Author:
Duguid A. M.,McLain D. H.
Abstract
Let an element of a group be called an FC element if it has only a finite number of conjugates in the group. Baer(1) and Neumann (8) have discussed groups in which every element is FC, and called them FC-groups. Both Abelian and finite groups are trivially FC-groups; Neumann has studied the properties common to FC-groups and Abelian groups, and Baer the properties common to FC-groups and finite groups. Baer has also shown that, for an arbitrary group G, the set H1 of all FC elements is a characteristic subgroup. Haimo (3) has defined the FC-chain of a group G byHi/Hi−1 is the subgroup of all FC elements in G/Hi−1.
Publisher
Cambridge University Press (CUP)
Reference8 articles.
1. The FC-Chain of a Group
2. Finiteness conditions in soluble groups;Hall;Proc. Lond. math. Soc,1954
3. A contribution to the theory of groups of prime-power orders;Hall;Proc. Lond. math. Soc,1933
4. Infinite locally soluble groups;Černikov;Mat. Sborn,1940
5. Finiteness properties of groups
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