S-packing colorings of distance graphs with distance sets of cardinality 2
Abstract
For a non-decreasing sequence S=(s1,s2,…) of positive integers, a partition of the vertex set of a graph G into subsets X1,…, X, such that vertices in Xi are pairwise at distance greater than si for every i∈\1,…,\, is called an S-packing -coloring of G. The minimum for which G admits an S-packing -coloring is called the S-packing chromatic number of G, denoted by S(G). In this paper, we consider S-packing colorings of distance graphs G(Z,\k,t\), where k and t are positive integers, which are the graphs whose vertex set is Z, and two vertices x,y∈ Z are adjacent whenever |x-y|∈\k,t\. We complement partial results from two earlier papers, thus determining all values of S(G(Z,\k,t\)) when S is any sequence with si 2 for all i. In particular, if S=(1,1,2,2,…), then the S-packing chromatic number is 2 if k+t is even, and 4 otherwise, while if S=(1,2,2,…), then the S-packing chromatic number is 5, unless \k,t\=\2,3\ when it is 6; when S=(2,2,2,…), the corresponding formula is more complex.
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