List colorings of K5-minor-free graphs with special list assignments

Abstract

A list assignment L of a graph G is a function that assigns a set (list) L(v) of colors to every vertex v of G. Graph G is called L-list colorable if it admits a vertex coloring φ such that φ(v)∈ L(v) for all v∈ V(G) and φ(v)=φ(w) for all vw∈ E(G). The following question was raised by Bruce Richter. Let G be a planar, 3-connected graph that is not a complete graph. Denoting by d(v) the degree of vertex v, is G L-list colorable for every list assignment L with |L(v)|= \d(v), 6\ for all v∈ V(G)? More generally, we ask for which pairs (r,k) the following question has an affirmative answer. Let r and k be integers and let G be a K5-minor-free r-connected graph that is not a Gallai tree (i.e., at least one block of G is neither a complete graph nor an odd cycle). Is G L-list colorable for every list assignment L with |L(v)|=\d(v),k\ for all v∈ V(G)? We investigate this question by considering the components of G[Sk], where Sk:=\v∈ V(G) | d(v)<k\ is the set of vertices with small degree in G. We are especially interested in the minimum distance d(Sk) in G between the components of G[Sk].