Classifying uniformly generated groups
Abstract
A finite group G is called *uniformly generated*, if whenever there is a (strictly ascending) chain of subgroups 1< x1< x1,x2 <·s< x1,x2,…,xd=G, then d is the minimal number of generators of G. Our main result classifies the uniformly generated groups without using the simple group classification. These groups are related to finite projective geometries by a result of Iwasawa on subgroup lattices.
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