On graphs with chromatic number and maximum degree both equal to nine
Abstract
An equivalent version of the Borodin-Kostochka Conjecture, due to Cranston and Rabern, says that any graph with = = 9 contains K3 E6 as a subgraph. Here we prove several results in support of this conjecture, where vertex-criticality and forbidden substructure conditions get us either close or all the way to containing K3 E6.
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