Linear Choosability of Sparse Graphs

Abstract

We study the linear list chromatic number, denoted (G), of sparse graphs. The maximum average degree of a graph G, denoted (G), is the maximum of the average degrees of all subgraphs of G. It is clear that any graph G with maximum degree (G) satisfies (G) (G)/2+1. In this paper, we prove the following results: (1) if (G)<12/5 and (G) 3, then (G)=(G)/2+1, and we give an infinite family of examples to show that this result is best possible; (2) if (G)<3 and (G) 9, then (G)(G)/2+2, and we give an infinite family of examples to show that the bound on (G) cannot be increased in general; (3) if G is planar and has girth at least 5, then (G)(G)/2+4.