Distant 2-Colored Components on Embeddings Part II: The Short-Inseparable Case
Abstract
This is the second in a sequence of three papers in which we prove the following generalization of Thomassen's 5-choosability theorem: Let G be a graph embedded on a surface of genus g. Then G can be L-colored, where L is a list-assignment for G in which every vertex has a 5-list except for a collection of pairwise far-apart components, each precolored with an ordinary 2-coloring, as long as the face-width of G is at least 2(g) and the precolored components are of distance at least 2(g) apart. This provides an affirmative answer to a generalized version of a conjecture of Thomassen and also generalizes a result from 2017 of Dvor\'ak, Lidick\'y, Mohar, and Postle about distant precolored vertices. In this paper we prove that the above result holds for a restricted class of embeddings, i.e. those embeddings which satisfy certain triangulation conditions and do not have separating cycles of length at most four.
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