Packing random graphs and hypergraphs

We determine to within a constant factor the threshold for the property that two random k-uniform hypergraphs with edge probability p have an edge-disjoint packing into the same vertex set. More generally, we allow the hypergraphs to have different densities. In the graph case, we prove a stronger result, on packing a random graph with a fixed graph

Intersections of hypergraphs

Given two weighted k-uniform hypergraphs G, H of order n, how much (or little) can we make them overlap by placing them on the same vertex set? If we place them at random, how concentrated is the distribution of the intersection? The aim of this paper is to investigate these questions

Intersections of random hypergraphs and tournaments

Given two random hypergraphs, or two random tournaments of order n, how much (or little) can we make them overlap by placing them on the same vertex set? We give asymptotic answers to this question