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On a class of locally finite T-groups
-
Adolfo Ballester-Bolinches
,
Hermann Heineken
Published/Copyright:
March 12, 2007
Abstract
Radical locally finite groups with min-p for all primes p in which every descendant subgroup is normal are studied in the paper. It turns out that these groups are precisely T-groups, that is, groups whose subnormal subgroups are normal.
Received: 2005-08-24
Accepted: 2005-10-20
Published Online: 2007-03-12
Published in Print: 2007-03-20
© Walter de Gruyter
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- Moving homology classes to infinity
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Articles in the same Issue
- P-adic logarithmic forms and group varieties III
- Moving homology classes to infinity
- On a class of locally finite T-groups
- On Ext-universal modules in Gödel's universe
- Paraproducts in one and several parameters
- Labeled configuration spaces and group completions
- Universal localizations embedded in power-series rings
