Fractional list packing for layered graphs

Abstract

The fractional list packing number (G) of a graph G is a graph invariant that has recently arisen from the study of disjoint list-colourings. It measures how large the lists of a list-assignment L:V(G)→ 2N need to be to ensure the existence of a `perfectly balanced' probability distribution on proper L-colourings, i.e., such that at every vertex v, every colour appears with equal probability 1/|L(v)|. In this work we give various bounds on (G), which admit strengthenings for correspondence and local-degree versions. As a corollary, we improve theorems on the related notion of flexible list colouring. In particular we study Cartesian products and d-degenerate graphs, and we prove that (G) is bounded from above by the pathwidth of G plus one. The correspondence analogue of the latter is false for treewidth instead of pathwidth.

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