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This article is cited in 6 scientific papers (total in 6 papers)
On periodic groups of automorphisms of extremal groups
S. N. Chernikov Mathematics Institute, Academy of Sciences of the Ukrainian SSR
Abstract:
It is proved that if a periodic group $\mathfrak G$ has an extremal normal divisor $\mathfrak N$ , determining a complete abelian factor group $\mathfrak G/\mathfrak N$ , then the center of the group $\mathfrak G$ contains a complete abelian subgroup $\mathfrak A$, satisfying the relation $\mathfrak G=\mathfrak{NA}$ and intersecting $\mathfrak N$ on a finite subgroup. It is also established with the aid of this proposition that every periodic group of automorphisms of an extremal group $\mathfrak G$ is a finite extension of a contained in it subgroup of inner automorphisms of the group $\mathfrak G$.
Received: 29.02.1968
Citation:
S. N. Chernikov, “On periodic groups of automorphisms of extremal groups”, Mat. Zametki, 4:1 (1968), 91–96; Math. Notes, 4:1 (1968), 543–545
Linking options:
https://www.mathnet.ru/eng/mzm6747 https://www.mathnet.ru/eng/mzm/v4/i1/p91
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