Finite primitive groups and regular orbits of group elements

Abstract

We prove that if G is a finite primitive permutation group and if g is an element of G, then either g has a cycle of length equal to its order, or for some r, m and k, the group G ≤ Sym(m) wr Sym(r) preserves the product structure of r direct copies of the natural action of Sym(m) on k-sets. This gives an answer to a question of Siemons and Zalesski and a solution to a conjecture of Giudici, Praeger and the second author.