$S$-packing colorings of distance graphs with distance sets of cardinality $2$

TL;DR

This paper determines the $S$-packing chromatic number for distance graphs with two distances, providing complete results for sequences with elements at most 2, and reveals how these numbers depend on the parity of the sum of the distances.

Contribution

It completes the classification of $S$-packing chromatic numbers for distance graphs with two distances when sequence elements are at most 2, extending prior partial results.

Findings

Exact $S$-packing chromatic numbers for various sequences and distance sets.

Dependence of chromatic number on the parity of $k+t$ for certain sequences.

Specific values for sequences like $(1,1,2,2,\u2026)$ and $(1,2,2,\u2026)$.

Abstract

For a non-decreasing sequence $S=(s_1,s_2,\ldots)$ of positive integers, a partition of the vertex set of a graph $G$ into subsets $X_1,\ldots, X_\ell$, such that vertices in $X_i$ are pairwise at distance greater than $s_i$ for every $i\in\{1,\ldots,\ell\}$, is called an $S$-packing $\ell$-coloring of $G$. The minimum $\ell$ for which $G$ admits an $S$-packing $\ell$-coloring is called the $S$-packing chromatic number of $G$, denoted by $\chi_S(G)$. In this paper, we consider $S$-packing colorings of distance graphs $G(\mathbb{Z},\{k,t\})$, where $k$ and $t$ are positive integers, which are the graphs whose vertex set is $\mathbb{Z}$, and two vertices $x,y\in \mathbb{Z}$ are adjacent whenever $|x-y|\in\{k,t\}$. We complement partial results from two earlier papers, thus determining all values of $\chi_S(G(\mathbb{Z},\{k,t\}))$ when $S$ is any sequence with $s_i\le 2$ for all $i$. In particular, if $S=(1,1,2,2,\ldots)$, then the $S$-packing chromatic number is $2$ if $k+t$ is even, and $4$ otherwise, while if $S=(1,2,2,\ldots)$, then the $S$-packing chromatic number is $5$, unless $\{k,t\}=\{2,3\}$ when it is $6$; when $S=(2,2,2,\ldots)$, the corresponding formula is more complex.