Some properties of nonzero-sum multistage games

  • Jaroslav Doležal
Theory Of Games
Part of the Lecture Notes in Computer Science book series (LNCS, volume 27)


Optimal Control Problem Equilibrium Solution Equilibrium Strategy Discrete Optimization Problem Discrete Maximum Principle 
These keywords were added by machine and not by the authors. This process is experimental and the keywords may be updated as the learning algorithm improves.


  1. [1]
    Blaquière A., Gerard F., Leitman G., Quantitative and Qualitative Games, Academic Press, N.Y., 1969.Google Scholar
  2. [2]
    Wang G., Leitman G., Necessary and Sufficient Conditions for Two-Person, Zero-Sum Multistage Games, JOTA, 4, 1969, 145–155.Google Scholar
  3. [3]
    Propoi A.I., Minimax Control problems with a priori information, Avtom. Telemkh., July 1969, 73–79 (in Russian).Google Scholar
  4. [4]
    Propoi A.I., Minimax control problems under successively aquiered information, Avtomat. Telemekh., Jan. 1970, 65–75 (in Russian).Google Scholar
  5. [5]
    Starr A.W., Ho Y.C., Nonzero-sum differential games, JOTA, 3 (1969), 184–206.CrossRefGoogle Scholar
  6. [6]
    Starr A.W., Ho Y.C., Further properties of nonzero-sum differential games, JOTA, 3 (1969), 207–219.Google Scholar
  7. [7]
    Lukes D.L., Equilibrium Feedback Control in Linear Games with Quadratic Costs, SIAM J. Control, 9 (1971), 234–252.Google Scholar
  8. [8]
    Doležal J., Open-Loop and Closed-Loop Equilibrium Solutions for Multistage Games, Paper presented on the Conference "Mathematical Questions of Optimal Control", Zakopane, 1974.Google Scholar
  9. [9]
    Doležal J., Open-Loop Hierarchical Solution for Multistage Games, Paper presented on the FORMATOR Symposium, Prague, 1974.Google Scholar
  10. [10]
    Doležal J., Discrete optimization problems and multistage games, PhD.Thesis, ÚTIA ČSAV, Prague, 1973Google Scholar
  11. [11]
    DaCunha N.O., Polak E., Constrained minimization under vector-valued criteria in finite dimensional spaces, J. Math. Anal. Appl., 19 (1967), 103–124.Google Scholar
  12. [12]
    Boltjanskij V.G., Optimal Control of Discrete Systems, Nauka, Moscow, 1973 (in Russian).Google Scholar

Copyright information

© Springer-Verlag Berlin Heidelberg 1975

Authors and Affiliations

  • Jaroslav Doležal
    • 1
  1. 1.Institute of Information Theory and Automation Czechoslovak Academy of SciencesPragueCSSR

Personalised recommendations