Two-block cycles and chromatic number of Hamiltonian digraphs

Abstract

Let k and be positive integers. The family C(k,) consists of all digraphs obtained from two internally vertex-disjoint directed paths of lengths at least k and , respectively, and identifying their initial vertices and their terminal vertices. Addario-Berry, Havet and Thomassé (JCT-B, 2007) asked whether, for any positive integers k and with k+ 4, the chromatic number χ(D) is at most k+-1 for every C(k,)-free strongly connected digraph D. Let D be a C(k,)-free Hamiltonian digraph. Kim, Kim, Ma and Park (JGT, 2018) showed that χ(D) k+ and the bound is attained when k+=5. In this paper, we prove that χ(D) k+-1 for k+ 6 and this bound is best possible for all k+≥ 6, which resolves the problem posed by Addario-Berry, Havet and Thomassé for Hamiltonian digraphs.

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