3-Coloring C4 or C3-free Diameter Two Graphs

Abstract

The question of whether 3-Coloring can be solved in polynomial-time for the diameter two graphs is a well-known open problem in the area of algorithmic graph theory. We study the problem restricted to graph classes that avoid cycles of given lengths as induced subgraphs. Martin et. al. [CIAC 2021] showed that the problem is polynomial-time solvable for C5-free or C6-free graphs, and, (C4,Cs)-free graphs where s ∈ \3,7,8,9\. We extend their result proving that it is polynomial-time solvable for (C4,Cs)-free graphs, for any constant s, and for (C3,C7)-free graphs. Our results also hold for the more general problem List 3-Colouring.