If $G$ is a group, a subgroup $M$ is a maximal subgroup if for every subgroup $H$ such that $M\subseteq H \subseteq G$, either $H=M$ or $H=G$.
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- Review status: reviewed
- Last edited by John Jones on 2019-05-23 20:28:34
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- columns.gps_groups.maximal_subgroups_known
- columns.gps_subgroups.maximal
- group.frattini_subgroup
- lmfdb/groups/abstract/main.py (line 427)
- lmfdb/groups/abstract/main.py (line 1131)
- lmfdb/groups/abstract/main.py (line 2274)
- lmfdb/groups/abstract/templates/abstract-show-group.html (line 458)
- lmfdb/groups/abstract/templates/abstract-show-group.html (line 469)
- lmfdb/groups/abstract/web_groups.py (line 761)
- 2019-05-23 20:28:34 by John Jones (Reviewed)