Groups with dihedral 3-normalizers of order 4k, I
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Publication:1251282
DOI10.1016/0021-8693(78)90008-XzbMath0391.20009MaRDI QIDQ1251282
Publication date: 1978
Published in: Journal of Algebra (Search for Journal in Brave)
Related Items (7)
Finite groups with involution whose centralizer has a quotient group isomorphic with \({\mathcal L}_ 2(2^ n)\) ⋮ Finite groups ⋮ Groups with dihedral 3-normalizers of order 4k, II ⋮ A class of finite groups with abelian centralizer of an element of order 3 of type \((3,2,2)\). ⋮ Groups with dihedral 3-normalizers of order 4k. III ⋮ Finite groups of 2-local 3-rank 1 ⋮ Finite groups with a self-normalizing subgroup of order six. II
Cites Work
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- 2-groups normalized by \(SL(2,2^n)\)
- The characterization of finite groups with abelian Sylow 2-subgroups
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- Structure theorems for groups with dihedral 3-normalisers
- A CHARACTERIZATION OF M12 BY CENTRALIZER OF INVOLUTION
- On finite simple groups whose Sylow 2-subgroups have no normal elementary subgroups of order 8
- On 2-Groups With No Normal Abelian Subgroups of Rank 3, and Their Occurrence as Sylow 2-Subgroups of Finite Simple Groups
- Groups Having Strongly Self-Centralizing 3-Centralizers
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