Spanning trees in random regular uniform hypergraphs

Abstract

Let Gn,r,s denote a uniformly random r-regular s-uniform hypergraph on the vertex set \1,2,…, n\. We establish a threshold result for the existence of a spanning tree in Gn,r,s, restricting to n satisfying the necessary divisibility conditions. Specifically, we show that when s≥ 5, there is a positive constant (s) such that for any r≥ 2, the probability that Gn,r,s contains a spanning tree tends to 1 if r > (s), and otherwise this probability tends to zero. The threshold value (s) grows exponentially with s. As Gn,r,s is connected with probability which tends to 1, this implies that when r ≤ (s), most r-regular s-uniform hypergraphs are connected but have no spanning tree. When s=3,4 we prove that Gn,r,s contains a spanning tree with probability which tends to 1, for any r≥ 2. Our proof also provides the asymptotic distribution of the number of spanning trees in Gn,r,s for all fixed integers r,s≥ 2. TPreviously, this asymptotic distribution was only known in the trivial case of 2-regular graphs, or for cubic graphs.