右$S$- noether环的Eakin-Nagata-Eisenbud定理

Pub Date : 2022-01-01 DOI:10.11650/tjm/221101

Gangyong Lee, Jongwook Baeck, J. Lim

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引用次数: 3

摘要

． Eakin-Nagata定理在1968年研究了子环和扩展环之间的noether性质相互穿过的条件。后来，Eakin-Nagata定理的一个非交换版本也被证明了。Lam称这个版本为Eakin-Nagata-Eisenbud定理。此外，Anderson和Dumitrescu在2002年引入了S -Noetherian概念，这是交换环上Noetherian性质的扩展概念。本文利用S - noether模考虑了一般环上Eakin-Nagata-Eisenbud定理的S -变分。我们还证明了每一个右S - noether域都是嵌入在除法环中的右l域。对于一个右S - noether环，我们得到了它的分数的右环是右S - noether或右noether的充分条件。作为应用，将Eakin-Nagata-Eisenbud定理的S -变分应用于复合多项式、复合幂级数和复合斜多项式环。

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Eakin–Nagata–Eisenbud Theorem for Right $S$-Noetherian Rings

. The Eakin–Nagata theorem examines the condition that the Noetherian property passes through each other between subrings and extension rings in 1968. Later, a noncommutative version of Eakin–Nagata theorem was also proved. Lam called this version Eakin–Nagata–Eisenbud theorem. In addition, Anderson and Dumitrescu introduced the S -Noetherian concept which is an extended notion of the Noetherian property on commutative rings in 2002. In this paper, we consider the S -variant of Eakin–Nagata–Eisenbud theorem for general rings by using S -Noetherian modules. We also show that every right S -Noetherian domain is right Ore, which is embedded into a division ring. For a right S -Noetherian ring, we obtain suﬃcient conditions for its right ring of fractions to be right S -Noetherian or right Noetherian. As applications, the S -variant of Eakin–Nagata–Eisenbud theorem is applied to the composite polynomial, composite power series and composite skew polynomial rings.

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