Black Hole Zeckendorf Games

Abstract

Zeckendorf proved that every positive integer can be written as a decomposition of non-adjacent Fibonacci numbers. Baird-Smith, Epstein, Flint, and Miller converted the process of decomposing an integer n into a 2-player game, using the moves of Fi + Fi-1 = Fi+1 and 2Fi = Fi+1 + Fi-2, where Fi is the ith Fibonacci number. They showed non-constructively that for n ≠ 2, Player 2 has a winning strategy: a constructive solution remains unknown. We expand on this by investigating ``black hole'' variants of this game. The Fm Black Hole Zeckendorf game is played with any n but solely in columns Fi for i < m. Gameplay is similar to the original Zeckendorf game, except any piece that would be placed on Fi for i ≥ m is locked out in a ``black hole'' and removed from play. With these constraints, we analyze the games with black holes on F3 and F4 and construct a solution for specific configurations, using a non-constructive proof to lead to a constructive one. We also examine a pre-game in which players take turns placing down n pieces in the outermost columns before the decomposition phase, and find constructive solutions for any n.