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- Absolutely_simple_group abstract "In mathematics, in the field of group theory, a group is said to be absolutely simple if it has no proper nontrivial serial subgroups. That is, is an absolutely simple group if the only serial subgroups of are (the trivial subgroup), and itself (the whole group).In the finite case, a group is absolutely simple if and only if it is simple. However, in the infinite case, absolutely simple is a stronger property than simple. The property of being strictly simple is somewhere in between.".
- Absolutely_simple_group wikiPageID "4966802".
- Absolutely_simple_group wikiPageRevisionID "587188331".
- Absolutely_simple_group hasPhotoCollection Absolutely_simple_group.
- Absolutely_simple_group subject Category:Group_theory.
- Absolutely_simple_group subject Category:Properties_of_groups.
- Absolutely_simple_group type Abstraction100002137.
- Absolutely_simple_group type Possession100032613.
- Absolutely_simple_group type PropertiesOfGroups.
- Absolutely_simple_group type Property113244109.
- Absolutely_simple_group type Relation100031921.
- Absolutely_simple_group comment "In mathematics, in the field of group theory, a group is said to be absolutely simple if it has no proper nontrivial serial subgroups. That is, is an absolutely simple group if the only serial subgroups of are (the trivial subgroup), and itself (the whole group).In the finite case, a group is absolutely simple if and only if it is simple. However, in the infinite case, absolutely simple is a stronger property than simple. The property of being strictly simple is somewhere in between.".
- Absolutely_simple_group label "Absolutely simple group".
- Absolutely_simple_group sameAs m.0cxkkw.
- Absolutely_simple_group sameAs Q4669869.
- Absolutely_simple_group sameAs Q4669869.
- Absolutely_simple_group sameAs Absolutely_simple_group.
- Absolutely_simple_group wasDerivedFrom Absolutely_simple_group?oldid=587188331.
- Absolutely_simple_group isPrimaryTopicOf Absolutely_simple_group.