Noncooperative Differential Games

AbstractThis paper, having a tutorial character, is intended to provide an introduction to the theory of noncooperative differential games. Section 2 reviews the theory of static games. Different concepts of solution are discussed, including Pareto optima, Nash and Stackelberg equilibria, and the co-co (cooperative-competitive) solutions. Section 3 introduces the basic framework of differential games for two players. Open-loop solutions, where the controls implemented by the players depend only on time, are considered in Section 4. These solutions can be computed by solving a two-point boundary value problem for a system of ODEs, derived from the Pontryagin maximum principle. Section 5 deals with solutions in feedback form, where the controls are allowed to depend on time and also on the current state of the system. In this case, the search for Nash equilibrium solutions leads to a highly nonlinear system of Hamilton-Jacobi PDEs. In dimension higher than one, we show that this system is generically not hyperbolic and the Cauchy problem is thus ill posed. Due to this instability, feedback solutions are mainly considered only in the special case with linear dynamics and quadratic costs. In Section 6, a game in continuous time is approximated by a finite sequence of static games, by a time discretization. Depending of the type of solution adopted in each static game, one obtains different concepts of solutions for the original differential game. Section 7 deals with differential games in infinite time horizon, with exponentially discounted payoffs. Section 8 contains a simple example of a game with infinitely many players. This is intended to convey a flavor of the newly emerging theory of mean field games. Modeling issues, and directions of current research, are briefly discussed in Section 9. Finally, the Appendix collects background material on multivalued functions, selections and fixed point theorems, optimal control theory, and hyperbolic PDEs.

[1]  A. I. Subbotin,et al.  Game-Theoretical Control Problems , 1987 .

[2]  Wen Shen,et al.  Semi-cooperative strategies for differential games , 2004, Int. J. Game Theory.

[3]  Ngo Van Long,et al.  Differential Games in Economics and Management Science: List of tables , 2000 .

[4]  T. Crilly,et al.  The Theory of Games , 1989, The Mathematical Gazette.

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

[6]  Fabio S. Priuli Infinite horizon noncooperative differential games with nonsmooth costs , 2007 .

[7]  N. N. Krasovskii,et al.  Game-Theoretical Control , 1988 .

[8]  Stefan Mirica Verification Theorems for Optimal Feedback Strategies in Differential Games , 2003, IGTR.

[9]  R. Aumann Rationality and Bounded Rationality , 1997 .

[10]  B. Heimann,et al.  Fleming, W. H./Rishel, R. W., Deterministic and Stochastic Optimal Control. New York‐Heidelberg‐Berlin. Springer‐Verlag. 1975. XIII, 222 S, DM 60,60 , 1979 .

[11]  W. Fleming,et al.  Deterministic and Stochastic Optimal Control , 1975 .

[12]  M. Bardi,et al.  Optimal Control and Viscosity Solutions of Hamilton-Jacobi-Bellman Equations , 1997 .

[13]  Fabio S. Priuli,et al.  Infinite Horizon Noncooperative Differential Games , 2006 .

[14]  Richard B. Vinter,et al.  Optimal Control , 2000 .

[15]  A. Bakushinskii,et al.  Ill-Posed Problems: Theory and Applications , 1994 .

[16]  Richard Bellman,et al.  Introduction to the mathematical theory of control processes , 1967 .

[17]  Sylvie Benzoni-Gavage,et al.  Multidimensional hyperbolic partial differential equations : first-order systems and applications , 2006 .

[18]  Heinrich von Stackelberg,et al.  Stackelberg (Heinrich von) - The Theory of the Market Economy, translated from the German and with an introduction by Alan T. PEACOCK. , 1953 .

[19]  A. Friedman Differential games , 1971 .

[20]  Yu. S. Ledyaev,et al.  Nonsmooth analysis and control theory , 1998 .

[21]  Catherine Rainer,et al.  On a Continuous-Time Game with Incomplete Information , 2008, Math. Oper. Res..

[22]  Wen Shen,et al.  Small BV Solutions of Hyperbolic Noncooperative Differential Games , 2004, SIAM J. Control. Optim..

[23]  P. Souganidis Approximation schemes for viscosity solutions of Hamilton-Jacobi equations , 1985 .

[24]  T. Başar,et al.  Iterative computation of noncooperative equilibria in nonzero-sum differential games with weakly coupled players , 1990 .

[25]  Rufus Isaacs,et al.  Differential Games , 1965 .

[26]  P. Lions,et al.  Mean field games , 2007 .

[27]  J. Aubin,et al.  Differential inclusions set-valued maps and viability theory , 1984 .

[28]  Tai-Ping Liu,et al.  On a nonstrictly hyperbolic system of conservation laws , 1985 .

[29]  Alberto Bressan,et al.  Bifurcation analysis of a non-cooperative differential game with one weak player , 2010 .

[30]  Lamberto Cesari,et al.  Optimization-Theory And Applications , 1983 .

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

[32]  L. Evans,et al.  Partial Differential Equations , 1941 .

[33]  Olivier Guéant,et al.  Mean Field Games and Applications , 2011 .

[34]  R. Aumann,et al.  Epistemic Conditions for Nash Equilibrium , 1995 .

[35]  Arrigo Cellina,et al.  Approximation of set valued functions and fixed point theorems , 1969 .

[36]  Avner Friedman,et al.  Stochastic differential games , 1972 .

[37]  E. Dockner,et al.  Differential Games in Economics and Management Science , 2001 .