Minimum non-chromatic-λ-choosable graphs

Abstract

For a multi-set λ=\k1,k2, …, kq\ of positive integers, let kλ = Σi=1q ki. A λ-list assignment of G is a list assignment L of G such that the colour set v ∈ V(G)L(v) can be partitioned into the disjoint union C1 C2 … Cq of q sets so that for each i and each vertex v of G, |L(v) Ci| ki. We say G is λ-choosable if G is L-colourable for any λ-list assignment L of G. The concept of λ-choosability puts k-colourability and k-choosability in the same framework: If λ = \k\, then λ-choosability is equivalent to k-choosability; if λ consists of k copies of 1, then λ-choosability is equivalent to k -colourability. If G is λ-choosable, then G is kλ-colourable. On the other hand, there are kλ-colourable graphs that are not λ-choosable, provided that λ contains an integer larger than 1. Let φ(λ) be the minimum number of vertices in a kλ-colourable non-λ-choosable graph. This paper determines the value of φ(λ) for all λ.