Groups with elementary Abelian centralizers of involutions

• Autores: A. I. Sozutov, A. S. Kryukovskii
• Localización: Algebra and logic, ISSN 0002-5232, Vol. 46, Nº. 1, 2007, págs. 46-49
• Idioma: inglés
• DOI: 10.1007/s10469-007-0005-3
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• Resumen

  • An involution i of a group G is said to be almost perfect in G if any two involutions of iG the order of a product of which is infinite are conjugated via a suitable involution in iG. We generalize a known result by Brauer, Suzuki, and Wall concerning the structure of finite groups with elementary Abelian centralizers of involutions to groups with almost perfect involutions.