Packing coloring of generalized Sierpinski graphs

Abstract

The packing chromatic number (G) of a graph G is the smallest integer c such that the vertex set V(G) can be partitioned into sets X1, . . . , Xc, with the condition that vertices in Xi have pairwise distance greater than i. In this paper, we consider the packing chromatic number of several families of Sierpinski-type graphs. We establish the packing chromatic numbers of generalized Sierpinski graphs SnG where G is a path or a cycle (with exception of a cycle of length five) as well as a connected graph of order four. Furthermore, we prove that the packing chromatic number in the family of Sierpinski-triangle graphs ST4n is bounded from above by 20.