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This article is cited in 3 scientific papers (total in 3 papers)
Identities in almost nilpotent Lie rings
M. V. Volkov, A. G. Gein
Abstract:
The following Lie rings $L$ are shown to have finite bases for their identities. (i) $L$ has a finite ideal $K$ with $L/K$ nilpotent. (ii) $L$ has a nilpotent ideal $N$ of finite index with $\operatorname{ad}x$ nilpotent on $N$ for each $x\in L$. (iii) $L$ is soluble, algebraic and possesses a nilpotent ideal of finite index. Of independent interest are some other results giving characterizations of certain classes of varieties of Lie rings.
Bibliography: 17 titles.
Received: 01.07.1980 and 23.08.1981
Citation:
M. V. Volkov, A. G. Gein, “Identities in almost nilpotent Lie rings”, Mat. Sb. (N.S.), 118(160):1(5) (1982), 132–142; Math. USSR-Sb., 46:1 (1983), 133–142
Linking options:
https://www.mathnet.ru/eng/sm2242https://doi.org/10.1070/SM1983v046n01ABEH002754 https://www.mathnet.ru/eng/sm/v160/i1/p132
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| Abstract page: | 424 | | Russian version PDF: | 105 | | English version PDF: | 23 | | References: | 58 |
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