Packing chromatic number of subdivisions of cubic graphs

Abstract

A packing k-coloring of a graph G is a partition of V(G) into sets V1,…,Vk such that for each 1≤ i≤ k the distance between any two distinct x,y∈ Vi is at least i+1. The packing chromatic number, p(G), of a graph G is the minimum k such that G has a packing k-coloring. For a graph G, let D(G) denote the graph obtained from G by subdividing every edge. The questions on the value of the maximum of p(G) and of p(D(G)) over the class of subcubic graphs G appear in several papers. Gastineau and Togni asked whether p(D(G))≤ 5 for any subcubic G, and later Bresar, Klavzar, Rall and Wash conjectured this, but no upper bound was proved. Recently the authors proved that p(G) is not bounded in the class of subcubic graphs G. In contrast, in this paper we show that p(D(G)) is bounded in this class, and does not exceed 8.