Decomposing tournaments into comparability graphs

Abstract

In this note, we introduce the partial order decomposition number of a digraph D, denoted pod(D), defined as the minimum integer k such that A(D)=A(P1)·s A(Pk), where P1,…,Pk are partial orders on V(D). We prove that (D) (D)pod(D) for every digraph D. In particular, every class of digraphs with bounded pod is polynomially -bounded. We apply this to tournaments, showing that if C is a class of tournaments with bounded dichromatic number, then the closure of C under substitution is polynomially -bounded, thereby making progress on a question of Aubian, Charbit, Lopes, and the first author. As further applications of pod, we prove that poset tournaments of bounded dimension are -bounded, derive polynomial lower bounds on the directed clique number of an explicit family of tournaments, thereby answering a conjecture of Gutowski and Rams, and show that tournaments with bounded pod have bounded domination number.