List Multicoloring of Planar Graphs and Related Classes
Abstract
For positive integers a and b, a graph G is (a:b)-choosable if, for each assignment of lists of a colors to the vertices of G, each vertex can be colored with a set of b colors from its list so that adjacent vertices are colored with disjoint sets. We show that for positive integers a and b, every bipartite planar graph is (a:b)-choosable iff ab 3. For general planar graphs, we show that if ab < 425, then there exists a planar graph that is not (a:b)-choosable, thus improving on a result of X. Zhu, which had 429. Lastly, we show that every K5-minor-free graph is (a:b)-choosable iff ab 5. Along the way, we mention some open problems.
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