Counting dense connected hypergraphs via the probabilistic method

Abstract

In 1990 Bender, Canfield and McKay gave an asymptotic formula for the number of connected graphs on [n]=\1,2,…,n\ with m edges, whenever n∞ and n-1 m=m(n) n2. We give an asymptotic formula for the number Cr(n,m) of connected r-uniform hypergraphs on [n] with m edges, whenever r 3 is fixed and m=m(n) with m/n∞, i.e., the average degree tends to infinity. This complements recent results of Behrisch, Coja-Oghlan and Kang (the case m=n/(r-1)+(n)) and the present authors (the case m=n/(r-1)+o(n), i.e., `nullity' or `excess' o(n)). The proof is based on probabilistic methods, and in particular on a bivariate local limit theorem for the number of vertices and edges in the largest component of a certain random hypergraph. The arguments are much simpler than in the sparse case; in particular, we can use `smoothing' techniques to directly prove the local limit theorem, without needing to first prove a central limit theorem.