Graphs that are critical for the packing chromatic number

Abstract

Given a graph G, a coloring c:V(G) \1,…,k\ such that c(u)=c(v)=i implies that vertices u and v are at distance greater than i, is called a packing coloring of G. The minimum number of colors in a packing coloring of G is called the packing chromatic number of G, and is denoted by (G). In this paper, we propose the study of -critical graphs, which are the graphs G such that for any proper subgraph H of G, (H)<(G). We characterize -critical graphs with diameter 2, and -critical block graphs with diameter 3. Furthermore, we characterize -critical graphs with small packing chromatic numbers, and we also consider -critical trees. In addition, we prove that for any graph G with e∈ E(G), we have ((G)+1)/2 (G-e) (G), and provide a corresponding realization result, which shows that (G-e) can achieve any of the integers between the bounds.