On Packing Colorings of Distance Graphs

Abstract

The packing chromatic number (G) of a graph G is the least integer k for which there exists a mapping f from V(G) to \1,2,… ,k\ such that any two vertices of color i are at distance at least i+1. This paper studies the packing chromatic number of infinite distance graphs G(Z,D), i.e. graphs with the set Z of integers as vertex set, with two distinct vertices i,j∈ Z being adjacent if and only if |i-j|∈ D. We present lower and upper bounds for (G(Z,D)), showing that for finite D, the packing chromatic number is finite. Our main result concerns distance graphs with D=\1,t\ for which we prove some upper bounds on their packing chromatic numbers, the smaller ones being for t≥ 447: (G(Z,\1,t\))≤ 40 if t is odd and (G(Z,\1,t\))≤ 81 if t is even.