A note on the maximum diversity of intersecting families in the symmetric group

Abstract

Let Sn be the symmetric group on the set [n]:=\1,2,…,n\. A family F⊂ Sn is called intersecting if for every σ,π∈ F there exists some i∈ [n] such that σ(i)=π(i). Deza and Frankl proved that the largest intersecting family of permutations is the full star, that is, the collection of all permutations with a fixed position. The diversity of an intersecting family F is defined as the minimum number of permutations in F, whose deletion results in a star. In the present paper, by applying the spread approximation method developed recently by Kupavskii and Zakharov, we prove that for n≥ 500 the diversity of an intersecting subfamily of Sn is at most (n-3)(n-3)!, which is best possible.