Forbidden Tournaments and the Orientation Completion Problem

Abstract

For a fixed finite set of finite tournaments F, the F-free orientation problem asks whether a given finite undirected graph G has an F-free orientation, i.e., whether the edges of G can be oriented so that the resulting digraph does not embed any of the tournaments from F. We prove that for every F, this problem is in P or NP-complete. Our proof reduces the classification task to a complete complexity classification of the orientation completion problem for F, which is the variant of the problem above where the input is a directed graph instead of an undirected graph, introduced by Bang-Jensen, Huang, and Zhu (2017). Our proof uses results from the theory of constraint satisfaction, and a result of Agarwal and Kompatscher (2018) about infinite permutation groups and transformation monoids.