Extensions of Thomassen's Theorem to Paths of Length At Most Four: Part III

Abstract

Let G be a planar embedding with list-assignment L and outer cycle C, and let P be a path of length at most four on C, where each vertex of G C has a list of size at least five and each vertex of C P has a list of size at least three. This is the final paper in a sequence of three papers in which we prove some results about partial L-colorings φ of C with the property that any extension of φ to an L-coloring of dom(φ) V(P) extends to L-color all of G, and, in particular, some useful results about the special case in which dom(φ) consists only of the endpoints of P. We also prove some results about the other special case in which φ is allowed to color some vertices of CP but we avoid taking too many colors away from the leftover vertices of Pdom(φ). We use these results in a later sequence of papers to prove some results about list-colorings of high-representativity embeddings on surfaces.

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