Coprime invariable generation and minimal-exponent groups

Abstract

A finite group $G$ is \emph{coprimely-invariably generated} if there exists a set of generators $\{g_1, ..., g_u\}$ of $G$ with the property that the orders $|g_1|, ..., |g_u|$ are pairwise coprime and that for all $x_1, ..., x_u \in G$ the set $\{g_1^{x_1}, ..., g_u^{x_u}\}$ generates $G$. We show that if $G$ is coprimely-invariably generated, then $G$ can be generated with three elements, or two if $G$ is soluble, and that $G$ has zero presentation rank. As a corollary, we show that if $G$ is any finite group such that no proper subgroup has the same exponent as $G$, then $G$ has zero presentation rank. Furthermore, we show that every finite simple group is coprimely-invariably generated. Along the way, we show that for each finite simple group $S$, and for each partition $\pi_1, ..., \pi_u$ of the primes dividing $|S|$, the product of the number $k_{\pi_i}(S)$ of conjugacy classes of $\pi_i$-elements satisfies $\prod_{i=1}^u k_{\pi_i}(S) \leq \frac{|S|}{2| Out S|}.