary mechanism (Dutta, Sen and Vohra (1995)) that Nash implements the Constrai...
We consider a variant of the Tullock lottery contest. Each player’s constant marginal cost of effort...
The literature on imperfectly discriminating contests has almost exclusively focused on complete inf...
A large literature uses matching models to analyze markets with two-sided heterogeneity, studying pr...
We study Bayesian Nash equilibria of stable mechanisms in centralized matching markets under incompl...
We study Bayesian Nash equilibria of stable mechanisms in centralized matching markets under incompl...
We study ordinal Bayesian Nash equilibria of stable mechanisms in centralized matching markets under...
We are the first to introduce incomplete information to centralized many-to-one matching markets suc...
We are the first to introduce incomplete information to centralized many-to-one matching markets suc...
Many centralized two-sided markets form a matching between participantsby running a stable marriage ...
We analyze a dynamic search and matching model with non-transferable utility and asymmetric informat...
We relax the assumption that priors are common knowledge, in the stan-dard model of games of incompl...
We test the effect of the amount of information on the strategies played by others in the theoretica...
ABSTRACT:We construct an elementary mechanism (Dutta-Sen-Vohra (1995)) that Nash implements the Cons...
Studying games in the complete information model makes them analytically tractable. How-ever, large ...
We construct an elementary mechanism (Dutta, Sen and Vohra (1995)) that Nash implements the Constrai...
We consider a variant of the Tullock lottery contest. Each player’s constant marginal cost of effort...
The literature on imperfectly discriminating contests has almost exclusively focused on complete inf...
A large literature uses matching models to analyze markets with two-sided heterogeneity, studying pr...