Hajós theorem for colorings of edge-weighted graphs (Q2567409)
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| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Hajós theorem for colorings of edge-weighted graphs |
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Hajós theorem for colorings of edge-weighted graphs (English)
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4 October 2005
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A \(k\)-critical graph \(G\) has chromatic number \(k\) but every proper subgraph of \(G\) has a chromatic number smaller than \(k\). A theorem of Hajós states that every \(k\)-critical graph can be obtained by a simple inductive construction from copies of the complete graph \(K_k\). The present paper shows that the Hajós theorem has a natural generalization in the case of edge-weighted graphs, both for the chromatic number and the circular chromatic number of graphs.
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critical graph
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circular chromatic number
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