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Sprague–Grundy_theorem abstract "In combinatorial game theory, the Sprague–Grundy theorem states that every impartial game under the normal play convention is equivalent to a nimber. The Grundy value or nim-value of an impartial game is then defined as the unique nimber that the game is equivalent to. In the case of a game whose positions (or summands of positions) are indexed by the natural numbers (for example the possible heap sizes in nim-like games), the sequence of nimbers for successive heap sizes is called the nim-sequence of the game.The theorem was discovered independently by R. P. Sprague (1935) and P. M. Grundy (1939).".
Sprague–Grundy_theorem wikiPageID "41372".
Sprague–Grundy_theorem wikiPageRevisionID "604092924".
Sprague–Grundy_theorem subject Category:Combinatorial_game_theory.
Sprague–Grundy_theorem subject Category:Theorems_in_discrete_mathematics.
Sprague–Grundy_theorem comment "In combinatorial game theory, the Sprague–Grundy theorem states that every impartial game under the normal play convention is equivalent to a nimber. The Grundy value or nim-value of an impartial game is then defined as the unique nimber that the game is equivalent to.".
Sprague–Grundy_theorem label "Satz von Sprague-Grundy".
Sprague–Grundy_theorem label "Sprague–Grundy theorem".
Sprague–Grundy_theorem label "Théorème de Sprague-Grundy".
Sprague–Grundy_theorem label "Twierdzenie Sprague-Grundy'ego".
Sprague–Grundy_theorem label "Функция Шпрага-Гранди".
Sprague–Grundy_theorem label "スプレイグ・グランディの定理".
Sprague–Grundy_theorem label "斯普莱格–格隆第定理".
Sprague–Grundy_theorem sameAs Sprague%E2%80%93Grundy_theorem.
Sprague–Grundy_theorem sameAs Satz_von_Sprague-Grundy.
Sprague–Grundy_theorem sameAs Théorème_de_Sprague-Grundy.
Sprague–Grundy_theorem sameAs スプレイグ・グランディの定理.
Sprague–Grundy_theorem sameAs Twierdzenie_Sprague-Grundy'ego.
Sprague–Grundy_theorem sameAs Q1687147.
Sprague–Grundy_theorem sameAs Q1687147.
Sprague–Grundy_theorem wasDerivedFrom Sprague–Grundy_theorem?oldid=604092924.