Coloring hypergraphs of low connectivity

Abstract

For a hypergraph G, let (G), (G), and λ(G) denote the chromatic number, the maximum degree, and the maximum local edge connectivity of G, respectively. A result of Rhys Price Jones from 1975 says that every connected hypergraph G satisfies (G) ≤ (G) + 1 and equality holds if and only if G is a complete graph, an odd cycle, or G has just one (hyper-)edge. By a result of Bjarne Toft from 1970 it follows that every hypergraph G satisfies (G) ≤ λ(G) + 1. In this paper, we show that a hypergraph G with λ(G) ≥ 3 satisfies (G) = λ(G) + 1 if and only if G contains a block which belongs to a family Hλ(G). The class H3 is the smallest family which contains all odd wheels and is closed under taking Haj\'os joins. For k ≥ 4, the family Hk is the smallest that contains all complete graphs Kk+1 and is closed under Haj\'os joins. For the proofs of the above results we use critical hypergraphs. A hypergraph G is called (k+1)-critical if (G)=k+1, but (H)≤ k whenever H is a proper subhypergraph of G. We give a characterization of (k+1)-critical hypergraphs having a separating edge set of size k as well as a a characterization of (k+1)-critical hypergraphs having a separating vertex set of size 2.