内$σ$衍生的有界偏斜幂级数环

Adam Jones, William Woods
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引用次数: 0

摘要

我们定义并探索了有界偏斜幂级数环$R^+[[x;\sigma,\delta]]$,它定义在一个完整的、过滤的、具有交换偏斜导数$(\sigma,\delta)$的诺特引元$R$上。对于 $Q(R)$的适当补集 $Q$,我们证明如果 $Q$ 有特征 $p$,$\delta$ 是内 $\sigma$派生,并且没有 $\sigma$ 的正幂作为 $Q$ 的内自变量,那么 $Q^+[[x;\sigma,\delta]]$ 通常是素数,甚至在对 $\delta$ 的某些温和限制下是简单的。从这个结果可以得出 $R^+[[x;\sigma,\delta]]$ 本身是素数。
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Bounded skew power series rings for inner $σ$-derivations
We define and explore the bounded skew power series ring $R^+[[x;\sigma,\delta]]$ defined over a complete, filtered, Noetherian prime ring $R$ with a commuting skew derivation $(\sigma,\delta)$. We establish precise criteria for when this ring is well-defined, and for an appropriate completion $Q$ of $Q(R)$, we prove that if $Q$ has characteristic $p$, $\delta$ is an inner $\sigma$-derivation and no positive power of $\sigma$ is inner as an automorphism of $Q$, then $Q^+[[x;\sigma,\delta]]$ is often prime, and even simple under certain mild restrictions on $\delta$. It follows from this result that $R^+[[x;\sigma,\delta]]$ is itself prime.
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