Groups in which every finite subnormal subgroup is normal. (Q891901)
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scientific article; zbMATH DE number 6510818
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Groups in which every finite subnormal subgroup is normal. |
scientific article; zbMATH DE number 6510818 |
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Groups in which every finite subnormal subgroup is normal. (English)
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18 November 2015
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As a generalization of the groups with transitivity of normality (T-groups), the authors consider generalized soluble groups in which all finite subnormal subgroups are normal (FT-groups). Recall that a group \(G\) is called subsoluble if it has an ascending series with abelian factors consisting of subnormal subgroups. The authors' main results is in classification of subsoluble FT \(p\)-groups which are not T-groups. In particular, for \(p\) odd they are abelian.
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subnormal subgroups
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T-groups
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finite subgroups
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groups with transitive normality
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generalized soluble groups
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0.94445956
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0.9440002
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0.94099945
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0.9406159
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0.94003034
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0.93886364
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