We study Tullock's (1980) n-player contest when each player has an independent probability 0 < p 2 individual equilibrium spending as a function of p is single-peaked and satisfies a single-crossing property for any two different numbers of potential players. However, total equilibrium spending is monotonically increasing in p and n. We also demonstrate that ex-post over-dissipation is a feature of the pure-strategy equilibrium in our model. It turns out that if the contest designer can strategically decide whether to reveal the actual number of participating players or not, then the actual number of participants is always revealed
This note introduces a model of contests with random noise and a shared prize that combines features...
This paper presents a strategic model of risk-taking behavior in contests. Formally, we analyze an n...
We analyze (non-deterministic) contests with anonymous contest success functions. There is no restri...
We study Tullock’s (1980) n-player contest when each player has an independent prob-ability 0 < p...
Contests are economic or social interactions in which two or more players expend costly resources in...
In imperfectly discriminating contests with symmetric valuations, equilibrium payoffs are positive s...
textabstractThis paper reconsiders Tullock's analysis of rent seeking and wasteful overdissipation. ...
This paper models success probability in imperfectly discriminating contests involving multiple play...
We show that under standard assumptions a Tullock contest with asymmetric information has a pure st...
We study tournaments with many ex-ante asymmetric contestants, whose valuations for the prize are in...
This paper shows how to maximize revenue when a contest is noisy. We consider a case where two or mo...
We construct a generalized Tullock contest under complete information where contingent upon winning ...
It is shown that the equilibrium in the asymmetric Tullock contest is unique for parameter values r ...
We explore the relationship between the choice of the strategy space and outcomes in Tullock contest...
We show that the optimal prize structure of symmetric n-player Tullock tournaments assigns the entir...
This note introduces a model of contests with random noise and a shared prize that combines features...
This paper presents a strategic model of risk-taking behavior in contests. Formally, we analyze an n...
We analyze (non-deterministic) contests with anonymous contest success functions. There is no restri...
We study Tullock’s (1980) n-player contest when each player has an independent prob-ability 0 < p...
Contests are economic or social interactions in which two or more players expend costly resources in...
In imperfectly discriminating contests with symmetric valuations, equilibrium payoffs are positive s...
textabstractThis paper reconsiders Tullock's analysis of rent seeking and wasteful overdissipation. ...
This paper models success probability in imperfectly discriminating contests involving multiple play...
We show that under standard assumptions a Tullock contest with asymmetric information has a pure st...
We study tournaments with many ex-ante asymmetric contestants, whose valuations for the prize are in...
This paper shows how to maximize revenue when a contest is noisy. We consider a case where two or mo...
We construct a generalized Tullock contest under complete information where contingent upon winning ...
It is shown that the equilibrium in the asymmetric Tullock contest is unique for parameter values r ...
We explore the relationship between the choice of the strategy space and outcomes in Tullock contest...
We show that the optimal prize structure of symmetric n-player Tullock tournaments assigns the entir...
This note introduces a model of contests with random noise and a shared prize that combines features...
This paper presents a strategic model of risk-taking behavior in contests. Formally, we analyze an n...
We analyze (non-deterministic) contests with anonymous contest success functions. There is no restri...