AbstractConway's theory of partizan games is both a theory of games and a theory of numbers. We present here an extension such a theory to classify three-player partizan games. We apply this extension to solve a restricted version of three-player hackenbush
Quoridor is a 2-player board game. Its objective is to get the player's pawn to the opposite side of...
Rosenmüller J. The rôle of nondegeneracy and homogeneity in n-person game theory. Working Papers. In...
We introduce in this paper the notion of a stable winning coalition in a multiplayer game. This is u...
Conway's theory of partizan games is both a theory of games and a theory of num-bers. We presen...
Conway's theory of partizan games is both a theory of games and a theory of num-bers. We presen...
Conway's theory of partizan games is both a theory of games and a theory of numbers. We present here...
AbstractConway's theory of partizan games is both a theory of games and a theory of numbers. We pres...
AbstractConway’s theory of partizan games is both a theory of games and a theory of numbers. An exte...
AbstractConway’s theory of partizan games is both a theory of games and a theory of numbers. An exte...
Ostmann A. Classifying three person games. Working Papers. Institute of Mathematical Economics. Vol ...
John Horton Conway\u27s combinatorial game theory was applied to a new partizan game with a complete...
Combinatorial games are played under two different play conventions: normal play, where the last pla...
There are several known methods to find winning strategies for two-player combinatorial games. This ...
In the paper “Wythoff Partizan Subtraction”, Larsson et al. introduced a class of normal-play partiz...
AbstractA problem of a Nash equilibrium point existence and calculating for a 3-person game on polyh...
Quoridor is a 2-player board game. Its objective is to get the player's pawn to the opposite side of...
Rosenmüller J. The rôle of nondegeneracy and homogeneity in n-person game theory. Working Papers. In...
We introduce in this paper the notion of a stable winning coalition in a multiplayer game. This is u...
Conway's theory of partizan games is both a theory of games and a theory of num-bers. We presen...
Conway's theory of partizan games is both a theory of games and a theory of num-bers. We presen...
Conway's theory of partizan games is both a theory of games and a theory of numbers. We present here...
AbstractConway's theory of partizan games is both a theory of games and a theory of numbers. We pres...
AbstractConway’s theory of partizan games is both a theory of games and a theory of numbers. An exte...
AbstractConway’s theory of partizan games is both a theory of games and a theory of numbers. An exte...
Ostmann A. Classifying three person games. Working Papers. Institute of Mathematical Economics. Vol ...
John Horton Conway\u27s combinatorial game theory was applied to a new partizan game with a complete...
Combinatorial games are played under two different play conventions: normal play, where the last pla...
There are several known methods to find winning strategies for two-player combinatorial games. This ...
In the paper “Wythoff Partizan Subtraction”, Larsson et al. introduced a class of normal-play partiz...
AbstractA problem of a Nash equilibrium point existence and calculating for a 3-person game on polyh...
Quoridor is a 2-player board game. Its objective is to get the player's pawn to the opposite side of...
Rosenmüller J. The rôle of nondegeneracy and homogeneity in n-person game theory. Working Papers. In...
We introduce in this paper the notion of a stable winning coalition in a multiplayer game. This is u...
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