The Minimum Number of Edges in 4-Critical Digraphs of Given Order

Abstract

The dichromatic number \(\chi (D)\) of a digraph D, introduced by Neumann-Lara in the 1980s, is the least integer k for which D has a coloring with k colors such that each vertex receives a color and no directed cycle of D is monochromatic. The digraphs considered here are finite and may have antiparalell arcs, but no parallel arcs. A digraph D is k-critical if each proper subdigraph \(D'\) of D satisfies \(\chi (D')<\chi (D)=k\). For integers k and n, let \(d_k(n)\) denote the minimum number of arcs possible in a k-critical digraph of order n. It is easy to show that \(d_2(n)=n\) for all \(n\ge 2\), and \(d_3(n)\ge 2n\) for all possible n, where equality holds if and only if n is odd and \(n\ge 3\). As a main result we prove that \(d_4(n)\ge \lceil (10n-4)/3\rceil\) for all \(n\ge 4\) and \(n\not =5\) where equality holds if \(n \equiv 1 \, \mathrm {(mod} \; 3 \mathrm {)}\) or \(n \equiv 2 \, \mathrm {(mod} \; 3 \mathrm {)}\). As a consequence, we obtain that for each surface \(\mathbf{S}\) the number of 4-critical oriented graphs that can be embedded on \(\mathbf{S}\) is finite.