On the strength of connectedness of a random hypergraph

Abstract

Bollob\'as and Thomason (1985) proved that for each k=k(n) ∈ [1, n-1], with high probability, the random graph process, where edges are added to vertex set V=[n] uniformly at random one after another, is such that the stopping time of having minimal degree k is equal to the stopping time of becoming k-(vertex-)connected. We extend this result to the d-uniform random hypergraph process, where k and d are fixed. Consequently, for m=nd( n +(k-1) n +c) and p=(d-1)! n + (k-1) n +cnd-1, the probability that the random hypergraph models Hd(n, m) and Hd(n, p) are k-connected tends to e-e-c/(k-1)!.