Andrea Lucchini, Mariapia Moscatiello, Sebastien Palcoux, Pablo Spiga
Published 2019-11-11Version 1
Given a group $G$ and a subgroup $H$, we let $\mathcal{O}_G(H)$ denote the lattice of subgroups of $G$ containing $H$. This paper provides a classification of the subgroups $H$ of $G$ such that $\mathcal{O}_{G}(H)$ is Boolean of rank at least $3$, when $G$ is a finite alternating or symmetric group. Besides some sporadic examples and some twisted versions, there are two different types of such lattices. One type arises by taking stabilizers of chains of regular partitions, and the other type arises by taking stabilizers of chains of regular product structures. As an application, we prove in this case a conjecture on Boolean overgroup lattices, related to the dual Ore's theorem and to a problem of Kenneth Brown.
Comments: 25 pages, classification of Boolean lattices in symmetric and alternating groups
Normal coverings and pairwise generation of finite alternating and symmetric groups
Dual Ore's theorem for distributive intervals of small index
Sharp hypercontractivity for symmetric groups and its applications
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