Proportional 2-Choosability with a Bounded Palette

Abstract

Proportional choosability is a list coloring analogue of equitable coloring. Specifically, a k-assignment L for a graph G specifies a list L(v) of k available colors to each v ∈ V(G). An L-coloring assigns a color to each vertex v from its list L(v). A proportional L-coloring of G is a proper L-coloring in which each color c ∈ v ∈ V(G) L(v) is used η(c)/k or η(c)/k times where η(c)=\v ∈ V(G) : c ∈ L(v) \. A graph G is proportionally k-choosable if a proportional L-coloring of G exists whenever L is a k-assignment for G. Motivated by earlier work, we initiate the study of proportional choosability with a bounded palette by studying proportional 2-choosability with a bounded palette. In particular, when ≥ 2, a graph G is said to be proportionally (2, )-choosable if a proportional L-coloring of G exists whenever L is a 2-assignment for G satisfying |v ∈ V(G) L(v)| ≤ . We observe that a graph is proportionally (2,2)-choosable if and only if it is equitably 2-colorable. As gets larger, the set of proportionally (2, )-choosable graphs gets smaller. We show that whenever ≥ 5 a graph is proportionally (2, )-choosable if and only if it is proportionally 2-choosable. We also completely characterize the connected proportionally (2, )-choosable graphs when = 3,4.