Girth and λ-choosability of graphs

Abstract

Assume k is a positive integer, λ=\k1,k2,...,kq\ is a partition of k and G is a graph. A λ-assignment of G is a k -assignment L of G such that the colour set v∈ V(G) L(v) can be partitioned into q subsets C1 C2·s Cq and for each vertex v of G , |L(v) Ci|=ki . We say G is λ-choosable if for each λ-assignment L of G , G is L -colourable. In particular, if λ=\k\ , then λ-choosable is the same as k -choosable, if λ=\1, 1,...,1\ , then λ-choosable is equivalent to k -colourable. For the other partitions of k sandwiched between \k\ and \1, 1,...,1\ in terms of refinements, λ-choosability reveals a complex hierarchy of colourability of graphs. Assume λ=\k1, …, kq\ is a partition of k and λ' is a partition of k' k . We write λ λ' if there is a partition λ''=\k''1, …, k''q\ of k' with k''i ki for i=1,2,…, q and λ' is a refinement of λ''. It follows from the definition that if λ λ' , then every λ-choosable graph is λ'-choosable. It was proved in [X. Zhu, A refinement of choosability of graphs, J. Combin. Theory, Ser. B 141 (2020) 143 - 164] that the converse is also true. This paper strengthens this result and proves that for any λ λ' , for any integer g, there exists a graph of girth at least g which is λ-choosable but not λ'-choosable.