Results 1 to 10 of about 158 (151)
Non-Classical Rules in Quantum Games [PDF]
Entropy, 2021 Over the last twenty years, quantum game theory has given us many ideas of how quantum games could be played. One of the most prominent ideas in the field is a model of quantum playing bimatrix games introduced by J. Eisert, M. Wilkens and M. Lewenstein.
Piotr Frąckiewicz
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A Fast Approach to Bimatrix Games with Intuitionistic Fuzzy Payoffs [PDF]
The Scientific World Journal, 2014 The aim of this paper is to develop an effective method for solving bimatrix games with payoffs of intuitionistic fuzzy value. Firstly, bimatrix game model with intuitionistic fuzzy payoffs (IFPBiG) was put forward.
Min Fan +3 more
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Effects of the quarantine on the individuals’ risk of Covid-19 infection: Game theoretical approach [PDF]
Alexandria Engineering Journal, 2021 In this study, we analyze the general or self-quarantine effects to the spread of the first wave of Covid-19 pandemic in the view of the game-theoretical approach.
Murat Özkaya, Burhaneddin İzgi
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On the Effect of Risk Aversion in Bimatrix Games [PDF]
Theory and Decision, 2006 zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Hans Peters, Peters Hans
exaly +5 more sources
AN ALGORITHM FOR EQUILIBRIUM POINTS IN BIMATRIX GAMES. [PDF]
Proc Natl Acad Sci U S A, 1961 Kuhn HW.
europepmc +4 more sources
Rank Reduction in Bimatrix Games
International Game Theory Review, 2022 The rank of a bimatrix game is defined as the rank of the sum of the payoff matrices of the two players. The rank of a game is known to impact both the most suitable computation methods for determining a solution and the expressive power of the game. Under certain conditions on the payoff matrices, we devise a method that reduces the rank of the game ...
Joseph L. Heyman, Abhishek Gupta 0002
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A Note on Anti-Berge Equilibrium for Bimatrix Game
Известия Иркутского государственного университета: Серия "Математика", 2021 Game theory plays an important role in applied mathematics, economics and decision theory. There are many works devoted to game theory. Most of them deals with a Nash equilibrium.
R. Enkhbat
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On the Determinateness of m × ∞-Bimatrix Games [PDF]
Mathematics of Operations Research, 1997 In this paper a positive answer is given to the question of whether every semi-infinite bimatrix game is weakly determined.
Norde, H.W., Potters, J.A.M.
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Efficient Decomposition of Bimatrix Games (Extended Abstract) [PDF]
Electronic Proceedings in Theoretical Computer Science, 2014 Exploiting the algebraic structure of the set of bimatrix games, a divide-and-conquer algorithm for finding Nash equilibria is proposed. The algorithm is fixed-parameter tractable with the size of the largest irreducible component of a game as parameter.
Xiang Jiang, Arno Pauly
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Constrained Bimatrix Games with Fuzzy Goals and its Application in Nuclear Negotiations [PDF]
Iranian Journal of Numerical Analysis and Optimization, 2018 Solving constrained bimatrix games in the fuzzy environment is the aim of this research. This class of two-person nonzero-sum games is considered with finite strategies and fuzzy goals when some additional linear constraints are imposed on the strategies.
H. Bigdeli, H. Hassanpour, J. Tayyebi
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