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Modeling Rational Players: Part II

Published online by Cambridge University Press:  05 December 2008

Ken Binmore
Ken Binmore
Affiliation:
London School of Economics
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Extract

This is the second part of a two-part paper. It can be read independently of the first part provided that the reader is prepared to go along with the unorthodox views on game theory which were advanced in Part I and are summarized below. The body of the paper is an attempt to study some of the positive implications of such a viewpoint. This requires an exploration of what is involved in modeling “rational players” as computing machines.

Type
Essays
Information
Economics & Philosophy , Volume 4 , Issue 1 , April 1988 , pp. 9 - 55
Copyright
Copyright © Cambridge University Press 1988

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References

REFERENCES

Abreu, D., and Rubinstein, A. 1986. “The Structure of Nash Equilibrium in Repeated Games with Finite Automata.” ICERD Discussion Paper 86/141, London School of Economics.Google Scholar
Aumann, R. 1974. “Subjectivity and Correlation in Randomized Mixed Strategies.” Journal of Mathematical Economics 1:6796.CrossRefGoogle Scholar
Aumann, R. 1981. “Survey of Repeated Games.” In Essays in Game Theory and Mathematical Economics in Honor of Oskar Morgenstern. Mannheim/Wien/Zurich: Wissenschaftsverlung Bibliographisches Institut.Google Scholar
Aumann, R. 1987. “Correlated Equilibrium as an Expression of Bayesian Rationality.” Econometrica 55:118.CrossRefGoogle Scholar
Aumann, R., Katznelson, Y., Radner, R., and Rosenthal, R. 1981. “Approximate Purification of Mixed Strategies.” Bell Labs Economics Discussion Paper No. 192.Google Scholar
Axelrod, R. 1984. The Evolution of Cooperation. New York: Basic Books.Google Scholar
Banks, J., and Sobel, J. 1985. “Equilibrium Selection in Signalling Games.” Mimeo, Massachusetts Institute of Technology.Google Scholar
Binmore, K. G. 1975. “An Example in Group Preference.” Journal of Economic Theory 10:377–85.CrossRefGoogle Scholar
Binmore, K. G. 1983. Calculus. Cambridge: Cambridge University Press.Google Scholar
Binmore, K. G. 1986. “Modeling Rational Players.” ST/ICERD Discussion Paper No. 86/133, London School of Economics.Google Scholar
Binmore, K.G., and Brandenburger, A. 1987. “Common Knowledge and Game Theory.” Economic Perspectives. Forthcoming.Google Scholar
Binmore, K.G., and Dasgupta, P. 1987. The Economics of Bargaining. Oxford: Basic Blackwell.Google Scholar
Dawkins, R. 1976. The Selfish Gene. Oxford: Oxford University Press.Google Scholar
Harsanyi, J. 1967/68. “Games of Incomplete Information Played by Bayesian Players.” Parts I, II, and III. Management Science 14:159–82, 320–34, 486502.CrossRefGoogle Scholar
Harsanyi, J. 1973. “Games with Randomly Disturbed Payoffs: A New Rationale for Mixed Strategy Equilibrium Points.” International Journal of Game Theory 2:123.CrossRefGoogle Scholar
Harsanyi, J. 1975. “The Tracing Procedure.” International Journal of Game Theory 5:6194.CrossRefGoogle Scholar
Harsanyi, J., and Selten, R. 1980. “A Non-cooperative Solution Concept with Cooperative Applications.” Chapter 1 of draft book. Berkeley: Center for Research in Management.Google Scholar
Harsanyi, J., and Selten, R. 1982. “A General Theory of Equilibrium Selection in Games.” Chapter 3 of draft book. Bielefeld Working Paper 1114. Bielefeld.Google Scholar
Hofstadter, D. 1983. “Metamagical Themes.” Scientific American 248:1428; 249:1420.CrossRefGoogle Scholar
Hopcraft, J., and Ullman, R. 1979. Introduction to Automata Theory, Languages, and Computation. Reading, Mass.: Addison-Wesley.Google Scholar
Howard, N. 1971. Paradoxes of Rationality: Theory of Metagames and Political Behavior. Cambridge: Massachusetts Institute of Technology.Google Scholar
Kohlberg, E., and Mertens, J. 1986. “On the Strategic Stability of Equilibria.” Econometrica. Forthcoming.CrossRefGoogle Scholar
Kreps, D. 1985. “Signalling Games and Stable Equilibria.” Mimeo, Stanford University.Google Scholar
Kreps, D., and Wilson, R. 1982a. “Sequential Equilibria.” Econometrica 50:863–94.CrossRefGoogle Scholar
Kreps, D., and Wilson, R. 1982b. “Reputations and Imperfect Information.” Journal of Economic Theory 27:253–79.CrossRefGoogle Scholar
Lewis, D. 1976. Counterfactuals. Oxford: Basil Blackwell.Google Scholar
Maynard Smith, J. 1982. Evolution and the Theory of Games. Cambridge: Cambridge University Press.CrossRefGoogle Scholar
Marschak, T., and Selten, R. 1978. “Restabilizing Responses, Inertia Supergames and Oligopolistic Equilibria.” Quarterly Journal of Economics 92:7193.Google Scholar
Meggido, N. 1986. “Remarks on Bounded Rationality.” I.B.M. Research Paper RJ 5270.Google Scholar
Meggido, N., and Wigderson, A. 1986. “On Play by Means of Computing Machines.” In Theoretical Aspects of Reasoning about Knowledge, edited by Halpern, J., pp. 259–74. Los Altos, Cal.: Morgan Kaufman.CrossRefGoogle Scholar
Monod, J. 1972. Chance and Necessity. Glasgow: Collins.Google Scholar
Myerson, R. 1984. “Sequential Correlated Equilibria of Multistage Games.” J. Kellogg Graduate School of Management Discussion Paper No. 590, Northwestern University.Google Scholar
Nash, J. 1951. “Non-cooperative Games.” Annals of Mathematics 54:286–95.CrossRefGoogle Scholar
Neyman, A. 1985. “Bounded Complexity Justifies Cooperation in the Finitely Repeated Prisoner's Dilemma.” Economics Letters 19:227–29.CrossRefGoogle Scholar
Putnam, H. 1975. Mind, Language, and Reality. Cambridge: Cambridge University Press.CrossRefGoogle Scholar
Radner, R. 1980. “Collusive Behavior in Non-cooperative Epsilon Equilibria of Oligopolies with Long but Finite Lives.” journal of Economic Theory 22:136–54.CrossRefGoogle Scholar
Rubinstein, A. 1985. “Finite Automata Play the Repeated Prisoner's Dilemma.” ST-ICERD Discussion Paper 85/109, London School of Economics.Google Scholar
Scriven, M. 1965. “An Essential Undecidability in Human Behavior.” In Scientific Psychology: Principles and Approaches, edited by Wolman, B.. New York: Basic Books.Google Scholar
Selten, R. 1975. “Re-examination of the Perfectness Concept for Equilibrium in Extensive Games.” International Journal of Game Theory 4:2225.CrossRefGoogle Scholar
Selten, R. 1978. “Chain-store Paradox.” Theory and Decision 9:127–59.CrossRefGoogle Scholar
Selten, R., and Leopold, U. 1982. “Subjunctive Conditionals in Decision Theory and Game Theory.” In Philosophy of Economics, Vol. 2, Studies in Economics, edited by Stegmuller, , Balzer, , and Spohn, . Berlin: Springer-Verlag.CrossRefGoogle Scholar
Simon, H. 1955. “A Behavioral Model of Rational Choice.” Quarterly Journal of Economics 69:99118.CrossRefGoogle Scholar
Simon, H. 1959. “Theories of Decision-making in Economics.” American Economic Review 49:253–83.Google Scholar
Simon, H. 1976. “From Substantive to Procedural Rationality.” In Method and Appraisal in Economics, edited by Latsis, S., pp. 129–48. Cambridge: Cambridge University Press.CrossRefGoogle Scholar
Simon, H. 1977. Models of Discovery. Dordrecht: Reidel.CrossRefGoogle Scholar
Von Neumann, J., and Morgenstern, O. 1944. Theory of Games and Economic Behavior. Princeton: Princeton University Press.Google Scholar