The Complexity of Finding and Counting Subtournaments

Abstract

We study the complexity of counting and finding small tournament patterns inside large tournaments. Given a fixed tournament T of order k, we write \#IndSubTo(\T\) for the problem whose input is a tournament G and the task is to compute the number of subtournaments of G that are isomorphic to T. Previously, Yuster [Yus25] obtained that \#IndSubTo(\T\) is hard to compute for random tournaments T. We consider a new approach that uses linear combinations of subgraph-counts [CDM17] to obtain a finer analysis of the complexity of \#IndSubTo(\T\). We show that for all tournaments T of order k the problem \#IndSubTo(\T\) is always at least as hard as counting 3k/4 -cliques. This immediately yields tight bounds under ETH. Further, we consider the parameterized version of \#IndSubTo(T) where we only consider patterns T ∈ T and that is parameterized by the pattern size |V(T)|. We show that \#IndSubTo(T) is \#W[1]-hard as long as T contains infinitely many tournaments.