2004
DOI: 10.1017/s1446788700008880
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Fitting classes and lattice formations II

Abstract: Given a lattice formation & of full characteristic, an &-Fitting class is a Fitting class with stronger closure properties involving ^"-subnormal subgroups. The main aim of this paper is to prove that the associated injectors possess a good behaviour with respect to ^-subnormal subgroups.2000 Mathematics subject classification: primary 20D10.

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Cited by 1 publication
(3 citation statements)
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“…Lattice formations and also the class of p-nilpotent groups, for every prime p, are particular examples of the formations # considered in Theorem 3.9. In particular, this theorem and Proposition 3.4 (a) improve Theorem 2.8, parts (1) and (2).…”
Section: Gtsupporting
confidence: 55%
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“…Lattice formations and also the class of p-nilpotent groups, for every prime p, are particular examples of the formations # considered in Theorem 3.9. In particular, this theorem and Proposition 3.4 (a) improve Theorem 2.8, parts (1) and (2).…”
Section: Gtsupporting
confidence: 55%
“…In this manner, notice that an ^"-Fitting class is also a Fitting class, as the lattice formation J*" contains jV. In a forthcoming paper [2], the desired behaviour of the associated injectors, with respect to ^"-subnormal (and ^"-Dnormal) subgroups, is obtained. In fact, this property characterizes ^"-Fitting classes.…”
Section: Introductionmentioning
confidence: 89%
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