Graphs with girth 2+1 and without longer odd holes that contain an odd K4-subdivision

Abstract

We say that a graph G has an odd K4-subdivision if some subgraph of G is isomorphic to a K4-subdivision and whose faces are all odd holes of G. For a number ≥ 2, let G denote the family of graphs which have girth 2+1 and have no odd hole with length greater than 2+1. Wu, Xu and Xu conjectured that every graph in ≥2G is 3-colorable. Recently, Chudnovsky et al. and Wu et al., respectively, proved that every graph in G2 and G3 is 3-colorable. In this paper, we prove that no 4-vertex-critical graph in ≥5G has an odd K4-subdivision. Using this result, Chen proved that all graphs in ≥5G are 3-colorable.