The existence of path-factor uniform graphs with large connectivity

Zhou, Sizhong; Bian, Qiuxiang

doi:10.1051/ro/2022143

Zhou, Sizhong ; Bian, Qiuxiang

RAIRO. Operations Research, Tome 56 (2022) no. 4, pp. 2919-2927

Résumé

A path-factor is a spanning subgraph F of G such that every component of F is a path with at least two vertices. Let k ≥ 2 be an integer. A P$$-factor of G means a path factor in which each component is a path with at least k vertices. A graph G is a P$$-factor covered graph if for any e ∈ E(G), G has a P$$-factor covering e. A graph G is called a P$$-factor uniform graph if for any e₁, e₂ ∈ E(G) with e₁ ≠ e₂, G has a P$$-factor covering e₁ and avoiding e₂. In other words, a graph G is called a P$$-factor uniform graph if for any e ∈ E(G), G − e is a P$$-factor covered graph. In this paper, we present two sufficient conditions for graphs to be P_≥3-factor uniform graphs depending on binding number and degree conditions. Furthermore, we show that two results are best possible in some sense.

MR

DOI : 10.1051/ro/2022143

Classification : 05C70, 05C38
Keywords: Graph, degree condition, binding number, $$_≥3-factor, $$_≥3-factor uniform graph

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     title = {The existence of path-factor uniform graphs with large connectivity},
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     pages = {2919--2927},
     year = {2022},
     publisher = {EDP-Sciences},
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     number = {4},
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     url = {https://www.numdam.org/articles/10.1051/ro/2022143/}
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Zhou, Sizhong; Bian, Qiuxiang. The existence of path-factor uniform graphs with large connectivity. RAIRO. Operations Research, Tome 56 (2022) no. 4, pp. 2919-2927. doi: 10.1051/ro/2022143

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