论 Cayley 数字图的哈密顿性质

Pub Date : 2024-03-27 DOI:10.1007/s10255-024-1023-9
Fang Duan, Qiong-xiang Huang
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引用次数: 0

摘要

本文给出了 C(G, S) 中存在哈密顿电路的一些充分条件,其中 G = Zm ⋊ H 是 Zm 通过 G 的子群 H 的半积。此外,我们还引入了一种新的数图运算,称为φ-Γ1 对Γ2 的半积,用Γ1 ⋊φ Γ2表示,即映射φ:v(γ2) → {1, -1} 映射。此外,我们还证明,如果φ是从 H 到 \(\{ 1, - 1\} \le Z_m^ * \) 的同态,那么 C(Zm, {a}) ⋊φC(H, S) 也是一个 Cayley 图,这就产生了一些具有哈密顿环路的 Cayley 图类。
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On Hamiltonian Property of Cayley Digraphs

Let G be a finite group generated by S and C(G, S) the Cayley digraphs of G with connection set S. In this paper, we give some sufficient conditions for the existence of hamiltonian circuit in C(G, S), where G = ZmH is a semiproduct of Zm by a subgroup H of G. In particular, if m is a prime, then the Cayley digraph of G has a hamiltonian circuit unless G = Zm × H. In addition, we introduce a new digraph operation, called φ-semiproduct of Γ1 by Γ2 and denoted by Γ1φ Γ2, in terms of mapping φ: V2) → {1, −1}. Furthermore we prove that C(Zm, {a}) ⋊φC(H, S) is also a Cayley digraph if φ is a homomorphism from H to \(\{ 1, - 1\} \le Z_m^ * \), which produces some classes of Cayley digraphs that have hamiltonian circuits.

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