Further Results and Questions on S-Packing Coloring of Subcubic Graphs

Abstract

For non-decreasing sequence of integers S=(a1,a2, …, ak), an S-packing coloring of G is a partition of V(G) into k subsets V1,V2,…,Vk such that the distance between any two distinct vertices x,y ∈ Vi is at least ai+1, 1≤ i≤ k. We consider the S-packing coloring problem on subclasses of subcubic graphs: For 0 i 3, a subcubic graph G is said to be i-saturated if every vertex of degree 3 is adjacent to at most i vertices of degree 3. Furthermore, a vertex of degree 3 in a subcubic graph is called heavy if all its three neighbors are of degree 3, and G is said to be (3,i)-saturated if every heavy vertex is adjacent to at most i heavy vertices. We prove that every 1-saturated subcubic graph is (1,1,3,3)-packing colorable and (1,2,2,2,2)-packing colorable. We also prove that every (3,0)-saturated subcubic graph is (1,2,2,2,2,2)-packing colorable.

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