代数偏导的不变量的经典根

Pub Date : 2022-01-13 DOI:10.1142/s1005386722000050
Jeffrey Bergen, Piotr Grzeszczuk
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引用次数: 0

摘要

设[公式:见文]是一个自同构,[公式:见文]是一个[公式:见文]-倾斜[公式:见文]-一个[公式:见文]的派生-代数[公式:见文]。证明了如果[公式:见文]是半原始的,[公式:见文]是代数的,则子代数[公式:见文]具有幂零Jacobson根。利用这一结果,当域[公式:见文]不可数时,我们得到了Baer素根、Levitzki局部幂零根和Köthe零根的类似关系。然后,我们将其应用于[公式:见文]-维Taft Hopf代数[公式:见文]和[公式:见文]-李代数包络代数的[公式:见文]-模拟[公式:见文]的动作。
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Classical Radicals of Invariants of Algebraic Skew Derivations
Let [Formula: see text] be an automorphism and[Formula: see text] be a [Formula: see text]-skew [Formula: see text]-derivation of an [Formula: see text]-algebra [Formula: see text]. We prove that if [Formula: see text] is semiprimitive and [Formula: see text] is algebraic, then the subalgebra [Formula: see text] has nilpotent Jacobson radical. Using this result, we obtain similar relations for the Baer prime radical, the Levitzki locally nilpotent radical, and the Köthe nil radical when the field [Formula: see text] is uncountable. Then we apply it to actions of the [Formula: see text]-dimensional Taft Hopf algebra [Formula: see text] and the [Formula: see text]-analogue [Formula: see text] of the enveloping algebra of the Lie algebra [Formula: see text].
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