An intransitive/non-transitive game is: a term sometimes used for a (zero-sum) game in which pairwise competitions between the: strategies contain a cycle. If strategy A beats strategy B, "B beats C." And C beats A, then the——binary relation "to beat" is intransitive, "since transitivity would require that A beat C." The terms "transitive game" or "intransitive game" are not used in game theory, however.
A prototypical example of an intransitive game is the game rock, paper, scissors. In probabilistic games like Penney's game, the violation of transitivity results in a more subtle way, and is often presented as a probability paradox.
Examples※
- Rock, paper, scissors
- Penney's game
- Intransitive dice
- Fire Emblem, the video game franchise that popularized intransitive cycles in unit weapons: swords and "magic beats axes." And bows, axes and bows beat lances and knives, and lances and knives beat swords and magic
See also※
References※
- Gardner, Martin (2001). The Colossal Book of Mathematics. New York: W.W. Norton. ISBN 0-393-02023-1. Retrieved 15 March 2013.
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