其中 $$G-N[v]$$ 是每个顶点 v 的树的图形 G

IF 0.6 4区 数学 Q3 MATHEMATICS Graphs and Combinatorics Pub Date : 2024-07-06 DOI:10.1007/s00373-024-02814-4
Bo Zhang, Baoyindureng Wu
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引用次数: 0

摘要

如果对于 G 的每个顶点 v,(G[N(v)]\cong H\) 表示一个给定的图 H 可被图 G 实现。我们考虑的是一个在更一般的情况下有点相反的问题。让 \({\mathcal {F}}\) 是一个图族:描述所有的图 G,对于 G 的每个顶点 v,都使得 \(G-N[v]\in {\mathcal {F}}\).让 \({\mathcal {T}}_m\) 是所有大小为固定非负整数 m 的树的集;\({/mathcal {P}}=\{P_t:\t>0\}\) 和\({\mathcal {S}}=\{K_{1,t}:\t\ge 0\}\).我们证明,对于一个连通图 G,它的补集({\overline{G}}\)是连通的,对于每一个(v\in V(G)),当且仅当以下条件之一成立时,(G-N[v]\in {\mathcal {T}}_m\):\对于每个(v/in V(G))来说都是(G-N[v]/cong K_{1,m}\),或者对于每个(v/in V(G))来说都是(G-N[v]/cong P_{m+1}\)。事实上,具有后两种性质的图是由同一作者在最近描述的(Graphs G in which \(G-N[v]\) has a prescribed property for each vertex v, Discrete Appl.)此外,我们还描述了所有的图 G,对于每个顶点 v,\(G-N[v]\in {\mathcal {S}}\);以及所有的图 G,对于每个顶点 v,\(G-N[v]\in {\mathcal {P}}\)。这解决了 Yu 和 Wu 提出的一个未决问题(Graphs in which \(G-N[v]\) is a cycle for each vertex v, Discrete Math.344 (2021) 112519).最后,从问题的角度提出了一些猜想。
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Graphs G Where $$G-N[v]$$ is a Tree for Each Vertex v

A given graph H is called realizable by a graph G if \(G[N(v)]\cong H\) for every vertex v of G. The Trahtenbrot-Zykov problem says that which graphs are realizable? We consider a problem somewhat opposite in a more general setting. Let \({\mathcal {F}}\) be a family of graphs: to characterize all graphs G such that \(G-N[v]\in {\mathcal {F}}\) for every vertex v of G. Let \({\mathcal {T}}_m\) be the set of all trees of size \(m\ge 0\) for a fixed nonnegative integer m, \({\mathcal {P}}=\{P_t:\ t>0\}\) and \({\mathcal {S}}=\{K_{1,t}:\ t\ge 0\}\). We show that for a connected graph G with its complement \({\overline{G}}\) being connected, \(G-N[v]\in {\mathcal {T}}_m\) for each \(v\in V(G)\) if and only if one of the following holds: \(G-N[v]\cong K_{1,m}\) for each \(v\in V(G)\), or \(G-N[v]\cong P_{m+1}\) for each \(v\in V(G)\). Indeed, the graphs with later two properties are characterized by the same authors very recently (Graphs G in which \(G-N[v]\) has a prescribed property for each vertex v, Discrete Appl. Math., In press.). In addition, we characterize all graphs G such that \(G-N[v]\in {\mathcal {S}}\) for each \(v\in V(G)\) and all graphs G such that \(G-N[v]\in {\mathcal {P}}\) for each \(v\in V(G)\). This solves an open problem raised by Yu and Wu (Graphs in which \(G-N[v]\) is a cycle for each vertex v, Discrete Math. 344 (2021) 112519). Finally, a number of conjectures are proposed for the perspective of the problem.

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来源期刊
Graphs and Combinatorics
Graphs and Combinatorics 数学-数学
CiteScore
1.00
自引率
14.30%
发文量
160
审稿时长
6 months
期刊介绍: Graphs and Combinatorics is an international journal devoted to research concerning all aspects of combinatorial mathematics. In addition to original research papers, the journal also features survey articles from authors invited by the editorial board.
期刊最新文献
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