The Maximum Number of Cliques in Hypergraphs without Large Matchings

Abstract

Let [n] denote the set \1, 2, …, n\ and F(r)n,k,a be an r-uniform hypergraph on the vertex set [n] with edge set consisting of all the r-element subsets of [n] that contains at least a vertices in [ak+a-1]. For n≥ 2rk, Frankl proved that F(r)n,k,1 maximizes the number of edges in r-uniform hypergraphs on n vertices with the matching number at most k. Huang, Loh and Sudakov considered a multicolored version of the Erdos matching conjecture, and provided a sufficient condition on the number of edges for a multicolored hypergraph to contain a rainbow matching of size k. In this paper, we show that F(r)n,k,a maximizes the number of s-cliques in r-uniform hypergraphs on n vertices with the matching number at most k for sufficiently large n, where a= s-rk +1. We also obtain a condition on the number of s-clques for a multicolored r-uniform hypergraph to contain a rainbow matching of size k, which reduces to the condition of Huang, Loh and Sudakov when s=r.