Zero-determinant (ZD) strategies, a recently found novel class of strategies in repeated games, has attracted much attention in evolutionary game theory. A ZD strategy unilaterally enforces a linear relation between average payoffs of players. Although existence and evolutional stability of ZD strategies have been studied in simple games, their mathematical properties have not been well-known yet. For example, what happens when more than one players employ ZD strategies have not been clarified. In this paper, we provide a general framework for investigating situations where more than one players employ ZD strategies in terms of linear algebra. First, we theoretically prove that a set of linear relations of average payoffs enforced by ZD str...
We study two-person repeated games in which a player with a restricted set of strategies plays again...
We consider discounted repeated two-person zero-sum games. We show that even when players have diffe...
We explain the concept and theory behind game theory and simulation. How game theory can be used to ...
Repeated games have provided an explanation how mutual cooperation can be achieved even if defection...
In two-player repeated games, Zero-Determinant (ZD) strategies enable a player to unilaterally enfor...
In this paper we study the existence of zero-determinant (ZD) strategies in finitely repeated n-play...
Press and Dyson (2012) discovered a special set of strategies in two-player Iterated Pris-oner'...
Zero Determinant strategies are a new class of probabilistic and conditional strategies that are abl...
Long-term cooperation, competition, or exploitation among individuals can be modeled through repeate...
AbstractRepetition is one of the key mechanisms to maintain cooperation. In long-term relationships,...
Recent work has revealed a new class of "zero-determinant" (ZD) strategies for iterated, two-player ...
Repetition is one of the key mechanisms to maintain cooperation. In long-term relationships, in whic...
strategies demonstrates that winning is not everything Christoph Adami1,2,3 & Arend Hintze1,3 Ze...
The regulation of two players is modeled as an iterated game with no discounting where first two pla...
In deterministic zero-sum two-person games, the upper and lower values move towards each other as th...
We study two-person repeated games in which a player with a restricted set of strategies plays again...
We consider discounted repeated two-person zero-sum games. We show that even when players have diffe...
We explain the concept and theory behind game theory and simulation. How game theory can be used to ...
Repeated games have provided an explanation how mutual cooperation can be achieved even if defection...
In two-player repeated games, Zero-Determinant (ZD) strategies enable a player to unilaterally enfor...
In this paper we study the existence of zero-determinant (ZD) strategies in finitely repeated n-play...
Press and Dyson (2012) discovered a special set of strategies in two-player Iterated Pris-oner'...
Zero Determinant strategies are a new class of probabilistic and conditional strategies that are abl...
Long-term cooperation, competition, or exploitation among individuals can be modeled through repeate...
AbstractRepetition is one of the key mechanisms to maintain cooperation. In long-term relationships,...
Recent work has revealed a new class of "zero-determinant" (ZD) strategies for iterated, two-player ...
Repetition is one of the key mechanisms to maintain cooperation. In long-term relationships, in whic...
strategies demonstrates that winning is not everything Christoph Adami1,2,3 & Arend Hintze1,3 Ze...
The regulation of two players is modeled as an iterated game with no discounting where first two pla...
In deterministic zero-sum two-person games, the upper and lower values move towards each other as th...
We study two-person repeated games in which a player with a restricted set of strategies plays again...
We consider discounted repeated two-person zero-sum games. We show that even when players have diffe...
We explain the concept and theory behind game theory and simulation. How game theory can be used to ...