Generating sets of finite groups

Abstract

We investigate the extent to which the exchange relation holds in finite groups G. We define a new equivalence relation m, where two elements are equivalent if each can be substituted for the other in any generating set for G. We then refine this to a new sequence m(r) of equivalence relations by saying that x m(r)y if each can be substituted for the other in any r-element generating set. The relations m(r) become finer as r increases, and we define a new group invariant (G) to be the value of r at which they stabilise to m. Remarkably, we are able to prove that if G is soluble then (G) ∈ \d(G), d(G) +1\, where d(G) is the minimum number of generators of G, and to classify the finite soluble groups G for which (G) = d(G). For insoluble G, we show that d(G) ≤ (G) ≤ d(G) + 5. However, we know of no examples of groups G for which (G) > d(G) + 1. As an application, we look at the generating graph of G, whose vertices are the elements of G, the edges being the 2-element generating sets. Our relation m(2) enables us to calculate Aut((G)) for all soluble groups G of nonzero spread, and give detailed structural information about Aut((G)) in the insoluble case.