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RESEARCH PRODUCT

On Formations of Finite Groups with the Wielandt Property for Residuals

Luis M. EzquerroAdolfo Ballester-bolinchesJohn Cossey

subject

Discrete mathematicsClass (set theory)Pure mathematicsFinite groupProperty (philosophy)Algebra and Number Theorylattice propertiesJoin (topology)subnormal subgroupsresidualsNilpotentLattice propertiesformationsUniversal validityMathematicsCounterexample

description

Abstract Given two subgroups U, V of a finite group which are subnormal subgroups of their join 〈U, V〉 and a formation F , in general it is not true that 〈U, V〉 F  = 〈U F , V F 〉. A formation is said to have the Wielandt property if this equality holds universally. A formation with the Wielandt property must be a Fitting class. Wielandt proved that the most usual Fitting formations (e.g., nilpotent groups and π-groups) have the Wielandt property. At present, neither a general satisfactory result on the universal validity of the Wielandt property nor a counterexample is known. In this paper a criterion for a Fitting formation to have the Wielandt property is given. As an application, it is proved that many of the known Fitting formations have the Wielandt property.

yearjournalcountryeditionlanguage
2001-09-01Journal of Algebra
10.1006/jabr.2001.8823http://dx.doi.org/10.1006/jabr.2001.8823