Identifying long cycles in finite alternating and symmetric groups acting on subsets

Abstract

Let H be a permutation group on a set , which is permutationally isomorphic to a finite alternating or symmetric group An or Sn acting on the k-element subsets of points from \1,…,n\, for some arbitrary but fixed k. Suppose moreover that no isomorphism with this action is known. We show that key elements of H needed to construct such an isomorphism , such as those whose image under is an n-cycle or (n-1)-cycle, can be recognised with high probability by the lengths of just four of their cycles in .