A Note on the Complexity of Directed Clique

Abstract

For a directed graph G, and a linear order on the vertices of G, we define backedge graph G to be the undirected graph on the same vertex set with edge \u,w\ in G if and only if (u,w) is an arc in G and w u. The directed clique number of a directed graph G is defined as the minimum size of the maximum clique in the backedge graph G taken over all linear orders on the vertices of G. A natural computational problem is to decide for a given directed graph G and a positive integer t, if the directed clique number of G is at most t. This problem has polynomial algorithm for t=1 and is known to be -complete for every fixed t3, even for tournaments. In this note we prove that this problem is P2-complete when t is given on the input.