On the intersection density of primitive groups of degree a product of two odd primes

Abstract

A subset F of a finite transitive group G≤ Sym() is intersecting if for any g,h∈ F there exists ω ∈ such that ωg = ωh. The intersection density (G) of G is the maximum of \ |F||Gω| F⊂ G is intersecting \, where Gω is the stabilizer of ω in G. In this paper, it is proved that if G is an imprimitive group of degree pq, where p and q are distinct odd primes, with at least two systems of imprimitivity then (G) = 1. Moreover, if G is primitive of degree pq, where p and q are distinct odd primes, then it is proved that (G) = 1, whenever the socle of G admits an imprimitive subgroup.