Subgroups of Conjugate Classes in Extensions
Canadian journal of mathematics, Tome 22 (1970) no. 4, pp. 773-783

Voir la notice de l'article provenant de la source Cambridge University Press

Often in various mathematical problems one encounters an extension B of the group G by the group π in which one wishes to extract certain information about B from information given in terms of G, π, the action of π on G, and the class of the extension in H2(π, centre G). An example of this type of problem is to determine some intrinsically defined subgroup of B, for instance the centre of B, given knowledge of the corresponding subgroup for G and π, and, of course, the usual information concerning the extension.In this paper we shall use the fact that any extension is congruent to a crossed product extension [2] to investigate a class of subgroups which naturally generalizes the notion of the centre. The definition of this class appears in § 3. 1. Let by an extension of G by π.
Burroughs, John E.; Schafer, James A. Subgroups of Conjugate Classes in Extensions. Canadian journal of mathematics, Tome 22 (1970) no. 4, pp. 773-783. doi: 10.4153/CJM-1970-087-1
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[1] 1. Baer, R., Finiteness properties of groups, Duke Math. J. 15 (1948), 1021–1032. Google Scholar

[2] 2. MacLane, S., Homology (Springer, Berlin, 1963). Google Scholar

[3] 3. Newmann, B. H., Groups with finite classes of conjugate elements, Proc. London Math. Soc. 1 (1951), 178–187. Google Scholar

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