Finite Permutation Groups with Few Orbits Under the Action on the Power Set

Abstract

We study the orbits under the natural action of a permutation group G ⊂eq Sn on the powerset P(\1, … , n\). The permutation groups having exactly n+1 orbits on the powerset can be characterized as set-transitive groups and were fully classified in BP55. In this paper, we establish a general method that allows one to classify the permutation groups with n+r set-orbits for a given r, and apply it to integers 2 ≤ r ≤ 15 using the computer algebra system GAP.