A maximal quotient $M = G/K$ of a group $G$ is a quotient of $G$ with the property that if $H \le K$ is normal in $G$ then either $H=K$ or $H=1$. Equivalently, $K$ is a minimal normal subgroup of $G$.
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- Last edited by David Roe on 2021-06-18 03:57:35
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- columns.gps_subgroups.minimal_normal
- group.minimal_normal
- lmfdb/groups/abstract/main.py (line 938)
- lmfdb/groups/abstract/main.py (line 1764)
- lmfdb/groups/abstract/templates/abstract-show-group.html (line 505)
- lmfdb/groups/abstract/templates/abstract-show-group.html (line 532)
- lmfdb/groups/abstract/web_groups.py (line 635)
- 2021-06-18 03:57:35 by David Roe (Reviewed)
- 2020-12-07 03:00:35 by David Roe
- 2020-12-06 09:01:09 by Manami Roy
- 2020-12-05 01:11:46 by Manami Roy