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I'm reading a paper "Groups that can be represented as a product of two solvable subgroups" published in 1986 in Comm. Algebra.

Since I do not understand Russian, I only read the abstract in this article. It states that for a finite factorization $G=AB$ with $A$ and $B$ solvable subgroups of $G$, if all the composition factors of $G$ are "known" groups, then the nonabelian simple composition factors of $G$ belong the listed groups.

I don't know what does "kown" group mean, so I wonder is there anyone understanding Russian or knowing this result who will kindly answer the following question? Does it mean the composition factors of $G$ are of certain types? If so, where are these types mensioned in this paper? Thanks in advance!

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    @AlexanderKonovalov:Thank you for reminding me. I don't know why the link is changed. Now I edited the link to the original one. It should be linked to the paper "Groups that can be represented as a product of two solvable subgroups" by Kazarin published in Comm. Algebra 14 (1986), no. 6, 1001–1066.2013-07-08

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