This paper revisits the problem of adverse selection in the insurance market of Rothschild and Stiglitz (1976). We extend the three-stage game in Hellwig (1987) by allowing firms to endogenously choose whether or not to pre-commit on their contractual offers (menus). We show how this mechanism can deliver the Miyazaki–Wilson–Spence allocation as the unique perfect-Bayesian equilibrium. This allocation is the unique incentive-efficient and individually-rational maximizer of the utility of the most profitable type. In fact, given that the informed player has only two types, it is the unique core allocation and thus the unique neutral optimum in the sense of Myerson (1983)
We show that an equilibrium always exists in the Rothschild-Stiglitz insurance market model with adv...
There is a general presumption that competition is a good thing. In this paper we show that competi...
We study competitive economies with adverse selection and fully exclusive contractual relationships....
This paper revisits the problem of adverse selection in the insurance market of Rothschild and Stigl...
This paper revisits the problem of adverse selection in the insurance market of Rothschild and Stigl...
This paper revisits the problem of adverse selection in the insurance market of Rothschild and Stigl...
This paper revisits the problem of adverse selection in the insurance market of Rothschild and Stig...
We show that an equilibrium always exists in the Rothschild-Stiglitz insurance market model with adv...
There is a general presumption that competition is a good thing. In this paper we show that competit...
Working paperIn a class of informed principal problems with common values often used in applications...
We study insurance markets in which privately informed consumers can purchase coverage from several ...
We study insurance markets in which privately informed consumers can purchase coverage from several...
This paper studies the Rothschild and Stiglitz (1976) adverse selection environment, relaxing the as...
We consider a model of competitive insurance markets under asymmetric information with ambiguity-ave...
In this survey we present some of the more significant results in the literature on adverse selectio...
We show that an equilibrium always exists in the Rothschild-Stiglitz insurance market model with adv...
There is a general presumption that competition is a good thing. In this paper we show that competi...
We study competitive economies with adverse selection and fully exclusive contractual relationships....
This paper revisits the problem of adverse selection in the insurance market of Rothschild and Stigl...
This paper revisits the problem of adverse selection in the insurance market of Rothschild and Stigl...
This paper revisits the problem of adverse selection in the insurance market of Rothschild and Stigl...
This paper revisits the problem of adverse selection in the insurance market of Rothschild and Stig...
We show that an equilibrium always exists in the Rothschild-Stiglitz insurance market model with adv...
There is a general presumption that competition is a good thing. In this paper we show that competit...
Working paperIn a class of informed principal problems with common values often used in applications...
We study insurance markets in which privately informed consumers can purchase coverage from several ...
We study insurance markets in which privately informed consumers can purchase coverage from several...
This paper studies the Rothschild and Stiglitz (1976) adverse selection environment, relaxing the as...
We consider a model of competitive insurance markets under asymmetric information with ambiguity-ave...
In this survey we present some of the more significant results in the literature on adverse selectio...
We show that an equilibrium always exists in the Rothschild-Stiglitz insurance market model with adv...
There is a general presumption that competition is a good thing. In this paper we show that competi...
We study competitive economies with adverse selection and fully exclusive contractual relationships....