欧见平,张福基.围长为3的点可迁图的3限制边连通度(英文)[J].数学研究及应用,2005,25(1):58~63 |
围长为3的点可迁图的3限制边连通度(英文) |
3-Restricted Edge Connectivity of Vertex Transitive Graphs of Girth Three |
投稿时间:2002-09-29 |
DOI:10.3770/j.issn:1000-341X.2005.01.008 |
中文关键词: 点可迁图 3限制边连通度 限制断片 |
英文关键词:vertex-transitive graph 3-restricted edge connectivity restricted fragment |
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中文摘要: |
设G是阶至少为6的k正则连通图.如果G的围长等于3,那么它的3限制边连通度 λ3(G)≤3k-6.当G是3或者4正则连通点可迁图时等号成立,除非G是4正则图并且 λ3(G)=4.进一步,λ3(G)=4的充分必要条件是图G含有子图K4. |
英文摘要: |
Let G be a k-regular connected graph of order at least six. If G has girth three, its 3-restricted edge connectivity λ3(G) ≤3k-6. The equality holds when G is a cubic or 4-regular connected vertex-transitive graph with the only exception that G is a 4-regular graph with λ3(G) = 4. Furthermore, λ3(G) = 4 if and only if G contains K4 as its subgraph. |
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