On the number of linear multipartite hypergraphs with given size

Abstract

For any given integer r≥slant 3, let k=k(n) be an integer with r≤slant k≤slant n. A hypergraph is r-uniform if each edge is a set of r vertices, and is said to be linear if two edges intersect in at most one vertex. Let A1,…,Ak be a given k-partition of [n] with |Ai|=ni≥slant 1. An r-uniform hypergraph H is called k-partite if each edge e satisfies |e Ai|≤slant 1 for 1≤slant i≤slant k. In this paper, the number of linear k-partite r-uniform hypergraphs on n∞ vertices is determined asymptotically when the number of edges is m(n)=o(n43). For k=n, it is the number of linear r-uniform hypergraphs on vertex set [n] with m=o(n 43) edges.