具有关联0分量的诺维科夫级代数

Pub Date : 2024-03-25 DOI:10.1134/s0037446624020150

A. S. Panasenko, V. N. Zhelyabin

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引用次数: 0

摘要

1974年，哈尔琴科证明，如果一个$ 0 $级联代数的$ n $分量是PI，那么这个代数就是PI。在特征为0的诺维科夫代数中，多项式同一性的存在等价于换元理想的可解性。我们研究了一个 $ 𝕑_{2} $-等级的诺维科夫代数 $ N=A+M $，并证明了如果基本域的特征不是 2 或 3，并且它的 0 分量 $ A $是指数为 3 的联立或烈偶，那么换元理想 $ [N,N] $是可解的。

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Novikov $ ��_{2} $ -Graded Algebras with an Associative 0-Component

In 1974 Kharchenko proved that if a $ 0 $-component of an $ n $-graded associative algebra is PI then this algebra is PI. In the Novikov algebras of characteristic 0 the existence of a polynomial identity is equivalent to the solvability of the commutator ideal. We study a $ 𝕑_{2} $-graded Novikov algebra $ N=A+M $ and prove that if the characteristic of the basic field is not 2 or 3 and its 0-component $ A $ is associative or Lie-nilpotent of index 3 then the commutator ideal $ [N,N] $ is solvable.

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