On the converse of a theorem of Schur. (Q359609)
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scientific article; zbMATH DE number 6197824
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | On the converse of a theorem of Schur. |
scientific article; zbMATH DE number 6197824 |
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On the converse of a theorem of Schur. (English)
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12 August 2013
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A classical theorem of Schur shows that the commutator subgroup of a group whose center is of finite index, is finite. Converse results have been proved by several authors with B. H. Neumann proving one of the earliest versions. In this paper, the authors give a really short proof of such a generalized converse theorem. Further, they give an example of a finite, nilpotent group \(G\) with \(|G/Z(G)|=16=|[G,G]|^2\) for which \([G,G]\) is not cyclic, answering a question of Manoj Yadav.
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Schur theorem
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commutator subgroup
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finite groups
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center
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central factor
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derived subgroup
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generalized converse theorem
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