路径因子关键删除或覆盖图的度条件

Hong-xia Liu
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引用次数: 0

摘要

图G的路径因子是G的生成子图,其分量为路径。图G的P≥d因子是G的路径因子,其分量为至少有d个顶点的路径,其中d为d≥2的整数。若对任意e∈e (G), G存在包含e的P≥d因子,则图G为P≥d因子覆盖。若对任意Q∈V (G),且有|Q| = n,且任意e∈e (G−Q), G−Q−e存在P≥d因子,则图G为(P≥d,n)-因子临界删除。若对任意Q≥Q≠n的Q≠V (G), G−Q为P≥d-因子覆盖图,则图G为(P≥d,n)-因子覆盖图。本文验证了(i)对于任意G的独立集{v1,v2,···,v2t+1},当p≥4t + n + 7的p阶(n + t+ 2)连通图G在
下是(p≥3,n)因子临界删除,其中
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Degree conditions for path-factor critical deleted or covered graphs
A path-factor of a graph G is a spanning subgraph of G whose components are paths. A P≥d-factor of a graph G is a path-factor of G whose components are paths with at least d vertices, where d is an integer with d ≥ 2. A graph G is P≥d-factor covered if for any e ∈ E(G), G admits a P≥d-factor including e. A graph G is (P≥d,n)-factor critical deleted if for any Q ⊆ V (G) with |Q| = n and any e ∈ E(G − Q), G − Q − e has a P≥d-factor. A graph G is (P≥d,n)-factor critical covered if for any Q ⊆ V (G) with |Q| = n, G − Q is a P≥d-factor covered graph. In this paper, we verify that (i) an (n + t + 2)-connected graph G of order p with p ≥ 4t + n + 7 is (P≥3,n)-factor critical deleted if
 for any independent set {v1,v2,··· ,v2t+1} of G, where
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