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
We introduce in this paper the notion of a stable winning coalition in a multiplayer game. This is u...
Ostmann A. Classifying three person games. Working Papers. Institute of Mathematical Economics. Vol ...
The traditional game of Nim is an impartial game for two players that plays a central role in combin...
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. We pres...
Conway's theory of partizan games is both a theory of games and a theory of numbers. We present here...
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...
AbstractConway’s theory of partizan games is both a theory of games and a theory of numbers. An exte...
AbstractPast efforts to classify impartial three-player combinatorial games (the theories of Li (Int...
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...
If a combinatorial game involves more than two players, the problem of coalitions arises. To avoid t...
AbstractIn combinatorial games, few results are known about the overall structure of n-player games....
There are several known methods to find winning strategies for two-player combinatorial games. This ...
We introduce in this paper the notion of a stable winning coalition in a multiplayer game. This is u...
Ostmann A. Classifying three person games. Working Papers. Institute of Mathematical Economics. Vol ...
The traditional game of Nim is an impartial game for two players that plays a central role in combin...
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. We pres...
Conway's theory of partizan games is both a theory of games and a theory of numbers. We present here...
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...
AbstractConway’s theory of partizan games is both a theory of games and a theory of numbers. An exte...
AbstractPast efforts to classify impartial three-player combinatorial games (the theories of Li (Int...
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...
If a combinatorial game involves more than two players, the problem of coalitions arises. To avoid t...
AbstractIn combinatorial games, few results are known about the overall structure of n-player games....
There are several known methods to find winning strategies for two-player combinatorial games. This ...
We introduce in this paper the notion of a stable winning coalition in a multiplayer game. This is u...
Ostmann A. Classifying three person games. Working Papers. Institute of Mathematical Economics. Vol ...
The traditional game of Nim is an impartial game for two players that plays a central role in combin...
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