Coloring a graph with -1 colors: Conjectures equivalent to the Borodin-Kostochka conjecture that appear weaker

Abstract

Borodin and Kostochka conjectured that every graph G with maximum degree 9 satisfies \ω, -1\. We carry out an in-depth study of minimum counterexamples to the Borodin-Kostochka conjecture. Our main tool is the identification of graph joins that are f-choosable, where f(v) = d(v) - 1 for each vertex v. Since such a join cannot be an induced subgraph of a vertex critical graph with = , we have a wealth of structural information about minimum counterexamples to the Borodin-Kostochka conjecture. Our main result proves that certain conjectures that are prima facie weaker than the Borodin-Kostochka conjecture are in fact equivalent to it. One such equivalent conjecture is the following: Any graph with = 9 contains K3 * K6 as a subgraph.