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Counting Permutations in $S_{2n}$ and $S_{2n+1}$

Published 2024-07-10Version 1

Let $\alpha(n)$ denote the number of perfect square permutations in the symmetric group $S_n$. The conjecture $\alpha(2n+1) = (2n+1) \alpha(2n)$, provided by Stanley[4], was proved by Blum[1] using a generating function. This paper presents a combinatorial proof for this conjecture. At the same time, we demonstrate that all permutations with an even number of even cycles in both $S_{2n}$ and $S_{2n+1}$ can be categorized into three distinct types that correspond to each other.

Categories: math.CO

Keywords: counting permutations, perfect square permutations, symmetric group, conjecture, combinatorial proof

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arXiv:2407.07366 [math.CO]Abstract References Reviews Resources

Counting Permutations in $S_{2n}$ and $S_{2n+1}$

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Counting Permutations in $S_{2n}$ and $S_{2n+1}$

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arXiv:2407.07366 [math.CO]Abstract References Reviews Resources