A Brooks type theorem for the maximum local edge connectivity

Abstract

For a graph G, let (G) and (G) denote the chromatic number of G and the maximum local edge connectivity of G, respectively. A result of Dirac Dirac53 implies that every graph G satisfies (G)≤ (G)+1. In this paper we characterize the graphs G for which (G)=(G)+1. The case (G)=3 was already solved by Alboulker et al.\, AlboukerV2016. We show that a graph G with (G)=k≥ 4 satisfies (G)=k+1 if and only if G contains a block which can be obtained from copies of Kk+1 by repeated applications of the Haj\'os join.