On 3-Coloring of (2P4,C5)-Free Graphs

Abstract

The 3-coloring of hereditary graph classes has been a deeply-researched problem in the last decade. A hereditary graph class is characterized by a (possibly infinite) list of minimal forbidden induced subgraphs H1,H2,…; the graphs in the class are called (H1,H2,…)-free. The complexity of 3-coloring is far from being understood, even for classes defined by a few small forbidden induced subgraphs. For H-free graphs, the complexity is settled for any H on up to seven vertices. There are only two unsolved cases on eight vertices, namely 2P4 and P8. For P8-free graphs, some partial results are known, but to the best of our knowledge, 2P4-free graphs have not been explored yet. In this paper, we show that the 3-coloring problem is polynomial-time solvable on (2P4,C5)-free graphs.