User:Rcaetano

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This is some test for the Combinatorial Game Theory page.

A game is defined recursively as an ordered pair of sets of games. A game G is denoted by:

G = \left \{ \mathcal{G}^L|\mathcal{G}^R \right \}

where \mathcal{G}^L and \mathcal{G}^R are sets of games. The set \mathcal{G}^L, called the set of Left options, corresponds to the moves available to the Left player. Analogously for \mathcal{G}^R.

If neither player has any available move then we have \mathcal{G}^L = \mathcal{G}^R = \varnothing, and G

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