The Arithmetic-Periodicity of \textsc{cut} for $\mathcal{C}=\{1,2c\}$

Paul Ellis; Thotsaporn Aek Thanatipanonda

arXiv:2203.02457·math.CO·March 7, 2022

The Arithmetic-Periodicity of \textsc{cut} for $\mathcal{C}=\{1,2c\}$

Paul Ellis, Thotsaporn Aek Thanatipanonda

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Abstract

\textsc{cut} is a class of partition games played on a finite number of finite piles of tokens. Each version of \textsc{cut} is specified by a cut-set $C \subseteq N$ . A legal move consists of selecting one of the piles and partitioning it into $d + 1$ nonempty piles, where $d \in C$ . No tokens are removed from the game. It turns out that the nim-set for any $C = {1, 2 c}$ with $c \geq 2$ is arithmetic-periodic, which answers an open question of \cite{par}. The key step is to show that there is a correspondence between the nim-sets of \textsc{cut} for $C = {1, 6}$ and the nim-sets of \textsc{cut} for $C = {1, 2 c}, c \geq 4$ . The result easily extends to the case of $C = {1, 2 c_{1}, 2 c_{2}, 2 c_{3}, ...}$ , where $c_{1}, c_{2}, ... \geq 2$ .

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TopicsMathematical Dynamics and Fractals · Advanced Combinatorial Mathematics · semigroups and automata theory