Vertex coloring of plane graphs with nonrepetitive boundary paths

Abstract

A sequence s1,s2,...,sk,s1,s2,...,sk is a repetition. A sequence S is nonrepetitive, if no subsequence of consecutive terms of S form a repetition. Let G be a vertex colored graph. A path of G is nonrepetitive, if the sequence of colors on its vertices is nonrepetitive. If G is a plane graph, then a facial nonrepetitive vertex coloring of G is a vertex coloring such that any facial path is nonrepetitive. Let πf(G) denote the minimum number of colors of a facial nonrepetitive vertex coloring of G. Jendro and Harant posed a conjecture that πf(G) can be bounded from above by a constant. We prove that πf(G) 24 for any plane graph G.