Minimum number of arcs in $k$-critical digraphs with order at most $2k-1$

TL;DR

This paper determines the minimum number of arcs in k-critical digraphs with order up to 2k-1, generalizing Gallai's 1963 result on critical graphs and providing exact characterizations.

Contribution

It establishes a formula for the minimum arcs in k-critical digraphs of order n, extending previous work on critical graphs to directed graphs.

Findings

Derived exact formula for minimum arcs in k-critical digraphs.

Characterized the structure of extremal k-critical digraphs.

Generalized Gallai's 1963 result from graphs to directed graphs.

Abstract

The dichromatic number $\vec{\chi}(D)$ of a digraph $D$ is the least integer $k$ for which $D$ has a coloring with $k$ colors such that there is no monochromatic directed cycle in $D$. The digraphs considered here are finite and may have antiparallel arcs, but no parallel arcs. A digraph $D$ is called $k$-critical if each proper subdigraph $D'$ of $D$ satisfies $\vec{\chi}(D')<\vec{\chi}(D)=k$. For integers $k$ and $n$, let $\overrightarrow{\mathrm{ext}}(k,n)$ denote the minimum number of arcs possible in a $k$-critical digraph of order $n$. It is easy to show that $\overrightarrow{\mathrm{ext}}(2,n)=n$ for all $n\geq 2$, and $\overrightarrow{\mathrm{ext}}(3,n)\geq 2n$ for all possible $n$, where equality holds if and only if $n$ is odd and $n\geq 3$. As a main result we prove that if $n, k$ and $p$ are integers with $n=k+p$ and $2\leq p \leq k-1$, then $\overrightarrow{\mathrm{ext}}(k,n)=2({\binom{n}{2}} - (p^2+1))$, and we give an exact characterisation of $k$-critical digraphs for which equality holds. This generalizes a result about critical graphs obtained in 1963 by Tibor Gallai.