10-list Recoloring of Planar Graphs
Abstract
Fix a planar graph G and a list-assignment L with |L(v)|=10 for all v∈ V(G). Let α and β be L-colorings of G. A recoloring sequence from α to β is a sequence of L-colorings, beginning with α and ending with β, such that each successive pair in the sequence differs in the color on a single vertex of G. We show that there exists a constant C such that for all choices of α and β there exists a recoloring sequence σ from α to β that recolors each vertex at most C times. In particular, σ has length at most C|V(G)|. This confirms a conjecture of Dvor\'ak and Feghali. For our proof, we introduce a new technique for quickly showing that many configurations are reducible. We believe this method may be of independent interest and will have application to other problems in this area.
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