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Almost layer-finiteness of the periodic part of groups without involutions
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V. I. Senashov
Published/Copyright:
August 1, 2003
We prove the following theorem which characterises the class of groups without involutions which have an almost layer-finite periodic part: if the normaliser of any non-trivial finite subgroup of a Shunkov group without involutions has an almost layer-finite periodic part, then the group also has an almost layer-finite periodic part.
Published Online: 2003-08-01
Published in Print: 2003-08-01
Copyright 2003, Walter de Gruyter
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- Boolean reducibility
- On the complexity of testing primality by homogeneous structures
- On distinguishability of states of automata
- On glueing states of an automaton
- Almost layer-finiteness of the periodic part of groups without involutions
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Articles in the same Issue
- Boolean reducibility
- On the complexity of testing primality by homogeneous structures
- On distinguishability of states of automata
- On glueing states of an automaton
- Almost layer-finiteness of the periodic part of groups without involutions
- The structure and methods of generation of closed classes of graphs
- On asymptotic expansions for the distributions of the number of cycles in a random permutation
