Injective chromatic number of outerplanar graphs

Abstract

An injective coloring of a graph is a vertex coloring where two vertices with common neighbor receive distinct colors. The minimum integer k that G has a k-injective coloring is called injective chromatic number of G and denoted by i(G). In this paper, the injective chromatic number of outerplanar graphs with maximum degree and girth g is studied. It is shown that for every outerplanar graph, i(G)≤ +2, and this bound is tight. Then, it is proved that for outerplanar graphs with =3, i(G)≤ +1 and the bound is tight for outerplanar graphs of girth three and 4. Finally, it is proved that, the injective chromatic number of 2-connected outerplanar graphs with =3, g≥ 6 and ≥ 4, g≥ 4 is equal to .