Graphs with no K9= minor are 10-colorable
Abstract
Hadwiger's conjecture claims that any graph with no Kt minor is (t - 1)-colorable. This has been proved for t 6, but remains open for t 7. As a variant of this conjecture, graphs with no Kt= minor have been considered, where Kt= denotes the complete graph with two edges removed. It has been shown that graphs with no Kt= minor are (2t - 8)-colorable for t ∈ \7, 8\. In this paper, we extend this result to the case t = 9 and show that graphs with no K9= minor are 10-colorable.
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