Author:
Hartley B.,Tomkinson M. J.
Abstract
It is a well known theorem of Gaschütz (4) and Schenkman (12) that if G is a finite group whose nilpotent residual A is Abelian, then G splits over A and the complements to A in G are conjugate. Following Robinson (10) we describe this situation by saying that G splits conjugately over A. A number of generalizations of this result have since been obtained, some of them being in the context of the formation theory of finite or locally finite groups (see, for example, (1), (3)) and others, for example, the recent and far-reaching results of Robinson (10, 11) being concerned with groups which are not necessarily periodic. Our results here are of the latter type.
Publisher
Cambridge University Press (CUP)
Reference12 articles.
1. Finiteness conditions and generalized soluble groups, Parts 1 and 2;Robinson;Ergebn. Math. Grenzgebiete,1972
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3. (10) Robinson D. J. S. , Splitting theorems for infinite groups. Symposia Mathematica (to appear).
4. The ϵJ-normalizers of a finite soluble group
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