FUNDAMENTALNAYA I PRIKLADNAYA MATEMATIKA

(FUNDAMENTAL AND APPLIED MATHEMATICS)

1996, VOLUME 2, NUMBER 1, PAGES 125-131

On perfect finite-dimensional Lie algebras, satisfying standard Lie identity of degree 5

K. A. Zubrilin
A. Yu. Stepanov

Abstract

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Finite-dimensional Lie algebras satisfying standard Lie identity of degree 5 are considered. A base field K is algebraically closed and of zero characteristic. It is shown that any such algebra can be decomposed into a direct sum of a soluble algebra and a perfect one. It is proved that any such perfect algebra is isomorphic to A ÄK sl2, for a certain commutative and associative K-algebra A with unit element, and, thus, satisfies the same identities as Lie algebra sl2.

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