数学物理学报 ›› 1999, Vol. 19 ›› Issue (5): 481-485.
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(山东农业大学基础部 泰安 271018)
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(Department of Basic Courses, Shandong Agricultural University, Taian 271018)
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摘要:
设aF(v)≤b.本文得到了下列结果:设1≤a(a+b)(2a+2b-3)/b.如果对于G的任意两个不相邻的顶点u, v有|NG(u)∪NG(v)|≥an/(a+b),则G有一个[a,b]因子.
关键词: 图论, [a,b]-因子, 邻域并.
Abstract:
Let a≤b be integers and G a graph. A spanning subgraph F of G is called an [a,b] factor of G if a≤dF(v)≤b for all v∈V(G). A sufficient condition concerning neighborhood unions for the existence of an [a,b] factor in a graph is given. The author prove the following result: Let a(a+b)(2a+2b-3)/b. Assume |NG (u)∪NG (v)|≥an/(a+b), for each pair of nonadjacent vertices u,v in G and the minimum degree is at least a, Then G has an [a,b] factor.
Key words: Graph, [a,b]-factor, Neighborhoodunion.
中图分类号:
苏本堂. 邻域并和[a,b]因子[J]. 数学物理学报, 1999, 19(5): 481-485.
Su Bentang . Neighborhood Unions and [a,b] Factors[J]. Acta mathematica scientia,Series A, 1999, 19(5): 481-485.
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