We study a class of games featuring payoff functions where best reply functions are orthogonal and therefore the pure-strategy non-cooperative solution is attained as a Nash equilibrium in dominant strategies. We prove that the resulting threshold of the discount factor above which implicit collusion on the Pareto frontier is stable in the infinite supergames is independent of the number of players. This holds irrespective of whether punishment is based on infinite Nash reversion or one-shot stick-and-carrot strategy. We outline two examples stemming from economic theory and one from international relations
We study collusion within groups in non-cooperative games. The primitives are the preferences of the...
We study anonymous repeated games where players may be “commitment types” who always take the same ...
The folk theorem characterizes the (subgame perfect) Nash equilibrium payoffs of an undiscounted or ...
We study a class of games featuring payo ¤ functions being par-abolic cylinders where best reply fun...
We study a class of games featuring payoff functions being parabolic cylinders where best reply func...
Various Nash equilibrium results for a broad class of aggregative games are presented. The main ones...
The 'folk theorem ' formalizes the theme that 'repetition leads to cooperation'....
We study aggregative games in which players ’ strategy sets are convex intervals of the real line an...
The n-player public goods game, the basic model of decentralized social cooperation in non-market se...
Arantza Estévez-Fernández for comments on a previous draft. Three well-known solutions for coopera...
In game theory, the concept of Nash equilibrium reflects the collectivestability of some individual ...
We introduce a framework of noncooperative pregames, in which players are characterized by their att...
This paper investigates infinitely repeated prisoner-dilemma games where the discount factor is less...
¤This paper continues research initiated in Wooders, Cartwright and Selten (2001). We are indebted t...
Cooperative games with non-transferable utility (NTU) and under asymmetric information are studied f...
We study collusion within groups in non-cooperative games. The primitives are the preferences of the...
We study anonymous repeated games where players may be “commitment types” who always take the same ...
The folk theorem characterizes the (subgame perfect) Nash equilibrium payoffs of an undiscounted or ...
We study a class of games featuring payo ¤ functions being par-abolic cylinders where best reply fun...
We study a class of games featuring payoff functions being parabolic cylinders where best reply func...
Various Nash equilibrium results for a broad class of aggregative games are presented. The main ones...
The 'folk theorem ' formalizes the theme that 'repetition leads to cooperation'....
We study aggregative games in which players ’ strategy sets are convex intervals of the real line an...
The n-player public goods game, the basic model of decentralized social cooperation in non-market se...
Arantza Estévez-Fernández for comments on a previous draft. Three well-known solutions for coopera...
In game theory, the concept of Nash equilibrium reflects the collectivestability of some individual ...
We introduce a framework of noncooperative pregames, in which players are characterized by their att...
This paper investigates infinitely repeated prisoner-dilemma games where the discount factor is less...
¤This paper continues research initiated in Wooders, Cartwright and Selten (2001). We are indebted t...
Cooperative games with non-transferable utility (NTU) and under asymmetric information are studied f...
We study collusion within groups in non-cooperative games. The primitives are the preferences of the...
We study anonymous repeated games where players may be “commitment types” who always take the same ...
The folk theorem characterizes the (subgame perfect) Nash equilibrium payoffs of an undiscounted or ...