Coloring and The Lonely Graph

Abstract

We improve upper bounds on the chromatic number proven independently in reedNote and ingo. Our main lemma gives a sufficient condition for two paths in graph to be completely joined. Using this, we prove that if a graph has an optimal coloring with more than ω2 singleton color classes, then it satisfies ≤ ω + + 12. It follows that a graph satisfying n - < α + ω - 12 must also satisfy ≤ ω + + 12, improving the bounds in reedNote and ingo. We then give a simple argument showing that if a graph satisfies > n + 3 - α2, then it also satisfies (G) ≤ ω(G) + (G) + 12. From this it follows that a graph satisfying n - < α + ω also satisfies (G) ≤ ω(G) + (G) + 12 improving the bounds in reedNote and ingo even further at the cost of a ceiling. In the next sections, we generalize our main lemma to constrained colorings (e.g. r-bounded colorings). We present a generalization of Reed's conjecture to r-bounded colorings and prove the conjecture for graphs with maximal degree close to their order. Finally, we outline some applications (in BorodinKostochka and ColoringWithDoublyCriticalEdge) of the theory presented here to the Borodin-Kostochka conjecture and coloring graphs containing a doubly critical edge.