K3-WORM colorings of graphs: Lower chromatic number and gaps in the chromatic spectrum

Abstract

A K3-WORM coloring of a graph G is an assignment of colors to the vertices in such a way that the vertices of each K3-subgraph of G get precisely two colors. We study graphs G which admit at least one such coloring. We disprove a conjecture of Goddard et al. [Congr. Numer., 219 (2014) 161--173] who asked whether every such graph has a K3-WORM coloring with two colors. In fact for every integer k 3 there exists a K3-WORM colorable graph in which the minimum number of colors is exactly k. There also exist K3-WORM colorable graphs which have a K3-WORM coloring with two colors and also with k colors but no coloring with any of 3,…,k-1 colors. We also prove that it is NP-hard to determine the minimum number of colors and NP-complete to decide k-colorability for every k 2 (and remains intractable even for graphs of maximum degree 9 if k=3). On the other hand, we prove positive results for d-degenerate graphs with small d, also including planar graphs. Moreover we point out a fundamental connection with the theory of the colorings of mixed hypergraphs. We list many open problems at the end.