4-choosability of planar graphs with 4-cycles far apart via the Combinatorial Nullstellensatz
Abstract
By a well-known theorem of Thomassen and a planar graph depicted by Voigt, we know that every planar graph is 5-choosable, and the bound is tight. In 1999, Lam, Xu and Liu reduced 5 to 4 on C4-free planar graphs. In the paper, by applying the famous Combinatorial Nullstellensatz, we design an effective algorithm to deal with list coloring problems. At the same time, we prove that a planar graph G is 4-choosable if any two 4-cycles having distance at least 5 in G, which extends the result of Lam et al.
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