Maximal linear groups induced on the Frattini quotient of a $p$-group
arXiv:1603.05384
Abstract
Let $p>3$ be a prime. For each maximal subgroup $H\leqslant\mathrm{GL}(d,p)$ with $|H| \geqslant p^{3d+1}$, we construct a $d$-generator finite $p$-group $G$ with the property that $\mathrm{Aut}(G)$ induces $H$ on the Frattini quotient $G/Φ(G)$ and $|G| \leqslant p^{\frac{d^4}{2}}$. A significant feature of this construction is that $|G|$ is very small compared to $|H|$, shedding new light upon a celebrated result of Bryant and Kovács. The groups $G$ that we exhibit have exponent $p$, and of all such groups $G$ with the desired action of $H$ on $G/Φ(G)$, the construction yields groups with smallest nilpotency class, and in most cases, the smallest order.
24 pages, 2 figures, 2 tables Typos corrected. Acknowledgement extended. To appear J. Pure. Appl. Algebra