We investigate Nash Equilibrium in quantum games by quantizing the Battle of Sexes Game, finding that there is no unique but infinite Nash Equilibrium in it. A method is also provided to check that whether a quantum game has unique Nash Equilibrium, which could be helpful for multi-player quantum games
We extend the concept of a classical two-person static game to the quantum domain, by giving an Hilb...
In the Eisert protocol for 2 X 2 quantum games [Phys. Rev. Lett. 83, 3077], a number of authors have...
We present an example of a symmetric quantum game for which a dynamically stable Nash equilibrium be...
In this work we propose and develop modified quantum games (zero and non-zero sum) in which payoffs ...
Game theory is a mature field of applied mathematics. It formalizes the conflict between competing a...
Two-player N-strategy games quantized according to the Eisert–Lewenstein–Wilkens scheme [Phys. Rev. ...
We pursue a general theory of quantum games. In particular, we develop quantum generalizations of th...
The game in which acts of participants don't have an adequate description in terms of Boolean logic ...
In this paper we quantize the Card Game. In the classical version of this game, one player (Alice) c...
©2002 The American Physical SocietyA version of the Monty Hall problem is presented where the player...
We present a novel formulation of quantum game theory based on the Schmidt decomposition, which has ...
Decision-making by the two negotiating parties is simulated by a prisoner’s dilemma game. The game i...
Several quantum versions of the battle of the sexes game are analyzed. Some of them are shown to rep...
A quantum Cournot game whose classical form game has multiple Nash equilibria is examined. Although ...
Decision-making by the two negotiating parties is simulated by a prisoner’s dilemma game. The game i...
We extend the concept of a classical two-person static game to the quantum domain, by giving an Hilb...
In the Eisert protocol for 2 X 2 quantum games [Phys. Rev. Lett. 83, 3077], a number of authors have...
We present an example of a symmetric quantum game for which a dynamically stable Nash equilibrium be...
In this work we propose and develop modified quantum games (zero and non-zero sum) in which payoffs ...
Game theory is a mature field of applied mathematics. It formalizes the conflict between competing a...
Two-player N-strategy games quantized according to the Eisert–Lewenstein–Wilkens scheme [Phys. Rev. ...
We pursue a general theory of quantum games. In particular, we develop quantum generalizations of th...
The game in which acts of participants don't have an adequate description in terms of Boolean logic ...
In this paper we quantize the Card Game. In the classical version of this game, one player (Alice) c...
©2002 The American Physical SocietyA version of the Monty Hall problem is presented where the player...
We present a novel formulation of quantum game theory based on the Schmidt decomposition, which has ...
Decision-making by the two negotiating parties is simulated by a prisoner’s dilemma game. The game i...
Several quantum versions of the battle of the sexes game are analyzed. Some of them are shown to rep...
A quantum Cournot game whose classical form game has multiple Nash equilibria is examined. Although ...
Decision-making by the two negotiating parties is simulated by a prisoner’s dilemma game. The game i...
We extend the concept of a classical two-person static game to the quantum domain, by giving an Hilb...
In the Eisert protocol for 2 X 2 quantum games [Phys. Rev. Lett. 83, 3077], a number of authors have...
We present an example of a symmetric quantum game for which a dynamically stable Nash equilibrium be...