Partial list colouring of certain graphs

Abstract

Let G be a graph on n vertices and let Lk be an arbitrary function that assigns each vertex in G a list of k colours. Then G is Lk-list colourable if there exists a proper colouring of the vertices of G such that every vertex is coloured with a colour from its own list. We say G is k-choosable if for every such function Lk, G is Lk-list colourable. The minimum k such that G is k-choosable is called the list chromatic number of G and is denoted by L(G). Let L(G) = s and let t be a positive integer less than s. The partial list colouring conjecture due to Albertson et al. albertson2000partial states that for every Lt that maps the vertices of G to t-sized lists, there always exists an induced subgraph of G of size at least tns that is Lt-list colourable. In this paper we show that the partial list colouring conjecture holds true for certain classes of graphs like claw-free graphs, graphs with large chromatic number, chordless graphs, and series-parallel graphs. In the second part of the paper, we put forth a question which is a variant of the partial list colouring conjecture: does G always contain an induced subgraph of size at least tns that is t-choosable? We show that the answer to this question is not always `yes' by explicitly constructing an infinite family of 3-choosable graphs where a largest induced 2-choosable subgraph of each graph in the family is of size at most 5n8.