Counting restricted orientations of random graphs

Abstract

We count orientations of G(n,p) avoiding certain classes of oriented graphs. In particular, we study Tr(n,p), the number of orientations of the binomial random graph G(n,p) in which every copy of Kr is transitive, and Sr(n,p), the number of orientations of G(n,p) containing no strongly connected copy of Kr. We give the correct order of growth of Tr(n,p) and Sr(n,p) up to polylogarithmic factors; for orientations with no cyclic triangle, this significantly improves a result of Allen, Kohayakawa, Mota and Parente. We also discuss the problem for a single forbidden oriented graph, and state a number of open problems and conjectures.