Disjoint list-colorings for planar graphs

Abstract

One of Thomassen's classical results is that every planar graph of girth at least 5 is 3-choosable. One can wonder if for a planar graph G of girth sufficiently large and a 3-list-assignment L, one can do even better. Can one find 3 disjoint L-colorings (a packing), or 2 disjoint L-colorings, or a collection of L-colorings that to every vertex assigns every color on average in one third of the cases (a fractional packing)? We prove that the packing is impossible, but two disjoint L-colorings are guaranteed if the girth is at least 8, and a fractional packing exists when the girth is at least 6. For a graph G, the least k such that there are always k disjoint proper list-colorings whenever we have lists all of size k associated to the vertices is called the list packing number of G. We lower the two-times-degeneracy upper bound for the list packing number of planar graphs of girth 3,4 or 5. As immediate corollaries, we improve bounds for ε-flexibility of classes of planar graphs with a given girth. For instance, where previously Dvor\'ak et al. proved that planar graphs of girth 6 are (weighted) ε-flexibly 3-choosable for an extremely small value of ε, we obtain the optimal value ε=13. Finally, we completely determine and show interesting behavior on the packing numbers for H-minor-free graphs for some small graphs H.

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