Structure of periodic nonabelian metahamiltonian groups with an elementary commutator subgroup of rank three (Q749665)
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scientific article; zbMATH DE number 4173245
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Structure of periodic nonabelian metahamiltonian groups with an elementary commutator subgroup of rank three |
scientific article; zbMATH DE number 4173245 |
Statements
Structure of periodic nonabelian metahamiltonian groups with an elementary commutator subgroup of rank three (English)
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1989
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A group is said to be metahamiltonian if every nonabelian subgroup in it is invariant. The main theorem provides a complete description of periodic metabelian metahamiltonian groups with an elementary commutator subgroup of rank three.
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periodic metabelian metahamiltonian groups
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commutator subgroup
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0.9411874
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0.9259908
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0.88329124
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0.8799656
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0.87656915
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0.86570746
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