Improved bounds on the maximum diversity of intersecting families

Abstract

A family F⊂ [n]k is called an intersecting family if F F'≠ for all F,F'∈ F. If F≠ then F is called a star. The diversity of an intersecting family F is defined as the minimum number of k-sets in F, whose deletion results in a star. In the present paper, we prove that for n>36k any intersecting family F⊂ [n]k has diversity at most n-3k-2, which improves the previous best bound n>72k due to the first author. This result is derived from some strong bounds concerning the maximum degree of large intersecting families. Some related results are established as well.