Chromatic thresholds in dense random graphs

Abstract

The chromatic threshold δ(H,p) of a graph H with respect to the random graph G(n,p) is the infimum over d > 0 such that the following holds with high probability: the family of H-free graphs G ⊂ G(n,p) with minimum degree δ(G) dpn has bounded chromatic number. The study of the parameter δ(H) := δ(H,1) was initiated in 1973 by Erdos and Simonovits, and was recently determined for all graphs H. In this paper we show that δ(H,p) = δ(H) for all fixed p ∈ (0,1), but that typically δ(H,p) δ(H) if p = o(1). We also make significant progress towards determining δ(H,p) for all graphs H in the range p = n-o(1). In sparser random graphs the problem is somewhat more complicated, and is studied in a separate paper.