A character theoretic formula for base size

Abstract

A base for a permutation group G acting on a set is a sequence B of points of such that the pointwise stabiliser GB is trivial. The base size of G is the size of a smallest base for G. We derive a character theoretic formula for the base size of a class of groups admitting a certain kind of irreducible character. Moreover, we prove a formula for enumerating the non-equivalent bases for G of size l∈N. As a consequence of our results, we present a very short, entirely algebraic proof of the formula of Mecenero and Spiga~MeSp for the base size of the symmetric group Sn acting on the k-element subsets of \1,2,3,…,n\. Our methods also provide a formula for the base size of many product-type permutation groups.