Injective colorings of sparse graphs

Abstract

Let mad(G) denote the maximum average degree (over all subgraphs) of G and let i(G) denote the injective chromatic number of G. We prove that if mad(G) ≤ 5/2, then i(G)≤(G) + 1; and if mad(G) < 42/19, then i(G)=(G). Suppose that G is a planar graph with girth g(G) and (G)≥ 4. We prove that if g(G)≥ 9, then i(G)≤(G)+1; similarly, if g(G)≥ 13, then i(G)=(G).