Beyond Ohba's Conjecture: A bound on the choice number of k-chromatic graphs with n vertices
Abstract
Let ch(G) denote the choice number of a graph G (also called "list chromatic number" or "choosability" of G). Noel, Reed, and Wu proved the conjecture of Ohba that ch(G)=(G) when |V(G)| 2(G)+1. We extend this to a general upper bound: ch(G) \(G),(|V(G)|+(G)-1)/3\. Our result is sharp for |V(G)| 3(G) using Ohba's examples, and it improves the best-known upper bound for ch(K4,…,4).
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