Abstract For extensive form games with perfect information, consider a learning process in which, at any iteration, each player unilaterally deviates to a best response to his current conjectures of others' strategies; and then updates his conjectures in accordance with the induced play of the game. We show that, for generic payoffs, the outcome of the game becomes stationary, and is consistent with Nash equilibrium. In general, if payoffs have ties or if players observe more of each others' strategies than is revealed by plays of the game, the same result holds provided a rationality constraint is imposed on unilateral deviations: no player changes his moves in subgames that he deems unreachable, unless he stands to improve his payoff there. Moreover, with this constraint, the sequence of strategies and conjectures also becomes stationary, and yields a self-confirming equilibrium.
[1]
David M. Kreps,et al.
A Course in Microeconomic Theory
,
2020
.
[2]
Larry Samuelson,et al.
An Evolutionary Analysis of Backward and Forward Induction
,
1993
.
[3]
D. Fudenberg,et al.
Steady state learning and Nash equilibrium
,
1993
.
[4]
D. Fudenberg,et al.
Self-confirming equilibrium
,
1993
.
[5]
Drew Fudenberg,et al.
Learning in extensive-form games I. Self-confirming equilibria
,
1995
.
[6]
Birgitte Sloth,et al.
Adaptive learning in extensive form games and sequential equilibrium
,
1999
.