Messab Aiech, Hanifa Zekraoui, Yassine Guerboussa
Published 2022-04-12Version 1
A finite $p$-group $G$ is said to be $d$-maximal if $d(H)<d(G)$ for every subgroup $H<G$, where $d(G)$ denotes the minimal number of generators of $G$. A similar definition can be formulated when $G$ is acted on by some group $A$. We generalize results of B. Kahn and T. Laffey to the latter case, and give them in particular alternative short proofs. We answer moreover a question of Y. Berkovich about the minimal non-metacyclic $p$-groups.
On the minimal number of generators of endomorphism monoids of full shifts
Finite $p$-groups of class 3 with noninner automorphisms of order $p$
Subgroups of the upper-triangular matrix group with maximal derived length and a minimal number of generators
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