A characterization of 4--(vertex-)critical graphs

Abstract

Given a graph G, a function c:V(G) \1,…,k\ with the property that c(u)=c(v)=i implies that the distance between u and v is greater than i, is called a k-packing coloring of G. The smallest integer k for which there exists a k-packing coloring of G is called the packing chromatic number of G, and is denoted by . Packing chromatic vertex-critical graphs are the graphs G for which (G-x) < (G) holds for every vertex x of G. A graph G is called a packing chromatic critical graph if for every proper subgraph H of G, (H) < (G). Both of the mentioned variations of critical graphs with respect to the packing chromatic number have already been studied. All packing chromatic (vertex-)critical graphs G with (G)=3 were characterized, while there were known only partial results for graphs G with (G)=4. In this paper, we provide characterizations of all packing chromatic vertex-critical graphs G with (G)=4 and all packing chromatic critical graphs G with (G)=4.