Packing (1,1,2,4)-coloring of subcubic outerplanar graphs

Abstract

For 1≤ s1 s2 … sk and a graph G, a packing (s1, s2, …, sk)-coloring of G is a partition of V(G) into sets V1, V2, …, Vk such that, for each 1≤ i ≤ k, the distance between any two distinct x,y∈ Vi is at least si + 1. The packing chromatic number, p(G), of a graph G is the smallest k such that G has a packing (1,2, …, k)-coloring. It is known that there are trees of maximum degree 4 and subcubic graphs G with arbitrarily large p(G). Recently, there was a series of papers on packing (s1, s2, …, sk)-colorings of subcubic graphs in various classes. We show that every 2-connected subcubic outerplanar graph has a packing (1,1,2)-coloring and every subcubic outerplanar graph is packing (1,1,2,4)-colorable. Our results are sharp in the sense that there are 2-connected subcubic outerplanar graphs that are not packing (1,1,3)-colorable and there are subcubic outerplanar graphs that are not packing (1,1,2,5)-colorable. We also show subcubic outerplanar graphs that are not packing (1,2,2,4)-colorable and not packing (1,1,3,4)-colorable.