论文信息 - Vertex Partitions of K4,4-Minor Free Graphs

Vertex Partitions of K4,4-Minor Free Graphs

Abstract. We prove that a 4-connected K4,4-minor free graph on n vertices has at most 4n−8 edges and we use this result to show that every K4,4-minor free graph has vertex-arboricity at most 4. This improves the case (n,m)=(7,3) of the following conjecture of Woodall: the vertex set of a graph without a Kn-minor and without a -minor can be partitioned in n−m+1 subgraphs without a Km-minor and without a -minor.

Leif K. Jørgensen

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