Computation of Markov Perfect Nash Equilibria without Hamilton—Jacobi—Bellman Equations

  1. Martín-Herrán, Guiomar 1
  2. Rincón-Zapatero, Juan Pablo
  1. 1 Universidad de Valladolid
    info

    Universidad de Valladolid

    Valladolid, España

    ROR https://ror.org/01fvbaw18

Livre:
Advances in Computational Management Science

ISSN: 1388-4301

ISBN: 9781461353683 9781461510475

Année de publication: 2002

Pages: 135-151

Type: Chapitre d'ouvrage

DOI: 10.1007/978-1-4615-1047-5_9 GOOGLE SCHOLAR lock_openAccès ouvert editor

Résumé

In this paper we provide new insights on the method for computing Markov perfect Nash equilibria presented for the first time in [12]. This method does not use the Hamilton—Jacobi—Bellman equations, but characterizes Markov perfect equilibria by means of a system of quasilinear partial differential equations. A quasilinear system is much more amenable than a fully non-linear system of partial differential equations as the Hamilton—Jacobi—Bellman system usually is. This fact allows us to establish results on existence and uniqueness of solutions and also to derive its analytical expressions in some cases. Otherwise, this approach simplifies a qualitative analysis, making possible the application of well—known numerical routines to find an approximate Nash equilibrium. The main features of the method are shown in the analysis of some competitive resource games.

Références bibliographiques

  • Bourdache—Siguerdidjane, H. and Fliess, M. (1987) Optimal Feedback Control of Nonlinear Systems, Automatica 23, 365–372.
  • Clemhout, S. and Wan, H.Y. (1994) Differential Games — Economic Applications, in Handbook of Game Theory, Edited by R.J. Au-mann and S. Hart, North Holland, Amsterdam, Holland, Vol. 2, 801–825.
  • Courant, R. and Hilbert, D. (1989) Methods of Mathematical Physics, Vol. 2, Wiley, New York, New York.
  • Dockner, E.J., Feichtinger, G. and Jorgensen, S. (1985) Tractable Classes of Nonzero-Sum Open-Loop Nash Differential Games, Journal of Optimization Theory and Applications 45, 179–198.
  • Dockner, E.J. and Sorger, G. (1996) Existence and Properties of Equilibria for a Dynamic Game on Productive Assets, Journal of Economic Theory 71, 209–227.
  • Dockner, E.J., Jorgensen, S., Van Long, N. and Sorger, G. (2000) Differential Games in Economics and Management Science, Cambridge University Press, Cambridge, U.K.
  • Fershtman, C. (1987) Identification of Classes of Differential Gamesfor Which the Open Loop Is a Degenerate Feedback Nash Equilib-rium,Journal of Optimization Theory and Applications 55, 217–231.
  • Friedman, A. (1971) Differential Games, Wiley, New York, New York.
  • John, F. (1971) Partial Differential Equations, Springer Verlag, New York, New York.
  • Leitmann, G. (1974) Cooperative and Non-cooperative Many - Players Differential Games, Springer Verlag, New York, New York.
  • Melhmann, A. (1988) Applied Differential Games, Plenum Press, New York, New York.
  • Rincón-Zapatero, J.P., Martínez, J. and Martín-Herrán, G. (1998) New Method to Characterize Subgame Perfect Nash Equilibria in Differential Games, Journal of Optimization Theory and Applications 96, 377–395.
  • Rincón-Zapatero,J.P.,Martín-Herrán, G. and Martínez, J. (1998) Identification of Efficient Subgame-Perfect Nash Equilibria in a Class of Differential Games,Journal of Optimization Theory and Applications 104, 235–242.
  • Rincón—Zapatero, J.P. (2002) Characterization of Markovian Equilibria in a Class of Differential Games, submitted.
  • Sorger, G. (1998) Markov—Perfect Nash Equilibria in a Class of Resource Games,Economic Theory 11, 79–100.