Quantum strategies have been successfully applied in game theory for years. However, as a reverse problem of game theory, the theory of mechanism design is ignored by physicists. In this paper, we generalize the classical theory of mechanism design to a quantum domain and obtain two results: 1) We find that the mechanism in the proof of Maskin's sufficiency theorem is built on the Prisoners' Dilemma. 2) By virtue of a quantum mechanism, agents who satisfy a certain condition can combat Pareto-inefficient social choice rules instead of being restricted by the traditional mechanism design theory
We show that quantum game theory offers solution to the famous Newcomb's paradox (free will problem)...
We investigate what quantum advantages can be obtained in multipartite non-cooperative games by stud...
Game theory is a mature field of applied mathematics. It formalizes the conflict between competing a...
Quantum strategies have been successfully applied in game theory for years. However, as a reverse pr...
Quantum mechanics has been applied to game theory for years. A recent work [H. Wu, Quantum mechanism...
The Maskin's theorem is a fundamental work in the theory of mechanism design. A recent work [Wu, Qua...
The Maskin's theorem is a fundamental work in the theory of mechanism design. A recent work [Wu, Qua...
This paper concerns what will happen if quantum mechanics is concerned in subgame perfect implementa...
[Moore and Repullo, \emph{Econometrica} \textbf{58} (1990) 1083-1099] and [Dutta and Sen, \emph{Rev....
Bayesian implementation concerns decision making problems when agents have incomplete information. T...
Bayesian implementation concerns decision making problems when agents have incomplete information. T...
Decision-making by the two negotiating parties is simulated by a prisoner’s dilemma game. The game i...
In quantum game theory, one of the most intriguing and important questions is, "Is it possible ...
We pursue a general theory of quantum games. In particular, we develop quantum generalizations of th...
Decision-making by the two negotiating parties is simulated by a prisoner’s dilemma game. The game i...
We show that quantum game theory offers solution to the famous Newcomb's paradox (free will problem)...
We investigate what quantum advantages can be obtained in multipartite non-cooperative games by stud...
Game theory is a mature field of applied mathematics. It formalizes the conflict between competing a...
Quantum strategies have been successfully applied in game theory for years. However, as a reverse pr...
Quantum mechanics has been applied to game theory for years. A recent work [H. Wu, Quantum mechanism...
The Maskin's theorem is a fundamental work in the theory of mechanism design. A recent work [Wu, Qua...
The Maskin's theorem is a fundamental work in the theory of mechanism design. A recent work [Wu, Qua...
This paper concerns what will happen if quantum mechanics is concerned in subgame perfect implementa...
[Moore and Repullo, \emph{Econometrica} \textbf{58} (1990) 1083-1099] and [Dutta and Sen, \emph{Rev....
Bayesian implementation concerns decision making problems when agents have incomplete information. T...
Bayesian implementation concerns decision making problems when agents have incomplete information. T...
Decision-making by the two negotiating parties is simulated by a prisoner’s dilemma game. The game i...
In quantum game theory, one of the most intriguing and important questions is, "Is it possible ...
We pursue a general theory of quantum games. In particular, we develop quantum generalizations of th...
Decision-making by the two negotiating parties is simulated by a prisoner’s dilemma game. The game i...
We show that quantum game theory offers solution to the famous Newcomb's paradox (free will problem)...
We investigate what quantum advantages can be obtained in multipartite non-cooperative games by stud...
Game theory is a mature field of applied mathematics. It formalizes the conflict between competing a...