Aggregative game

In game theory, an aggregative game is a game in which every player’s payoff is a function of the player’s own strategy and the aggregate of all players’ strategies. The concept was first proposed by Nobel laureate Reinhard Selten in 1970 who considered the case where the aggregate is the sum of the players' strategies.

Definition

Consider a standard non-cooperative game with n players, where is the strategy set of player i, is the joint strategy set, and is the payoff function of player i. The game is then called an aggregative game if for each player i there exists a function such that for all :

In words, payoff functions in aggregative games depend on players' own strategies and the aggregate . As an example, consider the Cournot model where firm i has payoff/profit function (here and are, respectively, the inverse demand function and the cost function of firm i). This is an aggregative game since where .

Generalizations

A number of generalizations of the standard definition of an aggregative game have appeared in the literature. A game is generalized aggregative[1] if there exists an additively separable function (i.e., if there exist increasing functions such that ) such that for each player i there exists a function such that for all . Obviously, any aggregative game is generalized aggregative as seen by taking . A more general definition still is that of quasi-aggregative games where agents' payoff functions are allowed to depend on different functions of opponents' strategies.[2] Aggregative games can also be generalized to allow for infinitely many players in which case the aggregator will typically be an integral rather than a linear sum.[3] Aggregative games with a continuum of players are frequently studied in mean field game theory.

Properties

See also

Notes

  1. 1 2 Cornes, R.; Harley, R. (2012). "Fully Aggregative Games". Economic Letters. 116. pp. 631–633.
  2. 1 2 Jensen, M.K. (2010). "Aggregative Games and Best-Reply Potentials". Economic Theory. 43. pp. 45–66.
  3. Acemoglu, D.; Jensen, M.K. (2010). "Robust Comparative Statics in Large Static Games". IEEE Proceedings on Decision and Control. 49. pp. 3133–3139.
  4. 1 2 Novshek, W. (1985). "On the Existence of Cournot Equilibrium". Review of Economic Studies. 52. pp. 86–98.
  5. Dubey, P.; Haimanko, O.; Zapechelnyuk, A. (2006). "Strategic Complements and Substitutes, and Potential Games". Games and Economic Behavior. 54. pp. 77–94.
  6. Corchon, L. (1994). "Comparative Statics for Aggregative Games. The Strong Concavity Case". Mathematical Social Sciences. 28. pp. 151–165.
  7. Acemoglu, D.; Jensen, M.K. (2013). "Aggregate Comparative Statics". Games and Economic Behavior. 81. pp. 27–49.

References

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