Degree choosable signed graphs

Abstract

A signed graph is a graph in which each edge is labeled with +1 or -1. A (proper) vertex coloring of a signed graph is a mapping that assigns to each vertex v∈ V(G) a color (v)∈ such that every edge vw of G satisfies (v)= (vw)(w), where (vw) is the sign of the edge vw. For an integer h≥ 0, let 2h=\1,2, …, h\ and 2h+1=2h \0\. Following MaRS2015, the signed chromatic number (G) of G is the least integer k such that G admits a vertex coloring with im()⊂eq k. As proved in MaRS2015, every signed graph G satisfies (G)≤ (G)+1 and there are three types of signed connected simple graphs for which equality holds. We will extend this Brooks' type result by considering graphs having multiple edges. We will also proof a list version of this result by characterizing degree choosable signed graphs. Furthermore, we will establish some basic facts about color critical signed graphs.