S-Packing Colorings of Cubic Graphs

Abstract

Given a non-decreasing sequence S=(s\1,s\2, …, s\k) of positive integers, an S-packing coloring of a graph G is a mapping c from V(G) to \s\1,s\2, …, s\k\ such that any two vertices with color s\i are at mutual distance greater than s\i, 1 i k. This paper studies S-packing colorings of (sub)cubic graphs. We prove that subcubic graphs are (1,2,2,2,2,2,2)-packing colorable and (1,1,2,2,3)-packing colorable. For subdivisions of subcubic graphs we derive sharper bounds, and we provide an example of a cubic graph of order 38 which is not (1,2,…,12)-packing colorable.