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An axiomatic formation that is not a variety
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Keith A. Kearnes
Published/Copyright:
August 31, 2009
Abstract
We show that any variety of groups that contains a finite nonsolvable group contains an axiomatic formation that is not a subvariety.
Received: 2009-06-09
Published Online: 2009-08-31
Published in Print: 2010-March
© de Gruyter 2010
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Articles in the same Issue
- Class numbers of group extensions
- Zeros of Brauer characters and the defect zero graph
- On the vanishing prime graph of solvable groups
- Solvability of generalized monomial groups
- Group algebras of torsion groups and Lie nilpotence
- An axiomatic formation that is not a variety
- Minimal odd order automorphism groups
- Finite groups with normally embedded subgroups
- The influence of ℋ-subgroups on the structure of finite groups
- Classification of the virtually cyclic subgroups of the pure braid groups of the projective plane
- On ω-categorical groups and their completions
