We present a method of backward induction for computing approximate subgame perfect Nash equilibria of infinitely repeated games with discounted payoffs. This uses the selection monad transformer, combined with the searchable set monad viewed as a notion of ‘topologically compact’ nondeterminism, and a simple model of computable real numbers. This is the first application of Escard ´o and Oliva’s theory of higher-order sequential games to games of imperfect information, in which (as well as its mathematical elegance) lazy evaluation does nontrivial work for us compared with a traditional game-theoretic analysis. Since a full theoretical understanding of this method is lacking (and appears to be very hard), we consider this an ‘experimental’...
In finite games subgame perfect equilibria are precisely those that are obtained by a backwards indu...
We define a subgame perfect Nash equilibrium under Knightian uncertainty for two players, by means o...
In 1950, Nash proposed a natural equilibrium solution concept for games hence called Nash equilibriu...
Abstract. We generalize the well-known backward induction procedure to the case of extensive games w...
I introduce axiomatically infinite sequential games that extend Kuhn’s classical framework. Infinite...
Backward Induction is a fundamental concept in game theory. As an algorithm, it can only be used to ...
Using techniques from higher-type computability theory and proof theory we extend the well-known gam...
In sequential games of traditional game theory, backward induction guarantees existence of Nash equi...
Sequential game and Nash equilibrium are basic key concepts in game theory. In 1953, Kuhn showed tha...
Abstract: "In this paper we isolate a particular refinement of the notion of Nash equilibrium that i...
Much of the recent interest in the economic applications of game theory has been drawn to time-incon...
This paper presents a technique for approximating, up to any precision, the set of subgame-perfect e...
Backward induction has led to some controversy in specific games, the surprise exam paradox and iter...
We present two alternative definitions of Nash equilibrium for two person games in the presence af u...
This paper presents a technique for approximating, up to any precision, the set of subgame-perfect e...
In finite games subgame perfect equilibria are precisely those that are obtained by a backwards indu...
We define a subgame perfect Nash equilibrium under Knightian uncertainty for two players, by means o...
In 1950, Nash proposed a natural equilibrium solution concept for games hence called Nash equilibriu...
Abstract. We generalize the well-known backward induction procedure to the case of extensive games w...
I introduce axiomatically infinite sequential games that extend Kuhn’s classical framework. Infinite...
Backward Induction is a fundamental concept in game theory. As an algorithm, it can only be used to ...
Using techniques from higher-type computability theory and proof theory we extend the well-known gam...
In sequential games of traditional game theory, backward induction guarantees existence of Nash equi...
Sequential game and Nash equilibrium are basic key concepts in game theory. In 1953, Kuhn showed tha...
Abstract: "In this paper we isolate a particular refinement of the notion of Nash equilibrium that i...
Much of the recent interest in the economic applications of game theory has been drawn to time-incon...
This paper presents a technique for approximating, up to any precision, the set of subgame-perfect e...
Backward induction has led to some controversy in specific games, the surprise exam paradox and iter...
We present two alternative definitions of Nash equilibrium for two person games in the presence af u...
This paper presents a technique for approximating, up to any precision, the set of subgame-perfect e...
In finite games subgame perfect equilibria are precisely those that are obtained by a backwards indu...
We define a subgame perfect Nash equilibrium under Knightian uncertainty for two players, by means o...
In 1950, Nash proposed a natural equilibrium solution concept for games hence called Nash equilibriu...