哈密尔顿路径和循环的运算结构

arXiv - MATH - K-Theory and Homology Pub Date : 2024-06-11 DOI:arxiv-2406.06931

Denis Lyskov

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引用次数: 0

摘要

我们从操作数的角度研究无向图中的哈密顿路径和循环。我们证明，在连通图中编码定向哈密顿路径的图集合 $\mathsf{Ham}$ 具有一种类似于操作数的结构，称为契约数。类似地，我们构建了哈密尔顿循环的图集合 $/mathsf{CycHam}$，它构成了一个覆盖于 contractad $\mathsf{Ham}$ 的右模块。我们使用契约生成数列的机制来计算特定类型图的哈密顿路径/循环。

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Operadic structure on Hamiltonian paths and cycles

We study Hamiltonian paths and cycles in undirected graphs from an operadic viewpoint. We show that the graphical collection $\mathsf{Ham}$ encoding directed Hamiltonian paths in connected graphs admits an operad-like structure, called a contractad. Similarly, we construct the graphical collection of Hamiltonian cycles $\mathsf{CycHam}$ that forms a right module over the contractad $\mathsf{Ham}$. We use the machinery of contractad generating series for counting Hamiltonian paths/cycles for particular types of graphs.

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arXiv - MATH - K-Theory and Homology

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