On the number of maximal intersecting k-uniform families and further applications of Tuza's set pair method

Abstract

We study the function M(n,k) which denotes the number of maximal k-uniform intersecting families F⊂eq [n]k. Improving a bound of Balogh at al. on M(n,k), we determine the order of magnitude of M(n,k) by proving that for any fixed k, M(n,k) =n(2kk) holds. Our proof is based on Tuza's set pair approach. The main idea is to bound the size of the largest possible point set of a cross-intersecting system. We also introduce and investigate some related functions and parameters.