Towards the Overfull Conjecture II
Abstract
Let G be a simple graph with maximum degree Δ(G). A subgraph H⊂eq G is Δ(G)-overfull if |E(H)|>Δ(G) |V(H)|/2. In any edge coloring of G, each color class restricted to H is a matching of size at most |V(H)|/2. Thus, if G contains a Δ(G)-overfull subgraph, then G cannot be edge-colored with only Δ(G) colors. By Vizing's Theorem, χ'(G) Δ(G)+1, and hence G is class 2. In 1986, Chetwynd and Hilton conjectured that whenever Δ(G)>|V(G)|/3, the converse also holds: every class 2 graph G contains a Δ(G)-overfull subgraph. This statement, commonly known as the Overfull Conjecture, is one of the most influential conjectures in graph edge coloring. It would imply a polynomial-time algorithm for determining the chromatic index of graphs G with Δ(G)>|V(G)|/3, and would also imply several other longstanding conjectures in the area, including the Just-overfull Conjecture and the Vertex-splitting Conjecture. In previous work, the third author verified the conjecture for large graphs G with maximum degree at least 13|V(G)|/14. In this paper, we confirm the conjecture for robust expanders satisfying certain density constraints. As a consequence, for every 0<<1, the conjecture holds for all sufficiently large graphs G with maximum degree at least (1+)|V(G)|/2.
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