Online List Colorings with the Fixed Number of Colors

Abstract

The online list coloring is a widely studied topic in graph theory. A graph G is 2-paintable if we always have a strategy to complete a coloring in an online list coloring of G in which each vertex has a color list of size 2. In this paper, we focus on the online list coloring game in which the number of colors is known in advance. We say that G is [2,t]-paintable if we always have a strategy to complete a coloring in an online list coloring of G in which we know that there are exactly t colors in advance, and each vertex has a color list of size 2. Let M(G) denote the maximum t in which G is not [2,t]-paintable, and m(G) denote the minimum t ≥ 2 in which G is not [2,t]-paintable. We show that if G is not 2-paintable, then 2 ≤ m(G) ≤ 4, and n ≤ M(G) ≤ 2n-3. Furthermore, we characterize G with m(G)∈ \2,3,4\ and M(G) ∈ \n, n+1, 2n-3\, respectively.