Subdivision into i-packings and S-packing chromatic number of some lattices

Abstract

An i-packing in a graph G is a set of vertices at pairwise distance greater than i. For a nondecreasing sequence of integers S=(s\1,s\2,…), the S-packing chromatic number of a graph G is the least integer k such that there exists a coloring of G into k colors where each set of vertices colored i, i=1,…, k, is an s\i-packing. This paper describes various subdivisions of an i-packing into j-packings (ji) for the hexagonal, square and triangular lattices. These results allow us to bound the S-packing chromatic number for these graphs, with more precise bounds and exact values for sequences S=(s\i, i∈N*), s\i=d+ (i-1)/n .