Packing chromatic number versus chromatic and clique number

Abstract

The packing chromatic number (G) of a graph G is the smallest integer k such that the vertex set of G can be partitioned into sets Vi, i∈ [k], where each Vi is an i-packing. In this paper, we investigate for a given triple (a,b,c) of positive integers whether there exists a graph G such that ω(G) = a, (G) = b, and (G) = c. If so, we say that (a, b, c) is realizable. It is proved that b=c 3 implies a=b, and that triples (2,k,k+1) and (2,k,k+2) are not realizable as soon as k 4. Some of the obtained results are deduced from the bounds proved on the packing chromatic number of the Mycielskian. Moreover, a formula for the independence number of the Mycielskian is given. A lower bound on (G) in terms of (G) and α(G) is also proved.