Irredundant generating sets and dimension-like invariants of the finite group

Abstract

Whiston proved that the maximum size of an irredundant generating set in the symmetric group Sn is n-1, and Cameron and Cara characterized all irredundant generating sets of Sn that achieve this size. Our goal is to extend their results. Using properties of transitive subgroups of the symmetric group, we are able to classify all irredundant generating sets with sizes n-2 in both An and Sn. Next, based on this classification, we derive other interesting properties for the alternating group An. Finally, using Whiston's lemma, we will derive the formulas for calculating dimension-like invariants of some specific types of wreath products.