The list r-hued coloring of trees and unicyclic graphs

Abstract

Let r be a positive integer and G be a graph. The list r-hued chromatic number of G, denoted by χL,r(G), is the smallest integer k, such that for each k-list L of G, G has an (L,r)-coloring. It is proved in [Discrete Math. 306 (16) (2006) 1997-2004] that every tree G satisfies χr(G)=\r,Δ(G)\+1. It is known that every cycle graph Cn with order n has χL,r(Cn)=χr(Cn). The main results are the following: (1) If G is a tree, then χL,r(G)=\r,Δ(G)\+1; (2) Let G be a unicyclic graph which is not isomorphic to the cycle Cn. If n≠ 5 and r≥3, then χL,r(G)=\r,Δ(G)\+1; otherwise, \r,Δ(G)\+1≤χL,r(G)≤\r,Δ(G)\+2.