The private value of a patent: A cooperative approach

We consider a game in coalitional form played by the firms of a Cournot industry and an outside patent holder of a cost-reducing innovation. The worth of a coalition of players is the total Cournot profit of the active firms within this coalition. The number of firms that a coalition activates is determined by the Nash equilibrium of the game played by the coalition and its complement, where the strategy of each is the number of firms to be activated. Only firms in a coalition containing the patent holder are allowed to use the new technology. We prove that when the industry size increases indefinitely, the Shapley value of the patent holder approximates the payoff he obtains in a standard non-cooperative setup where he has the entire bargaining power. We also examine a partition game which considers for every coalition all structures of its complement, namely all partitions of the complement into sub-coalitions. The coalition and every sub-coalition of the complement simultaneously decide how many of their firms to be activated. We prove a similar equivalence result for an extension of the Shapley value from coalitional games to partition games.

[1]  Roger B. Myerson,et al.  Graphs and Cooperation in Games , 1977, Math. Oper. Res..

[2]  Michael L. Katz,et al.  On the licensing of innovations , 1985 .

[3]  Yves Richelle,et al.  Optimal Licensing Contracts and the Value of a Patent , 2007 .

[4]  Yair Tauman,et al.  On the value of information in a strategic conflict , 1990 .

[5]  C. Shapiro,et al.  How to License Intangible Property , 1986 .

[6]  David Wettstein,et al.  Sharing the surplus: An extension of the Shapley value for environments with externalities , 2007, J. Econ. Theory.

[7]  Yair Tauman,et al.  General licensing schemes for a cost-reducing innovation , 2007, Games Econ. Behav..

[8]  Y. Tauman,et al.  Fees Versus Royalties and the Private Value of a Patent , 1986 .

[9]  D. Schmeidler The Nucleolus of a Characteristic Function Game , 1969 .

[10]  J. Neumann,et al.  Theory of games and economic behavior , 1945, 100 Years of Math Milestones.

[11]  Y. Tauman,et al.  The Shapley Value of a Patent Licensing Game: the Asymptotic Equivalence to Non-cooperative Results , 2006 .

[12]  E. M. Bolger A set of axioms for a value for partition function games , 1989 .

[13]  L. Shapley A Value for n-person Games , 1988 .

[14]  Geoffroy de Clippel Marginal Contributions and Externalities in the Value , 2007 .

[15]  Philip Wolfe,et al.  Contributions to the theory of games , 1953 .

[16]  R. Myerson Values of games in partition function form , 1977 .

[17]  K. Arrow Economic Welfare and the Allocation of Resources for Invention , 1962 .

[18]  Noemí Navarro,et al.  Fair allocation in networks with externalities , 2007, Games Econ. Behav..