A Game Theoretic-Mathematical Programming Analysis of Cooperative Phenomena in Oligopolistic Markets

This paper investigates cooperative behavior in an industry that supplies a homogeneous product and consists of oligopolistic firms. The analysis is conducted within a game theoretic framework in which each firm is viewed as a player whose strategy is its level of production. By defining a suitable characteristic function that evaluates the worth of each possible coalition, we attempt to quantify the individual and collective bargaining powers of firms in order to predict merger or contractual agreements and production strategies. In particular, we define three games via three characteristic functions, each of which is based upon some assumed market behavior on the part of the players. For each game, we investigate whether the firms would choose to remain separate or form a grand coalition or some other coalition structure. For some insightful special cases, we are able to establish the resulting outcome and assert whether a core allocation of profits among members of an emerging coalition exists and whether the Shapley value allocation belongs to the core. In the more general case, we use the U.S. copper industry as an example to illustrate how Shapley values may be used to determine possible emerging coalition structures.

[1]  Lloyd S. Shapley,et al.  On balanced sets and cores , 1967 .

[2]  E. Chamberlin The Theory of Monopolistic Competition , 1933 .

[3]  J. Harsanyi A bargaining model for the cooperative n-person game , 1958 .

[4]  William F. Lucas,et al.  An Overview of the Mathematical Theory of Games , 1972 .

[5]  G. Mandelker Risk and return: The case of merging firms , 1974 .

[6]  R. Aumann,et al.  THE BARGAINING SET FOR COOPERATIVE GAMES , 1961 .

[7]  James W. Friedman,et al.  Oligopoly and the theory of games , 1977 .

[8]  J. Mossin,et al.  Merger Agreements: Some Game-Theoretic Considerations , 1968 .

[9]  L. Shapley,et al.  ON MARKET GAMES , 1969, Classics in Game Theory.

[10]  Wilbur G. Lewellen A PURE FINANCIAL RATIONALE FOR THE CONGLOMERATE MERGER , 1971 .

[11]  F. Scherer,et al.  Industrial Market Structure and Economic Performance. , 1971 .

[12]  R. J. Aumann,et al.  Cooperative games with coalition structures , 1974 .

[13]  L. Shapley,et al.  PURE COMPETITION, COALITIONAL POWER, AND FAIR DIVISION* , 1969 .

[14]  R. Aumann The core of a cooperative game without side payments , 1961 .

[15]  L. Shapley Cores of convex games , 1971 .

[16]  Martin Shubik,et al.  Oligopoly, Theory, Communication and Information , 1975 .

[17]  Augustin M. Cournot Cournot, Antoine Augustin: Recherches sur les principes mathématiques de la théorie des richesses , 2019, Die 100 wichtigsten Werke der Ökonomie.

[18]  S. Hart,et al.  On the endogenous formation of coalitions , 1983 .

[19]  Michael D. Intriligator,et al.  Mathematical optimization and economic theory , 1971 .

[20]  J. Nash NON-COOPERATIVE GAMES , 1951, Classics in Game Theory.