On the intersection density of the symmetric group acting on uniform subsets of small size

Abstract

Given a finite transitive group G≤ Sym(), a subset F of G is intersecting if any two elements of F agree on some element of . The intersection density of G, denoted by (G), is the maximum of the rational number |F|(|G|||)-1 when F runs through all intersecting sets in G. In this paper, we prove that if G is the group Sym(n) or Alt(n) acting on the k-subsets of \1,2,3…,n\, for k∈ \3,4,5\, then (G)=1. Our proof relies on the representation theory of the symmetric group and the ratio bound.