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A product decomposition for the classical quasisimple groups
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Nikolay Nikolov
Published/Copyright:
February 12, 2007
Abstract
We prove that every quasisimple group of classical type is a product of boundedly many conjugates of a quasisimple subgroup of type An.
Received: 2006-01-31
Published Online: 2007-02-12
Published in Print: 2007-01-26
© Walter de Gruyter
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Articles in the same Issue
- Finite 2-groups all of whose maximal cyclic subgroups of composite order are self-centralizing
- Maximal elementary abelian subgroups of rank 2
- A Morita equivalence for blocks of finite p-solvable groups in the Glauberman–Isaacs–Watanabe correspondence context
- A remark on the identification of Lie-type groups as amalgams of minimal parabolic subgroups
- A product decomposition for the classical quasisimple groups
- A natural invariant algebra for the Baby Monster group
- Recognition of the finite almost simple groups PGL2(q) by their spectrum
- Reflections on discriminating groups
- Pseudo-elementary generalized triangle groups
- Poly-free constructions for right-angled Artin groups
