Partitioning H-minor free graphs into three subgraphs with no large components
We prove that for every graph H, if a graph G has no H minor, then V(G) can be partitioned into three sets such that the subgraph induced on each set has no component of size larger than a function of H and the maximum degree of G. This answers a question of Esperet and Joret and improves a result of Alon, Ding, Oporowski and Vertigan and a result of Esperet and Joret. As a corollary, for every positive integer t, if a graph G has no Kt+1 minor, then V(G) can be partitioned into 3t sets such that the subgraph induced on each set has no component of size larger than a function of t. This corollary improves a result of Wood.
- Publisher
- Elsevier B.V.
- Issue Date
- 2015-11
- Language
- English
- Article Type
- Article
- Citation
Electronic Notes in Discrete Mathematics, v.49, pp.133 - 138
- ISSN
- 1571-0653
- Appears in Collection
- MA-Journal Papers(저널논문)
- Files in This Item
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